index int64 0 1.74k | image stringlengths 1.02k 414k | question stringlengths 31 488 | option stringlengths 38 473 | answer stringclasses 5 values |
|---|---|---|---|---|
100 | 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| In the quadrilateral ABCD shown in the figure, ABCD is a right trapezoid, and line segment BE is perpendicular to CD. What is the length of BE in cm? | A. 4; B. 3; C. 2; D. 1; E. No correct answer | C |
101 | 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| In triangle BEC, line segment BE is perpendicular to CD, then CE = ( ) cm | A. 4; B. 3; C. 2; D. 1; E. No correct answer | C |
102 | 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| As shown in the figure, quadrilateral ABDE is a rectangle. What is the length of CD in cm? | A. 5; B. 4; C. 3; D. 2; E. No correct answer | A |
103 | 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| As shown in the figure, ABCD is a right trapezoid with a rectangle ABDE inside it. What is the length of CD? ( ) cm | A. 5; B. 4; C. 3; D. 2; E. No correct answer | A |
104 | iVBORw0KGgoAAAANSUhEUgAAAoIAAAFjCAYAAACpAGqvAAAAAXNSR0IArs4c6QAAAARnQU1BAACxjwv8YQUAAAAJcEhZcwAAFiUAABYlAUlSJPAAACPUSURBVHhe7d0LrGVVeThwJdToxCoELKUYgQASGFLFUvCBj2qACFZJbIs4SESidgpBeT9Ki0iVRwudQq1DJ9YqKo8mKGnHOpS2yNhSjQo1HYS2PI0oTxEdHkKz///vsDbsvc+5j3Pvuffuu9bvl3wZ7l3rvPb++O539vN5FQAARdIIAgAUSiMIAFAojSAAQKE0ggAAhdIIAgAUSiMIAFAojSAAQKE0ggAAhdIIAgAUSiMIAFAojSAAQKE0ggAAhdIIAgAUSiMIAFAojSAAQKE0ggAAhdIIAgAUSiMIAFAojSAAQKE0ggAAhdIIAgAUSiMIAFAojSAAQKE0ggAAhdIIAgAUSiMIAFAojSAAQKE0ggAAhdIIAgAUSiMIAFAojSAAQKE0ggAAhdIIAgAUSiMIAFAojSAAQKE0ggAAhdIIAgAUSiMIAFAojSAAQKE0ggAAhdIIAgAUSiMIAFAojSAAQKE0ggAAhdIIAgAUSiMIAFAojSAAQKE0ggAAhdIIAgAUSiMIAFAojSAAQKE0ggAAhdIIAgAUSiMIAFAojSAAQKE0ggAAhdIIAgAUSiMIAFAojSAAQKE0ggAAhdIIAgAUSiMIAFAojSAAQKE0ggAAhdIIAgAUSiMIAFAojSAAQKE0ggAAhdIIAgAUSiMIAFAojSAAQKE0ggAAhdIIAgAUSiMIAFAojSAAQKE0ggAAhdIIAgAUSiMIAFAojSAAQKE0ggAAhdIIAgAUSiMIAFAojSAAQKE0ggAAhdIIAgAUSiMIAFAojSCw7D3vec+bc5x//vnpWQDKoxEEsvDggw9WZ5xxxrMN3kEHHZRGRlu/fn219dZbawSBomkEgWzcfvvts24Ew+WXX64RBIqmEQSyMk4jWG9FBCiVRhDIyjiNIEDpNIJAVjSCALOnEQSyMttG0LGBABpBIDOzaQTj2EBbDAE0gkBmZmoE48zi1atXawQB/j+NIJCVuhGcKTSCABpBIDMzNXqxRfCwww7TCNILcaxq8wvKdBEXQI+8jcdEHsMkaAQZKYrNxo0b00+wfNR/NKdr9BwjSN9EvW02fWvXrk0jz4jGLy6Avssuuzw7xzUwmQSNIENuvvnmQZGJ46hguan/SM7U6PkjSt9Eztb5O9UX8fgSE1u063nymPnSCDIkGsC6yNj9wHJT564tfiw3s2kEQzSDsZu4nqtOMx8aQVqioNTFJcK11lhu6tzVCLLczLYRDM2tgt3dyDAOjSAt0fjFN83622b8G98+Ybmo/ziO0wjGH1VYauM0gs09N76wMx8aQZ5V726IotIsMnGAMiwXdd7OthFcv36942HphXEaweZJI3FcN8yVRpBnRcNXbwFs7iKOggPLQeRunbezaQTjD2jkfDSDsNRm2wjGruBx8hymoxHkWdHwNc9Aax6DMtO3U1hq0QQ2t2RHgzfVQfQxt/7iEwF90GwER+2JiTrczPF99tlnkMswHxpBBmKLSBSW5h/OKDp1wXEMFX1W5+lcwm5h+qLZCM4U8pZJ0QgyEAVoVGGJb5x14XGJAoCFM92u4ai/sZWwOSf24jisgfnSCPLsBaRHNXpReOqi4xsowMKZrhFsatbliFG7kWG2NIIMGrwoQFOpz06rTyQBYPJm2wiGqNv1XLWZ+dAIFi62AtbFZDbhwqUAC2OcRrDekzPb+TAVjWDh4pqBcRzgdOKbZl1sXEoGYGGM0wiGeu5s58MoGsGCRYMXuxRmc3xJczeE41EAJm+cRrC7N0cjyFxpBAsWDd1sr6HW3A0x3fGEc9UsaEII0cdYaOM0grE3p55rTw3zoREsWPcC0jNpXkpm0t8+6+cVQoi+xkKbbSNY3xGnnusSMsyHRrBQ9S2Kxmnomt9AJ71VsH5eIYToeyyEqMXN14gv6dHwNcWc+H09Z7aH9sB0NIKFieMC613CUUji2L/ZXCg65jS3CI7z2NloPq8QQvQ5Jqn5BXs2EXty4ot4fJmfVP2lbBrBwjR3PTQjitFUZipUk9hN3H1OmK9bb711KK/q+OEPf5hmwcy6+QM5kdH0gkLLpN15551DeVWHi+8yjm7+QE5kNL2g0DJpsdWvm1d1PProo2kWzKybP5ATGU0vKLRMWvNC6N144okn0iyYWTd/ICcyml5QaJm02OrXzas6YBzyh5zJaHpBoWXSYqtfN6/qePLJJ9MsmFk3fyAnMppeUGhZCN28qsMxgoyjmz+QExlNLyi0TNp0WwSdNcw4uvkDOZHR9IJCy6RNd4yg6wgyjm7+QE5kNL2g0DJp0501HNcYhNnq5g/kREbTCwotkzbddQTjriMwW938gZzIaHpBoWXSpruzyPe+9700C2bWzR/IiYymFxRaJm26ew3fcMMNaRbMrJs/kBMZTS8otExabPXr5lUdV199dZoFM+vmD+RERtMLCi2TFlv9unlVx7p169IsmFk3fyAnMppeUGiZtNjq182rOs4999w0C2bWzR/IiYymFxRaJi22+nXzqo6TTjopzYKZdfMHciKj6QWFlkk777zzhvKqjqOOOirNgpl18wdyIqPpBYWWSTv55JOH8qqO3/7t306zYGbd/IGcyGh6QaFl0mKrXzev6nj1q1+dZsHMuvkDOZHR9IJCy6S9853vHMqrOlasWJFmwcy6+QM5kdH0gkLLpO29996tnNpqq61aP7vfMLPVzJsIyImMphcUWiYttvo1c2q//fZr/bxhw4Y0E6bXzJsIyImMphcUWibprrvuauXTy172suoDH/hA63cXX3xxmg3Ta+ZNBORERtMLCi2TFFv7mvn0hje8oTr//PNbvzvmmGPSbJheM28iICcyml5QaJmkSy65pJVPsTXwK1/5Sut3BxxwQJoN02vmTQTkREbTCwotk3Tssce28ikuLn3LLbe0fveKV7wizYbpNfMmAnIio+kFhZZJOvDAA1v5FPcd/r//+7/q+c9/fuv3P//5z9MjYGrNnImAnMhoekGhZZJ23HHHVj5t2rRp8Pvdd9+99fvvfOc7g9/DdJo5EwE5kdH0gkLLpGzevHkon5566qnBWPci01/60pcGv4fpNHMmAnIio+kFhZZJ+e53v9vKpVe+8pVpZPj+wx/72MfSCEytmTMRkBMZTS8otEzKFVdc0cqld7zjHWmkqtatW9caO/zww9MITK2ZMxGQExlNLyi0TMrZZ5/dyqUTTzwxjVTVDTfc0Bp7zWtek0Zgas2ciYCcyGh6QaFlUlatWtXKpUsvvTSNVNV9993XGttiiy2qJ554Io3CaM2ciYCcyGh6QaFlUvbZZ59WLv3rv/5rGnlG98xh9xxmJs18iYCcyGh6QaFlEp5++ulqyy23bOXSvffem0af8eEPf7g1fvrpp6cRGK2ZLxGQExlNLyi0TMJ1113XyqNdd901jTwnLhnTnPO6170ujcBozXyJgJzIaHpBoWUSzjzzzFYeHX300WnkObGFsDkn4qc//WkahWHdfIGcyGh6QaFlEvbff/9WHl122WVppO1Vr3pVa94111yTRmBYM1ciICcyml5QaJmvUXcU+cEPfpBG24477rjWvOOPPz6NwLBmrkRATmQ0vaDQMl/r169v5dDKlSvTyLCrr766NXfvvfdOIzCsmSsRkBMZTS8otMxX9/ZxxxxzTBoZ9vDDD7fmRsQ1BmGUbq5ATmQ0vaDQMl/77rtvK4euuuqqNDLafvvt15p/5ZVXphFoa+ZJBORERtMLCi3z8dBDDw3l0P33359GRzvllFNa81evXp1GoK2ZJxGQExlNLyi0zEf3mL/Z3EP4q1/9ausxe+65ZxqBtmaeREBOZDS9oNAyH92zgE844YQ0MrXHHnus9ZiIu+++O43Cc7p5AjmR0fSCQst8zPW6gG9+85tbj/vc5z6XRuA5zRyJgJzIaHpBoWWu5nOnkD/+4z9uPe7ggw9OI/CcZo5EQE5kNL2g0DJXl19+eSt3xrl38E033dR6bMQ999yTRuEZ3RyBnMhoekGhZa4OPfTQVu6cfvrpaWR2Xvva17Yef8EFF6QReEYzPyIgJzKaXlBomYsf/ehHQ7nzzW9+M43Ozp//+Z+3Hj+bM44pSzM/IiAnMppeUGiZizVr1rTyZi5N3CSaSfLWzQ/IiYymFxRa5qK7W/f8889PI+Pp7l4+/vjj0wioT+RNRtMLCi3juvnmm4fyZq7XAbziiitaz/Nrv/ZraQTUJ/Imo+kFhZZxxUkhzZx5+9vfnkbmZquttmo932yvRUj+mnkRATmR0fSCQsu4dt5551bOzPdi0L//+7/fer7DDz88jVC6Zl5EQE5kNL2g0DKODRs2tPLlRS96UfXEE0+k0bm5/vrrW8/5/Oc/v3rkkUfSKCVr5kUE5ERG0wsKLeM46qijWvny/ve/P43Mzx577NF63rVr16YRStbMiQjIiYymFxRaZuvJJ58cbAFs5svXvva1NDo/Z599dut5f+u3fiuNULJmTkRATmQ0vaDQMltxLGAzV3baaac0Mn+33XZb67kjbrnlljRKqbo5ATmR0fSCQstsxdnBzVw57bTT0shkxFbA5vPHSSSUrZkPEZATGU0vKLTMxl133TWUK3E9wUn6/Oc/P/Qad9xxRxqlRN18gJzI6AnZuHFjddhhhz1bKLbeeutq9erV1e23355mMJ1mkY2AUeKOH808iTuLLISVK1e2XucjH/lIGqFEzVyIgJzI6AmIhq9bKOqIhnDSWyxy1F1u0PXjH/+42mKLLVp5cumll6bRyfrrv/7r1utE3HvvvWmU0nRzAXIio+cp7m3aLRLdiGbwwQcfTI9glO4yg67unUTigtILaZdddmm93qmnnppGKE0zDyIgJzJ6HqK5iyYvmsG60YtdxPvss89Q4XA9sul1lxc0xYWdV6xY0cqRNWvWpNGFcckll7Re74UvfGH10EMPpVFK0syDCMiJjJ6HaO4uv/zy9NNz4rjAaBCbheOggw5Ko4zSXFYR0NS9vt/222+fRhbWy1/+8tbrnnXWWWmEkjRzIAJyIqPnYboTQbrHDWoEp9dcVhFQiwtIb7PNNq38OO+889LowvrTP/3T1ututdVW1ebNm9MopWjmQATkREYvkO6xg/HzVKKhjMaxeUxS7F4+44wzho4tbD5nHXWTuX79+tZu6TiLuXmiSvx388zmmBuP6YP6PdUBtQsuuKCVG7G1/fHHH0+jC+sXv/hFte2227Ze/5Of/GQapRTN9R8BOZHRC6TbCE515nDsWq7nxPGF0fhFY1f/Lv7oNbc8xnj3IPaYP9WZy/WJKs3X6Ua87lLrvieo7bDDDq3cWOzds+ecc07r9bfbbrvq6aefTqOUoLn+IyAnMnqBNJu5qXYLRwNWz4mtf7WZtiY2n7uO2LoXDWM0fd2TVWJ+NI91w9fcKhgRPy+15vuJgHDxxRe38iJO2Hj44YfT6OJ49NFHq1/+5V9uvY+LLroojVKC5rqPgJzI6AUQzVizaEy1NbC5Za+5i7a5VTDmdB/fbQRjTjym1m0ku1sVmw1oPb7Umu8nAsKuu+7ayouluoTLmWee2XofO+64YxqhBM11HwE5kdELoLkbdqrLxkTj1yws4+ye7TaC8XNTtxHsjncbwYil1rf3w9Jbt27dUF4s1UWdH3jggeqXfumXWu/lE5/4RBold831HgE5kdETFlvmYgtbFIs4bm8qsSu4WVg0gv16Pyy9vfbaq5UTS32bt5NOOqn1fiL++7//O42Ss+56h5zI6AmrG7xu89XVbeY0gv16Pyyt7rGBEXfccUcaXRpxUetf+ZVfab2n3/3d302j5Ky5ziMgJzJ6guoGK07WaB6zN0q3mRvnziMaQXIW9xR+yUte0sqHD33oQ2l0aY3aXX3VVVelUXLVXeeQExk9IfUu4amawDhZo3l27nzO3NUIkrOjjz66lQtxpvA999yTRpfegQce2Hp/u+22WxohV831HQE5kdETEs3WdE1gjEeDVostgN3i0jyzdzoaQXK1YcOGoVy48MIL02g/fOtb3xp6j83LP5Gf7vqGnMjoCeg2XlNFNGC15kkldYzaKhjzun9kNILkqnsNzP322y+N9MvJJ5/cep8RN910UxolN911DTmR0fPUvQzMdNHdWjiqgYxmsN4yGA1b/GFsNpBBI0iOureSi7juuuvSaL/Ered22mmn1ns9+OCD0yi5aa7nCMiJjJ6HaNi6W/Wmirjo8yhT3RouIp47rknYFK/ZvBB1RPOC0vFv9/jDiOZu51GvudT3HO6+H8py1113VS94wQtaOdCXE0Sm8sUvfrH1fiP+9m//No2Sk+56hpzI6Hno7saaLqY7GSSasGbzFo1dNGujjhlsPmc3QndrYTNiS+B047Elcal03wtlWbVqVWv9x5eguIhz3x166KGt9x33Rd68eXMaJRfNdRwBOZHR9IJCW65rrrlmaP1/6lOfSqP9tmnTpqH3/tGPfjSNkovuOoacyGh6QaEtV/cOIm95y1vSyPLwsY99rPX+I77xjW+kUXLQXb+QExlNLyi0Zfr4xz8+tO6XYxO1cuXK1mfYc889q8cffzyNstw1120E5ERG0wsKbXlG7VZd6vsJz9WXv/zloc/yvve9L42y3HXXLeRERtMLCm159t9//9Y633777auf/exnaXT5iSa2+Xki1qxZk0ZZzrrrFXIio+kFhbYscUJFd51/5jOfSaPLV7e5jeheB5Tlp7tOIScyml5QaMtx2WWXDa3vI488Mo0ub7G7e8WKFa3PFscLPvbYY2kGy1FzfUZATmQ0vaDQluH73//+UKMUJ1rk1Ch9/vOfb32+CMcLLm/d9Qk5kdH0gkJbhje96U1D6zrHXaejdn07XnD56q5LyImMphcU2vydcMIJQ+s55+bojW9849Dndbzg8tRdj5ATGU0vKLR5G3Vf3iOOOCKN5umWW25xvGAmmuswAnIio+kFhTZft912W/XiF7+4tX732GOPIu7JO+rEGMcLLj/ddQg5kdH0gkKbr7hlXHf9fv3rX0+j+Rt1vOBFF12URlkOuusPciKj6QWFNk8nnnji0LotsQkadbzgZz/72TRK33XXHeRERtMLCm1+vvCFLwyt1/e+971ptCyjjheM+MpXvpJm0Gfd9QY5kdH0gkKbl/Xr1w+t0913331Z30Juvq6++uqhZbLllltW119/fZpBX3XXG+RERtMLCm0+brzxxpFbvzQ8VfU3f/M3Q8tl2223rf7zP/8zzaCPuusMciKj6QWFNg+33nprtcMOOwytz7Vr16YZXHjhhUPLZ7fddqvuvvvuNIO+6a4vyImMphcU2uXvvvvuq/baa6+hdXnuueemGdTOPPPMoeW07777Vo8++miaQZ901xXkREbTCwrt8vaLX/xi5Jmxp5xySppB17HHHju0vA488MA0Sp901xPkREbTCwrt8vaud71raB1+8IMfTKNMZdWqVUPL7bDDDkuj9EV3HUFOZDS9oNAuX+9///uH1t/v/M7vpFFmcsghhwwtvw9/+MNplD7orh/IiYymFxTa5en4448fWndvfetb0yizEfcefv3rXz+0HE877bQ0g6XWXTeQExlNLyi0y8/HP/7xofW29957Vw8//HCawWzde++91Z577jm0PFevXp1msJS66wVyIqPpBYV2efm93/u9oXW20047Vbfffnuawbg2bdpUbb/99kPL1TGDS6+7TiAnMppeUGiXj1FbAl/60pdW3/72t9MM5urf/u3fqu22225o+R5wwAHVI488kmax2LrrA3Iio+kFhXZ5GHVMYMS1116bZjBf//Vf/1XtscceQ8v4N37jN6o77rgjzWIxddcF5ERG0wsKbf+NOjs44qqrrkozmJQ4ZvANb3jD0LLeeeedq+985ztpFoulux4gJzKaXlBo+ysuFj3qOoGxO9iWwIXz+OOPV+94xztGLvd/+qd/SrNYDN11ADmR0fSCQttPcdu4N73pTUPrJ04McUzg4jjyyCOHln/ElVdemWaw0LrLHnIio+kFhbZ/br311pH3Do5LxDg7eHF99KMfHVoPEZ/+9KfTDBZSd7lDTmQ0vaDQ9suNN95Y7bDDDkPr5W1ve5vrBC6RUWdrR3ziE59IM1go3WUOOZHR9IJC2x9f/epXqxUrVgytE7eNW3qXXHLJ0HqJiGsN/uQnP0mzmLTu8oacyGh6QaHthy984QtD6yLigx/8YJrBUvviF784ch3tsssuTiJZIN1lDTmR0fSCQrv0TjzxxKH1EHHKKaekGfTFP/7jPw7OHh61vs4999w0i0npLmPIiYymFxTapXPbbbdVb3nLW4bWQYSmor/+53/+Z3DM5qj19u53v7t64IEH0kzmq7t8IScyml5QaJdG7GZ88YtfPLT8Iy699NI0iz479dRTR66/HXfccbDlkPnrLlvIiYymFxTaxXfCCScMLfeI3Xffvbr++uvTLJaDv/u7v6u22WabkevzT/7kT9Is5qq7TCEnMppeUGgXz/e///2RF4mOeO9731v97Gc/SzNZTu68887qoIMOGrleDz300OrHP/5xmsm4ussTciKj6QWFdnFcdtllIy8NE3HRRRelWSxnf/iHfzhy/b785S+v/uEf/iHNYhzdZQk5kdH0gkK78Ka6O8Uee+xRff3rX0+zyMGXv/zlarvtthu5vuNSQLYOjqe7DCEnMppeUGgXzqZNm6r9999/aBlHHHHEEdXmzZvTTHLygx/8oDrkkENGrveXvOQl1cUXX5xmMpPu8oOcyGh6QaFdGFPdlixizZo1aRY5O+uss0au/4j4guDEoJl1lxvkREbTCwrtZF1zzTXVXnvtNbRcI1auXFlt3LgxzaQE1157bbXvvvuOzIeIP/iDP3AP6Wl0lxfkREbTCwrtZMSZo6tWrRpannUceeSR1WOPPZZmU5o/+7M/q174wheOzI1tt922Wrt2bZpJU3dZQU5kNL2g0M7fBRdcUL3gBS8YWpYR22+/ffWZz3wmzaRk99xzz+ALwag8iXjrW99a/fu//3uaTeguI8iJjKYXFNq527BhQ7XPPvsMLcM6jjvuONcGZEhcSubVr371yJyJiLPM77///jS7bN1lAzmR0fSCQju+uATI0UcfPbTs6njzm99cfeMb30izYbRPfvKT1RZbbDEyh1760pdWf/RHf1Q9+OCDaXaZussFciKj6QWFdjxx6Y+4BEh3uUVsvfXW1ac+9ak0E2b2v//7v9V73vOekfkUEYccnHTSSYNL0pSouzwgJzKaXlBoZ2fdunVTng0c8aEPfah64IEH0mwYz9VXXz04q3xUbtVxzDHHVLfddlt6RBm6ywByIqPpBYV2erEFcNdddx1aTnXst99+1XXXXZdmw/ycc8451cte9rKRuVbHBz7wgermm29Oj8hb97NDTmQ0vaDQDnvyyScHZwLvsMMOQ8unjrgUyIUXXpgeAZPz1FNPDS4384pXvGJk7tVx+OGHVzfeeGN6VJ66nxlyIqPpBYX2OY888sjgjiDbbLPN0HJpRuwGjkuBwEL7q7/6q2r33XcfmYd1vOtd76r++Z//OT0iL93PCjmR0fSCQvvMWcCnn356tWLFiqHl0YyPfOQj1R133JEeBYvns5/97LSXnIn49V//9cGZyLfffnt61PLX/YyQExlNL5RcaO+6667q+OOPn/ISHhGxC/jUU0+t7r333vQoWDpXXHFF9frXv35krjbjgAMOGFzI/Oc//3l65PLU/VyQExlNL5RWaOP4v8997nPV29/+9qHP3oy4FMxZZ53lPrD0UtzT+m1ve9vI3G3GlltuWR1xxBHV3//936dHLi/dzwM5kdH0QimF9mtf+1p11FFHVS960YuGPnMz4pZw5513XvX444+nR0J/XXvttdW73/3ukbncjTj56cQTT6y+9a1vpUf3X/czQE5kNL2Qc6GNS2ycdtpp1c477zz0ObsRc9asWZMeCctLXMPyL//yL6v9999/ZH534zWveU11/vnn9/4yNN33DTmR0RnauHHjUOGaKmLX40EHHVStXr26uvzyy5fsVlLd97Xc/ehHPxo0dK997WuHPtuoiHmXXnppejQsf5s2bRrcnu6Vr3zlyJzvxq/+6q9Whx12WPXpT3+6uuWWW9Kz9EP3vS6FqOtRp7v3FY+f4/fr168fzIvGuv5vmA2NYMbirL1ddtnl2YIRDV8Uk6b4+Ywzzhg0hDEn/o1Cstjq91jHchQnckQzfeihhw59nlGx0047DbYUlnJRXsr1L//yL4PLHcW9i0f9vzAq4vqF73vf+wYnm8Qt8JZS970tpqgPUbvjdePfaPKaX9hjPGp2XcMjlqKGs3xpBDMXBWE2xSEKS11sIuJb5mJuHaxft47l4KGHHhrckuu4446rXvWqVw19hlERxwbGMYJxrCCUaJwvS82IO+scffTR1WWXXbbo18/svpfFEsuqbvDiv6cT9breWqgRZBwawczNthGsxa6Zen40houlfs06+mjz5s2Db+Mnn3xyte+++w695+kizg6Os4SfeOKJ9GxQtrhu5l/8xV8MmsLm1qzZxm677VYdcsgh1QknnFCtXbt2sNXxhz/8YXr2yeq+9mKIWlO/Xny+2YhmMPYCaQQZh0Ywc+M2glFImkV5pm+hk1K/Xh198PTTTw/u33vmmWdWb3zjG4fe40xRHwh/9913p2cEpvIf//Efg/9fDj744Bkvqj5dxO7n3/zN3xxcribu0BPXPLzpppsGX+TmqvsaC61Zh6OxG0fU7PhCD7OlEczcuI1giEJSP2bcIjRX9evVsZjiD8R3v/vdwR+Ms88+u1q1atVgF0tc+6z7vmaK173udYO7g3zzm99Mzw7MxQ033FCdc845g+sUzuX/xVGx4447Di5y/Z73vKc69thjB9fovPjii6svfelL1YYNG6pvf/vbg5Nc4pjE2P183333VT/5yU+Gnid+t5Di5I/6tebyZTweD7OlEczcXBrB+DZaPyZiMc5Aa75exEKIO3hEsb/kkksGfwQOPPDAwR+G7muPE7HVL3ZNxYV1f/rTn6ZXAibpqaeemtfW+YWIhdLdK5PTrfroJ41g5ubSCIbmiSPjPG6u6teqI471iYL46KOPPntcXfwbP8fvY/zOO++sbr311up73/veYOtBnLixbt26wYWYTzrppMFJGe985zurvffee167mpqxcuXK6phjjqmuuuqq6v777x+8L2BxPfbYY4PdvVdeeeVg92/sBo7jdsc5K3m+sVCaxwYu1h4ZyqYRzNxcG8HFPmmkfi0hhFgOsVCaNXsxT9ijXBrBzM21EVzsYlS/lhBC9D222mqrVLkmb6mu3EC5NIKZ0wgKIcRkYyFFva1fRyPIYtAIZm6ujWDzW+liXIqgfi0hhOh7LKS401P9OhpBFoNGMHNzbQSb97Mc53EAzF1cPLquvVGHYaFpBDM3l0awe/kY98IFWBxRb5v1N+oxLCSNYObm0gguxQWlAXhG1N26Bi/W3Z0ol0Ywc+M2gt2LmW7cuDGNALAYutcSHHerYBxnaEsis6URzNy4jWDzJJEoJgAsvuZt5sa5ZVzMtRWRcWgEMzfbRjC+PTYvW+BelQBLq9kMxpf06W43FzVcE8hcaAQzFkWjeaxJNHqxq7e5yyB+ji1/9e7gmL8Y9xYGYGbxBb55uE7d7EXtjoj/jt+p3cyVRjBDURzqojFTRIGJBjGaQUUEoH/iy3tcViZqdbMprOt3jDkmkLnSCAIAFEojCABQKI0gAEChNIIAAIXSCAIAFEojCABQKI0gAEChNIIAAIXSCAIAFEojCABQKI0gAEChNIIAAIXSCAIAFEojCABQKI0gAEChNIIAAIXSCAIAFEojCABQKI0gAEChNIIAAIXSCAIAFEojCABQKI0gAEChNIIAAIXSCAIAFEojCABQKI0gAEChNIIAAIXSCAIAFEojCABQKI0gAEChNIIAAIXSCAIAFEojCABQKI0gAEChNIIAAIXSCAIAFEojCABQKI0gAEChNIIAAIXSCAIAFEojCABQKI0gAEChNIIAAIXSCAIAFEojCABQKI0gAEChNIIAAIXSCAIAFEojCABQKI0gAEChNIIAAIXSCAIAFEojCABQKI0gAEChNIIAAIXSCAIAFEojCABQKI0gAEChNIIAAIXSCAIAFEojCABQKI0gAEChNIIAAIXSCAIAFEojCABQKI0gAEChNIIAAIXSCAIAFEojCABQKI0gAEChNIIAAIXSCAIAFEojCABQKI0gAEChNIIAAIXSCAIAFEojCABQpKr6f/E3MvG2MFIPAAAAAElFTkSuQmCC | In rectangle ABCD, the length of BC is () cm. | A. 4; B. 3; C. 2; D. 1; E. No correct answer | C |
105 | iVBORw0KGgoAAAANSUhEUgAAAm0AAAEnCAYAAAD7IHQpAAAAAXNSR0IArs4c6QAAAARnQU1BAACxjwv8YQUAAAAJcEhZcwAAFiUAABYlAUlSJPAAACQLSURBVHhe7d0JrFTV/cBxJdQosRYCllKMQAAJYqpYCi64VANEsEpiW0SQiKRaCkHZl9IqWmVpoRRqhRJrFZWlCUraZ8XSFsGWalSoKQhtWY0oq4iyKc39/3/jOXruuffN8t55M/Ob+X6SX+C9c2Z59/7mzO9u554WAQAAoOxRtAEAAChA0QYAAKAARRsAAIACFG0AAAAKULQBAAAoQNEGAACgAEUbAACAAhRtAAAAClC0AQAAKEDRBgAAoABFGwAAgAIUbQAAAApQtAEAAChA0QYAAKAARRsAAIACFG0AAAAKULQBAAAoQNEGAACgAEUbAACAAhRtAAAAClC0AQAAKEDRBgAAoABFGwAAgAIUbQAAAApQtAEAAChA0QYAAKAARRsAAIACFG0AAAAKULQBAAAoQNEGAACgAEUbAACAAhRtAAAAClC0AQAAKEDRBgAAoABFGwAAgAIUbQAAAApQtAEAAChA0QYAAKAARRsAAIACFG0AAAAKULQBAAAoQNEGAACgAEUbAACAAhRtAAAAClC0ASgLp512Wp1j5syZ5lkAoHJRtAEoGwcOHIimTJnyWTHWp08f05KupqYmatasGUUbgKpA0QagrGzbti3vok0sWbKEog1AVaBoA1B2Cina7N45AKh0FG0Ayk4hRRsAVAuKNgBlh6INAJIo2gCUnXyLNs5lA1BNKNoAlJ18ijY5l409cQCqCUUbgLKTq2iTK0yHDx9O0QagqlC0ASg7tmjLFRRtAKoJRRuAspOrKJM9bQMGDKBoQ1mQcyvdjYlsIZNBS97KYySPgUJQtFUwGRjWrVtnfgL0sF9w2YoyzmlDuZHx1i3QFixYYFo+JUWaTAbdvn37z/owxyAKQdFWoTZu3JgZEOS8H0Ab+4WWqyjjCw/lRnLW5m9tG82ywSF7im0/8hj5omirUFKs2QGBXfDQxuYue9KgTT5Fm5DCTQ6V2r6M08gHRVsFkg+/HQgkmMsK2tjcpWiDNvkWbcLd2+YfSgXSULRVICnSZAvObsXJv7JVB2hhv8gKKdrkCxAotUKKNveICBvXyAdFW4Wxu9xlAHAHBDn5FdDC5m2+RVtNTQ3nb6IsFFK0uRckyHnIQC4UbRVGijO7Z809TCqDA6CB5K7N23yKNvmyk5yXwg0otXyLNjkcWkieA4KircJIceZeieSeM5Frqw8oNSnY3D3EUozVdoK29LUbKRJAOXCLtrQjHDIOuznerVu3TC4D+aBoqyCyp0EGAfdLTgYIOzhwzg/Kmc3TugSHRlEu3KItV5C3KBRFWwWRwSJtEJAtOTtIcFk5ADScbIdHZfyVvW9uHzk6wqF95IuirULYyXTTijIZJOwAwZYdADScbEWbyx2XJdIOpQI+irYKIcWYDBa1sVcp2YsUAADh5Vu0CRm3bV/GZuSDoq0CyN41+8HPJ5jEEQAaRiFFmz1Ckm9/gKKtAsicbHLeWjayBWcHBqb/AICGUUjRJmzffPujulG0KSfFmOxWz+d8CHdXPOdPAEB4hRRt/lESijbkQtGmnBRf+c5R5e6Kz3b+W125gw9BEEQ5RkMrpGiToyS2L0dAkA+KNuX8yXRzcaf/CL1VZ5+XIAiiXKOh5Vu02Tt52L5M+4F8ULQpZm+DUkjx5W7Zhd7bZp+XIAii3KMhyFjsvoZsUEtx5pI+8nvbJ9/TWwBB0aaQnMdmD4vKh17OVctn0lzp4+5pK+Sx+XCflyAIopwjJHdjOJ+QIySy0Swb3qHGX1QHijaF3N3vbsjAUZtcg0qIQ6X+cwL1tWXLlkRe2XjnnXdMLyA3P38AjchcBMOgiNB27NiRyCsbTESKQvj5A2hE5iIYBkWEJnvT/LyyceTIEdMLyM3PH0AjMhfBMCgiNHdSaD9OnDhhegG5+fkDaETmIhgGRYQme9P8vLIBFIL8QSUgcxEMgyJCk71pfl7ZOHnypOkF5ObnD6ARmYtgGBTREPy8ssE5bSiEnz+ARmQugmFQRGjZ9rRx9SgK4ecPoBGZi2AYFBFatnPamKcNhfDzB9CIzEUwDIoILdvVozKHG5AvP38AjchcBMOgiNCyzdMmd0sA8uXnD6ARmYtgGBQRWrY7Irz55pumF5Cbnz+ARmQugmFQRGjZ7j26du1a0wvIzc8fQCMyF8EwKCI02Zvm55WNFStWmF5Abn7+ABqRuQiGQRGhyd40P69sLFq0yPQCcvPzB9CIzEUwDIoITfam+XllY/r06aYXkJufP4BGZC6CYVBEaLI3zc8rG+PGjTO9gNz8/AE0InMRDIMiQpsxY0Yir2wMHTrU9AJy8/MH0IjMRTAMight/Pjxibyy8a1vfcv0AnLz8wfQiMxFMAyKCE32pvl5ZeOSSy4xvYDc/PwBNCJzEQyDIkK76aabEnllo0mTJqYXkJufP4BGZC6CYVBEaF27do3lVNOmTWM/c/9R5MvNGwlAIzIXwTAoIjTZm+bmVI8ePWI/r1q1yvQEsnPzRgLQiMxFMAyKCGnnzp2xfDr33HOjO++8M/a7efPmmd5Adm7eSAAakbkIhkERIcleNDefrrzyymjmzJmx340YMcL0BrJz80YC0IjMRTAMighp/vz5sXySvWzPPfdc7He9evUyvYHs3LyRADQicxEMgyJCGjlyZCyfZKLdzZs3x353/vnnm95Adm7eSAAakbkIhkERIfXu3TuWT3If0v/973/R6aefHvv9Rx99ZB4B1M7NGQlAIzIXwTAoIqQ2bdrE8mnTpk2Z33fq1Cn2+9dffz3zeyAbN2ckAI3IXATDoIhQjh49msinTz75JNPmT7j7zDPPZH4PZOPmjASgEZmLYBgUEcobb7wRy6ULLrjAtCTvR3r//febFqB2bs5IABqRuQiGQRGhLF26NJZLN954o2mJokWLFsXaBg4caFqA2rk5IwFoROYiGAZFhDJt2rRYLo0dO9a0RNHatWtjbZdeeqlpAWrn5owEoBGZi2AYFBHKoEGDYrm0cOFC0xJFe/fujbU1atQoOnHihGkF0rk5IwFoROYiGAZFhNKtW7dYLv31r381LZ/yryDlHqTIxc0XCUAjMhfBMCgihFOnTkWNGzeO5dKePXtM66fuvvvuWPvkyZNNC5DOzRcJQCMyF8EwKCKE1atXx/KoQ4cOpuVzMs2H2+fyyy83LUA6N18kAI3IXATDoIgQpk6dGsujYcOGmZbPyZ43t4/EBx98YFqBJD9fAI3IXATDoIgQevbsGcujxYsXm5a4iy++ONZv5cqVpgVIcnNFAtCIzEUwDIqor7Q7Ibz99tumNW7UqFGxfqNHjzYtQJKbKxKARmQugmFQRH3V1NTEcqhLly6mJUluIO/27dq1q2kBktxckQA0InMRDIMi6su/RdWIESNMS9KhQ4difSVkDjcgjZ8rgEZkLoJhUER9de/ePZZDy5cvNy3pevToEeu/bNky0wLEuXkiAWhE5iIYBkXUx8GDBxM5tG/fPtOabsKECbH+w4cPNy1AnJsnEoBGZC6CYVBEffjnqOVzT9Hnn38+9pgLL7zQtABxbp5IABqRuQiGQRH14V8NOmbMGNNSu2PHjsUeI7Fr1y7TCnzOzxNAIzIXwTAooj7qOu/aNddcE3vcE088YVqAz7k5IgFoROYiGAZF1FV97nDw4x//OPa4vn37mhbgc26OSAAakbkIhkERdbVkyZJY7hRyL9ENGzbEHiuxe/du0wp8ys8RQCMyF8EwKKKu+vfvH8udyZMnm5b8XHbZZbHHz5o1y7QAn3LzQwLQiMxFMAyKqIt33303kTuvvPKKac3Pz3/+89jj87nyFNXFzQ8JQCMyF8EwKKIu5s6dG8ubuhRcIQo/VDY/PwCNyFwEw6CIuvAPbc6cOdO0FMY/xJrPlCGoHm5uSAAakbkIhkERhdq4cWMib+o6z9rSpUtjz/PVr37VtACMT6gMZC6CYVBEoeSCAzdnbrjhBtNSN02bNo09X75zvaHyuXkhAWhE5iIYBkUUql27drGcqe/EuN///vdjzzdw4EDTgmrn5oVEsW3bti1zb9xmzZp99h4GDBgQrVu3zvQAcuObFcG4A6IEkM2qVati+XLWWWdFJ06cMK11s2bNmthznn766dHhw4dNK6qZmxcSxeTPQ+iHtAP54JsVwfgDEZDN0KFDY/lyxx13mJb66dy5c+x5Fy5caFpQzdyckCgW2ZPmv3ZasMcN+eCbFcH4gxBQm5MnT2b2rLn58sILL5jW+pk2bVrseb/5zW+aFlQzNyckiqVPnz6Zw6ByeFTIv/Kz/37kd0AufLMiGH8QAmoj5665udK2bVvTUn9bt26NPbfE5s2bTSuqlZ8TxSBXR8t5bGm6detWkvcE3cgSBMMAhHzJVaJurkyaNMm0hCF719znlwsUUN3cfJAohgMHDmQiTdp5bkAuZAmCYQBCPnbu3JnIFdkjEdKTTz6ZeI3t27ebVlQjPx9KzT/XTQ6j1kYKP5l02t071759+8xePP+zI8/jPq8NIX3dQ7PyfDU1NZk2Ia/jXuEqr1HXya7RMPhmdciHyE1oSVxJYHsuArKzy80GkGb06NGxPJE7IjSELl26xF7nnnvuMS2oRm4uSJSaX7QtWLDAtMRJoWWLKFtATZkyJfZYt/ASaefMZbuCVd6L+zp+ULiVD75ZDSnO0pJVQhI59J6ASuQvN8D33nvvRY0aNYrlSUNd3fnrX/869joSe/bsMa2oNn4ulJoUQva9yHdM2mFU+Z0tpGSvmJVrL5373DbkeeRxwv++k+eWvWq2cJR/3XZ5LMoD36z/Ly3B/ajtQ4XP+csM8Pl3QJDJdRuSfBG5rzdx4kTTgmrj5oFEqbmHOmvby+YWV7J3zWX3tsl3kz/PW9p3mrvjwS/6JPy9dX47Oy7KQ9V/s9otGUlyW5RJQrsfKBu1fbDwKX95AS6Z5LZJkyaxHJk7d65pbRjz58+Pvd6ZZ54ZHTx40LSimrh5IFFKcsqNfR+1TfUh30fu+5XvqHylFW2utKLN57fbvXQorar/ZpVCLG02avlQSTHnJm22E0VB0Ybs/PnTWrVqZVoa1nnnnRd73fvuu8+0oJq4OSBRSvZiAdk5UNsRHNnz5b5fijaIqv9mzXaRgX/cn6ItO3dZSQCWTKbbvHnzWH7MmDHDtDasn/70p7HXlZvKHz161LSiWrg5IFEqthjLdcqNX3hRtEHwzZpFIR8aKf6kyHPPoZGtKDnvwP9gus9pwxaE8oF2D83KrnP3XAL5f7ZLtkvJvicbgDVr1qxYbsgX1vHjx01rw/r444+jFi1axF7/4YcfNq2oFu76lygF+S6Q3JfIdY6Y//1T22HUNBRtlYtv1iz8xK/tQ+ZeSi2JLR9Mu/tbQj6g7h49afdPkJb+tV3BarfIcl2yXWr+ewKs1q1bx3Kj2IcoH3zwwdjrt2zZMjp16pRpRTVw179EKcg4n61gk41wqz5XcFK0VS6+WbNwCy+7J8znJr97dY//oZGfXe5z25APrBR3UqC5e9skpL8UevaD48/DU8hWWENx348EIObNmxfLC7kY4NChQ6a1OI4cORJ98YtfjL2POXPmmFZUA3fdSxSbfAfUVrDJmC/fH+73jPTz33Pa+ddpKNoqF9+stZAPkZuwtW0ZuXvM3MOU8nhbmEkf//F+0SZ95DGW/6Hz99b5H7pCtsIaivt+JADRoUOHWF6UatqNqVOnxt5HmzZtTAuqgbvuJYoprUhKi1wb9/73hCVHaVwUbZWLb9ZauIcia5vqw7+6p5Ck9j+M7haW8D90fns+H7piK7f3g9JbtGhRIi9KNcHt/v37oy984Qux9/LQQw+ZVlQ6d71LFItsbMtGtf/6aeGfn5w2zstRGPtdI88tR1n8Yo+irXLxzZpCtmTsh8zfgnHZyQ3rktQUbagGF110USwnSn0rqXHjxsXej8S///1v04pK5q/3YvFPdckW7tEUK9u5zBLuaTlCvr/802ck3KM9aUWde+g17TX910Fp8M2awhZjfqHk8wsvirbyej8oLf9cNolS37RdJvj98pe/HHtP3/nOd0wrKpm7ziWKwd+wzxbZTnGRgkt2INidCfKvFGZp3zn+d4sb0j+tYLMhbdna/e8hFB/frB5bDMnWUdq5Ay7/w1HIHRP8x/ofBoo2aCb3GD3nnHNi+XDXXXeZ1tJKO2S7fPly04pK5a9zQCMy12EPi9ZWsNnzByx/F7TblgtFGyrZsGHDYrkgV4zu3r3btJZe7969Y++vY8eOpgWVyl3fEoBGZK5DCqNsBZu0SzFl+fPoSKSdk5CGog2VatWqVYlcmD17tmktD6+++mriPXLOTmXz1zegEZlrZDuO74YUS5bdM+e2p+1tk37+FwJFGyqVf+J1jx49TEt5GT9+fOx9SmzYsMG0otL46xrQiMz9f/7UHdnC3wuXVuxJ4Wb3uElxJV9ibrEnKNpQifzbVUmsXr3atJYXub1V27ZtY++1b9++phWVxl3PEoBGVZ+5Ulz5e8tqC5nYME1tt5+SkOf2Z7GW13Qn5ZVwJ02Uf/3z5STcQ69pr1nqe5D67wfVZefOndEZZ5wRy4FyufigNk8//XTs/Ur89re/Na2oJP56BjSq+sz1D+Vki2wXGkjB5BZaUoRJYZV2jpv7nH4Ify+cG7KHLVu77KErFf+9oLoMGjQotv5lg0UmtC13/fv3j71vuU/q0aNHTSsqhbuOJQCNyFwEw6BYvVauXJlY/4888ohpLW+bNm1KvPd7773XtKJS+OsY0IjMRTAMitXLv/PBtddea1p0uP/++2PvX+Lll182ragE/voFNCJzEQyDYnV64IEHEuteY8HTpUuX2N9w4YUXRsePHzet0M5dtxKARmQugmFQrD5phxZLfX/Runr22WcTf8vtt99uWqGdv24BjchcBMOgWH169uwZW+etWrWKPvzwQ9OqjxSc7t8jMXfuXNMKzfz1CmhE5iIYBsXqIifr++v8scceM616+YWohD/PIvTx1ymgEZmLYBgUq8fixYsT63vIkCGmVTc55NukSZPY3ybntx07dsz0gEbu+pQANCJzEQyDYnV46623EkWNnMRfSUXNk08+Gfv7JDi/TTd/fQIakbkIhkGxOlx99dWJdV2Jhw/TDv9yfpte/roENCJzEQyDYuUbM2ZMYj1XciFz1VVXJf5ezm/TyV+PgEZkLoJhUKxsaffpHDx4sGmtTJs3b+b8tgrhrkMJQCMyF8EwKFaurVu3RmeffXZs/Xbu3Lkq7tGZdtEF57fp469DQCMyF8EwKFYuuS2Vv35feukl01r50s5vmzNnjmmFBv76AzQicxEMg2JlGjt2bGLdVmPBknZ+2+OPP25aUe78dQdoROYiGAbFyvPUU08l1uttt91mWqtL2vltEs8995zpgXLmrzdAIzIXwTAoVpaamprEOu3UqZPq21TV14oVKxLLpHHjxtGaNWtMD5Qrf70BGpG5CIZBsXKsX78+da8SxUkU/eY3v0kslxYtWkT//Oc/TQ+UI3+dARqRuQiGQbEybNmyJWrdunVifS5YsMD0wOzZsxPLp2PHjtGuXbtMD5Qbf30BGpG5CIZBUb+9e/dGF110UWJdTp8+3fSANXXq1MRy6t69e3TkyBHTA+XEX1eARmQugmFQ1O3jjz9OvUJywoQJpgd8I0eOTCyv3r17m1aUE389ARqRuQiGQVG3m2++ObEOv/e975lW1GbQoEGJ5TZgwADTinLhryNAIzIXwTAo6nXHHXck1t+3v/1t04pc+vXrl1h+d999t2lFOfDXD6ARmYtgGBR1Gj16dGLdXXfddaYV+ZB7kV5xxRWJ5Thp0iTTA6XmrxtAIzIXwTAo6vPAAw8k1lvXrl2jQ4cOmR7I1549ezI3k/eX5/Dhw00PlJK/XgCNyFwEw6Coy3e/+93EOmvbtm20bds20wOF2rRpU9SqVavEcuUct9Lz1wmgEZmLYBgU9Ujbw/alL30peu2110wP1NXf/va3qGXLlonl26tXr+jw4cOmF4rNXx+ARmQugmFQ1CHtHDaJF1980fRAff3rX/+KOnfunFjGX//616Pt27ebXigmf10AGpG5CIZBsfylXSUqsXz5ctMDocg5bldeeWViWbdr1y56/fXXTS8Ui78eAI3IXATDoFi+ZOLctHnY5JAoe9gazvHjx6Mbb7wxdbn/6U9/Mr1QDP46ADQicxEMg2J5kltTXX311Yn1IxcdcA5bcQwZMiSx/CWWLVtmeqCh+cse0IjMRTAMiuVHbv6edi9RmdaDq0SL6957702sB4lHH33U9EBD8pc7oBGZi2AYFMvL+vXro9atWyfWy/XXX888bCWSdtWuxEMPPWR6oKH4yxzQiMxFMAyK5eP555+PmjRpklgn3Jqq9ObPn59YLxIyl9v7779veiE0f3kDGpG5CIZBsTw89dRTiXUhwc3fy8fTTz+duo7at2/PBQoNxF/WgEZkLoJhUCy9sWPHJtaDxIQJE0wPlIs//vGPmatI09bX9OnTTS+E4i9jQCMyF8EwKJbO1q1bo2uvvTaxDiQoAMrXf/7zn8w5hmnr7ZZbbon2799veqK+/OULaETmIhgGxdKQQ21nn312YvlLLFy40PRCOZs4cWLq+mvTpk1mjxzqz1+2gEZkLoJhUCy+MWPGJJa7RKdOnaI1a9aYXtDgd7/7XdS8efPU9fmTn/zE9EJd+csU0IjMRTAMisXz1ltvpU6YK3HbbbdFH374oekJTXbs2BH16dMndb32798/eu+990xPFMpfnoBGZC6CYVAsjsWLF6dO5yExZ84c0wua/fCHP0xdv+edd170hz/8wfRCIfxlCWhE5iIYBsWGV9us+p07d45eeukl0wuV4Nlnn41atmyZur5l+hb2uhXGX4aARmQugmFQbDibNm2KevbsmVjGEoMHD46OHj1qeqKSvP3221G/fv1S1/s555wTzZs3z/RELv7yAzQicxEMg2LDqO3WRxJz5841vVDJ7rvvvtT1LyHFPBed5OYvN0AjMhfBMCiGtXLlytSbvUt06dIlWrdunemJavDiiy9G3bt3T80HiR/84AfcUzYLf3kBGpG5CIZBMQy5gnDQoEGJ5WljyJAh0bFjx0xvVJuf/exn0ZlnnpmaGy1atIgWLFhgesLlLytAIzIXwTAo1t+sWbOiM844I7EsJVq1ahU99thjpieq2e7duzPFe1qeSFx33XXR3//+d9Mbwl9GgEZkLoJhUKy7VatWRd26dUssQxujRo1i7jUkyPQfl1xySWrOSMjVxvv27TO9q5u/bACNyFwEw6BYOJm2YdiwYYllZ+Oaa66JXn75ZdMbSPfwww9HjRo1Ss0huSn9j370o+jAgQOmd3XylwugEZmLYBgUCyPTNci0Df5yk2jWrFn0yCOPmJ5Abv/973+jW2+9NTWfJOSw+7hx4zLTiFQjf3kAGpG5CIZBMT+LFi2q9apQibvuuivav3+/6Q0UZsWKFZmri9Nyy8aIESOirVu3mkdUB38ZABqRuQiGQTE72bPWoUOHxHKy0aNHj2j16tWmN1A/Dz74YHTuueem5pqNO++8M9q4caN5RGXz/3ZAIzIXwTAoJp08eTJzRWjr1q0Ty8eGTN8we/Zs8wggnE8++SQzRcj555+fmns2Bg4cGK1fv948qjL5fzOgEZmLYBgUP3f48OHMnQyaN2+eWC5uyKFQmb4BaGi/+tWvok6dOqXmoY2bb745+vOf/2weUVn8vxXQiMxFMAyKn14NOnny5KhJkyaJ5eHGPffcE23fvt08Ciiexx9/POs0IRJf+9rXMlekbtu2zTxKP/9vBDQicxFMNQ+KO3fujEaPHl3rtAsSchh04sSJ0Z49e8yjgNJZunRpdMUVV6Tmqhu9evXKTOr80UcfmUfq5P9dgEZkLoKptkFRzld74oknohtuuCHxt7sh03fIDb+5LyTKkdzj9vrrr0/NXTcaN24cDR48OPr9739vHqmL//cAGpG5CKZaBsUXXnghGjp0aHTWWWcl/mY35LZTM2bMiI4fP24eCZQvuSH9LbfckprLfsiFNWPHjo1effVV8+jy5/8NgEZkLoKp5EFRpkWYNGlS1K5du8Tf6Yf0mTt3rnkkoIvMEfjLX/4y6tmzZ2p++3HppZdGM2fOLPupQ/z3DWhE5papdevWJQaZ2kIOv/Xp0ycaPnx4tGTJkpLdrsZ/X9q9++67meLrsssuS/xtaSH9Fi5caB4N6Ldp06bMLbAuuOCC1Jz34ytf+Uo0YMCA6NFHH402b95snqU8+O+1FGRcl3Hav8+w/Cy/r6mpyfSTItj+H3BRtJU5uXqrffv2n324pTiTD75Lfp4yZUqmeJM+8q986IvNvkcbGslFAlL49u/fP/H3pEXbtm0ze+CqZYJSVK+//OUvmSlq5F6maZ+FtJD54W6//fbMhQxym61S8t9bMcn4IGO3vK78KwWZu3Et7TJm2zFcohRjOMofRZsC8uHN54Msg4AdGCRk662Ye93s69rQ4ODBg5nb/owaNSq6+OKLE39DWsi5bHJOm5zbBlSjQjZs3JA7ggwbNixavHhx0ecn9N9LsciyssWY/D8bGa/tXjiKNqShaFMg36LNksMTtr8UccViX9NGOTp69GhmK3f8+PFR9+7dE+85W8hVonK16IkTJ8yzAdVN5iX8xS9+kSng3L1E+UbHjh2jfv36RWPGjIkWLFiQ2Zv3zjvvmGcPy3/tYpCxxr6e/H35kMJNjq5QtCENRZsChRZt8qF3B9BcW3eh2NezUQ5OnTqVuZ/n1KlTo6uuuirxHnOFPcl6165d5hkB1OYf//hH5vPSt2/fnBNMZws5BPuNb3wjM8WI3FlE5pTbsGFDZqOrrvzXaGjuOCxFWCFkzJaNb8BH0aZAoUWbkA+9fUyhA0Zd2dezUUwymL/xxhuZwX3atGnRoEGDMocZZG4p/33lissvvzxzV4NXXnnFPDuAuli7dm3mxvUyD1xdPotp0aZNm8yEv7feems0cuTIzByI8+bNi5555plo1apV0WuvvZa5gELOoZNDsHv37o3ef//9xPPI7xqSXFhgX6suG87yeMBH0aZAXYo22cqzj5EoxpVI7utJNAS584AMzPPnz88M2L17984M4v5rFxKyN00Oz8gkox988IF5JQAhyc3r67PXuyGiofhHOyrpdmAoLYo2BepStAn3ooRCHldX9rVsyLkpMngdOXLks/PA5F/5WX4v7Tt27Ii2bNkSvfnmm5mtcrkoYNGiRZlJaceNG5c54f+mm26KunbtWq/DLW506dIlGjFiRLR8+fJo3759mfcFoLiOHTuWOeS5bNmyzCFQORQq55kWcnVqfaOhuOeyFetIB6oDRZsCdS3ain1Bgn0tgiAIDdFQ3DG7mBeDofJRtClQ16Kt2AOHfS2CIIhyj6ZNm5qRK7xSXcGPykfRpgBFG0EQRNhoSDLe2tehaENIFG0K1LVoc7f2inH5uH0tgiCIco+GJHeosa9D0YaQKNoUqGvR5t7frpDHAQDqTibStWOvjMNAKBRtCtSlaPOn/ODemABQHDLeuuOvjMdACBRtCtSlaCvF5LoAgE/JuGvH4GLdlQaVj6JNgUKLNn9ix3Xr1pkWAEAx+HO1Fbq3Tc6LYw8dfBRtChRatLkXIMgHHwBQfO6trAq5LZX0Ze8c0lC0KZBv0SZbZe6l5ty7DgBKyy3cZIM62y2tZAynYEM2FG1lTj7g7rkRUpTJ4U53t7n8LHvU7CFR6V+Me40CAHKTjW33lBVbmMnYLSH/l98xdiMXirYyJR9k+wHPFTIYSDEnhRsfeAAoP7KhLVOByFjtFnB2/JY2zmFDLhRtAAAAClC0AQAAKEDRBgAAoABFGwAAgAIUbQAAAApQtAEAAChA0QYAAKAARRsAAIACFG0AAAAKULQBAAAoQNEGAACgAEUbAACAAhRtAAAAClC0AQAAKEDRBgAAoABFGwAAgAIUbQAAAApQtAEAAChA0QYAAKAARRsAAIACFG0AAAAKULQBAAAoQNEGAACgAEUbAACAAhRtAAAAClC0AQAAKEDRBgAAoABFGwAAgAIUbQAAAApQtAEAAChA0QYAAKAARRsAAIACFG0AAAAKULQBAAAoQNEGAACgAEUbAACAAhRtAAAAClC0AQAAKEDRBgAAoABFGwAAgAIUbQAAAApQtAEAAChA0QYAAKAARRsAAIACFG0AAAAKULQBAAAoQNEGAACgAEUbAACAAhRtAAAAClC0AQAAKEDRBgAAoABFGwAAgAIUbQAAAApQtAEAAChA0QYAAKAARRsAAIACFG0AAAAKULQBAAAoQNEGAACgAEUbAABA2Yui/wN7oqEAOhyy2QAAAABJRU5ErkJggg== | In rectangle ABCD, DAE and CBE are two sectors with radii AD and BC respectively. What is the length of AB? () | A. 4; B. 3; C. 2; D. 1; E. No correct answer | A |
