index int64 0 1.74k | image stringlengths 1.02k 414k | question stringlengths 31 488 | option stringlengths 38 473 | answer stringclasses 5 values |
|---|---|---|---|---|
400 | 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 | As shown in the figure, quadrilateral ABCD is a trapezoid formed by three right-angled triangles. What are the lengths of AB and CD in centimeters? | A. 4, 3; B. 7, 4; C. 7, 3; D. 3, 4; E. No correct answer | A |
401 | 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 | As shown in the figure, quadrilateral ABCD is a trapezoid formed by combining three right-angled triangles. What is the area of the trapezoid in cm²? | A. 21 cm²; B. 14 cm²; C. 49 cm²; D. 24.5 cm²; E. No correct answer | D |
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 | As shown in the figure, quadrilateral ABCD is a trapezoid formed by three right-angled triangles. The area of the trapezoid is 24.5 cm². What is the area of triangle ADE in cm²? | A. 24 cm²; B. 12 cm²; C. 24.5 cm²; D. 12.5 cm²; E. No correct answer | B |
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 | As shown in the figure, quadrilateral ABCD is a trapezoid formed by three right-angled triangles. The area of triangle ADE is ( ). | A. 24 cm²; B. 12 cm²; C. 24.5 cm²; D. 12.5 cm²; E. No correct answer | B |
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| Using square paper pieces with a side length of 2 dm to measure the area of a desk (as shown in the figure), the length and width of the desk are equivalent to how many side lengths of the square paper piece respectively? | A. 8, 3; B. 7, 4; C. 8, 4; D. No correct answer | B |
405 | 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| Using a square piece of paper with a side length of 2 dm to measure the area of a desk (as shown in the figure), the length and width of the desk are obtained. What is the area of the desk ( ) dm²? | A. 141 dm²; B. 112 dm²; C. 56 dm²; D. Cannot be determined; E. No correct answer | B |
406 | 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| Using a square piece of paper with a side length of 2 dm to measure the area of a desk (as shown in the figure), the area of the desk is found to be 112 dm². What is the area of the non-shaded part of the desk? ( ) dm². | A. 84 dm²; B. 112 dm²; C. 56 dm²; D. Cannot be determined; E. No correct answer | A |
407 | 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| Using square paper pieces with a side length of 2 dm to measure the area of the desk (as shown in the figure), what is the area of the non-shaded part of the desk? | A. 84 dm²; B. 112 dm²; C. 56 dm²; D. Cannot be determined; E. No correct answer | A |
408 | 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 | A circular paper is folded twice to create creases AB and CD, which intersect at the center of the circle. Now, if the paper is cut along AB and CD, the newly added edge length is 32 cm. The added length is equivalent to the length of which of the following? | A. 4AB + 4CD; B. AB + CD; C. 2AB + 2CD; D. Cannot be determined; E. No correct answer | C |
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 | A circular piece of paper is folded in half twice, resulting in crease lines AB and CD. AB and CD intersect at the center of the circle. If the paper is cut along AB and CD, what is the central angle of each resulting sector? | A. 90°; B. 60°; C. 45°; D. 30°; E. No correct answer | A |
410 | 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 | A circular paper is folded twice to create creases AB and CD, which intersect at the center of the circle. If the paper is cut along AB and CD, what is the area of each resulting sector in cm²? | A. 4π; B. 10π; C. 20π; D. 40π; E. No correct answer | A |
411 | 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 | A circular paper is folded twice to create creases AB and CD, which intersect at the center of the circle. If the paper is cut along AB and CD, and the total length of the new edges is 32 cm more than the original circumference, what is the area of each resulting sector in cm²? | A. 4π; B. 10π; C. 20π; D. 40π; E. No correct answer | A |
412 | 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 | A rectangular piece of paper is folded twice (as shown in the figure). What is the relationship between OG and OH, and between OE and OF? | A. OE=OF, OH=OG; B. OE=OF, OH<OG; C. OE<OF, OH<OG; D. Cannot be determined; E. No correct answer | A |
413 | 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 | A rectangular piece of paper is folded twice (as shown in the figure), with OG=OH and OE=OF. Now, cut along the two fold lines EF and HG. After cutting, the perimeter of the four resulting shapes increases by 36π compared to the original. Given that AEFB is a square, what are the lengths of AD and AB respectively? (Unit: cm) | A. 6π, 3π; B. 12π, 6π; C. 6π, 6π; D. 12π, 3π; E. No correct answer | B |
414 | 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 | A rectangular piece of paper is folded twice (as shown in the diagram). Now, it is cut along the two creases EF and HG, and AEFB is a square. The cut-out piece AEHO is rolled into a cylinder with the short side as the height. What is the base area of this cylinder in cm²? | A. 4π; B. 9π; C. 18π; D. 36π; E. No correct answer | B |
415 | 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 | A rectangular piece of paper is folded twice (as shown in the diagram). Now, it is cut along the two fold lines EF and HG. After cutting, the perimeter of the four resulting shapes increases by 36π compared to the original. AEFB is a square. The cut-out piece AEHO is rolled into a cylinder with its short side as the height. What is the base area of this cylinder in cm²? | A. 4π; B. 9π; C. 18π; D. 36π; E. No correct answer | B |
416 | 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| As shown in the figure, there is a circle. AB and DC intersect at the center of the circle, dividing it into four parts along AB and CD. Compared to the original circumference, the added length is 40 cm. The added length is equivalent to the length of ( )? | A. 4AB + 4CD; B. AB + CD; C. 2AB + 2CD; D. Cannot be determined; E. No correct answer | C |
417 | 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| As shown in the figure, there is a circle. AB and DC intersect at the center of the circle. After being divided along AB and CD, the circumference increases by 40 cm compared to the original. What was the circumference of the circle before being divided? ( ) cm | A. 4π; B. 10π; C. 18π; D. 36π; E. No correct answer | B |
418 | 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| As shown in the figure, there is a circle. After cutting it into four parts along AB and CD, the additional edge length compared to the original circumference is 40 cm. Using the original circle as the base and the circumference of 10π as the height, design a cylinder. What is the volume of the cylinder in cm³? | A. 3140; B. 2464.9; C. 2500; D. Cannot be determined; E. No correct answer | B |
419 | 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| As shown in the figure, a circle is divided into four parts along AB and CD. Compared to the original circumference, the added edge length is 40 cm. Using the original circle as the base and the circumference of the circle as the height, what is the volume of the resulting cylinder? | A. 3140; B. 2464.9; C. 2500; D. Cannot be determined; E. No correct answer | B |
420 | 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 | As shown in the figure, a sector is drawn in a hexagon. What is the central angle of this sector? | A. 130°; B. 120°; C. 170°; D. 108°; E. No correct answer | B |
421 | 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 | As shown in the figure, a sector is drawn within a hexagon, and the central angle of this sector is 120°. What is the length of its arc in cm? | A. 2π; B. 3π; C. 4π; D. 5π; E. No correct answer | A |
422 | iVBORw0KGgoAAAANSUhEUgAAAm4AAAJoCAYAAADf8W0OAAAAAXNSR0IArs4c6QAAAARnQU1BAACxjwv8YQUAAAAJcEhZcwAAFiUAABYlAUlSJPAAAEsySURBVHhe7d0J/FTz/sfxqyRFIS3IWpYohcouUsTfdilyy01uCmWp5EokS4VkX7JcSxKJhCTLX5YkhFvKrixR3RaSreI6//8nn8n5zpkzv5n5zZn5fs95PR+P7+Nev+/3NzO/mXOm93nPzJm/eAAAAHACwQ0AAMARBDcAAABHENwAAAAcQXADAABwBMENAADAEQQ3AAAARxDcAAAAHEFwAwAAcATBDQAAwBEENwAAAEcQ3AAAABxBcAMAAHAEwQ1IqGnTpnmdO3f2NttsM+8vf/nL2tG4cWPvrLPO8ubNm6erAAA2IbgBCbNs2TKvQ4cO68Ja2Ljjjjv0NwAAtiC4AQkioa1Vq1YZg1qm8fDDD+tvAgBsQHADEkReGpVAJv87efJk/am39qXRa665JhDc5GVUXjYFAHsQ3ICEkKAmYSxbizZr1izjPW8yBg0apLMAgHIjuAEJIR88yOWlz/TmTd4PBwCwA8ENSAB5b1uu71eTtQQ3ALATwQ1AgLRzqeAmpwcBANiB4AYgwB/c/B9iAACUF8ENQEAqtMmpQwAA9iC4ATCkPn0qny6VT5kWQr6VQV5i9Td3cnlyGpJc32sn1y2XIb8nH5jwS//Wh9Q3Psj78zJJXy//yzdEAHARwQ2AIfWtCoWcfFfCVur3JUzJqUQkdElIkp+lhqzJFLJSH6JIP0lwKrjJfOpcdJmGBDJ/2Mx3PQDYjuAGYJ1UwCo0tKUarUxflyXz/tAk4cwf3uQ6U7+fPiS4yVr5nVRblgqE6b+T+hRsan3qZxIiM63n5WAALiG4AVj7kmGqmUoFI3+oqog/tGU7YW96++V/CdR/fenr5DIlYKUCnJ//ulNDXhqV9RLY0l8O9Qe61OADGABcQXADEiz1XjR/iEkNCUO5Nm+p97LJ72QLfBK8/Nchv5eJNHb+dXK5clvDpF+ujGwBMvU+vtTwB0gAsBnBDUio1HvRKhoVhTeZT63NFpaEf62MsOAmIc2/rqJglf4ybEW3Q/jXp15eBQDbEdyAhJOXEiVQhQU5abuyffoy1bbJyNaKpUioSl1uWCjMN7iJyqwnuAFwBcENwDoSmNLf/yVDXk7NRAKdf500X8VAcAOAzAhuAAzyHrX09k3asUzS3ytWLAQ3AMiM4AYgQMKbhDV/uMnUpklA8q/J9pJqPghuAJAZwQ1ARqn3oqWGhKl06cEt05pCENwAIDOCG4CM0sNTLsEt04l3C0FwA4DMCG4AQvnDTaaXQdPf4yYnzi0GghsAZEZwAxAqFWzCzreWfv40Gfm8z01OB5LplCAENwDIjOAGICP/qT6yndA2/UMMubZuqQ9AZPrQA8ENADIjuAHIyP8tB9latExfmRV2Yl0/CXhhX/BOcAOAzAhuAAL8pwOpKAT5mzn/CPuggqyXoCRrwr7cneAGAJkR3IAEkJcjU0FMQooEozAS2lLfnhD2jQnp0r8UPjXkvXFyGRKkZPi/lSHbS6qVDW653G7/eoIbAFcQ3IAEkJDkDyqpsCKNlwQ1If8rL3Gmvns0ly9q98v0kmnYkACXut5M0oNgRbcl/UMSFQUxuW7/ehkA4AKerYAESD9tR7YhwS1bI5dNWPPmHxLCsoU2ue70DzzIf4e9rCqhLdP3q0pLl+l65KXaTEFWgme29/IBgA0IbkBCSCCSwJJq1FJDQpE0VBJ0Mn3CM18SfiSc+cNU6iXTbJef/vJo2Ei1abmul5HPel42BWAzghsAAIAjCG4AAACOILgBAAA4guAGAADgCIIbAACAIwhuAAAAjiC4AQAAOILgBgAA4AiCGwAAgCMIbgAAAI4guAEAADiC4AYAAOAIghsAAIAjCG4AAACOILgBAAA4guAGAADgCIIbAACAIwhuAAAAjiC4AQAAOILgBgAA4AiCGwAAgCMIbgAAAI4guAEAADiC4AYAAOAIghsAAIAjCG4AAACOILgBAAA4guAGAADgCIIbAACAIwhuAAAAjiC4AQAAOILgBgAA4AiCGwAAgCMIbgAAAI4guAEAADiC4AYAAOAIghsAAIAjCG4AAACOILgBAAA4guAGAADgCIIbAACAIwhuKKn//d//9f7yl78wGAyG1UOeqwAbEdxQUv/zP/+T8UmSwWAwbBryXAXYiOCGkqFtYzAYLg1aN9iI4IaSoW1jMBguDVo32IjghpIIa9tuuukmXRF0ww03eNtss03G35PRq1cv75tvvtHVAFA5mZ6naN1gG4IbSiJT2yahLBfZAlz16tW9YcOG6UoAqJz05ypaN9iG4IbIhbVtEsjycf3113ubb755xsvaaaedvAcffFBXAkBhaN1gO4IbIpepbWvYsKHO5mfFihVe//79A5eXGu3bt/deffVVXQ0A+aN1g80IbohUWNs2cuRIXVGY2bNnex07dsx42TJ69Ojhffnll7oaAHJH6wabEdwQqUxt25Zbbun9/vvvuqJynnrqKa9169aB65Cx/vrre1dccYWuBIDc0brBVgQ3RCasbRsxYoSuKJ5bb73Vq1+/fsbra9mypffiiy/qSgCoGK0bbEVwQ2QytW0NGjTwfv31V11RXD/88IN3wQUXBK4zNfr27eutXr1aVwNAdrRusBHBDZEIa9uuvvpqXRGduXPnep07d854/Y0bN/YmTJigKwEgHK0bbERwQyQytW316tUraeM1btw4b9tttw3cDhndu3f3lixZoisBIDNaN9iG4IaiC2vbhg8fritK58cff/T69OmT8fbIOeHuueceXQkAQbRusA3BDUWXqW2rU6eO98svv+iK0psyZYrXvHnzwO2S8de//tX75JNPdCUAmGjdYBOCG4oqrG0bOnSoriiviy++OOPtq1q16tpvZgCAdLRusAnBDUWVqW3bdNNNvZ9++klXlN+MGTO8Nm3aBG6njE6dOnn/+c9/dCUA/IHWDbYguKFowto2W0+CK+eTW2+99QK3d6uttvImTpyoqwCA1g32ILihaDK1bbVr1157fjVbffjhh97RRx8duN0y5JxwAJBC6wYbENxQFGFt25AhQ3SF3eQTr5lu/wEHHODNmjVLVwFIMlo32IDghqLI1LZtvPHG3vfff68r7Pfyyy97TZs2Dfwd8nLq7bffrqsAJBmtG8qN4IZKC2vbBg8erCvcsWbNGq9nz54Z/56uXbt6K1as0JUAkojWDeVGcEOlZWrbatas6X377be6wj333Xff2r8h/e/aYYcdvGeeeUZXAUgiWjeUE8ENlRLWtsn50lz38ccfe+3bt8/491177bW6CkDS0LqhnAhuqJRMbduGG27oLVu2TFe479JLLw38jTJOP/10XQEgaWjdUC4ENxQsrG276KKLdEV8PPvss17jxo0Df+tBBx3kzZs3T1cBSApaN5QLwQ0Fy9S2VatWzVuyZImuiJelS5d6Rx11VOBvrlevnjd58mRdBSApaN1QDgQ3FCSsbbvwwgt1RXz1798/49/Od50CyULrhnIguKEgmdo2+aL2xYsX64p4u+uuuwJ/v4wzzjhDVwBIAlo3lBrBDXkLa9sGDBigK5LhlVdeWXt6kPT74ZBDDvE+//xzXQUgzmjdUGoEN+QtU9sm3y6wcOFCXZEc0jAeccQRgftjiy22WPuBBgDxR+uGUiK4IS9hbZu87yvJ+vbtm/F+GTNmjK4AEFe0biglghvykqltk7FgwQJdkVyjRo3KeN/ccMMNugJAXNG6oVQIbshZWNsmbRP+MHXqVG+rrbYK3EeDBg3SFQDiiNYNpUJwQ87C2rYvv/xSV0B89NFHXosWLQL3U69evXQFgDiidUMpENyQk7C27dxzz9UV8JOv/GrXrl3g/jrhhBO83377TVcBiBNaN5QCwQ05CWvbOO1Fdp07dw7cZ/I1WYsWLdIVAOKE1g1RI7ihQmFt29lnn60rkE2fPn0C992uu+7qzZkzR1cAiAtaN0SN4IYKhbVtfLl67i677LLA/Ve3bl3vpZde0hUA4oLWDVEiuCGrsLatd+/eugK5uvXWWwP3o3xN2JQpU3QFgDigdUOUCG7IKqxt+/TTT3UF8jFu3LjAfSnfOjF58mRdASAOaN0QFYIbQoW1bXyReuW8+OKLXp06dQL369NPP60rALiO1g1RIbghVFjb9vHHH+sKFOr111/3Nt9888B9+9RTT+kKAK6jdUMUCG7IKKxt69mzp65AZb3xxhtevXr1Avfxk08+qSsAuIzWDVEguCGjsLbtgw8+0BUohjfffNOrX79+4H6eOHGirgDgMlo3FBvBDQFhbVuPHj10BYpp5syZ3hZbbBG4vydMmKArALiK1g3FRnBDQFjbNnfuXF2BYnv77be9LbfcMnCfP/bYY7oCgKto3VBMBDcYwtq20047TVcgKu+++67XsGHDwH0/fvx4XQHARbRuKCaCGwxhbdt7772nKxClWbNmeVtvvXXg/n/uued0BQAX0bqhWAhuWCesbTv11FN1BUph9uzZ3jbbbGM8BrVq1fLeeustXQHANbRuKBaCG9YJa9ukBUJpyRfQN2jQwHgctttuO++zzz7TFQBcQ+uGYiC4Ya2wtu2UU07RFSi1adOmeRtssIHxeOyxxx7e8uXLdQUAl9C6oRgIblgrrG2TN8yjfORkvOmPSdu2bb3ff/9dVwBwCa0bKovghtC2rUuXLroC5XT//fcHHpsTTjhBZwG4hNYNlUVwQ2jbJieGhR1uuOGGwONz+umn6ywAl9C6oTIIbgkX1radfPLJugK2uPTSSwOP0wUXXKCzAFxB64bKILglXFjbJt+hCfucc845gcdq+PDhOgvAFbRuKBTBLcHC2raTTjpJV8BGXbt2DTxmY8aM0VkALqB1Q6EIbgkW1rbNmDFDV8BW6Y9dlSpVeNwAx9C6oRAEt4QKa9s6deqkK2Czn3/+2WvZsqXx2O20007e0qVLdQUA29G6oRAEt4QKa9umT5+uK2C7uXPneptssonx+B155JE6C8AFtG7IF8EtgcLatuOPP15XwBWZTtArH2AA4AZaN+SL4JZAYW2bfMUS3HPdddcFHsubbrpJZwHYjtYN+SC4JUxY23bcccfpCriod+/egcf06aef1lkANqN1Qz4IbgkT1ra98sorugKuOvzww43HdPPNN/c++ugjnQVgM1o35IrgliBhbdsxxxyjK+CyxYsXe40aNTIe27333tv77bffdAUAW9G6IVcEtwQJa9umTp2qK+C61157LfD4dunSRWcB2IzWDbkguCVEWNt21FFH6QrExf333x94nG+88UadBWArWjfkguCWEGFtG08K8TR48ODAY/3666/rLABb0bqhIgS3BAhr2zhZa7yl/wPQokUL3u8GWI7WDRUhuCVAWNv2/PPP6wrE0ZdffunVrVvXeMx79uypswBsReuGbAhuMRfWtnXo0EFXIM4effTRwGN/11136SwAG9G6IRuCW8yFtW3PPvusrkDcXXDBBcZjX7VqVW/WrFk6C8BGtG4IQ3CLsbC2rX379roCSXHwwQcb28B+++2nMwBsROuGMAS3GAtr25555hldgaT44IMPvBo1ahjbwXnnnaezAGxE64ZMCG4xFda2HXrooboCSZPp/G5jx47VWQC2oXVDJgS3mApr2yZNmqQrkETpX0Zfq1Yt76uvvtJZALahdUM6glsMhbVthxxyiK5AkrVu3drYLk488USdAWAbWjekI7jFUFjb9uSTT+oKJNnMmTMD28Y999yjswBsQ+sGP4JbzIS1bW3atNEVgOcNHz7c2D423XRT75tvvtFZADahdYMfwS1mwtq2iRMn6grgDxLm/dvIySefrDMAbEPrhhSCW4yEtW0HHnigrgD+9NZbbwW2FfnkKQD70LohheAWI2Ft24QJE3QFYLryyiuNbWXzzTf3Fi9erLMAbELrBkFwi4mwto0z5KMi+++/v7HNdO3aVWcA2ITWDYLgFhNhbZt8yTiQzYwZMwLbzZgxY3QWgE1o3UBwi4Gwtm2fffbRFUB2Q4YMMbad+vXre0uXLtVZALagdQPBLQbC2rZHHnlEVwAVk6Dv3366deumMwBsQuuWbAQ3x4W1bXJ2fCAfr732WmA7mjJlis4CsAWtW7IR3BwX1rY99NBDugLI3SWXXGJsRxwAAHaidUsugpvDwtq2li1b6gogP7///rvXqFEjY3u64YYbdBaALWjdkovg5rCwtu3BBx/UFUD+ZPvxb08bb7wx53YDLETrlkwEN0eFtW177rmnrgAKl/4PQq9evXQGgC1o3ZKJ4OaosLbtgQce0BVA4d5+++3AtvXyyy/rLABb0LolD8HNQWFtW4sWLXQFUHnnn3++sX3Jl9IDsAutW/IQ3BwU1rbxBeEopp9++snbcsstjW3sjjvu0FkAtqB1SxaCm2PC2rZmzZrpCqB47r77bmM7q1evnvf999/rLAAb0LolC8HNMWFt27333qsrgOJq27atsa2dd955OgPAFrRuyUFwc0hY27bbbrvpCqD4pk2bFtjm3nvvPZ0FYANat+QguDkkrG2Tl7OAKPXu3dvY5rp27aozAGxB65YMBDdHhLVtTZo00RVAdBYuXOhVrVrV2PZef/11nQVgA1q3ZCC4OSKsbbvzzjt1BRCtQYMGGdvecccdpzMAbEHrFn8ENweEtW0777yzrgCit3LlSm+TTTYxtsHnn39eZwHYgNYt/ghuDghr20aNGqUrgNIYPny4sQ22a9dOZwDYgtYt3ghulgtr23bccUddAZTOf//7X69hw4bGtvj444/rLAAb0LrFG8HNcmFt22233aYrgNK6+eabjW1xn3320RkAtqB1iy+Cm8XC2rYddthBVwDlscsuuxjb5AMPPKAzAGxA6xZfBDeLhbVtt9xyi64AykO+qcO/TTZt2lRnANiC1i2eCG6WCmvbtttuO10BlFfLli2NbfP222/XGQA2oHWLJ4KbpcLathtvvFFXAOU1fvx4Y9vk9DSAfWjd4ofgZqGwtm2bbbbRFYAd2rRpY2yjvNcNsAutW/wQ3CwU1rZdf/31ugKwwyOPPGJso3zCFLAPrVu8ENwsE9a2ybmzABvtvvvuxrY6adIknQFgA1q3eCG4WSasbRs5cqSuAOwi35fr31Y7dOigMwBsQesWHwQ3i4S1bVtuueXaM9YDtpL3X/q32WnTpukMABvQusUHwc0iYW3biBEjdAVgp2uuucbYZk8++WSdAWALWrd4ILhZIqxta9Cggffrr7/qKsBOP/74o1erVi1j250zZ47OArABrVs8ENwsEda2XX311boCsNvAgQONbffMM8/UGQC2oHVzH8HNAmFtW926db3Vq1frKsBuX3/9dWAbXrBggc4CsAGtm/sIbhYIa9uGDx+uKwA3SMvm34alhQNgF1o3txHcyiysbatTp473888/6yrADXPnzjW2480224xPRAOWoXVzG8GtzMLatiuvvFJXAG7p3LmzsS3fc889OgPAFrRu7iK4lVFY27bpppuu/ZQe4KIpU6YY27N8nykAu9C6uYvgVkZhbdvll1+uKwA37bbbbsY2/dZbb+kMAFvQurmJ4FYmYW1b7dq1vZUrV+oqwE1y0mj/dt27d2+dAWALWjc3EdzKJKxtGzJkiK4A3LVkyRJju65ZsyYftgEsROvmHoJbGYS1bRtvvLG3YsUKXQW4rVu3bsb2ffvtt+sMAFvQurmH4FYGYW3b4MGDdQXgvqlTpxrb9957760zAGxC6+YWgluJhbVtNWrU8L799ltdBcTDnnvuaWzn06ZN0xkAtqB1cwvBrcTC2raLL75YVwDxcdNNNxnbeY8ePXQGgE1o3dxBcCuhsLatevXq3tKlS3UVEB/ff/+9V61atXXbetWqVb3vvvtOZwHYgtbNHQS3Egpr2/g+R8RZz549je395ptv1hkANqF1cwPBrUTC2jZpI/7zn//oKiB+pk+fbmzzBx10kM4AsAmtmxsIbiUS1rb985//1BVAfDVr1szY7j/55BOdAWATWjf7EdxKIKxtk/f7LFq0SFcB8SVf4+bf9ocNG6YzAGxC62Y/glsJhLVtAwYM0BVAvL3//vvGti+nCQFgJ1o3uxHcIhbWtq233nreN998o6uA+Nt3332NfeCdd97RGQA2oXWzG8EtYmFtW//+/XUFkAzXXXedsQ9cdNFFOgPANrRu9iK4RSisbZOxYMECXQUkw5dffmnsAzvuuKPOALANrZu9CG4RCmvb+vbtqyuAZDnssMOMfeGVV17RGQC2oXWzE8EtItnaNmkegCS68847jX3hnHPO0RkAtqF1sxPBLSJhbdu5556rK4DkWb58ubE/bLHFFjoDwEa0bvYhuEUgW9s2f/58XQUk0/HHH2/sE5MnT9YZALahdbMPwS0CYW1bnz59dAWQXGPHjjX2izPOOENnANiI1s0uBLciy9a2ffbZZ7oKSK6ff/7Zq1Klyrr9Ytttt9UZADaidbMLwa3Iwtq2s846S1cASN9PZs6cqTMAbETrZg+CWxFla9v4Um3gT7fccouxf1xxxRU6A8BGtG72ILgVUVjbxnt4ANOnn35q7CP777+/zgCwFa2bHQhuRZKtbfvoo490FYCUFi1aGPvJwoULdQaAjWjd7EBwK5Kwtq1nz566AoDfwIEDjX3l3nvv1RkAtqJ1Kz+CWxFka9s++OADXQXA7+WXXzb2lRNPPFFnANiK1q38CG5FENa29ejRQ1cAyKRu3brr9peNN95YfwrAZrRu5UVwq6RsbducOXN0FYBMTjnlFGOfee6553QGgK1o3cqL4FZJYW1b9+7ddQWAMOnfotC3b1+dAWAzWrfyIbhVQra2bfbs2boKQJj0L51v0qSJzgCwGa1b+RDcKiGsbevWrZuuAFCRtm3bGvvP/PnzdQaAzWjdyoPgVqBsbdu///1vXQWgIpdddpmx/4wePVpnANiM1q08CG4FCmvb5M3WAHKX/uTPuQ8Bd9C6lR7BrQDZ2rZ33nlHVwHIxerVq7311ltv3T6066676gwA29G6lR7BrQBhbVuXLl10BYB8tGnTxtiXvv76a50BYDtat9IiuOUpW9s2c+ZMXQUgH4MGDTL2pYcfflhnANiO1q20CG55CmvbTj75ZF0BIF/PPPOMsT/16dNHZwC4gNatdAhuecjWtr355pu6CkC+fvjhB2N/at68uc4AcAGtW+kQ3PIQ1raddNJJugJAofbdd19jv1qyZInOAHABrVtpENxylK1te/3113UVgEINGDDA2K8mTJigMwBcQOtWGgS3HIW1bR07dtQVACrjySefNPatfv366QwAV9C6RY/gloNsbdtrr72mqwBURvr3lrZq1UpnALiC1i16BLcchLVtxx9/vK4AUAx77bWXsY+tWbNGZwC4gtYtWgS3CmRr21599VVdBaAYevToYexjfFobcA+tW7QIbhUIa9uOO+44XQGgWG699VZjP7vzzjt1BoBLaN2iQ3DLIlvb9vLLL+sqAMUi7xn172dnnnmmzgBwCa1bdAhuWYS1bcccc4yuAFBMP/30k7GvybndALiJ1i0aBLcQ2dq2qVOn6ioAxda0adN1+1r16tX1pwBcQ+sWDYJbiLC27aijjtIVAKLQtWtXY5+bPXu2zgBwDa1b8RHcMsjWtr3wwgu6CkAURo4caexzo0eP1hkArqF1Kz6CWwZhbdsRRxyhKwBEJf2Jvm/fvjoDwEW0bsVFcEuTrW177rnndBWAqCxbtszY7w455BCdAeAiWrfiIrilCWvbDj/8cF0BIGqNGzdet+9tsskm+lMArqJ1Kx6Cm0+2tm3KlCm6CkDUOnbsaOx/H3/8sc4AcBGtW/EQ3HzC2rb27dvrCgClMHToUGMffOKJJ3QGgKto3YqD4KaytW2TJ0/WVQBK4ZFHHjH2QfmkKQC30boVB8FNhbVthx56qK4AUCrvvPOOsR+eccYZOgPAZbRulUdw+3/Z2rZJkybpKgClsnLlSmM/bNeunc4AcBmtW+UR3P5fWNvGaQiA8tlqq63W7Yvbbbed/hSA62jdKifxwS1b2/bkk0/qKgCl1qZNG2N//OWXX3QGgMto3Son8cEtrG2TfzQAlE+PHj2MffK9997TGQCuo3UrXKKDW7a27fHHH9dVAMrhqquuYp8EYorWrXCJDm5hbdsee+yhKwCUy6OPPmrslyNGjNAZAHFA61aYxAa3bG2bjBkzZuhKAOUwa9YsY5/s2bOnzgCIA1q3wiQ2uIW1balx2GGH6UoA5fDjjz8a+2Tbtm11BkBc0LrlL5HBraK2LTXuu+8+/Q0A5bD11luv2x/l/wOIF1q3/CUyuIW1bdtvv73x39tuu623evVq/S0ApSbnUvTvk6tWrdIZAHFB65afxAW3bG3buHHjvP3339/42cCBA/U3AZRaly5djP3xiy++0BkAcUHrlp/EBbewtq1169Zr59M3oPXXX99bsmTJ2jkApdW/f39jf3zjjTd0BkCc0LrlLlHBLVvb9tBDD+kqz+vevbsxd/HFF+tM6Tz88MNe48aNvWuuuUZ/AiSPnALEvy8+8cQTOgMgTmjdcpeo4BbWtrVs2VJX/OHdd9815mvVquX98MMPOhutVGBLXTfBDUk2ZswYY18cNWqUzgCIG1q33CQmuGVr2+Qfh3SdO3c21gwbNkxnopEe2FKD4IYke+GFF4z9YciQIToDIG5o3XKTmOAW1raFfUvC9OnTjXX169f3fvvtN50tHjnJaKtWrdYGxbPOOsu4ThkENyTZnDlzjP3hjDPO0BkAcUTrVrFEBLdsbdvo0aN1VdAxxxxjrL333nt1pniWLVu2dqRIUPNfJ8ENSbZ06VJjfzjuuON0BkAc0bpVLBHBLaxta968ua7I7LnnnjPWt2vXTmeiM23aNOM6CW5IumrVqq3bH/bZZx/9KYC4onXLLvbBLVvblss3I+y8887G73z44Yc6Ew2CG2CSE2Gn9gf5/wDijdYtu9gHt7C2rVmzZroiu8suu8z4vcGDB+tMNAhugGnvvfdetz9ssMEG+lMAcUbrFi7WwS1b23bPPffoquw+/fRT4/caNWqkM9EguAGmY4891tgnli9frjMA4orWLVysg1tY27bbbrvpitx06NDB+P1XX31VZ4qP4AaYevXqZewTc+fO1RkAcUbrlllsg1u2tu3uu+/WVbmRds7/+1F+kwLBDTDJ9wX794nXX39dZwDEGa1bZrENbmFtW5MmTXRF7hYsWGBcRup7TaNAcANMQ4cONfaJ559/XmcAxB2tW1Asg1u2tu3OO+/UVfmRk+T6L+frr7/WmeIiuAGmG2+80dgnHn/8cZ0BEHe0bkGxDG5hbdtOO+2kK/I3aNAg47KiOBmvILgBJnlrg3+feOCBB3QGQBLQupliF9yytW233367rsrfyy+/bFzW3/72N50pLoIbYJLv8fXvE5XZjwG4h9bNFLvgFta2yRe4V9ZGG2207vJ22WUX/WlxEdwA06RJk4x9YsSIEToDIClo3f4Uq+CWrW279dZbdVXhDjroIOMyV6xYoTPFQ3ADTC+99JKxT1x66aU6AyApaN3+FKvgFta27bDDDrqics4991zjcqdOnaozxUNwA0wzZ8409on+/fvrDIAkoXX7Q2yCW7a27eabb9ZVlXP//fcblzty5EidKR6CG2CS7wf27xNyQl4AyUPr9ofYBLewtm277bbTFZU3e/Zs47K7du2qM8VDcANM6edR7NKli84ASBpat5gEt2xtm5wDqpiqVau27rLly6+LjeAGmL777jtjn5DvLgWQTLRuMQluYW3bNttsoyuKR75kPnX5W221lf60eAhugOnXX3819ol27drpDIAkSnrr5nxwy9a2XX/99bqqeNq0aWNch/yjUkwENyBogw02WLdP7L///vpTAEmU9NbN+eAW1rY1bNjQ+/3333VV8cj72vzXM3/+fJ0pDoIbEERwA+CX5NbN6eCWrW279tprdVVxDRw40LieV155RWeKg+AGBPnfW0pwA5Dk1s3p4BbWtm2xxRbeb7/9pquKS07k67+uRx55RGeKg+AGBPmD2wEHHKA/BZBkSW3dnA1u2dq2KMOOfLm8/7pGjx6tM8VBcAOCCG4A0iW1dXM2uIW1bfXr1/fWrFmjq4pv7NixxvXdddddOlMcBDcgaP3111+3TxDcAKQksXVzMrhla9uuuuoqXRWNCRMmGNdXrG9lSJk8ebJx+Z07d9YZILn8we3AAw/UnwJIuiS2bk4Gt7C2rW7dut6qVat0VTTSg9WIESN0pnKWLVu29rJbtWplXL6MO+64w5s3b56uBJKH4AYgTNJaN+eCW7a2bdiwYboqOunXf8UVV+hM4fyXV9GQl1KBpKlateq6fYDgBsAvaa2bc8EtrG2rU6eO9/PPP+uq6Dz99NPG9RarcQMQzh/cDjroIP0pAPwhSa2bU8EtW9t25ZVX6qpoPfzww8b1jho1SmcARIXgBiCbJLVuTgW3sLZt00039X788UddFS35FKn/uh988EGdARCVKlWqrNvnCG4AMklK6+ZMcMvWtl122WW6KnrXXXedcd1PPvmkzgCIij+4yfcFA0C6pLRuzgS3sLatVq1a3vfff6+roich0X/9U6dO1RkAUfjll1+Mfe7www/XGQAwJaF1cyK4ZWvbLr30Ul1VGr169TKuf9asWToDIApLly419rmOHTvqDACYktC6ORHcwtq2jTbayPvuu+90VWkcdthhxm1YuXKlzgCIwvz584197tRTT9UZAAiKe+tmfXB74YUXjAfAPy655BJdVTqNGjVad/0NGjTQnwKIyuzZs439/uyzz9YZAAi69tprjecMGZIl4sLZxq1GjRre8uXLdUVp/Pe//zVuw3777aczAKIyffp0Y78bOHCgzgBAEI2bBTK9Zt2lSxedLZ3PPvvMuA1du3bVGQBRefbZZ439rhTfkALATbzHzSLyPaT+B2LnnXfWmdJ5/PHHjdswePBgnQEQlccee8zY72666SadAQBT3Ns24Uxwu+qqq4wHQ0apU7S8ROO//ieeeEJnAETlvvvuM/a7e++9V2cA4E9JaNuEM8FNpLduu+22m86URtu2bY3rX7hwoc4AiMott9xi7HePPvqozgDAn5LQtgmngtvw4cONB0VGKdO0nH4kdb077rij/hRAlNL3+ylTpugMAPwhKW2bcCq4ic0339x4YErVur377rvG9ZbjwxFAEg0aNMjY91577TWdAYA/JKVtE84FN/lEmf/BkVGKVJ3+HaW8QRoojXPOOcfY9/i2EgB+SWrbhHPBTaS3bk2bNtWZ6LRr1864Tv7xAEqjW7duxr43b948nQGAZLVtwsngNnToUONBkhFlul62bJlxXbvssovOAIha+tfM/fTTTzoDIOmS1rYJJ4ObqFOnjvFARdm6jR492riu/v376wyAqDVr1mzdvrfpppvqTwEgeW2bcDa4XXnllcaDJSOqlH3SSSeV5HoABPnfGrHrrrvqTwEkXRLbNuFscBPprZscmRfbypUrvfXXX3/ddci55ACUxqpVq4x9/NBDD9UZAEmXxLZNOB3cLr/8cuNBk1HstJ1+8s/TTz9dZwBE7fPPPzf2P07DA0AktW0TTgc3EXXr1qpVK+Pyp02bpjMAojZjxgxj/zv//PN1BkCSJbVtE84Ht8suu8x48GQUK3W/+uqrxuW2bt1aZwCUwuOPP27sgyNHjtQZAEmV5LZNOB/cxGabbWY8gLvvvrvOVE6PHj2My5WXTQGUzm233Wbsg2PHjtUZAEmV5LZNxCK4DRkyxHgQZVQ2fae/t6ZatWprP6gAoHQuueQSYz+cOnWqzgBIoqS3bSIWwU0Uu3VL/5qdM844Q2cAlIp8GMi/H3744Yc6AyCJkt62idgEt0svvdR4MGUUmsLT2zYZH3/8sc4CKJWjjjrK2A9XrFihMwCShrbtD7EJbkLOqu5/QAtt3WjbADvstdde6/bDmjVr6k8BJBFt2x9iFdwGDx5sPKgy8k3jn332WeAyaNuA8vC/BYLvCAaSi7btT7EKbiK9dWvevLnO5KZz587G79O2AeWxePFiY188+uijdQZA0tC2/Sl2we3iiy82HlwZuabyxx57LPC7tG1AecjJrv37Yr9+/XQGQJLQtpliF9zEJptsYjzAubZuTZo0MX5PvsgeQHnce++9xv54++236wyAJKFtM8UyuA0aNMh4kGVUlM7TzxeV70us5bRs2TKvQ4cO3qxZs/QngPsuuugiY5984YUXdAZAUtC2BcUyuIn01q1FixY6E5T+1VYyJk2apLN2k9CW+j5VCayV8fDDD3uNGzf2rrnmGv0JhLxkJ8FYRmXMmzdv7WOU/v23crl33HHH2seyMuT35fLlMfRftjyuLurUqZNxP33xxRc6AyApaNuCYhvc0o/WZWRK6atXr/aaNm1qrOvWrZvO2k0attQ/0meddZb+NH+pwJb6+wluf0gFttT9UpngJvdx+kmi04fMFxqy/JcvwVAeQ3+Ik5+51sjKwVbqvtlwww31pwCSgrYts9gGN1G7dm3jAc/Uuv3jH/8w1myxxRbewoULddZe8o9w6h/qQkNbemBLjaQHt/TAlhqFBrdML91nG/mGN3m8Ur+b/thJC5f6pLRsL/mEN7kf5Hf9gVP+e/LkyboiWnLettT1Fuv7hwG4g7Yts1gHt4EDBxoPugx/Wr/zzjsD8xMnTtRZe1U2tMnvSwMj/wjL76ffB0kNbqn3CsqQsOUPLDIKCW4SclK/LyFZ7lsJRDLk5dFMAVFGruFIQl7qd+TxzET+rtTfIv+by0uy/rApvyO3039/VKbhzcWXX3657rpknHDCCToDIAlo28LFOriJ9NZtjz32WPvzN954w6tSpYoxJ0HPdv7QJv+4FkL+4fb/4+1vbGQkNbgJeR9aioQr//1SSHBLNZrZ7lN/+EqNXAKW3FZ/mPLf9nT+xzgs4KVIoEzdBrkP/OS/i/WeymzSn7QvvPBCnQGQBLRt4WIf3OQJ3//gyxg7dqy3/fbbGz9r27at/oa95B/N1D/U+b6clk16QElycEvnv1/yDW6pQCZBqCKZwltFj7G/La0ojEkI9F92eiBLkXWyjckIe1lV1qQCabawWBmjRo0ybu+//vUvnQEQd7Rt2cU+uIlatWoZG8BGG20U+O+PPvpIV9vJ/w97MUObILiF898v+QY3CVP5/I6s9V9ftjAmgcm/Npdw6P80a9jtSm0LFbVpqVYul+stRP/+/dfdVhmvvPKKzgCIO9q27BIR3C644AJjI0gftp/6I8rQJghu4fz3S77BLVtrlYn//XAVXZ//PWgywho0P//LpTIy3bbUtlDRNpDrukLJ11v5b+uiRYt0BkCc0bZVLBHBTaS3bqlx11136Qo7pUKbhIAoQpsguIXz3y/5BDd5OVEarnykv5yZ7frSPw2ci/RgmOlxTm0L5W7cGjZsuO52NmjQQH8KIO5o2yqWmOA2YMAAY2OQ0b17d521kz+05dPc5IvgFs5/v+TbuBUil+uTbcG/TkJcLtIf57DLL/d73BYsWGDcziOOOEJnAMQZbVtuEhPcxMYbb2xsEHvuuafO2EfCk9zGqEObILiF898vpQ5uYY9Dqu1KjXxul//3ZGTiP2CQbcNP/jvqT5XKWxf8t1FOpg0g/mjbcpOo4Hb++ecbG4UMG9N86tOCpQhtguAWzn+/RB3c0l8qDXvs09/fVpngFnYdqQMHGdKuyXX4X56N8jxuV1xxxbrrkTF+/HidARBXtG25S1RwE+mt21577aUzdih1aBOlCG7p11HsEVXY9F9H1MHN/x60bO+Pk9vhv135/O3+35OR3qj5yZx8slW2RVkr/yv/ne13iuH44483buOnn36qMwDiirYtd4kLbumnGZBhS6pPhTb5R1val1IpRXCTECqBI6oR1Qc3/PeLXE+U/Odly/b3yO3w366oglu5+M+xWKdOHf0pgLiibctP4oKbSD+Pmw2tW7lCmyhFcHOV/36JMrjJY55qtir6NGoxg1tUnwot1OLFi43b165dO50BEFe0bflJZHDr16+fsZHIKFe6l3+wU2/2LkdoEwS3cP77JcrgJvd56noqasGKGdxse6ynTJli3D45ByOA+KJty18ig5tIb91atmypM6VjQ2gTBLdw/vslquDmb9ty+aRmMYNbrl9mXyrDhw83bt9DDz2kMwDiiLYtf4kNbuedd56xscgoZcr3h7YoP6GXC4JbOP/9ElVwS31KVLaHXBQzuFXU7pXaiSeeaNy+Dz/8UGcAxA1tW2ESG9xEzZo1jQ2mVK2bTaFNENzC+e+XKIJb6r6Xxi3Xk9nGObjtuOOO625b7dq19acA4oi2rTCJDm7nnnuusdHIiDrty6crbQptohTBjU+VBvlfIs0nQPk/fSqjMsGtXC/PZ7J8+XLjth188ME6AyBuaNsKl+jgJtJbt1xfriqEhJfUP9S2hDZRiuCWfh3FHlG1hP7rKHZwk8uTy803dKZ/c0Ku25Jsf/7fk23RJunfmNC3b1+dARA3tG2FS3xwO+ecc4yNR0YUqd8f2qJqhwpViuDmKv/9UszglmrNCjkdR/rjlevtKvT3SuWf//yncfseffRRnQEQJ7RtlZP44CZq1KhhbEDFbt1sDm2C4BbOf78UK+ikGrPKtK6p7UlGrs1ZelNn2znc9ttvP+P2yTndAMQPbVvlENz+39lnn21sRDKKlf5tD22C4BbOf78UI7jJNiCXVdmXylONXWrk8l619O84zfXDEKXwww8/GLetefPmOgMgTmjbKo/gptJbt9atW+tM4eQfadtDmyC4hfPfL5UNbqnQVowAmP5+tVzOxybXm1pfrPawWJ555hnj7+nTp4/OAIgT2rbKI7gp+YfCvzHJqMxRQOofaQluEoxsRnAL579fKhN2UvexvAyfzyc55bEIe0nTH8QqavDkOlNrZdi2TV500UXG7Rs3bpzOAIgL2rbiILj5FKt184c2aUZsR3AL579fCg1uqZfL8w1tqe0o7CVNf+sml59N6rJkdO7cWX9qjwMPPHDd7ZPxzTff6AyAuKBtKw6Cm0/6+4Zk5Hs04FpoEwS3cP77pZDgJvetbAsy5OVM+e+KhjRsEq7kOiv6oIw8Vqnbl+3DBo0bN167Rm6HTeduEz///PO6v0FG06ZNdQZAXNC2FQ/BLc2GG25obFh77723zlQs9ak9l0KbkEDh/5ttbGTKIf3lRXlc8+FvuQodchkVSR1whG13Fc2X23PPPWf8zWeeeabOAIgL2rbiIbilkX80/BuXjFyOCvxtnbQb0s6UahT6j7EEEwlt0ur4/14ZEkJt+tRhqUnzlWq9/EMe51zu72KENhm5tmOpT4xKOJMWTm6/3IZU0ybbia2P5yWXXGL8zWPHjtUZAHFA21ZcBLcM8m3dMr3EWsoh/0jnK9PlhI1CLt9VEnAy3QeZRraXlDOtz3fk23zK4yTbooQ3+X35X7kM2x8/+Wor/9/91Vdf6QyAOKBtKy6CWwZnnHGGsZHJ4OgAKL7Vq1d7VapUWbefNWnSRGcAxAFtW/ER3DL473//61WvXt3Y0PbZZx+dBVAsL7zwgrGf9ezZU2cAxAFtW/ER3EL06tXL2NhkcJQAFFe/fv2MfWzMmDE6A8B1tG3RILiF+PXXX2ndgIjJS6P+fcy2U5UAKBxtWzQIblmcfvrpxkYng6MFoDjmzp1r7Ftt27bVGQCuo22LDsEtizVr1ngbbLCBseHRugHFMWLECGPfkv8GEA+0bdEhuFWgR48exsYng6MGoPKkYfPvV3PmzNEZAC6jbYsWwa0Cq1atCrRu++67r84CKMTy5cuNfYrTgADxQdsWLYJbDv7xj38YG6EMjh6Awj344IPG/iSfLgXgPtq26BHcciBfgl2tWjVjQ6R1AwrXtWtXY396/vnndQaAy2jbokdwy9Fpp51mbIwyOIoAClOnTp11+1Ht2rX1pwBcRttWGgS3HP3000+B1m2//fbTWQC5evHFF4396OSTT9YZAC6jbSsNglseunfvbmyUMjiaAPIzYMAAYx8aPXq0zgBwFW1b6RDc8vDDDz9466+/vrFh0roB+WnatKmxDy1ZskRnALiKtq10CG556tatm7FxyuCoAsjN22+/bew7bdq00RkArqJtKy2CW55WrlwZaN32339/nQWQzcCBA4195/rrr9cZAK6ibSstglsB/v73vxsbqQyOLoCKNW7c2NhvFixYoDMAXETbVnoEtwKsWLHCq1q1qrGh0roB2b300kvGPtOhQwedAeAq2rbSI7gV6JRTTjE2VhkcZQDhevfubewv//rXv3QGgIto28qD4Fagb7/9NtC6HXDAAToLIF29evWM/UWaawDuom0rD4JbJaR/bY8MjjaAoCeffNLYTzp16qQzAFxE21Y+BLdKWL58uVelShVjw6V1A4LS31rwyCOP6AwAF9G2lQ/BrZK6dOlibLwyOOoA/rRq1SqvevXq6/aPWrVqeb///rvOAnANbVt5EdwqaenSpYHW7cADD9RZAGPGjDH2j3/84x86A8BFtG3lRXArAvmSbP9GLIOjD+APxx57rLFvTJkyRWcAuIa2rfwIbkXwn//8x1tvvfWMDZnWDfDWfg+pf79o2LChzgBwEW1b+RHciqRz587GxiyDoxAk3c0332zsE3379tUZAK6hbbMDwa1IFi9eHGjdDjroIJ0FkmnPPfc09onp06frDADX0LbZgeBWRCeddJKxUcvgaARJ9eKLLxr7wj777KMzAFxD22YPglsRLVy4MLBh07ohqf7+978b+8KoUaN0BoBraNvsQXArshNPPNHYuGVwVIKkkQ/s+PeBjTbayPvll190FoBLaNvsQnArsq+//jqwgbdp00ZngWS4+uqrjX2gT58+OgPANbRtdiG4RUC+h9G/kcvg6ARJ0qRJE2P7f/vtt3UGgEto2+xDcIvAggULAhs6rRuS4umnnza2/UMOOURnALiGts0+BLeInHDCCcbGLoOjFCRBx44dje3+/vvv1xkALqFtsxPBLSJffvllYIM/+OCDdRaIp88//9zY5uvWraszAFxD22YngluEjj/+eGOjl8HRCuJsyJAhxvZ+wQUX6AwAl9C22YvgFqEvvvgisOHTuiHOtttuO2N7f//993UGgEto2+xFcIvYX//6V2Pjl8FRC+Jo/PjxxnZ+5JFH6gwAl9C22Y3gFrH58+cHdgA+ZYc4kjbZv51LkAPgHto2uxHcSuC4444zdgIZHL0gTl544QVj+95pp510BoBLaNvsR3Argc8++yywI9C6IU7SD05uuukmnQHgEto2+xHcSuTYY481dgYZHMUgDmbOnGls1/Xq1fN+++03nQXgCto2NxDcSuTTTz8N7BC0boiDU0891diuL7/8cp0B4BLaNjcQ3Ero6KOPNnYKGRzNwGWffPKJsT1Xq1bNW7Zsmc4CcAVtmzsIbiX08ccfB3aMtm3b6izgnvPOO8/Ynvv166czAFxC2+YOgluJHXXUUcbOIYOjGrhoyZIlXtWqVY1ted68eToLwBW0bW4huJXYhx9+GNhBaN3govSvtzrttNN0BoBLaNvcQnArg/SdRAZHN3DJmjVrvM0339zYht955x2dBeAK2jb3ENzK4IMPPgjsKIceeqjOAva7/vrrje33+OOP1xkALqFtcw/BrUzkexz9O4sMjnLgisaNGxvb7osvvqgzAFxB2+YmgluZzJ07N7DD0LrBBfKtCP7tlvdoAm6ibXMTwa2MjjjiCGOnkcHRDmy2atUqr0GDBsY2O2HCBJ0F4AraNncR3MrovffeC+w47dq101nAPoMHDza218MPP1xnALiEts1dBLcyk3/4/DuPDI56YKOvv/46cN62l19+WWcBuIK2zW0EtzKbPXt2YAeidYONevfubWynXbp00RkALqFtcxvBzQKHHXaYsRPJ4OgHNpk1a1ZgG50zZ47OAnAFbZv7CG4W+Pe//x3Ykdq3b6+zQPmddNJJxvZ5zjnn6AwAl9C2uY/gZgkJav6dSQZHQbBB+hF69erVvUWLFuksAFfQtsUDwc0S7777bmCHonWDDeT8gv7t8vLLL9cZAC6hbYsHgptF5EMJ/p1KBkdDKKdx48YZ22PDhg29X3/9VWcBuIK2LT4IbhZ5++23AzuWfHABKJfmzZsb2+Ntt92mMwBcQtsWHwQ3y6S/LCWDoyKUg4Q0/3YoIQ6Ae2jb4oXgZpm33norsIPRuqHU5OVQeVnUvx3Ky6YA3EPbFi8ENwsdcsghxk4mg6MjlJJ8AMG//UkTDMA9tG3xQ3Cz0JtvvhnY0fhOSJSKnOpDTvnh3/54ogfcRNsWPwQ3Sx188MHGziaDfzxRCnJyXf92JyffBeAe2rZ4IrhZasaMGYEdjtYNUZs7d25gu5OvuwLgHtq2eCK4WaxNmzbGTieDoyVESb443r+9yRfLA3APbVt8EdwsNn369MCO16FDB50Fiuu5554ztrWqVat6CxYs0FkALqFtiy+Cm+UOOuggY+eTwVETopB+st3BgwfrDACX0LbFG8HNcq+99lpgB6R1Q7ENGjTI2MYaNWrkrVq1SmcBuIS2Ld4Ibg444IADjJ1QBkdPKJZML8k/9thjOgvAJbRt8Udwc8Crr74a2BGPOOIInQUqJ/3A4LTTTtMZAK6hbYs/gpsj9t9/f2NnlMFRFCpr+PDhxjZVv359b9myZToLwCW0bclAcHPEK6+8Etghad1QGe+9915gm7r//vt1FoBraNuSgeDmkP3228/YKWVwNIVCyYdc/NvSiSeeqDMAXEPblhwEN4e89NJLgR3zyCOP1Fkgd7fccouxHdWoUcP7/PPPdRaAa2jbkoPg5ph9993X2DllcFSFfMyfP9/bcMMNjW3o1ltv1VkArqFtSxaCm2NefPHFwA5K64Z8dOzY0dh+eK8k4DbatmQhuDlon332MXZSGRxdIRf33XdfYNuZM2eOzgJwDW1b8hDcHJRpR6V1Q0WWLFni1a1b19hurr76ap0F4CLatuQhuDmqdevWxs4qg6MsZNO9e3djeznwwAN1BoCLaNuSieDmqOeffz6ww3KkhTCPPvpoYHuZMWOGzgJwEW1bMhHcHNaqVStjp5XB0RbS/fLLL972229vbCcXX3yxzgJwEW1bchHcHPbss88GdlyOuJDu7LPPNraRPfbYQ2cAuIq2LbkIbo5r2bKlsfPK4KgLKVOmTAlsH/IyOwB30bYlG8HNcZn+YebIC+K7777zdtxxR2PbOO+883QWgKto25KN4BYDe+21l7ETy+DoC506dTK2CQlxa9as0VkALqJtA8EtBiZPnhzYkTkCS7Zhw4YFtgnZTgC4jbYNBLeY2HPPPY2dWQZHYcmUKcgPHTpUZwG4irYNguAWE5MmTQrs0ByJJc/ChQu9hg0bGtuBvGQKwH20bRAEtxhp0aKFsVPL4GgsWY466ijj8Zf3tX377bc6C8BVtG1IIbjFyFNPPRXYsTkiS45LLrkk8PhPnTpVZwG4jLYNKQS3mGnevLmxc8vgqCz+HnvsscDjft111+ksAJfRtsGP4BYzTzzxRGAH58gs3ubNm+dtttlmxmP+97//XWcBuI62DX4EtxjafffdjZ1cBkdn8XXooYcaj7U8/vL9pADcR9uGdAS3GJo4cWJgR+cILZ769+8feKxnzJihswBcR9uGdAS3mGrWrJmxs8vgKC1exowZE3iMR40apbMAXEfbhkwIbjE1YcKEwA7PkVp8zJkzx9twww2Nx7dXr146CyAOaNuQCcEtxpo2bWrs9DI4WouH/fbbz3hc9957b50BEAe0bQhDcIuxRx99NLDjc8TmvrPOOst4TKtVq+bNmjVLZwHEAW0bwhDcYm7XXXc1dn4ZHLW566677go8nvfff7/OAogD2jZkQ3CLufHjxweeADhyc9Mbb7wReCzPO+88nQUQF7RtyIbglgBNmjQxngRkcPTmlvnz53vbbbed8RgefPDBOgsgLmjbUBGCWwKMGzcu8ETAEZw7fvjhB69Vq1bG41e7dm3v448/1hUA4oK2DRUhuCXELrvsYjwZyOAozg1HHnlk4LGbNGmSzgKIC9o25ILglhAPPfRQ4AmBIzn7nXrqqYHH7d5779VZAHFC24ZcENwSZOeddzaeFGRwNGevAQMGBB6vq6++WmcBxAltG3JFcEuQsWPHBp4YOKKz0zXXXBN4rM4//3ydBRA3tG3IFcEtYXbaaSfjyUEGR3V2kZdC0x+jbt266SyAuKFtQz4IbgmT6YvJObKzx9NPPx14fOTDCQDii7YN+SC4JVDjxo2NJwkZHN2V35tvvunVrFnTeFxatmzprVy5UlcAiBvaNuSL4JZAo0ePDjxRcIRXXplOsLvtttt68+bN0xUA4oi2DfkiuCVUo0aNjCcLGRzllYecYLd169bGY1GjRo21X3EFIL5o21AIgltCyReTpz9hcKRXHulH3DI4wS4Qf7RtKATBLcF22GEH40lDBkd7pZXpBLv33HOPzgKIK9o2FIrglmCZTjvBEV/pcIJdILlo21AoglvCbb/99saThwyO+qI3YsSIwP3OCXaBZKBtQ2UQ3BJOXpZLfwLhyC9at99+e+A+5wS7QHLQtqEyCG4InIZCBkd/0bjxxhsD9zUn2AWSg7YNlUVwg3f33XcHnkg4Aiy+TC+PcoJdIFlo21BZBDestc022xhPJjI4CiyeoUOHBu7fvffe21u0aJGuABB3tG0oBoIb1rrzzjsDTygcCRbHpZdeGrhvDzzwQG/58uW6AkAS0LahGAhuWGfrrbc2nlRkcDRYORdeeGHgPj300EPXflsCgOSgbUOxENywzh133BF4YuGIsHD9+vUL3J9HHHGEt3r1al0BIClo21AsBDcYGjZsaDy5yOCoMH99+vQJ3I/HHnuszgJIEto2FBPBDYZM5xjjyDA/PXv2DNyHnTp10lkASUPbhmIiuCFgq622Mp5kZHB0mJtM3z3apUsXnQWQNLRtKDaCGwJuvfXWwBMNR4gV+9vf/ha437p3766zAJKItg3FRnBDRltssYXxZCODo8RwHTt2DNxfvXr10lkASUTbhigQ3JDRLbfcEnjC4Ugx6Pfff/eOPvrowH11zjnn6AoASUXbhigQ3BCqQYMGxpOODI4W/7Rq1Srv8MMPD9xH559/vq4AkFS0bYgKwQ2hbrrppsATD0eMf1ixYoV3yCGHBO6fiy66SFcASDLaNkSF4Ias6tevbzz5yEj6UeO///1vr1mzZoH7ZciQIboCQJLRtiFKBDdkdcMNNwSegJJ85DhhwgSvZs2agftk2LBhugJA0tG2IUoEN1SoXr16xpOQjCQePY4cOTJwP8i49tprdQWApKNtQ9QIbqjQ9ddfH3giStoRZO/evQP3QfXq1b3x48frCgCgbUP0CG7ISd26dY0nIxlJOIpcunTp2i+GT//bmzRp4s2cOVNXAQBtG0qD4IacZHqZMO5Hkm+99Za3yy67ZPy7ly9frqsA4A+0bSgFghtyIiearVOnjvGkJCOuR5Pjxo3zqlWrFvh7+/TpoysA4E+0bSgVghtyJm/CT39iiuMR5VVXXRX4O2Vcd911ugIATLRtKBWCG3L222+/eZtttpnx5CQjTkeVPXv2DPx9G2+8sTdx4kRdAQAm2jaUEsENebnmmmsCT1BxOLJctGiR1759+8Dftvvuu3uzZs3SVQAQRNuGUiK4IS9r1qzxNt10U+NJSobLR5fTp0/3GjVqFPibjjvuOO/777/XVQAQRNuGUiO4IW+Z3gPm6hHmgw8+6K233nqBv6dv3766AgDC0bah1AhuyNvq1au9TTbZxHiykuHaUeYVV1wR+Btk3HzzzboCAMLRtqEcCG4oyPDhwwNPWK4cacpJdU8++eTA7ZcPXkyaNElXAUB2tG0oB4IbCvLLL794tWvXNp60ZNh+tPn44497DRs2DNzuvfbay3v//fd1FQBkR9uGciG4oWBDhw4NPHHZfMTZr1+/wO2V0alTJ+/nn3/WVQBQMdo2lAvBDQX76aef1p7jzP/kJcO2o8433njDa926deB2ypD3uQFAPmjbUE4EN1RKpjf423TkmenbHmQ0a9bMe+mll3QVAOSOtg3lRHBDpfz444/eRhttZDyJySj30edXX33lHXvssYHbJeOss85a+y0QAJAv2jaUG8ENlXb55ZcHnsjKeQQ6duzYjF/NJV+S/9BDD+kqAMgfbRvKjeCGSlu5cqVXs2ZN48lMRqmPQn/99VfvzDPPDNwOGfItCNLCAUChaNtgA4IbimLIkCGBJ7RSHolOnTrVa9q0aeA2yBg5cqSuAoDC0bbBBgQ3FIV8p2eNGjWMJzUZpTgazfRSrQz5JOmbb76pqwCgcLRtsAXBDUUzePDgwBNblEekH330kde+ffvAdcro37+/rgKAyqNtgy0Ibiia7777zttwww2NJzcZURyV3n333Rmva+utt/YmTpyoqwCg8mjbYBOCG4rqkksuCTzBFfPI9JNPPsn4PaMy/va3v3nLli3TlQBQHLRtsAnBDUW1fPlyb4MNNjCe5GQU4+g008l+ZVSpUsW77bbbdBUAFA9tG2xDcEPRDRo0KPBEV5kj1AkTJni77bZb4DJlHHzwwd57772nKwGguGjbYBuCG4pOXq6sVq2a8WQnI9+jVPnwwYknnhi4nNTge0YBRIm2DTYiuCESF110UeAJL58j1csuuyzw+6nRuXPnte91A4Ao0bbBRgQ3RGLJkiXe+uuvbzzpyajoaHX8+PFekyZNAr8nQ74Ynk+MAigF2jbYiuCGyFx44YWBJ76wI9b333/fO+GEEwLrZay33nresGHDdCUARI+2DbYiuCEyixcv9qpWrWo8+clIP2rNdOLe1OjSpYs3b948XQkA0aNtg80IbojUBRdcEHgCTB25jhs3zttpp50C8zJatGjhPfXUU2vXAUAp0bbBZgQ3RGrRokVrz7PmfxKUccABBwR+JkPeF3fVVVfpbwNAadG2wXYEN0RuwIABgSfCTOOUU07xvvjiC/0tACg92jbYjuCGyH3zzTfGE2H62GuvvbzJkyfragAoD9o2uIDghpLo379/4AmRwWAwbB60bbARwQ0lsWDBgoxPjAwGg2HroG2DjQhuKJm+fft6derUyfgEyWAwGDYN2jbYiuCGkvnqq68yvoeEwWAwbBu0bbAVwQ0AAMARBDcAAABHENwAAAAcQXADAABwBMENAADAEQQ3AAAARxDcAAAAHEFwAwAAcATBDQAAwBEENwAAAEcQ3AAAABxBcAMAAHAEwQ0AAMARBDcAAABHENwAAAAcQXADAABwBMENAADAEQQ3AAAARxDcAAAAHEFwAwAAcATBDQAAwBEENwAAAEcQ3AAAABxBcAMAAHAEwQ0AAMARBDcAAABHENwAAAAcQXADAABwBMENAADAEQQ3AAAARxDcAAAAHEFwAwAAcATBDQAAwBEENwAAAEcQ3AAAABxBcAMAAHAEwQ0AAMARBDcAAABHENwAAAAcQXADAABwBMENAADAEQQ3AAAARxDcAAAAHEFwAwAAcATBDQAAwBEENwAAAEcQ3AAAABxBcAMAAHAEwQ0AAMARBDcAAABHENwAAAAcQXADAABwBMENAADAEQQ3AAAARxDcAAAAHEFwAwAAcATBDQAAwBEENwAAAEcQ3AAAABxBcAMAAHAEwQ0AAMARBDcAAABHENwAAAAcQXADAABwBMENAADAEQQ3AAAAJ3je/wH1kgzAOEXrfgAAAABJRU5ErkJggg== | In a hexagon, a sector with an arc length of 2π cm is drawn. This sector is then rolled into a cone. What is the base area of this cone in cm²? | A. π; B. 3π; C. 4π; D. 5π; E. No correct answer | A |
423 | iVBORw0KGgoAAAANSUhEUgAAAmsAAAJfCAYAAAAgp5FfAAAAAXNSR0IArs4c6QAAAARnQU1BAACxjwv8YQUAAAAJcEhZcwAAFiUAABYlAUlSJPAAAEVLSURBVHhe7d0J3E3Vv8fxvylDSOZSKVKKKFMlM0VX5S9ElJQQkiH+IVOFSlJKpP6JpERIkuQSSSoNpgYVJYUMJTKrfe/S73DW2WefZzrDWnt/3q/Xet37f9Z6Bs/Z6/Td33Oevf/lAAAAwFiENQAAAIMR1gAAAAxGWAMAADAYYQ0AAMBghDUAAACDEdYAAAAMRlgDAAAwGGENAADAYIQ1AAAAgxHWAAAADEZYAwAAMBhhDQAAwGCENQAAAIMR1gAAAAxGWAMAADAYYQ0AAMBghDUAAACDEdYAAAAMRlgDAAAwGGENAADAYIQ1AAAAgxHWAAAADEZYAwJq+fLlTuvWrZ3TTz/d+de//nV8lC1b1unatauzceNGWQUASDXCGhAwu3btcho3bnwioHmNZ599Vj4DAJBKhDUgQFRQq1atWtRwFm28+uqr8pkAgFQhrAEBol72VCFM/d/58+fLR53jL3s++uijrrCmXiLlJVEASC3CGhAQKpypABarLVu9erX2HjY1Bg4cKLMAgFQgrAEBof54ID0va0Y2bOr9bQCA1CGsAQGg3quW3vefqbWENQAwB2ENgItq4UJhTV3KAwCQOoQ1AC7hYS38DxEAAMlHWAPgEgpq6jIfAIDUIqwB0IT+alT9Vaj669DMUHdHUC+fhjd06uupS4ak971z6nurr6E+T/3RQ7jIuy+E7ryg3m8XTeR69X+5UwMAWxDWAGhCdzfIzAVxVcAKfb4KUOqyHypoqWCkPhYaak20YBX6Q4jIC/eGwpqaD10rLtpQISw8YGZ0PQCYiLAG4IRQqMpsUAs1V9FuVaXmw4OSCmThgU19z9DnRw4V1tRa9TmhViwUAiM/J/TXq6H1oY+p4BhtPS/1AjAdYQ3A8ZcDQw1UKAyFB6m0hAe1WBfRjWy5wl/eDP9+kevU11ShKhTawoV/79BQL3uq9SqkRb7UGR7iQoM/ogBgMsIaEGCh95aFB5fQUAEovQ1b6L1p6nNihTwVtsK/h/q8aFQzF75OfV31s3qJ/LpqxAqNofflhUZ4aAQA0xDWgIAKvbcsrZFWYFPzobWxApISvlYNr7Cmgln4urTCVORLrGn9HEr4+tBLpwBgIsIaEHDqZUIVorzCm2q1Yv3VZKhVUyNW+xWiglTo63oFwYyGNSUr6wlrAExGWANwggpJke/nUkO9VBqNCnHh61TDFQ+ENQA4ibAGQKPecxbZsqkWLJrI937FC2ENAE4irAFwUYFNBbTwQBOtNVOhKHxNrJdLM4KwBgAnEdYARBV6b1loqAAVKTKsRVuTGYQ1ADiJsAYgqsjAlJ6wFu1iuJlBWAOAkwhrADyFB5poL3FGvmdNXcw2HghrAHASYQ2Ap1CY8boeWuT1zdTIyPvW1KU7ol2+g7AGACcR1gBEFX5ZjlgXmY38Q4T0tmuhP2KI9ocLhDUAOImwBiCq8LsNxGrLot2uyutit+FUqPO6iTphDQBOIqwBcAm/dEdawSe8gQsfXn9soNarcKTWeN1AnbAGACcR1oAAUC81hsKXCiYqDHlRQS10FwOvOxdEirzxemio97qpr6HCkxrhd0eI9XJpVsNaen7u8PWENQAmI6wBAaCCUXg4CQUU1WypcKao/6tevgzd6zM9N0MPF+3lUK+hQlvo+0YTGf7S+lki/9AhrfClvnf4ejUAwFQ8QwEBEHmJjVhDhbVYzVssXg1b+FDBK1ZQU9878o8W1P/2eslUBbVo9zNVbVy076Neho0WXlXYjPXePABIFcIaEBAqBKmQEmrOQkMFIdVEqXAT7S8zM0oFHhXIwgNU6OXQWF8/8qVPrxFqzdK7Xo2MrOclUQCmIawBAAAYjLAGAABgMMIaAACAwQhrAAAABiOsAQAAGIywBgAAYDDCGgAAgMEIawAAAAYjrAEAABiMsAYAAGAwwhoAAIDBCGsAAAAGI6wBAAAYjLAGAABgMMIaAACAwQhrAAAABiOsAQAAGIywBgAAYDDCGgAAgMEIawAAAAYjrAEAABiMsAYAAGAwwhoAAIDBCGsAAAAGI6wBAAAYjLAGAABgMMIaAACAwQhrAAAABiOsAQAAGIywBgAAYDDCGgAAgMEIawAAAAYjrAEAABiMsAYAAGAwwhoAAIDBCGsAAAAGI6wBAAAYjLAGAABgMMIaAACAwQhrAAAABiOsAQAAGIywhqT63//9X+df//oXg8FgGD3UcxVgCsIakup//ud/oj4xMhgMhklDPVcBpiCsIWlo1RgMhk2Ddg2mIKwhaWjVGAyGTYN2DaYgrCEpvFq1sWPHygq3J554wjn77LOjfp4anTt3dn755RdZDQBZE+15inYNJiCsISmitWoqiKVHrNCWO3duZ8SIEbISALIm8rmKdg0mIKwh4bxaNRXCMmLMmDFOkSJFon6tcuXKOS+//LKsBIDMoV2DiQhrSLhorVqpUqVkNmP27Nnj9OnTx/X1QqNRo0bO+++/L6sBIONo12AawhoSyqtVGz16tKzInDVr1jgtWrSI+rXV6Nixo7N582ZZDQDpR7sG0xDWkFDRWrUzzjjD+fvvv2VF1rz55ptO9erVXd9DjZw5czoPPvigrASA9KNdg0kIa0gYr1Zt1KhRsiJ+xo0b5xQvXjzq96tataqzePFiWQkAaaNdg0kIa0iYaK1aiRIlnKNHj8qK+Nq3b5/Tr18/1/cMjV69ejmHDx+W1QAQG+0aTEFYQ0J4tWqPPPKIrEic9evXO61bt476/cuWLevMmjVLVgKAN9o1mIKwhoSI1qoVK1Ysqc3W9OnTnXPOOcf1c6jRoUMHZ8eOHbISAKKjXYMJCGuIO69WbeTIkbIief7880+ne/fuUX8edc22F154QVYCgBvtGkxAWEPcRWvVChcu7Bw8eFBWJN+CBQucSpUquX4uNf7973873377rawEAB3tGlKNsIa48mrVhg8fLitS6/7774/68+XIkeP4HRIAIBLtGlKNsIa4itaqFSpUyNm/f7+sSL2VK1c6derUcf2carRs2dL59ddfZSUA/IN2DalEWEPceLVqpl6YVl3vLVu2bK6f98wzz3TmzJkjqwCAdg2pRVhD3ERr1QoWLHj8+mem+vrrr53rrrvO9XOroa7ZBgAhtGtIFcIa4sKrVRs6dKisMJv6S9VoP/9VV13lrF69WlYBCDLaNaQKYQ1xEa1Vy58/v/PHH3/ICvMtXbrUqVChguvfoV4qHT9+vKwCEGS0a0gFwhqyzKtVGzx4sKywx5EjR5xOnTpF/fe0a9fO2bNnj6wEEES0a0gFwhqyLFqrli9fPue3336TFfZ58cUXj/8bIv9d5513nvP222/LKgBBRLuGZCOsIUu8WjV1PTPbbdiwwWnUqFHUf99jjz0mqwAEDe0ako2whiyJ1qrlyZPH2bVrl6yw35AhQ1z/RjXuvPNOWQEgaGjXkEyENWSaV6s2YMAAWeEf77zzjlO2bFnXv7V27drOxo0bZRWAoKBdQzIR1pBp0Vq1XLlyOTt27JAV/rJz506nadOmrn9zsWLFnPnz58sqAEFBu4ZkIawhU7xatfvuu09W+FefPn2i/tu5tygQLLRrSBbCGjIlWqumboa+fft2WeFvzz33nOvfr0aXLl1kBYAgoF1DMhDWkGFerVrfvn1lRTAsW7bs+KU8In8P9erVc3744QdZBcDPaNeQDIQ1ZFi0Vk1d5X/r1q2yIjhUk9ikSRPX76NkyZLH/ygBgP/RriHRCGvIEK9WTb2PK8h69eoV9fcydepUWQHAr2jXkGiENWRItFZNjS1btsiK4JowYULU380TTzwhKwD4Fe0aEomwhnTzatVUq4R/LFmyxDnzzDNdv6OBAwfKCgB+RLuGRCKsId28WrXNmzfLCijffPONU7lyZdfvqXPnzrICgB/RriFRCGtIF69W7Z577pEVCKdut9WwYUPX7+vGG290jh07JqsA+AntGhKFsIZ08WrVuERFbK1bt3b9ztQtqrZt2yYrAPgJ7RoSgbCGNHm1anfffbesQCzdu3d3/e4uuugiZ926dbICgF/QriERCGtIk1erxg3M02/YsGGu31/RokWd9957T1YA8AvaNcQbYQ0xebVq3bp1kxVIr3Hjxrl+j+oWXQsWLJAVAPyAdg3xRlhDTF6t2nfffScrkBHTp093/S7V3R/mz58vKwD4Ae0a4omwBk9erRo3K8+axYsXO4ULF3b9Xt966y1ZAcB2tGuIJ8IaPHm1ahs2bJAVyKwPP/zQKVKkiOt3++abb8oKALajXUO8ENYQlVer1qlTJ1mBrProo4+cYsWKuX7Hc+fOlRUAbEa7hnghrCEqr1btq6++khWIh48//tgpXry46/c8Z84cWQHAZrRriAfCGly8WrWOHTvKCsTTqlWrnJIlS7p+37NmzZIVAGxFu4Z4IKzBxatVW79+vaxAvH366afOGWec4fqdv/7667ICgK1o15BVhDVovFq122+/XVYgUT7//HOnVKlSrt/9jBkzZAUAG9GuIasIa9B4tWpr166VFUik1atXO2eddZbr979w4UJZAcBGtGvICsIaTvBq1W677TZZgWRYs2aNc/bZZ2uPQYECBZxPPvlEVgCwDe0asoKwhhO8WjXV9iC51E3eS5QooT0OpUuXdr7//ntZAcA2tGvILMIajvNq1W655RZZgWRbvny5c8opp2iPx6WXXurs3r1bVgCwCe0aMouwhuO8WjX1pnekjrpAbuRjUr9+fefvv/+WFQBsQruGzCCswbNVa9u2raxAKk2ePNn12Nx4440yC8AmtGvIDMIaPFs1dbFWmOGJJ55wPT533nmnzAKwCe0aMoqwFnBerVqbNm1kBUwxZMgQ1+PUr18/mQVgC9o1ZBRhLeC8WjV1z0qYp0ePHq7HauTIkTILwBa0a8gIwlqAebVqN910k6yAidq1a+d6zKZOnSqzAGxAu4aMIKwFmFertnLlSlkBU0U+dtmzZ+dxAyxDu4b0IqwFlFer1rJlS1kBkx04cMCpWrWq9tiVK1fO2blzp6wAYDraNaQXYS2gvFq1FStWyAqYbv369c5pp52mPX7XXnutzAKwAe0a0oOwFkBerVrz5s1lBWwR7aK56o8QANiBdg3pQVgLIK9WTd3eCPZ5/PHHXY/l2LFjZRaA6WjXkBbCWsB4tWrNmjWTFbBRt27dXI/pW2+9JbMATEa7hrQQ1gLGq1VbtmyZrICtrrnmGu0xLVKkiPPNN9/ILACT0a4hFsJagHi1atdff72sgM22b9/ulClTRntsa9So4Rw7dkxWADAV7RpiIawFiFertmTJElkB233wwQeux5cb8gN2oF2DF8JaQHi1ak2bNpUV8IvJkye7Hucnn3xSZgGYinYNXghrAeHVqvFE4E+DBw92PdYffvihzAIwFe0aoiGsBYBXq8YFVP0t8km/cuXKvH8NMBztGqIhrAWAV6v27rvvygr40ebNm52iRYtqj3mnTp1kFoCpaNcQibDmc16tWuPGjWUF/GzmzJmux/65556TWQAmol1DJMKaz3m1au+8846sgN/169dPe+xz5MjhrF69WmYBmIh2DeEIaz7m1ao1atRIViAo6tatqx0DV155pcwAMBHtGsIR1nzMq1V7++23ZQWC4quvvnLy5s2rHQc9e/aUWQAmol1DCGHNp7xatQYNGsgKBE20669NmzZNZgGYhnYNIYQ1n/Jq1ebNmycrEESRN3wvUKCA89NPP8ksANPQrkEhrPmQV6tWr149WYEgq169unZctGrVSmYAmIZ2DQphzYe8WrW5c+fKCgTZqlWrXMfGCy+8ILMATEO7BsKaz3i1anXq1JEVgOOMHDlSOz4KFSrk/PLLLzILwCS0ayCs+YxXqzZnzhxZAfxDBfjwY6RNmzYyA8A0tGvBRljzEa9WrVatWrICOOmTTz5xHSvqL0YBmId2LdgIaz7i1arNmjVLVgC6hx56SDtWihQp4mzfvl1mAZiEdi24CGs+4dWqcaV6pKVmzZraMdOuXTuZAWAS2rXgIqz5hFerpm7kDcSycuVK13EzdepUmQVgEtq1YCKs+YBXq3b55ZfLCiC2oUOHasdO8eLFnZ07d8osAFPQrgUTYc0HvFq11157TVYAaVPhPvz4ad++vcwAMAntWvAQ1izn1aqpq9QDGfHBBx+4jqMFCxbILABT0K4FD2HNcl6t2iuvvCIrgPQbNGiQdhwR+gEz0a4FC2HNYl6tWtWqVWUFkDF///23U6ZMGe14euKJJ2QWgClo14KFsGYxr1bt5ZdflhVAxqnjJ/x4yp8/P9deAwxEuxYchDVLebVql112mawAMi/yPwKdO3eWGQCmoF0LDsKapbxatZdeeklWAJn36aefuo6tpUuXyiwAU9CuBQNhzUJerVrlypVlBZB19957r3Z8qRu/AzAL7VowENYs5NWqcRNuxNP+/fudM844QzvGnn32WZkFYAraNf8jrFnGq1WrWLGirADi5/nnn9eOs2LFijl//PGHzAIwAe2a/xHWLOPVqk2aNElWAPFVv3597Vjr2bOnzAAwBe2avxHWLOLVql188cWyAoi/5cuXu465tWvXyiwAE9Cu+RthzSJerZp6qQpIpG7dumnHXLt27WQGgClo1/yLsGYJr1atfPnysgJInK1btzo5cuTQjr0PP/xQZgGYgHbNvwhrlvBq1SZOnCgrgMQaOHCgduw1a9ZMZgCYgnbNnwhrFvBq1S644AJZASTe3r17ndNOO007Bt99912ZBWAC2jV/IqxZwKtVmzBhgqwAkmPkyJHaMdiwYUOZAWAK2jX/IawZzqtVO//882UFkDx//fWXU6pUKe1YnD17tswCMAHtmv8Q1gzn1ao988wzsgJIrqeeeko7Fi+//HKZAWAK2jV/IawZzKtVO++882QFkBoXXnihdky+9NJLMgPABLRr/kJYM5hXq/b000/LCiA11B0zwo/JChUqyAwAU9Cu+QdhzVBerVrp0qVlBZBaVatW1Y7N8ePHywwAE9Cu+QdhzVBerdqTTz4pK4DUmjFjhnZscikZwDy0a/5AWDOQV6t29tlnywrADHXq1NGOUd67BpiFds0fCGsG8mrVxowZIysAM7z22mvaMcpfhgLmoV2zH2HNMF6tmrq2FWCiSy65RDtW582bJzMATEC7Zj/CmmG8WrXRo0fLCsAs6v604cdq48aNZQaAKWjX7EZYM4hXq3bGGWccv3I8YCr1fsrwY3b58uUyA8AEtGt2I6wZxKtVGzVqlKwAzPToo49qx2ybNm1kBoApaNfsRVgzhFerVqJECefo0aOyCjDTn3/+6RQoUEA7dtetWyezAExAu2YvwpohvFq1Rx55RFYAZuvfv7927N51110yA8AUtGt2IqwZwKtVK1q0qHP48GFZBZjt559/dh3DW7ZskVkAJqBdsxNhzQBerdrIkSNlBWAH1aaFH8OqbQNgFto1+xDWUsyrVStcuLBz4MABWQXYYf369dpxfPrpp/OXzIBhaNfsQ1hLMa9W7aGHHpIVgF1at26tHcsvvPCCzAAwBe2aXQhrKeTVqhUqVOj4X9cBNlqwYIF2PKv7hwIwC+2aXQhrKeTVqj3wwAOyArDTxRdfrB3Tn3zyicwAMAXtmj0Iayni1aoVLFjQ2bt3r6wC7KQu5Bx+XHfr1k1mAJiCds0ehLUU8WrVhg4dKisAe+3YsUM7rvPly8cfzAAGol2zA2EtBbxatfz58zt79uyRVYDd2rdvrx3f48ePlxkApqBdswNhLQW8WrXBgwfLCsB+S5Ys0Y7vGjVqyAwAk9CumY+wlmRerVrevHmd3377TVYB/nDZZZdpx/ny5ctlBoApaNfMR1hLMq9W7f7775cVgH+MHTtWO847duwoMwBMQrtmNsJaEnm1arlz53Z27twpqwD/+OOPP5xcuXKdONZz5Mjh/P777zILwBS0a2YjrCWRV6vG/RPhZ506ddKO96eeekpmAJiEds1chLUk8WrVVOvw66+/yirAf1asWKEd87Vr15YZACahXTMXYS1JvFq1//znP7IC8K+KFStqx/23334rMwBMQrtmJsJaEni1aur9O9u2bZNVgH+pW6iFH/sjRoyQGQAmoV0zE2EtCbxatb59+8oKwN++/PJL7dhXl/QAYCbaNfMQ1hLMq1XLli2b88svv8gqwP+uuOIKbQ989tlnMgPAJLRr5iGsJZhXq9anTx9ZAQTD448/ru2BAQMGyAwA09CumYWwlkBerZoaW7ZskVVAMGzevFnbA+eff77MADAN7ZpZCGsJ5NWq9erVS1YAwXL11Vdre2HZsmUyA8A0tGvmIKwlSKxWTTUMQBBNnDhR2ws9evSQGQCmoV0zB2EtQbxatXvuuUdWAMGze/dubT+ULFlSZgCYiHbNDIS1BIjVqm3atElWAcHUvHlzbU/Mnz9fZgCYhnbNDIS1BPBq1bp37y4rgOCaNm2ati+6dOkiMwBMRLuWeoS1OIvVqn3//feyCgiuAwcOONmzZz+xL8455xyZAWAi2rXUI6zFmVer1rVrV1kBIHKfrFq1SmYAmIh2LbUIa3EUq1XjxtXASU8//bS2Px588EGZAWAi2rXUIqzFkVerxntyAN13332n7ZGaNWvKDABT0a6lDmEtTmK1at98842sAhBSuXJlbZ9s3bpVZgCYiHYtdQhrceLVqnXq1ElWAAjXv39/ba9MmjRJZgCYinYtNQhrcRCrVfvqq69kFYBwS5cu1fZKq1atZAaAqWjXUoOwFgderVrHjh1lBYBoihYtemK/5M+fXz4KwGS0a8lHWMuiWK3aunXrZBWAaG655RZtzyxcuFBmAJiKdi35CGtZ5NWqdejQQVYA8BJ5N4NevXrJDACT0a4lF2EtC2K1amvWrJFVALxE3ti9fPnyMgPAZLRryUVYywKvVq19+/ayAkBa6tevr+2fTZs2yQwAk9GuJQ9hLZNitWpffPGFrAKQlmHDhmn7Z8qUKTIDwGS0a8lDWMskr1ZNvWEaQPpFPuFzbULAHrRryUFYy4RYrdpnn30mqwCkx+HDh51s2bKd2EMXXXSRzAAwHe1achDWMsGrVWvbtq2sAJARderU0fbSzz//LDMATEe7lniEtQyK1aqtWrVKVgHIiIEDB2p76dVXX5UZAKajXUs8wloGebVqbdq0kRUAMurtt9/W9lP37t1lBoANaNcSi7CWAbFatY8//lhWAcioffv2afupUqVKMgPABrRriUVYywCvVu2mm26SFQAy64orrtD21Y4dO2QGgA1o1xKHsJZOsVq1Dz/8UFYByKy+fftq+2rWrFkyA8AGtGuJQ1hLJ69WrUWLFrICQFbMnTtX21u9e/eWGQC2oF1LDMJaOsRq1T744ANZBSArIu8TWq1aNZkBYAvatcQgrKWDV6vWvHlzWQEgHqpUqaLtsSNHjsgMAFvQrsUfYS0NsVq1999/X1YBiIeOHTtqe4y/sgbsQ7sWf4S1NHi1as2aNZMVAOJl3Lhx2j6bOHGizACwCe1afBHWYojVqi1dulRWAYgX9R7Q8H121113yQwAm9CuxRdhLQavVu3666+XFQDiaf/+/dpeU9deA2An2rX4Iax5iNWqLVmyRFYBiLcKFSqc2Gu5c+eWjwKwDe1a/BDWPHi1ak2bNpUVABKhXbt22p5bs2aNzACwDe1afBDWoojVqi1atEhWAUiE0aNHa3tuypQpMgPANrRr8UFYi8KrVWvSpImsAJAokU/uvXr1khkANqJdyzrCWoRYrdrChQtlFYBE2bVrl7bv6tWrJzMAbES7lnWEtQherdo111wjKwAkWtmyZU/svdNOO00+CsBWtGtZQ1gLE6tVW7BggawCkGgtWrTQ9t+GDRtkBoCNaNeyhrAWxqtVa9SokawAkAzDhw/X9uAbb7whMwBsRbuWeYQ1EatVmz9/vqwCkAyvvfaatgfVX4gCsBvtWuYR1oRXq9agQQNZASBZPvvsM20fdunSRWYA2Ix2LXMIa/8vVqs2b948WQUgWfbu3avtw4YNG8oMAJvRrmUOYe3/ebVqXDIASJ0zzzzzxF4sXbq0fBSA7WjXMi7wYS1WqzZ37lxZBSDZ6tSpo+3HgwcPygwAm9GuZVzgw5pXq6b+QwEgdTp27KjtybVr18oMANvRrmVMoMNarFZt9uzZsgpAKjz88MPsScCnaNcyJtBhzatVu/TSS2UFgFSZOXOmti9HjRolMwD8gHYt/QIb1mK1amqsXLlSVgJIhdWrV2t7slOnTjIDwA9o19IvsGHNq1ULjauvvlpWAkiFP//8U9uT9evXlxkAfkG7lj6BDGtptWqh8eKLL8pnAEiFs84668R+VP8/AH+hXUufQIY1r1bt3HPP1f73Oeec4xw+fFg+C0CyqWsdhu/JQ4cOyQwAv6BdS1vgwlqsVm369OlOzZo1tY/1799fPhNAsrVt21bbjz/++KPMAPAL2rW0BS6sebVq1atXPz4fedDkzJnT2bFjx/E5AMnVp08fbT9+9NFHMgPAT2jXYgtUWIvVqr3yyiuyynE6dOigzd1///0ykzyvvvqqU7ZsWefRRx+VjwDBoy7XEb4X33jjDZkB4Ce0a7EFKqx5tWpVq1aVFf/4/PPPtfkCBQo4+/btk9nECoW00PcmrCHIpk6dqu3FCRMmyAwAv6Fd8xaYsBarVVP/QYjUunVrbc2IESNkJjEiQ1poENYQZIsWLdL2w9ChQ2UGgN/QrnkLTFjzatW87lawYsUKbV3x4sWdY8eOyWz8qAt/VqtW7Xg47Nq1q/Y91SCsIcjWrVun7YcuXbrIDAA/ol2LLhBhLVarNmXKFFnldv3112trJ02aJDPxs2vXruMjRIWz8O9JWEOQ7dy5U9sPzZo1kxkAfkS7Fl0gwppXq1apUiVZEd3ChQu19Q0bNpSZxFm+fLn2PQlrCLpcuXKd2A+XX365fBSAX9Guufk+rMVq1dJzh4ILLrhA+5yvv/5aZhKDsAbo1MWpQ/tB/f8A/I12zc33Yc2rVatYsaKsiG3YsGHa5w0ePFhmEoOwBuhq1KhxYj+ccsop8lEAfka7pvN1WIvVqr3wwguyKrbvvvtO+7wyZcrITGIQ1gDdDTfcoO2J3bt3ywwAv6Jd0/k6rHm1ahdffLGsSJ/GjRtrn//+++/LTPwR1gBd586dtT2xfv16mQHgZ7RrJ/k2rMVq1Z5//nlZlT6qhQv//ETe0YCwBujU/XnD98SHH34oMwD8jHbtJN+GNa9WrXz58rIi/bZs2aJ9jdB9RBOBsAbohg8fru2Jd999V2YA+B3t2j98GdZitWoTJ06UVRmjLlwb/nV+/vlnmYkvwhqge/LJJ7U9MXv2bJkB4He0a//wZVjzatXKlSsnKzJu4MCB2tdKxAVyFcIaoFNvWwjfEy+99JLMAAgC2jUfhrVYrdr48eNlVcYtXbpU+1o333yzzMQXYQ3Qqfvmhu+JrOxjAPahXfNhWPNq1dRN0rPq1FNPPfH1LrzwQvlofBHWAN28efO0PTFq1CiZARAUQW/XfBXWYrVq48aNk1WZV7t2be1r7tmzR2bih7AG6N577z1tTwwZMkRmAARF0Ns1X4U1r1btvPPOkxVZc88992hfd8mSJTITP4Q1QLdq1SptT/Tp00dmAARJkNs134S1WK3aU089JauyZvLkydrXHT16tMzED2EN0Kn78YbvCXWRXADBE+R2zTdhzatVK126tKzIujVr1mhfu127djITP4Q1QBd5ncO2bdvKDICgCWq75ouwFqtVU9doiqdcuXKd+NrqBtPxRlgDdL///ru2J9S9QgEEU1DbNV+ENa9W7eyzz5YV8aNu5B76+meeeaZ8NH4Ia4Du6NGj2p5o2LChzAAIoiC2a9aHtVit2pgxY2RV/NSpU0f7Huo/JPFEWAPcTjnllBN7ombNmvJRAEEUxHbN+rDm1aqVKlXK+fvvv2VV/Kj3qYV/n02bNslMfBDWADfCGoBwQWvXrA5rsVq1xx57TFbFV//+/bXvs2zZMpmJD8Ia4Bb+XlHCGoCgtWtWhzWvVq1kyZLOsWPHZFV8qYvrhn+v1157TWbig7AGuIWHtauuuko+CiDIgtSuWRvWYrVqiQw46gbu4d9rypQpMhMfhDXAjbAGIFKQ2jVrw5pXq1a8eHHnyJEjsir+pk2bpn2/5557Tmbig7AGuOXMmfPEniCsAQgJSrtmZViL1ao9/PDDsioxZs2apX2/eN0dIWT+/Pna12/durXMAMEVHtZq1aolHwUQdEFp16wMa16tWtGiRZ1Dhw7JqsSIDFOjRo2SmazZtWvX8a9drVo17eur8eyzzzobN26UlUDwENYAeAlCu2ZdWIvVqo0YMUJWJU7k93/wwQdlJvPCv15aQ71MCgRNjhw5TuwBwhqAcEFo16wLa16tWuHChZ0DBw7IqsR56623tO8br2YNgLfwsFa7dm35KAD8w+/tmlVhLVar9tBDD8mqxHr11Ve17zthwgSZAZAohDUAsfi9XbMqrHm1aoUKFXL+/PNPWZVY6q8/w7/3yy+/LDMAEiV79uwn9hxhDUA0fm7XrAlrsVq1YcOGyarEe/zxx7XvPXfuXJkBkCjhYU3dnxcAIvm5XbMmrHm1agUKFHD++OMPWZV4KhiGf/8lS5bIDIBEOHjwoLbnrrnmGpkBAJ1f2zUrwlqsVm3IkCGyKjk6d+6sff/Vq1fLDIBE2Llzp7bnWrRoITMAoPNru2ZFWPNq1U499VTn999/l1XJcfXVV2s/w969e2UGQCJs2rRJ23O33XabzACAmx/bNePD2qJFi7RfevgYNGiQrEqeMmXKnPj+JUqUkI8CSJQ1a9Zo+/7uu++WGQBwe+yxx7TnDDVUlrCZtc1a3rx5nd27d8uK5Pjrr7+0n+HKK6+UGQCJsmLFCm3f9e/fX2YAwI1mLUWivQbdtm1bmU2e77//XvsZ2rVrJzMAEuWdd97R9l0y7lQCwE68Zy3F1H0/w3/5F1xwgcwkz+zZs7WfYfDgwTIDIFFef/11bd+NHTtWZgBA58dWTbEmrD388MPaA6BGstOyevkl/Pu/8cYbMgMgUV588UVt302aNElmAOAkv7ZqijVhTYls1y6++GKZSY769etr33/r1q0yAyBRnn76aW3fzZw5U2YA4CS/tmqKVWFt5MiR2gOhRjJTs7pUSOj7nn/++fJRAIkUue8XLFggMwDwDz+3aopVYU0pUqSI9mAkq137/PPPte+bij9wAIJo4MCB2t774IMPZAYA/uHnVk2xLqypvwQLf0DUSEZ6jrwnKG9yBpKjR48e2t7jriEAwvm9VVOsC2tKZLtWoUIFmUmchg0bat+T/2AAydG+fXtt723cuFFmAMD/rZpiZVgbPny49sCokcgUvWvXLu17XXjhhTIDINEib/G2f/9+mQEQdEFo1RQrw5pSuHBh7cFJZLs2ZcoU7Xv16dNHZgAkWsWKFU/svUKFCslHASAYrZpibVh76KGHtAdIjUSl6Ztuuikp3weAW/jbHi666CL5KICgC0qrplgb1pTIdk2dgcfb3r17nZw5c574HupabwCS49ChQ9oeb9CggcwACLqgtGqK1WHtgQce0B4oNeKdqiMvyHnnnXfKDIBE++GHH7T9xyVzAChBatUUq8Oakuh2rVq1atrXX758ucwASLSVK1dq++/ee++VGQBBFqRWTbE+rA0bNkx7wNSIV7p+//33ta9bvXp1mQGQDLNnz9b24OjRo2UGQFAFrVVTrA9ryumnn649aJdcconMZE3Hjh21r6teEgWQPM8884y2B6dNmyYzAIIqaK2a4ouwNnToUO2BUyOrKTvyvTK5cuU6/scGAJJn0KBB2j5csmSJzAAIoiC2aoovwpoS73Yt8hY3Xbp0kRkAyaL+oCd8H3799dcyAyCIgtiqKb4Ja0OGDNEeQDUym7YjWzU1NmzYILMAkqVp06baPtyzZ4/MAAiaoLZqim/CmqKubh7+IGa2XaNVA8xQpUqVE/swX7588lEAQRTUVk3xVVgbPHiw9kCqkdHU/f3337u+Bq0akBrhb2/gnrxAcAW5VVN8FdaUyHatUqVKMpM+rVu31j6fVg1Ije3bt2t78brrrpMZAEET5FZN8V1Yu//++7UHVI30pu/XX3/d9bm0akBqqAtQh+/F3r17ywyAIAl6q6b4Lqwpp512mvagprddK1++vPZ56mbxAFJj0qRJ2n4cP368zAAIkqC3aoovw9rAgQO1B1aNtFJ45PWcMvryKYD4GjBggLYnFy1aJDMAgoJW7R++DGtKZLtWuXJlmXGLvK2UGvPmzZNZAKnQsmVLbU/++OOPMgMgKGjV/uHbsBZ5Vq5GtDR++PBhp0KFCtq69u3byyyAVFEnWKE9mSdPHvkogKCgVTvJt2FNKViwoPYgR2vX7rjjDm1NyZIlna1bt8osgFRR11UL7ct43e8XgD1o1U7ydVjr37+/9kCrEZ7KJ06c6JqfM2eOzAJIlc2bN2v78sYbb5QZAEFAq6bzdVhTItu1Sy+99PjHP/roIyd79uzanAp3AFIv8on6vvvukxkAQUCrpvN9WFNP8uEPuBrTpk1zzj33XO1j9evXl88AkGoTJkzQ9ud///tfmQHgd7Rqbr4Pa0qBAgW0B/3UU091/e9vvvlGVgNItT59+mh7dNmyZTIDwO9o1dwCEdb69eunPfCRg8t0AGZRt5YK36Pbtm2TGQB+RqsWXSDCmhLZroXGc889JysAmKJUqVIn9miJEiXkowD8jlYtusCEtb59+2oHgBodOnSQWQCm2LJli7ZPmzRpIjMA/IxWzVtgwpqSP39+7SC47LLLZAaAKdTbEsL3qbrANQD/o1XzFqiwdu+992oHghqkdsAsDz74oLZHZ8yYITMA/IpWLbZAhTUlsl2rUqWKzAAwQfPmzbU9+t1338kMAL+iVYstcGEt8pIAapDeAXOEXwOxcOHC8lEAfkWrlrbAhTUl8jprtGuAGbZv367tzYYNG8oMAL+iVUtbIMNa7969tQNDDVI8kHoLFizQ9qW6RiIA/6JVS59AhjUlsl2rWrWqzABIlZEjR2r78pVXXpEZAH5Eq5Y+gQ1rPXv21A4QNUjzQGq1atVK25Nff/21zADwG1q19AtsWFPy5cunHSS0a0BqnX/++Sf2Y8GCBeWjAPyIVi39Ah3W7rnnHu1AUYNUD6TG7t27tb1Yt25dmQHgN7RqGRPosKZEtmvVqlWTGQDJFHnngl69eskMAL+hVcuYwIe1Hj16aAeMGqR7IPn+85//aPtw5syZMgPAT2jVMi7wYU3JmzevdtDQrgHJd+WVV2r7UF1zDYD/0KplHGHt/919993agaMGKR9Inn379mn7r1KlSjIDwE9o1TKHsCYi27Xq1avLDIBEe/vtt7X91717d5kB4Ce0aplDWBPqPw7hB5AapH0gOQYMGKDtvenTp8sMAL+gVcs8wloY2jUgNWrVqqXtvV9++UVmAPgFrVrmEdbCdO3aVTuQ1CD1A4l14MABbc9VqFBBZgD4Ba1a1hDWIuTJk0c7mGrUqCEzABJh4cKF2p676667ZAaAX9CqZQ1hLYL6D0X4AaUG6R9InEGDBmn7bdq0aTIDwA9o1bKOsBYF7RqQPOq2UuH77aeffpIZAH5Aq5Z1hLUounTpoh1YanAWAMTf4cOHnezZs5/YZ+XLl5cZAH5AqxYfhLUo/vrrLyd37tzawXX55ZfLLIB4WbRokbbPOnXqJDMA/IBWLT4Iax46d+6sHWBqcDYAxFfv3r21PTZ16lSZAWA7WrX4Iax5OHr0KO0akGDqZc/wPbZr1y6ZAWA7WrX4IazFcOedd2oHmhqcFQDxsX79em1v1a9fX2YA2I5WLb4IazEcOXLEOeWUU7SDjXYNiI9Ro0Zpe0v9bwD+QKsWX4S1NHTs2FE74NTg7ADIOtWkhe+rdevWyQwAm9GqxR9hLQ2HDh1ytWtXXHGFzALIjN27d2t7ikt2AP5BqxZ/hLV0uOOOO7QDTw3OEoDMe/nll7X9pP4qFID9aNUSg7CWDupG07ly5dIOPto1IPPatWun7ad3331XZgDYjFYtMQhr6XT77bdrB6AanC0AmVO4cOET+6hgwYLyUQA2o1VLHMJaOu3fv9/Vrl155ZUyCyC9Fi9erO2jNm3ayAwAm9GqJQ5hLQM6dOigHYhqcNYAZEzfvn21PTRlyhSZAWArWrXEIqxlwL59+5ycOXNqByPtGpAxFSpU0PbQjh07ZAaArWjVEouwlkHt27fXDkg1OHsA0ufTTz/V9k6dOnVkBoCtaNUSj7CWQXv37nW1azVr1pRZALH0799f2ztjxoyRGQC2olVLPMJaJtx6663agakGZxFA2sqWLavtmy1btsgMABvRqiUHYS0T9uzZ4+TIkUM7OGnXgNjee+89bc80btxYZgDYilYtOQhrmXTLLbdoB6ganE0A3rp166btl//+978yA8BGtGrJQ1jLpN9++83Vrl111VUyCyBSsWLFtP2iGmoA9qJVSx7CWhZE3jJHDc4qALe5c+dq+6Rly5YyA8BGtGrJRVjLgt27dzvZs2fXDlbaNcAt8m0Dr732mswAsBGtWnIR1rKobdu22gGrBmcXwEmHDh1ycufOfWJ/FChQwPn7779lFoBtaNWSj7CWRTt37nS1a7Vq1ZJZAFOnTtX2xx133CEzAGxEq5Z8hLU4UDeiDj9w1eAsA/jHDTfcoO2NBQsWyAwA29CqpQZhLQ5+/fVXJ1u2bNrBS7sGOMfv+xm+L0qVKiUzAGxEq5YahLU4ad26tXYAq8HZBoLuqaee0vZEr169ZAaAbWjVUoewFifbt293tWu1a9eWWSCYLrvsMm1PrFixQmYA2IZWLXUIa3F00003aQeyGpx1IKgWL16s7YXLL79cZgDYhlYttQhrcbR161bXwUy7hqC69dZbtb0wYcIEmQFgG1q11CKsxVmrVq20A1oNzj4QNOqPbsL3wKmnnuocPHhQZgHYhFYt9Qhrcfbzzz+7Duo6derILBAMjzzyiLYHunfvLjMAbEOrlnqEtQRQ9z0MP7DV4CwEQVK+fHnt+P/0009lBoBNaNXMQFhLgC1btrgObto1BMVbb72lHfv16tWTGQC2oVUzA2EtQW688UbtAFeDsxEEQYsWLbTjfvLkyTIDwCa0auYgrCXI5s2bXQd53bp1ZRbwpx9++EE75osWLSozAGxDq2YOwloCNW/eXDvQ1eCsBH42dOhQ7Xjv16+fzACwCa2aWQhrCfTjjz+6DnbaNfhZ6dKlteP9yy+/lBkANqFVMwthLcH+/e9/awe8GpydwI9mzJihHefXXnutzACwCa2aeQhrCbZp0ybXQc9fx8GPVGscfpyr8AbAPrRq5iGsJUGzZs20A18NzlLgJ4sWLdKO73LlyskMAJvQqpmJsJYE33//vevgp12Dn0SekIwdO1ZmANiEVs1MhLUkueGGG7QNoAZnK/CDVatWacd1sWLFnGPHjsksAFvQqpmLsJYk3333nWsT0K7BD2677TbtuH7ggQdkBoBNaNXMRVhLouuuu07bCGpw1gKbffvtt9rxnCtXLmfXrl0yC8AWtGpmI6wl0YYNG1yboX79+jIL2Kdnz57a8dy7d2+ZAWATWjWzEdaSrGnTptqGUIOzF9hox44dTo4cObRjeePGjTILwBa0auYjrCXZ119/7doUtGuwUeStpW6//XaZAWATWjXzEdZSIHJjqMFZDGxy5MgRp0iRItox/Nlnn8ksAFvQqtmBsJYCX331lWtzNGjQQGYB840ZM0Y7fps3by4zAGxCq2YHwlqKqPsmhm8QNTibgS3Kli2rHbuLFy+WGQC2oFWzB2EtRdavX+/aJLRrsIG6O0H4cct7LgE70arZg7CWQk2aNNE2ihqc1cBkhw4dckqUKKEds7NmzZJZALagVbMLYS2F1q5d69osDRs2lFnAPIMHD9aO12uuuUZmANiEVs0uhLUUU/+xC98wanB2AxP9/PPPruuqLV26VGYB2IJWzT6EtRRbs2aNa9PQrsFE3bp1047Ttm3bygwAm9Cq2YewZoCrr75a2zhqcJYDk6xevdp1jK5bt05mAdiCVs1OhDUDfPHFF67N06hRI5kFUu+mm27Sjs8ePXrIDACb0KrZibBmCBXOwjeQGpztwASRZ+K5c+d2tm3bJrMAbEGrZi/CmiE+//xz1yaiXYMJ1PX/wo/LBx54QGYA2IRWzV6ENYOoPywI30hqcNaDVJo+fbp2PJYqVco5evSozAKwBa2a3QhrBvn0009dm0n98QGQKpUqVdKOx2eeeUZmANiEVs1uhDXDRL7kpAZnP0gFFczCj0MV3ADYh1bNfoQ1w3zyySeuTUW7hmRTL3WqlzzDj0P1kigA+9Cq2Y+wZqB69eppG0sNzoKQTOqPCMKPP9X4ArAPrZo/ENYM9PHHH7s2F/dgRLKoy3Koy3OEH388uQN2olXzB8KaoerWrattMDX4DyaSQV3wNvy4UxfEBWAfWjX/IKwZauXKla5NRruGRFu/fr3ruFO3mgJgH1o1/yCsGaxOnTraRlODsyIkkro5e/jxpm7eDsA+tGr+Qlgz2IoVK1ybrXHjxjILxNfChQu1Yy1HjhzOli1bZBaATWjV/IWwZrjatWtrG04Nzo6QCJEXwB08eLDMALAJrZr/ENYM98EHH7g2He0a4m3gwIHaMVamTBnn0KFDMgvAJrRq/kNYs8BVV12lbTw1OEtCvER7uf3111+XWQA2oVXzJ8KaBd5//33X5mvSpInMAlkTeTJw++23ywwA29Cq+RNhzRI1a9bUNqAanC0hq0aOHKkdU8WLF3d27dolswBsQqvmX4Q1Syxbtsy1CWnXkBVr1651HVOTJ0+WWQC2oVXzL8KaRa688kptI6rBWRMyS/2hSvix1KpVK5kBYBtaNX8jrFnkvffec23Ga6+9VmaB9Hv66ae14yhv3rzODz/8ILMAbEOr5m+ENctcccUV2oZUg7MnZMSmTZucPHnyaMfQuHHjZBaAbWjV/I+wZpnFixe7NiXtGjKiRYsW2vHDex8Bu9Gq+R9hzUKXX365tjHV4CwK6fHiiy+6jp1169bJLADb0KoFA2HNQtE2J+0a0rJjxw6naNGi2nHzyCOPyCwAG9GqBQNhzVLVq1fXNqganE0hlg4dOmjHS61atWQGgI1o1YKDsGapd99917VJOaOCl5kzZ7qOl5UrV8osABvRqgUHYc1i1apV0zaqGpxVIdLBgwedc889VztO7r//fpkFYCNatWAhrFnsnXfecW1WzqwQ6e6779aOkUsvvVRmANiKVi1YCGuWq1q1qrZh1eDsCiELFixwHR/qJXQA9qJVCx7CmuWi/ceYMywov//+u3P++edrx0bPnj1lFoCtaNWCh7DmA1WqVNE2rhqcZaFly5baMaGC25EjR2QWgI1o1YKJsOYD8+fPd21ezrSCbcSIEa5jQh0nAOxGqxZMhDWfuOyyy7QNrAZnW8EULbwPHz5cZgHYilYtuAhrPjFv3jzXJuaMK3i2bt3qlCpVSjsO1MuhAOxHqxZchDUfqVy5sraR1eCsK1iaNm2qPf7qfWq//fabzAKwFa1asBHWfOTNN990bWbOvIJj0KBBrsd/yZIlMgvAZrRqwUZY85lKlSppG1oNzr787/XXX3c97o8//rjMArAZrRoIaz7zxhtvuDY1Z2D+tnHjRuf000/XHvNbb71VZgHYjlYNhDUfuuSSS7SNrQZnYf7VoEED7bFWj7+6HygA+9GqQSGs+dCcOXNcm5szMX/q06eP67FeuXKlzAKwHa0aFMKaT1WsWFHb4GpwNuYvU6dOdT3GEyZMkFkAtqNVQwhhzadmzZrl2uSckfnHunXrnDx58miPb+fOnWUWgB/QqiGEsOZjFSpU0Da6GpyV+cOVV16pPa41atSQGQB+QKuGcIQ1H5s5c6Zrs3NmZr+uXbtqj2muXLmc1atXyywAP6BVQzjCms9ddNFF2oZXg7Mzez333HOux3Py5MkyC8APaNUQibDmczNmzHBtes7Q7PTRRx+5HsuePXvKLAC/oFVDJMJaAJQvX17b+GpwlmaXTZs2OaVLl9Yew7p168osAL+gVUM0hLUAmD59umvzc6Zmj3379jnVqlXTHr+CBQs6GzZskBUA/IJWDdEQ1gLiwgsv1J4A1OBszQ7XXnut67GbN2+ezALwC1o1eCGsBcQrr7ziehLgjM18t912m+txmzRpkswC8BNaNXghrAXIBRdcoD0RqMFZm7n69u3rerweeeQRmQXgJ7RqiIWwFiDTpk1zPRlw5mamRx991PVY3XvvvTILwG9o1RALYS1gypUrpz0hqMHZm1nUy5yRj1H79u1lFoDf0KohLYS1gIl282/O4Mzx1ltvuR4f9QcGAPyLVg1pIawFUNmyZbUnBjU4i0u9jz/+2MmXL5/2uFStWtXZu3evrADgN7RqSA/CWgBNmTLF9eTAmVxqRbvo7TnnnONs3LhRVgDwI1o1pAdhLaDKlCmjPUGowdlcaqiL3lavXl17LPLmzXv89lIA/ItWDelFWAsodfPvyCcJzuhSI/LMWg0uegv4H60a0ouwFmDnnXee9kShBmd1yRXtorcvvPCCzALwK1o1ZARhLcCiXSKCM7vk4aK3QHDRqiEjCGsBd+6552pPGGpwdpd4o0aNcv3euegtEAy0asgowlrAqZfcIp80OMNLrPHjx7t+51z0FggOWjVkFGENrktGqMFZXmI8+eSTrt81F70FgoNWDZlBWIPz/PPPu548ONOLv2gvfXLRWyBYaNWQGYQ1HHf22WdrTyBqcLYXP8OHD3f9fmvUqOFs27ZNVgDwO1o1ZBZhDcdNnDjR9STCGV98DBkyxPW7rVWrlrN7925ZASAIaNWQWYQ1nHDWWWdpTyRqcNaXNffdd5/rd9qgQYPjdy0AEBy0asgKwhpOePbZZ11PJpz5ZV7v3r1dv88mTZo4hw8flhUAgoJWDVlBWIOmVKlS2hOKGpz9ZVz37t1dv8cbbrhBZgEECa0asoqwBk20a4BxBpgxnTp1cv0OW7ZsKbMAgoZWDVlFWIPLmWeeqT2xqMFZYPpEu9dn27ZtZRZA0NCqIR4Ia3AZN26c68mFM8G03Xzzza7fW4cOHWQWQBDRqiEeCGuIqmTJktoTjBqcDXpr0aKF6/fVuXNnmQUQRLRqiBfCGqJ6+umnXU8ynBG6/f333851113n+l316NFDVgAIKlo1xAthDZ5KlCihPdGowVnhSYcOHXKuueYa1+/o3nvvlRUAgopWDfFEWIOnsWPHup5sODP8x549e5x69eq5fj8DBgyQFQCCjFYN8URYQ0zFixfXnnDUCPrZ4RdffOFUrFjR9XsZOnSorAAQZLRqiDfCGmJ64oknXE86QT5DnDVrlpMvXz7X72TEiBGyAkDQ0aoh3ghrSFOxYsW0Jx41gniWOHr0aNfvQY3HHntMVgAIOlo1JAJhDWkaM2aM68knaGeK3bp1c/0OcufO7cyYMUNWAACtGhKDsIZ0KVq0qPYEpEYQzhZ37tx5/Obrkf/28uXLO6tWrZJVAECrhsQhrCFdor0E6Pczxk8++cS58MILo/67d+/eLasA4B+0akgUwhrSRV38tXDhwtoTkRp+PWucPn26kytXLte/t3v37rICAE6iVUMiEdaQbuqN9JFPRn48c3z44Ydd/041Hn/8cVkBADpaNSQSYQ3pduzYMef000/XnpDU8NPZY6dOnVz/vvz58ztz5syRFQCgo1VDohHWkCGPPvqo60nJD2eQ27Ztcxo1auT6t11yySXO6tWrZRUAuNGqIdEIa8iQI0eOOIUKFdKemNSw+SxyxYoVTpkyZVz/pmbNmjl//PGHrAIAN1o1JANhDRkW7T1dtp5Jvvzyy062bNlc/55evXrJCgDwRquGZCCsIcMOHz7snHbaadoTlBq2nU0++OCDrn+DGk899ZSsAABvtGpIFsIaMmXkyJGuJylbzijVhW7btGnj+vnVH0/MmzdPVgFAbLRqSBbCGjLl4MGDTsGCBbUnKjVMP6ucPXu2U6pUKdfPXaVKFefLL7+UVQAQG60akomwhkwbPny468nK5DPL3r17u35eNVq2bOkcOHBAVgFA2mjVkEyENWTa/v37j1+DLPwJSw3Tzi4/+ugjp3r16q6fUw31vjUAyAhaNSQbYQ1ZEu1N+iadYUa764IaFStWdN577z1ZBQDpR6uGZCOsIUv+/PNP59RTT9WeuNRI9VnmTz/95Nxwww2un0uNrl27Hr8bAwBkFK0aUoGwhix74IEHXE9eqTzTnDZtWtTbYqkb0b/yyiuyCgAyjlYNqUBYQ5bt3bvXyZcvn/YEpkayzzaPHj3q3HXXXa6fQw11NwLVtgFAZtGqIVUIa4iLoUOHup7EknnGuWTJEqdChQqun0GN0aNHyyoAyDxaNaQKYQ1xoe6hmTdvXu2JTI1knHVGexlWDfUXoB9//LGsAoDMo1VDKhHWEDeDBw92PZkl8szzm2++cRo1auT6nmr06dNHVgFA1tGqIZUIa4ib33//3cmTJ4/2hKZGIs4+n3/++ajf66yzznLmzJkjqwAg62jVkGqENcTVoEGDXE9q8TwD/fbbb6Pe11ONm2++2dm1a5esBID4oFVDqhHWEFe7d+92TjnlFO2JTY14nIVGuwCvGtmzZ3eeeeYZWQUA8UOrBhMQ1hB3AwcOdD25ZeVMdNasWc7FF1/s+ppq1K1b11m7dq2sBID4olWDCQhriDv1UmSuXLm0Jzg1Mno2qv6AoFWrVq6vExrc1xNAItGqwRSENSTEgAEDXE9yGTkjHTZsmOvzQ6N169bH37sGAIlEqwZTENaQEDt27HBy5sypPdGpkdZZ6YwZM5zy5cu7Pk8NdfN1/tITQDLQqsEkhDUkzH333ed6svM6M/3yyy+dG2+80bVejWzZsjkjRoyQlQCQeLRqMAlhDQmzfft2J0eOHNoTnhqRZ6fRLqYbGm3btnU2btwoKwEg8WjVYBrCGhKqX79+rie90Bnq9OnTnXLlyrnm1ahcubLz5ptvHl8HAMlEqwbTENaQUNu2bTt+HbTwJz41rrrqKtfH1FDvc3v44YflswEguWjVYCLCGhKub9++rie/aOOWW25xfvzxR/ksAEg+WjWYiLCGhPvll1+0J7/IUaVKFWf+/PmyGgBSg1YNpiKsISn69OnjehJkMBgMkwetGkxBWENSbNmyJeqTIYPBYJg6aNVgCsIakqZXr15O4cKFoz4pMhgMhkmDVg0mIawhaX766aeo7wlhMBgM0watGkxCWAMAADAYYQ0AAMBghDUAAACDEdYAAAAMRlgDAAAwGGENAADAYIQ1AAAAgxHWAAAADEZYAwAAMBhhDQAAwGCENQAAAIMR1gAAAAxGWAMAADAYYQ0AAMBghDUAAACDEdYAAAAMRlgDAAAwGGENAADAYIQ1AAAAgxHWAAAADEZYAwAAMBhhDQAAwGCENQAAAIMR1gAAAAxGWAMAADAYYQ0AAMBghDUAAACDEdYAAAAMRlgDAAAwGGENAADAYIQ1AAAAgxHWAAAADEZYAwAAMBhhDQAAwGCENQAAAIMR1gAAAAxGWAMAADAYYQ0AAMBghDUAAACDEdYAAAAMRlgDAAAwGGENAADAYIQ1AAAAgxHWAAAADEZYAwAAMBhhDQAAwGCENQAAAGM5zv8Bp8hIk9PbeeYAAAAASUVORK5CYII= | In