106 | 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 | As shown in the figure, DAE and CBE are two sectors with radii AD and BC, respectively. What is the perimeter of rectangle ABCD? ( ) cm | A. 16; B. 12; C. 6; D. 4; E. No correct answer | B |
107 | 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 | In rectangle ABCD, DAE and CBE are two sectors with radii AD and BC, respectively. What is the perimeter of rectangle ABCD? ( ) cm | A. 16; B. 12; C. 6; D. 4; E. No correct answer | B |
108 | 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 | If the height of a rectangular cuboid is increased by 4 cm, it becomes a cube. What is the shape of the base of this rectangular cuboid? ( ) | A. Square; B. Rectangle; C. Parallelogram; D. Cannot be determined; E. No correct answer | A |
109 | 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 | The base of a rectangular cuboid is a square. If the height of the rectangular cuboid is increased by 4 cm, and its surface area also increases by 128 cm², what is the side length of the base of the rectangular cuboid in cm? | A. 12; B. 8; C. 6; D. 4; E. No correct answer | B |
110 | 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 | A rectangular cuboid with a square base, if its height is increased by 4 cm, it becomes a cube. What is the original surface area of the rectangular cuboid in cm²? | A. 512; B. 64; C. 128; D. 256; E. No correct answer | D |
111 | 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 | A rectangular cuboid, if its height is increased by 4 cm, becomes a cube. At this point, the surface area is increased by 128 cm² compared to the original. What was the original surface area of the rectangular cuboid in square centimeters? | A. 512; B. 64; C. 128; D. 256; E. No correct answer | D |
112 | 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| The circumference of the circle in the diagram is () cm.(Use π = 3.14) | A. 50.24; B. 3.14; C. 12.56; D. 6.28; E. No correct answer | C |
113 | iVBORw0KGgoAAAANSUhEUgAAAkwAAAKYCAYAAACBy6f6AAAAAXNSR0IArs4c6QAAAARnQU1BAACxjwv8YQUAAAAJcEhZcwAAFiUAABYlAUlSJPAAAC06SURBVHhe7d0xcyRX9fBhEqocQubwX2UCQgIHhERABpkpEsjAEWRQJBCQOCJ15pCQyLEDPgB8AYovQBUfYd/37NnGrbu3p+dII2m6z/NU3bK1K2kljbrn17dv93zjDQAAFwkmAIAdggkAYIdgAgDYIZgAAHYIJgCAHYIJAGCHYAIA2CGYAAB2CCYAgB2CCQBgh2ACANghmAAAdggmAIAdggkAYIdgAgDYIZgAAHYIJgCAHYIJAGCHYAIA2CGYAAB2CCYAgB2CCQBgh2ACANghmAAAdggmAIAdggkAYIdgAgDYIZgAAHYIJgCAHYIJAGCHYAIA2CGYAAB2CCYAgB2CCQBgh2ACANghmAAAdggmAIAdggkAYIdgAgDYIZgAAHYIJgCAHYIJAGCHYAIA2CGYAAB2CCYAgB2CCQBgh2ACANghmAAAdggmAIAdggkAYIdgAgDYIZgAAHYIJgCAHYIJAGCHYAIA2CGYAAB2CCYAgB2CCQBgh2ACANghmAAAdggmAIAdggkAYIdgAgDYIZgAAHYIJgCAHYIJAGCHYAIA2CGYAAB2CCYAgB2CCQBgh2ACLvrnP//55rPPPnvzox/96M1HH3305hvf+Mbb/wfoRDABU3/961//F0jL+PTTT998+eWXb/7zn/+8ey+AHgQT8MDf//7390IpZphEEtCZYAL+J8JoHUoRTnFKDqA7wQS8Fafb1rH08ccfm1UCeEcwAW8+//zzB7H07W9/+82//vWvd38LgGCC5uKU2zqWYkRAAfA1wQTNxam3dSzF7BIADwkmaCxuHbCOpRh/+MMf3v3t48SpvFgPtb7SLiLsk08+efvvjeKeTut/fz0W8XHrsIvPPV65F/8ff7Z+v/j/2b8JUCWYoLFZrMRtBR5rfZXdclpvvPIu/s1xMfks3GJEfI0zYOsRfxfia44om71PjPgaAJ5CMEFTESOzuIjZoXWkLLNDeyEVM1PLx8T7LyKOlj9fxixgxveJEf92fD3xOWLM4mmJvgi0eJ/4vmbxZBE78BSCCZqazeqs77s0m7WJeJmJ912/33gabLwR5jqoFuu/X8b4723NRI3/Xnzc3vsAVAgmaGo9I7SM8TXiZoEymx0ag2icjYoIW95nHWVr649fxmgMsxjj1xzG04AxnJYDnkIwQVOz9UuzBd97p7dmtyXYO303M36OGCPBBLwWwQRNzYJpFhWz91uf3prFiWACzkYwQVPXBtPs1N36/QQT0IFggqZmC6Nni7r34mP2949ZYD1+jhgjwQS8FsEETY2vHxfjMfEx+/utq+kuGT9HjJFgAl6LYIKmZvdhWm4EuTaLj/UM0uxKulgoXjV+jhgjwQS8FsEEjUVsjGExmsXH+k7d8f+zK+mqL+A7fnyMkWACXotggsZmtwT48ssv3/1tGuNjduuBWaBERM3utxSBde2NK0eCCXgtggmaG0+pjeuP1i9HEv+/nl1axJ/NXrYkoml9+i5iLG5cOUZZGD82xvhvCSbgtQgm4G3UrE+rLafT1gvDY1ZoFkuLrWhaj/g3InpGs3VQMdaRE59/dmVfjPXnjLVZs68jQs3ryQGPJZiAtyImIlDWsRGREZEyi5wtET8RV+tYiVmg5cVxR7N1VOMIsz9fj/g8sxmocVS+F4CFYAIA2CGYAAB2CCYAgB2CCQBgh2ACANghmAAAdgimg/nvf//75t///vebf/zjH2/H3/72t7fjiy++ePOXv/zl7Yj/j/HVV1+9HfF+8THdxc/ij3/8o2EYw4htoxv7UqoE052KjTI23thof/vb37753ve+9+Zb3/rW9L4y1fHTn/70zS9/+cv/7Si77ADi+539PAyj+4ht44wiipYYsi/lqQTTnYiNOjboH/zgBzfbmKsjNv4zH20KJsOYj7MEUwRS7L/i+7llGFXH2felXQmmV7IEUhydvNZGvTdio4+v8SxHTYLJMObjyMF0Dwebe+Ns+9KuBNMLiqOfOB8eRz6zjeqaETuE//u//3v7OWLEhhgjwiumm2PE/8eIHUiMeL/4mNnnu3bE54mv/cjGYIrv6U9/+pNhtBvxu7/eFo4WTLEvjQC59b70m9/85oP3+fnPf/4s+9L42jkewfQCYlo2QqZy9BPvGxtWfFxsXPE54kgqdhRPMa6Nin+jelQWO5YjTjWPwRRPHNBR/O6vt4UjBNNyuq06K1/Zl46f99L+9lb70qMfiHYimJ5JbGixE7r2CCg2tNh44mNiY35p8fXGhh9fw+zrm4040oodxVEIJkhHCqZlX3rtzM6yL439WXVfWgmmLfExEUHVsDvSvrQrwXRjy8Z9zYYSRyRLID1mw3xOcRQWO5z4Gmdf+ziOsLELJkhHCKbYJ8Z+ZW9fGn9/q33pLYJp9Jh9qbVO90kw3ci1oRRHScuGfRSx8cYGf80R3j2Hk2CCdM/BdG0oxez9rfelzxFMa/H5KvtS4XRfBNMTXbNxx9/FFPE9ziRVxTn7mGqefZ/rcY/hJJgg3WMwXbsvjf3Pcx1wPncwrcXMU3y/639vNu5xX9qVYHqC+IW/tEYpNr44mjh6JG2J7232fS8jfjYRWPdCMEG6t2CKfemlWZeX2pe+ZDCt7c06xddlcfjrE0yPsBwJzX6xY5w9lEZ74RRHhPcwtSyYIN1LMMVM0aULTV56Xxr79dhfLeOl9+F74RQHoU7TvR7BVBSVPx6FLKNbKI32NvbXPkISTJBeO5iWg86tfWnsR+xLt/elrz0j2JVgulJsuFtHQrHRv8bRyL26NPv2mkdIggnSawZTzCptLWXoftA5ip/F7OcUI36Gz7WWiznBdIVL59fjUlG/tO/b2ynGz/SlCSZIrxVMsd1vzSrZl87Fz+TSaUtrm16OYNoRhT/bwB0JXefSEdJLTysLJkgvHUyxn9yaeV72pffgtdcwXXJpOUh83Tw/wbQhNpTYYGa/nHEkZOHd9eJnuXWEFD/LlyKYIL1kMF3a/u8tSsYguaevbbH1vGRB+PMTTBMxBbp1Ci52LPe4ER3BGCzLiJ3US0zFCyZILxVMW6fg7mlWae0IwRS2Zu7j63+N5Q5dCKZBPHFvbeD3dE+ho7r0833uaBJMkF4imLZiKWZC7vVJffx67/ng+NKBveeq5yGYVrY2cKfgbit2QlsLwp9zRyqYID13MMUMyNa+9J4j5EjBtNg63Wkx+O0Jpne2YikW0x1hozmirUWgz3V0JJggPWcwbcXSc8xi3doRgymM+7Zl3ONpzyMTTP/f1gbuyoPnt7WhP8fRkWCC9FzBNFtbE/vWo8x2HDWYQhz0r7/2ZRwhVI+ifTAd+WjoLGY72Ri33skKJkjPEUxHj6Vw5GAKW9Hk4P82WgdTbMjjBnK0Dfwstjb0W56eE0yQbh1MW7F0tMXHRw+mEIvB19/DMjyvPV3bYJpdrSWWXtdWNN3q6jnBBOmWwbR14HnEK7XOEExh9vwWw9VzT9MymOKKt/FyzKNu4Gczi6Z4bG4RTYIJ0q2CaevA86j70vF7OWowhXhs1t/LMmIfy+O0C6bYAGaXtMeUMvchdrbj4xOB+9Sdl2CCdItgOlsshVjrs7wsyr3dhfwxnvMAtKNWwRS//LN7VlgQd39mayIidJ9CMEF6ajBtHXha0nB/tqLp6DH4GloF0/iEGUMs3a/ZayZF8D6WYIL01GBy4HksswPQl3wdz7NoE0yz0zxxhKSy71ts1OPj9tgpf8EE6SnBNHvyFUv3b3YAailKTYtgiigaz7XfYk0Mz2829R+P5WNeqkYwQXpsMM3WLZ3pwPNsa5hGswNQ65mu1yKYxunj2OBdKXAcEUfrxy/GY6aTBROkxwTT1sHLmZ5wx6unz/YaovEYjsEbb3Od0wfTbPq4Mv3MfYjFpOPjWJ1OFkyQHhNMMfuy/pgYR74ibubswRRmi8Cfsja0k1MH02z6+N5fLZtts4WmlaNbwQSpGkyzNaBnXLfUIZhCh/h9DqcOpvF8bcTTWTeADiJ0xx1avH0twQSpEkyzU3FnvWCmSzCF2elVLjttMM2OiBT08c2mk6+994tgglQJpnG7iSfWs64B7RRM8b2tv9cYrna87JTBNJuJcI72PGaL+K852hVMkK4NpnhSHZc1nPlJtVMwhXGf2OF7fopTBtPsiMilk+cRcbR+fGPEJcB7BBOka4NpvHfPtQcnR9UtmGaTC4+5ArmL0wXT7Ihoa2fAcc2OjPaiWDBBuiaYZssazn6jw27BFCxfud7pgmk8IooN4MxHRJ1Vj4wEE6RrgmlcFNxh5qFjMIXZMgfed6pgihmG9YMew4tBntdsAfilWSbBBGkvmGazDh1u9ts1mOL7XH/fMTx3vu9UwTTOLlnofX7jkdGlx1wwQdoLpvGWLF32pfFziOeRZXQJpjA7O8NDpwmm+MUe1y45D3t+s1nFrZ2cYIJ0KZhms0sumjm/2cU0nkMfOk0wjU+Gcf6dHsa1FnGkNCOYIF0Kpq6zS7w/y+R59KFTBFOU8Ti75PxrH7Mj4tksk2CCtBVMs3WBHdYukWZrmcwufu0UwTQ+Eboyrp9xseZslkkwQdoKpsqawDOKm3LGvmMZHZ9Hxt8B92X62uGDKX6hxyfLZeOnj5hRXP8OzC6LFUyQZsE0m6nvNrvU9Sq5tcq60G4OH0zj6ZjY4M0u9TTu7MbTsoIJ0iyY4qaU6z/ruH5FMKXx53D2G5Ze6/DBNE4fevHAvuKxX/8ujKcTBBOkWTCNi73jz7oRTOmaGfuODh1MppBZi9+H9e9CjPUOTzBBGoPpV7/61YO3Y3SMBcGU9valXR06mMbTcS6B5NJUsmCCNAaTWwkkwfS18RYDzt4cPJjG03Edp5B56NI6DMEEaQymDz/88MHbXdesCKavOS33vsMG02zK0P0iuDSVLJggjcG0HvHE2DUUBNPXPMe+77DBNNav03Es4ndh/buxHC0LJkiXgqnr6bggmB4aT8t1P4tz2GDyQLJlDKPlCUAwQboUTOPtODoZD7a6z6iM64Q7x3Q4bDCNRwJeJJDFOJW8nHsXTJAuBVPnWRXB9NDWvrSrQwbTeCfSeBDjgYVF/E6sf0fiSUAwQdoKpjgQ7Sz2EcvLosTofkoujJMTnW/dc8hgGtcvea0bRuMp21jHJJggbQVT91MuvG+8IXDsR7s6ZDBZv8SeMY7iiUAwQdoKps7rl5izjulrhwwm65fYMzv3LpggbQWTU1CMZrcX6LoE5nDBFBv0+oGzfokt4zqm3/zmNw/eFkx0NQum7uuXQhxUWcP0vnGSouti+MMF07jg2/2X2DK+3MMvfvGLB28LJrqaBZO1oK6S2zLuS7ueuj1cMI0LvuMoAGbGxYo/+tGPHrwtmOhqFkz2pYJpy7gv7frSOYcLpvG1wrwgIFvGNUvjUZJgoqtZMHV9Ely7ZTB9+umn//s8RzdOVHRd+H24RzIeqPUD56oOtoxXd3z3u9998LZgoqtZMLl45nbB9Ne//vXB5zm6cV/adSnM4R5JN9HiWuMFAh988MGDtwUTXc2CyQLn2wTTP//5zzff/va3H3yeo5tdddzR4YPJRs6W2eWw6yGY6GoWTDw9mP7zn/+8+fjjjx98jhhnMF513PHq9EM9kuOMgctg2TMG9noIJroaF/F2nTEYPTWYPvnkkwcfv4wzuNXpyiM71CMZD9D6Aet6HpXrjRv5eggmuvr1r3/9YFv48MMP3/1Nb0+Jgs8///zBx67HGYwXzXRcDiOYOLVxI18PwURXgmnuscEU65bi/f/whz88+PhlnIFgOlgwxQO0fsDiAYRLxqsq10Mw0VXcc2m9LVjekB4TTLFu6aOPPnq7dimsP34ZZzDuSzteVSmYOLXxiWE9BBNd/exnP3uwLcQtN3jcS6PEuqW4Ku5f//rX27fXP9dlXCNuRTDeXDciLGatls+9tn6/9YjPESLkPvvss7cxt/xdfL74d9bic8c9o9bvF9/T3//+93fvkcZ9acdb+hwqmNzlm6pxcet6CCa6GmcLLG94nGXd0pdffvnuT+rBFKfzlivr4r8RMDHWARNBNoZOBNHsFGAEU8TOeGuD9YiPC5fWXcVYR5O7fQsmTk4wwft+/OMfP9gWvv/977/7G661rFuKWZy19c91GVsijNZhE59zMcZQvF9E0loEzfp9lveL/0YMhdl9oWJEWMWfL7EX/x3fJ6JtMb5yQrzdzaGCycuiUDVu5OshmOhKMD1NhEvExnL6a239c13GlvUpuHWchPFu4THWQRVmwRRjnI1av0zLMuLrHz/felZrGcvpQMEkmDg5wQTvE0xzsb9Y1i/F2FrDtMzOjDM+Yf1zXcbMGESz+FrPMi2n0dZmwTT7PDELNr7fODMW1gG3jOW0nGA6WDA5JUeVU3LwPmuY5q65Sm6Jj/X6nrX1xy9jZrzJ5Sx09rxkMFnDdLBgGl8AMDZ6uCSiev07sx6Cia5cJTe3F0xLoMxiY7H++GXMjO9z78E07ktdJXfnBBNVggneJ5jm9oJpFhSVscRHGP/u3oPJfZgOFkzuw0TVuJGvh2Ciq/FAwo0r02sG07jo+xqC6WUdKpjil3f9gDnvzh4vjQLv89Ioc3sv//GcwRRjuSLtWi8ZTHs/mw4OFUxxxcL6AXNUxJ7xiHE9BBNdjQt4P/jgg3d/09tLBtPsEv7l3knXeslg2pt96+BQwfTf//73wQP2rW99693fwFxE9fp3Zj0EE139/ve/f2974DazKOuPX8bMLGIioma3KtjyksE07kuvedmYszncVhKRtH7QIqJgy/p3ZRyCia7id3/cHjo+AY5eMpiWm1+O7xs3mZyJ+zaNN6R8qWAaz+50naw4XDCZFuRa45q3MbYFE13NgqnjmpTRSwZTmN3NO0bco2lZzxT/jZtWxuvMjWbBNHu/pwZT/BzWf9Z1/fDhgmlcqd/x5llcZ7wNxTilLJjoahZM9qUvH0xhK5rWI2adxlN18fb4enPLWE6jhQiu5cV91yNO/60XmcfHzGa8It7+/Oc/P/izrjeNPlwwjYsVO96eneuML6UTL/+wflsw0dUsmLo+Ca7FPiN+Dst4zBmM8ecaY88yi7ReCB7/H6G0jp+19eefjZgtms1AjSNmmmYzUJdG15clO1wwuXkl14od3vp35Sc/+cmDtwUTXc2Cyb6ULe7BlA4XTOO5VLcWYMu4kY+v3SSY6GoWTK46Zosr5NLhgsmtBbjWuJH/5je/efC2YKKrWTDFcKUco/E5t/PvyeGCKYxPhK6UYzS7Qi7Wu63/TDDR1VYwdV/4fYs1TGczLoPp/AobhwymceG3qzsYjQu+4/ScYIK0FUzd1zHd4iq5sxnXgnZd8B0OGUxffPHFgwfQYkVG4/qliCXBBGkrmLovcRBM7xvP6HRd8B0OGUzWMbFntkhRMEHaCqYYndcxCaaHZuuXOr+6xiGDKVjHxJbZ+qUgmCBdCqbOSxwE00PWLz102GCyjokts/VLQTBBuhRMnZc4CKaHxqUNndcvhcMG07iOqXv58rXZ+qUgmCBdCqaYke162kUwfS1+B+J3Yf3z6Lx+KRw2mGbnVt1DhPgd2Pq9EEyQxmAanxjjgLQjwfS18XSctcIHDqYQs0rrB9RpOcbTceuZR8EEaQym8XUWIxw6EkxfczrufYcOpvG0nAJm3OEtp+OCYII0BtPvfve7B2/H6DhjL5jS7HRc9/Vc4dDB5LQca+PVcePvg2CCNAZTbBvjlccdZ+wFU7o0U9/ZoYMpjHchjbfpaQyi8WofwQRpFkzjjH0EVDcRCsvLosToeruaSzP1nR0+mCxMY7F3R1rBBGkWTLMZe/e36ydm1cbfA2du0uGDaXautesVHp3Nwjl+N9YEE6RZMIVxxj5mGuhlXOw9ztR3dvhgCuNNLM0y9TNOIc9OzQomSFvBtLcOkHOLx3p8/C32/topgmk2lWyWqY9xdinG7FSCYIK0FUxhvF3L7ODjrLqvYRonH8wwPnSKYArxy71+oDsuWOxqnF3amkIWTJAuBdPsAKTLLNO4L+k0uxKPseUtl50mmGazTKYSz2+2QHHrcRdMkC4FUxgvoOgyyzSu3xkvHDmzcf9o0uF9pwmmMM4yuXfE+VUWKAomSHvBNN5iIEaHWaauwTSbXep4H649pwqm2YLFTkcI3cxOHVyaVRRMkPaCKYyzTB3Ws3QNpvH7jsd+vMqYkwVTGM9Bu2LunGJjHh/rvR26YIJ0TTDNDkjOHhAdg2n2OFu7NHe6YJpdFjnbGXBs4637Y+ytWRNMkK4JpjAGxNkPQLsFUxx4jldFdphJfKzTBVMY1zLFRt7lKo8OYiMfz7df80raggnStcHU7QC0WzCN+8TYr7pYatspgymeUMfz77EhcA6zG5Vec75dMEG6NpjCuL3FOOsBaKdgmi30vubAs7NTBlOYXeWhnI8vHsPxcb32iFcwQaoE0+wA9KyXnHcJpnhMZ+t9rznw7Oy0wRTGc7N+IY4tHrvxMY23r31MBROkSjCF2cLgM96bqUswjfvCGG4jsO/UwTQ7/25B23GNO7MYlVlDwQSpGkxhtv2dLSjizESE4DLOeFYivqfxVFw8tuw7dTCF2fl3JX08s6viqufbBROkxwRTzOSOp+biidcFNccRj+EYS+65dL3TB1MYz9XG6PaiikcWj9W4kVdOxS0EE6THBFOY3RzYrP1xjLOEsV8988L2W2sRTFtVzf2Lx262OPExwSuYID02mMItZnt5eR63p2sRTGF2dZUjo/s33lMrxmNPqQomSE8JpjCbtT/D3aFj37Jew3SWMxGzWIrH0Km4mjbBFGZPvha73a/Z+rOnHBEJJkhPDaZ4oh3XM8U4+umd8ZTVGU5XRciOZ1jibWvP6loFUxgvS4/hdXPuz+yI6DHrltYEE6SnBlOYrWeKceQry84WTLP1n/G2dUuP0y6Yto6MRNP9mB0RxWP21CMiwQTpFsEUZksdYts96qmsMwWTWLq9dsEUZreEj3HGe24czdZGfosdsGCCdKtgCmeKprMEU/zsTQzcXstgCvELNf4yxRBNryd+9rNYutVOSzBBumUwhdkp9Nh2j7Y/PUMwzQ46Y7gi7unaBlOYHRnFUOEvL3ZMs438lo+FYIJ062AKs4tqYhwpmo4eTLODzhhi6TZaB1OYHRnFEE0vJx6Dl9jIBROk5wimMLuyNcZR9qdHDqb4GW/tR90+4DbaB1OIX7TxlyxGPJHzvLZi6Tl+9oIJ0nMFUxi3s2UcYX961GB6qYPO7gTTO1un5265I+Gh2dFobPTPdTQqmCA9ZzCFrYPQOG13z44WTDFztDWr54D/9gTTylY0PfX+PzwUP8txxxTjOWMpCCZIzx1M4dL+9F6voDtSMMXPcHZfwefej3YmmAZbV8/FL+GRFi/eq/gZzi53jZ/vc++cBBOklwimsBVNMe7xST2+puVlUWLc6z4/9pWxzxx/pi+xH+1MME1ENM2e1GOY5ny8rfPsL7WRCyZILxVMYWsmJIY1NjWXTsHd88zdWQimDfGLOXuByRhetLAmflZblxzHz/KlXtNIMEF6yWBabD3RxwGTU0j7tmbnY8T+1XPS8xNMO8Yn2fWwke+Ln9FsVilG7EBfciMXTJBeI5hCzDKv/931iCd9Lwj7vksHnLFvddbj5QimK0TZbz3pxzSojfx9MTU8W9gd47WOKAUTpNcKpnBpyUOM1wyAe1rDFKF06YAznnvudY3VWQmmK8Uv79Z5+BjOxaf4OcXP4h4DUzBBes1gWozb43rEfuI1DqrGmZzX+BpiHxohtPV8s8wqxfvxsgRT0aUp5Thqeo0N7B4sR0P3vJELJkj3EEzh0oLwGC8dTq8ZTHuhFCPWfFrY/XoE0yPEL/a4Ya3Ha51yeg3xs4gQujTF/pILuy8RTJDuJZgWlw5EY7zUwehrBFPsQ+Mq4UuhZFbpPgimJ4iN6VIonDmcrgmle/v+BROkewumsHcguow45f9cB2AvGUwxUxQ/97196L0ccCKYbmLrctn1iPc5w1RqTBlfWqMUI/4u3ufejoYEE6R7DKZFxME14RQhEQdtt/TcwRT7xPicl2aTYsQ+NC6acfrtvgimG9qbVo4RG0rsnI40tRpfa3zN12zk8X73ejQkmCDdczAtrg2nGBEXsf996r7nOYIpvqY45Raf+9KBZoz4+3g/oXSfBNMzuCacYiwb+T1uHPE1xdcWX+M1G/k9h9JCMEE6QjAtrj1Vt4wlOiJSqgemtwim+Dfj346f6d5B5jLia37OU43chmB6RhEce7GxjGUjjw30NWaflo08vobKRn6EUFoIJkhHCqa12EfFqbj11743Yo1QHPjF9xj710v3LqoEU+wz48Ay3ic+d3xdse+s7POX04qvsc+nTjC9gCVEZhvN1qhs5BW32sjj44+2kcf3u/5eBBNdHTWYFrHvidC4tGB6b8S+LPZ9sT+LfW3so7/zne88eJ8f/vCHb2d+4u/i/Zb95VP+3fj4+Hk77XY8gumFxUYeG8xsQ7p2jBt5jNioYyOMEf8/28ivjaLZiM8Rn/vIU8bx9a+/J8FEV0cPprU4mIz9auyj1t/TvYzlIDN+xiLp2ATTK7GRvzzBBOlMwTRa1g+91r51ve+M/bzTbechmO7EPW3kEUhn3Mjje1t/z4KJrs4cTKOIlmUJwjLrvv7eHztinxkz9zHTHzP68W+cdd9JEkx3Kja8JaKeayOPzx3/RpeNXDBB6hRMW2J5Qez7IqhiPxjBEyNm/uPnESP+P0b8ebxfjPgYYdSTYDqYp2zk8bGdN/L42ayfJAQTXQkmqBNMtCGYIAkmqBNMtCGYIAkmqBNMtCGYIAkmqBNMtCGYIAkmqBNMtCGYIAkmqBNMtCGYIAkmqBNMtCGYIAkmqBNMtCGYIAkmqBNMtCGYIAkmqBNMtCGYIAkmqBNMtCGYIAkmqBNMtCGYIAkmqBNMtCGYIAkmqBNMtCGYIAkmqBNMtCGYIAkmqBNMtCGYIAkmqBNMtCGYIAkmqBNMtCGYIAkmqBNMtCGYIAkmqBNMtCGYIAkmqBNMtCGYIAkmqBNMtCGYIAkmqBNMtCGYIAkmqBNMtCGYIAkmqBNMtCGYIAkmqBNMtCGYIAkmqBNMtCGYIAkmqBNMtCGYIAkmqBNMtCGYIAkmqBNMtCGYIAkmqBNMtCGYIAkmqBNMtCGYIAkmqBNMtCGYIAkmqBNMtCGYIAkmqBNMtCGYIAkmqBNMtCGYIAkmqBNMtCGYIAkmqBNMtCGYIAkmqBNMtCGYIAkmqBNMtCGYIAkmqBNMtCGYIAkmqBNMtCGYIAkmqBNMtCGYIAkmqBNMtCGYIAkmqBNMtCGYIAkmqBNMtCGYIAkmqBNMtCGYIAkmqBNMtCGYIAkmqBNMtCGYIAkmqBNMtCGYIAkmqBNMtCGYIAkmqBNMtCGYIAkmqBNMtCGYIAkmqBNMtCGYIAkmqBNMtCGYIAkmqBNMtCGYIAkmqBNMtCGYIAkmqBNMtCGYIAkmqBNMtCGYIAkmqBNMtCGYIAkmqBNMtCGYIAkmqBNMtCGYIAkmqBNMtCGYIAkmqBNMtCGYIAkmqBNMtCGYIAkmqBNMtCGYIAkmqBNMtCGYIAkmqBNMtCGYIAkmqBNMtCGYIAkmqBNMtCGYIAkmqBNMtCGYIAkmqBNMtCGYIAkmqBNMtCGYIAkmqBNMtCGYIAkmqBNMtCGYIAkmqBNMtCGYIAkmqBNMtCGYIAkmqBNMtCGYIAkmqBNMtCGYIAkmqBNMtCGYIAkmqBNMtCGYIAkmqBNMtCGYIAkmqBNMtCGYIAkmqBNMtCGYIAkmqBNMtCGYIAkmqBNMtCGYIAkmqBNMtCGYIAkmqBNMtCGYIAkmqBNMtCGYIAkmqBNMtCGYIAkmqBNMtCGYIAkmqBNMtCGYIAkmqBNMtCGYIAkmqBNMtCGYIAkmqBNMtCGYIAkmqBNMtCGYIAkmqBNMtCGYIAkmqBNMtCGYIAkmqBNMtCGYIAkmqBNMtCGYIAkmqBNMtCGYIAkmqBNMtCGYIAkmqBNMtCGYIAkmqBNMtCGYIAkmqBNMtCGYIAkmqBNMtCGYIAkmqBNMtCGYIAkmqBNMtCGYIAkmqBNMtCGYIAkmqBNMtCGYIAkmqBNMtCGYIAkmqBNMtCGYIAkmqBNMtCGYIAkmqBNMtCGYIAkmqBNMtCGYIAkmqBNMtCGYIAkmqBNMtCGYIAkmqBNMtCGYIAkmqBNMtCGYIAkmqBNMtCGYIAkmqBNMtCGYIAkmqBNMtCGYIAkmqBNMtCGYIAkmqBNMtCGYIAkmqBNMtCGYIAkmqBNMtCGYIAkmqBNMtCGYIAkmqBNMtCGYIAkmqBNMtCGYIAkmqBNMtCGYIAkmqBNMtCGYIAkmqBNMtCGYIAkmqBNMtCGYIAkmqBNMtCGYIAkmqBNMtCGYIAkmqBNMtCGYIAkmqBNMtCGYIAkmqBNMtCGYIAkmqBNMtCGYIAkmqBNMtCGYIAkmqBNMtCGYIAkmqBNMtCGYIAkmqBNMtCGYIAkmqBNMtCGYIAkmqBNMtCGYIAkmqBNMtCGYIAkmqBNMtCGYIAkmqBNMtCGYIAkmqBNMtCGYIAkmqBNMtCGYIAkmqBNMtCGYIAkmqBNMtCGYIAkmqBNMtCGYIAkmqBNMtCGYIAkmqBNMtCGYIAkmqBNMtCGYIAkmqBNMtCGYIAkmqBNMtCGYIAkmqBNMtCGYIAkmqBNMtCGYIAkmqBNMtCGYIAkmqBNMtCGYIAkmqBNMtCGYIAkmqBNMtCGYIAkmqBNMtCGYIAkmqBNMtCGYIAkmqBNMtCGYIAkmqBNMtCGYIAkmqBNMtCGYIAkmqBNMtCGYIAkmqBNMtCGYIAkmqBNMtCGYIAkmqBNMtCGYIAkmqBNMtCGYIAkmqBNMtCGYIAkmqBNMtCGYIAkmqBNMtCGYIAkmqBNMtCGYIAkmqBNMtCGYIAkmqBNMtCGYIAkmqBNMtCGYIAkmqBNMtCGYIAkmqBNMtCGYIAkmqBNMtCGYIAkmqBNMtCGYIAkmqBNMtCGYIAkmqBNMtCGYIAkmqBNMtCGYIAkmqBNMtCGYIAkmqBNMtCGYIAkmqBNMtCGYIAkmqBNMtCGYIAkmqBNMtCGYIAkmqBNMtCGYIAkmqBNMtCGYIAkmqBNMtCGYIAkmqBNMtCGYIAkmqBNMtCGYIAkmqBNMtCGYIAkmqBNMtCGYIAkmqBNMtCGYIAkmqBNMtCGYIAkmqBNMtCGYIAkmqBNMtCGYIAkmqBNMtCGYIAkmqBNMtCGYIAkmqBNMtCGYIAkmqBNMtCGYIAkmqBNMtCGYIAkmqBNMtCGYIAkmqBNMtCGYIAkmqBNMtCGYIAkmqBNMtCGYIAkmqBNMtCGYIAkmqBNMtCGYIAkmqBNMtCGYIAkmqBNMtCGYIAkmqBNMtCGYIAkmqBNMtCGYIAkmqBNMtCGYIAkmqBNMtCGYIAkmqBNMtCGYIAkmqBNMtCGYIAkmqBNMtCGYIAkmqBNMtCGYIAkmqBNMtCGYIAkmqBNMtCGYIAkmqBNMtCGYIAkmqBNMtCGYIAkmqBNMtCGYIAkmqBNMtCGYIAkmqBNMtCGYIAkmqBNMtCGYIAkmqBNMtCGYIAkmqBNMtCGYIAkmqBNMtCGYIAkmqBNMtCGYIAkmqBNMtCGYIAkmqBNMtCGYIAkmqBNMtCGYIAkmqBNMtCGYIAkmqBNMtCGYIAkmqBNMtCGYIAkmqBNMtCGYIAkmqBNMtCGYIAkmqBNMtCGYIAkmqBNMtCGYIAkmqBNMtCGYIAkmqBNMtCGYIAkmqBNMtCGYIAkmqBNMtCGYIAkmqBNMtCGYIAkmqBNMtCGYIAkmqBNMtCGYIAkmqBNMtCGYIAkmqBNMtCGYIAkmqBNMtCGYIAkmqBNMtCGYIAkmqBNMtCGYIAkmqBNMtCGYIAkmqBNMtCGYIAkmqBNMtCGYIAkmqBNMtCGYIAkmqBNMtCGYIAkmqBNMtCGYIAkmqBNMtCGYIAkmqBNMtCGYIAkmqBNMtCGYIAkmqBNMtCGYIAkmqBNMtCGYIAkmqBNMtCGYIAkmqBNMtCGYIAkmqBNMtCGYIAkmqBNMtCGYIAkmqBNMtCGYIAkmqBNMtCGYIAkmqBNMtCGYIAkmqBNMtCGYIAkmqBNMtCGYIAkmqBNMtCGYIAkmqBNMtCGYIAkmqBNMtCGYIAkmqBNMtCGYIAkmqBNMtCGYIAkmqBNMtCGYIAkmqBNMtCGYIAkmqBNMtCGYIAkmqBNMtCGYIAkmqBNMtCGYIAkmqBNMtCGYIAkmqBNMtCGYIAkmqBNMtCGYIAkmqBNMtCGYIAkmqBNMtCGYIAkmqBNMtCGYIAkmqBNMtCGYIAkmqBNMtCGYIAkmqBNMtCGYIAkmqBNMtCGYIAkmqBNMtCGYIAkmqBNMtCGYIAkmqBNMtCGYIAkmqBNMtCGYIAkmqBNMtCGYIAkmqBNMtCGYIAkmqBNMtCGYIAkmqBNMtCGYIAkmqBNMtCGYIAkmqBNMtCGYIAkmqBNMtCGYIAkmqBNMtCGYIAkmqBNMtCGYIAkmqBNMtCGYIAkmqBNMtCGYIAkmqBNMtCGYIAkmqBNMtCGYIAkmqBNMtCGYIAkmqBNMtCGYIAkmqBNMtCGYIAkmqBNMtCGYIAkmqBNMtCGYIAkmqBNMtCGYIAkmqBNMtCGYIAkmqBNMtCGYIAkmqBNMtCGYIAkmqBNMtCGYIAkmqBNMtCGYIAkmqBNMtCGYIAkmqBNMtCGYIAkmqBNMtCGYIAkmqBNMtCGYIAkmqBNMtCGYIAkmqBNMtCGYIAkmqBNMtCGYIAkmqBNMtCGYIAkmqBNMtCGYIAkmqBNMtCGYIAkmqBNMtCGYIAkmqBNMtCGYIAkmqBNMtCGYIAkmqBNMtCGYIAkmqBNMtCGYIAkmqBNMtCGYIAkmqBNMtCGY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| As shown in the figure, the diagram is the unfolded view of a cylinder. The circumference of each of the two circles in the diagram is 12.56 cm. What is the length of the rectangle in the diagram? ( ) cm | A. 50.24; B. 3.14; C. 12.56; D. 6.28; E. No correct answer | C |
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| As shown in the figure, the length of the rectangle is 12.56 cm. What is the area of the rectangle in cm²?(Use π = 3.14) | A. 50.24; B. 25.12; C. 12.56; D. 75.36; E. No correct answer | D |
115 | 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| As shown in the figure, the diagram is the unfolded view of a cylinder. What is the lateral surface area of this cylinder?(Use π = 3.14) ( ) cm² | A. 50.24; B. 25.12; C. 12.56; D. 75.36; E. No correct answer | D |
116 | 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 | If the height of a cylinder is reduced by 4 centimeters, and the surface area is reduced by 50.24 cm², what is the circumference of the base of the cylinder in centimeters? | A. 50.24; B. 3.14; C. 12.56; D. 6.28; E. No correct answer | C |
117 | iVBORw0KGgoAAAANSUhEUgAAATUAAADUCAYAAAD9cLSXAAAAAXNSR0IArs4c6QAAAARnQU1BAACxjwv8YQUAAAAJcEhZcwAADsMAAA7DAcdvqGQAAB9GSURBVHhe7Z0LdFTVucdtfcQHtK6SFCqwWhvuglZgYcvSXMCaACoipbEXLxG54gM15aGRGyoiFipavOYqtYBZJS3IQ2OFkquxotKbiEECpSVAkDcE5REQAxeQUkPlu/PfmT2cGc5M9kAymX3O/7fWt5LMKzNzzv6db78vEEII8RCUGiHEU1BqhBBPQakRQjwFpUYI8RSUGiHEU1BqhBBPQakRQjwFpUYI8RSUGiHEU1BqhBBPQakRQjwFpUYI8RSUGiHEU1BqhBBPQakRQjwFpUaanT179siaNWuktLRUioqKZPLkyTJy5Ei55557VGRmZoZFly5d5Dvf+U4oUlNT5YILLggL5/2IjIyMsNcYNGhQ6PXz8/OloKBA5s6dK+Xl5bJ582Y5cuRI8N0Rr0GpkfPi0KFDShQzZsxQsoJEBgwYID169JB27dqdJaNkiksvvVQJERIcMmSIjBkzRqZOnSqLFi2S6upqOXXqVPBTEpug1IgRTnmh8EMEbhlUZFx00UWhTArZEzI0yK+wsFBlTsXFxep1dVRVVUlNTU0oYokF2ZbzsRUVFaHXWbp0qXp9xLRp01S2prNCZIKm771r165KeJMmTVLvFe/v5MmTwXdAkhFKjZxFbW2tylby8vIalRfuw2MgOlTxFixYoKSCKh5EmOxAhpWVlapqDAFCuDk5OSrTRCbn9pkREGN2drYSJmRK0SUPlBpREkOBRiaDwupWiJ3yQrYGcdkgrfMFci4pKVHyiiU73IbvB1LEd0PJtRyUmg9BgUP1DJmYm8QgMGQhyLz8Iq94gex0NouqNaqqzu+wVatWqm1x+vTpsn379uCzSCKg1HwC2qaWLVsmw4cPVwXOWQAhMdyObA2FlcQPLhSohiKjQ8YWKTlkeOiEoOCaH0rN40BSqDJGtov16dNHFTIMtSBNz/Hjx1U7XW5urnTo0CHsu+/Zs6ca2sIqavNAqXkUVI369+8fVph0toDGcZI4dJaMnl9nlnzllVeqXllmb00LpeYx0KgNeemCg0KEbAHjrkjLg+wMQ0PQDqePEaqq6KSh3JoGSs0jIBNwyqxTp06qlxLVIJKcYMwbZKbb3/AT2Rw7Zs4PSs1yUABQMJwyQ4M/R8PbAzI0p9zQ/oljSM4NSs1iMNxCdwCgmonMjDKzF8gNsy70BQptosy044dSsxT0nukrOwoCG/+9A2Zl6IsVxhHy2MYHpWYhGNCpr+YYwU68B1Y20W2kWBgAsz6IGZSaZWAmADI0BK7oxLug6omZHRAbxrZxXJsZlJpFYFUKjG3CSY4pTMT7QGw6Y8OYNtI4lJpFoKqJkxttaMQ/oAMBmTkmzbMa2jiekxoKvc0RC52lYXwT8Rd62M6ECROCt5BoUGpJFtHAFRr3ozeM+A8M38Hxx8ofJDasfsaBvlq2xMBIdBDgf2MVVuI/MKwDxx+rCJPYUGqG6HYNnFgYtZ/oQa4QKf43Vtcg/gNzdyk1Myg1Q5xTkRCJzta01NCuxq59/4FJ8JSaGZSaAc4sTUeiszUtNQQ2LSH+Qg/roNQah1IzIDJL05HIbM0pNZzY7Nr3D7iIOY89iQ2l1ghuWZqORGZrTqkhsB4XJzt7HywR7jz/KLXGodQaIVqWpiNR2ZqWGno/9WYp6DRgxuZdsBy4XikXC33iJ6XWOJRaDGJlaToSla1pqUGy2HcAJ7f+/xyM6y1wPmHZdX3uYccqDukwh1KLQWNZmo5EZGtOqQFkaMjUcBtOfkyhYq+o/WDohl7qG8dVz/Gl1Myh1KJgkqXpSES2Fik1gP+JSc76faJaij0KiH3gIoWMTB9L7ECFAdcaSs0cSi0KplmajubO1tykpsE2d879CfA75WYHWmZ613dIDX9HdgJRaua0qNTqj30aOKiHJdkqTajGYQMMCMQZWhrIzCLvQxtIcxJLagBZGx6D96bfJzI3LCiJJYtIcoELEY6llhkCa6dF2/WLUjOn5aR2dLmM74iDmSdlwZuSHX3yRRNLc9KY1DRuckPBwfOw4xRpObBJDsacYcFHfWyQmUFmjXX2UGrmtJDU6qQsr2PwwFJqJphKTQO5YUgAVnXQ7xuBthpUbzD+iTQ/qEZihWKIy9lGiz0IsIwQZGUCpWZOi0it7r1R0rFjR0lTB5hSMyFeqTlBp8ekSZPCsjcE1r4fPny4KnQc79Z0IOuaNm2aZGZmhlUv8Tvkhnmc8fZUU2rmJF5qe1+T7Nb/IaVri6S3OtiUmgnnIzUnKHAQnB7A6wx0MIwZM0YVOtMMwu9ATpWVlartEsLChcL5nUJk2OoOu3+dzybFlJo5iZVa/VYpykqXvLI6kR1xSO3kYZVJ1H56TOqDN7mBjofDjgtgQ0fEp3LM5Umx7ouGPlFtlpoTFBQUtpycnNCqus5AVRUFFdUkiA5C9PNYOEgJizVif1XIH+MEnZmYDlwc8J1hSEZTfV+UmjkJlFq9bC3KkvTxy+Uo/jSQWv3BNVJ0zzWSlpYunTu3l9aBx6ek3SjPfHDwjNzqj8m28iJ5/PZr1P15eLG6tVI0LF1S1OsHonWGPLMyIFI8/OAH8syNaa73NYY+ab0itUggLTRkQ3IQmv68kYEsz8uyi5QXqpF6H87IQDsZGv7RTolhNM3V00ypmZMwqdWvL5Bu3QpkvbZRI1Kr3zpHbmmdIlmFH4WGfNRvLQw+p6OMX67UKBvLXpF3f3e/dAyeZHlLymT8tTfK2KISeffdV+TxjNbq9gvSnpAPdpXK/ddkyIhfB54Tcd9Kg4xNPTYQXpVaJChIKKhoH4LokIG4ZSYIFG4UOIyGx8YwGBKDWQ6Q5KJFi1THBF6vJeWHbB9DJiAsfJ/4XBi8jO8U4oKso8kLgfvwOIgOwsPrJGpRAUrNnMRIDcM30rOkaKvDHLGkVr9apmC4x60LZW/wpga2SuF1wZNMpWSaM7en/6xUdjnLzdG35f4U3Jci6cMWykfO++pXyhNpuC9NpqwO3hYDfXL7RWrRwNxTU9m5BSZpo9MCgtABEeKz6UAWCCnqwOfXAaE478Nkb+dzna+LLAoicHsf0QLtYug1RvYFKaPN7Hzaw5oCSs2cBEgNwzfSJatoa3h7WAypHX37flU9zH7tQPCWM+xYfI9c1/nmiCrjDinq3XBChrlOca73nQ0eh0DBSTTJJLVooOAjE8J4OLxfDEhGVgPxQTAokPHIr6kDsuratatquMf3iA4TCBKZJLKuls4kY0GpmdPsUlPDN7Jfi8i4AsSQWllew0loIpoGKDWbQLsTsj2IxBkYWqKzMQR6FJ0ZmVugo8P5HIzNc74msiwIwXYoNXOaV2oYvpF2pxRvqW3ovXTGX/9brlOSeEBKgrc19FzWyJwsc9E0QKkRb0OpmdOsUttR1DskApNoEMsBeS274e/eRTvU67hSX++ozlJqxNtQauY0q9QOLJ8hjz32mHs8mBWcUdBN/i1426KNDc9bPSWtQSDdXpSPGm6K4KiUFRTJ+uBflBrxOpSaOQnoKIhCjDa1+pVPBIWXcnYHQ4C6sjy55UWn7ig14m0oNXOSUmqQzZyslKBEWkvG40tkXU2t1Nask3deHCbpmGYVNl72zJCOc5XaqPcaH6jW8H4oNZJ4KDVzklRqAerKZHy6FpsjUrKkYO0Zo508XCubl5wZfNvx/iWyOTj9Sd1X/kvJUuPULpC07EKprHG/LyWrIHRfNPR7oNTOjz179qheSd1Dic+GQGeRG3qAbGTgdvSAuoGhGfr1McykpceZnS+UmjktJ7WaYrmzc2fp3Plp+TB401nUH5Q1Cx+X26/D426WEb9eIhsPhlvnw6dxX2TcKcU1535fNCi12EAcGKqBAugGBrPq79At3nzzTfn04EGp3b8/FJ98/HHMKVsI/djPAv+/rq5OBaZuRT4OY+QghczMzKgyTFYoNXNaTmoWoguH36WGqUHItPTcSEyN0lu5IcaNG6fEciCQee0NZGU1O3fKtq1b5d7Ae7/88svVslMY6T948OCwKFmyRNatXXtWFDz3nEx//nn53ezZKvD7U1OmhMLtOe+XlanXvKl/f7m2Rw+56qqrQu8P0a9vX9m3d6+S6JHDh9Vn+uKLL2TOnDlqkC5mOCATxNxWZHrNvQdFY1Bq5lBqcaALhN+lhoxKfxfOgDi+//3vy8Njx7qKJhniz8uWyasLF0YV6OhRo1w/G7I8TAfD4N6WgFIzh1KLA32Ce1lqKDz4X/g/mP+IDOXY0aMqo/l4927ZGqheLv3Tn6R7t26SM3SoTHjsMZk/b56sXLHCVRI2BrK8WTNnyqOB6vJtAweqeaoXXnih+v5fDnw3qOaeOHFCvvzyy+C3Jipzbc69ICg1cyi1OPCi1NCgjnW/sKoGCoz+jDpQwN0Kvt9i9apV8odAVRQ/9W3rq6pUtXr/vn3SPli9RVUc7XXYWKUpodTModTiQBd0L0kNk7v150Kktmmj2qLQVvX2W2+FFWyGeyBL7d2rl2ovdH6XaJvDxcK5f+e5QqmZQ6nFgT5ZbZfa6dOnVZUSPYv548apRntUtaK1MzHM4m+B7GzunDnyQEBkVzuy3r59+wa/+XOHUjOHUosDfZLaJDWM/UJ1CMvsoB0IPX4bN2xwLZSMpo3SN95QFwv01m7ZtEkOHjgg9fWND/J2g1Izh1KLA5ukhmEIqPro9ctQNfJSY77NsXPHDjl27Jha3BJrzpl0MFBq5lBqLqDxHEKAQJyhpYbesMj7WnqHdg1G