a hexagon, a sector is drawn. This sector is rolled into a cone. What is the base area of this cone in cm²? | A. π; B. 3π; C. 4π; D. 5π; E. No correct answer | A |
424 | 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 | As shown in the figure, HG is the axis of symmetry of trapezoid ABCD. What are the lengths of AH, AC, and CG in cm, respectively? | A. 2, 5, 5; B. 5, 2, 5; C. 5, 2, 2; D. 5, 5, 2; E. No correct answer | A |
425 | iVBORw0KGgoAAAANSUhEUgAAAuwAAAGGCAYAAAAgp9RdAAAAAXNSR0IArs4c6QAAAARnQU1BAACxjwv8YQUAAAAJcEhZcwAAFiUAABYlAUlSJPAAADqASURBVHhe7d0LzC3T+cfxahsqVIhWqBJ68hclVFxaUepEiUaIEnqioUKUuJRSoVQ4QpVohSo5qm1c4lIiBKfUJUdd4lLqVF1KHbR1qUuoXlxKvf/+WItnrTOzZ2bvmT1rZr6f5AnnXfPO3u/ea57n2WvPnv2hGQAAAADJomEHAAAAEkbDDgAAACSMhh0AAABIGA07AAAAkDAadgAAACBhNOwAAABAwmjYAQAAgITRsAMAAAAJo2EHAAAAEkbDDgAAACSMhh0AAABIGA07AAAAkDAadgAAACBhNOwAAABAwmjYAQAAgITRsAMAAAAJo2EHAAAAEkbDDgAAACSMhh0AAABIGA07AJTwoQ99KAgAAKaFqgMAJdCwAwDaQtUBgBJo2AEAbaHqAEAJNOwAgLZQdQCgBBp2AEBbqDoAUAINOwCgLVQdACiBhh0A0BaqDgCUQMMOAGgLVQcASqBhBwC0haoDACXQsAMA2kLVAYASaNgBAG2h6gBACTTsAIC2UHUAoIRUGvZFixbNHH300TMbb7xxcH+23XbbmXnz5s289NJLbksAQF/QsANACbY5VrThkksumVlhhRUWuy82NK7tAAD9QcMOACXEjfG0aVU9vg+jgqYdAPqDhh1A67IazlGh0z+yZG07KvL2k5r58+e/f59nzZo1c8opp8zcdttt74ZOg9HfYf8uH/o9AED30bADSIYazPjcbB9z5syZWbhwodtyNDWydewnFWrSdd/VqOfRinr8t+r0GM5pB4Duo2EHkBQ1mHHjqea7Ku0nPt9bjW/X+EZcK+lFspp2To0BgO6jYQeQnPgUD52/PY54P1pd7xrd5yqn7vThbwYAhGjYASQnbjpHnQoySl37aZPeJahyCo89311RpdkHAKSJhh1AcmjY36PTeqqeDhSfUkTDDgDdR8MOIDk07JOxfzMNOwB0Hw07gOTQsE9m3L9Zq/NZl4nUKr8+R6BvWS2ifeiDrv4qPZbGdH/sFXx0W3mXn8zaXv/PB2kBDA0NO4Dk0LCPLz4lpuz573ps/FV19EFV/VvhLympGPUtqrqd/ffff7Er83hqyuMxG/pdq+r2ANBnNOwAkkPDPj77oVOtRpeh5tdvn7WKrgbe71MRN+12BTwO0fb6f23nXwhk/Y6un2+314sF/+Iha/u8lXkA6BsadgDJoWEfn2++FWVOHfHbazU775QXrZ77ffpttZLv+f+Pt1PoPqjZ9s24Ze+rQs25ttf+s6477xt5H9ovAAwBDTuA5KTYsM+ePTuIFKlx9qeRlGlmbQNc9Nj47XzkvRiIT2NRU26be8veXx9aVR91Gk+80g4AQ0C2A5CcFBt2ux9FivT3+fuXtaIds+en5zXVnt1Wkdewx495kfh0m6L7Yf9GRZm/EwC6joYdQHJo2Kuzq9VlvhnWrq7rcSqiVW/ftGv7vMa6asMeN+BFaNgBDBENO4DkxE2fGkX9rGrEp1v0uWFXk677Vfa8bnv+uFa566LH3e9XUYSGHQCK0bCj9/zK46jzYpGWuOmrK/rasKtp1X3SPC9zrXSx54JP8rjEaNgnn796brQPvQjjSjgAhIYdveff+teKIrohbnjGbSjr2o/Y/ShSYU+FqdK82r+lzmODhv0DevEUXwnHh5pyf8lKH2rQs5p9Pb8aLzq/H0B/0bCj96p8sA5poGEvz/+NeR8CzWP/Fu2jLvFjXkTPySTbd+GUmPjKNkWPt/KUns/4lC7lMt4pBIaJhh295k8V8JF1bWekp65Gu679iN2PIgV+9XaceW3/FjWGdaFhX5z/fIGPoobdU+MeN/tVTnsC0B807Oi1+O1orVAhfTTsxdSk636MezpL3AjWtXJLw764+D6XbdjFnvI0zu8D6AcadvSWVqFskfPRhQI/dDTso9XxuYz4+udV95XXNMaPeREa9mLx7ys4NQYYFhp29FZWkVPUeQk7NIOGPZ9v1qs2fTG/Qm+jbBOoxzHvOKJhX1x8n6s+d1plt7+vmGQuA+geGnb0ln8bOT5/VME5oGmjYc+m5lS3rdNZqnyAWn93fJ571jtQZfarpl7b5l1ukIZ9cfF9rtqwi/19BQsPwLDQsKOX4lXI+BzQSRo3NI+GfXFqlDWPqzbr/ljIepEaf8ZDof3nvaBV0+/vQx4a9sXF97mOhn2cfQDoLhp29JJvGtSsSFww1XQgXXU12nXtR+x+FNOkplRzVqGVbf27KNRc+/PU8xpsNf72sqc29Njp8VKosddt+7FRp87Ej3mR+Ngsevcr3l5/a+ri+6zHqIqsd0O0TwDDQcOO3vFv2dsrwmQVPN/MIz007B/wK+STxKi57lfus34vK4qOm3hfRe8GxB9+LWrA41PcutC4Ttqwx7+v6MILFQD1oWFH7/i3+eNCHr/9X7VoYnpSbNgXLFgQxDTU0awrippmvaDVKnzW7/rQC+BRTaJuI+sUG/0sa9Vc22d98FX3I+929HjELwj8uw4pm6Rh1+MU/83kLmB4aNjRKypuKmgqcHGToibAFj1F0dvvaEfcPGpVdRxxw961D+rZ+z5uVPmb1RBre9sg6jHUz+PjyYof57zwjXjZ7f0LrKr7T824DXvWCyk9N+QtYHho2NErvjBqVS9LfL5u3nZoj3/RZSPvHOxRsvbDF2ehDXHDPupdBJ2ipHcMst6t0O+N+vwAgP6iYUev+IY8bwUqPsUgayUe7VEzEq8o+tDKb9lmpa79AHWIG/aqobms3AVguGjY0RtalVJxG/V2s5rz+HxQCmH77PNRJvKe46xtR0XZUxOAScQNu3KQTvPSz23oZ5qTcY5SqGnXOf8sMADDRMOO3lChU2Er+gBa/FYzp0kAaFLcsJd5oag85nOaDTXzqZ6rD6A5NOzoBZ0Co2JWpvn229qgAAJoyjgNu5d1JR1F6lfGAVAvGnb0gl81V3ErI1654sOnAJoyScMuWU07n78BhoWGHZ2XdV76OEHxA9CESRt2ia9wpdB+AQwDDTs6z68+qaCpEJaNuMmn+AFoQh0Ne9Yquz6ICmAYaNjReX7lqep56Hz4FMA01NGw61Kkdh8+AAwDRzs6TU26itY4K01ZBZAPciHPcccdFwRQVh0Nu9h9+AAwDBzt6DR9CY6K1rjXUlfhtMVv3EKK/rPzRAGUVUfDrs/Y2H34ADAMHO3oLH95Rp2LPq74m08Ved+SWsWrr746s8QSSyy2b4Iguhk6nnVcj6OOht2/m2hDCxYAhoGGHZ2lbwVU0dJ/JxF/+HTS/cm5554b7JMgiO6Hjutx1NGwx5+5UfAtzcBw0LCjk+ylHCddEfeNvw/td9JLPG6zzTbBPgmC6H7ouB7HpA171udt+JA8MCw07OgkXwDrKFr6oGlcDLX/cT355JOL7Y8giH6Eju+q4kWBKg27mvX4XUD9Wz8HMBw07Ogcu9rUVMOuGLcgxqtpm222mRtBl9nnVIFh0PFrn/dxXszrKlZ2H/p30bt4GtdtZTXrVS9hC6D7qDroDJ36onM24wKmD16NW8DUrMfF1IduRwWz6ik3G220UbCf008/3Y2gy+xzqsAw6Pi1z7uO77KUO/yVrLJCuUfjyjM+tBqvFfis7XUeex0figfQPVQddELWFRKyomzjXnZ/PlRIy7jvvvsW+91nn33WjaLL4ucVw6DjN37udZyPktdwVwm9e6j9qEnXt5zSqAPDRtUBavTd7343KLrbb7+9G0HX2edVgeHQcWyfex3nADBNVB2gRp/5zGeCwn7BBRe4EXSdfV4VGA4dx/a513EOANNE1QFqctNNNwVF/WMf+9jMG2+84UbRdfa5VWA4dBzreLbPv453AJgWqg5Qk3333Tco6N/4xjfcCPrAPrcKDIuOZ/v863gHgGmh6gA1WX755YOCfu2117oR9IF9bhUYFh3P9vnX8Q4A00LVAWpw2WWXBcX8U5/6lBtpjq4aoUvAxZel1JUldFWJSb+tFSH7GCswPDqu7RzQcQ8A00DVAWqwyy67BIX829/+thtpRtb16OPQuLZDPebOnRsEhkfHtT3GdNwDwDTQsAMTevnll4MirrjjjjvcaP3irzkvCpp2oB46ruPjS8c/ADSNhh2YkE4/sQV83XXXdSP10zez+tvRF6voC530JVAK3Y+8L2zR7wGYnI5ve2zpuAOAptGwAxPaaqutggJ+/PHHu5H6qUnXbYz65lWtqNv7o9DpMZzTDkxOx7c9tnT8A0DTaNiBCTz++ONB8VY88sgjbrRevhEvs6KX1bRzagwwOR3f8bGlPAAATaJhByZw0kknBYV7iy22cCP1mzNnzrunvJQVnx6j3wcwOR3n9thSHgCAJtGwAxPYYIMNgsJ95plnupH66bSWhQsXun8Vs+e7K6o0+wDy6Ti3x5byAAA0iYYdGNM999wTFG3F888/70brpfPPdb31KvQ79r7RsAP10HFujy2F8gEANIWGHRjT4YcfHhTsHXfc0Y2kw94/GnagPjre7fGlfAAATaFhB8a0+uqrBwX7oosuciPpsPdv1JVlYlqdz7pMpFb5dR14fctqEe1DH3T138RqaUz3x35Lq24r7/KTWdvr//kgLdqi493PRYXyAQA0hYYdGMP1118fFOtllllm5q233nKjaYhPiSl7/rsaY/8tqvqgqv6t8JeUVIz6FlXdzv777//+Pnx4asrjMRv6Xavq9sA06HjXcW/novICADSBhh0Yw9577x0U6r322suNpMN+6FSr0WWo+fXbZ62iq4H3+1TETbtdAY9DtL3+X9v5FwJZv6MvgrLb68WCf/GQtX3eynydFixYEASg497OQ+UFAGgCDTtQ0dtvvz3z8Y9/PCjU1113nRtNh2++FWVOHfHbazU775QXrZ77ffpttZLv+f+Pt1PoPqjZ9s24Ze+rQs25ttf+s6477xt5H9pv0+ztKQAd93ZOKC8oPwBA3ag6QEUXX3xxUKRXW201N5IONc7+NJIyzaxtgLWKPYrfzkfei4H4NBY15ba5t+z99aFV9VGn8cQr7U2ztzWN20M36Pi380L5AQDqRtUBKtppp52CAv2d73zHjaRDTbe/f1kr2jF7fnpeU+3ZbRV5DXv8gdUi8ek2RffD/o2KMn/nJOxtKQDR8W/nhfIDANSNqgNU8OKLLwbFWXH33Xe70TTY1Wpd0aWIXV0vc+lHrXr7pl3b5zXWVRv2uAEvQsOOFOj4j+eG8gQA1ImqA1Rw1llnBYX5c5/7nBtJh5p03bey53Xb88e1yl0XGnYMhfKAnRvKEwBQJ6oOUMGWW24ZFObvf//7biQNalp1v7TCXuZa6WLPBVcTXBcadgyF8oCdG8oTAFAnqg5Q0qOPPhoUZcVjjz3mRttnT4Wp0rzav0er7XWhYcdQKA/E80P5AgDqQtUBSjrhhBOCgjx79mw3kgbfIOd9CDSP/Zu0j7rQsGNIlA/s/FC+AIC6UHWAktZbb72gIJ999tlupH3+PPSsa5YXsX+TVujrQsOOIVE+sPND+QIA6kLVAUq48847g2KsKLrs4LSoSdf9Gfd0lvh65qOufV4FDTuGRPkgniPKGwBQB6oOUMKhhx4aFOKdd97ZjbTLX5JxknPP4+ufV91X3mk0NOwYGuUFO0eUNwCgDlQdoIRVV101KMSXXnqpG2mPb9bzGuay/Aq9jbKr7Gqa8y4FScOOoVFesHNEeQMA6kDVAQrMnz8/KMLLLbfczDvvvONG26HmVPdFp7NUOTVHTW58nrsu/2j/vrL7VVOvbfX4ZKFhx9AoLyg/2HmSd3wAQBVUHaDAnnvuGRTgffbZx420Q42yPhxatVn3K/JZ12f3H1q1of3nXctdTb+/D3lo2DFEyg92nih/AMCkqDrACG+++ebM0ksvHRTgG264wY1On5pSNcoKrdzp30Wh5tqfp57XYKvxnzVrVvB3+lDjreZYocZet+3HRp06M2nDXvTFT9Nu2HXZPhtAFuUHOy+VP5RHAGASNOzACBdeeGFQfNdYYw03Mn1+hXySGHWNdr9yn/V7WTFqXxLvq+jdgPjDr0UN+NFHHx1srwYeSIHyhJ2byiMAMAkadmCEHXbYISi8RxxxhBuZrjqadUVR06xVba3CZ/2uD63Ej2qmdRtZp9joZ1mr5to+64Ovuh95t6PHI35B4N91ANqmPGHnpvIIAEyChh3I8dxzzwVFV3Hvvfe60emK78c4kXc1lyxqiLW9bYp1iot+Pqrpj0+DyQvfiJfd3q+eV90/0AbliXhOKp8AwLho2IEcZ5xxRlBwN9xwQzcCAKMpX9j8oXwCAOOiYQdybL755kHBPfnkk90IAIymfGHzh/IJAIyLhh3I8NBDDwXFVvHEE0+4UQAYTfkiziEPP/ywGwWAamjYgQxz584NCu3WW2/tRgCgHOUNm0eUVwBgHDTsQIZ11lknKLQ//elP3QgAlKO8YfOI8goAjIOGHYjcfvvtQZFVvPLKK24UAMpR3ohzifILAFRFww5EDj744KDAfu1rX3MjAFCN8ofNJ8ovAFAVDTsQWXnllYMCe/nll7sRAKhG+cPmE+UXAKiKhh0wrr766qC46ouDALHzQgGUFX8rr/IMAFRB1QGM3XffPSis++23nxvB0Nl5oQDKUh6xc0d5BgCqoOoAzmuvvTaz5JJLBoX15ptvdqMYOjsvFEBZyiN27ijPKN8AQFlUHcA577zzgqI6a9YsNwLQsGMyyid2/ijfAEBZVB3A2W677YKCetRRR7kRgIYdk1E+sfNH+QYAyqLqAP/z9NNPB8VUcf/997tRgIYdk1E+ieeQ8g4AlEHVAf7ntNNOCwrpJpts4kaA99j5oQCqUl6xc0h5BwDKoOoA/7PpppsGhfTUU091I8B77PxQAFUpr9g5pLwDAGVQdTB4DzzwQFBEFX/+85/dKPCeeI4AVSmvxPNI+QcAilB1MHjHHHNMUEC33XZbNwJ8wM4RBTAO5Rc7j5R/AKAIVQeDt9ZaawUF9Oc//7kbAT5g54gCGIfyi51Hyj8AUISqg0G75ZZbguL5kY98ZOaf//ynGwU+YOeJAhiH8ovyjJ1LykMAMApVB4N2wAEHBIVzt912cyNAyM4TBTAu5Rk7l5SHAGAUqg4G7ZOf/GRQOK+88ko3AoTsPFEA41KesXNJeQgARqHqYLAomqjCzhUFMAkWCwBUQdXBYMVvSx944IFuBACapXxj8w+n4wEYhYYdg8QHvwC0iQ+8A6iChh2DxKXVALSNS8oCKIuGHYPEl5cAaBtf2gagLBp2DA5fDw4gBco7cS5SfgKAGA07BufUU08NCuSmm27qRgBgupR/bD5SfgKAGA07BmeTTTYJCuRpp53mRgBgupR/bD5SfgKAGA07BuX+++8PiqPi6aefdqMAMF3KP3FOUp4CAIuGHYNy1FFHBYVxu+22cyMA0A7lIZuXlKcAwKJhx6DMmjUrKIznnXeeGwGAdigP2bykPAUAFg07BuPmm28OiuKSSy4589prr7lRAGiH8pDykc1PylcA4NGwYzD222+/oCDuvvvubgQoNnv27CCAOikf2fykfAUAHg07BmOFFVYICuLVV1/tRoBidu4ogDopH9n5pXwFAB5VB4Nw+eWXB8Vw5ZVXdiNAOXb+KIC6KS/ZOaa8BQBC1cEg7LrrrkEhPPjgg90IUI6dPwqgbspLdo4pbwGAUHXQe6+88kpQBBW33367GwXKiecQUDflpXie/f3vf3ejAIaMqoPeO+ecc4ICuM4667gRoDw7hxRAE5Sf7DxT/gIAqg56b+uttw4K4Ny5c90IUJ6dQwqgCcpPdp4pfwEAVQe9tmjRoqD4KR566CE3CpQXzyOgCcpP8Vx74okn3CiAoaLqoNdOPvnkoPBtvvnmbgSoxs4jBdAU5Sk715THAAwbVQe9tuGGGwaF74wzznAjQDV2HimApihP2bmmPAZg2Kg66K177703KHqK5557zo0C1cRzCWiK8lQ835TPAAwXVQe9dcQRRwQFb4cddnAjQHV2LimAJilf2fmmfAZguKg66K011lgjKHgXXnihGwGqs3NJATRJ+crON+UzAMNF1UEv3XDDDUGxW3rppWfefPNNNwpUZ+eTAmiS8pXylp1zymsAhomqg17aZ599gkK35557uhFgPHY+KYCmKW/ZOae8BmCYqDoTuuSSS4KEOirmz5/vfgtNeuedd2aWW245HnvUasGCBUEATVPesnlMeU35ratmzZoV/D15sfHGG7vfAODRsE+obALSdpiOSy+9NHjsV111VTcCAN2i/GXzmfJbF1VZ3NK2AEI07BMgAaVp5513Dh77Qw891I0AQLcof9l8pvzWRSxuAZOhYZ+AEssKK6wws+22246MOXPmuN9A01566aXFCsCdd97pRgGgW5S/4pymPNclfnFLp7pk1UgbnL4IZKNhH5NPQKeccor7CVJw9tlnB4VtvfXWcyMA0E3KYzavKc91iV/c6toLDSAlNOxj8m/vkYDSMnv27KCwnXDCCW4EALpJeczmNeW5rvCLW0cffbT7CYBx0LCP4bbbbns3Ae2///7uJ0jBY489FhQ1xaOPPupGAaCblMfi3PanP/3JjaZNp7no/i5atMj9BMA4aNjHQAJK04knnhgUtC233NKNAEC3KZ/Z/KZ8lzoWt4D60LBX5BOQQufk6QOl8+bNo3lPwPrrr//+c6M466yz3AgAdJvymc1vynep84tbCn3gVKfF8KFSYDw07BXZBBSHxtTQY/ruuuuuxZ6PF154wY0CQLcpn8U57u6773aj6bGLW3FosUsXbOAzYEB5NOwVjEpANtS4T5KI9LtatY9fHPgVijKr+dqHPuyj39HvWhpTsvRjCt1W3spH1vb6/5SuLX/YYYe9f98UO+20kxsBgH5QXrN5TnkvVaMWt3yocZ+0jqgu65Qbe513/+532X0vXLjw3X34FxKW9q99aUz71u1o27waH2+v/2p73oXHpGjYK9CBXCYJKXSQKglUpdvwB7oOev1bESejvERkE4/fXuGpKY/HbOh3rarbt2W11VYL7tfFF1/sRoB6zJ07Nwhg2pTXbJ5T3kuRmlPVSlu3RsU4dUS1ztdj3Y4Ws1QrtS+7b22T1VzHi1o+tA8/rhpsx2yoLtoaX3V7oCoa9jHp4NQr6biZnuQA9YlGCSTr1XicDOKmPU48NkTb6/+1nX8hkPU7+rvs9vr7/IuHrO3bPifxuuuuC+7PsssuO/P222+7UaAedo4pgGlTXlN+s/NQ+S91qoOqJ3EzbaNK0679+YUkvRsd07jdt+qWbdp1X/IWolTntK1+R9vofuln+m/8O3oxIH57/zO9eMjaXtsA46Lq1EQJIKtx1wFb5q0wn8hGbR8nIW1rk5D//3g7he6fkoVvxi1/2z7UnPuElpUMNWa3bzsJ7bXXXsH92Xvvvd0IUB87xxRAG5Tf7DxU/usS1be45vgoc61226yP2j5e4FLT7dm6GW+nfaqm+cbdsrftQzVV26tRj2u3beR98KFbjIuqUyMdnFmJyL8Kz2MbYJtUstj9KvS7WeKkovsVJx9PP4+314sPJac8cRJqy1tvvTWzzDLLBPfl+uuvd6NAfewcUwBtUH6z81D5T3mwa9ToxnVHkbWoZPmFMf1uXk0T1VK7X/1eFi1K2e2031H3Id6vYtQLBzXodtuiGg/koeo0IKtpH5UA7Mr8qAQk8Sp+XsOuFwl2uyLxKkPR/YiTVlGSbcpFF10U3I/VV1/djQD1svNMAbRFec7OReXBLspasR61wGUXt4pW4+N3gvMadtUuu11RQx2/g13mXQG7fdECHpCHqtOQuAFWE5/FJpUyB7KShW/atX1eY121YY8b8CKpNOw77rhjcD8OP/xwNwLUy84zBdAW5Tk7F5UHuypugBV5p4XaBasyNUfNtLbVi4K8xa2qDbtMsj0NO8ZF1WlIfJpJ3nnedjVeTX5dhtCwP//888F9UNxzzz1uFKhXPNeAtijPxfNR+bCr4nqSdZ63mni7zahTNqugYUdXUHUaVKYJtueClznwyxpCw37mmWcG92GDDTZwI0D97FxTAG1SvrPzUfmwq+IFrqxaGJ8LXhcadnQFVadB8YpAFjued9rMOIbQsG+xxRbBfTjppJPcCFA/O9cUQJuU7+x8VD7sMvtuc1YTHNecvNNmqqJhR1dQdRpmVw2yNHUg971hf+SRR4LbVzz++ONuFKhfPN+ANinfxXNSebGr7NVasprgpmoODTu6gqrTMN84531C3R7Iau7r0veG/fjjjw9uf6uttnIjQDPsfFMAbVPes3NSebGrbOOc9QHRuOZkfUfIOGjY0RVUnYb5c9TzTneJr2de1wdp+t6wr7vuusHt15W8gTx2vimAtsXXEFde7Cp7jnrW6S7xOex1XaSBhh1dQdVpmD9Isz71LmUv/5gn7+Dvc8N+xx13BLetePnll90o0Ix4zgFtU96L56XyYxf5mpJ3RbUql3/MolX7rJV7GnZ0BVWnQX5FIO90GIlXSBRlV9mVKPJWGfrcsB9yyCHBbe+yyy5uBGiOnXMKIAXKf3ZeKj92kX+3Oe966WI/E6You8rur0KTVVtp2NEVVJ0G+aZ5VDMbX0lGocRV9E2jfrUhb+W+zw37KqusEtz2ZZdd5kaA5tg5pwBSoPxn56XyY9f4prmombVXkvExqsH31NjnrdzTsKMrqDolqYHWariiqJkWn1jKfG1xVhJScsl7u0/3QasFeQlI+tqwX3PNNcHtLr/88m4EaNbcuXODAFKhPGjz4rXXXutG2qF6oBpRpi5o8Un1TFF0ikvWApdCNTGLtve1MG9xi4YdXUHDXpI911yJJe/gVzPvG/Cy56Prd+xXLtvQwa2EoND+dNt+bNSpM5M27EWJM95+Wg37HnvsEdzuvvvu60YAYJiUB21eVJ5si3/314dqZ94il+qGb9ZH1TMr6zRShWqoaqSvl/4UG8WoU2cmbdjL1Hm7PQ07xkXDXlLcAPsDT2/H6YBXaDXdN95lDnrLrzLEt5EXRW8DxvsqelfAviBRFDXg+lvt9lX/3nG8/vrrM0sttVRwuzfeeKMbBYBhUh60eVF58o033nCj0xU3wArVI9UMXytVv3zNUWNdtln3/KJYmdD+R9W/+AVA0bvi8QuSogZct223VwDjYOaU5D9AWhQ6eKsmH0+r2nZVICv0gmBUM63kkJXM9LOsVXNtn7ViofuRdztKtvELAv07712Hupx//vnBba655ppuBACGTfnQ5scLLrjAjUxfUR1TqGZMstCTt9JuQ833qGZdNa5KLVNtz/rb9Hdk3Y5qbrwYpsirx8AoNOwV6GDVgRafvqImXYlh3EY95lcfbCLxq/mjko+2sfcrL3wjXnZ7n1Sr7r9u22+/fXA7Rx55pBsBgGFTPrT5UfmyTWqo45qh2qnaVlTLylLTq9prm2h/asyoeqwaZe9XXuj+V9leUWV7v3+gDBp2dMKzzz67WLK777773CgADJvyYZwjlTcB9AMNOzrh9NNPDwrRRhtt5EYAAKK8aPOk8iaAfqBhRydsttlmQSGaxodcAaBLlBdtnlTeBNAPNOxI3oMPPhgUIcWTTz7pRgEAorwY50rlTwDdR8OO5B177LFBAdpmm23cCADAUn60+VL5E0D30bAjeWuvvXZQgM4991w3AgCwlB9tvlT+BNB9NOxI2q233hoUnyWWWGLm1VdfdaPA9CxYsCAIIEXKj8qTNm8qjwLoNhp2JO2ggw4KCo+u4Qu0wc5DBZCq+Mt6lEcBdBtVB0lbaaWVgsJzxRVXuBFguuw8VACpUp60c1V5FEC3UXWQrKuuuiooOiuuuKIbAabPzkUFkDLlSztflU8BdBdVB8n6+te/HhQcfd000BY7FxVAypQv7XxVPgXQXVQdJOlf//rXzEc/+tGg4PBBP7TJzkUFkDLlSztflU///e9/u1EAXUPVQZJ+8YtfBMXm//7v/9wI0A47HxVA6pQ37ZxVXgXQTVQdJOkrX/lKUGi+973vuRGgHXY+KoDUKW/aOau8CqCbqDpIzl/+8pegyCgWLlzoRoF2xHMSSJ3yZjxv//rXv7pRAF1C1UFyfvjDHwYF5gtf+IIbAdpj56QC6ALlTztvf/SjH7kRAF1C1UFyPv/5zwcFRg080DY7JxVAF8QLIMqvALqHqoOkZL2Fq1NkgLbF8xLogqxTDH//+9+7UQBdQdVBUviQFFJl56UC6Ao+xA90H1UHSeEyZEiVnZcKoCu4TC7QfVQdJCPriz70BUpACuzcVABdwRfRAd1H1UEy+CptpGz27NlBAF2ifGrzq/ItgO6gYUcyVlxxxaCgXHXVVW4EADAJ5VObX5VvAXQHDTuScMUVVwTFZKWVVnIjAIA6KK/aPKu8C6AbaNiRhDlz5gSF5KCDDnIjAIA6KK/aPKu8C6AbaNjRuldffXVmiSWWCArJrbfe6kYBAHVQXrV5VnlX+RdA+mjY0bpzzz03KCJrr722GwEA1En51eZb5V8A6aNhR+u22WaboIAce+yxbgQAUCflV5tvlX8BpI+GHa168skng+KhePDBB90oAKBOyq9xzn3qqafcKIBU0bCjVaecckpQODbbbDM3AgBogvKszbvKwwDSRsOOVm200UZB4Tj99NPdCACgCcqzNu8qDwNIGw07WnPfffcFRUPxzDPPuFEAQBOUZ+Pc+7vf/c6NAkgRDTtac+SRRwYFY/vtt3cjAIAmKd/a/Kt8DCBdNOxozZprrhkUjPPPP9+NAOmxc1UBdJnyrZ3PyscA0kXVQStuvPHGoFgstdRSM6+//robBdJj56sC6DLlW+VdO6dvuukmNwogNVQdtOKb3/xmUCj22GMPNwKkyc5XBdB1yrt2Tu+7775uBEBqqDpoxfLLLx8UimuuucaNAGmy81UBdJ3yrp3TyssA0kTVwdT98pe/DIrEKqus4kaAdNk5qwD6QPnXzuvLLrvMjQBICVUHU7fLLrsEBeKQQw5xI0C67JxVAH2g/GvntfIzgPRQdTBVL7/8clAcFHfccYcbBdIVz1ugD5R/47mtPA0gLVQdTNW8efOCwrDuuuu6ESBtdt4qgL5QHrZzW3kaQFqoOpiqrbbaKigMxx9/vBsB0mbnrQLoC+VhO7eVpwGkhaqDqXn88ceDoqB45JFH3CiQtnjuAn2hPBzPb+VrAOmg6mBqTjrppKAgbLHFFm4ESJ+duwqgT5SP7fxWvgaQDqoOpmaDDTYICsKZZ57pRoD02bmrAPpE+djOb+VrAOmg6mAq7rnnnqAYKJ5//nk3CqQvnr9Anygfx3NceRtAGqg6mIrDDz88KAQ77rijGwG6wc5fBdA3yst2jitvA0gDVQdTsfrqqweF4KKLLnIjQDfY+asA+kZ52c5x5W0AaaDqoHHXX399UASWWWaZmbfeesuNAgBSoLys/Gzz9a9//Ws3CqBNNOxo3N577x0UgL322suNAABSovxs87XyN4D20bCjUW+//fbMsssuGxSAX/3qV24UAJAS5Webr5W///vf/7pRAG2hYUejLr744iD5f/rTn3YjAIAUKU/bvH3JJZe4EQBtoWFHo7761a8Gif+www5zIwCAFClP27ytPA6gXTTsaMwLL7wQJH3FXXfd5UYBAClSno5z94svvuhGAbSBhh2N+clPfhIk/PXXX9+NAABSpnxt8/dZZ53lRgC0gYYdjfnSl74UJPwTTzzRjQAAUqZ8bfP3lltu6UYAtIGGHY344x//GCR7xWOPPeZGAQApU76Oc/ijjz7qRgFMGw07GnHCCScEiX727NluBADQBcrbNo8rrwNoBw07GrHeeusFif7ss892IwCALlDetnlceR1AO2jYUbs777wzSPKKl156yY0C3aTVRhtA3ylvx7lc+R3A9NGwo3aHHnpokOB33nlnNwJ0l53TCmAIlL/tvFd+BzB9VB3UbtVVVw0S/KWXXupGgO6yc1oBDIHyt533yu8Apo+qg1rNnz8/SO7LLbfczDvvvONGge6y81oBDIHyt/K4nfvK8wCmi6qDWu25555BYt9nn33cCNBtdl4rgKFQHrdzX3kewHRRdVCbN998c2bppZcOEvsNN9zgRoFus/NaAQyF8rid+8rz//nPf9wogGmg6qA2F154YZDU11hjDTcCdJ+d2wpgSJTP7fxXvgcwPVQd1GaHHXYIEvoRRxzhRoDus3NbAQyJ8rmd/8r3AKaHqoNaPPfcc0EyV/z2t791o0D3xfMbGBLl8/gY+Nvf/uZGATSNqoNanHHGGUEi33DDDd0I0A92fiuAoVFet8fAj3/8YzcCoGlUHdTii1/8YpDIf/CDH7gRoB/s/FYAQ6O8bo8B5X0A00HVwcQeeuihIIkrFi1a5EaBfojnODA0yuvxcfDwww+7UQBNoupgYscdd1yQwL/85S+7EaA/7BxXAEOk/G6Pg7lz57oRAE2i6mBin/3sZ4MEfs4557gRoD/sHFcAQ6T8bo8D5X8AzaPqYCK33XZbkLwVr7zyihsF+iOe58AQKb/Hx8Ltt9/uRgE0haqDiXzrW98KEveuu+7qRoB+WbBgQRDAUCnP27x/8MEHuxEATaFhx0RWXnnlIHFffvnlbgQA0EfK8zbvqw4AaBYNO8Z29dVXB0l7hRVWcCMAgD5Tvrf5X/UAQHNo2DG23XffPUjY++23nxsBAPSZ8r3N/6oHAJpDw46xvPbaazNLLrlkkLBvvvlmNwoA6DPle5v/VQ9UFwA0g4YdYznvvPOCZD1r1iw3AgAYAuV9WwdUFwA0g4YdY9luu+2CRH3UUUe5EQDAECjv2zqgugCgGTTsqOzpp58OkrTi/vvvd6MAgCFQ3o9rwTPPPONGAdSJhh2VnXbaaUGC3mSTTdwIAGBIlP9tPVB9AFA/GnZUtummmwYJ+tRTT3UjAIAhUf639UD1AUD9aNgTtHDhwpmjjz56Ztttt13sWrf62f777z9zySWXuK0/MH/+/HfHmvTAAw8E90fx1FNPuVEAwJAo/8c14Q9/+IMbBVAXGvaEqAm3n7pXs64G/ZRTTnk/5syZ8/42GtfPFi1a9G5svPHG727fpGOOOeb9+6do+vaAVMydOzcIAO9RHbB1QXWiLvG+q4Z+X6FFMNVY1Uqgi2jYE3DbbbcFjbr+P2sF3dIqvJp3m5gUTTfQa621VnB7P/vZz9wI0G923isAvEd1wB4bqhN1U6Otd5Dt7cThF618xO9Q+1CNnTdv3sxLL73k9g6kj6rTMjXmNpFoFaAK/b5NSk027LfccktwXz/84Q/P/OMf/3CjQL/Zua8A8B7VAdUDe3z85je/caP1UlNub0f/HrVqrjE153ZRzId+plNJgS6g6rQobtZ1ess4tNpu99OUAw44ILgdgiAIgsiKAw880FWOemlRy95OlUUqNe5Zq+7j1l5gmmjYWxI365OujCsR+X015ROf+ERwnwmCIAgiK1QvmqDm2t5O1dqpBS6adnQRDXsL9BZdnDDq+CCMf8uvCVdeeWVwfwmCIAhiVKhu1G3Shl3ymnZOj0HKaNhboARjk0Rdl2L0q/ZNfJBmt912C+4zQRAEQYwK1Y261dGwiy72YPejUBPPB1GRKhr2KctKEnq1Xxetsus2ANQrPm4BTF9dDbtkXXWGU2OQKqrOlMUJQq/o66QP5NCwA/Wzx60CwPTV2bDrVFS7LwWr7EgVVWeKlATi5KBrqQNIX3zsApi+Oht2yfo+E51eCqSGqjNF+kBLnBh4+w3ohvjYBTB9dTfs8RXbFCykIUVUnSmKE42CT6UD3RAfuwCmr+6GPe+0GCA1VJ0pUmKJEwPnmwPdEB+7AKav7oZd7P58cB47UkPVmSIadqC74mMXwPQ10bBTm9EFVJ0pIikA3RUfuwCmj4YdQ0XVmSKSAtBdxx13XBAApo+GHUNFwz5FJAUAAMZHw46homGfIpICUJ0+/KWrKelLwXQM6QoO9hjSt/vqMmy6PFv8QTEdX3UU9C7L+jbHvOCDdkgdDTuGioZ9iuJEo5g3b54bBWCpedQxYxt0/b+Kq37uQw3pxhtv/P42at795VI1PuSGPeuSdXmhxxFInY5pO2/rOL7jRQAFkBpm5RRlfXESRRJYnI4VW0RVlIu+s0DNqYp5XHyH3LBXWV3X4wekru6GXQsDdn8KLQAAqaFhn7K4mdDb+UiDngv73OQFybxZcZNZ9V0oNZ52xV0xRH51XfNaTc2oUBMEdEHdDXvWQppOvwNSQ8M+ZVkrXpwr176sr6fOC22LZsTHx7iPtVbNbNM+RP6xJL+gT+pu2KnJ6Aoa9inLOqd00oRjLVy48N0EhGrKrq7zjkhz4sI56ec7dKz5d7SGxucZ3g1C39TZsOuFPe96oyto2Fugt9tsglAUnZ9bhl9VrGNfQ+JX1/XYKfmPCh7bZsRvS9fVaPriPrQVM/93824Q+qbOhj3el4JjBqmiYW9B/Ha9Qq/ytTo+Lr9PVter04qKHn89hpi+rFWuuhpsv+8hNez+b2alEH1UV8Nu34GbdF/ANNCwt0TNeZws9O9xmnbfrCtoOqvxq+t8yKg9cQGua3Xd03M7pHdG7OOppl0v4jXPyQ3ogzoadl8z7X5Uf9XEA6miYW9RXtOuhFS2uGrlUEWZZn08SvZ63EnU7dCcjY+BVL+bYMGCBUGkKOvxtKHmnbmOLpu0Yc9r1id5hxuYBhr2lil5+KYxTiB+ZTAusGrS1dT4pKMviqFZr06Pox4/TiNqj+axnfeKVAtnfD9TFDczeTHpO0rKSdpH3Pgol+k5LZOPtA/dXy04xE2XxnRcakz7VT5UnsubG/H2Cm0/pFOhhmKShl3zh2YdXUXDngi9ZW2LTZnQ9nwIcnz2hZKS+NBOnUhBXDwVqerC/VSTmvWYZoW2q/pCX9urMdbvq9HR/6uB0rGjf/t9KzflNUE6xnQ//bYK23QVveiIPxRYdXt0Wzy/y8xjzUU/b22w2IUuoWFPjBKLCpAKWNzAqyDq5yqOrAhMxq+uZ4UeZz0HJPLmxY99ldWyaYvva+q06qzmOG6mbVRp2rWdb5bU/MS/p3/bnKXbtHlK/5+3KOGfd99UqZHyLwSy8qC/bb+97pf+P297PRboNv8uin1ubWgO+HnjQ//OmnPaD+++oGto2DFIahDiJB6HCv2kq3MqCioOcSOjQlJ23351SL+nImRp/9qXxrRv3Y62zWvC4u31X23fRkOT9aKJhr0Zmg+aO/55t6FGp4h+3zfro7aPT3GKn08/L7O20zzU3Iznor1tH/p9f1xlNV4as9urkUc3lcnVo0JzR/vQ/NcL2LzcCKSOhh2Do4ZACTxr5SUrVPyrUpPtC41uRw2DCkbcSGibrAKin6mhjxsV37BrXM2NHbOhxsyublbdfhpUPOP7ocdjHP6xLhPj3ka8ny7S3I/nlCJ+IRiz8zarQfayXoRlvRjUXIu3UxOeJ+/FXV7zpZ/H2wJAl9GwY/DUPKg5jptpG1Wadu3Pr2RmNSFxs6IGyjYeui9ZK6EKNVbaVr+jbXS//AuB+Hd8k+K39z/Ti4es7bXNNOl+29tXTNpY6UVAVkOq0N+d1+CVEe+vq+x88KG5kPfYqOH22xXNEbutj6yGXew2ZZ53O1/LzFXt094GAHQZWQww1FzkNe5l3la3zfqo7ePVbrvCaRuneDvtU82Kb9wte9s+tDKp7dW8xI1TVuOmhndammjYRX9XvN8yDV6ReJ9dpscofocp7xQtezzYeZrHvuAcdQz4fSrKPO+2Aa+6vQIAuowsBmRQoxs3v4pRpwOIb4L0u3FDbcXNqn4vS3yur/Y76j5kNcGjmqb4tJQyDVld6jwlJha/ECnzYquI3Z+i6+LTTPIeI9vYjzptpSp72zTsADAaWQzIkbViPapR0Mqi366oQbTbKvIa9ripKmqo49NtyjSqdvsyjVBd4r/NRx3iZq2OFyJ2f4o+sI9T1nMfv1tR9IK1CrvfMvOu6L7G7PYKAOgyshgwQtwAK/LOybUrkWUaGzXT2lYvCvJOR6jasMsk25dphOpkb9uHHvNJxc0aDXs2+8Ix67mP51/ePB2H3W/VBrzq9goA6DKyGFBAzZ4t/Fnneccftquj6ZS+N+xxU6Wo47SLeL807NnsC9Ks536c+VeW3W+ZeWef06rbKwCgy8hiQAGdFmBPjclqWuLzsevS94Y9PjVIUccHRONmjYY9n/979OHSWDz/9CHoutj9Vm3Aq26vAIAuI4sBJRRdKUM/s81B3mkzVfW9YY9fDPmY9B2KuFmjYc9mz1HPOt0lPoddz1Vd7H6rNuBVt1cAQJeRxYAS7NVayjTsarTr0PeGXeIr4SgmXcmNmzUa9mx2fqk5zxK/oKpyHru/TGoWu8+qDXjV7RUA0GVkMaAE29hkNSxxw17X5e+G0LBLfBlGxSQveuJmrY6Gffbs2UH0gf/gc15TLfF3AejD1XnNfUzPQ96xYPdZtQGvur0CALqMLAaUYM9RzzrdJT6Hva5zfYfSsOsxjVdy9e+yjWEsbtbqaNj7Ro+tHuOixznrcwajGnzPv3OSt2+7v6oNeNXtFQDQZWQxoAQ1fCr6eR+IrHL5xyxqirJW7ofSsIsew7hp1+M9TtMeN2tDaNg13/R3ljllRY+pf1cj66pHMXvJUh9q2rOeG/3Mr9yP+h4Au6+qDXjV7RUA0GVkMaAE39yMaobiZrPsKrsaHP1u1gcth9Swix6DuDnUv6t+CDVu1obQsNv5p/ma95ipsS8zny3ty+/bhm5T81yPr8KePlN06ozdT9UGXPsuQsMOoE/IYkAB3zQXNRX2SjI+yjREanLUQGUZWsMuavKyHkv9rKhx12px3KipudPj2Hf2b/ahx0yPif5+/Vf/VpOtKLOybmkuZ91GVuS9APXiFwB589+yL0gURfyLEh9DmAMA+ouGHYOjwq1GtkwBV2PhG5yiU1w0bhsEH3kfutP2vrnMa550H+2+htCwe3p8shp3NeD6uf42hU67iJt0hX5WdgW5D/xpKEWhx27Uyvcomo9x4xyHHvdRx4rG4mZaoeMk637lzQO90M26He1D8yLeXrdZ9IIPAFJFw45BiVf2VPTzmhffnCjKFnr/Qbs44ibTNiy6D3kmbdh1m0Xs9ik17J6eH72g8Y25Hkt7nxV6jjSmv1dN+qiGsc/0OGk+2abaPzaam3U8Lno+tC/t096Gbrdo1d5vXxRe1lhW+BffWWNZAQBdQ+bCoMQNsELNhppBjSnU8Kn50Ng4q3JZq4F5of3nvWCQ+AXAqA/xSfyCpKgB123b7RUAACAtVGcMTtbb8XGoiS+zmp0nb6XdhprvUc26XjzYlVKF/p23iqlmPetv09+RdTtabfUvTGzoBcdQV6gBAEgRDTsGKX5LX6FTLdTAaoV9VCNdlppeNeW2ifanxoxatc96FyAr/Op52e0VVbYvWp0HAADTQcMOAAAAJIyGHQAAAEgYDTsAlBCfMgQAwLRQdQCgBBp2AEBbqDoAUAINOwCgLVQdACiBhh0A0BaqDgCUQMMOAGgLVQcASqBhBwC0haoDACXQsAMA2kLVAYASaNgBAG2h6gBACTTsAIC2UHUAoAQadgBAW6g6AFACDTsAoC1UHQAogYYdANAWqg4AlEDDDgBoC1UHAEqgYQcAtIWqAwAl0LADANpC1QEAAAASRsMOAAAAJIyGHQAAAEgYDTsAAACQMBp2AAAAIGE07AAAAEDCaNgBAACAhNGwAwAAAAmjYQcAAAASRsMOAAAAJIyGHQAAAEgYDTsAAACQMBp2AAAAIGE07AAAAEDCaNgBAACAhNGwAwAAAAmjYQcAAAASRsMOAAAAJIyGHQAAAEgYDTsAAACQMBp2AAAAIGE07AAAAEDCaNgBAACAhNGwAwAAAAmjYQcAAAASRsMOAAAAJIyGHQAAAEgYDTsAAACQMBp2AAAAIGE07AAAAEDCaNgBAACAhNGwAwAAAAmjYQcAAAASRsMOAAAAJIyGHQAAAEgYDTsAAACQMBp2AAAAIGE07AAAAEDCaNgBAACAhNGwAwAAAMmamfl/3tV1pLD26ssAAAAASUVORK5CYII= | As shown in the figure, what is the perimeter of trapezoid ABCD in cm? | A. 20; B. 21; C. 22; D. 24; E. No correct answer | D |
426 | 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 | As shown in the figure, HG is the axis of symmetry of trapezoid ABCD. There is a square with the same perimeter as this trapezoid. What is the side length of this square? | A. 3; B. 6; C. 9; D. 12; E. No correct answer | B |
427 | iVBORw0KGgoAAAANSUhEUgAAAtMAAAHPCAYAAACRCFZMAAAAAXNSR0IArs4c6QAAAARnQU1BAACxjwv8YQUAAAAJcEhZcwAAFiUAABYlAUlSJPAAADJnSURBVHhe7d0PrP11XT9wqYYxjMksh5EMYzmTYYw/xUjyO5LRHIxkGLNhDEYyzDSMYZATGEYyGoORDqMaxviTzHQYyTCGE5lGMpiTkQyiGskwBqMaxmDc3+8pn4+8Px/Oufecz/2cez7nfB6P7TX43ve5n3vuPe/P6/287/M5575qAwAA6ESYBgCAjoRpAADoSJgGAICOhGkAAOhImAYAgI6EaQAA6EiYBgCAjoRpAADoSJgGAICOhGkAAOhImAYAgI6EaQAA6EiYBgCAjoRpAADoSJgGAICOhGkAAOhImAYAgI6EaQAA6EiYBgCAjoRpAADoSJgGAICOhGkAAOhImAYAgI6EaQAA6EiYBgCAjoRpAADoSJgGAICOhGkAAOhImAYAgI6EaQAA6EiYBgCAjoRpAADoSJgGAICOhGkAAOhImAYAgI6EaQAA6EiYBgCAjoRpAADoSJgGAICOhGkAAOhImAYAgI6EaQAA6EiYBgCAjoRpAADoSJgGAICOhGkAAOhImAaY06te9apGATBeVgGAOQnTANSsAgBzEqYBqFkFAOYkTANQswoAzEmYBqBmFQCYkzANQM0qADAnYRqAmlUAYE7CNAA1qwDAnIRpAGpWAYA5CdMA1KwCAHMSpgGoWQUA5iRMA1CzCgDMaShh+pFHHtk4//zzNw477LDG/Tn22GM3rr766o0nn3yyuiUAiyJMA8ypDK6pZbjxxhs39t5771fcl7IyntsBsDjCNMCc2qF1p2U3un0fNiuBGmBxhGlgUCaFwc0qlzRMMum2m9W04wzNrbfe+qP7fMABB2xceumlG3fdddcPK5d25Psov6+68nkA9E+YBgYp4a99LXBdJ5988sb9999f3XJzCZl9HGcoEqBz3xOip8lOdPt7zSUfrqEG6J8wDQxWwl87FCYYzyvHaV9fnFC6auqQnB3orUwK1C73AOifMA0MWvuyhVwv3EX7ONmVXjW5z/NcjrIO3zPA0AnTwKC1A+Fmlzdspq/jLFN21+e5LKW8vjo1TxAHYDbCNDBowvRLcqnKvJe4tC+TEaYB+idMA4MmTG9P+T0L0wD9E6aBQROmt6fr95xd7UlvtZfd8Vy3nr++uJUcIy96rN9NpZSx3J/ynVbytaa9hd+k2+f/vagSWDZhGhg0Ybq79mUes15vnZ9N/e4nedFi/p2q35YvtdlfV8zXOeuss17xDiq1BOb2WFn53NK8twfYScI0MGjCdHflCxCzizuLBNP69pN2nxOu62Om2oG63DluV+T2+f/crg7pkz4n7w9e3j5Bvg72k24/bUcbYNGEaWDQhOnu6mCcmuVyiPr22QWedhlHdp3rY9a3zQ54rf7/9u1SuQ8JwnVQLpX3NZXgnNvn+JPeV7sO2XXluADLIEwDgzbEML1r165GDVFCbX1pxCxBswynW/1s6tvVNS2oty/NSGAug3epvL91ZTd6s0tT2jvUAMug+wCDNsQwXR4nNUT5/ur7N2knuK28Hnpa4K2Vt01NC9Ptn/lW2peQbHU/yu8xNcv3CdA3YRoYNGF6fuUu7yx/MbLclc7PaSvZLa4DdW4/LfTOG6bb4XgrwjQwBMI0MGjtQJYQl4/NW+1LCNY5TCdA537Neh1xeb1ydof7kp97fdzUVoRpYBUJ04xKvWO32XWYDEs7kPVV6xqmEyhznzLPZ3kv6CivPd7Oz6VNmN7+/M1jk2PkFyTvWALDJEwzKvXT2dmJYzW0w0jXsNfXcaI8Tmooyss75gmW5ffS57khTL8sv9i037GkrgTm+m3/6kp4nhTE8/hmfKvryYGdI0wzKvO8yIphEKZnV3+P014QOE35veQYfWn/zLeSx2Q7t1+Fyzza70Cy1c87fSqPZ/sypfQyz7DBMAjTjEb99Hddk967luHpKwT3dZwoj5MagnrXs8u8Lr+XhLa+CNOvVF/PXtdWYbqWUN0O4vNcygMsjjDNaLSfYs3ODsMnTG8tATr3o+slGu2Q1teOpzD9Su37PGuYjvIyni6fDyyGMM0oZPemXIDqWoXFd+yE6c318TqA9vs7z3usaYGu/TPfijC9tfbnp1zuAcslTDMKkxagVJ9vA8ZiCNPT1UF63kDWVu9slzVrQMvPcdp5JEy/Uvs+z/vYZXe6/PzUduYysH3CNKNQPzXavl4x5ZrDYROmJ0twzNfOJRrzvJg233f7uupJz9zMctwE7tx22lu2CdOv1L7P84bpKD8/ZVMAlkuYZu21d+/a1xxuJ1SxeML0KyXEZh7PG6Trc2HSL5Dt1xSkcvxpv2wmkNf3YRph+pXa97mPMN3lGEB/hGnWXr2gJ0hEezFLIGC4+grBfR0nyuOkdlICY+ZsKjvC+fdWleBbXxc9LfwmlJdvHVlWfnb5eaUSuvO167HNLgdp/8y30j43t3rWqH37fK9D177P+RnNY9KzCDkmsDzCNGutfhq6fOeOSYtRHbQZHmH6ZfXO8nZqs7le73hP+rxJtdV50z7WVrvo7RdCbhWO25dtrUKo3G6Ybn9+ahV+iYB1Jkyz1uqnrtuLbPsp7XkXNHbOEMP0nXfe2aid0EeQTm0VaPPLZnavJ31uXfnldLMAl68x6bKRfGzSbnNuP+lFkLkf075Ofh7tsF7v1g/ZdsJ0fk7t71nvguUTpllbWXiy2GTxaQeILNDlgpTa6illlqMd7LIb2UU7TK/ai7bK+9615vmeE1Zz+zK85WeYj7fPp1L75zyt6pA86+3rX37mPf7QdA3Tk37JyWOjb8HyCdOsrXrRym7YJO3rQ6fdjuWpfyEqa9o1v5uZdBx/tIdlaIfpzXbfc9lNdton7fLn8za7Xh3YOcI0a6sOy9N2btpPm0/awWZ5EhTaO3F1Zcd01iDR13GgD+0wPW9lLqd3AcMhTLOWspuThWezp1ATnNvXH1qklq98PGapaY/xpNtuVrM+3Q7b0Q7T6UG5dCkfLysfy5xs96hUAnWuMffLPwyDMM1ayiKURWerFyO1nz711D+wSO0wPcsvceljdU8rK0F7qNeGw5gI06ydXNaRhWaWYFzftiyLE7AoXcJ0bdI7nqSG/g4msO6EadZOvduchWcW7R0fL0QEFmU7YTomBWqv94DlEqZZK5Oug+5SFiZgEbYbpqP9TkSpHBdYDmGatVLv2mSxySI1a7UDuIUJWIQ+wvSk3em8KBFYDmGatVLv2Mx73bMXIgI7oY8wnbdzLI9RF7Aczj7WRgJ0FpQuOzSTFicv6mGaCy64oFEwqz7CdJTHqAtYDmcfayN/gCMLStf3is6iVi5MXRc51l85T1Iwqz7CdF7TUR6jLmA5nH2shfot7nLtc1ftv4iYmvbXE+fxzDPPbOy2226vOLZSajUr53PO6y76CNP1s3BlZTMBWA5hmrWQvxaWBSX/3Y72CxG3e7y45pprGsdUSq1+5bzuoo8w3X6NR8pfb4XlEaZZeeXb4W13J7kO5XXluNt9m7xjjjmmcUyl1OpXzusuthumJ72+wwumYbmEaVZevTj1saDkRYfthSrH7+rRRx99xfGUUutROb/n1f6FfZ4wnSDdfvYs/87HgeURpllp5S7NosJ0quti1d6FOvLII6sRVln5mKYYh5y/5ePe5RftvNtQeYz8e6tnvzKerzUpSM/7NqBA/6wCrKRczpFrBNuLS16E03VxSZBuL3R15etkMZv3MpJDDz20cZwrrriiGmGVlY9pinHI+Vs+7jm/Z5XeUb/j0KRK78l4+kxd2cXOzvWk2+e66T5eIA1sn1WAlTPpleyTatZQPevx6soiN4t77733FZ/7ve99rxpllbUfV8Yh52/7sc95vplpYXieyrNuOU4CdP76oRANw2IVgAX5oz/6o8aCeNxxx1UjrLrycU0xHjmPy8c+5zkwblYBWJCf//mfbyy6f/M3f1ONsOrKxzXFeOQ8Lh/7nOfAuFkFYAH+8R//sbHg/uRP/uTG//3f/1WjrLrysU0xHjmPcz6Xj3/Od2C8rAKwAO9///sbi+3v/M7vVCOsg/KxTTEuOZ/Lxz/nOzBeVgFYgNe+9rWNxfbv//7vqxHWQfnYphiXnM/l45/zHRgvqwD07HOf+1xjof3Zn/3ZaoR1UT6+KcYn53U5B3LeA+NkFYCenXTSSY1F9g/+4A+qEdbFhRde2CjGJ+d1eZ7nvAfGSZiGHj311FONBTZ19913V6PAush53T7Xc/4D4yNMQ4/yBxXKxfXAAw+sRoB1k/O7PN9z/gPjI0xDj44++ujG4nrRRRdVI8C6yfldnu85/4HxEaahJw8//HBjYU09+OCD1SiwbnJ+t8/59AFgXIRp6Mkll1zSWFSPOuqoagRYVznPy/M+fQAYF2EaenLwwQc3FtWrrrqqGgHWVc7z8rxPHwDGRZiGHtxzzz2NBTX1xBNPVKPAusp53j730w+A8RCmoQfnnHNOYzE94YQTqhFg3eV8L8//9ANgPIRp6MF+++3XWEyvv/76agRYdznfy/M//QAYD2Eatum2225rLKR77rnnxvPPP1+NAusu53vO+7IPpC8A4yBMwzadfvrpjUX0tNNOq0ZYV3feeWejIOd92QfSF4BxEKZhG1544YWNn/qpn2osol/+8perUdZV+XinIOd9OSfSF9IfgPVnFYBtuOGGGxoL6Bvf+MZqhHVWPuYpiJz/5bxIfwDWn1UAtuHd7353Y/H8wz/8w2qEdVY+5imInP/lvEh/ANafVQA6+q//+q/Gwpn6p3/6p2qUddZ+3CFy/rfnRvoEsN6sAtDRpz71qcai+Uu/9EvVCOuufNxTUEsfKOdG+gSw3qwC0NE73vGOxqL5J3/yJ9UI66583FNQSx8o50b6BLDerALQwXe/+93Ggpl66KGHqlHWXfuxh1r6QHt+pF8A68sqAB1cfPHFjcVy165d1QhjUD72KSilH5TzI/0CWF9WAejgoIMOaiyWn/70p6sRxqB87FNQSj8o50f6BbC+rAIwp2984xuNhTL15JNPVqOMQfvxh1L6QXuOpG8A68kqAHM6++yzG4vkiSeeWI0wFuXjn4K29IVyjqRvAOvJKgBz2nfffRuL5E033VSNMBbl45+CtvSFco6kbwDrySoAc7j11lsbC+Ree+218eKLL1ajjEU5B1LQlr6Q/lDOk/QPYP1YBWAOp556amNxPOOMM6oRxqScAymYJP2hnCfpH8D6sQrAjJ577rmNPfbYo7E43n777dUoY5K3PisLJkl/KPtF+kf6CLBehGmY0XXXXddYGPfff/9qBGCy9Imyb6SPAOtFmIYZHX/88Y1F8dxzz61GACZLnyj7RvoIsF6EaZjB448/3lgQU9/61reqUYDJ0ifavSP9BFgfwjTM4Morr2wshoccckg1ArC59Iuyf6SfAOtDmIYZvP3tb28shp/85CerEYDNpV+U/SP9BFgfwjRs4YEHHmgshKl//dd/rUYBNpd+0e4h6SvAehCmYQsXXnhhYxF85zvfWY0AzCZ9o+wj6SvAehCmYQtvfetbG4vgX/zFX1QjALNJ3yj7SPoKsB6EadjE17/+9cYCmHr66aerUYDZpG+0e0n6C7D6hGnYxIc+9KHG4vdbv/Vb1QjAfNI/yn6S/gKsPmEaNrHPPvs0Fr+bb765GgGYT/pH2U/SX4DVJ0zDFLfccktj4dt7772rEcaunBcpmFX6SDl30meA1WYVgClOOeWUxqJ35plnViOMXTkvUjCr9JFy7qTPAKvNKgATPPvssxu77757Y9G74447qlHGrpwXKZhV+kg5d9Jn0m+A1WUVgAmuvfbaxoJ3wAEHVCMgTLM96Sfl/Em/AVaXVQAmeNe73tVY7M4777xqBIRptif9pJw/6TfA6rIKQMtjjz3WWOhS9913XzUKwjTbk37SnkPpO8BqsgpAy+WXX95Y5A4//PBqBF5Szo8UzCt9pZxD6TvAarIKQMsRRxzRWOQuu+yyagReUs6PFMwrfaWcQ+k7wGqyCkDh29/+dmOBS/37v/97NQovac8RmFf6Snsepf8Aq8cqAIWPfexjjcXt2GOPrUbgZeUcSUEX6S/lPEr/AVaPVQAKb37zmxuL21/91V9VI/Cyco6koIv0l3Iepf8Aq8cqAJWvfvWrjYXtx3/8xzf+53/+pxqFl5XzJAVdpL+kz5RzKX0IWC1WAah84AMfaCxq733ve6sRaCrnSQq6Sp8p51L6ELBarAJQ+Zmf+ZnGovaFL3yhGoGmcp6koKv0mXIupQ8Bq8UqAP+fBY15lHMlBdvhF3lYbVYB+P/aT7X+3u/9XjUCsFjpN2X/cYkZrBZhmtHzIiBgmbz4GVabMM3oeXsqYNm8LSesLmGa0fOHE4Bl8wejYHUJ04yaP+kLDEH6TrsXpT8BwydMM2qXXXZZY/E64ogjqhGAnZX+U/aj9Cdg+IRpRu3www9vLF6XX355NQKws9J/yn6U/gQMnzDNaN13332NhSv12GOPVaMAOyv9p92T0qeAYROmGa3zzjuvsWi9613vqkYAliN9qOxL6VPAsAnTjNYBBxzQWLSuvfbaagRgOdKHyr6UPgUMmzDNKN1xxx2NBWv33XffePbZZ6tRgOVIH0o/KvtT+hUwXMI0o3TmmWc2FqtTTjmlGoGt7dq1q1HQp/Sjsj+lXwHDJUwzSnvvvXdjsbrllluqEdhaOXdS0Kf0o3J+pV8Bw2UVYHRuvvnmxkK1zz77VCMwm3L+pKBv6UvlHEvfAobJKsDovOc972ksUh/60IeqEZhNOX9S0Lf0pXKOpW8Bw2QVYFSefvrpxgKV+vrXv16Nwmzacwj6lr7UnmfpX0P2yCOPvOI+T6vzzz+/+ixYfVYBRuUzn/lMo6G/9a1vrUZgduUcSsEipD+V8yz9a8jOOuusxv3drBK8YV1YBRiVd77znY2GfuGFF1YjMLtyDqVgEdKfynmW/jVU8+xKJ3TDOrEKMBqTmv0DDzxQjcLs2vMIFiH9qT3XhrqjW+9KH3vssVuWXWnWjVWA0fjkJz/ZWJTe/va3VyMwn3IepWBR0qfKuZY+NjT1RkWCMoyRVYDROOSQQxqL0pVXXlmNwHzKeZSCRUmfKuda+tjQ1LvSt956a/URGBerAKPwrW99q7EgpR5//PFqFObTnkuwKOlT7fmWfjYUTz755A//qMwBBxxQfQTGxyrAKJx77rmNxej444+vRmB+5VxKwSKlX5XzLf1sKC699NIf3qcbb7yx+giMj1WAUdh///0bi9F1111XjcD8yrmUgkVKvyrnW/rZENS70vX9yjXTCdf3339/dQsYB6sAa+/2229vLER77LHHxnPPPVeNwvzK+ZSCRUq/St8q51z62rLVu9KTKpd92K1mLKwCrL0zzjij0eRPPfXUagS6KedTChYtfaucc+lry9TelZ5WCdXb3alOKD/55JMbXy/HzQsf77rrrupWm8uLI3OMfG77c3L87KrXxz7ssMN++IvCNO3b577k9vmZME5WAdbaiy++uLHXXnv9qOmlvOKc7brzzjsbBYuWvlX2sfS19Ldlyf1JoJwlUKe67FLnaySo5vPrgJsqg2xq2p8mz1v25fb1Meqqw3RCfo5bjpWVsTIgz3t7xkOYZq3ddNNNjWa37777ViMAqyX9q+xn6W9DkYB69dVXvyLoljVPoM5t8zkJ65N2n/O1ymO3/6piAnY5XlaOl2CcYydo57YJ3fXOdVn5eNS3T+V7nHb7acGe9SZMs9ZOPPHERqM7++yzqxGA1ZL+Vfaz9LchSlidFqpneWawDtJb3b69K16G7nqHOP9t70wniOdjk8J9+bVT+Rp1kE5Qbu8812Pl59idHh9hmrWVhlY2uNQ3vvGNahRgtaR/tXvakINbe/c4leC52X2u/5piKoF8M+3A3t6drrV3kHM5xmZ/0rx93NznzXbV27vgk3bSWW/CNGvr05/+dKPBHXTQQdUIwGpKHyv7WvrckLV3elP1pROT1H9NMbXVLnZ529S0MJ2vV95uq7Db/iVgq/uR45W33+z7Yz0J06ytXbt2NRrcxRdfXI0ArKb0sbKvpc8NXTuc5hKLScpd6dRWssNd7yLnmLnkYpJ5w3Q7HM97e2F6fIRp1tJDDz3UaG6p7373u9UowGpKH2v3tvS7oWtfOjHpUo9yFzuXVvRFmGbRhGnW0ic+8YlGc3vHO95RjQCstvSzsr+l3w3dLAG1vPZ4q+ul5yFMs2jCNGvpbW97W6O5fepTn6pGAFZb+lnZ39LvVkH5rhqTAmq5ez3tUpAuhGkWTZhm7Xzzm99sNLbU97///WoUYLWln7V7XPre0JXvqrFVmE71RZhm0YRp1s5HPvKRRmN797vfXY0ArIf0tbLPpe8NXRlqJ701XTtMT3tB4byEaRZNmGbtvPGNb2w0thtuuKEagX5ceOGFjYKdlr5W9rn0vaGrr4medglH+/2a8y4gfRCmWTRhmrXy5S9/udHUXvOa12y88MIL1Sj0o5xjKdhp6Wvpb+U8TP8bsnrnOaF5klnfQm+avM/0pB1vYZpFswqwVk477bRGUzv99NOrEehPOcdSsAzpb+U8TP8bqvIv0k7764O5rKP8flKz7k4n0E57Oz1hmkWzCrA2nn/++Y0999yz0dRuu+22ahT6U86xFCxD+ls5D9P/0geHqA60WwXN8h0/UgnIW107naCez5u24y1Ms2hWAdbG9ddf32ho++23XzUC/SrnWQqWJX2unIvpgzshf2AloXHaLnOp/mMshx12WPWR6Sb9+fEE6mmBNh9PkM5tpt0XYZpFswqwNk444YRGQzvnnHOqEehXOc9SsCzpc+VcTB9ctPa1zZuFx/q2CdKT/urhJOVb6JWVY2T3OV8v/y13sTe7HGS7YToBfzPCNFYB1sITTzzRaGape+65pxqFfrXnGixL+lx7PqYfLlI7nKYSbBNoEyxT+f+E34wlHM8apCO3rT93lsoLDzfTDue33nprNTLZPL8sRI5X3r7Pv97IarAKsBauuuqqRjM7+OCDqxHoXznXUrBM6XflfEw/XKRcTpHLKsqvOakSsLcKrtMkUCckTzpuXbkPm+1IRzsYpxLUp12Hnfvb/t7y72m70/nFYVLwz9ed5xcIVptVgLVw1FFHNRrZJZdcUo1A/8q5loJlSr8r52P64aIlKOZSi3aQzL8TgruG6LaE1RyvvKQjXyO7xZtdrz1p93xS1bvOs96+3nWe9/isN6sAK+/BBx98RQN7+OGHq1HoX3u+wTKl37XnZPoisDOsAqy8iy66qLGIHH300dUILEY531KwbOl75ZxMXwR2hlWAlXfggQc2FpGtrqGD7SrnWwqWrX1tcPoisDOsAqy0u+++u7GApJ566qlqFBajPedg2dL32vMy/RFYPKsAK+3DH/5wY/E46aSTqhFYnHLOpWAI0v/KeZn+CCyeVYCV9oY3vKGxeHzuc5+rRmBxyjmXgiFI/yvnZfojsHhWAVbWl770pcbC8drXvrYagcW68MILGwVDkT5Y9sX0SWCxhGlW1vve977GovH+97+/GgEYp/TBsi+mTwKLJUyzkn7wgx9svPrVr24sGl/5yleqUYBxSh8s+2L6ZPolsDjCNCvps5/9bGPBeNOb3lSNAIxb+mHZH9MvgcURpllJxx13XGOx+OhHP1qNAIxb+mHZH9MvgcURplk53/ve9xoLReree++tRgHGLf2w3SPTN4HFEKZZOVdccUVjkTj00EOrEQAifbHsk+mbwGII06ycI488srFIXHrppdUIAJG+WPbJ9E1gMYRpVsp3vvOdxgKRevTRR6tRACJ9sd0r0z+B/gnTrJSPf/zjjcXhmGOOqUYAKKU/lv0y/RPonzDNSnnLW97SWByuueaaagSAUvpj2S/TP4H+CdOsjK997WuNhWG33XbbeOaZZ6pR2Dl33nlno2CI0h/TJ8u+mT4K9EuYZmV88IMfbCwKJ598cjUCO6uchykYqvTJcq6mjwL9sgqwMl7/+tc3FoXPf/7z1QjsrHIepmCo0ifLuZo+CvTLKsBK+OIXv9hYEF73utdVI7DzyrmYgiFLvyzna/op0B+rACvht3/7txuLwVlnnVWNwM4r52IKhiz9spyv6adAf6wCDN7//u//bvzET/xEYzHwoi+WqZyLKRiy9Mtyvqafpq8C/bAKMHh//dd/3VgIfuEXfqEageUo52MKhi59s5yz6atAP6wCDN5v/MZvNBaBP/7jP65GYDnK+ZiCoUvfLOds+irQD6sAg/Yf//EfjQUgdf/991ejsBztOQlDl77Znrfpr8D2WQUYtD/7sz9rNP9f+ZVfqUZgeco5mYJVkP5Zztv0V2D7rAIM2i//8i9r/gxOOSdTsAramxPpr8D2WQUYLE9LMlTteQmrwGVzsBhWAQbLC2YYqnJepmBVeEE39M8qwGB5KyeGqpyXKVgV3moU+mcVYJD8kQGGrJybKVgV/ggW9M8qwCD587cM2a5duxoFqyT9tOyv6bdAd8I0g/S6172u0ey/+MUvViMAbEf6adlf02+B7oRpBufzn/98o9G//vWvr0YA6EP6atln03eBboRpBufkk09uNPkPfvCD1QgAfUhfLfts+i7QjTDNoDzzzDMbu+22W6PJf+1rX6tGAehD+mrZZ9N303+B+QnTDMo111zTaPBvectbqhEA+pT+Wvbb9F9gfsI0g3LMMcc0mvvHP/7xagSAPqW/lv02/ReYnzDNYDz66KONxp76zne+U40C0Kf013bPTR8G5iNMMxiXXnppo6kfeeSR1QgAi5A+W/bd9GFgPsI0g3HooYc2mvoVV1xRjQCwCOmzZd9NHwbmI0wzCPfee2+joaf+8z//sxoFYBHSZ9u9N/0YmJ0wzSB89KMfbTTz4447rhoBYJHSb8v+m34MzE6YZhDe9KY3NZr5Zz/72WoEhqecqylYZem35XxOPwZmZxVg6b7yla80GvmrX/3qjR/84AfVKAxPOV9TsMrSb9N3yzmdvgzMxirA0v3u7/5uo4m/733vq0ZgmMr5moJVl75bzun0ZWA2VgGW7rWvfW2jiX/pS1+qRmCYyvmaglWXvlvO6fRlYDZWAZbqb//2bxsN/A1veEM1AsNVztkUrIP033Jepz8DW7MKsFQnnXRSo3l/+MMfrkZguMo5m4J1kP5bzuv0Z2BrVgGW5qmnnmo07tTdd99djcJwtectrIP03/bcTp8GNmcVYGmuvvrqRtM+8MADqxEYtnLepmBdpA+Xczt9GticVYClOfrooxtN+6KLLqpGYNjKeZuCdZE+XM7t9Glgc1YBluLhhx9uNOzUgw8+WI3CsLXnLqyL9OH2/E6/BqazCrAUl1xySaNZH3XUUdUIDF85d1OwTtKPy/mdfg1MZxVgKQ4++OBGs77qqquqERi+cu6mYJ2kH5fzO/0amM4qwI675557Go069cQTT1SjMHzt+QvrJP24PcfTt4HJrALsuHPOOafRpE844YRqBFZDOX9TsG7Sl8s5nr4NTGYVYMftt99+jSZ9/fXXVyOwGsr5m4J1k75czvH0bWAyqwA76rbbbms06D333HPj+eefr0YBGIL05fTnsl+nfwOvJEyzo04//fRGcz7ttNOqEQCGJP257Nfp38ArCdPsmBdeeGHjNa95TaM5/8M//EM1CsCQpD+X/Tr9O30caBKm2TE33HBDozH/3M/9XDUCwBClT5d9O30caBKm2TG/+Zu/2WjKH/nIR6oRAIYofbrs2+njQJMwzY74/ve/32jIqW9+85vVKABDlD7d7t3p58DLhGl2xJ//+Z83mvHb3va2agSAIUu/Lvt3+jnwMmGaHfFrv/ZrjWb8iU98ohoBYMjSr8v+nX4OvEyYZuH+5V/+pdGIUw899FA1CsCQpV+3e3j6OvASYZqFu/jiixtNeNeuXdUIAKsgfbvs4+nrwEuEaRbuoIMOajThT3/609UIAKsgfbvs4+nrwEuEaRbqG9/4RqMBp5588slqFFZTdunKgnWXvt3u5envgDDNgp199tmN5nviiSdWI7C6yjmdgjFI/y7nffo7IEyzYPvuu2+j+d50003VCKyuck6nYAzSv8t5n/4OCNMs0K233tpovHvttdfGiy++WI3C6irndQrGIP07fbyc++nzMHZWARbm1FNPbTTdM844oxqB1VbO6xSMRfp4OffT52HsrAIsxHPPPbexxx57NJru7bffXo3CaivndQrGIn28nPvp8+n3MGZWARbiuuuuazTc/fffvxqB1VfO7RSMSfp5Of/T72HMrAIsxPHHH99otueee241AquvnNspGJP083L+p9/DmFkF6N3jjz/eaLSpf/7nf65GYfW15zeMSfp5+xxI34exsgrQuyuvvLLRZA855JBqBNZDOb9TMDbp6+U5kL4PY2UVoHe/+qu/2miyf/qnf1qNwHoo53cKxiZ9vTwH0vdhrKwC9OqBBx5oNNjUI488Uo3CemjPcRib9PX2eZD+D2NkFaBXF1xwQaO5/vqv/3o1AuujnOMpGKP09/I8SP+HMbIK0Ktf/MVfbDTXz3zmM9UIrI9yjqdgjNLfy/Mg/R/GyCpAb+66665GY009/fTT1Sisj/Y8hzFKf2+fC1kHYGysAvTm93//9xtN9T3veU81AuvlzjvvbBSMVfp82fezDsDYCNP0Zp999mk01ZtvvrkaAWAdpc+XfT/rAIyNME0vbrnllkZD3XvvvasRANZZ+n3Z/7MewJgI0/TilFNOaTTTM888sxoBYJ2l35f9P+sBjIkwzbY9++yzG7vvvnujmd5xxx3VKADrLP2+7P9ZD7IuwFgI02zbtdde22ikBxxwQDUCwBik75frQNYFGAthmm1717ve1Wii5513XjUCwBik75frQNYFGAthmm157LHHGg00dd9991WjAIxB+n57Lcj6AGMgTLMtl19+eaN5Hn744dUIAGOS/l+uB1kfYAyEabbliCOOaDTPyy67rBoBYEzS/8v1IOsDjIEwPXD333//xvnnn79x7LHHvuK9PPOxs846a+PGG2+sbv2yW2+99Ydji/Ttb3+7cX9S//Zv/1aNAjAm6f/tNSHrBKw7YXqgEpDLV0cnSCc8X3rppT+qk08++Ue3yXg+9sgjj/ywDjvssB/efpE+9rGP/ej+pRb99WAoLrzwwkYBL8k6UK4LWSf60j72vJXPT2WDKmts1krogzA9MHfddVcjROf/J+08l7J7nWBdNo3UosPtm9/85sbX+8u//MtqBNZbOe9TwEuyDpTnRtaJviUE55nX8uu0q95Qqqv9zG5dWWOvvvrqjSeffLI6OszPKjAgCc3lSZ7fnueRzy8bxiLD9Fe/+tXGff2xH/uxjf/+7/+uRmG9lXM/Bbwk60DWg/L8yHqxCAnM5dfJvzfbbc5YgnO5YVVXPpbLI6ELq8BAtIN0LtnoIrvU5XEW5QMf+EDj6yillFKTKuvFImTDqfw682wgJVRP2q3uuvYybsL0ALSD9HZ3lNMk6mMtyk//9E837rNSSik1qbJeLEKCb/l15l07s/kkUNMHYXrJ8rRT+2Tu40UR9dNYi/CFL3yhcX+VUkqpzerv/u7vqhWkP9sN0zEtULvkg3kI00uWk788gft6O7t6t3sRL6p473vf27jPSiml1GaVdaNvfYTpyAv/y+OkErC9KJFZCdNLNOkEzm/JfcnudL4G0K/2eQvsvL7CdEx6dxCXezArq8AStU/e/Cbcp7w4Q5iG/pXnbQrYeX2G6VxeWR4rZXeaWVkFliQnaPvEzXtFA8PXPneBnddnmI5Jf68hl0zCVqwCS5IXN7RPWk8pwWpon7vAzus7TLffWStlk4tZWAWWpN0EUl49DKuhfe4CO6/vMD3tUg/YilVgSXLSt09a1zfDamifu8DO6ztMR3m8ulw3zVasAksiTMPqap+7wM5bRJi2NtOFVWBJnLCwutrnLrDzhGmGwiqwJE5YWF0XXHBBo4CdJ0wzFML0kjhhAaA7YZqhEKaXxAkL88sLgfKuN/mDRDmH8kr78hzKX/3MW1nlLa7aLxrK+dXHYrvKJv2Vt2nlRVcMnTDNUAjTS9JuAqmrr766GgVKCXY5Z8rwnP/PwpeP15WweNhhh/3oNgnW9VtOZnzMYXrS235Nq/wcYehyTpfzto/zu/0Legq2YpYsyaQ/2mIBg1fKuVIucFkwt3pP9gTHLLTthXHMYXqeXen8/GDo+g7T+aW9PF4qv5zDVoTpJWov9HmKGnhZOwDO++xNQmG5U50ao3pXOj0mgWOzSkCBVdB3mJ60yZVLymArwvQSTdopcm0WvKR9fuQ66C6y21QG6jGqf5b6C+uk7zBtTaYrYXqJJl3DuN1mULr//vt/2Bxg1bQXte2+niDnWv1M0NjUfcbT1aybPsN0fun2bDFdCdNLlqeQypM3tdX1oLOod+P6OBbspPZTrX2FwHrhHdtOU/19d93Zh6HqM0y3j5VyzjArYXrJ2k9Bp/LbcXaVu6qPaVeaVTNpd6iv8Fsfe0xhuv6e7bCxjvoK0+UzV9s9FuMkTA9AgnP7RM6/uwTqOkin8v+wStqLY1+70rU8EzSmZ2vKn2cCdX7BnvQe3LCK+gjT9ZpZHifrbwI2zEqYHohpgTrNYtaFLztuWTAFaVZR5mz7HBjqe6/feeedjRqiST/PshKsBQZW2XbD9LQgvZ1nhhknYXpAcmKnGZQndn1y1ztq7cUvATqBo24I+SMVgjSrKPO4PfeHuqi17+cQtYPGtNruW3+lJ+UY7VCSXpbHdJZ+lGPk/tZv3VfKWIJ/xnLc9MP0uWlzo337VG4/tmvlx2A7YTrzR5CmL8L0AOVp2HIhmKVyey82ZJW1F7bUUK3C/UyAnPQznVS53by/hOf2Ca35/ISQ/H/CTYJ1/l0fO71pWkBJz8r9rG+bKgPRVr8QtF8gNu/tWW3t+T3LPM5crOdtWTai2A5hesBy0mdxyOLSDtdZrPLxLFx+k2YdlPM7Nc8u005r39ehy25tgms76JY1T6DO7eogk2DS/rz8u+xZ7R2//P+0DYP6ca8DT0JOHdIn9cH6a9e3z/3K/0+7fX4WrLb62YfysS0rc6CeN3Xl35PmXI7jWQu2S5gGli6LWXuRE6YXI+Ez4WJSqE4I2UoZpDe7ffuynfbjWYfgSbdLwEn4aQff8mvXlc/P7ROUJoWiduhKyGY1ZW6Uj+W8lbmTY2T+55fLeg7CdgnTwNJlYWsvfF3D9DwLbtev0T7OKkpQbQfTVILGZspwutmO3qRfkCbtCmeXun27BORppv3iNS0Y5ePt2wL0SZgGli4Brgw8fYSeBPRJYTGV3cnt7Eq1j7eqJu30lpdOtCUM17fL522mvG1dk8J0lLeZ5XEvd9W3uh+RY5ZfA6BPugqwdIsI09HelUzNEr620j7mKsvPqH0t6bQX6pW70lvtYEeOUwffzS6vqI+ZmuVxL8PxvLdPAfRJVwGWrs/LPNraO699XDNbHi+16tqXTkz7GZWhe7NLMeZVfm1hGlg1ugqwdJOug+0r9LSD1Cw7qlspj5daB1sF1PYu/2bXS8+rPO684Xje26cA+qSrAINQhp26+njbx3aQEqYnyyUZ9fczKaC2f+Hp8z2by+POG47nvX0KoE+6CjAI7cCT6uNSgvZxhenJynfVmBRQ22G6j59jrTzuvOF43tunAPqkqwCDUO6M1tXHiwXbQUqYnq7+fvJCw7Z2mM77QPelPK4wDawaXQUYhFyTO+kPiWz3Ug9hejblNdGTLuFoXzOdx6ov5XGFaWDV6CrAYLT/Gl5quzugwvRsyp3nBOdJ2r/szHPddN5jetKOd5THFKaBVaOrAIPSfiu71HbeOWIRYXrXrl2NWgd5O7z8fKYF3sgvNuXPMm+VNy14t+VxmHYNfHnMecPxvLdPAfRJVwEGJTuY7R3Q/HvW0NbWDlJ9vnBuXeRnm5/xVj/nSde1bxa+a/UzDtOOXR5PmAZWja4CDE6uk24H6uxYdwnUYwzT+YUk3+csl2HkZ1o/G5A/nrOV9l9LTCVQT3ps8rF6x9tfQATWla4CDFICdTu45d/zviBxjGG6/EUkQXnazyyhuw7Ss17/nGPVxy4rXzOXgeTnmyovCdnqcpDyOPOG4xx7K8I0sEi6CjBYCWDZ9SyDUCof2ypUZ5e1HaISvLZz/fWqKL/nuvIzy88k33/+m3/Xl3bMsiNdmnS5x7TK8Td7rNrhPOF+K+UvC6mt1L8w1DWGOQDsHGEaGLz6nSDKQJRKOM7H693QXErQDtCpfGyed55YdfWlFVtVfnab7RhvJoG0HWrblZ97Hrtpyp3xsnKN9aT7NW0eZBd80tfJMTIv2rffbLceYF7CNLAyEo6yi1qH5oTpdlBKwMtYQlcC9GZhbp3l55SQWQbe+meTsNrHzyWPR46VY5ZfI193q93u+vZbVW3S2KSqd50njU0qgO3SSQAAoCNhGgAAOhKmAQCgI2EaAAA6EqYBAKAjYRpgTt4RAoCaVQBgTsI0ADWrAMCchGkAalYBgDkJ0wDUrAIAcxKmAahZBQDmJEwDULMKAMxJmAagZhUAmJMwDUDNKgAwJ2EagJpVAGBOwjQANasAwJyEaQBqVgGAOQnTANSsAgBzEqYBqFkFAOYkTANQswoAzEmYBqBmFQAAgI6EaQAA6EiYBgCAjoRpAADoSJgGAICOhGkAAOhImAYAgI6EaQAA6EiYBgCAjoRpAADoSJgGAICOhGkAAOhImAYAgI6EaQAA6EiYBgCAjoRpAADoSJgGAICOhGkAAOhImAYAgI6EaQAA6EiYBgCAjoRpAADoSJgGAICOhGkAAOhImAYAgI6EaQAA6EiYBgCAjoRpAADoSJgGAICOhGkAAOhImAYAgI6EaQAA6EiYBgCAjoRpAADoSJgGAICOhGkAAOhImAYAgI6EaQAA6EiYBgCAjoRpAADoSJgGAICOhGkAAOhImAYAgI6EaQAA6EiYBgCAjoRpAADoSJgGAICOhGkAAOhImAYAgI6EaQAA6EiYBgCAjoRpAADoSJgGAICOhGkAAOhImAYAgI6EaQAA6EiYBgCAjoRpAADoSJgGAICOhGkAAOhImAYAgI6EaQAA6EiYBgCAjoRpAADoSJgGAICOhGkAAOhImAYAgI6EaQAA6EiYBgCAjoRpAADoSJgGAICOhGkAAOhImAYAgI6EaQAA6EiYBgCAjoRpAADoSJgGAICOhGkAAOhImAYAgI6EaQAA6EiYBgCAjoRpAADoSJgGAICOhGkAAOhImAYAgI6EaQAA6GRj4/8BJiLSho4Q1ZwAAAAASUVORK5CYII= | As shown in the figure, HG is the axis of symmetry of trapezoid ABCD. There is a square with the same perimeter as this trapezoid. What is the side length of this square? | A. 3; B. 6; C. 9; D. 12; E. No correct answer | B |
428 | 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 | As shown in the figure, there is a circular iron sheet. The line connecting two points A and B on the circle passes through the center of the circle, and the shortest distance from A to B is 10 cm. Which of the following four paths has a length of 10 cm? | A. ①; B. ②; C. ③; D. ④; E. No correct answer | B |
429 | 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 | As shown in the figure, there is a circular iron sheet. The line segment AB, connecting two points on the circle, passes through the center of the circle. The shortest distance from A to B is 10 cm. What is the radius of the circular iron sheet in cm? | A. 3; B. 5; C. 10; D. 12; E. No correct answer | B |
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 | As shown in the figure, there is a circular iron sheet. What is the volume in cm³ of a cylindrical iron bucket with this circular iron sheet as the base and a height of 10 cm? | A. 188π; B. 200π; C. 244π; D. 250π; E. No correct answer | D |