62PbO/1e0Ws34JZbVCO3WwFjtEy8u3Rp6Bhh05uCgoKYY+EoNXMotShAHvqkMwlIpzkxkRoWTNSZGWSGBn9UgdwKFaPlAwOJnbu142IZrVOBUjOHUosCNgB27qgdK3AyNveIcxOpYRltyAyj6CkzewJyw6BlfT7hGEdWSSk1cyi1GJhma82dpYFYUsMgUPRkooCgWhNZaBh2xLPTpqmqKC6mkePcKDVzKLUYmGRricjSQDSp/ePkSdm8aZNrIWHYF5jGhbmuu3buDJuxQKmZQ6k1QmPZWiKyNOCUGiSKv098/rlsrK52LRwM+wNT0k4Fh4BQauZQao0QK1tLVJYGnFLD6hH4/We5ua6FgeGdQBYOsVFq5lBqBkTL1hKVpQEtNYxOx8+UlBQO0/BJbN+2TWbNmqWOO6XWOJSaAW7ZWiKzNKCldtlll6mfT0yc6FoAGN4LHGt93lFqjUOpGRKZrSUySwNaaggseuh28jO8GRXLl4cmy7dv3z54RpBoUGqGOLO1RGdpwCk1zCV0O/kZ3o27hg1Tx/7rX/968Iwg0fCc1HTBtzWioaWGwbVuJz3D2/HbwkJ1/JGxkdhQakkW0XjhhRfU/enf/a7rSc/wdmBtOxz/iy++OHhGkGiw+hkn6FpvCXSmtrqy0vWkZ3g7MO2NUjODUrMELbX33nnH9aRneDtY/TSHUrMELbWnp05VuyG5nfgM7wZ6QLMyMyUtLS14RpBoUGqW4Oz9xIoObic+w8NRVSWtW7fmODUDKDVL0FLTg2/H5+e7n/wMTwamS+G4U2qNQ6lZgpbaTTfdpMbLYWgHNvlwKwAMbwWmSe3atYtSM4RSswQtNcxswEYq+B2NxhSbdwODrDmhPX4oNUtwSg2zGfLy8tTfyNiwuKBboWDYGdhqD7vf4/iOGzdOHX9KzRxKzRKcUtNosQ0cONC1cDDsCwyy7d6tmzqurVq1ktLSUnWsKTVzKDVLcJMawGYr2Jh47549roWEYUcgO/vFk0+GJq536dIlbElvSs0cSs0SoknNCfaSxKa5boWGkbyBdtGOHTuq44tABo5tGp1QauZQapZgIjVw+vRp+ezQIXn2V79Su0pxIcnkj/kvv6yOLbbLq6ioCB7JcCg1cyg1SzCVGkBHAqoveDziRzfcoLZhcytQjJaLbVu2yJHDh9WFKNp+nxpKzRxKzRLikRpAIUA1BluuabmhijN61CjVGO1WyBjNF6hi/vT22+X1116Tml271KY58UCpmUOpWUK8UtNgU9zp06erhS213P4l8LtbwWM0bcyfN08eGDkyrL3swQcfDB6Z+KDUzKHULOFcpeaksrJSxowZIy+99JLqMcUGyBs3bAgVQkyadhZKRvzxflmZysjatm0bEpmWEQZNQ07nAqVmDqVmCU0htWh8fvy47Nu7Vwb/+Mdq0nRWVpaaW8pOhvhifVWVmnjuXPYdTQDRGv/jgVIzh1KzhOaUmiYzM1P9D2dg3BRWBbljyBBZuWKFa2H2QyADmzVzpjwakNSAW25RwvqfkhLZtnWr7N+3T2W+ekd1HKvq6mr1e1NBqZlDqVlCIqQGDh06JMWBDC03NzesHQ4bfny8e7faNVxlJMHCDtFhjuK7S5eGScALUfDcc6rnOLVNm9D34IzZs2cHv7Xmh1Izh1KzhERJLRJ0NKAtTk/XAacDGcnf//53qaurk4ULF4YKObI6NIpjvNVtAwfKiLvvTqqdryBgLIuN4S1PTZkiD48dq+ZYYiS/83GbNm6Ump071e36s6Wmpkr//v1VdXLBggVSFRB7IncUo9TModQsoaWk1hiYypOdnS0dOnQICcAZo0ePVoJANe2jQJVMiwPCgPyuv/56GTx4cCiwFVzuQw9FHXaC7AlC0lLCYxGQE57v9hxkkXr6kVv06dNHjh8/Ll988YUStgbbIkLmtbW1wVtaDkrNHErNEpJVapGg8CGzKykpkcLCQikvLw/ec4b6+noZPnx4mFgi44+LF0vt/v2qh/aTQLVXRzR56kD2qAOiQmzZskXdh+dCpIMGDVLVa/RG4nvF+012KDVzKDVLsEVqpiD7gfB0QIL4jDqiZUf5+fnqO5g0aZKSkg5M7MfzvAqlZg6lZglekxqJD0rNHErNEig1f0OpmUOpWQKl5m8oNXMoNUug1PwNpWYOpWYJlJq/odTModQsgVLzN5SaOZSaJVBq/oZSM4dSswRKzd9QauZQapZAqfkbSs0cSs0SKDV/Q6mZQ6lZAqXmbyg1cyg1S6DU/A2lZg6lZgmUmr+h1Myh1CyBUvM3lJo5lJolUGr+hlIzh1KzBErN31Bq5lBqlkCp+RtKzRxKzRIoNX9DqZlDqVkCpeZvKDVzKDVLoNT8DaVmDqVmCZSav6HUzKHULIFS8zeUmjmUmiVQav6GUjOHUrMESs3fUGrmUGqWQKn5G0rNHErNEig1f0OpmUOpWQKl5m8oNXMoNUug1PwNpWYOpWYJlJq/odTModQsgVLzN5SaOZSaJVBq/oZSM4dSswRKzd9QauZQapZAqfkbSs0cSs0SKDV/Q6mZQ6lZAqXmbyg1cyg1S6DU/A2lZg6lZglekNqpU6dU4ayoqJDi4mL1mRCTJ09WgfvcyMnJkczMzLNiyJAhUb+P48ePh16/tLRU1qxZI7W1tcF77YNSM4dSs4Rkl9rJkydl+/btsmzZMqmqqgreGg7eOz5DtPjj4sWyb+9e+WT37lDsDLxmh/btXR+vQz92/759Urt/v4q/rF7t+lgExJCbmxt8V+HgcyQjlJo5lJolJJPUkAUh+ykoKFBZVNeuXeWiiy4KSWPM6NFKLJ98/LHs2rlTtm7eLBurq2XE3XdL27ZtpXu3bnJT//4yePBgdVvuQw+pePutt2Td2rVnxfx58+R3s2dHDbfn/DkgV7w+onevXtK5c2e58sorQ+8xKytLanbtkr179sjBAwekrq5Ofa7Cl16SVq1aSUZGhowZM0ZmzJghlZWV6r6WhFIzh1KzhGSS2ptvvhmSg46USy6RTp06yY9uuEF+8eSTrqJJhvhboBoKeZYsWeJ6/6N5eWd9Nh34fIsWLQp+C4mFUjOHUrOEREgNVa/y8nLVvoU2qy5dusiJEyfks0OHVEazfds2qV6/XmVBkNd9994rBc89J4tff91VELbG6lWr5NWFC+WJiRMlZ+hQubZHD7n88svV979g/nxVzf2/I0fkH46qKqrdmwMZaXNBqZlDqVlCc0ltT0BWhYWF0j9QHbz00kvV/9Bx4YUXSsXy5a4F349R+sYbSnjO21Ct3h0Qzje/+U31nbVr105GjhwpJSUlTdo+R6mZQ6lZQnNJrV+/fmESQ3sXMrBZM2fKyhUrwgowwz3wPd0xZIhcHRCO/i4RuEhkZ2ernt7zhVIzh1KzhKaUGoZWoEqJnsWnfvlL1ZiOaiQldv7x7tKlqk0RnRMpKSnqmN12221y+ssvg9/+uUGpmUOpWcK5Sg3DLPLy8uSeESNUO1DNzp2yvqrKtUAymjZwkcDFAj20GzdskD2ffCKfn2MvKqVmDqVmCfFKDQNcUfXRQy3Q0M1MLDli86ZNUvfZZ6oTAhcck0HBlJo5lJolmEoNPXCDBg1Sj0WgCnTXsGGqkdutgDFaJnA89DFC29uECRPkSCCTjgalZg6lZgkmUsNAUZ2ZtW7dWg1oZe9l8gaGwqA9Ex00OGapqamqJ9oNSs0cSs0STKS2IlDlRGaGas37ZWWuBYmRfIGBwOhYwPFFYIwgJOaEUjOHUrOEWFL75z//qab8oIAwM7M3fhvI0jCN7IorrpBNmzYFj24DlJo5lJolRJPaic8/l4+qq10LCcO+wEUJcsN82VP19cGjTKnFA6VmCU6pYXI12s8wPGDDunWuhYNhf+BipadiUWrmUGqW4JQaAr8/8vDDroWB4Z3ANCyIjVIzh1KzBC21Pn36qJ/o3Yy2VA/DW7Fl0yaZOHEipWYIpWYJWmqXXHKJ+jn9+eddCwDDezE+P18dc0rNDErNErTUEFj2x+3kZ3gzsDKIXuDyqquuCp4RJBqUmiU4pRZttVeGd+OBkSPVsf/a174WPCNINCg1S3BWP91Oeoa3Y+6cOer4X3bZZcEzgkSDUrOEF154QZ3U/5qR4XrSM7wd6BTC8cc0OBIbSs0SdKa2urLS9aRneDv0BPiLL744eEaQaFBqlqCl9t4777ie9Axvx29efFEdfywhRWJDqVkCtmnDSY31t7BlnNuJz/BuYBesfn37SocOHYJnBIkGpWYJhw4dUlJDYA9LnORuJz/Dm7H2r39VWRrWyiOxodQsIj09PSQ2rJXmdvIzvBnPTpumjvvUqVODZwOJBqVmEbpd7Stf+Yr6ifXv3QoAw1vxl1Wr1PHGANxYq+OSBig1i8AuUNhgGCc4AiumUmzejaemTJF1VVXSsWPHhotYQUHwTCCxoNQsA3sQtGrVKkxs2JLNrVAw7AxMi/rp7ber4/uNb3xD/czJyQmeAaQxKDULKS0tDdtNfcTdd7sWDoZ98erChaFNkb/61a+qn1iZBWvoETMoNUtZs2aNtGvXTp30V199tayqrOR+nhYHti/E/E69CYtuN0WGRqHFB6VmMdgvEpt04ORHPD5hgny0caNroWEkb8yaOVNS27QJkxmmQ7Gn89yg1DwAlvbW7Wyols74zW/k5+PHS8+ePVWBcStIjOSJlwLHSF+YEBkZGartlJwblJpHwHLPWOZb7/up22MQGKyLnjQ0QLsVKkbLxPLycvn3O+4IHSc0J2DfT/Ryk3OHUvMY27dvD5ObMzAiHb1qXI8tsYGLyTNPPy3XX3+9WkLo9T/8Qbp37x46LpDZ9OnT5WRwkxVyflBqHgVyy8/PD62Y6ozvfe97roWP0XQBkWHJ9dsGDlQXE/3dOy82qGYuWLCAMmtiKDWPgwJTVFQk/fv3D/WsIXr+8Ify60B2sPLDD0MFEWt2cTPk84s/L1smWVlZYSJzRps2bSQ3N1f1XpPmgVLzEZgUrwXnzBgwYv3RvDzp07u3+httcHcNG6YyjffLylwLL+PsQHY27+WXwy4eiLS0NBk5cqQsCwiP7WXND6XmUzD2adGiRaqwYTkbZyGMjLZt26rsA2Op3Aqz1wOywqDYJyZOlJyhQ6V7t24qE5s/f77M+f3vZfhdd4UGzCIgNVQtMSSDGVniodSIorq6Wg0NufPOO0ODep2BFVf/c9w4mTd3rqz44INQgUcmh8KONd68ltVh+lmnTp3O+i4iA8NoIDGsdVdSUsJJ5y0MpUZcwcBeFNDJkyfLgAED5Nvf/nZYQcZmyhgHl3njjWG3I0vBNm7X9ughNwWquckyLxXCXfz66/LbwkI1vAVLN90xZIjabnD0qFGhx62oqJDiV16Rx37+c5WROT8bIiUlRa655hq59957VY9lReDxbOhPLig1YgwKb1VVlRQXF6ueVSxY+K1vfeusgu8MDF3AZrz/9eyzUvzqq/K/y5apBQ8fHjtWyQ/teZCjDlRzBw8eLCVLloRJSQdeC0LSgcc6w+05etOSaNHqiivUe3HehuwL8vrJT36iVsfAfFuMBSTJD6VGzhu0z6HtCG10GDz6yCOPyK233io/+MEPpFsg28Gu4pHj5vRO89GiV69eSlKYD+mUGDJEt8frcAoSokJgWznnY/C/U1NT1TJO/fr1k/vuu0+1f2G9uqVLl3I0v+VQaiRhoK0JwigvL5eZM2eqDGjSpEkyYsSIUKCqi1Uphg4dqgYRo6cW81t1oI0LkkQPLaSJxyJuvvlmGTZsmKouI7SkEMiysMcDMi32PnofSo0Q4ikoNUKIp6DUCCGeglIjhHgKSo0Q4ikoNUKIp6DUCCGeglIjhHgKSo0Q4ikoNUKIp6DUCCGeglIjhHgKSo0Q4ikoNUKIp6DUCCGeglIjhHgKSo0Q4ikoNUKIp6DUCCGeglIjhHgKSo0Q4iFE/h/LppY2qpxhzwAAAABJRU5ErkJggg== | As shown in the figure, the perimeter of the base of the solid is 12.56 cm. What is the radius of the base in cm? (Use π = 3.14) | A. 4; B. 3; C. 2; D. 1; E. No correct answer | C |
118 | 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 | As shown in the figure, the circumference of the base of a cylinder is equal to its height. The circumference of the base is 12.56 cm. What is the surface area of the cylinder? (Use π = 3.14) | A. 502.4; B. 251.2; C. 125.6; D. 182.8; E. No correct answer | D |
119 | 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 | As shown in the figure, the circumference of the base of a cylinder is equal to its height. If the height is reduced by 4 centimeters, the surface area decreases by 50.24 square centimeters. What was the original surface area of this cylinder? | A. 502.4; B. 251.2; C. 125.6; D. 182.8; E. No correct answer | D |
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iVBORw0KGgoAAAANSUhEUgAAAfYAAAC8CAYAAACKX4wCAAAAAXNSR0IArs4c6QAAAARnQU1BAACxjwv8YQUAAAAJcEhZcwAADsMAAA7DAcdvqGQAACDlSURBVHhe7Z1/bJRVvsb7x6bdhIKEXylITQncwEY2LCk27BbXdgPckttIDURYL7LVKwl0y0oCamVxF+w24LZJNdXU2HshCAikCLiVraFaFbTdivyyYIWSWwu6dS8hG5cYEvzje+c5857pdHqKdJh5533P+3ySJ8q8M+30nDPzvOc850eaEEIIIcQaaOyEEEKIRdDYCSGEEIugsRNCCCEWQWMnhBBCLILGTgghhFgEjZ0QQgixCBo7IYQQYhE0dkIIIcQiaOyEEEKIRdDYCSGEEIugsRNCCCEWQWMnhBBCLILGTgghhFgEjT2JXLlyRZqbm6W2tlbKy8ultLRUCgoKlH72s59JTk6OUlpamtK4cePUv6dNmxZ53tKlS9Xrtm7dKo2NjdLZ2Snff/+98xsIIYSQgdDYEwCMtr29Xaqrq2X58uXKtDMzMyOGnQzNmDFDiouLZcOGDXLo0CH55z//6bwbQgghQYbGHgfayNGLLioqGtLEJ0yYIL+8/35ZuXKlPL9li7wY6rnv379f3jxwQN5taZFPOjqU+v7+d6Xz586pfx8/dkw9B3q5rk5e2LZN1qxZIwsWLFC9+R/96EfG34cbinXr1tHoCSEkwNDYb5MbN27I3r17paSkxGjk9957rzLf+vp6eae5WS51d0cMO9G6cvmyMv8d27fLxo0bpbCwUDIyMga9pzlz5khlZaWKBAghtnNDzr+5VhbePXLQd8Gt9GjTt87riS3Q2H+A999/X5544olBZo6eM3riDa+9Jhe++MJowG7qy54e1cNfv3695OXlDerVz58/X3bs2CHXr193/jJCiD18Kx1VsyUj6jN/e8qT+gvOjyDWQGM30B3qbW/atEkmT5484EOAXjmG1M+eOWM0Vy8JIwa46UBUEG3yuEFZsWKFHD9+3PlrCSF+51rrOsnOKJTq9q9D/fZvpenR0Oc94yn50Lmu+Gq3LML3QF690MvthsYeBQwdM9CjjXDixImytrxc3m9tNRqoH4TsvqqqSnJzcyN/F1RQUKDyeEKIn/lOTv65WJ5qveb8+0N5KiP0GS/ZJ984j4Bv9pWoz/34zR3OI8RWaOwhTp8+rZaVaUPHf5csWaImusWapN/V1tamblRGjRoVMXhMuqPBE2IJF+olL/S5zhswxu704kOPM1O3n0AbOwwdk+G0wcHQly1bpszPZIo2CUP1iBUwc1///Zg3gByeEOJfwj3zDHkqehz+ZqusQy+emXogCKSxYykYJsRpQ8OM8lWrVvkiO0+0MOkOy+mmRG2UM3fuXDlx4oRTWoQQ/3BTWtdhhUyJ7Iseh+/YLOPx+Y7N3YmVBM7YGxoa1A5vMDD00INq6LHCEjqss8/Ozo6UzerVq7kenhBf0SGbx4cMfHq1nHUeAT3bC8M37jG5O7GTwBg7tmKdN29euHGHhCVhfp4QlyxhiB4ZvJ5vgJsg3AwRQnzA2WqZju+4sqOhvrvmphwtC3/vTa+OtntiK9YbO3aJq6ioiBjVmDFjVM/UZGpUv7ABDm5+9I0Qhud7enqcUiWEeJHzL/1UfV4Lt0d/Vi9IfV74c1x2tN/uib1YbezYcS26l/6fjzziic1k/CTcBOFmCOU3evRozp4nxKvcbJPfYxg+bboM7Ji3yjr1HZgvDZech4jVWGvsMCCdpWPmt41L19wS1sFj21p9g4T96HnCHCHe4qt9JeGd5zLWSeuAjrmTu4cMf+upm3Lj63Z56cGFUnvmO+c6sQ3rjB2GA+PRJoRDWDg5LjHCvvQ60sA+9ByaJ8QjfHNAHlbL2UJ6tEliV6pfa31W7h2J6yPl7oVrZfeJf0Rl8MQ2rDL2vr4+ZTho3DAg7JuO2d4mk6LiE0Y+9Np3DM3jvHlCCCHewRpj7+rqkhxnLTaH3pMrjIBgJETfQOHUO0IIId7ACmPHZipZWVnKaHBQC4feky+MhGAPAJQ5VFtb69QGIYSQVOJ7Y8exqvpIVSzPSuY56NRgIXfX5o5lhYT4BUyw1W2X8r/++Mc/OjVLfG3sjY2NkclcxcXFantUk/lQyRWWxOl6wG51nDFP/ED0JFvK/3rggQecmiW+NfZoU1+5ciUnyaVYr+/cKSNGjFD1gZPyaO7E6+BUQ7TXNw8cMLZpyh/C3iSoxx//+Mdy48YNp3aDjS+NvampKWLqa9asMVY25b7eOnw4Yu7oDRHiVXAGgjKDjAyO9FkgzK1CfSKaJT409uPHj0cydUzeMlUylTrB3HFaHuqHmRfxKjpfz//FL4ztmPKX9ERefueE8ZWxY0mb3k0OmbqpgqnUq+G11yIjKnV1dU7tEeIddL6OvS5MbZjyl3Zs367qkzl7GN8YO/Z910vasIaambq3VVVVpeoKBo/5EIR4Cebrdok5+0B8YezXr1+XGTNmqIrjkjb/SPeKYO6IUAjxAjpfR2TEfN0eMWfvxxfGvnz5clVhU3JyuPmMz4QT9VB3kydPlqtXrzo1Skjq0Pn6L5ivWyXm7P143tjr6+tVZeHu+t2WFmOFUt4VekT6TrqoqMipVUJSB/N1O8WcvR9PG3tnZ6fKTFBZL2zbZqxMyvtqa2uLLIPj1rMk1TBft1PM2fvxrLEjV585c6aqqJLFi40VSflHeuQFeTv29ickFTBft1vM2cN41thLS0tVBSFX52Q5O4QdAlGnOIUPX7CEuA3zdbvFnD2MJ41df/iYq9ul6Lz9iSeecGqbEPdgvm63mLOH8ZyxIxvR56rj5DBT5VH+1fFjxyKb13AJHHEb5ut2izl7GM8ZO47+RMVg3To3obFTa8vLVR1jDgUPiyFuwXw9GGLO7jFjx5axujeHPcdNlUb5X5gzkZ2dreq5urraqX1Ckgvz9WCIObvHjL2goEBVCDY1ia0syi7pLAwH+mC7YEKSDfP1YIg5u4eMfdeuXaoy7rrrLjl/7pyxwii7hA1rUOfYWZCQZMN8PRhizu4RY0fOOm3aNFUZNTU1xsqi7NMnHR0q70S9nz592mkNhCQe5uvBUtBzdk8Y+44dO1QlTJkyhRPmAiadh5WUlDitgZDEw3w9WAp6zp5yY4/urb9YW2usJMpe4VAf9tpJsmG+HizpnL2goMBpAcEi5cau76TZWw+u9N31ihUrnFZBSGJhvh4sBT1nT7mx6w/c81u2GCuIsl84JAbLHKHu7m6nZRCSGJivB1NBztlTauy6tz5hwgR+4AKuZcuWqbaAMwIISSTM14OpIOfsKTX2efPmqYJnb52K7rVfvXrVaSGE3DnM14OpIOfsKTP2nlAPHYWO4TGe3kZBhYWFqk3wzHaSSJivB1NBztlTZuyVlZWq0HnWOqX1cl2dahP4IiYkETBfD7aCmrOnzNj1ErfXd+40VggVPOGLd8SIEapddHZ2Oi2FkPhhvh5sBTVnT4mx47hOFPaYMWO4xI0aID2JbsOGDU5rISR+mK8HW0HN2VNi7KtXr1aFjbup2Iqggi3koGgbkydP5pGu5I5hvh5sBTVnd93YUbijR49Whf1Oc7OxMqhga+LEiap9tLS0OK2GkOHDfJ2Cgpizu27szSEzRyH/27RpxkqgKD18ipEdQuKF+ToFBTFnd93YKyoqVCFzGJ4aSno4fsaMGU6rIWT4MF+noCDm7K4b+9y5c1Uho7BjK4CiIAyb6oNh+vr6nJZD4uXKlSvS2Njo/Cs4MF+noCDm7K4a+/Xr1yO7i6GwTZVAURCGT/Fh3LVrl9N6SLxgMyh85oJk7szXqWgFLWd31dh1vp6bm2ssfIrS2rhxo2or3Dv+ztG7PAbJ3JmvU9EKWs7uqrHrfH1tebmx8ClK6+2mJtVWcnJynNZD4kUbOxQUc2e+TkUraDm7q8au8/U39uwxFj5FaWHjIr0LHYyJxE+0sUNBMHfm61S0gpazu2rsmZmZqnCZeVG3o1/ef79qL0Gc+JVItLFj9EP3ZG02d+brlElBytldM3b95TJp0iRjoVNUrHQutnXrVqcVkXiINnZgu7kzX6dMClLO7pqx64lzvyosNBY6RcWqqqpKtZkVK1Y4rYjEQ6yxA5vNnfk6ZVKQcnbXjB1nbKNQH3/sMWOhU1SsMBcDbQZzM0j8mIwd2GruzNcpk4KUs7tm7OXl5apQ0QszFTpFxerUyZOqzYwbN85pRSQehjJ2YJu5M1+nbqWg5OyuGXtBQYEqUM6Ip4YjPTP+6tWrTktKPNr4bJfJ2IFN5s58nbqVgpKzu2bsWVlZqkA/6egwFjjlonovyrkzXfKl6ZrHpO+w29vbnZaUeIJu7MAWc2e+Tt1KQcnZXTN2/eUSW9DuqUe+OHNGzip1Snev6Tne1Zdd+r3/sCFfvtjpPNes4y8tkvSx6+Wvhtd6TcXFxardJHNr2VsNVQcJG8yd+Tp1KwUlZ3fF2DGMisK86667jIWdTH35tz1SsWimjE1Pk8ysqTJ1ao76f7yfzKzZsmjTQfnM8LqUK9Sr/vhAjfzOee94vxGlj5WfP/7f8mGP4XUhtdfcN/D5Jt1XI+2G13pNy5YtU+93x44dTmtKPDT2fvxs7szXqdtREHJ2V4xdf3Hec889xoJOlroayyQnZIrpM8vkjb9FfdB7P5Ka/HT1ntJXNcrlqNd4Qx1Sm+8YcGaBVDZ9Gh5hCJn9yabnJN8x+vT8GvnYMPJgk7GvXLlSvd+6ujqnNSUeGvtA/GruzNep21EQcnZXjL2rq0sV5JQpU4wFnRR9vlOWwgDTl8rrnxuuH1kvY0PvqejVs4OvpVxtUnMfDHiSbDjSO+j66Zd/pcozLS1dVjUOvh429vukpm3g434UstJkfwhp7IPxo7kzX6duR0HI2V0xdgx5oCDzXbyT/qQ2X/3OtKU75aLhel9HvTw09QGp+cBwLeXqkPqSqTJ1WYOcNl3vqJV8/G0h3VfTNug6jX140NjN+M3cma9Tt6Mg5OzWGvuBVWHjS1vVaLzua/Xuk1L8bSElw9h/aPJdrL4YIutPhGpqatTfmczjW2nsQ+MXc2e+Tg1Htufsrhj73r17VSGWlJQYCzkZOlQWztDTxj4pTYmYAd/TZTS121bnxcRl+e89J1Pxt6WNlQ1HBl+P29g/PyqVC8dKuvrZt6vZ8sJHhp+VIL3o7FhIY08dfjB35uvUcGR7zu6KsWNGMwoRM5xNhZwMXdz964hBTVq1Tzrv1Nwbww0hbiVsslqvvPfcT275Mwcae/8yv3MXB+fxEfUekYqc0M1Q+ljJ0SsH1P9jJYGjHMf0Bzz+jPzF9PMSJBq7N9DD3Bi+7Ovrcx71DszXqeHI9pzd3R774sXGQk6O2qTWmfkOZeZWyOHPbmFsP6S/PNNvcPGopF4+Mf3cYeryRzXhWfHp+VLzkfnvCRv7WJn588FL5TKnL5Oa5s9iRg8uyKGySZKev81ZQndENowNPb/o1QFLAfXNUnrZwchjyRaNPfX4ocfOfJ0ajmzP2V3N2F0fJuv9SF59cJL63UrpM2XDoVhT85FCf88Lzmz5VY2fm58T0sX3tkpBVq78bs+xSP79ZdcxefPZAslUZRH7+s+lpaZGDujVAx9tk9mh50197r2o5/TKgVXhG6WlOy9EPZ5cMWNPLX4wdebrVDyyOWe3dvJcv3rkw5cfUuvZ8R5+yBQ9q8hNSqYU1H4U581Jr/x1vXOjk/5r2XPB9JzQjcHOpaHnpEvZwejHnV58kjP1WHFWfOrwy8Q55utUPLI5Z3fF2FOyjj1GX35QIwWZjrnfwtS8qc9DvWUYcrrk18Rr6o7aauQ+lEFIQ/W8wxMPi+TVs1GP6wl76WVyKOq5yRaNPTX4xdQB83UqHtmcs7ti7PqL857sbGMBu6XLR9bLpND7wHsp3TfMvD1ls+J75eOafEmHqW/7IAEHtzTKKqcMBg61a70nf5gauj71OXkv6vHIvgAxuXuyhfP78Xtxnn+yoLEPxE+mDpivU/HI5pzdFWPHLFoUYCr2ih8ox7RC78W0/vuWStGs+PaQoWLC2qRVjdJluD589Rv72PVHBl/XPfrSfVE3Ir2yrzT8GvPNQPLEveLdxW+mznyduhPZmrO7YuwAhQeZCjdxCi/tGnrDFL1Vaxw99hTMitcz4IfaE/7yp+/Ivrc+HriznjOyMGQZXNgpS526yK8dfITuZ68WGa713xANu9zuUFhJgd/L092Sj99MHTBfp+5Etubsrhn7uHHjVAGeOnnSWMAJkTObe1Wj4RqkTS39Qfnv6PzYi+o9Ihsmhd7rpFX9s9UHqFeanhwb07MOyRlZ+NXLp6Ke26/LTU+qPfLT0n4ilYO20z0lr/wK12I2voncDORLbUfU4y5o1qxZ6u/heex3rlvduPjR1AHzdepOZGvO7pqxo+BQgG/s2WMs4EQoPJs7TcY+2WTIs3vkwz9hfXcCJqC5oPBa9DSZueZV2bd37yC9UvFAeL5A7Ja5OjIYWyr7Ym8Iej6QPzkjFpPKDg7eQ/+DSvkJXpsWem30CEFkwl3oJsN57HKvOz33ESNGqPeLo3+TRdCN3a+mDpivU3ciW3N214x99erVqgCrqqqMBZwIRbaRTcuU3LWvyJFj4Ylrx99+RSoW5Eg6lopVHk1QVp1EXdgtj8RsLDOkYo39YFl4dzgoM1cefv4VdSOwo+Zx+flYlE+65Pxmp5wcNLT/uby+1Cm/2Alykfdzn/yppUPe/Z8ymZn1oGz/NOo5SRDqDu9n9OjRTisi8XCrqMHPps58nUqEbMzZXTN2zGpG4SHTMBXunatXujuPyZG9r8jzv/2tlC6a3Z9vP/CwVNS8Ie+e9smHfxh5/n/UDZ4EePnip/LuGzVS8duH5QH93NmLpDRk8kc+HmJ2/tub5N5b/Myupudl0ezwz/ldzQHpSOLBL1r79+9XbWbOnDlOKyLxMJSx+9nUAfN1KhGyMWd3zdibmppU4RUWFhoLl6Ji9cK2barNrFixwmlFJB5Mxu53UwfM16lEyMac3TVj118u2Sley075R/pOurKy0mlFJB5ijd0GUwfM16lEyMac3TVjByg4FCDzMOp2tGDBAtVecIgQiZ9oY7fF1JmvU4mUbTm7q8Y+d+5cVXi8w6ZuR6NGjVLtBVsSk/jRxq7ld1MHzNepRMq2nN1VY6+oqFCFh16DqXApSuttZ05GVlaW03pIvEQbuw2mDpivU4mUbTm7q8be3NysCi83N9dYuBSltXHjRtVWknlca1DQxm6LqQPm61QiZVvO7qqxX79+XX25QJe6u40FTFEQVk/gg5bMPeKDAozdJlNnvk4lQzbl7K4aO9A5ezJ3oKP8LXxZ6x3nYErkzrhy5Yo1pg6Yr1PJkE05u+vGrnP25G1UQ/ldGF5FG5k2bZrTagjph/k6lQzZlLO7buw6Z58xY4axcClKf3FjG2JCYmG+TiVDNuXsrhs7CiwzM1MV4LstLcYCpoKtKTk5qn1gt0JComG+TiVTtuTsrhs7wExnFN6aNWuMhUsFV28dPqzaBo75/f77750WQ0gY5utUMmVLzp4SY8fdEApv4sSJcuXyZWMBU8HUypUrVdvAcDwhsTBfp5IpW3L2lBg7mDx5sipAnOAVW7hUMIWhVb3b3OnTp52WQkg/zNepZMqWnD1lxr5p0yZVgEuWLDEWMBU8Nbz2mmoTM2fOdFoJIf0wX6fckA05e8qMvbu7WxUe1itzsxoKKioqUm2iurraaSWE9MN8nXJDNuTsKTN2oDereX7LFmMBU8FRW1tbZFdCbKhCSCzM1yk3ZEPOnlJj13fgnERH6Ulz3BueDAXzdcoN2ZCzp9TYATaqQSG+WFtrLGTKfp09c0blpmgHnZ2dTssgpB/m65Sb8nvOnnJjxyEfKEBsSsJeezClM62SkhKnVRAyEObrlJvye86ecmPHJiTYExyFWF9fbyxkyl6dP3cu0lvnEjcyFMzXKTfl95w95cYOYOgoRAx/xBYwZbfwRY26x4x4QoaC+Trlpvyes3vC2FFwWVlZqiBfrqszFjRln5Ct6w1pbDgDmSQH5utUKuTnnN0Txg4aGhpUIU6YMEHdLZkKmrJLJYsXqzpnb53cCubrVCrk55zdM8YO9Lr2xx97zFjQlD3CVsKoawx19YR6YYQMBfN1KhXyc87uKWPH5Cm9Sck7zc3Gwqb8Lwyn6qNZKysrndonxAzzdSoV8nPO7iljB/rufNasWVz+ZqmeefppVcfYw8DPBy2Q5MN8nUql/Jqze87Y8UHWJ7+9sG2bsbAp/wpbx+rlbS0tLU6tE2KG+TqVSvk1Z/ecsYO9e/eqwsQBMTACU4FT/hNGYPLy8lTdLl++3KltQoaG+TqVSvk1Z/eksQPsQoYCxVAIh+Ds0NryclWnWNp49epVp6YJGRrm61Qq5dec3bPGjiH5HGeCFQ4IMRU65R+9sWePqktMjOQQPLkdmK9TXpAfc3bPGjs4ceKEMgIUKreb9a9OnTwpY8aMUfXo5zOOibswX6e8ID/m7J42dlBbW6sKlXm7PxWdq8+fP1+dDUDI7cB8nfKC/Jize97YQXTefqm721j4lDeFzYZQd8jV+/r6nBol5Idhvk55QX7M2X1h7NFL4ND74/p2f+j5LVtUnTFXJ8OF+TrlJfktZ/eFsYOurq7IQTHFxcU0d49Ln9gH4RwAQoYD83XKS/Jbzu4bYwft7e2SmZmpCpgz5b0r7AOvJz1WV1c7tUfI7cN8nfKS/Jaz+8rYAYZCtGngwx9bAVRqhT3+MdFR1w8h8cB8nfKS/Jaz+87YQWNjY8TckeOaKoJyX8ePHVPH7qJeVqxY4dQWIcOD+TrlRfkpZ/elsYO6ujpVyBDyD1NFUO7prcOHIz31pUuXclkbiRvm65QX5aec3bfGDjApS/fcly1bxgl1KVLDa69FDnahqZM7hfk65UX5KWf3tbEDDMsj90CBFxUVcZ27y6qqqhow54GmTu4U5uuUF+WnnN33xg6OHz8emS2Pde40d3eke1YQt4oliYD5OuVl+SVnt8LYQWdnZ2Sde3Z2tpqdbaoY6s6FO1eMjqCs0VvHtr+EJALm65SX5Zec3RpjB9jEZubMmRHD4Yz5xAs3TLhxQhljlARRCCGJgvk65WX5JWe3ytjB9evXpbS0VBU+hJ4lepixFUQNXy9s2xaZJIcbKIySEJJIdL5OUV6W13N264xds2vXrkjuzqH5OxPmLJQsXhxp1Lhxwg0UIYlE5+sU5Qd5OWe31thBd8iQdA8AQ/Nry8s5sW6YwtBT9ND7jh07nNIlhBDiRaw2doDhkvKQoeu7LJgUzMpkYlS/PunokAULFkTKDTdIHHonhBDvY72xa3CAjJ5YB8G0YF4mUwuysMnPxo0bI1n66NGj1ax3rk8nhBB/EBhjBzAnmJTO3mFezzz9NCfXOcJIxrRp0yI3P8uXL5e+vj6n9AghnuDG13LmnQZ59qE8mTo+fAOelpYh46culN+82Cz/6/0zSkiSCZSxa65cuaJMSxvYqFGj1PKaIBo8eujYElZvvADNmDFDWlpanNIihHiFbw6XyviMsJHPXt0g73f1hW6+e0JG/5I8nB3+/KZlr5PWa84LSCAJpLFrYF4FBQURQ0MPHhsQnD1zxmiCNgm7er1YWytTcnIifz82+OGwOyHe5VJDvvqsZq9rlUHefalB8p3P8vjNHc6DJIgE2tg1WLYwf/78iMHB4B9/7DErl8idOnlS/vDcc5HjVSEMv2O2ux/OGSYkyISNPV8aLjkPDOCSNOSHP9Np+Q2hf5GgQmOP4vTp01JSUhIxPG16mEwGQzQZpR+E3vnLdXXyy/vvjxzYAmGmOwydPXRCbCDK2MuOyk3nURI8aOwGYPBYIjdu3LiICUIwRgxf+2EtPLLz/fv3q+Ns9TnpEIwdNy/Yk5sQYhFf7ZZF6nOeLU99+K3zYD83zr8paxfeLSOd74Lb0qNNMvgnEa9DY78F6MnCAHHGuD4aFoI55ubmqg1vYJ5eOYXq3ZYWtT9+YWHhADOH5syZo/Lzq1evOn8dIcQabpyX+kLMkB8p/779wqDe+rcdVTJbTbobnvLqLzg/gfgJGvttgu0uGxoaZN68eQOGsyFk8jiNCjPrX9+5U9ra2ozGm0idP3dO3jp8WJ2Hju1eMbM/+j1BOTk5UlFRwY1lCLGRm/+S/+s5I+80rJW5I9Nk5Ny1svvEPwYPwV9rlXXZGVJY3S5f3wiZfNOjoe+HjFCv3rmu+Ep2L8L3Rp7Qy/0PjT0OsE96c3OzMs25c+cOMnoIj2HZGA6hQc8eQ/hvHjig9H5rq9ocxzT7HsP8uAbp52M5GnL+JUuWyKxZs4wmDsHIsY87cvOenh7n3RJCrCNqBnxYI+Xeh56V3e1fS+wU2O9O/lmKn+qfRf/hU+jZl8i+b5wHwDf7pAQ/Z/xm4Xx6/0NjTwDa6Dds2CDFxcUDNnlJlpD/46Zi9erVNHJCggZ6631Yw94nXX87JA1r5zrZeYZMXdMkl4ecOXdB6vNCz8urD/1fP+FefOhxZupWQGNPElg6hkl4OK+8srJSbYhTUFCghJ48etdYNx5r2NgVD9cgDPvj+ZjshpsGRAHYGpc5OSEklmut6yTb+R75afVZ86x4p2eeMWAc/qa0rgvvYMdM3Q5o7IQQYgXfyl//y9lidogh9Zsh888IXS8ZMA7fIZvH44YgNncnfoXGTgghlqB3pktLK5TthnSuY/P40LXpEurQ99OzXQrVa2Jyd+JbaOyEEGIJ/cb+qDQNCsvPSvV0XCuTo1Hj9DePloVfM7069AxiAzR2QgjxBc7OcuN/L21DTI4L98hDzzFtKXv+JfkprhVul+jO/IX6vPBruFudNdDYCSHEF/RvGZtfP3gTGrl2VMqcrPzRptgjYm5K2+/Dpj99wDi8SOs652eaN6AnPoTGTgghviBqL/i0bFlYdVDO9PQf2/rIVEycy5DZm9sGn/z21T4pcY57Xdc68JZA9/Knbz0lN298Le0vPSgLa8/Id8514j9o7IQQ4hNu/uuynDn4opQ9lCfT7x7pmHyaZIyfKnkPVcnBc4ad5+QbOfCwM1velL1fa5Vn7w3/rJF3L5S1u0/IPzgm72to7IQQQohF0NgJIYQQi6CxE0IIIRZBYyeEEEIsgsZOCCGEWASNnRBCCLEIGjshhBBiETR2QgghxCJo7IQQQohF0NgJIYQQi6CxE0IIIRZBYyeEEEIsgsZOCCGEWASNnRBCCLEIGjshhBBiETR2QgghxCJo7IQQQohF0NgJIYQQi6CxE0IIIRZBYyeEEEIsgsZOCCGEWASNnRBCCLEGkf8HF/Rupn2eJ6cAAAAASUVORK5CYII= | As shown in the figure, there is a circle enclosed by a wire, and its area is marked in the figure. What is the radius of the circle? (Unit: cm) | A. 5; B. 3; C. 2; D. 1; E. No correct answer | A |
121 | 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 | As shown in the figure, there is a circle enclosed by a wire, with its radius marked in the diagram. What is the circumference of this circle? | A. 10π; B. 3π; C. 2π; D. π; E. No correct answer | A |
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 | As shown in the figure, a wire is used to form the circle on the left. The same wire, with a length of 10π, can also be used to form the isosceles trapezoid on the right. What is the length of the legs of this trapezoid in π? (Unit: cm) | A. 4; B. 5; C. 3; D. No correct answer | C |
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iVBORw0KGgoAAAANSUhEUgAAAhoAAADICAYAAACu0EgrAAAAAXNSR0IArs4c6QAAAARnQU1BAACxjwv8YQUAAAAJcEhZcwAADsMAAA7DAcdvqGQAACcjSURBVHhe7Z1/bNRV3u/7x6bdRHCNiAG0SU1JiqEbJGjDY3WdbmRXcokMD8QaH3DrYp9gF5/tDXVBXFYekcCmTdAHNjU2W8IKUm9Z696qKGgR0GLlCq2ApcLdCuwuKOExSG5Iun987rzPfM8w0zktM9P5/n6/kneiM9PSOefM9/uec97ncwqEEEIIIcQmaDQIIYQQYhs0GoQQQgixDRoNQgghhNgGjQYhhBBCbINGgxBCCCG2QaNBCCGEENug0SCEEEKIbdBoEEIIIcQ2aDQIIYQQYhs0GoQQQgixDRoNQgghhNgGjQYhhBBCbINGw2GuXLkihw8flp07d8rzzz8vNTU1Eo1GJRKJyOzZs6WkpESpoKAgRePGjVOPT506Vb0WWrx4sSxbtkw2bdoknZ2dcurUKetfIYQQQrwBjYaNHD16VJmA5cuXy4MPPiiTJk1KMxD51g9/+EMpLy+XRYsWyapVq6Sjo0O+++476y8ihBBCnIVGI4/09/dLc3OzPProo6OaiqKiIpk+fbpE58+X+vp6Wb16tbwUMyTQn7Ztkz/v2qX0WU+P0r6ursRjWzZvVq/7/caNsmLFCqmtrZWqqiqZPHmy8d/Suuuuu6ShoUF2796tZlUIIYQQJ6DRGANXr15VMwZY/jAtd0AzZsyQxx9/XF74z/9UJgLG4fw//mGLTp86JR/s3avMDgzMvHnz5NZbb037m37wgx+oZZrf/va3yhwRQkj2DMk3h7fLswsqpKysLAvdL5t7rV9BQgGNRg4cOnRIZSNuueWWtJs4MhS/fOIJ2draKgMnTxoNgdM6eOCAMjoPPfSQ3HjjjWl/8913362WeC5evGi9Q0IIGY1L0r12phQNu5ZkpiXSedn6NSQU0GhkyODgoKxbt04ZieQPzQ033CDV1dVqFqGvt9d4o/eaMOvxuzVrpKKiIuW9YKYDwdT29nY1W0MIIekMyUBLlRQVzZRlLfuk//w5af8FriGV8l9Hz8v581rn5O26H6lrS+V/HU16/L+FV5dwQaNxHfbt26eCnMNvyD+5/36Vl8Byhelm7hd1d3errMcdw5Z+brrpJrUrhkFSQkgKVw7J70pjpuKEtgt90lgWu25MXCs91iNxemTtRFxPyqSxz3qIhBIajRGAwYhEIik332nTpqng5pHPPzfetP2uv7z1lvzbY4+lLK9gFwvyHvgmQgghiqEhGbL+Uy60SRTXiyWdkrIi0tcoZXi8qF66Ei8mYYRGYxgId953330pBgPZhvd27zbenIOorwcH1c6W5FkObThYq4MQkszQnjp1jahoHrAeiXO6pTJ+/Yi2yQXrMRJOaDQs9u7dq7aA6hsrlkeQvUCewXQzDoPOnT2rDAdmcpLbBbtsOMNBCAF9jWWxa0ORPLPfekBxQdqi8WvGcANCwkfojca5c+dU3Qt9I0WNC2xHRXbBdPMNq7CLBrU/dDshw4GdKv/85z+tliSEhI/T0lKJa0JU2lKmLfbLM0V4fLgBIWEktEYDN8gNGzao0t765ol8gl92jrglGI7kJRVUIT148KDVqoSQUKHzGWWNkpL31PkMbmUlMUJpNLBMkrwcgP9GENJ0Y6XShQzHyt/8Rs3+6DbEuStcTiEkXFzuXBK/BtTtuRYOjXGhLRp/vKJZuHBCQmU0UHobN0R9c0QNDBSyQhbBdEOlRheqnCIoq9sTyyk4LI4QEgYuy7tL4182qloHrcfi9KydGL8u1HdZj5AwExqjgQPOkott4ZyRoG5TdVqv79iRspyCqqks+EVIwPnbdpmrPvPpdTK66uPXAj3TcfWvu2X9+k45y22uoSQURgNVO7E9EwMfNSKQMzDdMKncheUUhGi12cAOHm6FJSSoDEnP2uL4591QJ2P/M3pZdbzcVnabjI/9d3H9HvmGRiOUBNpooKoljkvXNz8ccGbnoWbUP5Spw5IU2htBWy6lEBJAPl8vxdZ1Na1QV4yhgRapUrtOYioqlcdajsgl6zkSPgJrNA4fPpxyourTy5czi+GQsDU4eSssl1IICRZD339rnVtyXr79foRpiqv/HXv+WxnpaRIeAmk0Ojs7E9tWb775ZpUhMN0QKfs0fCkF1VYRxiWEEBIuAmc0XnvtNVW9Eje3WbNmMfDpsnDwnO4P1NzgFlhCCAkXgTIaqFSpv0Hfe++9vj9ZNSj6865didwGdv709/dbPUZIcEE+CeX6qfCI1zYzgTEaOPBLm4x58+Yxj+Ex4VC6W2+9VfXPpEmTVIaGkCATGXb6MxV8Pf/881bvk2R8bzRQSjy5CBdyATQZ3tTBAwcS9TaQoWHpchJUEH7WW+rxxQcHNFLBFZbp0deRmLkk6fjeaCSbDOwsGX5zo7wlnCWjy7/TbJCgsm/fPjXGUbfH9DmggiUsD6O/YS65wy4dXxuN5OUSlBI3DQDKe0J2pqKiQvUbypZzXZMEDUyhY3yjRL/pM0AFS9hl90Pr7CeYTJKKb41GcvCTMxn+08DJk4mS8Mhs4Lh+QoJCxMpn8AtQeFR5772qz5nTSMeXRgNbWLXJQCbD1OmU94VllOLieBljLKdw6ysJAsn5jA/27jWOfSp4WrFiherzCHMaafjOaKAYl67LwN0l/hcCono3Cot6kSDAfEY4xZzGyPjKaGBLpK74iTV+moxgCFtfdZ0NrGkT4meYzwinkNMoYk7DiG+MBg5I02eXYCsRi3EFS395663ETNWGDRusXifEf0SYzwitUCgSfc+cRiq+MRrRaFR1IKYjeQJrMIULM/oYhoPbXokfYT4j3GJOw4wvjEbyDpOtra3GDqaCIUw3o59vv/12uXjxojUCCPEHzGeEW8xpmPG80UAuQ0+p19bWGjuXCo6w7VXvRGFeg/gN5jPCLeY0zHjaaCTnMmbMmMHwZ0iEcCjzGsSPRJjPCL2Y00jH00bj0UcfVR3GXEb4lJzXOHTokDUiCPEuzGdQEHMa6XjWaOyNfVDRWRBzGeHUnDlzVP+Xl5erw/MI8TLMZ1AQcxrpeNJo4KaiD97iWmd4deTzzxP1NRAIJsTLMJ9BQcxppONJo4F1eXQSOotLJuHW6tWr1VjA4WssUU68TIT5DMoScxqpeM5o4GaCmwo6CTcZUydS4RECwHp2a/HixdYoIcRbMJ9BJYs5jVQ8ZzRwM0EH4WRP7jKhIFQNxZiAkN0hxGswn0ElizmNVDxlNFANUt9Q0FGmDqTCqerqajUuMLvBYCjxGsxnUMliTiMVTxmNiLXGuXDhQmPnUeHViePH1bdFjI+tW7daI4YQbxBhPoMaJuY0ruEZo6GnHlE3obu729hxVLil1z2xrMZZDeIVmM+gTGJO4xqeMRroDHQKpsiTO4uitFCenLMaxGswn0GZxJzGNTxhNPQHFTp44ICx0ygKenr5cjVOOKtBvALzGZRJzGlcwxNGAx9QflCpTNTX25v48O7cudMaQYS4R4T5DGoEMacRx3WjcfToUdURENc3qUyEU3wxXu666y5rFBHiDsxnUKOJOY04rhuNaDSqOuIn999v7CiKGi5Ui9Wnu3Z0dFgjiRDnYT6DGk3MacRx1WicO3cuccN44403jB1FUSZhCzTGDZbbCHEL5jOo0cScRhxXjUZjY6PqgDtKSoydRFEjSVcLhVHlGSjELSLMZ1DXEXMaLhsNrLGjA7COZeogihpNxcXFavzwZFfiBsxnUJmIOQ0XjUZyCJQFuqhcVF9fr8YPQ6HEDZjPoDKRzmmMGzcutFvyXTMaDQ0NqvErKiqMnUNR1xMMKsYQdOzYMWtkEeIMzGdQmSg5p3Ho0CFr9IQLV4wGXN3tt9+uGv73GzcaO4eiMtGsWbPUOFq1apU1ughxhgjzGVSG0jmNDRs2WKMnXLhiNHbv3q0aHS4PZaVNHUNRmQhGFWMJxpUQp2A+g8pGOqcR1l1yrhiNZcuWJRrd1CkUlalwqqveIh3WaUniPMxnUNko7DkNV4zGtGnTVKNz2YTKh/TySVinJYnzMJ9BZaOw5zQcNxqoeYDGhrjbhMqH9O6TsE5LOsnBgwet/wo3EeYzqCwV5pyG40bjtddeU42NGgimzqCobJU8LRn245jtBm0cdrPBfAaVi8Kc03DcaNTU1KjGrq6uNnYGRWUrlvl1Dm3owmw2mM+gclGYcxqOG42SkhLV2C9t2mTsDIrKRSzz6wxoY32xDKvZYD6DykVhzmk4ajQGYw2tL1R9vb3GzqCoXLR69Wo1riIhP47ZbvTnFwqr2cAYw/tnPoPKVmHNaThqNHQ+Y+rUqcZOoKhc9XZnpxpbWDsPa5lfJ0AbQ3rnWNjMBvMZ1FgU1pyGo0ZDlx2Pzp9v7ASKylWYlsTYgliO3D6S2/i+++5T/x0ms8F8BjUWhTWn4ajRiEajqpF5WqvXdUZOHeuVk4Om57yryZMnq/HV0dFhjTiSb9C+EJZBr1y5EjqzwXwGNRaFNafhqNEoLy9XDdzy6qvGTnBOg3Kyt1flRPp6j8mpM6bX+EVxUxB/L/3ytfE1yUp+/Qg68LLMLSyQ2nbTz3tXP7n/fjW+GhsbrRFH8g3aF4LRAGEzGxHmM6gxKow5DUeNhi4V7c7a5hk5tnuLLH1gkozDRXFSqZSWlsqkcfELZ+GEEnngkU3y7oDpZ72lr49+IDubnpa5M+PvBX9/QoUTpLy6Sd774ozxZ8//o1ua7hn2MyPIb0bjl088of7uJ5980hpxJN/osaGNBgiL2WA+g8qHwpjTcMxo9Pf3Jy5SmD4ydYB9+lL2rqmUQlwII+vk7aNJ//6ZL6Stdor1t9VIm8dnNz7bHFHvA39vYXmdvH7AmsU485V8sqNOygvjzxVMqZVdX6b/fOZG4x5p6jb9vHeFb5n422fPnm2NOpJv9PhINhrAu2ZjSL7/tl8+ff99eR/6tF++/X7Iei47mM+g8qFcchpD338r/Z9aY/j9T6X/2+9jI9s/OGY0Oq1dAXeUlBgb3071b1sUvznfuUY+NBmJgW2yCM8/9Ip8Mfw5j+lQ0z2qHQumrJB3De/l6CsPJYzInes+Snv+mtH4N9lqWjZJyH9LSn/atk2971tuucUadfaydevWeF+EUMONBvCa2bh6Yrs8VjpRbvvZL2TlypVSt2C6jFd//3iZXrNdTmRZRJb5DCofyiqncfWEbH+sVCbe9jP5RWwMr6xbINPHxz+D46fXyPZsB7FLOGY0sG6OxpkzZ46x8e3TtW/wMzd+bHgeel9emFkq/2Oz989e+aw5qpZ8nto5YHz+fN8r8lDsveL9mo2Tbo9a2ZX2nL+Fs3PU+47p4sWL1sizDxqNdLxiNoYGWqSqqFjquy5Zj8SB+XikOP4eiqpa5bT1eCZEmM+g8qSMchpDA9JSVSTF9V2SMophPh4pVj9fUFQlrdkMYpdwzGjoo+GfeuopY8PbJj1bEdP8P35pfk2g1C611vstuKdJDqU9nw+jkUGgNE2ZBFXHLvW+Y3Ii0a2NBpZqcOMNk0ab8nXfbFyWd5fiG2Od7DHML1/qXCJFapxMlOe6M5uAZj6DyqcyyWlcfnepGqd15kEsS4ri17qJz3V7fhnFMaOhzzhxfGtr0jf8Cb/ulLOm1wRJye93xTuG14zNaPTvaZJ/LSlUvz8rzdwonxh+X76F9XP8e06ceaKNRoTVSNNw12yclpZKjLsiibb9zXosicFWqbLGZWVLZl8Hmc+g8qlMchqnWyrVa4qibZI+igeltcq6tla2ZDUz5waOGQ33amh8JOvutDqkYIrUtudpVuPMV3Lc+M09G+U/B9H/x4cT77XhHdPOk+FG49pW3+NfjbRTJa7+9lqZgt89bpKUllo7XgonSElpfAdPXCUyQQVSC2VCSdLjK/+38XfmWzgVGO9/b+xbp93QaIyOe2ZDz2jExmFVa+ySPIwLbRLFczFVtZqXgIbDfAaVT2WS09AzGgUFVZI+TC9IWzQ+ho1j3GM4ZjQi1vqmG4ep9bfVyATVYdAUeXjLR2Ofxu9uknsSvzNX5Xlnx5l3pGFK/HdPqXtTvjK9JmE07pQH5palbY8dVzZXVu34NL19jrwiDxWOk0jTh3FzpGdOFm1L/XcSMyqL5E8ubBVGeXu8D5gAu6HRuD6umY1LR2T7iy/K9iOpGQ1Fz1qZqMZopWQ4ocF8BpV3XT+ncUmObH9RXtx+JDWjoeiRtRPj1+xMZ+XcxDGjoS827pzaekY+2RRJualim+te4/bPDNXTLAtSvsnnoqg09xh+d076UnZZ23QLK5vkkxFnSgbkw00LpKxsgazbdSBR/fPr/gPy53UPx2csCgqlpK5d+pN+7uwXHfLCpneuLT29Wad2twwP2H61bVG8jSs3yWdJjzsl/eGl0fAOXgmIxhmS7ucmqr+l+Jn9ctl6dDSYz6Ds0FjqaQx1Pxc3y8XPyP5MBrHLOGY09PHw7lUFRcGudRKxCnQpTXlYXvl49OUCfyhmpJridUIKy1dIZ84GKvZ7NlrbZwsmSG37CDtbYvpwTWnsNYVS92by42diZiee3yhd82HS485JG43NmzdbI88+aDQyxzNm43SLVMb+hqKqFhnIMEHHfAZlh3I/98TKIBVVSUumg9hlHDcaaFxTozumwY/kDw/rAl0wG+Z6FH6Szk4UltSNUKQrC51pl1pd9GvEuiJ98spDeM1D8kpf8uPvSMMEPF4YMynuGLjq6mr1t2NN3W5oNLLDfbNxSTqXFEnRzLXSbVhRGQnmMyg7lOu5J2rXVNFMWZvNIHYZx4yGLj/uutGAUqqBFsiibSN/c/e6+tvrpATGYMRKoNlKm4iYCuukw/QabUZK18iHyY9/vFFmqjYdbkCcE42Gt3HTbAz1rJXi4noZVlrjuqB/8fcyn0HlW1mfezLUI2uL0+vDeB3HjAYaE/KE0YCObJGfWn9TYd2b5teMJg/sOjn7cZNU5tVkxLWrNt4uI26BfWdFPFxb05ayXTiRzxhuQBwUjYb30e0GYdu7M2AnSpU0ZznVzHwGZaeyzWlgJ0pV84Cvyo8Dx4wGykKjQT1jNBK7L2KqbTc8fx25vevky3apxQ6TwkppymvO5Iy01ei/z2w04vmMAqnc1JPyeEddPJ+Rk3HLk2g0vE17e3tidnPRokVZrk2PgaE9Ul/flfUFmvkMyk5ll9MYkj319dLlN5cRw/GMxhtvvGFs8Hzr6/5e6Tv21SgFuj6W38+M31CH3zAzkpu7Ts58LE2VuKmPUhfkyP+SF371qnw07HHVLqNW6bzWLqNXFp0gDe+YHo+581f6kh53VvhmgL9h3bp11sizDxqN7HDNZICBZtnQmX08n/kMyk5ll9MYkOYNnRntlPIajhmN8vJy1ZjObG+1cgbGG6WlxNLJT+UPRwzPe1bXdpjcs/HjEYzUGflwzZ2x95Y+IxFfFpkgv+4cYRYkaUnpp1uOpD//0Tq5Uz0/vE7GtdLn146XPyNnHQ7acnurN3HVZIDj7dJ+3PrvLEDf4m9mPoOyS5nnNI7HPkc5DGIP4JjRiFgfWEeMRuJ8kxFMRCIMWiiVTSPdrD0qVTgL7+0O+fm//0qW/ypdjzxgVe0c0Wig1sZG2W/V0EgoMVOC5021OM5I568nqOfT62RcMxr3vLhX+g7skP+YNU4mLH5dTqS8zl7NmDFD/Q00Gt7BdZORI8xnUE5oLPU0/ILjRuN3a9YYGzuvsopJ4d8rmPKArPrjB/KZCl/2yAevN8nS2A2woLBE/jUfFUIdVdKNPhMZZnR0jgIqnPAvsrSpVdp27pStTU/LHOsMk5GKmZ39eGMil5JeJyO51Lv1+8dU0yM36RLkuLnZDY3G9fGGybgkX775krzYclDOZrG+zXwG5YQyzWlc+vJNeenFFjmYzSD2CI4ZDUcPVRvsj32jflva/vBC7Bt+jcydeS0XMXNujbzwh7flk+uc6+FN9UhzNDnjcR1Fmw3VOc/Iqf/zgXSgbWrmykz92plzpWZlk+zc98UIMzz/V9qf1r97przwfvprzn68VZY+EP9d/7FltxxzoT7J5MmT1TjjoWru45WZjAu7HrHOjCiQH798wnr0+jCfQTmhjHIaF3bJI9ZprQU/flkyH8XeIJhGgwqt1AcxJhoNd/HSckmuRgP9ip9hPoOyW9fNadBoZMaqVatUI0Xnzzc2NEWNVSeOH49/EGPq7++3Rp59aKNx0003qZtSmHT+/HmrFdLxXCZj6Bs5vP1FWfnSnoyXTpjPoJzU9XMaQ/LN4e3y4sqXZA+XTkZGX5QR1jM1NEWNVW93dqoxhpucEzc3PabDqMFB88HUnjMZOcJ8BuWksqun4T8cMxpYe0JD3nDDDcaGpqixasvmzWqMTZs2zRp19nL06FG1jh8moX0hk9EIiskA+r0yn0E5oVzPPfELjhmN7777LnGROvL558bGpqix6Only9X4ikaj1qgj+UZ/hocbjSCZDBCJMJ9BOauszz3xEY4ZDaDLkL++Y4exoSlqLJo3b54aXw0NDdaII/kG7QslG42gmQzmMyg3FOR6Go4aDX1q4/r1640NTVFj0fTp09X4amlpsUYcyTdoX0gbjaCZDMB8BuWGgpzTcNRoLFu2TDXkL594wtjQFDUWBXmN0yugfSEYjSCaDMB8BuWGgpzTcNRoNDY2qkasqKgwNjRF5aru7m41tqCLFy9aI47kG93G+CwH0WSACPMZlEsKak7DUaOhpyTh2uDeTA1NUbkIZ+hgbOGUYGIfaONkBc1kMJ9Buamg5jQcNRrJH2KsR5kamqJyUXV1tRpXqEBL7ANtrBU0kwGYz6DcVFBzGo4aDQCnhoZkKXIqn9KHqe3cudMaacQO0MZQEE0GYD6DclNBzWk4bjSw9oRGxFqUqaEpKlt91tOTuAGOVhqbjB20cVBNBogwn0G5rCDmNBw3GrpCKFzb6VOnjA1NUdmoqalJjSmnKoKGmSCbDOYzKC8oiDkNx40GLlJYf0JDsnAXlQ/hoD6MJ2yfJvYSVJMBmM+gvKAg5jQcNxoAJaLRkCgZbWpoispGt956qxpPHR0d1ggjJHuYz6C8oCDmNFwxGputw6/uKCkxNjRFZaq/vPWWGkuo6YDzdAjJlQjzGZRHFLSchitGAwWVdLEfHO1tamiKykSPP/64Gkc8SI2MBeYzKC8paDkNV4wG0Adg4UZhamiKup4wxYj1dIwjlMMmJFeYz6C8pKDlNFwzGqh3gIa8+eabWSWUykktr76qxtBNN92kvpESkivMZ1BeUtByGq4ZDdwY9O6Tra2txsamqNGEmwLGz5NPPmmNKkJyI8J8BuUxBSmn4ZrRALhBoCH5LYLKVieOH0/kfA4ePGiNKEKyh/kMyosKUk7DVaORfMgabhymxqYok9avX6/GDg9RI2NFX4d+xHwG5SEFKafhqtEAt99+u2pMnn1CZapzZ8+qrdEYN1hbJ2QsMJ9BeVFBymm4bjQ2Wcd7I+3NUCiViZqbm9WYwXQ3zzYhYyXCfAblUQUlp+G60cD66KRJk/hBpzLW9OnT1Xipr6+3RhEhucF8BuVl6ZyG3+sEuW40gJ7VQClpzmpQowk7lDBWOJtB8gHzGZSXpXMa2MLvZzxhNK5cuaIaEg3KWQ1qNOnZDG5pJfmA+QzKy0rOaRw9etQatf7DE0YD6A88Qn4I+5kanQq3tLvHttZTp05ZI4eQ3Ikwn0F5XDqngZl/v+IZo4EDsfSsRlNTk7HBqXCroqJCjY+amhpr1BCSO8xnUH5QEHIanjEaQM9qoCz5wMmTxkanwqkt1om/nM0g+YL5DMoPCkJOw1NGA1kNXVeDh61RWjCdCApjXDQ0NFijhZCxwXwG5QcFIafhKaMB9GFr+Ob63u7dxoanwqXa2lo1JmBCYUYJyQcR5jMon8jvOQ3PGQ3w4IMPqkadNWuWsdGp8GhfV1fiTBMeBU/yBfMZlJ/k95yGJ41Gf39/4ubCYGi4pQOgQThYiHgH5jMoP8nvOQ1PGg2watUq1bAMhoZXL1mF3PDNkwFQkk+Yz6D8JL/nNDxrNJKDoVVVVcbGp4Kr7u5uueGGG1T/r1u3zhoVhOSHCPMZlM/k55yGZ40G2Lt3b2IJZfXq1cbGp4InuHddAfTuu+/2/RHJxFswn0H5UX7OaXjaaAA9xQnD8Ze33jJ2ABUsYWsz+hzrkYMx00FIPknkM370I+P4oygvys85Dc8bDXyb1btQJk+eLCeOHzd2AhUM6SPgoY6ODmsUEJI/mM+g/Cg/5zQ8bzQATunUR8kzrxFcJecyeAQ8sYsI8xmUT+XXnIYvjAZIzmus/M1vjJ1A+VenT51iLoPYDvMZlJ/l15yGb4wG0FOeEKbYTR1B+U84rXfOnDmqX5nLIHbCfAblZ/k1p+Ero4FvuYsWLVINjdmN13fsMHYG5S8tXLgw0acHDx60epuQ/MN8BuVn+TWn4SujAWA2ItYaK9bzuRPF39LnmMBksMQ4sZsI8xmUz+XHnIbvjAZAMS+s46OxcarnwQMHjB1CeVu42KMPoc2bN1u9S4g9MJ9BBUF+zGn40mgA7ESZNm2aanBse+3r7TV2CuVNbYkZC20yMJ1NiN0wn0EFQX7MafjWaACcf6G3vU6dOlU+6+kxdgzlLeEME72DaPny5VZvEmIvzGdQQZAfcxq+Nhrg2LFjCbPBZRTv63dr1qi+ghDs5TZW4hQR5jOogMhvOQ3fGw2AY+X1AWw33ngjA6IelQ5+QpjJoMkgTsF8BhUk+S2nEQijAZIzG9iNwq2v3hHqZETnz0+YDGYyiNMwn0EFSX7LaQTGaIDvvvtO7rvvPtUByAC0vPqqsZMo54SKnygbr/uEu0uIGzCfQQVJfstpBMpoAGx9xXQSOgB6evly9Y3a1FmUvcLZJbqsOOtkEDeJMJ9BBUx+ymkEzmgArP3X1NQkzEZFRYUc+fxzY2dR9ggl4vUBabfccgsrfhLXYD6DCqL8lNMIpNHQbN26VcaNG6c64+abb5atra3GDqPyJ0zpPf7446rNISxlnTt3zuoRQpxH5zOg4uJiigqEcE/DmPZDTiPQRgNgR8pdd92VuNBg5wOXUuxR8lIJtGrVKu4sIa6j8xkUFVQdPnzYGu3eJPBGA2DqdNmyZYlOmTFjhuzr6jLeLKnc1NTUlLJUsnv3bqv1CXEXfNnArAZFBVXYdellQmE0NDt37kwspSCciNkN7Iow3TipzPRezFDMmjUrYeK4VEIIISSZUBkNMDg4KPPmzUvcGHFOCoKLppsoNbIGTp5UWQxdShxhuw0bNnCphBBCSAqhMxqajo4OKSkpSRiOn9x/v8oYmG6qVKqwTKKDSBBSzzBwhBBCyHBCazQAam4gsKi/laMACpZTuBXWLOzaSQ57wqjBsBFCAsrQ93K29z1peXaBVJTdJuOtz35B0UQp/dnT0rLvr3LVeikhIxFqo6FBWExXFIVgPKqrqznDERN26KDCarLBQPvAoCFkSwgJJhfe/58yfXz8M19U+pi8vK9fhQ7P938qO56dnTAdxUvflb9ZP0OICRqNJPDtPHkrLG6oKFkcxiI/MBg4zv2OpOUl5DBQCA3H8xNCgs3plsr4Z7+4XrouWQ8mGJKBZuv5giJZ+u5l63FC0qHRMLA3ZiwiVslirTlz5qhv9ihINfymHCRh2Wj16tVpBqO+vt7zW6gIIflDG42520eYrxhslSrrGlFQ32U9SEg6NBqjgP3JkWGGA8fQY7dFkI6ixxbfLZs3q0Bs8ntFxTkskdBgEELS6ZJ6fb2g0SCjQKORATinA0sGugaHFr71o978Zz09xhu4l4WlkTfeeEMWLlyYKLSlVV5erraq4jRcQggxMtAsFdY1o7LltPVgEkPfyOGWGpk5MX7KaOYqk8Y+63eQQECjkQUIP7722msqt6F3qmhNnTpVzXSgJseJ48eNN3e3hawJTq/E34+ZmeS/H9U8sTzihyOHCSFuMyR9jT+OXz9MGY6hAWn9+fiUa0zmqpM9Q9bvIYGARiNHUP2ysbExJTyaLOzSwFbZP23bJn29vcYbv51ClgRl1n+/caNE589PMxYQshePPvqodHZ2stAWISRDrsqJ7Y9IMa4j438urQPDXcFl2f9MccyALJUdvX+PvfqydC7BNScqbReslyguy7tL47Md0dQnSMCg0cgDKFaFk2Jx0540aVLKzVwLyxMwH7jpY+YAmQiU70aFTZNRyFTYgvv6jh2yfv16+eUTT0hVVVVKkDNZmIWZPXu2yl3gLBLUESGEkOszJN9/Oyi977XI07MxUzFeZj+7W/5q2uH+/07Iqw8/JZ2JWY4eWTsxdg0qa5SUFZGhLqkvwrWpQpoHrMdIIKHRsAHU5cASCipmIlBpuukPF4qF6eN/7733XiWYEtTzwI4X/D8Og8PzKJtu+h0mYcYFxgZbd5m5IIRkz2lpqRx2bRk/XRY82yL7jE5jGKdbpBI/U7cnZleS6FkrE/H4xLUxK0KCDI2GA1y8eFEFSmE+Ghoa1Fkr06ZNS8t55CqYmbvvvlsWL16sQpzt7e1y7NgxFtQihOQBzGacjxfrGuyV/TvWy4LpOn8xXmav75a0MhtJXO5col5b1Zp6TEFfY1n8dyzpFFbhCDY0Gi6CXASWXWAK9HG/OGEWyzDQ888/r4QsiH4MSx76tfhZbj0lhDjPJemqL7bMRpFE20auDdqzdmLsNRNlbcq0xaC0VsW/KA03ICR40GgQQgjJnqFueQ7ZC5iN4fmLBH3SWIbXLJHO5GmLoT1Sp0zKcANCggiNBiGEkBwYkj11ltEoqBdjyS6dz6holpS8p85ncCtrKKDRIIQQkhNd9aMbjQttUfV80TP7rUfiDLZWxX+uqlW4cBJ8aDQIIYSkETcRE+W57pGmHAakucIyGtE2Sa+E8TfZPjf+/PA6GfufsaqFsnR5KKDRIIQQkoaerSiqapG0mlwxLnXVx4t2FRTLM/sN+0ZOvCw/Vs+n18lIzIRUvymX5Kr8dfez8sAD66WH208CCY0GIYSQNK4tixTI+NnPyo5P++NbXPs/lR3r50mpKrZVLI+0DaTWx1Bcks4l1qyFoU5GfCfKtd+PbbI/bzX9HhIEaDQIIYSkc/Xv0rt/h7xUt0Aqym6T8QlTUCQTSytkwfo3pffv5lo9Q131UmS9vqi+K91AXOqSZ1UtjtjvmlkjLYe/ockIMDQahBBCCLENGg1CCCGE2AaNBiGEEEJsg0aDEEIIIbZBo0EIIYQQ26DRIIQQQoht0GgQQgghxDZoNAghhBBiGzQahBBCCLENGg1CCCGE2AaNBiGEEEJsg0aDEEIIIbZBo0EIIYQQ26DRIIQQQoht0GgQQgghxDZoNAghhBBiGzQahBBCCLENGg1CCCGE2AaNBiGEEEJsg0aDEEIIIbZBo0EIIYQQ26DRIIQQQoht0GgQQgghxCZE/j/a6nG+6nDZqAAAAABJRU5ErkJggg== | As shown in the figure, there is a circle enclosed by a wire, and its area is as shown. Now, this wire is reformed into an isosceles trapezoid with the top and bottom as shown in the figure. What is the length of the leg of this trapezoid in π? (Unit: cm) | A. 4; B. 5; C. 3; D. No correct answer | C |
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 | As shown in the figure, a triangular ruler is stacked with three circular paper pieces. What is the relationship between the lengths of the two perpendicular sides of the triangular ruler? | A. Equal; B. Not equal; C. Cannot be determined; D. No correct answer | A |
125 | 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 | As shown in the figure, a right-angled triangle is overlapped with three circular paper pieces. The lengths of the two legs of the triangular ruler are equal. Circles 2 and 3 are identical, and the circumference of circle 1 is 20π cm. What is the radius of circle 2 in cm? | A. 2.5; B. 3; C. 2; D. 5; E. No correct answer | D |
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 | As shown in the figure, a right-angled triangle and three circular paper pieces are stacked. The lengths of the two legs of the right-angled triangle are equal. The radius of circle 2 is as shown in the figure. What is the area of circle 2? ( ) cm² | A. 24π; B. 26π; C. 25π; D. No correct answer | C |
127 | 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 | As shown in the figure, a triangular ruler is stacked with three circular paper pieces. Circles 2 and 3 are identical. It is known that the circumference of circle 1 is 20π cm. What is the area of circle 2 in cm²? | A. 24π; B. 26π; C. 25π; D. No correct answer | C |
128 | 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 | As shown in the figure, there is an isosceles trapezoid made of wire. This wire can also be used to form a cube frame. The volume of the cube frame is shown in the figure. What is the edge length of the cube? | A. 1cm; B. 5cm; C. 2cm; D. No correct answer | A |
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 | As shown in the figure, there is an isosceles trapezoid made of wire. This piece of wire can also be bent into a square frame on the right. What is the length of the wire? ( ) cm | A. 12 cm; B. 10 cm; C. 8 cm; D. No correct answer | A |
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 | As shown in the figure, a 12 cm long wire is bent into an isosceles trapezoid. What is the length of the legs of the trapezoid in cm? | A. 4; B. 5; C. 2; D. No correct answer | C |
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 | As shown in the figure, there is an isosceles trapezoid made of wire. This wire can also be used to form a right-angled cube frame, and the volume of the cube frame is shown in the figure. What is the length of the legs of the isosceles trapezoid in cm? | A. 4; B. 5; C. 2; D. No correct answer | C |
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 | There are two iron wires of the same length, which are respectively formed into the following cube frame and rectangular cuboid frame. Based on the edge length of the cube frame, what is the length of the iron wire? ( ) | A. 60cm; B. 80cm; C. 100cm; D. No correct answer | A |
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 | There are two iron wires, each 60 cm long, which are respectively formed into the following cube frame and rectangular cuboid frame. What is the height of the rectangular cuboid? | A. 7 cm; B. 8 cm; C. 9 cm; D. No correct answer | A |
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 | There are two iron wires, each 60 cm long, which are respectively formed into the following cube frame and rectangular cuboid frame. What is the volume of the rectangular cuboid in cm³? | A. 114; B. 125; C. 105; D. No correct answer | C |
135 | 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 | There are two iron wires of the same length, which are respectively formed into the following cube frame and rectangular cuboid frame. What is the volume of the rectangular cuboid? ( ) cm³ | A. 114; B. 125; C. 105; D. No correct answer | C |
136 | 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 | As shown in the figure, rectangle ABCD is formed by a piece of wire. What is the length of side CD? | A. 36cm; B. 12cm; C. 24cm; D. No correct answer | A |
137 | 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 | As shown in the figure, rectangle ABCD is formed by a piece of wire. If the side CD is cut off to form the cube on the right, what is the edge length of the cube? ( ) | A. 3cm; B. 4cm; C. 5cm; D. No correct answer | A |
138 | 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 | As shown in the figure, rectangle ABCD is formed by a piece of wire. If the side CD is cut off and used to form a cube on the right, what is the volume of the cube? ( ) cm³ | A. 24; B. 52; C. 27; D. No correct answer | C |
139 | 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 | As shown in the figure, rectangle ABCD is formed by a piece of wire. If the side CD is cut off to form the cube on the right, what is the volume of the cube? ( ) cm³ | A. 24; B. 52; C. 27; D. No correct answer | C |
140 | 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 | As shown in the figure, a circular frame is made of wire. Based on the information in the figure, what is the length of side CD? ( ) | A. 12 cm; B. 8 cm; C. 24 cm; D. No correct answer | A |
141 | iVBORw0KGgoAAAANSUhEUgAAAdQAAADyCAYAAAD0pTTzAAAAAXNSR0IArs4c6QAAAARnQU1BAACxjwv8YQUAAAAJcEhZcwAADsMAAA7DAcdvqGQAACxrSURBVHhe7Z0PbBTX3a63SpRFAiMuiauQYF0qR3Iqf4ggUssC+sWW0gASaoyIAuFCcUpSJZRIvgHC3zakBJFeIwE3rVx1r4yS4ph8pDiV2zhAakpITagTIAnEGLi4AVICCBCgK0sbqb+77+ycnfH62N7dObs7s34f6W3Dntnd2fXxeXz+zJmQEEIIIcQzFCohhBBiAAqVEEIIMQCFSgghhBiAQiWEEEIMQKESQgghBqBQCSGEEANQqIQQQogBKFRCCCHEABQqIYQQYgAKlRBCCDEAhUoIIYQYgEIlhBBCDEChEkIIIQagUAkhhBADUKiEEEKIAShUQgghxAAUKiGEEGIACpUQQggxAIVKCCGEGIBCJYQQQgxAoRJCCCEGoFAJIYQQA1CohBBCiAEoVEIIIcQAFCohhBBiAAqVEEIIMQCFSgghhBiAQiWEEEIMQKESQgghBqBQCSGEEANQqIQQQogBKFRCCCHEABQqIYQQYgAKlRBCCDEAhUoIIYQYgEIlhBBCDEChEkIIIQagUAkhhBADUKjEON9++6309PTIF198IQcOHLDS3NwsO3bskEgkIi+//LKV+vp66zGkra3NOu7QoUPWc69evWq/GiGEBAMKlWTMpUuXLAk2NDRIXV2dzJ49Wx588EEJhUJGMmbMGKmsrJTa2lrZvHmztLS0WJKGsAuR6PkT8uU1+x+EkMBBoZKUOXbsmGzdulVqampk1KhRWgkmZ+TIkVJSUiLfmzBBpk6dakWV/ehHP7L+PWnSJOuY7373u32eO1geeughWbFihdWzvX37tn2GQeai7JwVkonbT9r/JoQEDQo1G/Rel66P90rTtlWyalU825r2ysddV+RW1D7mWoe8e/Ab+x/+pKury+p9zp8/X+69916t2EaPHm0Jsebxx2X58uXW8e/HJHf2zBm59K9/aaOeqytT6ejokDffeEN+9cor8tOnn5bq6moZN25cn/dWufPOO62e7Pr1660ec29vr/0JAsTJ7TIRn6d4nXSoOkIICRQUqkGilzslUlsuRbGGMVz8iCx+NSIte/fK3liati2VOeVFEiq6Xx5bvEqemhyWaZGz9jP9w4ULF2Tjxo0DDt1OmTJFXli2TN5qapLPjh/XynCoqNfSlQ2Vf/b0yAf791uinTlzpiV09/kh6D0vXLhQ9seOC8bw8E15b0nYPv+w1Oy6aD9OCAkSFKoRonK+9XkpDccaxPBkWdl2TvR9pKhc7ozIkyXxhj+88qD9eH7BkCkWBlVVVSWkpFJeXi7PPvus7GhslO5Tp7SSSzfqtXVlmQSCXbt2rdWLxRCz+/zHjx8vq1evtuZefcvFnTLLdc6hiduFA7+EBA8K1TNR6W6cYfVKQ+FqiXQPPV4XvdwmS4tjx9e124/kBwyPoic3YsSIPhJC7/SXv/hFxj3QoaLeR1fmNRfOn7eGijEEHQ6rXl88mHfFHPCNGzfsb8APROWz+okSmtYgO9cV2+daLOs47ktI4KBQPRL9rD4+9xXLxPrPYs1jalxrXSThml2Sj1lULOSpSuqNjh071uqJoreXLCnTUe+pKzMZzONu2bKlz0IoBKuHcdmOL8R68z1ZEhP/kvduOvOosaBucOCXkGBBoXrirESm2Q11eImgTUydk7J9SST2CrkDl52gl+aWC+Yh0aNDz04npWxEvbeuLFv5x5Ejsuqll/qsJIZYcbkPLv/JFxd3znItRIqv9I2f30Thgl9CggWF6oFoxzopthvn0KJWScunMa7FJJbuc9IFi3KSRYpVsfPmzZMD7e1a+WQ76jx0ZdkOFjX9+rXXrMt41HlgyDsvYo12yLrivpfK3HxviYTt8ype15HyiAchJP9QqB44skHNeYV8uWK3s7PTupxEnSPmFHEJCi5J0ckmV1HnoyvLVdAj37Z1az+xYoVzri67ictzlux0j+3akrXOKVwjXPBLSHCgUDPGNdwbS57XF/UBc4PPPfec1RPFuWHlK+ZHs7XIKN2o70xXlo9gBTNWM6vzwqIsXHKTXU7K9omxP3KWvNdvlOLk9omJc+FGD4QEBwo1Yw7KSlwmYzd8fhEqLn+55557EueFOVLMH+pEkq+oc9OV5SvosW7atKnPda3Y0CJbw8Dx6YIB5kndl9FwowdCAgOFmjHtUqcavVjyLVRcZzl9+vTE+WArPyw20skj31HnqCvLd9CLnzt3buIcsXAJl9qY3SDiouyqCUvov/9MGu2NP/rmHVlToeoWN3ogJChQqBnjnyFfNPhqeBf/jwU2WHyjE4Yfor4zXZlf8sd33pEHHnggca6PPvqoud6qdXlMWCY/5WxN2S8/q3YWvHGjB0ICAYWaMVHZt9Ru8GLJx6IkzJVio3p1Drje8tCHH2oF4aeo89WV+SkYBsYOTOqPFexn7H1u9aa01xWnIEn3JTTc6IGQIECheuBm66KEHDK5bMYLWME7wV6higYfG9Pn8lpSL1Hfma7Mj8Fm/xhCV981NoXIeAjYmh+1N3IYAvdlWeFY/eKd3QjxNxSqF9yXOCRf/pAC0e7D8o8MtkpyD/Fio4K3335bKwK/Jv59BUeoCPYxxgIvde6ZDQFH5ciGmJhTHsLtu9FD/WfspRLiZyhUj1hbCNqNbPHSfan3Iq61y8oFjWntlIReEVaeqkb9P3/4Q99cCpNO1PnryvwebAqh9gjGEPChQ4fsn87QRLsbZFrseZP+d+ozot0NFYnvK1wdkRS2iiaE5AkK1TPXpH1lqS3VsEze8KFcHqLRi17eJysfWSntaYzh4Y4wahVv0IZ4k6MEoSsLQrDfsdoQAreKw97Ig3LxsETWzJHyovjnxh2JnsKt/T46PeA0wc3TH0lL5AWpVM+xEy6dLZuaPpLTuZxfIISkBIVqhGtydLt9x5lYiipfkMiB087NxBW9X8vxPWvkkcnPS+v51LsaGFpUWwdikwZsRKBr6IMSJQddWVCCjfcrKuK9R/yB09zcbP+0NJzYrV/J+/rBAW+O8M3B1/XPsfK6+Pze9IQMSyhUg/Sea5NNc+I3GI9LIyzFpWVSVhbL/UUSLp4stZHOIXuwbrq6uhI3+8amA396911tAx+kFIJQEUh19uzZic+DuW1CyPCFQs0GvdflUs9xOagu1D94XHouXR/gpuMDc+zYMWueDo01Fh8F4ZKYVFIoQkUw7P4/FixIfKYVK1bYPz1CyHCDQvUpWOyC+Tk00thg4Oinn2ob9CCmkISq8sKyZYnPhY01CCHDDwrVh2CY170f78qVK7WNeFCjPpeuLKjB6IH6AwhhT5WQ4QeF6jOwAEkN844dOzbRQP/qlVe0DXkQoz6TriyIgUzVjcvdfwhxTpWQ4QWF6iOuXr2aWICEnXlwjSluu6Ya6EKRqvo8urKgxS1TDM3jZ/b8888nPuOgq38JIQUFheoT3NeZJi9AKjSpqs+iKwtSdDJVZeqONbikZsjrVAkhBQGF6gOwA5K6/ALXmeoujSkkqarPoSsLSgaTKYLVv9jJCuWYW01nRyVCSDChUH0AVoWi4UVvZrBNGwpFquoz6MqCkKFkqoLrVCdNmmQdh3nxbN2snBDiDyjUPNPS0pIQDPaJ1TXM7hSCVNX568r8nlRlqoLycePGWcdjQ32zNyonhPgJCjWP9PT0yJgxY6zGtubxx7UNsi5Bl6o6d12Zn5OuTFUwhK/uDoRbvxFCChMKNU+gp/Lwww9bjSw2WsfwoK4xHihBlqo6b12ZX5OpTFVwo3I8F2L1fpNyQogfoVDzhJo3xa3AcPcSXSM8VIIqVXXOujI/xqtMVaqrq63X4HwqIYUJhZoH0p03HSxBlKo6X12Z32JKpsjJEyc4n0pIAUOh5pgbN24kdtNJZ950sARNqupcdWV+ikmZqrjnU7mTEiGFBYWaY5555hmrMUVPJd1508ESJKmq89SV+SXZkKkKbg6P18WCNA79ElI4UKg55PDhwwmZNDQ0aBtbLwmKVNU56sr8kGzKFPlnT4+1EA2vP3/+fLt2EEKCDoWaIzBf9tBDD1mNKHbQ0TW0JhIEqarz05XlO9mWqcpbTU2J74GrfgkpDCjUHIH5MjSeWNWLRlvXyJqK36Wqzk1Xls/kSqYqM2fOtN4LN0To7U339vOEEL9BoeaACxcuJDZwwOUyusbVdPwsVXVeurJ8JdcyRf5x5Ij1Bxbec+PGjXZtIYQEFQo1B9TW1lqNJm7JhvkzXeOajfhVquqcdGX5SD5kqrLqpZes9x0xYgQXKBEScCjULHPmzJnEZRKR3/9e26hmM36UqjofXVmuk0+ZIu4FShi9IIQEFwo1y6jLZMrLy7UNai6SbameP/2JfLCnWX77q5/Lsp8jq2RL4x754JPTcl5zvDqX5MdznXzLVGWbPb/OXiohwYZCzSJoHNFIorEc7LZsuUg2pHr+8zbZMq9MRoVGSdmsWvnVb5tlV3Msv/2V1M7C4yEZVTZPtrR93kes6jzcr5Xr+EWmCO6dyl5qYdHV1WVtManqOhPPjh077G+oMKFQs4jarzefvVN3zEn1K/n0jcUy4a7Ya933Y/nt3/Tzwuc/b5EV/3FX7P3ukv9Y3ipd9uPqHJKPz1X8JFOVLVu2WOeDxWvYTYsEF8p04FCoJCPQKKqVvRjS0zWi+Yh3qX4lf99aZfU+Q3dNky0ffaU5xpUvd8uz98Xf775nd1tSVe+vPT7L8aNMEcylqvPiLd6Ci1um+P+Ojg45d+7csMzp06dl+vTpid93hEIlGYFGERUIQ3kY0tM1ovmKF6me/8tyuc9+7g+2dGiPSc7p3c/K3dZz7pKZvzuaeG/dsdmMX2Wqgp8Fzo291GCSLNMvv/xS/v3vfw/LRKNReeKJJxK/63fccYf1/xQqSRvsiqQ2wPdT79SdzKTaIVt+EH9OKPSEvNmtO0aXv8iKu+3n3fVU4n31x2Ynfpcp4u6lcuP8YEGZOkmW6Ysvvij33Xef9d8UKkkbdXs2NI5+6526k7ZUY73TeE8zlpm/k891xwyQ95bfnXgvFd1x2UgQZKqirkvFNpUkGFCmTnQy/eSTTyhUkjk1NTVW5YGwdI2mn5KOVP/6i9LEsXcv/4v2mIHy+e/i2+y5ozvOdIIkUwS7J6nv54svvrBrFPErlKmTgWRKoZKMuXr1amIjhw/279c2mn5LalLtljefcGSY6vxpIrud91DRHmcwQZOpytSpU61zXr16tV2riB+hTJ0MJlMKlWSM2gQfG57rGku/ZmipuudP/S/UoMoUUZfQjB8/3pqPJ/6DMnUylEwpVJIx6hZta9eu1TaWfs7gUg2OUIMsUwQ3nleb5vPWbv6DMnWSikwpVJIRx44dsyoNhnyPfvqptrH0ewaW6leyq9aRoV+FGnSZqtQ8/rj1GRYuXGjXLuIHKFMnqcoUoVBJ2qxYscKqNNm8gXguMpBUD2/5QeLx0LO7+zxnqJx+w/nFU9Ed5yWFIlPkzTfesD7HqFGjeK9Un0CZOklHpgiFStJGDff++rXXtI1kkKKV6t82yvftx0Klv5C/Jj1nsDiXzWArwvhr6I7LNIUkUwSXW40cOdL6PAcOHLBrGMkXlKmTdGWKUKgkLbCzjapgaNx1jWTQ0l+qR+V3M5UQvy8b/6Z/Xv/8VX5ZGn+d0Pc3Jl5Tf2z6KTSZqlRXV1ufaf369XYtI/mAMnWSiUwRCpWkhdrMYdy4cdrGMahJlur5j7bINGyKH/v33bW7EhveD5auN56Qu6zX+L788q9fJV5Pd2y6KVSZIljYhs9VWVlp1zKSayhTJ5nKFKFQSVqoO8vMmzdP2zgGOclS7dr9rL2f733y7O4vtc9ROf/Rb2Smte1g7Nhd8du4qdfSHZ9OClmmCK5jxmfDIrfbt2/bNY3kCsrUiReZIhQqSQs1f+rXvXu9pp9U922UqlFxUf74N3+VM18lP6dHjjS9IFNwzKgpsrrFuSeqep2+x6eXQpepyujRo63P2NbWZtc0kgsoUydeZYpQqCRl3POn2DpO1zAWQvrNqfZ8LG+tniVlljTvlUee/Lks+3ksTz4iE+6+K/ZYmcxa3SRHevq+jnoN92PpZLjIFJk5M75lI1aQk9xAmToxIVOEQiUpo+ZPS0pKtI1iIaX/QiU83iOnjn8of2lull1W/iyHjnfJP5Oeq6KerysbKsNJpgi+Y3xWbpafGyhTJ6ZkilCoJGWwChOVZe7cudpGsdCil2rqUc/VlQ2W4SZTRM2jItyGMLtQpk5MyhShUEnKqIoXxO0GM40Xqarn6coGynCUKYJ7pKrvi3efyR6UqRPTMkUoVJIyakHSjsZGbaNYqMlUquo5ujJdhqtMVXApFj47phaIeShTJ9mQKUKhkpQZMWKEVVkOtLdrG8RCTiZSVcfrypIz3GWKqA0eNm/ebNc4Ygq3TJHp06dLbW3tsA0+v/ouTMkUoVBJSvS4huQwPKdrEAs96UpVHasrc4cyjeenTz9tfQdo8IhZ8J2q+sg4MSlThEIlKYHrA1FRvjdhgrYxHC5JR6rqOF2ZCmXqBN8nvgfumGQeJVTUMdVLG65Rl2hBfjopegmFSlJC3VAcw3K6xnA4JVWpqmN0ZQhl2jfqzjNjxoyxax0xBUSC7xb/P9zBTRjwXVComUOhemTZsmVWRcGwnK4xHG5JRaqqXFdGmfZPR0dH4ju7evWqXfOICShUBwrVOxSqR3ADaFSU5cuXaxvD4ZihpKrKkh+nTAeO+s4wZ0/MQaE6UKjeoVA9UlVVZVWUQrgHqskMJlX1uPsxynTwqO/s0KFDds0jJqBQHShU71CoHqmyhVqom+J7yUBSVY+pf1OmQ4c3G88OFKoDheodCtUjEAAqym9ef13bEA736KSq/o3/pkxTC/aJxnfEu86YhUJ1oFC9Q6F6ZMKECVZF+eM772gbQqa/VNV/U6apRwm10BukXEOhOlCo3qFQPYJLGVBRKNTB45aqCmWaeioqKqzvikI1C4XqQKF6h0L1CCoJgruC6BpCxolOqpRpapk6dar1fdXX19s1j5iAQnWgUL1DoXoElYRhcpWXX37ZrnnEBBSqA4XqHQrVI6qhY5hchEI1C4XqQKF6h0L1iGroOIc6eNwLkJKj2/yB6Rs15BuJROyaR0xAoTpQqN6hUD3CVb5DJ3k1L/4fGeg6VaZ/HnzwQet7KvQGKddQqA4UqncoVI8ooWIDc11DONyjuzQG/42gnFJNLeqymebmZrvmERNQqA4UqncoVI88/PDDVkXhTkn9M9B1pvg3oo6jVIeOEioaPWIOCtWBQvUOheqRKm49qM1gmzbgMcR9PKU6eNR3Q6GahUJ1oFC9Q6F6ZPbs2VZFWbt2rbYhHI4ZTKYIHkfcjyGU6sBR38sXX3xh1zxiAgrVgUL1DoXqEfULydu3xTOUTBGUIcmPI5Rq/3SfOpX4Tnj7NrNQqA4UqncoVI+sX7/eqihz587VNobDKanIFEE5oitDKNW+eb+tLfF9fPvtt3bNIyagUB0oVO9QqB7BqktUlEmTJmkbw+GSVGWK4BhEV6ZCqTppaGiwvgdcOkPMQqE6UKjeoVA90tnZaVWU0aNHaxvD4ZB0ZIrgOERX5g6lGg+mE/AdYL6emIVCdaBQvUOheuTGjRtWRUFOnjihbRALOenKFFHfl64sOZTqv6Tm8cetz19XV2fXOmIKCtWBQvUOhWqAe++916osf3r3XW2DWKjJRKYIjkd0ZboMd6liOgGfHUO/xCwUqgOF6h0K1QBV9rWoW7Zs0TaIhZhMZYrgOYiubKAMZ6liOgGfGw0eMQuF6kCheodCNcBzzz1nVZYXli3TNoiFFi8yRfA8RFc2WIajVPHdJr6vS5fsGkdMQaE6UKjeoVANgJs+o7JUV1drG8VCileZInguoisbKsNNqm81NVmfdcyYMXZtIyahUB0oVO9QqAY4fPiwVVlGjhwpF86f1zaMhRATMkXwfERXlkqGk1Qx6oHPWVNTY9c2YhIK1YFC9Q6FagBcbD9q1CirwhTqbdxMyRTBayC6slQzXKRaXl5ufcatW7fatY2YhEJ1oFC9Q6EaYubMmVaFKcQtCE3KFMHrILqydFLoUnVvOXjs2DG7phGTUKgOFKp3KFRDbN682aowU6dO1TaOQY1pmSJ4LURXlm4KWao7Ghutz4XLskh2oFAdKFTvUKiGUPOo4XBYzp45o20gg5ZsyBTB6yG6skxSqFL96dNPW59p/vz5di0jpqFQHShU71CohnDPo2Jlpq6BDFKyJVMEr4noyjJNIUoV3zs+Dzd0yB4UqgOF6h0K1SBqHhWNu66BDEqyKVMEr4voyrykkKR69NNPE5+lq6vLrmHENBSqA4XqHQrVIOquIOPGjQvs5TPZlimC10Z0ZV5TKFJd9dJL1mfgHWayC4XqQKF6h0I1CDbKHzFihFVxgjjsmwuZInh9RFdmIoUgVTXcu3HjRrt2kWxAoTpQqN6hUA2DBSSoOEG74XiuZIrgPRBdmakEWaruG4pfuHDBrlkkG1CoDhSqdyhUw7TZjWGQVvvmUqYI3gfRlZlMUKWqzruqqsquVSRbUKgOFKp3KFTDYLXv+PHjrcqzbetWbYPpp+RapgjeC9GVmU7QpIq597Fjx1rnW+iNjx+gUB0oVO9QqFlg9erVVuX5zx/+UNto+iX5kCmC90N0ZdlIkKSqNnPAXPzt27ftGkWyBYXqQKF6h0LNArjMAZUH6ejo0Dac+U6+ZIqo70ZXlq0ERarq0quFCxfatYlkEwrVgUL1DoWaJarsm47PmzdP23DmM/mUKYL3RXRl2YzfpfrB/v2J80PjRrIPhepAoXqHQs0SanHSnXfeaV2kr2tA85F8yxTBeyO6smzHz1KdPXu2dV5VXIyUMyhUBwrVOxRqFnnooYesSoRGPLnxzEf8IFME74/oynIRP0oVUwP44wvnhD/GSG6gUB0oVO9QqFmkpaXFqkS4hCZf8lLxi0wRnAOiK8tV/CZVTA3gXPBHGMkdFKpDtoT64osvJn7X/vCHP9jvVphQqFkGW8ehIuWzl+onmSLql0tXlsv4Raru3in+CCO5g0J1yIZQ3TJ94oknrMsKCxkKNctgiAOVKV+9VL/JFFG/YLqyXMcPUmXvNH9QqA6mhTrcZAoo1CyDSgSRoVLh/pa6BjVb8aNMEfVLpivLR/IpVfyM2DvNHxSqg0mhDkeZAgo1B2DeABULDSf2adU1rKbjV5ki6hdNV5av5EuqU6dOtd6zsrLSri0kl1CoDqaEOlxlCijUHPHoo49aFWzKlClZv7Wbn2WKqF82XVk+k2up/ub11633wh9anZ2ddk0huYRCdTAh1OEsU0Ch5gjsnqSG9n792mvaBtZE/C5TRP3C6crynVxJtfvUqcTPqa6uzq4lJNdQqA5ehTrcZQoo1Byyfv16q7KNHj1aTp44oW1ovSQIMkXUL52uzA/JhVR/8pOfWK9/7733WvfRJfmBQnXwIlTKNA6FmkN6e3tlwoQJVqUzfb/UoMgUUb94ujK/JJtSxTy6Gq1obm62awfJBxSqQ6ZCpUwdKNQc09ramqh8b7/9trbBTTdBkimiPr+uzE/JhlQxf15eXm69JubVSX6hUB0yESpl2hcKNQ+g4qECQoJe5Rc0mSLqF1BX5reYlqp6vVGjRlnz6iS/UKgO6QqVMu0PhZoHMGemhn5xz9RMV/0GUaaI+iXUlfkxpqSq7nWKFPqepkGBQnVIR6iUqR4KNU8cPnw4MY+2fPlybQM8WIIqU0T9IurK/BqvUv3HkSPWYjQ8n/c69Q8UqkOqQqVMB4ZCzSObN2+2KiXEms58apBliqhfRl2Zn5OpVDECMWnSpMTP6/bt23YNIPmGQnVIRaiU6eBQqHlm5syZVuVMdT416DJF1C+krszvyUSq6jkjRoyQY8eO2T954gcoVIehhEqZDg2FmmeuXr0q48ePtyppRUWF/LOnR9soI4UgU0T9UurKgpB0pNrQ0JA4Fv9N/AWF6jCYUCnT1KBQfQAqsppPnT17tnaRUqHIFFG/mLqyoCQVqWIYX/1cOW/qTyhUh4GESpmmDoXqE3bv3p1ofLGLjrthLiSZIuqXU1cWpAwm1T+3tsrIkSOtsunTp7MR8ikUqoNOqJRpelCoPmLr1q2JyqtW/haaTBH1GXVlQYtOqu6fGe5xykVI/oVCdUgWKmWaPhSqz1D7/SLYNL3QZIqoz6crC2LcUl25cqWUlJRY//3ggw/KpUuX7J8s8SMUqoNbqJRpZlCoPuS5555LVGakkGSKqM+lKwtq3FJFsOk9d0LyPxSqgxLqHXfckajHlGl6UKg+BBUYFRkV+jvf+Y68FOv16BrxoEb9surKghps3DBmzBjrc2FbQV4eEwyUUHH5GoQynOOeckIo0/ShUH2KW6oIhn91DXkQoz6TriyIcc+Z3nPPPXLo0CH7p0j8jhIq0zeUaWZQqD4GFdo9/IvVv5nu++unqM+jKwta/vTuu4nVvBzmDR4rVqyw9tVmnOASL8o0MyjUAOBeqITrVAfb/CEIKRShRn7/+4RMB1+A1C519mceKkX3l0lZ2WOyeNU2afr4tNyK2i9BCPE9FKoX2uu0jWL/hKW4tEwq5qyRyPsn5HIGjSTmN9R1qthRiRs75De/fu21xM8D15lix6uhiN46Lf+1qDjx+cuW/lm6Ll2XXrtceq/Lpa6PpWnTbCkN23WnqFLWtJ1zjiGE+BYK1TNRuXX6v2RRsd0Ahipky7FbsUcVsfIrXXIg8oJUFqlGcoZsP3rNLk8d9+YPmLMzdYPyXCf+PQVTqGfPnJGaxx9PfAaMGKR1nanrj7BpkbP2g/2JXu6U+uqwfWxYSle2S/o1hhCSSyhUQ7TXxRvJUGiaDNRORi/vk7oS+7hwtUS60++q7t+/35qrw2tArtgAImjzqvHvKXhCfb+tTb43IX4fWwQLxdKea0pRqBbRbom4pFod6Xb9oUYI8RsUqiFSESqIdqyTYrtBDS95T27aj6cD5uoeffRR+/3iNykP0hCwOm9dmV+DXZDU6AAuj2lpabF/GmmSjlDBxV1So4Z/h6hbhJD8QqEaIlWhxo50FqiEV8pB+9F0Qc/o5ZdfDuQQcPx7CoZQu0+dStxiD3n44Yelp6fH/ilkQLpCjfVJO9Y5867F6zrYSyXEp1CohshIqKG62L+84R4CRubOnSsnT5zQysEvUeeqK/NTfvP664nrS5GMhniTSVuoMY5sSIxqhIo3yBH7YUKIv6BQDZGyUM9GZJpqHKdFJMUmdVAwBOzuRY0ePdpaherXuVV1nroyPwQbNUydOjVxntisIeMh3mQyEWp0nyy1n8NhX0L8C4VqiNSEek32LVXDd2FZ1Gp23SYafVyYrRrsKVOmWAtpdNLIZ9T56cryGazgfWHZssQwOv4fG2vcuHHD/oYNkIlQY33SDYlV5LGestdhDUJIVqBQDeEItSLpsplYB+PWFek5vkfWVBbZxxTJjO1Hs3IZRG9vr7URxIgRI6z3ghR++vTTvlq0pMSgK8tXsEmDuksMUllZKZ2dnfa3apCMhHpWItPiz0EoVEL8CYVqCEeoQ+S/VUt9x5WsLyw5E+ttuYeBw+GwdUcUP4hVnZOuLJfBkDjmScvLyxPnhOHdSCRif4tZgD1UQgoWCtUQ7h5qQ7f9oAU2duiR4+9H5IVEDzUkRZVrZN/57K/XxDAwbnKt3hc91nnz5klHR4dWMrmIOhddWS4CkW7burXPNaXo0WPRkdHhXR2ZCPVmqyyynxMKVUujh0XGhJDsQaEaIrU51F452VAtYdU4hmONY6qdFI/oxIpdfj7Yv18rnWxGnYOuLJvBHsi4nnTcuHGJc1AizdmNwDMRqnuVb1m9fGY/TAjxFxSqIVITKrgoO2epY0MSrmvP6XWFECvmB9X7I5MmTbJEk6vLbdT76sqykT++847VK1cb2SPYnAHX8eZMpIq0hdr3OtSJ20/ajxNC/AaFaojUhSryza6aRANp6tKZdMENhauqqpzziAW9Vsy7YoFONu9oo95PV2YquPQFPU93bxTBHClEmvWh3YFIV6hnG6Va7ZQUXiSGF4YTQgxCoRoiHaFG9y1NNKr5EqoCi5ewKth9uQ0yduxY6/6rOxobrd2CdNLKNOo9dGWZBvOif25tlbVr11o9bvdnwbAubpiM3nne7/OYjlD77OVbInXttCkhfoZCNUTqQvXvVnLotT7zzDMyatSoxPmpYCUsVgm/1dRkXa+pk1qqUa+pK0snmP/FUDV61e7hXBXcVq2hoSF/vVEdKQo1evlD2TDZkemTu7gxPiF+h0I1RKpCvRZrUEvsBtWvQ3i4lrW5uVnmz5/fZ1tDFQwNY9MIXN8KoUGyRz/9VCs9XdTr6Mp0gcCxQQUuccHGCxAodoNynxOCnmhVVZVs3LjR6nn7Df39UK84NxGP3pIrSfdDxWrwtnO8GyohQYBC9UxUbn2+Q2oS1wmWydI/d8mlK67NHVRDuaZSiuzGNFTypOw8GYyGsqury+rp1dTUWIt5lBCSg14ierK4XyhuK4fhV1yegrz5xhvW4iBEHY8epnoMssRx2DIRz4Wsq6ur++ylmxyIHQusVq9eLW0x4aZ1X9Kc4t6/efCEi0ulrGKOLN3WJB+f7rtBCCHE31CoXnAN3w2dsBSXlknFnKWybc9x+TrAnY5jx45JfX29tS0feoS6XqzpoPeJy34wF4o5X8yH+moolxAy7KFQiREgN2zVh6FiCK+2tta6zhXCxS3PsOgpeeETgh4vHn/ggQesY5GFCxfKsmXLZGusx4qep6fbpRFCSI6gUAkhhBADUKiEEEKIAShUQgghxAAUKiGEEGIACpUQQggxAIVKCCGEGIBCJYQQQgxAoRJCCCEGoFAJIYQQA1CohBBCiAEoVEIIIcQAFCohhBBiAAqVEEIIMQCFSgghhBiAQiWEEEIMQKESQgghBqBQCSGEEANQqIQQQogBKFRCCCHEABSqH4nekiuXLsmlWK7citoP2vTeEvVQ7/X4MYPmem/84JwTlVvXb8X+NxV65bp1vtdj/0UIIcGEQvUL0ctyYs8mmTO5WMKhsBSXlklZWZmUFoclXDxZ5mzaI8d7umTPkiclcjb+lL+/Gjvm/iIJhUJ9Ei4utZ5bVlYqxWE8htd7TBZvi73G19lWVq98fXinvFAZO69pEbFPVU/sM3dGFkipdY52wsXyyJo2OUezEkICBoXqA3pP7pQFpeGYTEplQeSwnE/qlfZ+fVgiC0pjoo3LceVBu8AiKt0N02whVciWz5NNFBPc8T2yBoKzjimSyk0dcs0uNcf/k/+793V5ftYkub/IluOgQr0m7XUl1nFF97vlH0+4OiLdqXVvCSHEF1CoeeZaxwaZDJGEq6Xh5GDdsl452VBtSbWu3X5IcXClLdtpid5rf67J0fr48yGsktiLmJdqnJuti+JiHESo0Y51UlzypOz83DUs3HtO2lZOTpzjxO0n7QJCCPE/FGo+ubZPlhbH5TFtYBO6OCuRaSFZui+p63Y2ItMsCQ0mVOD0CkOh4tjrZEmp7XXx9xhQqFFpXzlDItou6EXZVRPrreP51Y3SYz9KCCF+h0LNG1HpWFccF0fxOulIcXgTPbuaZGumLNQY11plkRpanbhdstIHHFKop6T5D0cGXLCUSg8XqEVZ/RZu9aFXrl9xL46yF0BpF2sNVkYIIYNDoeaLm+/JElts4br2AeXSn0/l3XeT+m3pCBW9wzq7Bxgqk/rP8JhaZZtmBhLPkEIdAvv5+u8lKpc7I1JbXhxfuGUtygpL8SOb5MPLLm1+fVz2bFssjxTHPqt1HlE5v2+NVKr53dhzShfssudpe+Xkzlop15YRQkhqUKh5IhqThporTG24dxDSEqrIN7tqbHGEpLoRcv67vGqtCk4zr/49/oLJeBRq/PyKpa79pv2IIirdjTOkqM98s2tRVslKOYinfHNEWlta5JVq+w+HaQ2yr/HHMnn2Jmnau1datjsri2ftPClH62dI+ew1EmlJLrsYfwtCCEkBCjVPnI2olbmaRUbpkqZQE8KLpXjDEftBg3gS6k1pXYRVvo39nhs9skFKYq/bT3TdDVJhfx73dxndtzR+HkUzZHvn5T693ZPbJ9pllbLpw75lF3fOipfV7JJv7McIIWQoKNQ84Rehhjy/uQYPQo1+Vi8TYz3Q/guWbsp7S9DjrJFd/Sx3Vt6prZCyxzZJh3ud1WDnkWkZIYQMAIWaJ/wi1Phws0/mUKPdEqkujX0futXH7VJnnXNd7L9ShEIlhOQQCjVPJIYjY6lo6LYfzZA0hdrdUJF47/glOH6YQ41Kd2SGzIh09xl+TdDTKNXWOVOohBB/QqHmi5utssgSRCxe5+rSEupF2TnLft/wEnkved2PCdIWUlTOtz4vC+qPDrzZxDe7pCaFzxiNunRMoRJCcgiFmjdc16GmOlRr00caIA2hqoU9eN+SDQNfC+qJNIV0rX2lzN4w1HaIR2SDvQnGgDso3WyX+oh1HVAcCpUQkkMo1HxyrV3qSuKSSHXv2mh3o9T+ryQRJla5DiFU1/uFSupEO1VpgjSENJRMe2+pTRlcf4BoFy1hF6gZ0se1FCohJIdQqHkm2h2Ravu6x6LKTXJgwLvB9Mq5tph8dBsOKAEMItTec3vkeWzAj+NKnpRd2dy1ICUhYZh3iUz92btySrfgqee4vL99gVTGZJs407ONie8Kl7us2XNcemLH9hx/X7YvKJWiRa19xJyYp85UqBUN4nF2mxAyjKBQfUD0/L4+d4O5/7HF8mqkRfbu3RtLi0ReXSyP3F8uCyKd4toMKL71XtcBZwODUJksffOgHO9RYuqR4webZNOccimyX7syi7dGi966Ejufj+X/LFH7BU+UOkt6yfc57ZWTkRn2OQ2WiX17nDHQo+1zuzc74ep6OapsivvJ9hyWevW9xHq09Yd74quSrbLj0uQ+x7auAcpKZMkeu4wQQoaAQvUNUbl1+mNp2rZKFj/mrKR9bPEq2db0sZzW7Fdr3Q/VvepWl4o5snTVNmk6eLzfbeFM09P8lP4cyl4V93rgq+//T5mkPS4pj/1eu9dw9HKn7FwzRyqsYxbLtj0n+vyhETsReSr5tRCsSs60jBBChoBCJYQQQgxAoRJCCCEGoFAJIYQQA1CohBBCiAEoVEIIIcQAFCohhBBiAAqVEEIIMQCFSgghhBiAQiWEEEI8I/L/AdPkwKtH59HYAAAAAElFTkSuQmCC | As shown in the figure, a circular wire frame is cut at section CD and formed into a cube. What is the edge length of the cube? ( ) | A. 1 cm; B. 2 cm; C. 3 cm; D. No correct answer | A |
142 | 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 | As shown in the figure, a circular wire frame is cut at segment CD and formed into a cube. What is the volume of the cube? ( ) cm³ | A. 4; B. 5; C. 1; D. No correct answer | C |
143 | 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 | As shown in the figure, a circular wire frame is cut at section CD and formed into a cube. What is the volume of the cube? ( ) cm³ | A. 4; B. 5; C. 1; D. No correct answer | C |
144 | 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 | As shown in the figure, quadrilateral GBCD is an isosceles trapezoid with a perimeter of 40cm. What is the length of CD in cm? | A. 10; B. 8; C. 24; D. No correct answer | A |
145 | 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DklDuLhHHUIdCBewBXVIGsJFhzqEuhAuYBPqkHSEC3UI9SJcwAbUIWkJF+oQ6kW4gA2oQ1JqxsVjfYSLO4sx337NZ+L5d/NtFaEOoW6EC1hHHZJK55brS5d/unpb76nGwfjp5aUNbrm+FG+c2BuNdriYit2PnInLS9W45bo6hDoSLqCHOiSlzi3XN1zT4r5brm+wT2tU4Zbr6hDqSLiAHuoQUlKHUFfCBeTUIaSkDqHOhAtoUYeQmjqEOhMuoEUdQkrqEOpOuKD21CGkpA4B4YKaU4eQmjoEhAtqTh1CSuoQ6BAuqC11CCmpQ+Ae4YJaUoeQmjoE7hEuqCV1CCmpQ2At4YLaUYeQkjoE7idcUCvqEFJTh8D9hAtqRR1CSuoQ2JhwQW2oQ0hJHQKbEy6oBXUIqalDYHPCBbWgDiEldQhsTbig8tQhpKQOge0JF1SaOoTU1CGwPeGCSlOHkJI6BPojXFBZ6hBSUodA/4QLKkkdQmrqEOifcEElqUNISR0COyNcUDnqEFJSh8DOCRdUijqE1NQhsHPCBZWiDiEldQgMRrigMtQhpKQOgcEJF1SCOoTU1CEwOOGCSlCHkJI6BIYjXFB66hBSUofA8IQLSk0dQmrqEBiecEGpqUNISR0CaQgXlJY6hJTUIZCOcEEpqUNITR0C6QgXlJI6hJTUIZCWcEHpqENISR0C6QkXlIo6hNTUIZCecEGpqENISR0CoyFcUBrqEFJSh8DoCBeUgjqE1NQhMDrCBaWgDiEldQiMlnBB4alDSEkdAqMnXFBo6hBSU4fA6AkXFJo6hJTUITAewgWFpQ4hJXUIjI9wQSGpQ0hNHQLjI1xQSOoQUlKHwHgJFxSOOoSU1CEwfsIFhaIOITV1CIyfcEGhqENISR0CkyFcUBjqEFJSh8DkCBcUgjqE1NQhMDnCBYWgDiEldQhMlnDBxKlDSEkdApMnXDBR6hBSU4fA5AkXTJQ6hJTUIVAMwgUTow4hJXUIFIdwwUSoQ0hNHQLFIVwwEeoQUlKHQLEIF4ydOoSU1CFQPMIFY6UOITV1CBSPcMFYqUNISR0CxSRcMDbqEFJSh0BxCReMhTqE1NQhUFzCBWOhDiEldQgUm3DByKlDSEkdAsUnXDBS6hBSU4dA8QkXjJQ6hJTUIVAOwgUjow4hJXUIlIdwwUioQ0hNHQLlIVwwEuoQUlKHQLkIFySnDiEldQiUj3BBUuoQUlOHQPkIFySlDiEldQiUk3BBMuoQUlKHQHkJFyShDiE1dQiUl3BBEuoQUlKHQLkJFwxNHUJK6hAoP+GCoahDSE0dAuUnXDAUdQgpqUOgGoQLBqYOISV1CFSHcMFA1CGkpg6B6hAuGIg6hJTUIVAtwgU7pg4hJXUIVI9wUWJvn5yLubmtxr44cuzpOLnweryz9EWs5M8bhjqE1HZahzTvfhTvvPJiPP3Ewz3v85OxcPmjuNts7bB8If7z1RudnYGJEC5KbOWL23F76XL89GAj/3D+p/j3d5bi9u3W9mwsvROvLzwV+6c7H9yN2cdj4f3l/NmDUYeQ0o7qkOZn8d7C4zHbmIrph47EqVfeiaX8vb70zuux8NT+mJ7eFbMzjTiw8HH+JGAShIsKaF48lh/wj8elfNsazZux+OPZaLT32R3HLw0WMNQhpLSjOqR5Pc4/sru1byMOnn4/NnsHr1w7Gwdb4WPq+Ib/TwDGRLiogkvH2x/Qm4aLtuXWbtmHc2u/xsF4aYe/2KlDSK3/OqQZ7z7fee825hc3DRZdy62wPSNcwEQJF1XQV7hoWV6M+ey3uuxD+uiFuJNv7oc6hJR2VIdcOxN72u+9PXHmWr5tS7fi3Onz8Wn+N2D8hIsq6DdctH4DvPLsTL7vfCz2mS7UIaS0s9khPe/ZudNxNd+6nebKSuuZwKQIF1XQd7iIuLM4n+/biBNv5Ru30HsgePDBB9unr7MzF4Yx6Dh+vPt+7Wd2yLvx/Exn36ljFwUGKAnhogp2EC7u7TsVxy5u/1H9wgsvrO5vGClHX4tl3VmM+Xz/udP9nrcAJk24qIIBw8X8Nr3I0tJSPPDAA6v7G0aq0fdiWR8vxIH8OaaXQnkIF1UwYLhwQT2F13PmYub5d/ONQNEJF1Wwg3Bx/ey+fN/Dcd7l9BTe1Tg91wkXU/OLO5rhBEyOcFEFfYeLa3FmT/5Bfehc3Mq3QpFdO7On855ttN7fruiEUhAuqqDPcLG8OL+6Sufz7/qUpiRunY/D7fVZGnH4fD+RuBnXf/V/4rJ13mBihIsq6CNcLL9/urMscrZ88sL1Wk7py2549capI/E/+7qpVTM+e+9cPHNkX/vmWA8/tRCXP0lx6zcGsdx6j+9un704GGevbfXfofXf7eIz8dRvnZeDSRIuSq8ZV0/np403CBedA+rDnQ/mqen43pnN78tQVSt/+UOce+rbMZOvTrr9rIPluPL83mg09saJN7IbwS3F5TOPxO7GbJy4+Fktg9nkNeP6+dZ/g3bAmI3Hz1yOj9q3QL2n/V5/5kg8eb6e4RmKRLgosfYt13dN58EiH42ZmO3ecj1/rDGzN46cei0+/EsNf/Nu3ow/fXijFRD+EC/k15tsHS5aB7GFg9GYasT8Ym8M664UeSDOXnfompSVTy7HQk9QnN6Vv9dnZ2PvkVPxhrNLUAjCRYm1b7nevb36JuMLn7WrLh3vI1x0+/2ZZ+PK+gzRvcfFgYWw4sKkNePu5933+RfhbQ7FIlxQG/2Ei9WZCRsuNd1dinomLLkAsDnhgtrYPlx8HAsHttrnTizOdx7fcCnq5mfxp9dejCce7pyq33fkmVi4/Ml9v1U3796MD187FUf2nYy32xs+i/fOPdP6e+t5+47EqTd6nrPySVxe2OQxgIISLqiNbcNFz2qQm913pfs1pg6vvaV38+Zi/Hh2OvaeeC0+vHE7bi9djp8ebLT2bcTsiUv5RbR/il//+HDMTedfI7sAd/n9OH1wOmZmW+Fh9fqZfMrl8qU4MdvoXFew/jGAAhMuqI1tw0XPfSw2Wxp9NVz0XnfRCgHHd0/FzLGLa2fivPt8zLS/3toapXnl2Xz7gfjnf32u5yLElXj/hbyW2fO9+OcfnFjz2LX/OHD/9wYoIOGC2hhVuOhcpzEX9zUldy7E0fasht1x6v/l2zKr3+dY3HeC5PrZ2LfZY6vP23qxNIBJEy6ojdGEi+5Fnhsf8Jt3P4/b66fsbBUSBn0MoECEC2pj23Bx46U42D549xEuDr4U7XU+V6/T2MEBX7gAKk64oDa2DRfxVpzIF2eaX9zo/pufxvnDnccbJ97qbFo94M/Hhk/ZiHABVJxwQW1sHy7uxIWj2QyPTaaart7+uxFHL3STxKU43j7g925b71a8+eaH+Z9bhAug4oQLamP7cNEzk2OjW9J/ej4OZ4/NtA7uqzni3tmMqQNnY6OVwZcvHo8TvcFDuAAqTrigNvoJF60jeLzUXp/iUJxbly5unTvU2t6Igy+tff6dC0fzW9lPxe6jr8W921tkd1Y9HQdnn481d7gXLoCKEy6oieV47dFOAJj5X/9361UuP/5tPLJ7KhoHF1bPRKxcO9u+Zf3uR367wRoTy63gsrv9tdsjv3nc7EwrpGR3Ur209j60y4vzeRh5NF5bd4va5vsvxFz7sUPx8n+vPQ1y77E9cfrqBqdIAApCuKDibsSrj83FrtVVMTujMTMbcyfbi29vqHnzYjyzfzqmpnfF3OxMNKYfiicX3ovPNjumZ0t4Lzwes/kFodmYfujJWHi/Nz28HSfndsV0z8/R/vqPvdr6KTd4LAsp2z4GUDzCBRXXe/fMdaOPW8Z27jz7edzt90RB8258vunXXokv1v8M2fj8buunHPQxgOIRLgCApIQLACAp4QIASEq4AACSEi4AgKSECwAgKeECAEhKuAAAkhIuAICkhAsAICnhAgBISrgAAJISLgCApIQLACAp4QIASEq4AAASivj/zCDt30HfdCoAAAAASUVORK5CYII= | As shown in the figure, quadrilateral GBCD is an isosceles trapezoid, and quadrilateral ABCD is a parallelogram. What is the length of AB in cm? | A. 10; B. 7; C. 8; D. 9; E. No correct answer | A |
146 | 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 | As shown in the figure, quadrilateral GBCD is an isosceles trapezoid. The lengths of AB and GH are given in the figure. What is the area of triangle GAB in cm²? | A. 24; B. 50; C. 40; D. No correct answer | C |
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iVBORw0KGgoAAAANSUhEUgAAAhkAAAEsCAYAAABuRaEIAAAAAXNSR0IArs4c6QAAAARnQU1BAACxjwv8YQUAAAAJcEhZcwAADsMAAA7DAcdvqGQAACpHSURBVHhe7d1/aFRpvufxYuihhDFs38ECQQuENERwhBZEwqYXDQxqM3KJrDjTYuiA7LAGe6k/zNWg0Jmls83eDLQZlw1ssTZ3O8EwDnGh9nYm+aNC2ml/0HPbuG1uNrYYsG1ilCiJfwRq/vjueU49p3KqUkn9yKk6v94veOjOqaqYH3rOp87nnOeJCAAAQA0QMgAAQE0QMgAAQE0QMgAAQE0QMgAAQE0QMgAAQE0QMgAAQE0QMgAAQE0QMgAAQE0QMgB4S2ZZnk5Nys3kJ3LhwgVzXBmalKmny5IxH38gt+8tmU8F4G2EDAAesSJPRruluSEikYY9crzzigyNjcmYMYaudMrxPQ3SsOOwfPjBPmlNPtavAeBlhAwA7ss8ldSZuEQiUdnX85UsmKcsCq3I9OBJiUci0tT3QG8D4GWEDAAuW5R0QgWMiMQTaeOjjWRkdqBFIsbzAHgfIQOAq5Ymu8yzE5HoGfmynEstMrflUiIlXJUBeB8hA4CLHkuyxQgYRsiI9dzT20p79ugRIQPwAUIGAPc8TkqLOothjM7xohdiAPAxQgYA1yyl2s2AEYkckIFZvbGI55NXc7ez5o0bD/UzAHgRIQOAax4nW3TIaJGN7kpdevQXGRvSt7eaz4/Kvq4hGbv/TD8DgBcRMgC4Zu5aqw4NESnnhpFcKIl2yaTeBsC7CBkA3HOvR2I6ZLSUMcFWZrwzGzJaksJ0XID3ETIAuEfdjhrLhozI3n6Z1pvXlU4QMgAfIWQAcNWz4TaJmmczYtI5vvFUXIQMwF8IGQBctjrjZySekPHic4pnETIAXyFkAHCfWrvkbGP2jEbDEfkvE09kRT+0akWe/M9fETIAHyFkAPCIjCx8MygfHYyZYSMaa5TDH2bnw+g8fkB2qNtXozHZd7xXRh4uZJd9B+BphAwAnpNZfiHzM3fNZd6z467MzL+QZZIF4CuEDAAAUBOEDAAAUBOEDAAAUBOEDMCnzLssfDzKNTc3J319ffojAH5CyAB8qtiB20+jXIcOHZK33npL7t+/r7cA8AtCBgDTrVu3ZP/+/WYAOH/+vN7qrqtXr+ZCybvvvit/+9vf9CMA/ICQAYTc999/L7/5zW9yB3M11MHdbaom2bp1a97X9fHHH+tHAfgBIQMIqdevX8vFixdly5YteQdyNVKplH6We1RNUvh1UZsA/kLIAEJGVQ4DAwOybdu2NQdxa8zMzOhnu8Nek1hj165d5n+pTQD/IGQAITI6Oiq7d+9ecwAvHCsra1cOqRd7TXLs2LHc1zQxMZH7f2oTwB8IGUAIfPfdd3L06NHcQXqjsX37dv0qd1g1ydtvvy0//PBD7utSzp07Z/4/tQngD4QMIAQ+++yzotdeFBvvvfeeflX92WuSzz//3Nxmfay8efOG2gTwEUIGEBLqbIY6MFsH7fXG6dOn9Svqq7AmsVhfl4XaBPAPQgYQIuqdvzowq7rBOlAXjsuXL+tn11dhTWKxvi47ahPAHwgZQMjYK4diI5lM6mfWT7GaZCPUJoA/EDKAkLHOAqjR3Ny85qyGqiPqab2apBRqE8D7CBlAiNgPzNYZgDt37uTd1qoO+vW0Xk1SDmoTwNsIGUBI2CuGwoOymhdDrVeittdTpTVJIWoTwNsIGUBIdHR05A7o69UL9Zzps9qapBC1CeBdhAwgBNRaJNaB2Cvv+DdTkxSiNgG8iZABBJxaCG3nzp3mQVhNyOX2uiRKJTWJ9byNUJsA3kTIAALOXpP09fXpre6ptCaxvvZSqE0A7yFkAAFmr0nU7ap+rEmsr78c1CaAtxAygIB6+fKludiZOuj6sSaxWM8vB7UJ4C2EDCCgTpw4kTtA+7EmsVjfQ7moTQDvIGQAAXTjxo3cgVbVE36+m8T6PipBbQJ4AyEDCBhVk2zbts08yKozB/WewbOYgYGBXFiodNIt63WVoDYBvIGQAQSMvSZR10C4TZ21UGcv1NdTzaRb1vdSKWoTwH2EDCBArl+/njuwqnrCC1SwUF+PE5NuVcq6fZfaBHAHIQMICPsZA6/UJKoasUJPNWuTbJZ9IjJqE6D+CBlAQFhnDNQIQk3iFPtcIdQmQH0RMoAAsJ8xcPOAbudmTVKI2gRwByED8Dn7GQMvHNAVt2uSQtQmgDsIGYDP2WsSLxzQvVKTFKI2AeqPkAH4mH2a7qDWJNb35wRqE6C+CBmAT9mn6Q5yTWJ9PidQmwD1RcgAfMqaplsNNT+G22pVk1jfo1OoTYD6IWQAPmSvSdQMn17gdE1isb5PJ1GbAPVByAB8xl6TqDVK1Folbqvl3STW53UStQlQH4QMwEfUwfC9997LHXjVaqtuq/XdJNb36jRqE6D2CBmAj/T19eUOjEGvSSzW91sL1CZAbREyAJ+YmZmRLVu2mAfFMNQkFuvz1wK1CVBbhAzAB9TBr7m5OXfAVaf63VbrmqReqE2A2iFkAD5gr0nUKX4vqHVNUk/UJkBtEDIAj/vuu+9yNYk6ta9O8butHjVJPVGbALVByAA8TB3s1EHPOqBTk9QOtQngPEIG4GHqYGcd+KhJao/aBHAWIQPwKHWQUwc7ddDbtWsXNUkdUJsAziJkAB5UWJNMTEzoR9zjVk1i/QzqhdoEcA4hA/Age01y7tw5vdVdbtUk1s+hnqzaRF1wq+YnAVAdQgbgMXfu3MmrSd68eaMfcY+bNYn159aTvTZR85NQmwDVIWQAHrKysiK7d+/OHVjDXJNYrJ9FvdlrEzVPCYDKETIADzl//nzuwBb2msRi/TzcQG0CbA4hA/AIe02izmaEvSaxWH++G6hNgM0hZAAeYK9JVNBQgcNtbtckFjdDhkJtAlSPkAF4QCKRyB3IVGXiBW7XJBbr5+ImahOgOoQMwGXq4k7rQKrOZqizGm7zQk3iJdQmQHUIGYCL1HUX6jZVdfCiJvE2ahOgcoQMwEXqDhLrwHXx4kW91V1eqUm8iNoEqAwhA3CJvSbxyjoZ1CQbozYBKkPIAFxQWJN4YcVPapLyUJsA5SNkAC6wTrur4ZVFuKhJykdtApSHkAHUmf2dMDVJadbX5SXUJkB5CBlAHdkPTtQk5fFiyFCoTYDSCBlAHdlrEq8cmLxek1g/Ly+iNgE2RsgA6sT+ztcrp9j9cDeJ9fV5EbUJsDFCBlAHL1++lO3bt5sHI6+86/XL3SReDhkKtQmwPkIGUAcnTpzw3IHIL3eTWD83L6M2AYojZAA1duPGjdyBkpqkctbX6WXUJkBxhAyghlRNsm3bNvPgs3XrVmqSKvghZCjUJsBahAyghuw1ydWrV/VWd/mlJvEjahMgHyEDqJEvvvgiFzAOHTqkt7rr+vXrua/J6zWJH1GbAPkIGUAN2CsJVZPMzc3pR9xjr278UJP41c2bN3NBjtoEYUfIAGrAqiTU8EpNYlU3gapJMsvyYn5e5udfyHJGb/MA62dNbYKwI2QADrPfueGVmsR+h0sgapLMUxnvPiixaFRijU3S1BiTaDQmB7vH5akHwob9rBG1CcKMkAE4yF6TeOWMQfBqkkVJJ+ISiSdk9McVvU3ljpSciUcknkgbz3CfPdhRmyCsCBmAg44ePZo7sHjljIHfaxLr55nzoE+ajI/bU0t6w6rHyRbjuS2SfKw3uIzaBGFHyAAcoq69sA6IXjljEISaxPr6c9IJ8+NiIWMp1W481iR9D/QGl1GbIOwIGYAD1N0j6i4SdTChJnGW+vrVyJnul71qWzwh6bxeZMnIHzGJtCRl3RMZK69kXl0o+mJZ1rt0I7P8Ql7lWpiMLL9Y5/n6c60+tzhqE4QZIQNwgLrA0zqQUJM4y/q5rlqUVHvU3BZtPCsjT9RRPiNPU2ckHj8jqWJXfi5+K8mOPdLQsEOamholFjU+Z0OzdI8/zYaHzLI8ujskvceN5xifN5FW13iMS3dzQ+7PbzhyTWbVk82LTpvN55mPRRulKz/trEFtgrAiZACbRE1SW9b3kWdlWgZas0FDHeRPfXRKDp4alOliZxUW05IwLwgdlwUrfyyOyK/NzxuX3n9RueGhTM2kpDOW/bM6B76Q3/62XyZm5mV+ZlS69mX/rL19KRnuOC7dQ3dlZn5GJvpPSlx9ntgluV0k21ioTRBWhAxgE+w1iTqIqIOJ24J2N4n6PtRYI/NURtpj+vGo7Osqdvvqknx5xggIa0LAotzuPSxNBzrkT7ZuJZ3I/lm//uNCfj1yr0di6s9puiC38k5aPJfhNvWa0teBUJsgjAgZQJXUu1H1rtQ6cKiDiBcEpSaxWD/ffKoeOWuevRgdPCWNqv4wntNwJJl/NuP5sLQZ26Ndk3rDxqyQoeqSPI+T0qK+jiLXe6z7miKoTRA2hAygSurdqDpgqKEOHl4QpJrEYn0/qzIye+2INOztkwf6dMPK9KCcjGefF229thoEJrskamxrKfOe1lqHDGoThA0hA6iCeheq3o2qgwU1SZ09viat0Yi8P/hMb8iyJuNS1cmZL/Xtrfp210g5CcBQ65ChUJsgTAgZQIWoSdw1d63V/D6LHdQzty+Z107Eeu5lN+SupeiT9S6ZWFlZ7VfqETIUahOEBSEDqJC9Jjl9+rTe6q4g1iTryc7qGZHO8WK3c6QlYTzWZF2FmTE+Nq/XiEp7qshtposp+d1/n9Yf1C9kUJsgLAgZQAXu37+fq0l27twpr1+/1o+4JzQ1iUUf8KPtqTVrlGTPZOyV/lxuyMiDvr3mz0bd6np25JFerXVFfpwakrN7TsqwrXWpV8hQqE0QBoQMoEzq3ea7776bOzCkUin9iLvCUpOs0hd+RqLSeErPZTE/J1Mj3dLc0CBHrs3m336amZVrR1Yn1coN+yRaavbOmT9Ku54nI35mRGbmXxlRRM34OSd3+lrNC0gj0VbpuzMnL1RSMV4zZwSV7HUg+jUbzCRaDLUJgo6QgSoYO95Hd+V+/nV3ZVqUf50ck7HqXuyqjz/+OHeA6ujo0FvdFaaapNDKkwlJdh+XA01N0tR0QI53J2XCnP2zGOPv3cgV+fCw9dxBuWNbwVW+/sTYrh6zj0/ka5mT6x8Ubm+SD67PFX/NB9eNV5SP2gRBR8hABdQp5hHpPhgz39VVenpYeTbcln1HWM2LXaRqkrfeess8GFCT1JcVooKK2gRBRshAeZ6Oy3/r+Z1c6DycnUbZGJXmhMxs0rz10Nyh+ihkUJO4y/q5Bxm1CYKKkIEKzcrAgSpCRmZWkq2N0tralD1o+ChkXL58OXegO3funN7qrjDVJNb3GWTUJggqQgYq9FiSLZWGjOwV/vGeezKrbz/0S8i4c+dOribZtWuXvHnzRj/inrDdTWL+fTFG0NmD42effaa3Av5GyECFKg8ZS5Nd0tiaNJfJtuY4KBkyVl7JzN0xGRsbk8mpp/q2wyJWfpSpyftiXUaaWX5qfGy8bnJK7Nf1KRs9VoyapGn37t25Hf/ExIR+xF1hu5vE+vmHgfW7VYvuqcX3AL8jZKBCFYYMtcx2Y6skVcIwlA4Zi/Jt8pQ0xvbI8c4LcuHDgxJT13E0HJH+b61ZEbIXoPYe35d9LJKQtGRkdnh1oSxzGK+5Zv65xufsV7c8FntsfefPn889n5rEPdb3Gwb2s1SHDh3SWwH/ImSgQpWEjEUZ74xLm222o41DxqKkE3GJxI3QYJtlaXHk19nXRNv0xEnP5MnMvNz/g/5ckU4ZSP69HOwekam5eZmfGZWufVHzseiZIRnvOWg8NiR31XwKeY99KXqFizWoSbwj+zsOz67KHiSvXr2qtwL+RMhAhcoPGep21XjnuBEdVm0UMpa+PCNR++JWlrlr0qp3unkvs2ZhjLTIH/LW95bcGhbqsU9zZ0C0B33SpB6LdkmxBcDtNYkKGrdu3dKPuCtsNYnF/PtijDChNkFQEDJQofJChnm7amP+GQll/ZDxTAbfV5+3XVJrTi8syreDn8iFK+Py1N5w5EKGqksKVPuYQVUj1oFNVSZeEMaaJMyoTRAUhAxUqIyQoW9X7ZpcW0asHzKyC1utd+AvqgYhQ13caR3M1dkM+wqdRWWWZbmMi0g3I6w1SdhRmyAICBmoUKmQkb1d9e/+/RX557Hs3SH28b869TwZv/qvepu+M6TE2YWiHA4Z6roLdf2F+vpUTaKuyyjFrIQu3a5ovYpKhbUmAbUJ/I+QgQqVChmrj5c39IF+KSXt5sdNYq3SvVZGFhZs/YvDIaPymmRa+vcaz4+ekcLLSJxCTZJl/QyqGX5GbQK/I2SgQqVCxpI8+svaMxjWWPdMhjyQvqbs542td2bg2bD0XLMttO1gyKi4JjEspRP64tKIvD+4egeNU6hJVlm/m2qG31GbwM8IGahQGddkbGCju0um+/fqnWnc+NwFV4ya13m0Sd6x3KGQoRY7s9ckajG00tSFqlHZv19/zbFLctvhzoSaZHOyf5eCsYujNoFfETJQodWQ0Tle+VF1w3ky1MRd8eznjkQapPmjpNwcG5ObyW451hg1pyXP+xOtW1E3DBKdsubLzD2WvZNFLdue/TMj5nLuZZnul70qWCx+KWfMCcCK3Hq7CdQkq6yfQ6WqfZ0XUZvArwgZKNMzuT92U5Ldq6uwRhuPSe/QmPzlUfkH1w1DhiEzOyynjEBhHSCyIyqNXeOykAsL6msZyk2qpR7f1zUkY395JEv6sd7D8dXXnuqXm0Ufi8i2936b+3+10mp5C1MtyZdnorK3f9r4/4zcvhTLfo73B40/YfOoSfJZv59KVfs6r6I2gR8RMlCmh3LjwgW5UGRcnXyun1Pa88mr2dfdeKi3FJFZkId/Tson6nlXhuTuo+WCazTW+VquTsrzCh5LJBLS0NBg7rTLr0kMzwbl/cj7q9WNOqth7vzj0nOv8rM7hahJ8lkH1kpV+zovozaB3xAyEFpV1SRG3FG36OZPSW5NJLbxVOXloCZZy/p5VKra13kZtQn8hpCBUEqlUrmD0P79+8usSQxL6hqMvdL3IP+MRXZKdPX5bGc4KkRNUpz1e6pUta/zOmoT+AkhA6FjP5hv2bJFZmZm9COlPRt8XyL/7qpMzc/LvH388H+k899kd/x7+x4UvwW3BGqS4qwDaqWqfZ0fUJvALwgZCB1rB61GX1+f3lqGzG25FItIw44maWpaOxpj+kLUKibnoiZZn/VzqVS1r/MDahP4BSEDoWI/mDc3N5dfkxjMSiTeI+te25m7NbayybmoSTZm/b4qVe3r/ILaBH5AyEBobKYmMRKEJFui0ja8UXhYknRC3866t08KLttYFzVJbVgH4CCjNoHXETIQGlXXJIbF8U6JlTOrZ26CsFKBJIuapHasn2uQVVeblLO+UFRijU1y+MMrMvJwoaprjACFkIFQ+OKLL3I7ULUzLrsmWflRpv78O2lVs3pGW+V3f56SuVfF1zVZeTUnU//UnlvPJBLdJ10jU/J0ufgumpqktqzfd9BVW5tklv+v/MEKGy1JI3pYMrL8YkYmkv9R9unZbBu70lIw0T9QFkIGAk9VEKqKUDvTik8rf/3J2os8P/laP5jv608KnqfHB9eL/3lqhlHr4LBjxw555513GA4O62db7LGgjZ/+9Kfm96r+q87YjY6O6r9lG8vNwJsXMlZlZgf0dUbOTpuP8CBkIPDUWQLrgOOVC+R6e3tzXxOD4eRQ1xu9efNG/03bWKmQoa4zSrXrz92e2tREcwgnQgYCTV3nYO18vXKrn1pG/uc//7n5Nf3sZz+T7du3MxibGtaZjJ/85Cfyq1/9quwp8kuHjIyMd+qQ0TYs5S8gAGQRMhBYm6pJauj8+fPm11TReinAOu7cuWP+XVJ/p9TfrUqUDBmLKWk3r8uo7LZswELIQGAdPXo0uwM1xsDAgN7qLvsBofz1UgIusywvCmdQtYbtItvM8ovizzHGOtfiBp46K7Z7927z75P6r/q4ErmQceAPMm2/PnnllcxNDclZvSJyw5FrMsstJqgCIQOBpK69MHeexvDKnRv2A0L5y8qHwNx1+aCpUWL6HbM1orHGvIts565/IE2NMb1GjDWyt1qucy1u4NnPiqkAW6lcyFh3/J38/cADeaWfD1SKkIHAUbWIqkfUTtJLE1xRk5SwOC6dsezBLfYPX8l678kXU+06aDTJf/4mpKcwDJupSSzF6xJ1C+ucTI10S3ND9vcRbTwlw5zKQBUIGQgcdYGnueM0hlcmuKImKcfqJFEtyeKXIZpy07e3SyqktztstiaxlL4mIy2JePZ3Eol3ySS3l6BChAwECjWJn1UaMhKS1pvCZrM1iaVkyDAspdqzzzFG2zD3l6AyhAwEBjWJ3xEyyuFETWIpJ2Ss/rxL/F6AIggZCAR1dkCtqmruMI1x/fp1/Yi7qEkqQcgoxamaxFJOyMjcvpSbKr89rP0UqkbIQCCoBc/MnaUx1LTKXkBNUqnVkHHg938tequqOf76ezlg/q7DFzKcqkksJUNGZlaSrdnbWLkmA9UgZMD31JLtaipltSNUC46phce8gJqkUqshw7x9tcg6MObI3cYarpDhZE2i5C2QduD38lf7ZCPmPBkj0t3ckH08uk96brNEGipHyICvFdYkakVKL6AmqQZ1yXqcrUlWf84bjmhMGpsOy4dXRuThArevojqEDPgaNUmQEDLW43RNAtQLIQO+pSoIqyZRi0RRk/gdIaMYp2sSoJ4IGfAldXZAnSVQO141UqmUfsRd1CSbQcgo5GxNAtQfIQO+pA7gVsDo6OjQW91FTbJZhIxC1CTwO0IGfEdVENbZgp07d8rr16/1I+6iJtmsWRk4UEbIeNAnTWbIaJMgT0BJTYIgIGTAV6hJAshc6n1OpobOSFz/XiPxMzI0Nbd2qfe5O5I8Gde//6js6xqRqbngLfVOTYKgIGTAVy5evKgPMNQkgWEu9V5kPgw1Cpd6L/YcYwRtqXdqEgQFIQO+YT9bsGvXLmoSBBI1CYKEkAFfsJ8tUGNiYkI/4i5qEjiJmgRBQ8iAL1hnC9Q4d+6c3uouahI4jZoEQUPIgOcV1iRv3rzRj7iLmgROoiZBEBEy4GkqUFCTIOioSRBUhAx4mqpGrIBBTYKgoiZBUBEy4FnqrIUVMLz07o6aBE6iJkGQETLgSaomUddfeO3dHTUJnERNgqAjZMCT7DWJV97dUZPAadQkCDpCBjyHmgRhQE2CMCBkwFPULJ5q0TOvvbujJoGTqEkQFoQMeIpaj0TteNW4fPmy3uouahI4jZoEYUHIgGeoFVWtgOGlgzk1CZxETYIwIWTAEwprEq8czKlJ4CRqEoQNIQOeYK9JvHIwpyaB06hJEDaEDLju5s2buYBBTYKgoiZBGBEy4KqXL1/Ktm3bPHcwpyaBk6hJEFaEDLjqxIkT5o5Xjb6+Pr3VXdQkcBo1CcKKkAHX3LhxIxcwmpubqUkQSNQkCDNCBlxhr0m2bNkiMzMz+hF3UZPASdQkCDtCBlxBTYIwoCZB2BEyUHeff/55LmBQkyCoqEkAQgbq7IcffpC3337b3PFu3bpVvv/+e/2Iu6hJ4CRqEiCLkIG6OnbsmLnjVePq1at6q7uoSeA0ahIgi5CBurHXJIcOHdJb3UdNAidRkwCrCBmoi8KaZG5uTj/iLmoSOImaBMhHyEBd/PKXvzR3vGpQkyCoqEmAfIQM1JwKFVbAoCZBUG2mJsksv5D5+Xl5sZzRW4BgIGSgplQtouoRteNVdYmqTbyAmgROqr4mycjs8ClpjGZDeCTSIM3do/KElgUBQchATakzF9mdZ8S88NMLqEngtKprksdJaVH/PqIxaWyMSVT/W4nET0rymwUjggD+RshAzdhrEnXrqldQk8BJm6lJ5q61GoEiIelF9VFGlh+NyNnGqP530yDNvV/JAkkDPkbIQE2oSbaoSRB01dckWY+TLdI2/Fx/pGUW5KveZmkwg0ZEoo1nZSTXnxhBZJkuBf5ByIDjVP2gpgvPvhujJkFwVV2TaM+H2ySR1h/kycjCN/1ypCH7bygSbZRjvUNys/8j+cfJJf0cwPsIGXCcWvDMChhtbW16q/uoSeCk6muSFXlyd0iuXLgiQ9d+K58WDRnayrQMnmrMXasR77nHdRrwFUIGHKWWbFdLt6sdolrKXS3p7gXUJHBS9TXJoqQTcfN11sivQ4pZkW8/3SuRlgGZJWHAZwgZcExhTXLjxg39iLuoSeC0qmuSez0SM17X0PyhXPjwsOyw6pBIXE4mvzUiSHGPr3VJkoQBHyJkwDH2muTEiRN6q/uoSeCk6muS7IWesc7x1TCx8kRGzq7WIQ1H+uWbNbeTzMlkepaaBL5EyIAj1MHb2vFSkyCoqq9Jsh4nW6VrUn+Qk5Gn493SnLvIc590jT4R8zNnZuWfx2bMZwF+RMjApqn6QdUQ5g7SGNQkCKpqa5Jnf/pIOganZSWdlORjvbFAZuEb6T/SkPt3pCqVDw+ekuFn+gmADxEysGnqDIG1Yzx9+rTe6j5qEjip+ppkSVLtOjg0Nkvf7Y2KjxWZHjwpcfPfU1TaU+tdpQH4AyEDm2KvSXbu3CmvX7/Wj7iLmgRO2lxNMildubVJjKHqkPGnG15jMTtwQOKJ9LoXggJ+QchA1QprklQqpR9xFzUJnFZtTWKaHZDOP9yX+ZlR6W626pCoNJ4alOmiWSUjt6/06KnGAX8jZKBqFy9e1DvMiHR0dOit7qMmgZOqr0m0lWVZXcF9Ub5N2lZdVQuhfVuYJlZkYYFZPREMhAxUxb7jpSZBUG2uJlnfypOChdCs5d0X0/LZPz3MPgkIAEIGKmbf8aoxOjqqH3EXNQmcVl1NotYdSUrHHl2NNByRL4rdUVKwEFqkYYfs+Ld98oAJMRAghAxUzNrxqnHu3Dm91X3UJHBStTXJYjoh8WhMdsSsMxVx6f0X/eAaKpD0SatZn7TIALN6ImAIGaiIfce7a9cuefPmjX7EXdQkcFLVNclSWhL7EjJuztqpFkIbk7G/FtxJkneNRtbsQIu0JpnVE8FDyEDZVKCw1yQTExP6EXdRk8Bp1dUkRsZItcv7gyVmzzKCSG+P/fbU5/K///ELWWeOLsDXCBkom6pGrIBBTYKgqrYmUR70NUnneOnzEQ/6WuTShpNyAcFAyEBZ1FkLK2BQkyCoNqxJng1L9//4f/qD4swF0C7dLl17pBMSPfOlcKMqgo6QgZJUoFDBQu141QH91q1b+hF3UZPAaevXJEvy5dmz8mWJVJBR4SESl0SJmbRUGIm0JKlIEHiEDJRkr0kqPX1cS9QkcNKGNcmzQXm/PVX6zEPmnvTEjX8r0UY5O6JXUi20mJaEeg4hAyFAyMCG7DXJmtPHLqImgZM2rEkMz4fb5MDArP5oY+YtrPrfTEPzR5L885TMzc/LvDHmpkaka1/21tZYzz39CiC4CBlYl5rFU83mqXaIa08fu4eaBE5bvybJUhd0NvU90B+VkpGFr3pkn31RtMIRbRcWWEUYEDKwLrUeibVTpCZBUG1Yk2jphPHvoHN87QWdmQV5+OekfHLhgly4cEWG7j7KzYGRWfhGkh17Vmf01KNhz3+S1FPuLEE4EDJQlFpR1dop/uIXv6AmQSCVqkksaun1SKxH8gqOxbR05dYfWR3RxlN5i55lll/I3NSkjE1OydyLZSbcQqgQMrBGYU3ilbMF1CRwWqmaxKKuyYhEYra5LZ7JcJsRMBr2yPHOC3Kh87gc2GEt465G6TtMgDAgZGANe03ipbMF1CRwUjk1Sc6DPmkynhdtGzbihWG6X/a3Dsh03omPjCw/GpXuZh02YglJMxEGQo6QgTw3btzIBQwvnS2gJoGTyq1JVt2Tnpj6dxGTzvFFmbt2RBLp9YqPRfm2/4h5Lcbe/mm9DQgnQgZyXr58Kdu2bTN3vNQkCLJyaxK76f695msi0VY52XZSrs3pB4rKyIM+4/mt12TDpwEBR8hAzokTJ7I7UWNQkyCoKqpJ7JYmpUtNomX+G/m1/NFcaXUDz4elraFbvtYfAmFEyIDJXpPs37+fmgSBVHlNks8+0VYkflIG8y/KKJCWBGcyEHKEDOTVJFu2bJGZmRn9iLuoSeC0amqSfBmZHT65GjSijXIq+Y0UO6mRedAnv+aaDIQcIQPS1qZuz8vuNPv6+vRW91GTwElV1yRrqBk9e6W5QQcNNdStrL1DMnZ3RubnZ+TuULc07+mRe0yKgZAjZITc559/nttRNjc3U5MgkDZbkxSTWXgoI90HJVZk+vCG5l75qtQ1G0AIEDJC7IcffpC3337b3ClSkyDINl+TbCCzLC9m7srY2Fh2Vs9Xmw8wQFAQMkLs2LFjuXde1CQIKudqEgCVImSElL0mOXTokN7qPmoSOKkWNQmA8hEyQshek2zdulXm5rxxkx01CZxW05oEQEmEjBBSZy7UjleNq1ev6q3uoyaBk6hJAPcRMkJGhQorYFCTIKioSQBvIGSEiKpFVD2idrzUJAgyahLAGwgZIWKvSQYGBvRW91GTwEnUJIB3EDJCwl6TqFtXvYKaBE6iJgG8hZARAmqSLasmUXeVqLtLvICaBE6jJgG8hZARcOrAraYLVzteNdT8GF5BTQInUZMA3kPICDg1k6cVMKhJEFTUJIA3ETICTNUkak0SteOlJkGQUZMA3kTICKjCmuTGjRv6EfdRk8BJ1CSAdxEyAurTTz/NBYwTJ07ore6jJoGTqEkAbyNk+Njr16/1/+VTZwesA/m2bdvk5cuX+hF3UZPAadQkgLcRMnzs6NGj5k7W/u5NHbjVAVzteNWgJkFQUZMA3kfI8LF33nnH3MGqswPWuzhVQVgBg5oEQUVNAvgDIcPHrIO2Gur/z507l9u2fft2ahIEFjUJ4A+EDJ9St6NaAaPYSKVS+pnuoyaBk6hJAP8gZPjUxMREXqiwD7UDVpWEF84YUJPASdQkgL8QMnxKTQ9uDxbFhqom3DxzQE0Cp1GTAP5CyPCpy5cv5wWK9YabZzWoSeAkahLAfwgZPnX69Om8MLHeUPNkqGXe6x0yqEngJGoSwJ8IGT713nvv5YWJwqEO8Ord3noTdtUSNQmcRk0C+BMhw6d27tyZFyrsQ82P8f333+tn1h81CZxUbU2SWX4h8/Pzxngleec9MsuyzIkQoC4IGT6kzhTYQ4U19u/fb9514iZqEjip4ppk5YmM9h6XfbGoRKIxaWxqkqamRolFG2TP8V4ZmZqT+wOt0pXWzwdQU4QMH1JLuNvDhTqroe42cRs1CZxWSU2yeLtXmhuMfxPxk9I/8UiWM/oB04r8eCcppxqN8GF8vvbUkt4OoJYIGT40Ojpq7ii3bNlini0o+e6uTqhJ4KRKapLFdELixvMi8YSkF/XGYhbTkohHpCX5WG8AUEuEDB8aGBiQjo4Os2/2CmoSOKmimmRxXDpj6qxeTBLp0mcoMvd65CQhA6gLQoYPeeXMhYWaBE6rpCaZ7t9rPjfS1CcP9LaNPZM//elr/f8AaomQUUPmjs/noxzUJHBSJTWJyD3pMc9iRCTaNam3AfAKQkYNWQdqP49S7AcEdQGqqnEYjM2MXbt2mX+fyrqb5HFSWvTfVa6zALyHkIGqqVpE1SNWIGEwnBrl1CSmyS6J6tckuC0V8BxCBqp269atou9EGYzNDjUVflnSiVwwIWQA3kPIAOBf1CWApxEyAPiY7cLPRFry5t8C4DpCBgBfy93CGrskt8tMGZmVFQIJUAeEDAD+pmfxNCuTgdnS4cF4fm9vWjaaGBSAMwgZAHwvM5uU1qgKGnE5OTidv+qqTWbhK+n9qF++JWEAdUHIABAIK9ODuQXQGvYcl96hSZmaU0u9z8vc1KQM9R6Xwx2DMu2tCXOBQCNkYANpSaiue6NhLqd9QI53XpGhu4UrXwL1tiI/To3IlQsfymFzmXdjHDgunVeG5O6jZa7DAOqMkIGSVn5M6QWojPEfbsor2zvBlVdzMjXSLQdj2XeQ0cZTMshbRQCAgZCBsqQTOmSsN+PRyrQMnozrsxutkpzlPSMAhB0hA2UpGTKUzKwMtOjnxXvkHjkDAEKNkIGylBUyDJnblySmnmeM9wef6a0AgDAiZKAs5YYMkQfS16Sf2zYsz/VWAED4EDJQlvJDRkbGO/VzIwkp9WwAQHARMlCW8kOG7bmRdkkt6Y0AgNAhZKAs1YWMThnn4k8ACC1CBspSVV0S7ZJJvRUAED6EDJSl/JBhu/CzPSW0JQAQXoQMlKXckLF6C2tUznxJxACAMCNkoCxlhQzbZFzR1mvyWG8GAIQTIQNlKRky7NOKxxOSZiltAAg9QgZKKlwg7YVtqdXCBdIamnvlqwVuKQEAEDKwoTKWeo80yA611Ht3UiZYShsAYEPIAAAANUHIAAAANUHIAAAANUHIAAAANUHIAAAANUHIAAAANUHIAAAANUHIAAAANUHIAAAANUHIAAAANUHIAAAANUHIAAAANUHIAAAANUHIAAAANUHIAAAANUHIAAAANSDy/wE5tVr2dACaCwAAAABJRU5ErkJggg== | As shown in the figure, quadrilateral GBCD is an isosceles trapezoid (with a perimeter of 40 cm), and quadrilateral ABCD is a parallelogram. What is the area of triangle GAB in cm²? | A. 24; B. 50; C. 40; D. No correct answer | C |
148 | 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 | As shown in the figure, ∠4 in the right triangle is equal to ∠5 in the left triangular ruler. What is the value of ∠4? | A. 45°; B. 60°; C. 120°; D. No correct answer | A |
149 | 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 | As shown in the figure, the left triangle is a triangular ruler. What is the measure of angle ∠1 in the right triangle? | A. 55°; B. 45°; C. 65°; D. No correct answer | A |
150 | 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 | In the triangle shown in the figure, the degrees of each angle are marked in the diagram. What is the value of ∠2 + ∠3 = ()°? | A. 200; B. 250; C. 260; D. No correct answer | C |
151 | 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 | As shown in the figure, ∠4 in the right triangle is equal to ∠5 in the left triangular ruler. What is ∠2 + ∠3 = ()°? | A. 200; B. 250; C. 260; D. No correct answer | C |
152 | 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 | In a parallelogram-shaped pool, the shortest path from edge AB to edge CD is 4 meters. Which of the following corresponds to this path? What is its positional relationship with line segments AB and CD? | A. ①, perpendicular; B. ②, intersecting but not perpendicular; C. ②, perpendicular; D. ③, perpendicular; E. No correct answer | C |
153 | 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 | The shortest path from side AB to side CD is path ②, and path ② is perpendicular to AB. What is the height of the parallelogram in meters? | A. 4; B. 3; C. 2; D. 1; E. No correct answer | A |
154 | 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 | The height of the parallelogram is 4m. What is the area of the parallelogram ABCD shown in the figure in square meters? | A. 12; B. 20; C. 24; D. No correct answer | C |
155 | 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 | A parallelogram-shaped pool has a shortest distance of 4 meters from AB to CD. What is the area of this pool in square meters? | A. 12; B. 20; C. 24; D. No correct answer | C |
156 | 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 | As shown in the figure, the isosceles trapezoid on the left is made of wire. What is the length of the wire? ( ) cm? | A. 12; B. 10; C. 8; D. No correct answer | A |
157 | 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 | As shown in the figure, the isosceles trapezoid on the left is formed using a 12 cm long wire. This wire can also be used to form the three-dimensional shape on the right. What is the edge length of this three-dimensional shape in cm? | A. 1; B. 2; C. 3; D. No correct answer | A |
158 | 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 | As shown in the figure, the isosceles trapezoid on the left is formed using a 12 cm long wire. This wire can also be used to form the square on the right. What is the surface area of this square in cm²? | A. 6; B. 12; C. 18; D. No correct answer | A |
159 | 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 | As shown in the figure, the isosceles trapezoid on the left is formed with a wire. This wire can also be used to form the square on the right. What is the surface area of this square in cm²? | A. 6; B. 12; C. 18; D. No correct answer | A |
160 | 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 | As shown in the figure, the following parallelogram is enclosed with wire. What is the length of the wire in cm? | A. 16; B. 12; C. 10; D. No correct answer | A |
161 | 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 | As shown in the figure, a 16 cm long wire can be used to form the parallelogram above. The same wire can also be used to form the rectangular cuboid below. What is the height of the rectangular cuboid in cm? | A. 1; B. 2; C. 3; D. No correct answer | A |
162 | 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 | As shown in the figure, a 16 cm long wire can be used to form the parallelogram above. The same wire can also be used to form the cuboid below. What is the surface area of the cuboid? ( ) cm² | A. 6; B. 10; C. 12; D. No correct answer | B |
163 | 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 | As shown in the figure, a piece of wire can be used to form the parallelogram above. The same piece of wire can also be used to form the rectangular cuboid below. What is the surface area of the rectangular cuboid in cm²? | A. 6; B. 10; C. 12; D. No correct answer | B |
164 | 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 | There is a trapezoidal pool, and the distance from edge AB to edge CD is 4 meters. Which of the following corresponds to this path? What is its positional relationship with line segments AB and CD? | A. ①, perpendicular; B. ②, intersecting but not perpendicular; C. ②, perpendicular; D. ③, perpendicular; E. No correct answer | C |
165 | 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 | The shortest path from side AB to side CD is path ②, and path ② is perpendicular to AB. What is the height of the trapezoid in meters? | A. 4; B. 3; C. 2; D. 1; E. No correct answer | A |
166 | 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 | What is the area of the trapezoid ABCD shown in the figure in square meters? | A. 12; B. 20; C. 24; D. No correct answer | C |
167 | 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 | A trapezoidal pool has a distance of 4 meters from AB to CD. What is the area of this pool in square meters? | A. 12; B. 20; C. 24; D. No correct answer | C |
168 | 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 | A rectangular sheet of metal has a square cut out from each of its four corners. The side length of each square is () cm. | A. 1 cm; B. 5 cm; C. 2 cm; D. No correct answer | A |
169 | 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 | A rectangular piece of iron sheet has a 1cm square cut out from each of its four corners. Then, it is folded to form an open-top rectangular box. What are the length, width, and height of the rectangular box? ( ) | A. 10cm 5cm 1cm; B. 7cm 12cm 1cm; C. 1cm 1cm 1cm; D. No correct answer | A |
170 | 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 | A rectangular piece of iron sheet has a square cut out from each of its four corners. Then, it is folded to form an open-top rectangular cuboid as shown in the figure. What is the base area of the rectangular cuboid? () | A. 50 cm²; B. 100 cm²; C. 10 cm²; D. No correct answer | A |
171 | 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 | A rectangular sheet of metal has a square with an area of 1 cm² cut out from each of its four corners. It is then folded into an open-top rectangular box. What is the area of the base of the box in cm²? | A. 50 cm²; B. 100 cm²; C. 10 cm²; D. No correct answer | A |
172 | 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 | A square metal sheet has a small square cut out from each of its four corners. What is the side length of each small square in cm? | A. 1 cm; B. 5 cm; C. 3 cm; D. 2 cm; E. No correct answer | D |
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 | A square metal sheet has a square with a side length of 2 cm cut off from each of its four corners. Then, it is folded to form an open-top cube. What is the edge length of the cube? ( ) cm | A. 1 cm; B. 2 cm; C. 3 cm; D. No correct answer | B |
174 | 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 | A square metal sheet has a small square with a side length of 2 cm cut out from each of its four corners. Then, it is folded to form an open-top cube. What is the surface area of the cube? ( ) cm² | A. 8 cm²; B. 16 cm²; C. 24 cm²; D. 32 cm²; E. No correct answer | C |
175 | 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 | A square piece of metal has a small square cut out from each of its four corners. It is then folded to form an open-top cube. The surface area of the cube is () cm². | A. 8 cm²; B. 16 cm²; C. 24 cm²; D. 32 cm²; E. No correct answer | C |
176 | 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 | As shown in the figure, the area of triangle ABE is 4 cm². What is the length of AE? ( ) cm | A. 4; B. 5; C. 2; D. No correct answer | A |
177 | 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 | As shown in the figure, the area of quadrilateral AECF is 14 cm². What is the length of CE? ( ) cm | A. 4; B. 5; C. 2; D. No correct answer | A |
178 | 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 | The side lengths of parallelogram ABCD are shown in the diagram. What is its area in cm²? | A. 24; B. 16; C. 8; D. No correct answer | A |
179 | iVBORw0KGgoAAAANSUhEUgAAAYIAAADGCAYAAADfRIdHAAAAAXNSR0IArs4c6QAAAARnQU1BAACxjwv8YQUAAAAJcEhZcwAADsMAAA7DAcdvqGQAAB/hSURBVHhe7Z1vbFTXmcb9odIgBRdUMVG7YAnkVK4EVoJKvVYNjUaiSdCixhYoZCkGWsIqWCC5ahxwIYX8Yd3WkYLlqJZ2dokSoLg1tam8jQNZ2XKS2nhRbLNgUQONKyAFggwyfLA0fHj3vmfOGd+xjz3/55577/OTHiXMPXc8c+e+97n3nPect4AAAAD4GhgBAAD4HBgBAAD4HBgBAAD4HBgBAAD4HBgBAAD4HBgBAAD4HBgBAAD4HBgBAAD4HBgBAAD4HBgBAAD4HBgBAAD4HBgBAAD4HBgBAAD4HBgBAAD4HBgBAAD4HBgBAAD4HBgBAAD4HBgBAAD4HBgBAAD4HBgBcD+3e6l5717am7Kaqfe2fA8AfAyMALifiSv02ZkOCtc/Q0UFBVQg9S+/PkNnzkzXCTpSs56KA9ymgsLX5HsA4GNgBMBTXGgsiRlBbbd8UUNkNEyhAIwAAAZGADzFtXBFUkbAjDTtgBEAYAEjAJ4iFSOgm0M0dFP+PwA+BkYAPEVKRgAAEMAIHGGc+o7/mdArkX0SG8EEDfy5l5AsBMAUMAInGGmi0oIg7e+LyBdAtkhoBOOdVB0Kw4QBsAEjyDsR6tsfFBeqwI4PrftTs4jcuUTtRzjH/i0Kf3SJ7rjMq+xGULph2ryBmipaXmhtq4ARAGAHRpBvbh6ndfJCVVBQSk0j8nUDECmVhUEqLimhxXzBtD5j4QunyE3jqXMawbZnot8LRgBAHDCCPDPSVEoFgQAF5MUquL/PekYwgMgAvbvnOI1Mqn9fp/ZqfnIJ0qEB+ZoLSNQ1FBltoQoYAQBxwAjyyUQ31QYDVN3ZT02l0YtVQWAHfWhC/9Dtv9Hfpn+O7lrrMwaorlf+2wUkHiy+RuFaGAEAdmAEeeTm8XVUENxPPEYs/l9esEpN6h+yMdFZTQVFh2hA98gy+QWdO3FEdLm8Ff6ILsUNJkTowZVzdOJIG13if6lxh7eO03nVLnKHLrXz/m9RuOcLUg8imZLYCKxjf+WKcWMzADgJjCBfRC5Qo/UUELvoT3xIO8R6N5akOZjE5MhxeqE4ROHRmR9sfLCJng0W0/rDJ8TaPXUrA9aTjWz78P/odONOWim+Wy21W203PLON9qr1fYrqqPd6Hx1+poyqamqoanmh1S5Ala3ZGYlIxggAAPHACPLExIc7KFCwjo7HrndT2UN8IdxhRP+QxaU22vZ0UIxhBIJPU33XtLt1Tr8McPfWuHzB+iZna8T3KKz/i3qFztbw9wpRy+jU3uPtm0S7lYf6prKRIn20P2i1re7Myl06jACA1IER5IWbdHydJl1UzCeIXrQKSpvIiA6im0PRFTq3lVOh+GwBCh2d6lG/3VppvVZDZ+0PCtzN09sb1z3UXcv71lLctXi0hcpmXKCvUbjCapulAVwYAQCpAyPIA5G+/RQsKKJDMzrbowYRvXCZN8EsukKn9dmCh0glDmkv8Bq07a6FqQJGAIBxwAhyzgR9uCNABeuOa/Pxo11G0QuXiRPMoss6T13Qe+us7xLXxTXFzQsXYks3OGME49RZzZ8vejwrWkbNSM0FwHBgBLlGdv8EQ/8WP7lJ6Wc/om/LC5dpE8wYcYdtM7Fo11ABlTZeiL/IRgboyJGpORF5NQJZoUyNbSgj4G6t4NPbrOMczV4CAOiBEeQUOSBctIP+c0alrCn97melsYuXUxPMItfPUjjcQ1ce2P76eDfVFk3r0hJzIfizFtKz/95Dl2/dorHhdqorf5amhhLUYPE0Ixg4REHrO1Z32p97RqmlzGqbiRGICmX6YxvVkKtmRwOQb2AEueRmK1UGkkiNtKeSOjTB7PapF6J304EgPb3NelKpqaKVKzdTeHAqO0gxORKmZ+USFNHPXEx1Z+9IA7tEbbFSkAEqXl9Dbdbt+KW2GlpfLLttCstpW3Mv3b7URntjg9KFVL4NNYRB9og8+IpuWTcqCfXVA0duvkwCRpBDxHISs03ImoZoKy+sFY6UzYpOAoveQffS8Ni9uSd5Td6jy+e47bn4pwjr3nto2h05F3+5ORT/2pnPrtCEyFCyv/4ZXTFtkAS4lrGT/0olJYvljUa8AsFia1uJpWIKypswfq2sqp7CPVco7pT2ATCCXCHy7QtonW5UVceE1V6dqMFa6sYFEYCsELnTLmIxagI7qXPGVd66Cbo+TO316unUMoVi/dOwV4ER5IRx6q4tsk6oEmoYTPbWQvaVyxOxqPZsUktA9/f303vvvQdBvtWxY8dkNMyGTEgQsTVt3Goa8d2eRVTb7Q8zgBFkmUsfVNHK4FQKY0HhYutxs4aaZ+38vk29zWqpBXUCRsUze0Vfumw5nUePHtGSJUtm7AdBftL27dtlRMxG8kbAxObPcHu1dIrHgRFkmRl94VKfzdr5PUFXPtPvI8R96bLldNra2mLBwPr+978PTdP3vvc9+trXviaOT1FRkbYN5D595zvfiZ33Fy9elBExG6kZAWOfmBiobPV81hmMwMWsXr06drKybv3jH5BGR955RxwfNoT/7uzUtoHcpZ07d4rfdO3atTIa5iJ1I4jL5DNwfk+2gRG4lKGhIXmSTkkXMFBUzz33nDhGTzzxBP19bEzbBnKHRv/6V3rsscfE79nR0SEjYi7SMALrObyzeiq2nMnkyx8wApfC/aJ8gpaVlcVOVl3QQFGNXLpE3/jGN8Rx4rtJXRvIHXrj9dfF77h06VIxTpaYdIwgvnuooOasp+cawAhcCE+CmTdvnjhB3zt6NHay6oIGmlL4P/4jdqz+eOqUtg1kvpYtWyZ+w3feeUdGRCLSMwJRmEmeL9laFNFUYAQu5M033xQnJw9+3rh+PXay6oIGitemTdGaCHzsrl29qm0DmSt14zN//ny6f/++jIhEpGcEJEq1wgiAgfCj8De/+U1xcv7ytddEcKiTdXrQQDPF/cvf+ta3xPFiU9C1gczVD9asEb/d7t27ZUQkQ3pGMHY0JPexFDpKY/J1LwIjcBknT54UJ2YgEBAXNQ4OdbJODxpIr9///vexY/bB++9r20Dmqae7O/a7Xb58WUZEMqRnBAOHVAXBAgoeUhU5vAmMwGWsWrVKnJg//clPYgGiTlZ70EBzi48fH7PHH39cDCTr2kBmaevWreI34wyw1EjHCOz7BKi229uTymAELoKXk4iemAX06SefxAJEvWYPGmhu8fjAsqVLxXFbv369tg1kjvjpl5+C+ffq6uqSEZEsaRiBvYxscD8ZVjww68AIXMSLL74oTsxQKBQXJNETHEaQqnhymZp13NLSom0DmaFf/OIX4nfiGcWpk6oR3KTWSrVMTBLLyHsAGIFL4JRRddGa3q8dPWFhBOlo165d4th9/etfp8HPP9e2gZwVZ8apAf7m5mYZEamQihFM0khLKFbprqi2m/yw7ByMwCXs27dPnJg8M3Z6oERPcBhBOuKLzPLly8Xxm/6kBZkhNf9j4cKF9PDhQxkRqWBf2XcOI5j8gtp3FUsTCFDxrk667v315gQwAhcwOTlJixYtEify4cOHZwRK9ASHEaSr//n449jTlu74Qs5KzZ6vra2VEZEc0Qpll6mn6QUqkjHC6wb9NNxBZ85djlUou3yug8L1VbRcLj9duHw7hc+rinv+AEbgAsLhsDhBuftCNwkqeoLDCDKR6oPmNWz+d2BA2wbKv9ik+Xdhox4bSy2TP1qhjKuQJdIztG3vXjpyopeGr/uzbCWMwAU89dRTIhhmWyMHRpC5uIvou9/9rjiO/F/+t64dlF9t2LBB/CaVlZUyGkAugBEYTk9PjwgEviPq6+vTBguMIDvilFy1qqWatQ05pwvDw7GU0Y+tJwOQO2AEhsN3QhwIPIlGFywsGEH2xGMEfCz5AsTdEro2UH6099VXxW+xYsUKGQ0gV8AIDIb7RNUgJi+LoAsWFowgu+IKWHw8OZsIXUTOiGtG8Kxv/h14jAzkFhiBwbzyyisiEHgSjS5YlGAE2RXPJ+CBeT6mnKmiawPlVu82N4vjz9lynDUHcguMwFA4X5rzpjkY3n77bW2wKMEIsi+Ut3RWTz75pDj+PH8G5B4YgaHwDEoOBK6qlai0IowgN0J5S2fExsvHnU34xo0bMiJALoERGAp3B3Ew7Nm9WxssdsEIciN7eUv7aq9QblX5/PPimG/cuFFGA8g1MAID4dUVORD4jiiZ9W9gBLkTylvmV3y+qwQJXm0X5AcYgYHwssgcCHxnpAuW6VIXKt02KHOp8pa88JkqBgTlRvwEzMea626A/AEjMAyuvKQu7MkOUqr2um1Q5kJ5y/yIx2FUV9yxY8dkRIB8ACMwDK7FyoHAWRO6YNEJRpB72ctbcgF1XRsoM3F2HB9frsmNlNH8AiMwiPv379P8+fNFMHAetS5YdFIXKN02KHtS5S35rhXlLbMvlSBx8OBBGREgX8AIDOIdmbvOMypTSVeEEeRHKG+ZO6knrnnz5omloUF+gREYwqNHj0S+OgcDr7GiC5bZBCPIn+zlLXnSma4NlLrUnI0tW7bIiAD5BEZgCB0dHSIQeLEzXnVRFyyzCUaQX6G8ZXbF9R+UuZ4/f15GBMgnMAJDWLt2rQgEXn9dFyxzCUaQX9nLW/5gzRptGyh5cZ0NPpbl5eUyGkC+gREYwMWLF2MX83SWPlb76rZBuRHKW2ZHPO6yYMECcRzb2tpkRIB8AyMwgJdeekkEAtdm1QVLIsEInJG9vOVsRYOguaXqPyxZskSMkwFngBE4zN27d0WmBAcDL2egC5ZEghE4I5S3zFwqQaKhoUFGBHACGIHDcABwIPDM1XQvJDAC54Tylunrg/ffF8eNb4T4hgg4B4zAQfhRmB+JM72IwAiclere4DEDlLdMXqFQSBw37hoFzgIjcBAeHONA4JTRTBYzgxE4L5S3TE38JKXOW06WAM4CI3AQTpfjQNi6das2WJKVCijdNig/spe35HkGujbQlNRyHZw2DZwHRuAQPHFGXcB7uru1wZKs1PvotkH5E8pbJid++lXjKjyREjgPjMAheCo9B0I2JiTBCMyRWiqB1yTiHHldG7+Lx8P4GC21jhFSRs0ARuAAvKiWShnlzAldsKQiGIE5QnnLucXjJ0VFReL48CKLwAxgBA5w4MABEQh816gLllQFIzBL9vKWvKqmro1fxbUc+Ljwcuu87DowAxhBnuGCG1x4g4Phjddf1wZLqlIXHd02yBmhvKVe3BXKx4ULMAFzgBHkGS7Bx4HAGSbZukDACMwTylvOFM+xUOcql2QF5gAjyDNclJsDgVdc1AVLOlLBpdsGOSd7ect0lw/xkn68ebM4FjygDswCRpBHPv3009iFIZuLlKn31G2DnBXKW0bF350nTvKx6OrqkhEBTAFGkEc2btwoAuGHP/yhNljSFYzAXNnLW/KdsK6NH6RWauW6xMA8YAR54saNG7H167OdSQIjMFt+L2/JKaNch5u/f3Nzs4wIYBIwgjyxb98+EQh8R6QLlkwEIzBf9vKWXJpR18aramlpEd994cKF9PDhQxkRwCRgBHmAU0Y5CDgYfv2rX2mDJRPBCMwX3xWr8pa8QJ2ujVelajbU1tbKiACmASPIA+qOiO8G/z42pg2WTAQjcIf8WN7yo64u8X35e49Z5z4wExhBHlixYoUIhj27d2uDJVPBCNwjNWjKGTS8FLOujZe0YcMG8X0rKytlNAATgRHkmI/lJBq+I+KlinXBkqlgBO4RdxH5pbzlheHh2BMQxwEwFxhBjuE7IQ6E9evXa4MlG4IRuEv8JKBy6ve++qq2jRfEYwL8HfmJGJgNjCCHXL16NXaR/tPp09pgyYbU39Btg8yU18tb8liYShkNh8MyIoCpwAhyiLoj4mwRXbBkSzACd8pe3jIXSQROShXpWbRokciaA2YDI8gRnC+tUkbfbW7WBku2BCNwp3g+gVfLW66QqbI8fwaYD4wgR/AMSg4EfjzO9d0ejMC98mJ5S+4GVd+JZ9QD84ER5IgnnnhCBAN3D+mCJZuCEbhbvPYU/35cucsL5S05MYK/D6+tBdwBjCAHdFp3dhwInBnCKXS6YMmmYATulpfKW3KKtEoZ7e/vlxEBTAdGkANUAXOeTKMLlmwLRuB+2ctb/u7ECW0bN0itqcR1N4B7gBFkGa68pAKap9frgiXbUn9Ptw1yj9QsXLeWt+SxsAULFojvwJX4gHuAEWSZl19+WQQCzxrVBUsuBCPwhuzlLSuff17bxmTxgor82bkmN1JG3QWMIIvcv3+f5s2bJ4Ihn6UJYQTeEXcLqd/TbeUteYl1/twHDx6UEQHcAowgizQ2NopA4Lu6fK4hoy4cum2Q+2Qvb5mPZINsSBkY3wjdunVLRgRwCzCCLPHo0SNaKksS8gqTumDJlWAE3hKnkHIqKf+m2S5rmiupFNgtW7bIiABuAkaQJTo6OkQgcMpovouUwwi8JzeVt+zr64udg+fPn5cRAdwEjCBLrF69WgTCjzdv1gZLLqWCULcNcq9UKuZjjz1mdHnLnTt3is9ZXl4uowG4DRhBFhgaGopdjHu6u7XBkkupv63bBrlXnI5penlLznRSKaNtbW0yIoDbgBFkgZdeekkEwg/WrNEGS64FI/Cu7OUt33j9dW0bJ8WfiT/bkiVLxDgZcCcwggzhDAmVMvre0aPaYMm1YATeFhev4d/XxPKWy5YtE5+toaFBRgRwIzCCDHnzzTdFICxbutSxsoMwAm/L1PKWH7z/vvhMfCN09+5dGRHAjcAIMoAfhXkWJQeDk4/tMALvy17e8uc//7m2Tb4VCoXE5+GuUeBuYAQZcPLkSREInNXh5NowMAJ/yKTylpwUoc67ixcvyogAbgVGkAGcLseB4PTSwSogddsgb0mVt+R6F06Wt9y6dav4HGvXrpXRANwMjCBNeK11dQHmCTW6YMmX1OfQbYO8JRPKW/LTr+qm4omUwP3ACNLkxRdfFIFgwhIAMAJ/yV7e8o+nTmnb5FK/fO018fd5SRWkjHoDGEEacMqoyu02oYgIjMB/cqq8JWcs/ZNcKvsdy5CAN4ARpMGBAwdEIHA/rS5Y8i0Ygf9kL2/J/fW6NrmQqqQ2f/58sew68AYwghThghsqZZSzOHTBkm/BCPwpe3lLzunXtcm2/rmsTPy93bt3y4gAXgBGkCLhcFgEAg/YOZm1YZe6GOi2Qd5WPstbcsqqOte4JCvwDjCCFHnqqadEIDiVsaGTCk7dNsjbspe3XL9+vbZNtrRp0ybxd5577jkZDcArwAhS4NNPPxWBwAPFJi0LDCPwt/JR3pIrpamU0a6uLhkRwCvACFKgsrJSBALfEemCxSmpi4BuG+QP2ctbDn7+ubZNJlIL33FdYuA9YARJMjY2FksZ/dPp09pgcUowAiiX5S05ZfTxxx8X793c3CwjAngJGEGSvPLKKyIQuFCILlicFIwAYtnLW7799tvaNunoXeviz++5cOFCevjwoYwI4CVgBEnAKaMcBNkOsGwJRgAp5aK85ZNPPines7a2VkYE8BowgiRoaWkRgcCPx6akjNoFI4CUppe3zLR2AT9l8HvxkwZ3jwJvAiNIAh4g42DgOyJdsDgtZQSZSvfekPtkL2/J6wLp2iSryuefF+/DiRLAu8AIEsCpchwIHFicQqcLFqelLuSZSvfekDuVjfKWfL4rQ/nYMhfgXWAECeBJOhwIfGekCxYTpC7kmUr33pA7ZS9vyV1F6XQR7dm9W+y/YsUKGQ3Aq8AI5uDq1auxi+RH1pOBLlhMkPqMum2JpPZNd3/IXGVS3pLHGtSidrysCvA2MII54IW1OBD4zkoXLKYokwu52jfd/SGzZS9vmcrNDGfH8X6LFi0SWXPA28AIZoGX2OWldjkYOGtIFyymKJMLudo33f0h85VOeUvuDuJ99u3bJyMCeBkYwSxw0Q0OBE4ZzTQFL9fK5EKu9k13f8h8pVrekquecVt+irhx44aMCOBlYASzwHdPHAycfaELFpOUyYVc7Zvu/pA7pMpbshKVt+S1tLjdxo0bZTQArwMj0MAFuTkQeKCNK0HpgsUkqQDXbUsktW+6+0PuUTLlLfnpQaWM9vf3y4gAXgdGoGHt2rUiEH68ebM2WExTJhdytW+6+0Pukb285WzntlqiYtWqVTIagB8wzggm790SxeET6qsHFJH7ZJOLFy/GLow8Q1MXLKZJfV7dtkRS+6a7P+QuzVXekp8SFixYILYdO3ZMRkQKTN6bis97MzONJh/kJmZB5hhnBH95q4RKioMUkCerUiBYTCUl1jZWbHuAgiurqP54P32ZpQy3l19+Wfw9zrSwB4nJUsdIty2R1L7p7g+5T6q8JSdC2Ls+Vaop1+RONmU0cucStR/ZRs8sLrT2teKxWMYo/7twMZVVHaYT5y7TraEWCoXCdE3uB8zC2K6hycEGKlUXqQrNCTT5JQ2319HKgGxT9AK1jmZ2v3H37l2aN2+eeL/3jh6NCx6TJb6/Jd22RFL7prs/5D7NVt7y2zJB4uDBgzIi5mKcBsObqZjjr7Cc6tuHZ9yMRR5coZ4m2YbPsZJGuiC3AbMweIygm2rlBUprBJLIaJhCMTOoo94JuSENGhoaxPvwYJrpKaN2ie9uSbctkdS+6e4PuVP28pY8T0b9m2+EuGtnTiLXqXNHtAhOINRIg+Py9VmIjLbSC0X8t2qtqAYm4nojYEaaSqPtLFW23pavpsajR49oyZIl4j0yXbEx31LfXbctkdS+6e4PuVeqvCXPMVizZo34/y1btsiImI0J6q2LmkBBoJJab8qXEzDRW0dFBTV0FoMERuIJI6Du2mg7Vm169xxtbW1ify7owY/OusAxVeq767YlUuy4pbk/5F7Zy1sqnT9/XkaEnsjAIeuCHm1b2nghhcHfceqsDlEYgwRGAiOQrF69euo9IMiHWrp0qYyG2bhJx9ep9hUpX9QjA6foNGrbGIkHjCBCgw0lsZM5na6hoaGh2P4Q5FdxxtycXAtThWqPgV9P4XojmBxpsQ0WH6KBNPogeT2Vnp4eCPKlzpw5QydPnhTjZHNxu7UyZhoF1Z2UQV4GMAx3GEFJDbUNj01NVrk1RsO9HRTeU06Fsk1h+WH65A5GogDIFRcap5680+2CBWbiDiMoKKTFajJZ3ISyqBas+SWdHv6SsGo6ALmju3Yq5mAE3sK9XUORB3R9uJ3qy3lGY7Rddp8KInTnkyNUtTz6/oHgSqo68gnhoQP4FTwReBcPDBaPW3cqthS4NMcJpsN5z8XF6+nwiTN0piNMe6ThFFkBkGD+DACeJG6MoLKV0puxA0zEA0ZgMfEh7VADxpaqOzMdxrpG4R0NNGjva4qMUjjE9V9LqNGpdAl71kaKCh4akG8CQJqMNE0t+xK0brjky8D9eMMIaII6q2VbSxWZzlq5fYqOfjjTTCY6q8X7O/1UPPllPzVUqO87Vz73JN273EV1Ky0Dw6M8yBjrBil23gVpf1+qj94RiqBr1UhgBKkgJq7NvPBOftFF9c8sjmYwBYK0cns4tv7K5L3L1BPeI1Zn5Gvx+GCYtotxhwAVb24lsU7e+CCFty8X+weCT9PhvsSdT6MtZfL7JjGxh+/kYAQgC0SXiojGWaCylZJcYUIw3l1HdZ3oWDURbxjBeCdVx7qGSqlpRL6eZXiwbPrJzyd3cWGIGvujWUtq1dRouwg9+OoW9TdE10LaVP9f1HC0hy7fGqP+xpDIfCo98Fv6zc+a6KPhMRobPkE7eHGuJB67r4Ur5PdNZobnBWo8gLxvkA3sY3IBCrWMJJWtNz7YSJvrML5mKuYaQeQs1YiTzdJcRjA5Qi2i7z7atujQQArrn6RApI/2F4UoHLfU9ed02Lpwl8Y5z+f0m+IABVb9lmKvyiUwauJW3OqlOjavnV1xgRS90w/R0QRT8VMzAgCySOQOna0rjtUEKd7VTlcezBZ1k/RF+y5a+aOj0adfYCTGGYGoUDY2TCd2qRPNUjBEh06coV7bpLKx4V46cWQblRfKNgWF9GzTYI7uOCLW08AqCoVH403mQiOVWH87Ya+LNIL4drK/ddrO0Qt84os7jAA4i3WB76qPi7/lVTX0VrhDzFQ+c+YEHdm7jZ5evJw2h88j7dpwjDMCUaHMPnlsLpVVUc3etyjccW6OO5LM4e6fzY0ak9Fe4DU4aAQXGhsp0ccDIG0iD+jKOb7o11BVmYrNMqqq2UtH2ofpeg7jEmQPg8cIzGB8sIn2HO7TP2nIJ4Lg/r4Z3VGRvlY6pbp3HDMCXi0SxUAAAHMDI5gDNoHt9XMMcPG4QdC6GAdC1DJi6+kfH6SG/cenBpWdMILJe3S5fQcVoSoUACABMIJZGO87RCvLXqFW0d9pU0eY9qw/TCqF+uapF2Jpo09v20t7a6poeXAVNV1QzwgR+vt768RFe9Mf7sSeHCJ3/kCbeL9S+8S1Sfrk1aDVtoTeOD93LsaUESQSjAAAMDcwAg32XGmd1h2P3etbROj62XoxT4C3FS7fTmFbEde4hbpY/AQgnxCmxHf1tnRZqbnmQyR8IuC1mPobKRSAEQAA5gZG4FKSGyOIWJ5TByMAAMwJjMClJGcEAACQGBiBS4ERAACyBYzApaRuBBEaOFxPmrX0AAA+B0bgUlI1gshoC1WgziwAQAOMwKVMrT5aRi2j8sXZkLUUMq/TAADwIjAC1xGhB1fao6uUCiOIn58QR+QBfaXqERRUE3wAAKADRuAmMqhQVoBuIQDALMAIAADA58AIAADA58AIAADA58AIAADA58AIAADA58AIAADA58AIAADA58AIAADA58AIAADA58AIAADA58AIAADA58AIAADA58AIAADA58AIAADA58AIAADA58AIAADA58AIAADA58AIAADA58AIAADA58AIAADA58AIAADA58AIAADA1xD9PwqRfKLlQ8jrAAAAAElFTkSuQmCC | As shown in the figure, the area of triangle ABE is 4 cm², and the area of trapezoid AECF is 14 cm². What is the area of parallelogram ABCD? | A. 24; B. 16; C. 8; D. No correct answer | A |
180 | 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 | In the isosceles trapezoid ABCD as shown in the figure, what is the length of AC? ( ) cm | A. 3; B. 4; C. 5; D. No correct answer | A |
181 | 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 | As shown in the figure, there is an isosceles trapezoid ABCD with a parallelogram ABCE inside it. What are the lengths of sides BE and CE, respectively? ( ) cm | A. 3, 5; B. 1, 4; C. 1, 6; D. 1, 8; E. No correct answer | A |
182 | 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 | As shown in the figure, there is an isosceles trapezoid ABCD with a triangle BED inside it. What is the perimeter of the triangle? ( ) cm | A. 8; B. 9; C. 6; D. 7; E. No correct answer | A |
183 | 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 | As shown in the figure, an isosceles trapezoid is divided into a parallelogram and a triangle. The perimeter of the triangle is () centimeters. | A. 24; B. 20; C. 18; D. 8; E. No correct answer | D |
184 | 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 | As shown in the figure, there is a bottle in an upright position and an inverted position. What are the liquid level height when upright and the air height when inverted, respectively? | A. 6cm, 2cm; B. 1cm, 3cm; C. 1cm, 4cm; D. No correct answer | A |
185 | 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 | As shown in the figure, there is a bottle in an upright position and an inverted position. What are the volumes of the liquid surface when upright and the air volume when inverted, respectively, in cm³? | A. 54π, 18π; B. 60π, 18π; C. 70π, 20π; D. Cannot be determined; E. No correct answer | A |
186 | 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 | The diagram shows an inverted irregular bottle, where the volume of water is v2 and the volume of air is v1 as shown. What is the total volume of the bottle in cm³? | A. 72π; B. 78π; C. 54π; D. No correct answer | A |
187 | 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 | As shown in the figure, use a ruler to measure the height of the water when the bottle is upright and the height of the air when the bottle is upside down. What is the volume of the bottle in cm³? | A. 108π; B. 72π; C. 54π; D. No correct answer | B |
188 | 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Zw+AmAF6tCzunXpS7FMPlnd/eL84f1Fjep3fx+iBW3bee7T/WTfFw/WZ5274Thz64U1jx/3Pjrmr1p71hla0xI/22DZqHz8mRs/5c2Oyw/Px5O/Hx6G1pths/8viicbsWsviumHbxZa1z8bxl4oZYC0xA/SgNRZMOyn2rcfKez86LK7o4XrOw//1z9F/s1psftQvoqXeIs/fWI+Z7WuxwxfGxq29uc/ohZti1Cf7iRlgg4kZoAdt8ccZP4oD6zHT9yPfjCt7iJlVNw6PgR2XofY9Lf730Y6FluPjyx+uxVafOTou/auVnB6IGSARMQP0qPXuC+OUPWrxtg/sHj97oDHZ3fwzYuBWtfjA0RfELR2xs2BifHvwplF73z5xyH+/OkG6PNLSEo+uWhWdd8+80BI/dJkJSEDMAD37y/yYeeqeUattHTuPebAxud4zF30q3v/2j8e///KueKpjom12TPrGbp2PYP/TfsfHjO59Utd+34T48pg58ezzjRuBW38bI3Z7f9QGHRunzen+mPUL8dRd9XM7bgA+YHq8epGnNWZ9syNmBsd3L15QTxsAMQO8rjWx/MEr48wvbh215v3jjHkvNubrnrsmvrP92+NjR50bNy1cf4PM4zN/HEfsUKsHzTuj3ye+EIeOHB8XnDsxTv3GHjHg40fH5HnPxcquR7kfPyf+bdBmUfvIsXH6Ld0/dvuVWHbbmbFX7W3xrkHnxWON2bWWxzWHb1+Pmb7xpYlz4+nG7BobAkPRxAzwBlbEkvm/jh8f8rHYut+Osff+h8QhB+8bu++ydxx43MS45sFlsap7SLz0ZPzftf8R3/hk37W7J9feHu/q877YcuevxOjLFsTSzkWZ5fGHyUfHEbu+t3FOU2zef5c4dtxvomXePXHVqXvErh96d+NYc3x0n6Fx8nVPxlM3nxHHfOmTse3bOubr493bxcDhk2P6/cs7vzVQLjEDvImV0frgjXHZ5HExbsI5cc4558TkC66M2/+0Inr8wOyXW2PRH2bGJedOivHjxsX4X1wU01seifXb6K2IR2/8VUz52dkxbtyEmDT+7Dj7rJ/Er6/9fdz32KKYd8XYGHvW2PjZxIkxoX7sJz/9eUy/pzVa778qflX/O4wdNz4mTJwQ4+qv+cmlN8Ud9b8HUDYxA2S2Jl55nctCnfM9HFuzZk2seb0Xvc40UA4xAwBUmpgBACpNzAAAlSZmAIBKEzMAQKWJGQCg0sQMAFBpYgYAqDQxAwBUmpgBACpNzAAAlSZmAIBKEzMAQKWJGQCg0sQMAFBpYgYAqDQxAwBUmpgBACpNzAAAlSZmAIBKEzMAQKWJGQCg0sQMAFBpYgYAqDQxAwBUmpgBACpNzAAAFRbx/wNHi7BJ7EVDAAAAAElFTkSuQmCC | As shown in the figure, the area of the rectangle below is 48 cm². What is the length of AB in the rectangle? | A. 8 cm; B. 6 cm; C. 10 cm; D. No correct answer | A |
189 | 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 | As shown in the figure, if the rectangle is rotated around the line along AB in the rectangle, what are the height and the radius of the base of the resulting cylinder, respectively? | A. 8cm-6cm; B. 8cm-3cm; C. 4cm-6cm; D. No correct answer | A |
190 | 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 | What is the volume of the cylinder shown in the figure ( ) cm³? | A. 288π; B. 280π; C. 100π; D. No correct answer | A |
191 | 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 | As shown in the figure, the area of the rectangle below is 48 cm². If it is rotated one full turn around AB, a three-dimensional shape is formed. What is its volume ( ) cm³? | A. 288π; B. 280π; C. 100π; D. No correct answer | A |
192 | 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 | As shown in the figure, the area of the rectangle below is 10 cm². What is the width of the rectangle? | A. 2 cm; B. 6 cm; C. 10 cm; D. No correct answer | A |
193 | 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| In the diagram, what is the 3D shape formed by rotating the rectangle around the line L for one full turn? | A. A cylinder with a height of 5 cm and a base radius of 2 cm; B. A cylinder with a height of 2 cm and a base radius of 5 cm; C. A cylinder with a height of 5 cm and a base radius of 4 cm; D. No correct answer | A |
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 | As shown in the figure, what is the base area of the cylinder in cm²?(π = 3.14) | A. 12.56; B. 1.56; C. 78.5; D. No correct answer | A |
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 | The position of point A in the grid is shown in the figure. If point B can be represented by (1, 2), then point A can be represented by the coordinates (). | A. (4, 5); B. (7, 2); C. (2, 2); D. No correct answer | A |
197 | 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 | If triangle ABC is translated two units down and then one unit to the right to obtain the new triangle A'B'C', what are the coordinates of point A' after the translation? | A. (2, 3); B. (4, 4); C. (3, 3); D. (5, 3); E. No correct answer | D |
198 | iVBORw0KGgoAAAANSUhEUgAAAiAAAAG6CAYAAAAxnP2kAAAAAXNSR0IArs4c6QAAAARnQU1BAACxjwv8YQUAAAAJcEhZcwAADsMAAA7DAcdvqGQAAIoVSURBVHhe7b0LbFxHmt9L7GYvk2C0mQWGuYM7KwSBdkZz4VEQA7OGd50Lr4DcmTXuJJCRgbM7iGDjKgl2hJl7lWS1WseLrLJ3nM1CScaKF6uZoS1btmRRD+tFPawXKUoyRYqyTFKkKOpB6kFZT0qmHqbdsqdu/4qnmtWHp8km2U3Wd/j9hILYfaq765z6qup/qur7ToVRFEVRFEWZYlSAKIqiKIoy5agAURRFURRlylEBoiiKoijKlKMCRFEURVGUKUcFiKIoiqIoU44KEEVRFEVRphwVIIqiKIqiTDkqQBRFURRFmXJUgCiKoiiKMuWoAFEURVEUZcpRAaIoiqIoypSjAkRRFEVRlClHBYiiKIqiKFOOChBFURRFUaYcFSCKoiiKokw5KkAURVEURZlyVIAoiqIoijLlqABRFEVRFGXKUQGiKIqiKMqUowJEURRFUZQpZwYKkAGze1GlqaioGH9aUhd9h6IoiqIok2HmCZC+teaZJHFRRHpmbV/0JYqiKIqiTIYZJ0A6V85LFBdjp2eM6g9FURRFKQ0zS4AM7DaLKrNiYtZj5tmX15mG1l5z7dq1UVPrq//HkAB5Zq1R/aEoiqIopWFGCZC+tc+YWd9daU72R2+MSZ9Z+8zQDIguvyiKoihK6ZhBAuSc+cX/s8p0Z6KXxZDbL6LLL4qiKIpSSmbeJtRxwIyJXX5ZUGOuR+8piqIoijJ5VIAUZHj5ZUGNyg9FURRFKSUqQAqRW35ZYFR/KIqiKEppUQFSAF1+URRFUZTyoQIkEV1+URRFUZRyogIkiRIuv9y7d8/cvHnT/PKXv4zekcfnn39ubty4YR4+fBi9I5O7d++aW7duRa9k8tlnn9m6GBwcjN6Ri7OrBw8eRO/IRO0qHPr7+22SDHVAXVAnaUcFSAK6/KIoiqIo5UUFyAhKu/zy6NEj88knn4ieAQFUOecimUwmYz799NPolUywI+pCuj05OBdmQiTzWeYz8XZFHdBPSa8L6kH6LM4XX3xhPhn8xHzxyy+id9KLCpA441x+ocFevHjRHDlyxBw8eNDU1dXZxN/Hjh0zTU1NprGx0TzKPLJLMceajo3Id+jQIXPu3LnclNvAwID54IMP8vK51N7enpuypsPo7OwckYfPtbS02KlhQDj09PSYhoaGEb9N2T766CM7oJH4m/fi+Xbv2m1OnTqV66Du3Lljjh8/npePVF9fb8tE2YCyUmY/D4nPcY6cK3DuZ8+etdcino9rxrUDGueVK1fM0aNHR5SROrh06VKujEyLc/1dvr1795r39rxny3jmzJncoHH//n3z4Ycf5r7LT62trbnrTcfW1dVlP+/n4fubm5tzU7/8fm9vrzl8+PCIMlLuvr6+nIC4fv26tZN4Pq7D+fPnrWiCjz/+2Jw4ccIc2H/A7Nm9x/7v8lMvbnmM/zs6OnLHXOI7sQm+B/jeCxcuFLQJHkMAlPPq1avm/fffH5GP88Ou3PXm/AvZxOnTp3MDA9ezra3N5uNc9u/bn8t78uRJu2wJ2ER3d3eiTVCvbtkDm7h8+XJiG+Q9jpEHbBuMXW8Sv8FvuTZIGSiLn8clyu5sAhs61njMnoefh+/nWtBOwLXBJJvg2nKNnU1w7ZPaIHVFnbkbAdo3derncwkb8G0CG4nn4XPY1L379+z5Hjl8xJY56To2Hmu0ywJAObHhpDbI+WH7ziZu375t24afj4RN0Jb8Nkhb8/O4RNvkOJCftpvUBik7ZWr9sNWWsVC/TB76EGcTnFdI/fL+/futPV26eMnmSzMqQGKMd/kFI6Kxb9iwwby15i3z9ltv28Tf27ZuM1ve3WLWvr3WNhwaxPZt20fke2fdO9YwXQdNx7r3vb15+Vw6VH8oN4jQKI8eOWq/38/D5xAMDG5AA6IRr39n/Yjf3rplqx3oaLCk8+fO2zL7+fj+N1a/YQ43HM51fnSS/Ea8jOSlTK7DoKyU2c9D4nP79u7LDSKce8vxFnst4mXcsW2HvXZAx0bHtXnT5hH5Nm7YaDo7Os2jz4fKSCdTu6N2RL51a9fZAcyJJAZOBnQ/n0t0DG4QoSNnsEm63jtrd9pBBLhGp9pPmQ01I22CcjPQuc6PDgg7iefjOnxw4oNcB83AiXjy87lEB+aEHAMJg0A8D5+jU3ODCDZx8oOTiTZBeRjoAJtAGG7ZnG8T/F2zvsYOxk4kIV537dyVl4/E9WKQdR00HTAdrZ+HxOcQIwxaQP0weFFf8d/esX2HFZuATZzuPG3rP56P9xA/bkDkM3w2no/fON58PNcGKQNl8fO5VF9XnxtEsAm+78033szLw+e4FlwT4Bpxrbhm8d9+99137TV2bZBrT7uM56OuEEVuQKQuqVM/n0uICSfksI2GQw0j8vA5bAr7p6+gjdNekq4jNtHb02u/D9vtPtNt3t387oh82Dy27/oJ2gRtw89HwiZoS04k0cYOHjiYl4fE52ibTtxjE03Hmmx9xfNxvbm+1AfXsVC/vGnjJtuHuDY45f3yteF+GbEUb4Mk6oK+LO2oAMljYssvGDsdXFLCEDEmBpLR8rnGAOTjdaF8HHcUykeaSL6kMtL4q39RbT48+WGUa/RzLve5jPbbo+Wjs6ZT4e9yl7EU55JURkTVz3/2cztgJeWDQr/9xeelv97xMiblIcXz8ZpB/LXq12wn7+crdRmLzZdUxkL5/O9ESDPYMOjG8/r5SnEuI8qYrdOx8sFY58INBXaFOE7KR5poGZPykEacyxhldBTMl70WW7ZssTdQMNpv+983lWUkjZUPcUddfHR1SLymGRUgPmUIPvb+0fdzAkQqKHsrQD4cFiAS4W4PASIZ7ijpnJi1kg536AgQprUl4wSIP7BIwwkQhK1kfAEilXNnz9m6uPbR0DJomlEB4pFbfllYa4YmtCePCpBwUAESFipAwkEFSDioAJmRDC+/LKwtlfwwdgnm9ddeFy9AaBD+EoxE9uzZYwcKySBAVv3NqtQIkF/8/Bd2r4tk2NzMGr50AYJdSRcg7Kdhn5VkqAPqwu0fSjMqQBy55ZeFpoT6w7S3tdtNWG6jnkTYPMgmrbPdsjsnNr2xiUwybEZlQ2Dflb7oHbm4DZx4NUimuanZzq5JFiDs88Ku8BiSDJtBSZK5cvmKrYvbt4Y2Y6cZFSAR5Vh+Ae7y2K0uuXNiYxS75J0Xg1TYae/ceaXCznnqwu3Ml0xa7IrNtGmxK+cZJhW8l5wXlVSoA+rCeTulGRUglvIsvyiKoiiKkowKECjT8guw9EJUO8kzIETk4xycb79UPv3sUzP4qeyZA2YNqIvPvxiKayEZ2oTaVRhgT9ausvYlGepB27gcVIBkKdfyCxBUiMiLkjtZpgQJJEUMCskQnZBoiZJhQzDRHV0AN8mwjIRduYBiUiGoFQHTJN9kEKwMu3KB6qSCp550bz2W86gLF1wwzagAKfPyCyGV17y5RrwXDJ48ba1t0TsywV2SSImSwQsGl+gL54cilUqG/VGrX18t3ruKSJ24d0sWIHjBYFe4gEqGzZskyeDhRl1QJ2lHBUgZl19A44CEg8YBCQuNAxIOGgckHDQOiFIyVICEgwqQsFABEg4qQMJBBYhSMlSAhIMKkLBQARIOKkDCQQWIUjI0Emo4aCTUsECAaCTUMECApCESKuJDI6HKQQVImWltbbXRHkVHQr3/wD4enKc0Sqbx/Ub7RFzJsEOex6BL90gCIqGyYRAvEskQYZfHrEsWIATv2rJ5i3iPpLqDdTZJ5vKly7Yu0uDpNhYqQMoMrlREtfMf6ywN/NK5Q5IesZJw09LdDJlJ485IesRKcHZ1//796B2ZEGFXul0RdTMNdsWgLX3gpg6oC42EqiiKoiiKUgZUgJQZll4IuCR5epaycw7SI1ZyRyH9GSrMGnAOkmfUHKmyK+HRN7En6kJ6JFRmCCXvt4M0tfGxUAFSZnp6euzTMqVHQmWdW/oTWLtOd5kTLSeiVzIZ+HjAelalJRIqdsXTPyVzpuuMaTneIvomgw3BjUcbxT9Uj2CJ0gMm3rp5y9bFvYF70TvpRQVImaGDZYe8ZFXOoEfEyrY22Q17/779ZkPNhuiVTD66+pF1XSXEv3QY9HBRl+7effDAQbP+nfWiBcj1a9etXZ07JzsS6vZt222SDFGOqQv2R6UdFSBlRuOAhIPGAQkLjQMSDhoHJBw0DohSMlSAhIMKkLBQARIOKkDCQQWIUjJUgISDCpCwUAESDipAwkEFiFIyNBJqOBAJdd3addErmWgk1PDQSKjhoJFQZaECpMy0fthqN0VlPpMbCZVAUTTsM2fORO/IhNkoIlZK5uaNm7aDle45AkRC3fruVuudJJljx46ZXTt3iRYgRELFrqRHQmVDMEky1AF1gTdM2lEBUmaYPUDJSvbpxoX4at9V8REr6WSl7yxnJo0w7GmJhIpdMRMimTTZFaJQMrgRS49KSx1QF5JnzYtFBcgUIPnOyJGGc0gLaaoLtatw0LoIh5lSFypAygyzB0RKlGxQlB01Lj1KIlFppd9VMJPGOaQlEqraVRikxa7oa6U/QyVNbXwsVICUmd7eXnP8+HHxkVCbmppMX5/sSKjsYZHuccHDDdlzwLS/dIiEil1Jf7Jvd3e3OXHihOibDJbBsCvpEXbb29ttkgx1QF1IX5osBhUgZUYjoYaDRkINCzpYjYQaBhoJNRw0EqpSMnDDZfCWLEDYSIu7pLrhTj+44f5s1c9S44ZLfJk0uOG+/dbbogUIgx12lQY33Hc3vxu9kgl1QF2oG64yaTQQWThoILKwQIBoILIwQIBoILIw0EBkijGZe+ZmV5PZu7Xa/GTZMrMsm15tuB4dLB4VIOGgAiQsVICEgwqQcFABMoMZ7Kk31T9+2lRVVpiKigpTWTXHfOf5ZeYn1VvN0bMDUa7iScsSDA1Cl2CmH42EGh4aCTUc0rIEo5FQZxqDPWbPi0+aWVnRUVFRaeZ872Wz5+w9M9n4pQza27ZuE+0aRgAyGvWZLtmRUI8ePWojVkqGIEubNm4yly9fjt6Ry8MHD61dnT59OnpHJmw031m7U7QAwasKu7p0UXYk1AP7D9gkGSKhUhcEVUs7KkCyZLprzA/mVNoZj4rKx83ywzcmLTwcd+/ctXetkn26cSHGVZI7Vsng3ib9rgLXVcSH9IiVQPwP7ArXYskweEu3K2Zo02BXCPQ0REKlLiTPmhfLjBcg/Y3LzePRckvF7EWm9nLpn9ki+c7IkYZzAK2LsFC7Coc02ZV0ZkpdzGgBki8+njM13aUXH9zlpSESKucgPWKli0orGWbSOIc0RElUuwqHtNgVUWlJkklTGx+LGStAMt3VZr4THxWzzfLm8hjtxYsXzYmWE6IjoTLtf7z5uF1KkgwRK6VvpL03cM80NzWb/tv90TtyYYoZu5IeYZdNgyc/OCn6JuP+vfvWrqRHQu041WGTZG7fum3rQvqSdzHMTAGS6TarnnLio8LMW9FWsj0fcQipS5Aiyet5rNG/ufpN094mO8Tx/v37zcYNG6NXMmGvweuvvW56LvRE78iFDvbNN940rR+2Ru/I5ODBg6ZmfY1oAXL9+nWz+rXV5vw52d5VO7bvsEkyRDmmjWsk1JRyvvqpnPioqFxkdpdxD5xGQg0HjYQaFggQjYQaBhoJNRyoA42Emlb6a83C3NJLhZm3sjM6UB40EFk4aCCysECAaCCyMNBAZOGggchSTOfKecOzHxVPmeqoHx+802Wa9q4zr0RRT19Z12Barw4OHZwEKkDCQQVIWKgACQcVIOGgAiS1tJkVc4dnPyqeqjadPXvMi09XmcqcKPFTpZnzg7WmcxI6RJdgwkEjoYaFLsGEg0ZCDQfqQCOhppG2FWauLzBmzTKzKqvM0z+uNu+19tpG2NW0zrz45CxPhFSYyvmrJixCTp48abZu2SraTY9IqJs3bTZdXV3ROzI5cuSIjVgpGYIssZH28iX5kVAfPHhg7ep0p+xIqI3vN5raHbWiBQieF9gVXnuSYaP5/n37o1cyIRotdaGRUFPG9ZoFecJi9nPVpuVGkv9Lv6lbMjs/75K67Lvj5+7du9bNULJP9+ePPjcfXf3I3Lsv2y3sTv8dc/3a+B8oGBII2at9V61rtHSI/4Fd4QIqmf7+fvF2xQwtIcARhZLBm4ckmcFPBm0blx5bphhmlABpWBqFW7dpeP9HIpk2s2LesACpqJhnkvarctfDYIDQuHPnTl5i6YKG7e6MMCjei+fjs5988klOpNAxMz0dz0diNsIFbuJ/OoykfLjOutgj/D7fn1RG3vOXh/i7UD6+w50L381vxPORKJNfRsqclI9zdPk490Jl5Jq5xuiud6HryDFXRgISJeUjEe642OvtriP5+VxSPq6FC4A0nus9mk3wW4WuN4Oe+3uiNsH3Fyqj3/mVyib8612sTRS63lwz/3oXsgneK4dN+GUsdRvk2hfKN5pN+KnYNuiX8YtfDl3vpN/mmo2wiY/Htgmud6Eyxq93qWyC3yYV6pcpt28To7VBzmW8NsH/k7KJ7I1S/HqnlRkkQDJm32JfUCwwNWMI5f7ahXl7Q6qWN0dHhsGYiI/B0zDZJ8GaNolNRGxMO3XqVK5zIXYDU2scc/n4DHtEmo412UYBTLMzpet/n0tML2KwQGOor6u3G/n8PHyOB+BxdwkY8okTJ2zMhXgZ17+z3gboco2Wv3nPLyOJc2GzoGsU7EVgaSleRspSX19vywaUdd++fXl5SHyO5RD33AbOnZgpXIt4GblmPT1DcS9o3B2dHbY8fj7+pg7a29tzDZw7Oqb43bmwGZiEjz0PpqMjA4Iv7d61e8S5kNi4ymAPdCqHGw7bz/t5+Bxrz1cuX7H56ASJbbHmzTUjzoU9KDx8zXVq7OXYULMh73rzGcrZ3Nycsx3u6ohvwHHqkevk8h84cMB2WEAHR1wKd8wlvnP7tu12mRH43pbjLfZ34mUkpsW5c+dsPgalrjNddvNuvIycH/uCnBBgpo/r4H8fCZtoONRgO2mgk9373l57zD8XPsfDAl0wLDpnljeSbIKHdV3sHVouwCZoZ+zD8PPxN++daj+VGxx6e3vtZ+Pnwm/wW/wmMP1NWfzvc4mycw7AOR0+fNheCz8Pn6N9uCBrXCOWY5NsgmvLgx5tG8z+YxMidRAvI3VFnX362ZBNsEmROo2X8bVfvGbqDtZZWwBsgwe0+XlIfA6bcjMG2DdtMMkmsFG37wjb7TrdZW05XkbaYGtra64N8kwT9mTEy0gbOnL4iP1NoI2xR8vPQ+JztE2etwO0WfbV8Xn/O/n73U3vmp7eHlvXhfpl/qbv6OjoyNkEfctU9sv0nVCoX+ZzmzZssntBnEhKKzNIgJw31V7wsYqKJaYuOlKQgVqz0BMgbFqNT5rQGFk/7T7TbTpPd9rBhdTZ2WkbbFtrm42SSIOgQyDQD8dcPhJ7K5jCdQ2CRnax52JeHpcY5NygRKfGVF1SPsSOa9yff/G5bTxnzpzJy0M56OxcwwH+5j1XRsrGYErD4T0H381v+N/nEmVygxKNlzIn5WO92YkAzp1rwO/5eex1zF4z15nSILlDQCj515FrTx3QUbnBnY7gwvkLNh/njhDasWOH/Q02eLlOkkGHdVf/d11ir4XrgDgnRB2dr5+H3+Z33ADL79+6ecuWJy9fthxnu8/awct1LAwODPb+uZAYkBgY8mwiO+C2tLTYQZ5Iia4++6705YQh//Pa/y6X6GhzNpH93hvXszaR/R0/D+Wg/p2goZw8UJHOcEQZs7/PQO2uN+dPECW/HZC4XnS6cZtgoNq2ZZsdwN25UA9OBFA/DLKJNpFtW07kUkYiw1qb8NsgNpF9j8HNXW8iyfLZ+LnwG/xWUTaRHVSdTXAdGbQZyOPfSfvwbeLmjZuJbZBrS7vLswmvDbpEXVFnziZGa4Nxm+Chf0n5ent67bnwXcebjtu6ojx+HsqBjQ587LXBrA1jy/EyYvPYfp5N0AbjNkEbzLYld70pA23Nz+MSNxK+TdB2k2yCa4FAc3uKCvXLtg1m+xB3vUvVLw9+OtxPTLRf5m9ED8JSeoTgYphBAqTXrJ7viYliBIi5bmoWeJ+pXGoaoiM+GHKhFI+EmpTHJZ+k4y75JB13ySfpuEtx4sfpENe+tdbeSfrE8/nJJ+m4Sz5Jx13ySTruJx//fe4KuRsbK188+SQdd8kn6biffJKOu+TDazpf7uoQE6PlK5R8ko67lEf2ZVIel3ySjrvkw2sEBHejbW1to+YrlHySjvvJJ+m4Sz5Jx13y4W6XWRUG3dHyxY/5KU5SHpd8ko675JN03CVA7HLHjzhLykPySTruJ5+k4y75JB13ySfpuEvMULhIqEnH/eSTdNwln6TjLvkkHXfJJ+k4IoWZMul7WYphRu0BqVviiYmiBEh830hxn/FRN9xw0EioYYEAYcpZ3XCnH5bmNBJqGFAHGgk1hXSvesITE4vNvqEZ4VE574dtT1iCGQsNRBYOGogsLBAgrHdrILLpRwORhQPLb9SFBiJLG83LTVVOgMw1K9qi90fBFyCVS+rG/dA6FSDhoAIkLFSAhIMKkHBQAZJams3yKidAKsyCsdxgsrStmBvlrzSLJvDUOl2CCQddggkLXYIJBwSIRkINA+pAI6GmlL61z+QESMUza83o+4wHTO3CKO/s5aZ5vNMfWfCAoVG4HekSYSc7m+zYIS8ZxCCb1CTDrnlcIvEMkA7eANgV3geSYZaTjY+SBQiuz9iVc22WCu6wzEhJBu9A6kIjoaaRvABj88yKtlFUxcBus8g+ObfKLN43kTioxroHMlg4tzSJ4PpGo2AmRDIM3rgjSgZ3RWJZOFc+yahdhUNa7IpZA+kzB9QBdeFcvdPMzBMgWTLd1WZ+9Ej+yvnVpjtRgwyHY59oGHaH5DsjR1rOQesiLNSuwkHrIhzScA7FMCMFCAx2rsqJkNmLas1lX4RkbpiWFfNNJU/D/WHs2DghiI0LwCQVGgNLSJJncYA7bul1QR2koS5A7SocnF1JH/ioC5Jk0tIuimHGChDI3Ggx1T+YMxRufdZj5tnFy8yyZc+bp6sqTeWc75mX9/SYyU6CETUR7xHJjYKpQDwVXBhvqbBxk1DtkmHjJuGbXShwybAxm/Dk0qfMif7qgqlJhX1e2JV77IBUXERRyVAH1IWLoptmZrQAcWTu3TRdTXvtbva9Da2m9+a9cbvbFoKwumvXrhXtBUOoYqJvxiOhSoPnYbDpUTIM1rh1s0YsHcQUdsXjCiRDhF02DUoWIETd5JkkiCnJsMlc+kZz6oA2Lv0Jy8WgAqTMqBtuOKgbblioG244aCTUcKAONBKqUhI0EFk4aCCysNBAZOGggcjCQQORKSVDBUg4qAAJCxUg4aACJBxUgCglQ5dgwkGXYMJCl2DCQZdgwoE60EioSkng7o4GgVuVVNiNvXHDRvG7y48cPpJ7VLdUCHpVs74mNZFQsavODtmRUI8ePWq2b9suWoAQCRW7kr65mdmove/tjV7JhGi01MXNGxoJVZkkt2/ftgYl2acbF+Kenh7xESvZ6Y9btGQ++eQTWxdpiYTKgHf37t3oHZkgCqXbFa722JV0109mCEmSoQ6oC42EqpQEyXdGjrScg9ZFWKhdhYPWRTik4RyKQQVImWHmIw2R+TgH6ZH5iEqbhrog6mYaoiSqXYWDsyvpAx91QZLMF7/8IhV1UQwqQMoMD6ki0NLnj+Q2ik8HPzWtJ1vFB8a5cP6C6TjVEb2SCdOzPGH57h3ZyxbAxuzWD1vF7/bvudBjg/RJHjBY0vvwgw/FR0I903XGJsnc6b9j6+LBffnLrGOhAqTMEAkVzwvJXjAaCTUcNBJqeGgk1HBISyTUN1e/qZFQlcmjbrjhoG64YaFuuOGgbrjhQB1oJFSlJGggsnDQQGRhoYHIwkEDkYWDBiJTSoYKkHBQARIWKkDCQQVIOKgAUUqGLsGEgy7BhIUuwYSDLsGEgy7BKCWDznXzxs2yI6Heu2832Z3ulB0J9XDDYRuxUjIEvVr/znpz6WI6IqFiV9I9k7jJ2LZ1m2gBQiRU7Er65maioL733nvRK5lQB9QFbT3tqAApMzRsotpJjnWATzo7s6VHrOQuLw2RUKkL6RErgdgZabArPEikh8Yn6mYa7Kqvr88myVAH1IVGQlVKguQ7I0dazkHrIizUrsJB6yIc0nAOxaACpMww8yE9Mh+NgXOQ3ijSVBdpiYSqdhUGabErzkF6XTh7kt4uikEFSJlhOrC9vV10o2ADbVtbm51qlgxLYZ2dsp+8yvRsa2ur+GULYF8UdsXSmGRYs+/o6BA9YLAfB7u6c+dO9I5Muru7bZIMdUBdpOGBk2OhAqTMNDc1W9fPzz6VuwmVSKjs8j91SnYk1IMHDprNmzZHr2SCa96aN9akIhIqm5uxK0SIZOrr6s3GDRtFCxBuLta8ucbuPZDMztqdprZWdiRUQvtTF9Jv+IpBBUiZUTfccFA33LBQN9xwUDfccFA3XKVkaCCycNBAZGGhgcjCQQORhYMGIlNKhgqQcFABEhYqQMJBBUg4qACZUXSalfMqTEXF6KnqpUaTiT4xHnQJJhx0CSYsdAkmHHQJJhx0CWYGMbB7kalMEBz5aZ5ZOUHniRMtJ+wGNcmRUBkoat6pEe9B0nCowUaslAzREd9Z+465ePFi9I5c2OVfs75G/ObmI4ePmK1btooWILdu3rKzg709wiOh7tlrZzolwwZz6uLmzZvRO+llhguQ86b6qSTBkZ8qF9aa/ugT4wUj4m5Vsn89kVDPnTsn3kWPOwrpA/fDhw/tHVJaIqGmxa6keyURYRe74mZDMkQ6lh7tmDqgLqiTtDOjBchA3RJTVVFlFv5sr51GLZROXJ7I4ssQ3BVJvjNypOUctC7CQu0qHLQuwiEN51AMM1iARLMf81aaci4spClKovRGoRErw0LtKhzSYlecg/S6cPYkvV0Uw4wVIJnGl0xVRaVZtHsgeqc8sGmw81Sn6EbBBtpT7afMzRuy1yQv9l40Xae7olcyYd9Ee1u7+fjux9E7cmFfFHZ147rsp36yrMeToiUPGA8fPLR2dfeO7Ai7eJCQJEOUY+qCOkk7M1SA9Jm1z5R/9gOam5vto5Ulb0IlEipuhtIfm153sE68ix7eCm+tecuKKemwjwW7orOVzKH6QzbCrmQBggjErojCKZldO3fZaKiS4ZER1IVGQk0pQ7MfQxtMZ33tCfPs4lfMuqaz5t7Et3oURN1ww0HdcMNC3XDDQd1ww0HdcFNNn6lZUDnC08WmWY+ZZ1/eY3oGo6wlQAORhYMGIgsLBIgGIgsDDUQWDhqILMVkmpeb2Uniw0+znjQvH74xocBjcVSAhIMKkLBQARIOKkDCQQVIirneftDs3VptfrJsmXn+O3PN12YlCBCbZpnvru6etAjRJZhw0CWYsNAlmHDQJZhwoA5W/c0qXYKZGWTMvcutZsuLT5uqyrgIqTTzqycnQuhcpUdCJfjVpo2bTFeXbA8SxKD0DWoEtttQs8FcuXIlekcuBFqydiXcM+n99983tTtkPwIeu0KcS9/cvPe9vWbP7j3RK5lcvnTZtnGi06YdFSAemRstZuV3Z+WLkMr5ZvUoN5u41164cMF6WDDFTwMg8Tehv1m2INojvt3cZRxuODwi3/59++3g7kQKbljNTc15+Vw6+cHJXBRMhEFba9uIPHyu8f1G098/FL+VSKZnu8+aA/sPjPjtQ4cOmb6+Pnv3Ruq70mfL7edjZzkiqvXD1pw78e3bt+1vxMvIdHRbW5stG9y7f8+W2c9D4nOcI7MrwLkzEHEt4mU80nDEXjvgOuL2WF9XPyIfdcAufldGwpYjOjhGubgzomHzd2dHpxkcHNrsg5dPy/GW3Hf5iVD63KkDAyZhw/m8n4fvZ6nNdRhE+GSG4uCBgyPKiMcEHYyLt8BdTpJNUFfdZ7pzNkG00KZjTVZA4VXFgOfKwcwU7rnA/9ST+y7/O481HstFHcUmuru7E22ioaHBzrQANkFkScodz8f5YducL9y6dcteBz8fiXLibusiO2K/CPPdu3fbUOyEx3fncrz5eM4mmDXEvRWb8L+P7yf8ufMSoL4JIZ7UBrETopS6681n+Gy8jPwGv+VmKikDZSG0t5+PRNmdTWBDR44csXbl5+H7aR+0E3BRXwvZxJXLV3IzKFx76iCez9pEts6oO6B9U6d+PpdaW1tzNsH1xkbiefgcNsW5ch6nT5+2y2FJZcRG3R051/LSpUsFbeLC+Qu5NoiwKWQTeNW5Nsj1pK35eVyibdJGgfy03UJtkPPGXikjfUEhm6APcTZRrn5533sjyziiXz6b3y9zXju277B9Fd4waUcFSJzMDbNv6Zy858NULtptCkULoWOh42Lqj4GBDpXE3zwfgvU81xhptG4A8fNt2rDJGrDr/Oi0aMh+PpfoPF1jxOAbGxtt5+fn4XMYMwMwYOiIAlwF47+NsSOgnADh7+3btufnW7/erq0y+LrOj0ZL5xwvI2WhU3SdH2WlzH4eEp/jHF0HPfjpoO38EDrxMnLNuHZAp8HAzLWN56MO6ETd9UZM7d61O5eP73aJTs0NiAzKdEr+97lEJ0vHA3QsdEBJ15u7LjdoYxMdHR22E4mXkcEWm3CdH3eciIl4PmYGGDScTTC40yFyfOPGjXllQGS5AZH/6YjdMZf4Tjo393wJOlU6a34n/tvYhHsmCDZx/tz5kTaR/Zvz822CAYqO1M9HoqwMdA8eDtkEAx4il2P2XDYMnQufY8BwHTSDjXuWUvy3EcUM2kB9M1AktsF3t5ozXWdyNsHgxGfj+fgNfssNiJSBsvj5XGKwciIJO29qajKbNm3Ky8PnuBZu0OYaca2S2iDXFsFq22D2HwMPdRDPR11RZ25AJC4Pdernc4lZGTcgDtwbsDYSz8PnDuw7YG0LsDXEa5JNYKPuMQbYLgMnthzPh00gEJwopU3QNvx8JGyCEAXuRoU2Rlvz87hE23TCmTZ7/PhxW19+Hr6ftv7R1Y/sdXz0ebZfzvYFhfplhJxrg6P1y/RJpe6XnXDGJnBBH2ET2f52586d1g44lzSjAiSRflO70PeUWWhqR4lXhpHQwSWlLz7/Imfoo+aL8gD5eD1WPhgtn2+8hfKR/HyFykiH4v92iGUkxfNx/d0xzoHE334Zbb5JljGej7+T8pGKzZdURncO7jzi+aDYMhbKR5pMGceTzz8Pl6/UZSw2X6EyJuXzv5P34ueRlG+03y4233jK6DNaPr7HfVehfKRiyxjPN9pvO8bK539nwXxRW3ffO54yJuUhjaeMPqPlG+tcnC3FvzONqAApRH+tWZjbE1JpljZE748T7oD8u3KJcMfFHb27e5YKd3Dc+UiGO27upN0duGS4A8Su3EydVLiDPnPmTN7AIg1mIrArN9snFWaSpG/Qpg6oCzc7lGZUgBQkYxpfqsrNgiyomVhUOo2EGg5MqTMlKxmWvjQSaliwdKCRUMNAI6HKQgXIaDQvz0VMnb96Yo/bVjfccFA33LBgv4q64YYBwlbdcMOAOtBIqIox56vNU5EAWVIXvTdO2BCogcjCgE2BGogsHBAgGogsDBAgGogsDDQQmTJEToAsMBNcgVEBEhAqQMJCBUg4qAAJBxUgyhBuCeaZtaYvemu86BJMOOgSTFjoEkw46BJMOOgSjJLFbUKdbZY3TzwWKvEm8O2WvAmVgYKBG48FybBZUPrdERvTGOzSsgmVGan2dtmbUAkaxqAnWYDg4YZdSd+ESswR4oFIhk2o1AVxXtKOCpACZLqrzfzKCjN7SZ0ZCos0MRgw/KA3EsFdEjdDFyBKKoQvJ9CaZHDNI+iWC3okGWdXLhidVIgkTLA2yaTFrnC1dwHTpEIdUBfqhpsyMt2rzT+vqrSP3X+h+mRBYZG5XGsWza4wlfOrTfdkHgSThbsiyXdGjjScR5rqIi2oXYVDWs5B60IOM0qAnK9+ynq0uDTryRfNltbL5p4VGRlz72aXqV/5AzOHmY/n1prOoajMk0YbRBikoXNy55CG+oA0nEca6sOdQ1rOQzJpqYtimGEzIEPLKr4IGZFmPWle3NNjSqQ97OYuppmlR0Ilmqt7ZoRUeA6I9E12TMt2dnamYgnG2ZX0CLss7bHMKnnA4Bkr2JX0CLvsn5C+zEodUBe6BJNCBnv2mJeffcLMYSkmEh2zvjbXPPHsi6a6/mw0G1I6eKKm9E2oDHZp2ITKQ614EJVkcptQha9zA5tQsSvpm1B5onRqNqFmB3DJ8IRloqFKhgdBUhdEp007ugm1zKgbbjioG25YqBtuOKgbbjioG65SMjQQWThoILKw0EBk4aCByMJBA5EpJUMFSDioAAkLFSDhoAIkHFSAKCVDl2DCQZdgwkKXYMJBl2DCQZdglJLBJlTpj+NnoOAOT/rj+NmEKr1zYhMqj+ru7Z3Y05lDIrcJVfjj+BsONYh/HD9RN7Er6R4kREHdvVN4JNQLQ4/jv3FDN6EqkyQNbrhErCQyn/SIlVeuXBE/c/DgwQPrupqWSKjYlXT3buyKaXPJ4PKJXTHbKRmEuXRxTh1QF+qGq0wa7ook3xk50nAeaaqLtKB2FQ5pOQetCzmoAJkCtEGEQRo6J3cOaagPSMN5pKE+3Dmk5Twkk5a6KAYVIGWGYDJnu8+Kj4R6pkv+Q8PsEkwaHhp2usvcG7gXvSOXzGcZ093VLX4Jpu9K39ASjODxgkio2NXAx7KX9gjiRZIMdUBdUCdpRwVImeFx/BtqNsjehJod7HBf7ezojN6RSX19vdm6VX4kVDYEpyUS6vp1682p9lPROzJhEyreF5LvWImEil1JH7zT8Dh+9rBQF7oJVZk06oYbDuqGGxbqhhsO6oYbDuqGq5QMDUQWDhqILCw0EFk4aCCycNBAZErJUAESDipAwkIFSDioAAkHFSBKydAlmHDQJZiw0CWYcNAlmHDQJRilZNhIqOtSEAn1rRREQj1Yb97dJDwS6rXr5q033xK/WRBsJNS3UxAJtb7BbN6YgkioWbsSHwl1Z0oioWbrQjehKpOGaTRcqqS74Z7uPG1u35Lthnv50mXxESuJhIo3knR3SSASKnZ166bwSKiXr5izZ2TPHODejV19fFd2JFQGb5JkmHGmLh4+0EioyiT54osvbJJOGs4jTXWRFtSuwiEt56B1IQcVIErRSJ5iVhRFUcJCBUiZYR3v3Llz4pdguru7TX9/f/SOTPr6+sSvcRMdkbpgX450WIJhw530CLtsDJa+KdjZlfSHHBKgT3qQPuqAutBIqMqkaWlpMRs3bBS/CXX9O+tNZ6fsSKiH6g+ZbVu3Ra9kQmh/PHkuXbwUvSMXNqHWrK8xp07JjoR6uOGw2bplq+xNqDdvWruS/iRZXO3xdpMMdUBd6CZUZdKoG244qBtuWKgbbjioG244qBvujKffNP5imVm2bJl5teF69N7E0EBk4aCByMICAaKByMJAA5GFgwYim+H071tsqioqTEU2PVU9uY5eBUg4qAAJCxUg4aACJBxUgMxk+mrMgsoh8VEKAaJLMOGgSzBhoUsw4aBLMOGgSzAzlUy3qZ5fmRMfpRAgzc3N9q5b+iZUOljpmwXrDtalIhLqmjfXpCYSKjMHbW1t0TsyYXPzpo2bRAsQNjxiV9K9xHbt3GWTZKgD6kI3oc4oMqa7er6prJhtZs8unQDhjhXvEeluuIiPW7dkR6zEPQ/3NskQCZW6YFZKOrjhdnR0WA8MyVy6dMmc6ToTvZKJs6u7d+9G78iEmUHps4PUAXVBnaQdFSARme5V5qms4Ji9pM5sWVI6AZKmyHzSzyNNdZEW1K7CIS3noHUhBxUgkGk2y5n1mLfCtGWMqSuhAEkTkqeYlXD5ZfafoigzDxUgpj8rOGabisr5pro7qz6ylFKAML3MlKD0JZjz586bO/13ondk8tHVj8TvnSA6Irvk79+7H70jF5ZgsKv+27Ij7OKtIP0BaIODg9au7g3IjrDLAydJkmHPHXUx+Mlg9E56mfECpL9uiZldUWnmV3ebIflRWgFyouWE2bRhk/hNqDXv1Ngnl0qGx6Zv37o9eiUTIqG+s/ad1ERC3bB+g+k41RG9I5MjDUfMti3bRM8Q8kRi7Ep6JNS9e/baJJmLvRdtXegm1LTTX2sWVlaYyoW1xr8HK6UAUTfccFA33LBQN9xwUDfccFA33BnBebMal9vZS0xdbAa4lAJEA5GFgwYiCwsEiAYiCwMNRBYOGogs9Qy73C6Jq48sKkDy4emMKkDCIE0ChCWYNAkQyagACQcVICkn011t5ldWmHkr2nL7PnzGI0C468FfmxgZrNn5CX/uurq6nABhH0hSPjaq0hk716tHjx6ZO3fujMhHYjaC48DGVsRBUj4enc8mP6CMfD+/E8936/YtuwHNwd+8547zGQLjvF79ujlx4kSUa2gDIb/hf5dLlMltuqWsXIekfJyjOxfOvWAZs9fMCTjO5eHDh4nXkfc45u5Eud486p1j/L+zdmfuKZPcfRdzvSm7O5fRrjff7/b5OJsodC7+Y7bt9S7CJrje1D0xZRi0EYPu3OI2wev495F8m7DX+0Hh6+3bBOUtVEbOM+l6x1PcJihjT0+PXZ48cvhIzpbiNkE9JZWR35mITfCZpDLyG+OxCVdGeO+996wAuX79el4+zqnkNpGtM98mCrVBrm/8eifl4/OUzQmQ1g9bE8+b8pTaJrjeftsqtp/gc0n5+DwB4ZwAKdQv817cJgpe7ynul7lWJz84aW/4rly+YvOlmZknQDJtZsW8ClM5v9pETi8jGI8AwegYDIhcRwNmrwSJNTweYc96JI8cx8gZyDfUbLDHXD4+8/prr5vG9xtznRAd2Y7tO/K+zyXutmgEgJET3RNj9fPwOR4Pzt0y0AkcP37cCqF4GZkROHPmjG0MJP7mPb+MfD+D3qFDh3KNp6+vzzb0eBnJi+iikwDKyhq5n4fE52p31NpGB5w7s0Vci3gZuWYuQiONmyA9rLn7+fibOmhtbc11BAQeo0Ny58J3M+BxLocPH7adEND5ED0xfi6kPbv32E4B6CwaDjXYz/t5+Bz1fPny0O57rhGdyJtvvDniXBioEBGuUzt37py1D/968xnKeezYsVynzwCxfdt2e5zv9cuwf99+2/kCHeGBAwdyx1ziO7dt3ZZbV8Yem5ua7e/Ey4jdujthynn69Gkr3OJlpBzs33A2ceXKFXsd/O8jYRP1dfX2+gGdMLNRvM93UC/uOxGJdMhA/Rw9ejTRJjZu2JjzaHr0+SMbTfWtNW/l5eNv3mtva88NdIgePhs/F36D/VoPPxmyCcpAWfzvc4mycw7AOVEv7hxc4nO0D64J0AYR8Ek2wbXtOt1lrzVt8Gz3WVsH8TJSV9SZE17UJXUaL2P1z6vNgf0HrC0AtoGN+HlIfI6yc64k2hTfl9SXYaPYKlDOzo5Oa8vxMvLZkydP5myCIG2bN20eUUbXnyASgDa2e/fuvDwkPkfbpI0C+RGsfN7/Tv7G9ugrdu/abcuImIqfC3+7qM7OJqa6X6bvhEL9MufGb1PGtDPDBMiAaVia73KbxHhnQDA8OjZcCnPp7HnrqUBHzi5/jJ3Gw3sc8/NeOH/BNjDXIBh06Lj8PC4xELm7KgZaGkVSPgZD13BojLf7b9uGlpcvWw52XDuxAPzNe34Zu89024ZCZ8L5At/Nb+R9X5QokxMBlJUyJ+Xru9KXG2A5d64B1yIvX3Qd3eDF79OxMvjEryN1QF24MtrrnS0z+fheOiQGAf6mw3XXmw4dseZ/l0t08q7D55wQTCx/xPPh+ucETc4mLoy0CbwM6KBcGTkvhBLTrn5eykinTN0B14nrxUBFXeCR5K6VbxN0/IVsApvKs4ns98dtgnJQnnv3h22C8lLuEdc7e34MxK6MnH8hm+C6OZvgelJmBtqWlhbb0bpzoXP2bYJ6csdyCZvI1qsbvLiWDLIj2mA28d7Hdz9OtAk/X9wmKMPVvsI24a43+WkfeLvF83EtnE1wjbhWo9mEw7bBJJvI1pVvE9Qld8l+HpewAScCRmuD2AT1wXVBqHG9bNvy8jib8NugtYmkNpg9P78NWpvItg0/j03ZNoRN+G2Q6zoiXzZRD64NjmYTXG/EPa+hUL9MuelD/DYYSr/Mb3IOLcdbcjc+aWZGCRDncrugZkiBFmIie0Aw5qSEkTkDhqQ8LvkkHXfJJ+m4Sz7ZdxLzkOIk5eEcXMfnSMrnkk/ScZd8ko67FCcpDymOf8zVRVJeP188+SQddylOUh5SnKQ8Lvm49/xzcMknfsxPPknHXYqTlMemWBCxxDxR8nHvObsaK19SipOUhxQnKY9LPknHXfKJ21WhfJCUhxQnKY9LPknHXfJJOu6SO27r4pf5deGnOEl5SHGS8rjkk3TcJZ+k4y59/sXn9jwcSXlIcZLyuOSTdNwln6TjLvlk30nM4+wp7cwcAdK/zyyuGgq1PlbYo1JuQlUURVEUZSQzRIBcN5uf4ym3f8/87gvLzLJlo6d/MW9YgFTN/7fesVdNw/XoK4uEKTymAX1VLg2mcpkmZEpTMkyTMpUsGaZvmb520+GScXbl9lNIBbuSHsCL5QXsyl+OlQhLJCTJUAfUhVuKTDMzRICcN9VPDYuKiaenzHgnRGwk1I0piIS6PgWRUA812E13kmHdnE3C7GOQDiKKzX/iI6EePmI3b0qeMr9FJNSsXYmPhPreXpskYyOhZuvCbdBPMypAxpXGL0A0Emo4aCTUsEDY4imgkVCnH2ZxsCvxcUDe1UiokpghAiRj7t28ZhtZMWnrvxkWHU/8txPesZvmXmHnmUQ0Emo4aCCysECA4HKokVCnH/o37EoDkU0/GohshlPKTagqQMJBBUhYqAAJBxUg4aACZIZTSgGiSzDhoEswYaFLMOGAANElmDDQJZgZTikFSNOxJjvoSd6EStAhIgq2t7dH78jk4IGDNiqjZBgomFHDs0o6bEJ10WslQ+RfoqtKFiBseMSupAtbotcSYVkyeIZRFzeu6ybUGUkpBQguYQzckt1wEU8MEtJ3ZTNoE1ZcMgzaLIW50OuScXZF1EjJ4DnS0dEhWoAQCRW7ku5qz+xBd3d39Eom1AF1kQZX+7FQAZJAKQVIPBKqVDiHeCRUaXAO0uuCQY5zkDzY+ahdhYGzK62L6cePrJt2VIAkUEoBoiiKoijKSFSAJND34V67sYx09OzwQ6ImAo+27+ntEX1nQcRKli+kT/uzf0J6AC+iI7JGnJZIqNiV9Gl/lpCkR9hNi13xMEP3tFmpUAfUhUZCVSYNO/zZ+Cg9EioRK6XvnzjccNg+Tlsy7MPhUe08YVQ6dLRs3mT/hGSOHDliI+xKnjLnkRHYFVE4JYNLNEkyiFnq4uaNm9E76UUFSJlRN9xwUDfcsFA33HBQN9xwUDdcpWRoILJw0EBkYaGByMJBA5GFgwYiU0qGCpBwUAESFipAwkEFSDioAFFKhi7BhIMuwYSFLsGEgy7BhIMuwSgl49ixY/buSHwk1DfWmPY22ZFQD+w/YDZt3BS9kgkDBYK250KKIqF+KDwS6sE6u0lbsgAh6iZ2df6cbGFLFFTpG83xgKEupAfoKwYVIGXm8uXLNtqj5OA4zN6cPHlSfINg1kC6xwWzBixZSHddBUQ5doWokgwDxqn2U6IFCGIQu+rv74/ekcmZM2dskgx1QF1Id4kuBhUgZQbh8ejRo+iVXDgH6REG01AXDHLEz5AesdKhdhUGabEr6kF6XVAH1IVkQVssKkAURVEURZlyVICUmdu3b9vAMtIjoXIObEaVDEG8eDigZIiOyMPPeHiYdLhT7b3YKz7C7s2bN+1Sq2RYZk2DXbFxk43akqEOqAvJjgvFogKkzLCWx65s6ZFQiVjZdborekcmRKyU/qhuoiPWrK8RP+DBg/sP7Kbgzo7O6B2Z4GrPxkfJU+ZEQt2wfoP4kPL79+23STKXLl6ydUGdpB0VIGVG3XDDQd1wwyI9bribzZ//0R+bc4IFiLrhhoO64SolQwORhYMGIguL1AQiq15sZlf8unnpfbmznBqILBw0EJlSMlSAhIMKkLBIhwDJmFf+8O+ZiooKU7lol5ncs7OnDxUg4aACRCkZugQTDroEExapWILpW2t+Oys+ECAVFfPMSqHbWXQJJhx0CUYpGamJhPqmRkINAQYKZtR6ejQSagh0rpxnKn7t18yvRSKk6qVGk4mOSUIjoYaDRkJVSsalS5fMhx98KDrYErM33KVevyY8Emq2cyVipWSYNTjRcsLc6U9HJFTsSuxU80CdWVJVaRb8YrNZ9vVoFqRykdktcB3m/r371q76b8uOhIqnnnRvPSKhUhfUSdpRAVJmiHWQ+UziPdEwuBcyWEiPWGnrIqN1EQrSz6Vv7TOmouolc+STR+bimt+PlmEqzDyB6zBpsSvat/Q2Th1QF5LduotFBYiiKMp4ybSZFfM8sTGw2yyqjGZBsqKkUfYYqChTggqQLIN3rtm19WvX7pjB6L1SwXQayzDiI6Fekh8JlYiVfX190SuZEAmVYFEPHz6M3pELM1JSI+wO7F5kKiueMWuz5oRdXbnSaxpfqopmQSrNImHrMCyzUhdpiIQqffMmdUBdSHZcKJaZK0AyN0zL2h+bp6sqc1OnNlVWmcdfqDYtN0pzC3Pyg5N2ZzZTalJh38HmjZtNV5fstVU8knbW7oxeyYTBbmPNxnREQs12tJs3bTadndKWLPrM2mdwu91t3W4b32+0mx9/2fGKmef6kXkrjaSzun3rto12TBROybDRnCQZblipC42Emlb6T5oV82PCI54q55tVnZOfD1E33HBQN9ywkOqGm2l8yVRVzDbLm4duUvbu3Wvefutt88tfXrHCZKgPqTIvCVqHUTfccFA33DST6TbVVnzMMo89+6Kp3rrXdiDrXnnePDnLEyCk2UtM3SQ3hWsgsnDQQGRhITMQ2YDZvSjbfzyz1rjFvH1791lXezYNDi3NDPUfboZEAhqILBw0EFlqyZjuVU+Zyjk/NFt6EmY3BnvMlkWz80TIZHe0qwAJBxUgYSFSgHSutMssVfP/rVm2bJlN//K5f2n+2ff+2dDrf/fPzddz/YecwGQqQMJBBUha6asxC+aMMauRaTbLZw8LkIr5q01vdGgi6BJMOOgSTFjIW4LJDG00nb3IvLZ3aOaU9F/+y38xf/Inf2Lee+89+/qdfzcv139ICUymSzDhoEswKeVh52azrW3s7qBtxdxhAfJUtZlMV3+s8ZhdH/7sU9mRUN98403T1tYWvSMTHtPN5i7JcFe0+rXV6YiEeu++tSsxM2vcwFRWmgU1+Z5UBw8cNDXra4bjNvguuUICkxF1kxulc+fORe/IhCio27dvj17J5ML5C7aNayTUmUrdkpwAqVxSN6k7GNypTpw4ITrAD7M3LS0t4hU5dxbSRRRi8Pjx49a9Wzp4hmFXzOpIwIZdn73cRHtPczBoE07eDxxl80Z9yFPV4c9WMRuFXd2+fTt6RyZ4VMnzqsqHOqAuqJO0owIkgYHahVHnMfmd7MQ6kOyCC2mJkqiRUMNC1Ln015qFlRXmGQJ/xEi0q4Fs/kiAVFQtMXWBz4Kkxa40EqosVICMIFrnzXYclQtqcjvdFUWZqfSbuiVsTp9r/vJksYNbt1n1RCRAsmn2kn2mRKGFFCU1qACJE93plMIFF+7cuWOuXLkiPhIqga+Y/pcMgX2kLyOxHEZdpCUSauh21fHWs+ZxP1jhrK+ZJ55dbF5tGF6fZ8p8eBnpuml4dbF59rFZw5+JUmXV0+b5VxuyOcKDO+402BX7JqTvnaAOqAvqJO2oAPFxMUKy4mNfiW5X8BzZtmWbaGNisyA7y890nYnekQku0bt27opeyYRIqJs2bjJXLl+J3pELkVCxq9Odp6N3wqPvw2FvFz8dPTssmthoToTdoSnzAXP2aPJnbDp6NsjYIIgo7IoonJJhQ/CBA/IjoVIXGgl1BjHYs8csfXzoTmfe/11t6pPihEwAdcMNB3XDDQt5brjJICyGIqHKXbNXN9xwUDfcGULm3mXT2rDOvPzsY2ZWbLqUSKnfXXnSTHYVJg2ByNxAoYHIph86JYIUXbhwIXpHLsyAEIjs5MmT0TsycZFQJeMCkUl3w01DILLz585rILKZQO/6PzRz5841c+IPpPPS7CV1o4oQdizTaBnc8EHnoVQk/mY6kP/fWvOWFSAMHu49Px/LAp0dnebTz4ZECvtGEC5+Ppdajrfk3LPowHnYHdO/fh4+d7jhcM6ljj0cPEhuz+49I36b2BisN3L3RuJv3vPzbdu6zYooyuR2yTM9yG/Ey0hZKJNbS7bufc3H8/KQ+Bzfd/fuXZuP69NxqsNei3gZ6w7W5e4G2EtDDAw6/Xi+ve/ttY3XlZG14Pq6enuMchGrgYGC32hva7dPlgVmeJhGd9/lp6ZjTbk9Cp988olpbW1NvN6H6g+ZGzdu2HzsbTjbfTbRJvbt22cu9l7M7Qni6bxJNrF7127rTuiW7nC7ZTaNzpW7be7yXP4TLSfM/fv3bT5sghkFd8wlvvPI4SM5911sgqUPfif+2zzMi31LgE3wgDLKHc+HPXWf6bbnCywPNRxqyMtH4nohXh9+MmwTzU3N1q44F2KzkIfP8WA36gOwiVPtp2x9+d9HPuqVQROob2InUP/xMvIeYs3ZBJ/BnuL5+A1+y90oYJeUxc/nEmV3NoEN7dy5084QklwePse14JoA14hrldQGsWWm3d0MCteeOojno65Onz6d8/KgfVOnfj6XsAFsAbAN3J3jefgcNsW50FZef+11e72S2hY2erVvaJ8Lttvb22v2783vJ/gbm+cO3tkEbYK24ecjUd9trW22TQFloK35eVyibfrXm7abZBP0R+vfWW/timtJv7x3T4JN7N1r+xDXBj+6+pGpO5BsEx0dHXk2Uahf9t1mHzwco1++Vbhf5jO0bfpb6UvexaBLMBGDd7pM/coXzGPx58FUVJklo/jQ0bHRsWBAPNkT4yHxN41x65atZs2ba6wRM9jwXjwfeWiM/mBDo/XzuURj9A2dwd1NO7rE5+gwXOeHoSNwtm/bPuK36dSIVeIECIMj7/n5WI9kGeno0aO5jpyOhd+Il5Gy0Bh9AUJH7uch8TnOEbEFXB8Gd65FvIx0in1XhvyR6DQQGTTUeD4acHd3d66MiBY6U45RLpZfGPD4De66nQChY6FjcN/lJzp4NyDSWdKxJ11vRJsbEOl86ViSbIJOjQHRdX4IviSboBNtb2/P2QSDDYPuhpoNVtDyv8tPx+0LEAZId8wlvpOB160rYxOnTp2yvxP/bTpEtxcAm6CzptzxfNgTA6IbbBjEGDj9fCSuFyLJH2zoyLErzoVBgzx8jkHbF6UIF+rL/z7y7XtvX27jJ/XNoEf9x8vIe4S2/vyLIZtgEMWe4vn4DX7LDTbYJWXx87lEO/AHRPJ84xvfMF/+8pfN/1z5P3PfybVwGyK5RlyrpDbIte3t6c0JEK49dRDPR10h0p0AoX1Tp34+l7ABX4BgI/E8fA6bwr6vX7tuZ6No+0ltCxvFVgHbxYaT8mHzDJyPPh+yCdoEbcPPR6K+aUvOJigDbc3P4xJt07VBrjeD+9Z3R9oE/REznNRltjcr2C9TbpYwXRtE8I3WL/s3hoX6Zfo41y/T943WL7sblaR+mc/QtulvpT99vBhUgMQZ7DRrn8t/Hoz/4Kkk6DjoBOMJA8cw3QwI+XivUF5HsflgtHyuQ4PRyhjPF/9OGh6KnMboKEcZi83H30n5SPF8/ncy8NC4+Zv3HfF8for/drH5+Dsx3+djX+9c3uz7DpcPEctAQQealA9G+76iypiQj3In5R2Rb5Tf9uH1x3c/tnbFgOLn879ztO+L/3ZSPtJEylhsPgb3b33rW7m+4qtf/aq9a3b5iinjeGyi2Hx+GWG0fHyPmwFByI2Wz8HfSflIEynjWPn87xwtH4M5Caa6jD6j5Yv/djwPdfB69eu6BDNjyXSbVU95AqRioaktPAkyKkxVsmzy+aOhOzCJfDr4qTnedNxOVUqGOyIiVkrGTVX335YfCRVRzp2im9qXBuLjn/yTf2L7iL/7d/+u+a3f+q2cCJF292qXxY41i/e8YIaIJBmWaKiLewMaCXXGkml8yVTlBMhTZqLRlJl6ddO6UkGlcw5uql0qTHlK962nLpiG5k5JOpLtiqWFb3/727Z/+NKXvmTq6urse9/85jdzIuTYsWNR7vBJi13Rxt0SlVSoA+qCOkk7KkAK0myWV01egCiKki58oYH4OHLkSHRk9GOKouSjAqQgA6Z2oRMgi82+CYpqNtSxbh9fI5QEd6hs1HKbrKTCRk7pvvXMGFAXbvOeZLAr2obb0CmBJIHBpnHfriSKEGYGsSvpkVDZ4Ok2eUqFOqAupM/WFoMKkIJkzL7FkQAZYxPqaLCznk1Rko2JtW52Z585I9stjA3B7PKXDJ4P7Jing5IOXhrYVddpGfslCgkLllrwZPGnzKWJEMQ5diU9EipeQXiaSObypcu2Lpy7bppRAVKQNrNiLgKk0iyomfgj6dISCdUGItNIqNOORkKdHkYTFIUioUoSIZRVI6GGAXWgkVBnOP37Fg9tQn1qlemexJ4m4h1Ij4SaEyAaCXXaQYAQJTEtAgSX4g8+CFuA+EKCzaXxduAioSZtGsSrxHnKhCxCOEfsSrwASUEkVOLWaCTUFNLf+Ip59om55olnXzZbOm6YQroi011t5vNE3Mr5pnoy6iOLCpBwUAESFhIECNE0ffGR5F47mgAB310XEVJfXx8dCQcVIOGgAiSVnDfVebE9KsysJ180W1p7zZ3ouXND0VB/YOZkxUflnB+YmkmKD9CH0YWDLsGERehLMIgNRMdo4gOKeRidL0L+1t/6W2bTpk3RkTDQJZhw0CWYVJIx3dXzTaUnQBJT5RzzvZf3mBI9DDcvEqpU8FKIR0KVCHeqREKVDJ0SswaER5cOAgS7ClHYFis+gJDrhJMfTYBAyCLERUKV/jA6PxKqVLi5IBIq4fHTzgzbA5IxNzq2mFeWPW++M3eufRAd6YlnF5tlP6k2W5u6crMhpYKBorm5WXQQL4LisNPfPXtDKnjxSH/yKrNRjY2NuQcNSgZR3tTUZF1xQ2I84gN4/hDLSGMJEAhVhHCTgV1Jj4TK85NIkqEOqAtJ7ukTRTehlhmi8jGAS4aOlbgT0iOh4gotvS6IJ0NdpCUSamh2NV7xAeO1qxBFSFrsirqQHj+DOqAuJMeOKhYVIIqiKFl88cFzXYoRHxMFEfL7v//7wc2EKMpUogKkzBAJlaUL6ZFQOQfW7CVDxEo220mGuzuWLLhDkk5IdnXq1Kmc+MDrZTx2MlG74vy///3vByFC0mJXBOojSYY6oC6kz+QUgwqQMsPTV3ds3yHamLhb27plq32arGSONR4ze3bviV7J5NbNW3aXf1oioWJX5ZxpKAZic+AeOxHxATydmAi7xewBiRMXIa+++mp0ZGphTxF2RRROydTX1dtoqJK5fPmyrYs07PMaCxUgZQY33NTEAVE33GmHGYM0xQGZbjfcyYoPKMYNdzR8EUL66U9/Gh2ZOjhvdcMNA3XDVUqGBiILBw1EFhYIkOkMRFYK8QFjBSIrhukWIZy7BiILAw1EppQMFSDhoAIkLKZTgJRKfEApBAhMpwhRARIOKkCUkqGRUMNBI6GGxXQtwfji41vf+takxAdMdgnGBxHyB3/wB1MuQrgGugQTBroEo5SM999/36x5c41oAUJAnNWvrbYbaiXDQFGzviZ6JRM6JQbtngvpiISKOD/5wdQFh/PFB7E42GA9Wfbv329n1kohQBxLliyZUhFCJNTXfvGaOX9OtrDdtnWbTZLh5oI2PllhLAEVIGWGgYJd8tzZSIUgS4SUDy1i5XjpOt0l4tHvo8FsFMt60iNWAqIcz6Sp8ujBzfVv/+2/XVLxAWe6zpgTLSdKKkDAFyF//ud/Hr1bHrjJwK6ku7C2t7WLf2QEnm7UhUZCVSaNRkINB1yhNRJqOEylXSE+cHMttfiActqVL0L4u1xoJNRw0EioiqIoKaGc4mMqmCoRoihTjQqQMsM0Guur0iOhsh4preOOc+fOHXPjxo3olUy4u2MfiPSZHOBOr9x2NRXig2jH5barcosQZmqxK+68JUPwLukBvKgD6oI6STsqQMpMa2urqd1RK3pakE6bjV089VMyPNEXV1zJsPeDnf59V2TvxwEioWJX7KEoB1M189Hc1Gwj7JZ6D0iccoqQ/tv91q6IwimZ+vp6Gw1VMlcuX7F1oZFQlUmjkVDDQSOhhkUuDkgZNgb74oPYGuWcZSmlG+5Y/OVf/mVZRAgzUamIA6JuuKJQAVJmNBBZOGggsrAoVyAynqfii49yb3ItVSCyYsEt1xchpTi/1AgQDUQmChUgZUYFSDioAAmLcggQf3CeCvEBUy1AoNTnqQIkHFSAKCVDI6GGg0ZCDYtSR0KdDvEBU7kE41PK80WAaCTUMNAlGKVkaCTUcNBIqGFRykio0yU+oByRUIulVOetkVDDQSOhKiUDYyKK6FR2iKUGl09mcqYqYmW56OzsNC3HW6JXMvn47sfmyOEjNlqidBDl2NVkPS+mU3zA6dOnzfHm49MiQKAU5z/w8YC1K+lu6twkSb9Runnjpq0LZp7TjgqQMoMvN37d09U5lQLK/vDhQ/F+6bhCS49zQDwZ6kKyoHWUwq78wfeFF16YlusSgl2tWrVqUhtv02JXiFrJs81AHVAXGglVURQlUHg+ihMf5QjOJY2463EaRKqSblSAlBn2TzCtKT0SKmvEBI6SDBErpT9si7tt1obTEgkVu5pIjI5yBuUaL0yVh2JXvgj5p//0nxZ9bZmFSoNd9ff32yQZ6oC60EioaSdzz5xt2mvWvbLMLFtGesWs29tkuu6UrhHyZMadtTvFR0Ldvm27Odste4c8TyXe+97e6JVMiIS6dctW8U8mhocPHlq7OnNmfJFQQxIfwP4PXLxDWWadSARYBm3siiickjlUf8gmybDXjrrQSKipZdB0rn3BPDZrqBMbmWaZx16oNidLIKQ1Emo4aCTUsJhIJNTQxAdMlxvuaIxXhHDHnYo4IClxw6Uu1A03lfSbuqVzTGVObIySZj9naronNw2mgcjCQQORhcV4A5GFKD5gOgKRFcN4REhqBIgGIhPFjBMg51fPj8RHpal6+nnzk+qt9g5m77pXzPNPV40UJrOXmoaB6MMTQAVIOKgACYvxCJBQxQeEKkCgWBGiAiQcVICklYHdZlFlhal8fKnZ05O0zyNjbrSsMPOzeXICJJvmrWjLHpkYGgk1HDQSalgUEwmVDdA/+tGPcm0Rt9vQCHEJxufIkSPmS1/6kr1+hUQIAkQjoYYBdaCRUFPI9ZoFpmL2ElM3xt6OwcaXzOyow7Oparlpjo6NF2ZA3nzjTdEChCBF3KlKnwFhA+r6d9ZHr2Ty0dWPrBi8cOFC9I5cECCvv/Z6wRkQxAfupCGLD9i/b78VtqEKEIiLEASHz/Vr161dnTt3LnpHJmzeJEmGaLTURbyO0sgMEiADpnbhbLO8uZi5jAFTt6RqWIBUPGWqJ3jDSYM+evSoaJ98giwdPnx40hErp5uOjg7T3DxRKRkGuBI3NDSIdycG3A2xq0uXLkXvDCNFfAARdpuamoIWIOCLkG9+85t5AxyznNiV9EioJ0+etEky1AF1QZ2knRklQM6eOG2KdWzJ1C3x9oNMXIDgfktUu9A7p9Gg7MQAke6XziwUdSEZ4slQF5IFraOQXUkSHyDJrgqJkLTYFTdL0qMdUwfUhUZCncmcrzZP5QTIfLO6N3pfUZSyIU18SGS0mRBFmUpUgBTCFyCT2APCOjfT5dIjoTItKH32gClNAnlJhtkCoodK3lPkIBIqdsXdHkgVHxLtKi5CWF7FrqRHQr1z504qIqFSFxoJdSbTtsLMjTrCqpcaJ+wFc6r9lNm1c5fJfCbXmBggdmzfIX6HfHNTs3WZlMztW7ft48av9l2N3pELU+W122tthF06XSc+cBt94403olzhc/z4cZERdltaWsxXv/pVe82//vWv22su/YnXDYcabJIMdUAb778tW0gVgwqQAliPGStA5pmVndGbCbCOzSwH7pEYjp+Y+Th48GDOC4YOl+nOeD7CanMXxR0hsG+EO8N4PhLheZ0y5o4RtZ+Uz79LZvaF708qI+Vxd6DA334ZKduZ7jPWC+ZEy4ko19C6N7/hf5dLlImyAWWlzEn5uD4uRD3nzgZLfi+ej/K4dV2uN26EuKjF83F+1IXbb+Nfb/IjovBW4DW/5a43ZaQs7nv8xJ2tf725w0oqo3/3yPXmGUBJ15tyUH5XRmaVPrr2kb0D9fM5m3AzZ1wnytLa2mpe+8VrpuV4S+4a+DbB/4VsApuK20T8XCgH5XGzXW6fRqHrzXm6Mro7t3g+EtctbhMI2tWvrbbxWZ544omc+Fi/fshTaTw2UagNUu5CNuEnfsO3Ca53MTYBlB833Hgdjscm/DbItaeMSTbhX2/qslA/gQ34NlGoDbJB3okQ/sejJ/6d1iayZfRtYrQ2SBnd9S5kE5xL3Ca4rvF8JOrBnQv1U6gNkm/zps25OCCj2YTfBqezX47bBGUjtD9eMEmbs9OGCpBE+szaZ4ZmPyoX7TajxSHD2HBPRWQQPObnPx9K+HET9GrTxk22c8LocJ2sWV9jj7l8fIbBvfH9xlyHipHyjAz/+1ziTosGCBjvwQMHrbHm5ct+jkaIYQMNh7s0AqLFy8iAzLM4aIwk/uY9V0a+m1gNa95cY3dmu0ZG48TfPl5G8iO6aPxAWd977728PDZlP4cgoEED547LMtciXkaumXM7pTM4deqUeWvNW/m/nf2bOmCAdp3axYsXzcYNG4fOJXucz1AXnA/eF65DpePjeT153xel3bt2284F6LR4zoQto58v+zk6Pjpq4Bqd/OBk4vXm9/GacIMIXlK4Bq/6m1V534d76rFjx3IDGB0k7oWUnfrhuP3ubGJWh8ET6DD3798//F3ed/J5OjjAHpkRyn1PlI9yYLdutotynj592gbacjbhvo/zI4aHswk6UK6D/30kbKK+rt5eP6Bz3rN7j32f3+fum7b2K7/yK+ZPl/2pHUiA+mGpIMkmNtRsML09QxuzHn3+yLS1tVkbzfvt7N+8197WnhtEenp67Gfj58JvELPn4SdDNkEZanfUjjgXXlN2zgE4J/LFf/tnP/uZbR9cE6ANnjhxIs8mOH/KwbXtOt1lrzVtkBkh6iDJJqgzN4BRl9RpvIy/+NkvzIH9B6wtALaBjfh5SPw2d9qNjY3m7//9v2/r4Mtf/rL5r3/5X/PKSDmwUeeiSzk7OzqtLcevI20QLxRnEwyi9IHxMmLHhw4dygkv2tiuXbvy8pD4ftombRTIf7jhsKmurs77TvJhe7QNzokytn7YOqJf5m/6AfoQZxOT7pezr4vpl/l++mX6Tkjsl7P/U8/YE2VMOypAkuhcaeZlG2NF5QJTM8Yzv+gwaOh0NDQ2PzG4Yoj+DAiiIJ6PgQvjdYMSeRlw4vlINEQMFxhoabhJ+fi8f/dFJ8TvxPPRGPy7L/7mPXecz9A50ij8GRC+u1AZKZMTAZSVzjwpX/xugGuQVEaumX/3hbhJut685999cb3ppDnGOdF50EHxmgEk787m+o2873KJsrvrTf5C15vfcR3VaDZBOfy7L653sTZBWehU6Ri5S3L15N+Rc915Hf8+UrE2QXl8m6C8vk24xPlxnknXO564bv71powMVE58MPOxatWqPJsgP/VUjE1Q78XYBJ8pdL19m6AMlCWej+TbBDADgohA8Pr5uBb+9R7LJhzxNugSZaTOnE2M1gZ9m+D/0WwCm0Ho/fqv/7qtC8RIXV1dXr749S6FTcTb4Gj9hN8GC9kE+RAhLg5IoevNe/6s2Gg2EW+DxdjEZPplrikiE4GGPaUdFSAj6De1CyuzDbHSzF9dvO8txpyU4qHYk/KQ4iTlcckn6bhLcZLykOLEj9NIaBDxQGTxfH7ySTruUpykPKQ4SXlIcfxjLhT7WPniySfpuEtxkvKQ4iTlIcXhPToo7pK4Gy2U138/nuIk5SHFScpDipOUxyUfBoDf+Z3fsQPer/7qr5qNGzcm5gP/O/wUJykPKU5SHlKcpDwu+bhQ7Awoo+WD+HGX4iTlIcVJyuOST9Jxl4CB8T8v/8+mqmoo/hHLMcx8xfP5+Mf8FCcpDylOUh6X4iTlIcVDsSflIcVJykOKk5THJZ+k4y7FiR/XUOwzmIGGpTYK6uwldUXHDBmNVEVCbdVIqNNNGiKhcvdMNE4GOpZd/uqv/io6IhMJkVDHwkVCJay8vyekq6sryiEDZj/cDIhUNBLqTKW/ziyZXTHpB9D5oGZZW3ZLEhJhGpWd5ZcvyY6EikdS07Gm6JVM7t65a/dTuL0z0vDFB26gP/nJT8yli7I323Wc6jDHGo+JFiAsVxyqO2SXGBAdv/VbvyVShLAnabRnC0mA5WDq4uO7Ggl1BhEtvRTxrJjxwMwHna7kzomycw7+urdEWHv19zZI5PNHn9u6kChouaP71re+lRMfbARWuwoDlo+oC7dvhLoiPog0EcJ+DrdXRSrUAXXh9p6kGRUglozprp5vKivnm+ruoQaoKErp8Ac0xAebHpWw8evsK1/5itaZUnJUgGTFx+XaRWZ2Vnys6hzanVxKULLsiJasZtl5zi565+UhFbwh2EEvGefRIGlPUSHx4exK+h0rG2ql25XznorblTThyIZ5kmSoA+pC8rJ9scx4AdJft8TMrphtlpRy3cWjvb3dxpJwU5sSeXD/gamtrbX7WSSD6yobBiWDmCV+Cm6DEhhtAEN4EOOhu7s7ekcmBIXDE0byMisCiqi0uKjGkSRCiBFCkkzflT7bxqWL2mKY0QKkv3G5ebyyfOID2IDqu+FKhA1q1g33pGwvGOeGKxmEBy56589P8PHMU8hYAxczB3hXSd80iOcIbriSBQh1hV0VetyCFBGCBwwB4CRDHVAXxE9JOzNWgDjxsaj2cnHPecm0mfVrTpjhcEHFEY8DIpGcAInFAZGGCpCpo5gBKydAPpAtQFwckDQLEJAgQuJxQCSicUBSjhMfz9V0FyU+MjdazMrvzjLPrB0jLGoCKkDCQQXI1FCsG6cKkHAoRoAAe9p8N+rQRIgKEFnMOAHSX7fUzKmsMBVf/+fm3y1bZpaNmp4335n7NTMr29gqKheZ3ROIDaICJBxUgJQfxEaxgaxUgIRDsQIE4iJkz5490ZHpRwWILGaQAMmYG/vYcDr0kLnxprEeSlcInjapAiQM0iRALpwPLxLqeMQHpGUPSJoESLEbzX0RwnN8Nm3aFB2ZXhAf4gXIuUiAZOsk7cwYAXJ+83MTFh8VFVXmpcaJebGww59d2dIjodbX19uHJUmGJ6by5E/J8HAsnjYcWiTU8YoPIIAXdtXbO/RUW6nw1NL3339ftADBdRW7Gs+gF6IIaWlpsUkyRKOlLqS7ExfDjBEgfR/utbvVJ5ZOmMsT9KJl5uPe/eEnL0rki19+Yc9BesTKTwY/MfcfjHcbcVggZKmLzKNw3LonIj6ANqF2FQaff/H5kF2NM1xAaCLkwcMHNkmGOqAuqJO0MyM3oSqKUhomKj6U9BDqcowSPipAygzPiCCgjOQZECJWEgBLeiRU9hywhCEZZkCoixBmDZjqduID90zWrseD2lU4OLua6F41RMiCBQumXYSwX40kGeqAughplrNcqAApMzwpk82PoiOhZkXUrl277GOiJUPEyoMHDkavZELHtGvnLvtY/ukE90s8IJz4mMiGOSKhEiW4GM+LkGET7YH9B0TfZCCgsKu+vvGHGnAgYr7//e9Pqwgh8CNJMlf7rtq6uNMvW9QWgwqQMqORUMPhvffUDbcUlEJ8QGq8YPbNLDfc0fBFCOmnP/1pdGRqIBKqdC8Y6oC60EioyqTROCDhoHFAJk+pxAdoHJBwKJUAgekUIRoHRBYqQMqMCpBwUAEyOUopPkAFSDiUUoDAdIkQFSCyUAFSZlSAhIMKkIlTavEBKkDCodQCBKZDhKgAkYUKkDKTpkiorR+2Ru/IRCOhToz9+/fnxMc//sf/uCTiA1SAhIMTIMVGQi0WRMi/+lf/aspECOJDvADRSKhKqThz5oxpONRgG6JUcJOsO1BnLl68GL0jk7bWNjsjJRm8FfC4IFriVIAnAx4NDB7EesDdslQQCbXuYJ3p7ZEdCbW9rd1uNpcsQIi6iV2Va9BbsmTJlIgQPN2ONx+PXsmEOqAuNBKqMmmY+eBOT3Ln9MUXX9hzEB+xMiukSjmATgcIWepiKty6yyk+gDahdhUGxGQpt135IuTP/uzPondLCyEDSJKxkVCzdUGdpB0VIIqijKDc4kOZmfgihL+VmY0KkDKDGmfaXPIMCEqcaK5MmUuG5ytIn9ZkBoS6KOeswVSJD2dXaYiEqnZVPOUUIQMDAzZJhjqgLiQHrywWFSBlpqOjw+x9b6/4SKh7du+Z1uBXpeBEywm750Ay/bf7bfTQcgUpmsqZDyKh7tmzp+QbH6eakx+ctBF2Jd9kcJOEXRGFcyoolwhhjxcb/yXDRnPqQnp4/2JQAVJmNBJqOGgk1NGZ6mUXZg6sF4xGQp12nBdMKd1wx6IcIkQjocpCBUiZ0Tgg4aBxQAqDZ4IbDIjdMBXLbTkBom640850CBBYsWJFSUWIxgGRhQqQMqMCJBxUgCQTFx9T5TKuAiQcpkuAgG9/P/rRjyZlfypAZKECpMyoAAkHFSAjmS7xASpAwmE6BQiUyg5VgMhCBUiZ0Uio4aCRUPOZTvEBToCwiVMyGgm1NJTCHhEf4gWIRkJVSkX3mW5zqP7QlHfupeSTh5/YyHwXe2VHQkVAsSlYMnf675j9+/ZPOhLqdIsPYJ8J3iM9PT3ROzIhwu6Rw0dECxDciLGr6b7rnqxdEgW1uak5eiUThAd1cfeORkJVJgmdLH7pkjsnIqFyDpJncQC3T+66JUOHTF1Mxq07BPEBabEr4phItytiskzWrkrFZOwTzy3pQfOoA+ri80caCVVRlBTxp3/6p7nO/Y/+6I+mTXwoymi88cYbOZfw6RTJSnlRARIjc++muVNCD0TuupnelDwDwt0RQXGkR0Llzoj9LJKhI6YuJnKnWq7gTxOFGRC1qzBwbTyk5/L4cWmKFSHMREmfjaIOJtrGpaECJGLw6jGz9sdPmll0ziUMltnZ2Wk3qUk2JiKh7t2zd0ofAV8OCHhVX1cfvZIJIZqJSjvetfrQxAcgzokSzKY7yZw8edJG2JV8k8GAh12xyTkkxhscr/H9RvFPvKYOqAvqJO3MeAEy2FNvVr7wmBUeuQ66hAJEI6GGw0yNhBqi+ADnBaORUKef6XbDHY3xiBCNhCqLGSpAMube2T3m5e/NMZVRx+ynUgoQjQMSDjMxDkio4gNyAkTjgEw7IQsQKFaEaBwQWczYGZC+D5vM2Xssi2TMjS0L84SICpB8VICEw3gESMjiA1SAhEPoAgSKESEqQGShe0BgoNYsjDpqFSAjUQESDsUIEDbrvfDCCzl7xvMlRFSAhIMEAQKIkC996UsFRYgKEFmoALHUmSVRZ11yAXLkfbP69dXiBcgvfv4L8QKEjV3r1q6LXskEAfKzVT8rKEAQH3gMOFsmpkKoIEAQttIFCBtp337rbfECBLsKXYDAkSNHCoqQd99917y7+d3olUwQINSFCpAZQ/kESFdXl6k7UCfaCwZvBe7yent6o3dkgrfC4YbD0SuZ4AXDgMeAEUeS+AACeBHx8cIF2d5VRNhtONQgWoDgcYFdfXRVxsZHX4R8+9vfzrWHpmNNNkmGzafUhXrBzBjKJ0DoZJlBkNw5Ea+Bc5A8iwO4ExNhUDKIDOoiHq9BmvgAZ1fS44Ag0NNqVyHji5BvfvObVoQwq0aSDHVAXVAnaUcFiKV8AkRRyo1E8aEopSBJhChyUAFi0RmQ0SBKItFcdQZk+kFsUBduSU+y+EjLDEga7UoSvgj5xje+Ma4YOSFCHVAXOgMyYyjvHpADBw6I3wPCWr30p5ayB4S1esnwNFy3B4TNdwsWLBApPgDhYfeACI+wyx4Qnngt+SaDAU/SHpA4vgj5B//gH4ieCXF7QPRpuDOGiQsQOh1mBu4N3DMDHw/kpcFPBs2hQ4dybrgoWtYn4/m4e6Izdh0YMw72riqeL5sQAxwH7iCZYUnKx+Dk8vG9fH9SGXnPF0f87ee7f+++6bvSZ90lT35wMso1VEZ+w/8ulygTZXP57Bp5Qj7O0eVzZeRaxPNxzfy7AdZIB+4l5MuWm+vsriOfofwce/jgodm1c5f1guE1v+V+m/9Lcb1dGUezCc7PX2e31zvBJvhs3Cb4bXbI4znCI8d/93d+19orsRHeeWfIvXisMhZlE9ny+DZBeRPzxa73eGyC13j0vP7a6+ZY4zHzycOhMk/UJj797NNEm+A9/3oX2waLtQlgsMAN9+O7H+fli1/vQjbBeyNsokC+uE0Uc735v2AbvP/A5mHAxtPt1KlTiXmTbCKxXmI2YdtgkTZR6Hr7NsH/1iYS8rW0tJgvf/nLtk2wHHPp0qXE6ziiDT5KboNxm/j8i/L3y/RT7W3tti76+vpsvjSjAsQycQFCA2tra7NueAwMDNQk/t5Qs8Fs2rjJvLXmLdsomUHYuGGjNS4/HwKFndsYI9y4ccPU7qjN+z6XuGPkbgVoNDzbhE7cz8Pntm3dZjt4oLGdOHHCrHlzTd53Uo7176y3rnc0BhJ/855fRr5/zRtrrAeJ64T4bn4jXkby1tfX27IBZSVUtZ+HxOd21u605wqcOwMR1yJeRq6hm32h8fJ8HTp8Px9/Uwft7e25gYkOaPOmzbl81AN5cIs+evSo7TTg1q1bZveu3Xnf5xKxQ/A8ATofrkHS9Sb2wJXLV2w+rhF3xfxevIzvrH3Hzoq5DpXpYuwkbhNvvvGmaW5utnYD169fNzu277Bl5/e//vWvW1v9lV/5FfOf/tN/sksZQKd58ODB3Hf537l92/bcnSHf23K8xf6OX0bKUbO+Jvd8li9++YU5c+aMjZ8SLyP2RHh+ZxN0mITC9r+PRHmZeaLzBedxwfsIQmeXJEQi9QF04u+/P+TG7n8nf1OvF3sv2nzYBANnkk3wXsepjlyn39vba+0pfi78Bs8R4Tfh5s2btiz+97lE2Z2HAjZBW+Uc/Dx8jmvhBhGuETNwSW2Qa3um68xQG8z+O3/uvK2DJJugzhBbgJsmdZpURp5Ngy0AtnFg/4ERefgcNsX1xr64BrTpeF9GObBRt7SB7Xad7rJ15+fjb2y+tbU11wYvX75s20a8jPzWkcNH7PUD2hhtzc9D4nO0zdu3b9t8tFkeb5FkE1zv/7biv5nf+PJv2LbxD//hPzQ//R8/HZGPctOHOJvo6Q2rX6aeeQ+7TTsqQCwTFyA0Rjqr06dP28GPjpDE3+fOn7OdFQZFh0+H0N3dnZeP1NHRYafdXIOgkTEt7edxiUHVDUp0ajTwpHwMIK5xU0Y6GBqdn4dyMLi4hgN0rAyQroyUjTsLGtPx48ejXEMdL7/hf59LlMkNSjTeixcvJubD/dKJAM6da8Dv+XkoB9fMdaZ00nRGSdeb9+hMyQN0BAgqd4yOkM6H32BgcJ0kgw4Cx/9dlxiwXAdEfj6XVEZ+xw2wXG86q6TrzbWls3VlZHCgDvxzIfEbiAXfJigjy3lOfPzqr/6q+e///b9bm3B3dPxfjE3wvXz/WDZBOeM24RKf5TydmOL83fX285GuXLmSZxOUmc6XTh4Xb+qHfJyjEwFcbzrrydoEx9z1Hq0N8lvF2AT27GwCgbZnz56c+PXzcb2LtQmusSsj1z7JJvisbxNjtUHfJrjeSfkQFfQnfC+D4LFjx+z18fNQDsrjRC7lxIaLsQm/Dfr54m2Q60lb8/O4xPu+TRRqg5wL4vKvX/1r89WvftW2ka985Stm+/btefmwiXgbLLpfzvZZfh6XsIlS9MuUjVlzhIi76UozKkAsk9sDgiEXSvFIqEl5XPJJOu6ST9Jxl3ySjrvkk3ScDpHOKR6ILCmvSz5Jx13ySTrukk/ScT/5+O+7SKhj5Ysnn6TjLvkkHfeTT9Jxl3zozJ944omc+Ni4cWNiPv/z8eSTdNwln6TjfvJJOu6SD68RA3S0CJHR8hVKPknH/eSTdNwln6TjLvm4SKgMKKPlix+LJ5+k4y75JB13ySfpuEuAACH6JgNxUh6ST9JxP/kkHXfJJ+m4Sz5Jx11ykVARR06E8D8DezyvT/yYn3ySjrvkk3TcJZ+k42e7hx5Gp4HIZgzl24SKAGG60AkQiXCHwPSkRkKdPriTJuoj9smyy1//9V9HR+SCoELYaiTU6QcBIiUS6mj4kVDjIoTXEtBIqDOO8gkQ1kpZf3XTzxJh6nHfe/vETwmyiVaiFwwzUE58sOH0pf/4Uio6J6bV9++V7wXDPhjpXjAsATFD6PYnSIV9ZCSHRBGCJxJ1gcdb2lEBYimfAKGTZQCR3Dkxtcw5uHVvqbDj361jS4E7U3b0Y5e4GW7dutUOFm59XzKpsasH8uwqDnsr0mBXLOu5vUEORIdrQxJECHVAXbj9MWlGBYilfAJEUSZKXHwQ60BRlPHjtyVJyzFpRwWIpbwzIChy6TMgnIPkfSzAnSr7DiRQSHywI5+7bclLeo602BVLlFLsqhDcbafBrmjjzsskjt+miBcSqqCnDqgLnQGZMZRxD0hWaROXQfQekAcP7T4W6U/DZa1ewtNwR5v5YGoWr4vr165H78gFcY5dSX8abltrm/in4bIUhl3hdioZ4naQCiFhVpH9XdQFdZJ2VIBYyidACG7k4oBIBTWOu6R0Lxi8FQiyFjJjdZBsEsQjSfrzLoBZA+LLSPeCIQgV3lXSvWCwK+leMOyRIiDZaIQuQvCCoS7UC2bGUD4BEo8DIhEESFIcEGm4OCChUkzHiAAhRkBaBAjCVroAcXFApAsQ7Eq6AHFxQMYiZBGCANE4IDMKFSCjoQKk/LBU95u/+ZvW/kZbn1YBEh4qQMKhWAECnPO3vvWt4ESICpCZxvUas8ATIM+sLd1DgFSAhEOoAgTxUWysAhUg4aECJBzGI0DAD/AXighRATITGLyTbXS9prVhnXnxyVk58WHTrCfNi+saTGvvNXPtzuRiFGgk1HAIMRLqeMQHIECIkpgWAaKRUMMAAZK2SKjFEhchtbW10ZHpQSOhzgTe/4mZO3fu2Okn70cfmBinO0/bOyTpkVCZPZDurXCi5YR9SmUojFd8AA9W271zt3hvBcALBrvi6a+SQUDx9FnJAoSHs2FXV/tkR0Llho80XnwRQrThTZs2RUemHm4yeBIzdZJ2dAmmzDB44zopuXMiXgPnID1iJXfcobi2TUR8AEKWjiktkVCxK4SIZEKyq4ni7EryTC0kRUItllBECHVAXUi+aS0WFSCKMsVMVHwoilJeQpoJmQmoACkzzBpwhyR9BoRzkH7XzWwUHcx0wia3r3zlKxMWH0RC5Q4vDVESnV1Jv+sOwa4mC/aEXUm/66YuSJNhukUIdZCWNj4WKkDKTPeZbrvvQHLDpkEfPHDQ9PbKjoTa+mGrOXJ4+na5Iz7Y5EbHRgyCK1euREeKhyULAl9dv56OSKjYVc8F2U9ZbmtrsxF2Jd9ksIR0YN8B8Rsfm5uabZos3Dh+//vfnxYRwoZg2rhGQlUmjUZCDYfpjIQaFx90MhOBDWoaCTUsNBJqOBQTCbVYmIHwRcjbb78dHSkvGglVKRkaByQcpisOSKnEB2gckPDQOCDhMN44IGPhixDST3/60+hI+dA4IErJUAESDtMhQEopPkAFSHioAAmHUgsQmGoRogJEKRkqQMJhqgVIqcUHqAAJDxUg4VAOAQJTKUJUgCglAwGikVDDYCojoRJNsdTiAxAgGgk1LDQSajhMJBJqsUyVCNFIqErJ6OzotB2UaC+YBw/t4H3hvOxIqC3HW2zEynLDjnk2rdFJPfnkkyUTH0AkVKIkfnQ1HZFQsatz585F78jkgxMfWG8eyQKEwFfYVV9f6Z6DNR0cPXLUpnKBCPnX//pfl1WEEI12V61GQlVKwIMHD6whSe6ciNfAOUiPWIlvPW6s5cQXH8QSKHV8CIQsIkTyjJojLXbFTE657arcpMWumK0llZslS5aUTYRQB9SF5JvWYlEBoiglotziQ1GUcPBFyB//8R9H7yrjQQVImUHNMhBJnwHhHKRHQuVOmxmpcjBV4uPR54/sHTdTwdJRuwoHIuymwa4Imvjg4dTVhS9C+LsUUAfUBXWSdlSAlJmz3WdNw6EG8ZFQieZ68eLF6B2ZtLe1T+hJmWMxlTMfd+/cNXUH6syN6zeid+TCwH2o7pDp7ZEdYfdU+ym770DyTQbLFuyPKuV+pemAfV6kqaTUIuT6teu2Lj6+W/6lpOlGBUiZSVMk1NbW1ugdmZQjEirREady2SWNkVBPfnAyekcmGgk1HEoZCXU8lFKEaCRUpWRoHJBwKHUcEDafuU7n937v98ouPkDjgISHxgEJh3LFASkG9oGUQoRoHBClZKgACYdSChBffBAbYKrWzlWAhIcKkHCYTgECfr8wURGiAkQpGSpAwqFUAmS6xAeoAAkPFSDhMN0CBPz+gZgh4+0fVIAoJYPNaaxzSxcgNIgPT8qPhMpAMRmmU3wAAmTV36xKjQBhrZtAXpLZu3eveWvNW+IFCHYlPhLq5nfN5k2bo1fTx2T6CeqAuvjoI/nBBsdCBUiZ6ejosHfekr1gcDHcvWu3+EHv+PHjNmLlRJlu8QG3b902O2t3WiEiHbxgsCvu+CRzouWEObD/gGgBQkA47KrviuxIqDx/6cjhI9Gr6WWi/QXRaHfu2Gn6b2skVGWSMHgT1U5y54Q/+q1bt8RHrCQS6kTDG4cgPoCYGdSF5Bk1B3FAaBu4eUtmMnYVCtwgpcGu7t69a1MoTKTfoA6oC42EqihKnovddIoPRVHkEcrNS4ioACkzqFlmQSTPgHCnyjlIV+SDg4Pjvtv2xcePfvSjae88mI2iLtLQiTm7kh4JdSJ2FRppsSvqIcS68OMFjSVCOEZdaCRUZdKwoehIwxHxkVAP1R8yly5eit4pJwPm7NG9dmPfmKmpy1y7dscMRp8ci/b2dhsYrlh88TEZv/5SwvQyUWlv3EhHJFSiBPf2yo6E2nGqw3q7Sb7JYKM5dkUUTsmwH4cUIn7EZEQIwjWJ69ev27qgTsZHxty72WtaG1wf2WBae2+ae/7Q03/anA5om48KkDKjkVDHy3XT8Ooys+z5p01V5dDgb9Osr5nvPJ99f1mUnv+OmVNVOXzsxS2m48boIm88kVBDFB/A5tPURUI9qZFQpxuNhDo1FPPYhnFHQh3sMXteftY8Tn9YWWXmfOf5qJ9cbJ594mtmVsUs89izL5rq7LX5z/MrzZK66HMBoAKkzGgckImTaXzJVEUioCKx1Qyaq8dWmu/OivLM+q5Z3V1YhBQbByRU8QEaByQ8NA5IOIQQB2QsxhIhxccByZgbh182T9L/Vc4xP6g+Zq4mTKpk7p01e158MitEhvq0BTXhzHKpACkzKkAmwflq81TUaJIFyBCZ7moz382WzF5umgtokGIESMjiA1SAhIcKkHCQIEBgNBFSnADJmO6a58xs+qrK+WZV51gL0RlzuXaRzf9UdTh9hwqQMqMCZBIUKUBoXI0vVUXCgSnGZAUymgBh49cf/MEfRN8RpvgAFSDhoQIkHKQIECgkQooRIJnm5UPiI5uKFxT9Zt/iKjN3RVv0evpRAVJmNBLqJChagJD1qZx4KNQg9+xJjoSK+GBTmPv8n/3Zn0VHwgMBopFQw4INfxoJNQxCiYRaLOxZ+dKXvmT7HSdCqINRI6Fm2syKeVG/WPWSaRx961s+fWvNMwFtAlEBUmZOtZ+y0R6lR0IlMt+UR6wchwDpXvVETkDMX53sVdHc1Gw3DPrExQc++yFDgKId23eYq33yI6HiXUX0ze7u7ugdmRBhl1kQyQKEgHDY1ZUrV6J3ZHK44bD1rJIE0Vt9EXLmzBlbF9RJEgO7F5nKqL+qWt4cvVssA6a5uSP6e/pRAVJmULQMGpI7J/zRb968OfX+9UULkPOm+qkoX8U8s7IzejsGMzl+o5YmPoCYGdSF5Bk1B3FApsWuSkzcriTCDRJ1Ucg1VAp37tyxSRq+CPlH/+gf2Ud4JMfHGTC1C11fV2EW75N7YwsqQJRwKUaAZG6YlhXzc3cEs5c2ZJvo2EgUH4qipBdfhHzzm9+0y2IjaTBLc+EJnjCrZE8eqgApN9xZcIcneQYECBqVeTTFatsXIPP+hXllnReEbO8688qy583TLhaIdUM7aUZ7Igd3FNzhSRYf2BF1wexBGuBcpEd8dHYlGeqAfkp6XVAP2JRUxhQh12vMgqjfqqh4ygTk0DIhVIBMEhoskRwPHTpk9u3bZ/bv328Tf2NMjY2N1hMGIUL0yqNHj47Id/DgQbsO7qbcmNJtaWnJy+cSwcDcbmk6jFOnTpkDBw7k5eFzTU1NualIBtxz58+Zurq6Eb9NGdnYyMBG4m/ei+djrZ5Ioq6D4uFb/Iafj0RZKJPrBCgrZfbzkPgc58i5AufONeBa5L5zzb83j7nG9r/9nlm8bJn5kz/5E/PDH/7Q/OD3f9v85lf+TtQQK8zf+d//T/Oj/+9Nc+Jcb66MTClz/d338Th+Nqn99m//du5zmjRp0hRqGiFC/JsyFSAKg3tnZ6fdeU00RNw8SfzNRiKi8uF5wZr95UuXTe2O2hH5NtRssJ4Abl2f9WQXXdHlc4lNVjx9ExjcibRKdE8/D58j6qcL1434aWttMxs3bBzx29u2bjMXLlzICZAL5y/Y9+K/jSsxj7l+9PnQMwwIF4xbazwfZaFMbFwFykqZ/TwkPscjzN3aOefONeBa5L7zf/wb8w3X2BbV2Hzc+bNJCyFBvjV//Rfm3/zu/2p+Lcr3v8z+A7O9d+hu9MqVK2bXzl2578OV+Bvf+EbUeDVp0qQp/JQnQjL7zOLcMRUgShYGbu66kxJuuC4OyGj5/Cl18vF6rHwwWj6+x1EoH8nPl1RGZjvicUCmpIzdPze/6xrbkoNRrqQy3jQH/t/ZuQZbMW+FacuMzPf2W29bF1tmWUj19fU2MTPk3ktKHHd5k4675Ocb7TuLzUeK59u4caP5D//+P9iHWyXlI/nvx5P/20nHXZpMGQuleL7a2lqz9I+Xmp///Od5+UpdxmLzkYrN53/nihUrzEv/8SU7+zdavvgxP5WjjC4fKem4S3zPu+++m2hXfiq2jMXmIxWbz//OpOMu/cVf/IVNY31nOcro8pGSjrs01rnQT1EXmzdvzuU7d855ILaZFXOjfq6i0iyV5fAzAhUgZUYDkU2CcbjhWv92l7eiyiR5pxUbij1kNBBZeGggsnCQFIisEKMHIvODLoYV1XQiqAApMypAJsF4BIjpNquecAKkIvGBSypAwkIFSDioAAmHsSKhZtpWmHmuX5y30hSIOlCQzI2rZozndk4ZKkDKDAJk9eurxQsQIlaGLUCazfKqKG+BqUm3Z0UyCJCfrfpZagQIwjYNAoRpc+kCBLtKgwBhf5hkECDUReFQ7EMh1V1ft7B2NN+/GP11Zukf1ZhQnsivAqTMtLe2Ww8S6ZFQt2/bPvWd0zgESP++xcNPzi3wQLpjx47ZzbmSIajdti3bTF9fKF3IxMGLi43a3WdkBzMgwi7iVrIA6b/dbzefX7ksOxLqofpDNkmGzfPUxajB7bJCYsnsqL+rnG9WnCxChPQ3muXfW2rqxqFXyo0KECVc2laYuWMKkIy50bJi+Gm4lXPMiw3FhCJTFEURDILi8SgOUsVs89zKenP2XtKN7qC5eqzaPPfkc6amO6wbYRUgSmAMmLNH95q9614233EKnzTrMfPs4mV5wcjWvbLYPPt4VS4K6qzHXjBrx3wstaIoSkogEnT1C+axWa6vnGW+Nvc75vlly8yybFr87BNmTlWVefLFPaYnwK5RBYgSGNdNw6tDjaeo9Mq6rBhpMl037xm5i1yKoiiTIHPPXG5tyN64vZLfNza0mqsB35OpAFEURVEUZcpRAaIoiqIoypSjAkRRFEVRlClHBUiZGLzTZZrsZskG09p7x6Rqa2TmnjnbdNScleZsMnjHXOtqym1ibeq6Zu6Iq5iMuXfT2VY2NXWZm4k736WRMZdPDJ3TUUmG1X/aNLi6KJgOmvbrUX5hZO7dzGszH4bo/Z25bE7kXe9ik7A+LNvv3uxtHba3hlbTK3zvmwqQEjPYs8e8+PSQZ8asr801c+cM/V055wemuuWG7I2SmRumY8uL0SPwBT0Iqf+kWfvjp02Vc9XNS7PMkz9ea1pCCQ1YENyNq80Lj81KOIdKM+cH1QLOoTB+dEc54aUzpm3FvFhdJKSql0yjoKrJ3Dtr6qt/bL7zNWdrlaZqzlzzneeXmU0dUaaAGNi9KOcJN74036zujb4kZAZ7zJ6Xv2fmRP2XHVfmzjVzbD+cHVuqnjYv7ukReZOrAqRkZO/gan84ZCQEhvHERubG4chfe5b57upueSJk8Ko5tvbH5smcqxdJhgDJdNeY53x33kJp1nfNymKC+UwLGdNd85yZnVRuP81eZHZLjE820GCWenUkRoAM7DaLEkVtfpq3crzBsqcJ69L5g+GB7rEXzMr6rsBnCfvM2mdGXvOi0lPVJnRLy9zYZ5bOYeyoNI8v3ROL85Ex987uMUvt2JK9CVm6L5gQ68WiAqRE9NctiQaI2WZJUqi5vhqzwDbsrAh5W8od3nVz/G9eME9k1fbcuV8zs/IasAAB4kcLxD/+iWfNYuui9rx3d+elrHCsDixQDzjbmvXkj031e62m99o1c+1al2la92JMFGbvhuavDr5Tzaff1C3xnmScTVIESOfKImY/KrOiUMA0f+ZydqBzQa0q55gfbpFxR533XBQbA2NodqBwmpObCQ3ezjJtZsW8obLOXlKXbSkF6N9nFkePoZi3ok3UDa4KkFLQX2sWRkZdubC2gKF4TzEMdKAbSVZh3xleY+xb+8xQ+W0KXYBkTPNyBrZZNgjPyAiBQ0sa8dmRygXhPCfBYmcHZpvn1nYmDwiDnWbV/GjgsCn5ScChMhRCv9JUejMJIgRINPtR9VJjrn1Ipf/kSvNdJ2RnPycomN+A2b0oa/vZMq+sP2uK2gp1PXsjaO0s/Buo4f52oakdQ8S2rZgb5X3GrBU0C6oCZNL4j0euNItGu93xQosHN9AVQ/cq80RU/uAbsB0gKs386tGXvDKX15lnvcGvomKuyd5EBEPnym+PeQ55z8zJJjFLGJFwZ9ameoms8g/NfshYhhyN/pPeYwxmfdesFnFjFNG31iyYv8KMZ+X0es2CoXMNfvml16yeH9VLMWWtWzKUN5sWjqVWAkIFyGTJNoJnooofW6n6T2ydZ6QsDefIG+jC7nwz2QY5q+BsVD592U7J38Q2P5idaRlzo+N0EUL1vKl+arj8MgTI+WwHm717rVps9mUrqU6SABmoM0uy7bhqSV32Hlwume7qYfGR7Y9WtMmay3nYWWcax3UXd93ULBg632eCnyZoMEtzdZNtI2NVjSdAFtTIcblSATJJ8taBn1hlRn+uZ8bsW+yMSuD0rSABcr1htdlVbPkGsnfiufMSNIPgMTyAS1iCyZju6vlZ0Te8X0qSADlf/VS2nL9h/nB1q+mV58c9hLe/wF7zVQI3x4+X3PKLhGWKbP3MdfUz9iP3h2ySvGHN4I6FCpBJkX/nWbF435iNuHvVE8P5q5YbQcv1ogTI+JA4g+AzfGdXMW+lCX1iLdO9ytrR7KUNuRkEMQIk02heys1iDqXKqsfNsy9vMa0hP3Qjj5j7sDA34YmSW355Zq2A5e9of4uro9lLRnmM/nD/JW1pXwXIZIjdOVcVceuZawQ2CfFDd8wIAVJpsuOiLHLuoLOzZQ98USDTbJaz8fepVcbfbiBFgORvxI4nIfFYch55Qyn85YhSIGn5ZYhM40umKmdbWXExZ6nZN8K23GxiNo8Y54ZhVIBMhubleQZSVMfprdWRltRF70sgtQKk26x6IjovIW6Tw2Q7oFVMv4694Xb6iVxuEzpKEQIkYfYjMVU+bpYfDjXooL9pnuTtW8uLtJmyCM6ill8cI13U4/GKcuEfRHkvDaMCZBIM1C7MM47FY+4UyhITIKKm+9MqQLyZLFn7cjLmxj46IBkB7oY6y6xQWj3ScCTtARm8c81cY6DeWm1+8vx3zNdisViG0myzqPZyeHWSqTNLvNmPCjZq32gpGCnYRtncF+B5jBNZyy8emW5TnedmT8Itv92crV00FB/ouyvH5QkUEipAJsHwxp+hVNRshgqQ4BgO5Szo7ojwzC8+GQWHm2Uee/Zls6cn4DugKFhS1eJ9iZ5JkgTICKJHFMSDwjFQLG8Oa+jGO8z3+Kp6/Ekzp7LSVD39vHllHTMfW031i8Nhv4eShNm10ZC3/JJHVoTUPBebCbHp62ZxrcwQ7A4VIJNABUj0vmiGQzmHH0VwwJzdz113oefajBKwbFrpyw4ABIwqvJFOtABx9J80K78bi7A7b4UJybt1OGDVUJr15IuJwpUQ4MNRhElVZjH+0hIRufwSIytyDy9/PE88kiofX24OC34GlAqQSaACJHpfMJnm5dEa6nIT2M1qAtdNw6uEkl9snn0iHhrfpdDuVoddbkfbIJsKAQKZy6Z2kX+3OkZwwinF85ayafT4Es5bKZdfqLeM2OUXHwTIy0+aWZWzssmrE1LQz7EaHRUgk0AFSPS+VDLdZhXeLwJ3j1sSHxLI+SwwNYH0tC7Y1VizS6kRIBB7uF5ltmMIw7piYQMql5rRHb4GsvXib1gNSUwVi/DlF3Aza1Gk2sHOtSMfsFk5xywt7KcbLCpAJkHv6vl5RqACRBLuzrzSLAhltJ4o2Q5qRWyjWhBPYI2CXVXOr85zuU0iVQIkS94j4oMJ+11nlrgyFVuumKdfpTQfdenLL/110dNw8/cTDT9hfbhuJIoQFSCTISYmihEgcc+ZokRLKKRIgAwtvVSa+atC3DMxAbwHItq0oCZ77zedDJiGpSxF/Ib5w79mc+Po6a/+r+Gyz138lnfsqDkr7aYb8lx2l2SH/hCYgACJe81Mu12ND9HLL54HTKJ33mCnqY7vOZq91IQeCshHBchk6F1t5nuVX8ydW/6yjbBBPC0CJHpM/6iPuBZI3mMBpv2uOzbdP+Ek1c68xy7MXWHCiI4dq5OibGQinwkF2csvw2PFKM8NS3DTDWL2s0hUgEwK/+FyxUVCbV7uralqKPapJ3p8/exFteZyGAvzpcN72rIKkOknt6wUzKzBgKld6F3bIm3EXx4r5nETwZBbfllgBD2fLcIbW8YSsLHn+kgSiSpAJkmeoBizo8nfhR7O5rQikS5AoruFYvYkiCSzzyx29TPta3sD5uzR/GWW0VLqlmCyuIE7pD0t+TOwRTxlNYsvQOYKetJZbvlF2LKRxe9r5682Yz2xI5O9+Zjn8gez5Dc2KkAmywcvD7lxkiqzFT9qg/ZnTKrMS9J82iQLkMg9snL+KiMwYnFxeBFdF+bia8sgbZtQc08zDcgjyZLXhot5cqr/BG8JT1p2DN/sSXo8fQ6/nhbWZuX8WHiPk1ABMpMYDmQ1ZgMNaop8AkgVIE58PL7cNBa56aPvw2PmwsPohRByD6+qynZAwmYN0iZAXF2EF9yu39QuHN4zMPZ+AW9gE/Ck5Ryil1+y5MqfTU+sytbCWHhCUZdgZhb+9NdozxIZ3iQYXojmopAoQJz4mLN0lMdZ+2TMjcPLzePfFtTZQm4zWqVZWCtva60EAZK5d9Y08ZC2sR67H21yDnWpLy/A2FjBxfrWmmdsXgFPWvYQvfxi8R/HX4wL8bBQlCTgVYCUhIxpXh5FP6xcaBL7f89Ncvby5sDuiopEmgDJDspDz1B43PxxTf6eg6S07pVl5vmnq2z8hiB2zWfLv/qfUx6e1fFjs/bY1WSX4cwNs88+NbPSzFkq07MnfAHygXk5F/xplvnuyhaTFAF7sGeL+eGcynEI3unAe4Q713tVoci5w09jleUxJnz5JcIF8Svm+udugkVEdB5GBUip8EIwx/cZZG60RIGiGCD2JXZcEsh/kFXgUREZvOM+8kWnQKZt8wTfUJr15I9N9dYm03Xtmrl2rcs0rXvZfC8KVPRc9UmR4gPCFyANZqkfDyObeFLs86+sGxKw614xi599zMyijf9grYB9Rv3m5AonQmabJftuxETIoOlcNXR89nM1sjZtS19+8eivWxo9GLDSzF+R3L4RvYsQx7MXmVphrn0qQEqJi9eP8c96zDy7eJlZ5h4cNutJ8+IeeU8uHDh7NNvBrjOvLI4/ITObKueY7y1+xazLdsBHQ3JVSIgMOp5UuWh3EZu+poLsHejSOZ7oS0qzzGMvrDT1IT8JtwgkLMEMDwZJKZqlaokP5CEzaHr2uKf4Dj1Rmba8d2u1+fGThP5+zLwgUNTKX37JZ7Bnj3mR+sieU+Wc75kXq7cOid5sPb1oRe8s8+SP3xW5uV4FSBmwa8VZ4/jJsqwA+Um12dp01twTOutxveFVs4zzGCO92hBQU+/YlFjGYtPq5pBmdjLm3tkme4c9XMafmOqte01Da6+5I1t35OjYNHz9g7KlGEP7QLKC3NUF7Xtvk+mSXBGDd0xX01ZT/ZPonJjVaeoSalv3zYk14dvR+Mn2A5dbTYMbV5ztNbSay1IHlywqQBRFURRFmXJUgCiKoiiKMuWoAFEURVEUZcpRAaIoiqIoypSjAkRRFEVRlClHBYiiKIqiKFOOChBFURRFUaYcFSCKoiiKokw5KkAURVEURZlyVIAoiqIoijLlqABRFEVRFGXKUQGiKIqiKMqUowJEURRFUZQpRwWIoiiKoihTjgoQRVEURVGmHBUgiqIoiqJMOSpAFEVRFEWZclSAKIqiKIoy5agAURRFURRlylEBoiiKoijKlKMCRFEURVGUKUcFiKIoiqIoU44KEEVRFEVRphwVIIqiKIqiTDkqQBRFURRFmWKM+f8BhEGrRPf8XzcAAAAASUVORK5CYII= | After rotating triangle ABC 90 degrees clockwise around point C, the coordinates of point A' are? | A. (11,3); B. (8,4); C. (8,3); D. (12,3); E. No correct answer | A |
199 | 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 | As shown in the figure below, triangle ABC is first translated 2 units downwards and then 1 unit to the right to obtain the new triangle A'B'C'. Then, point A'C' is rotated 90° clockwise around point C'. After the rotation, the coordinates of point A' are ( ). | A. (11,3); B. (8,4); C. (8,3); D. (12,3); E. No correct answer | A |
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