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iGVGnkOc9hmMrejd2GaDcyMLrn887757QxulM0/5nbnphdZ6mCHMcxHbtvHYq7iDZUtQ6az23cQj995hzlmmOhOY+zyu6QPILsrttHfsUtNb8r+3F/PP9M7zv/7vtVE00dgupyfnA8Mjjz/++Orz8p2CgtkCA8Pq33QaDlPgDqvx4c0333T3OUQpra6Y1FV25d/teD0bqux+XN9Xl+Zvyvhp70xAPGfLbjkVgxrl2Il+oMO7QbrlylfWe775W8A2VLqevpDZjvW8PgkHDQMBBgRSXfr7+9d9L5jdDSinNderXk/vtGTD1tWa+ricABxrR165wQ6p5ssIu3MOPN86lRWzS/m32iJhwfn5el+Ejo4O7zcr6OOt4IwlG7FK9HqPvHfeece7WhhYBXD+mdeiYf987sFWefS5BdgPz79M098Tv59grBL9ZnbDhbmvD1NAw4kqn376qfcMEjX6dCJYX0FbnhmrjLvh5sYq0ZfjvDMcc20OzECDuQ+rIZrtt4gB1pZeZgVFVLjvfTisEr0+4QatVG88Opfeahlt586dbnyflB+Y8NpszxV/5wk34bBK9ECvCTdTW46OiLCR+VtocDDxbPTyo+8zwq651uo62sKz7HJjnej1utDv+S0FDBy6qAXNHzsmpeMPz+UbVHUeBnMqcmOd6PX59OU6xxz53jgbz/xdNDzGdVI6hcJzGp5PHx7rRA90RyrXjICZXR+0gAYLwIbtqaKiUHhOoy24qPe7r3WsFL1e+8EbX05gfupBBWG9fJ2VBOMPzxXKoIQj1TyffpX8WCl6CN10kCgqseDFRydEOI/nqRWPPzyHASAfWAbgXuO5iM5wkM2PlaJHpzChO3SWKDK3YO7rnHASDnw3OjwHE78Q2irAIaUkP1aKHujsukIzCakcOjyHZRJm8ULonAkOtIWxVvS67hqedlJ9/OE5PC4EUnHN8yuyJ14dYK3oAZxspsMg5FNpsKzgBh0r+MNzmPHDoCMmb7/9tneV5MNq0aOTmA5TjVNvTEgK/9peEabDc1jTh3HGIdyqE6OQHk0KY7XoMbsYLzEcepXsNLriDw1Wh63rUYjXbHASJjxnwL4G5v6hjp6Ew2rRA+04qvRsH7RBh60Ve/jMJ06cCL3cgSWg0265o1F4rBc9ZncT4630bA8wqz399NOrnReNFXuF0WE6m84xKAfWix7o8F014rxBG3TAqVWOzLLs3XGZOnlYRrZvly+amuQL59+Rwydlavxu/g1HY4x/lmeYrjgoegf/bF8NTz5APbiu90crvWJvTu50vyRDB1Ny667PKbZ0V26lDsrQS91yJw7HqBaJXstzli8eit5Dz7Qwr6sFBhz/Bh3YBaa4ir2s3HNEPdo3JcvelRXmZHbwnMx4J4IsT/XJqDMo3KuhKR/3QQ+MnOWLh6L3gCdfh3+quQkDzFe9cy9aMRV7yxNdMtwxII+8xytgIGiVQedvjandwR+ef0OGQxz1HRf0brfF7nNIVqDoFdo5hBBatc+ywzbd/g06EG3IH8POyrcdbXLNd77X8lRKhpMJuej8DS167OGeaTsutyo026PYqdQiJPg4zH3AbE9nZ2lQ9AqsnXWxR9QnpIQhaIMOmP+5owwjMr6nR9adlpadkm9aEpLu6ZHLzuvXi17kXs8eGR/xHkQIUmYRooTfBIlRxfgqMNDhbEFzD3j2QOlQ9D4wC5mOhc4Zh9JYiAO7xpj3hYaZLnAJcvOUa9qvkZW7XdvkYoszEGQHZMx5rV/0OIRx+FS0u/xAtNpXEaZ6TqOXOwhxlubcJICiDwBhO9PBYObHJUXWv0EHGhyQ65YhPtE/Gjwql5KtknHPUMst+pGIT1LVg1bY6jkDBjfzWgzEdN5tDoo+AIhIm/lxSvHEOlafyYeG97p28IMy7+cckTcm5Iv/+kLmHZH9PHtGvnKe/9UZ5+f5Nb9A1OY9DgTR7zdM9ZwByxvt1yjmZCISDEWfA4hIh4biVHMP0xad3+QWoK159pUjz5nB4bgLbKvWwIxcOxSdIw9Wkq5mDFs9B/A5tT8DoVSa9ZuHos+DPjwhLut7DWZQZKb5d4kNDtmBjeb9I6znIwzZ6RBb2Oo5g17H43MWsyQguaHoC6CTdmBmVitbLxeYSTfOfrmSc9aLfvl2v1yOMDkHBUXm3hVTPQd01h0GXJ4ZWD4o+gJgfa/X0JhxaiM+HJSGOyMz587JzHd35Vbva5KOMA0Xg2OpyyOcK29eV+xrSWEo+hDArNSVcPi5VkxNU3DzZUuLpHftkrTz75cRF9z41+LFhOeQkKR9FeU4hYish6IPCUSuK7sw+1c7Yy8sEE4l/RF6C6tiwnN4j9o6YJptNFD0RQCTVQsfySZxn/GNMxKzJzapiNr7jRi6nqnDhucww2vB01MfHRR9kfhnI6SGxs25Z4Bo/DF9iCmqgQrbXunwXNjjouHw0wNFLVlRtQhFXwLYmknP+Pg5nU57v40XQRV7eL9RHP2kjwuD3yOMcJFvoN8b6uMp+Gih6EsEszv2WTedFbN/MZlmlQaprP6KvdI36NiIPioMs3ah8BwGI53ujLZ//36a9BWAot8EMJP9+9vBaRbXjhtUsQdTerMhSP/GFl1dXd5vgkGFoH+jkDjft3qDot8kevtm0yAsCCGOQFgQmH6/xWzQ4Qd/Dzv7mL9VaNchWBx6gEBjmWxloejLQLmFVAmCKvZKmW0RETCvx9/LZTUE+Rbw/Ch8CyQ/FH0ZCRISnFtxDesFVezl36BjPXBeaq97rkEOKbR6Awy0KKMIJD8UfZkJEhJmfRziEMc1K94TdrHR4oX5HWaPQP1Zg8JzELX26KPh/7H1QI+4QNFHADo0zF59eg0a1vpxPYnFVOzp9wvveqHwGT4rBjT9PHPNHy2A05MbYFQfij5CYCbDjNUdHw3lpsVUnFUKzMz6IEm09Rt05AdiRwag35TH4IfZvZiyWhIdFH0FQAzbv9ZHg8DiOPPBm+4391H5lguIGZVwOm/BNCTbxDVj0VYo+gqB0B52jfGb/EYYyD2P00yIdGOdUouG9blei2NNj2WMf1mAhtkegx2JHxR9hYEJjdCYP1aNBmsAA0Nc1v0YqPTON9hQBAMTxBy0bEHDuh0mvh4cSLyg6KsEBIV1rt/ZZRrW0jCz47D2f//996WxsVEOHz4cOFihIdQX57wEsgZFX2UgfqyX/WE+3TAwYMbFurkSgwA88cg5QG4+su30+l43DACY/emRry0o+hgBbz9m/yCHmG4QG8J/WGPDGoA/AB72Yk1q7K+HBBuUth45ckT27t27wfMe1GDaw8RnNVxtQtHHFMyehWbaXA2DAgYONFgQcBTC/DbXgl6Tr8FRhwEGg0OuNFtSO1D0NYDf3M7lByhXw8BgRM5wW/1B0ceFpbsyc/qkjO5rkfTzu2T4eefffYfl6ulx+SkgkgfTHGE1+ANgmmPNjxndzOa5rAMMGPg9HIV4PtbkeonABJr6h6KPAQ/HumVkx2tyLb2yQ2123hw7tSQ/pVMy+uxLcnWstL2qESJEmS/X38RA0VcZnBs/+nq/zDlqX57qk9GtydWjpwYbdsjEkCP27JRMHjzoHUJJyOag6KtJdkK+bu2QbxfwICNXtzlCb+2Ru4uOuB1z/0ZHo1xs6JTv8euFARlr7ZYf8DMhm4CiryLLOCK6FydNOuCI6URSxgZXHrq4B1C2SsbbhGe+95BcGeJsTzYHRV9Fvu/cI99MeQ/8mJl+m5rdp3pkuDPCM6WJFVD0VeOmZGDae4/WWDlkcmVdv1WufLHoXQcw8U/JA+8RIaVA0VeNXKJfkoezs/Lz5LBkXt8qg8k2mfRWAK7o2/rkZ+8RIaVA0VcRbd4/uv65TJ+7IvMrD1fInpfLzow/0ndv5THNe1IGKPoqoh15+Hkw8bJcdz35Hgv9MuqI/vL5FecdHXmkHFD01USH7LIjMt6YkEsHUnLrpmPe3xyXyfZGudh4VL7D7xmyI2WCoq8ybnLOwT6550zgy7fPy5Vdv5HPXCfeFrm065hM33Z+kb0t119ncg4pDxR9DHDTcJ91RO2l4a6BNNxeubyj9DRcQvxQ9HGhyIIbQkqFoifEMih6QiyDoifEMih6QiyDoifEMih6QiyDoifEMih6QiyDoifEMih6QiyDoifEMih6QiyDoifEMih6QiyDoifEMih6QiyDoifEMih6QiyDoifEMih6QiyDoifEMih6QiyDoifEMih6QiyDoifEMih6QiyDoifEMih6QiyDoifEMih6QqxC5P8Bym48SAIxD1AAAAAASUVORK5CYII= | As shown in the figure, there is a circular iron sheet. The line segment AB on the circle passes through the center of the circle, and the shortest distance from A to B is 10 cm. What is the volume of a cylindrical iron bucket with this circular iron sheet as the base and a height of 10 cm? | A. 188π; B. 200π; C. 244π; D. 250π; E. No correct answer | D |
432 | 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 | Given a parallelogram ABEC, what is the length of AB in cm? | A. 3; B. 4; C. 5; D. 6; E. No correct answer | A |
433 | 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 | Given a parallelogram ABEC, triangle BCE is translated 3 cm to the left to form a new triangle ADC. What is the shape of figure ABED? What are the lengths of AD and CD? | A. Right trapezoid, 4 cm, 3 cm; B. Rectangle, 5 cm, 3 cm; C. Parallelogram, 4 cm, 3 cm; D. Right trapezoid, 5 cm, 3 cm; E. No correct answer | A |
434 | 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 | Given a parallelogram ABEC, triangle BCE is translated 3 cm to the left to form a new triangle ADC. What is the area of the right trapezoid ABED in cm²? | A. 18; B. 20; C. 24; D. 25; E. No correct answer | A |
435 | 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 | Given a parallelogram ABEC, triangle BCE is translated 3 cm to the left to form a new triangle ADC. If AB = 3 cm, what is the area of quadrilateral ABED in cm²? | A. 18; B. 20; C. 24; D. 25; E. No correct answer | A |
436 | 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 | As shown in the figure, given that ABDO is a parallelogram, what is the relationship between AB and OD? | A. AB = OD, and AB is parallel to OD; B. AB < OD, and AB is parallel to OD; C. AB > OD, and AB intersects OD; D. Cannot be determined; E. No correct answer | A |
437 | iVBORw0KGgoAAAANSUhEUgAAAp0AAAHmCAYAAAAx2DWhAAAAAXNSR0IArs4c6QAAAARnQU1BAACxjwv8YQUAAAAJcEhZcwAAFiUAABYlAUlSJPAAADSnSURBVHhe7d2/biRXfjbgvQJBygwoMVbRZAyE2cAOJhhAqRRpE4MOnCgwwMQJE6dUxIiAMgcDWCGVKDEMTqBQAZVuIPgGBOgS9H3viL06deY02c2u6q5T9TzAi13NkM1md03327/6c/70GwAATEzpBABgckonAACTUzoBAJic0gkAwOSUTgAAJqd0AgAwOaUTAIDJKZ0AAExO6QQAYHJKJwAAk1M6AQCYnNIJAMDklE4AACandAIAMDmlEwCAySmdAABMTukEAGBySicAAJNTOgEAmJzSCQDA5JROAAAmp3QCADA5pRMAgMkpnQAATE7pBABgckonAACTUzoBAJic0gkAwOSUTgAAJqd0AgAwOaUTAIDJKZ0AAExO6QQAYHJKJwAAk1M6AQCYnNIJAMDklE4AACandAIAMDmlEwCAySmdAABMTukEAGBySifv+fnnn3/705/+9NsPP/zw8CfAsX399dfv/h2OkU8//fS3zz777Levvvrqt2+++ebdv3GAY1M6ec/mze7LL798+BPglL7//vt3xbEuk2U++uijd8WyzCeffNL82iS39+233z78BIDpKZ28J29emzcmExGYh19++WXwb3OTlMf83WNSWjPlrL938/0//fTTw1cCTEfpZCCTj/IN6fLy8uFvgFPL3ofy32eSieau8iEyX1/fRspsiinAlJROBurdcXkzAuahdZznPqVzozX1zL91E09gSkonf5cTh+o3osRxXzAPY5XO7I5vHe/5nNsC2JXSyd+1dt0lOeYLOL2xSmds+5DpqhXAVJRO3tlcJmlbvBHB6Y1ZOqM17cyud4ApKJ28kxOG8oaT47paE09vRHB6Y5fOfO+YtwfwGKWTwaVY8qa2bbebyyfBaY1dOlu3lwBMwasL71Yo2bzZbIpl60LUeYMCTmfs0tnaq5Fd7gBTUDr5+3Fd5S70+nqdyRwun/Sf//mffw+szdils/Xh0u51YCpK58rlgtCbN5v6Gn2tkwxOefmkFM3yvrx69WpQQkUOzdu3bx+2tnkas3RuO3kwez4ApqB0rlzesPJG03rjar3BnfLySSkF9f0RGTMffvjhw9Y2T2OWzm0XiH9qSU2A51I6V6ycdLQuiZQ3n/IN6bGvPQalU46R//qv/3rY4uZnrNLZOnwmye0DTEXpXLHNpOOxEwda05BTXT5J6ZRj5B//8R8ftrj5GaN0tm4jOdW/a2A9lM6VKqeYjx2nue24r1PsgqtL5z/8wz8M/vvjjz/+7d///d9Fdspf/vKXwfZT5vb29mGrm5dWYcwhL9n7sO2SZjlWO8du51q8reO0ExNO4BiUzpXavHntckb65rjPU79J1aXzr3/96+C/k7u7u9/+9re/iTyZFM96+9nk7OzsYaubl21Tyuck//Yz3dxWVgHGpnSu1GbisUt5LM9w3+SxXfJTqUtn/ju7Qss/++KLL5oFQ6TOY6Uzub+/f9jy5mNb6cy/x3w4rNO6JFKZfE3OVnfyEHAMSucKlScR7Ppm09otd+zLJ7VKZ076KP8sMe2UXVKXzj//+c+D//78888ftrz5aJXOFMenZBd7yuVjJTS735VPYEpK5wrlTSpvMvucOFCuWrTJLm92Y2qVzqinnefn582SIVKmLp2twzX+7//+7902NhfPLZ2lHP+57djOlFLFE5iK0rky5brq+xzLlTeizfrsZeoLyk9pW+msp50ffPBBs2SIlKlLZ/77xYsXgz/713/913fb2FyMUToj/563TT0VT2AqSufKtC6BdEiOeZmVbaXz119/fW/amV2FraIhskmrdN7c3Az+LJnTtHOs0hkpltsmnvn3AzA2pXNFtl3+6NAcayqyrXRG/XemnfJUWqUzf55Lb5V/Pqdp55ilM7ZdJD4x7QTGpnSuyOYN65Azz1uTkdzuMTxWOjPtLP8uubq6eq9oiGyyrXRmuyn/PEtjzmXaOXbpjNZhM8mxTxQElk/pXJHNm8shJbE1GTmkxO7jsdIZFxcXg7837ZTHsq10JvW0s97WTmWK0vnll1++d5vJsT5MAuuhdK7EpiymeB6y2yzf25qMHGMq8lTpNO2UffJY6WxNO+dgitLZus1E6QTGpnSuxGa3+Bgn/uQkg/oN6tA3vl08VTojx9+VX5OJVVk0RDZ5rHT++OOP7007r6+vH7ay01E6gZ4pnSvw3MskbbPthKSpL5+0S+lsTTtzRnJZNkSSx0pn6+/nMO2conTm++vbTPK6ATAmpXMFNsdsjTmNbL1RTX35pF1KZ9TTzlx7sSwTIslTpTPTzvLvk1wT9pTGLp05XKa+veRYx2kD66J0Llw5lRzzuMvWCUXJlJdZ2bV05kzj8uuS7777blAoRJ4qnUlWtyq/5tTTzrFL57br9mYFMoCxKZ0LV76pjGnbhGTKi0rvWjoj62aXX/v69ev3CoWsO7uUzrlNO8csnds+OGZFIoApKJ0LVh7LOeau9Y1ty+hNdWznPqXz/v5+8LXJ3d3de6VC1ptdSmfyxRdfDL4uq1+dSuvyRvv+284HxtbJgIklMIEpKZ0LlTeO8kLuh14qqZbb2nZR6aneuPYpnXF2djb4+pSHVqmQdWbX0tmadt7e3j5sZcez7d9c/p1///33T54kmA+DmZSWrwtlUl6n+HcLsKF0LkzeWHI8VuuNJWUwu9QOmUTmTSlvcNumnJvkzTH3Y4yz5Tf2LZ0pBuXXJ6adssmupTOpp535QHNMu/yb2yRflwK5yVPft3ldAJia0rkg5e70XbKv1vFku2Tf3X/b7Fs6I7tCy+8x7ZRN9imd+bBSfm2SQzim9Nx/b49lU0Szez1Fc8wPhQBPUTrpxnNKZ076KL8nS2OadkqyT+lMcjJa+fU5WQ2A3SmddOM5pTPqaedT5ULWkX1LZy67VX59kstzAbAbpZNuPLd0tqadrVIh68q+pTOpl8bMQgQA7EbppBvPLZ1ZGrOeduaYtlapkPXkOaXz6upq8D2JaSfAbpROuvHc0hn195p2ynNKZ2LaCfA8SifdOKR0ZtpZfm+SqVWrVMg68tzSWU87szSmaSfA05ROunFI6YyLi4vB95t2rjvPLZ1JPe3cd1sEWCOlk24cWjpNO6XMIaWzNe0E4HFKJ904tHRGjr8rbyMTq1apkOXnkNKZpTHraef19fXDVgZAi9JJN8Yona1p583NTbNYyLJzSOlM6u837QR4nNJJN8YonVFPO1+8eNEsFbLsHFo6M+0svz/JNWEBaFM66cZYpTNnGpe3k2S1mVaxkOXm0NKZZC3/8jZMOwG2UzrpxlilM7JudnlbWVe7VSpkuRmjdJp2AuxO6aQbY5bO+/v7wW0ld3d3zWIhy8wYpTOpp51Z/QqA9ymddGPM0hlnZ2eD20t5aJUKWWbGKp2taeft7e3DVgbAhtJJN8YunSkG5e0lpp3ryVilM6mnnflAA8CQ0kk3xi6dkV2h5W2adq4nY5bOnIhW3lZiaUyAIaWTbkxROnPSR3mbWRrTtHMdGbN0Jrn0Vnl7uTQXAH9QOunGFKUz6mnnoeVD+sjYpfPNmzeD20tMOwH+oHTSjalKZ2va2SoVsqyMXTqTemlM006APyiddGOq0pmlMetp5+XlZbNUyHIyRem8uroa3GZi2gnwO6WTbkxVOqO+bdPO5WeK0pmYdgK0KZ10Y8rSmWlnedtJplatUiHLyFSls552ZmlM004ApZOOTFk64+LiYnD7pp3LzlSlM6mnnWNvqwA9UjrpxtSl07RzXZmydLamnQBrp3TSjalLZ+T4u/JnZGLVKhXSf6YsnVkaM5Py8vZzlQSANVM66cYxSmdr2nlzc9MsFtJ3piydyfn5+eD2TTuBtVM66cYxSmfU086sNNMqFdJ3pi6dmXaWt5+YdgJrpnTSjWOVzpxpXP6cJGtrt4qF9JupS2eStfzLn2HaCayZ0kk3jlU64/PPPx/8rNevXzdLhfSbY5RO006APyiddOOYpfPt27eDn5Xc3d01i4X0mWOUzqSedp6dnT1sZQDronTSjWOWzqiXxkx5aJUK6TPHKp35sFL+nOT+/v5hKwNYD6WTbhy7dGY3aPnzEtPO5eRYpTPJ4Rnlz3r16tXDVgawHkon3Th26QzTzuXmmKUzJ6KVPyuxNCawNkon3ThF6aynnbngt2nnMnLM0pnk0lvlz8uluQDWROmkG6conVFPO6cuJ3KcHLt0ZpGB8uclpp3AmiiddONUpbM17WyVCukrxy6dSZZVLX+maSewJkon3ThV6czSmPW08/LyslkqpJ+conReXV0NfmZi2gmshdJJN05VOqP+2aad/ecUpTOpp50XFxcPWxnAsimddOOUpTPTzvJnJ5latUqF9JFTlc562pmlMbN9ASyd0kk3Tlk6I8fflT/ftLPvnKp0ZmnMetp5fX39sJUBLJfSSTdOXTpNO5eVU5XOpP7ZmXYCLJ3SSTdOXTqjnnZmYtUqFTL/nLJ0ZtpZ/uwkV0kAWDKlk27MoXTmTOPyPiRv3rxpFguZd05ZOpPz8/PBzzftBJZO6aQbcyidUU87X7582SwVMu+cunSadgJro3TSjbmUzvv7+8H9SCyN2V9OXTqTrOVf3odcDxZgqZROujGX0hlnZ2eD+5Ly0CoVMt/MoXS2pp23t7cPWxnAsiiddGNOpfPt27eD+5KYdvaVOZTOpJ525gMNwBIpnXRjTqUz6qUxTTv7ylxKZz6slPcjySEcAEujdNKNuZXOnPRR3p/EtLOfzKV0Jq9fvx7cl88///xhKwNYDqWTbsytdIZpZ7+ZU+n87rvvBvclyeW5AJZE6aQbcyyd9bQzS2OadvaROZXO5MWLF4P7k0tzASyJ0kk35lg6o552nrq8yG6ZW+m8ubkZ3J/EtBNYEqWTbsy1dF5fXw/uV6adrVIh88rcSmeSZVXL+2TaCSyJ0kk35lo6f/3113dLGJb37erqqlkqZD6ZY+nMdlPep2xXpp3AUiiddGOupTMuLi4G9820c/6ZY+lM6mnnnLZzgEMonXRjzqUz087yviWmnfPOXEtna9oJsARKJ92Yc+mMHH9X3r9MrFqlQuaRuZbOLI1ZTztz3DBA75ROujH30mna2VfmWjqT+r6ZdgJLoHTSjbmXzqinnbn2YqtUyOkz59KZaWd535JcExagZ0on3eihdOZM4/I+JlltplUs5LSZc+lMzs/PB/fPtBPondJJN3oonZF1s8v7+fLly2apkNNm7qXTtBNYGqWTbvRSOu/v7wf3M7E05vwy99KZZC3/8j5m9SuAXimddKOX0hlnZ2eD+5ry0CoVcrr0UDpb087b29uHrQygL0on3eipdKYYlPc1Me2cV3oonUk97cwHGoAeKZ10o6fSGdkVWt5f0855pZfSmQ8r5f1McggHQG+UTrrRW+nMSR/l/U1MO+eTXkpn8vr168F9zclqAL1ROulGb6Uz6mlnLoPTKhVy/PRUOnPZrfK+Jrk8F0BPlE660WPprKedH3zwQbNUyPHTU+lMstBAeX+zEAFAT5ROutFj6czSmPW08/Lyslkq5LjprXTe3NwM7m9i2gn0ROmkGz2Wzqjvt2nnPNJb6Uw+/vjjwX027QR6onTSjV5LZ6ad5f1Orq6umqVCjpceS2e2m/I+Z2lM006gF0on3ei1dMbFxcXgvpt2nj49ls6knnb29O8AWDelk270XDpNO+eXXktna9oJ0AOlk270XDojx9+V9z8Tq1apkOOk19KZpTHraef19fXDVgYwX0on3ei9dLamnTkjuVUsZPr0WjqT+r6bdgI9UDrpRu+lM+ppZ6692CoVMn16Lp2Zdpb3Pck1YQHmTOmkG0sonTnTuPwdkqw20yoWMm16Lp1JVrcq779pJzB3SifdWELpjKybXf4eWVe7VSpk2vReOk07gd4onXRjKaXz/v5+8Hskd3d3zWIh06X30pl88cUXg98hq18BzJXSSTeWUjrj7Oxs8LukPLRKhUyXJZTO1rTz9vb2YSsDmBelk24sqXSmGJS/S2LaedwsoXQm9bQzH2gA5kjppBtLKp2RXaHl72PaedwspXTmw0r5eyQ5hANgbpROurG00pmTPsrfJ0tjmnYeL0spnUlORit/l5ysBjA3SifdWFrpjHra2XPx6S1LKp257Fb5uyS5PBfAnCiddGOJpbM17WyVChk/SyqdSb00ZhYiAJgTpZNuLLF0ZmnMetp5eXnZLBUybpZWOq+urga/T2LaCcyJ0kk3llg6o/69TDuPk6WVzsS0E5gzpZNuLLV0ZtpZ/l5JplatUiHjZYmls552ZmlM005gLpROurHU0hkXFxeD3820c/ossXQm9bRzSf9OgL4pnXRjyaXTtPP4WWrpbE07AeZA6aQbSy6dkePvyt8vE6tWqZBxstTSmaUx62nn9fX1w1YGcDpKJ91YeulsTTtvbm6axUIOz1JLZ1L/bqadwBwonXRj6aUz6mnnixcvmqVCDs+SS2emneXvluSasACnpHTSjTWUzpxpXP6OSVabaRULOSxLLp1J1vIvfz/TTuDUlE66sYbSGVk3u/w9s652q1TIYVl66TTtBOZG6XzETz/9NHjB5rTWUjrv7+8Hv2dyd3fXLBby/Cy9dCb1tDOrXwGciia1xS+//PLbJ598MnjB5rTWUjrj7Oxs8LumPLRKhTw/ayidrWnn7e3tw1YGcFya1BZZ/7p+sea01lQ6UwzK3zUx7Rw3ayidST3tzAcagFPQpBq+//77wYv0JpzWmkpnZFdo+fuado6btZTOnIhW/p6JpTGBU9CkKtmt/tFHH733Ip1wWmsrnTnpo/x9szSmaed4WUvpTHLprfJ3zaW5AI5Nk6p89tln716UW8WT01pb6Yx62rnkYnTsrKl0vnnzZvC7JqadwLFpUoVvvvnm3YtxCmdrFzuntcbS2Zp2tkqF7J81lc6kXhrTtBM4Nk3qQXl5pBTOH374YfACnXBaayydWRqznnbmJLdWqZD9srbSeXV1Nfh9E9NO4Jg0qQeffvrpuxfhvKGH0jk/ayydUf/epp3jZG2lMzHtBE5Jk/r/NpdHSvHcUDrnZ62lM9PO8vdOMrVqlQrZPWssnfW0M0tjmnYCx7L6JrUplzmOM7vYN5TO+Vlr6YyLi4vB727aeXjWWDqTetq5pn9HwGmtukmVl0fKSUSlsUtnflZ+xpdffjk4Mz7/P2fM5+9+/vnnh6/eTUryV1999e42vv7664c//UNuL1PczaEDSf5/vjb35zHffvvt38/k39zP3Pc8Lqey5tJp2jl+1lo6W9NOgGNYdelMicqLbv63NmbpTMkri2bKXFIvs7mtPNZSCMsimdTfl/8u/75OflY52d3I713frzopuqew5tIZOf6u/P0zsWqVCtktay2dWRozk/Lyd89VEgCmttrSWV4eqTX1G6N0ZtK4KYf5OfU0NXKmfFlIk1ap20wt66/dpCyd+f7W19Spf/eU2dbXtdL6Xaa29tLZmnbe3Nw0i4U8nbWWzuT8/Hzwu5t2AsewytKZCd+mvG3bXXxo6Sx/Rv63NVXcaE0l68llCmfKZP68NYncfP2mcG522ef3SLYV0c33lYUzk9/N9+Z/y93sm9SF9RjWXjqjnnZmpZlWqZCns+bSmWln+bsnpp3A1FZZOjfTx83lkVoOKZ0pY+Xu76emgq2f9Vipy9Sz/vqUxxTLFNLcXktrkpmfs/nzlMttx5W2Smu+75iUzt/enWlcPgZJ1tZuFQt5PGsunUnW8i9//1wPFmBKqyudKWd5gU0pfMwhpXNzCaYkJXAX5c/ZZFt5jM0UdZP8dyaUT00fn5p4bpPbrX9mbuuYlM7fvXr1avA4vH79ulkq5PGsvXSadgLHtqrSuSmSKU+P7e6O55bOegq567GPrV3Y26aOUX9962Soltbyns+9j/nvY1I6f/f27dvB45Dc3d01i4Vsz9pLZ1JPO8/Ozh62MoDxraZ0ZlK3ORZyl5L13NJZTjmTp8rtRr5uU+pSip+6j3UBfGpSudH6vR6bqJY2U+JNlM7TqZfGTHlolQrZHqXzb+8+rJSPQXJ/f/+wlQGMazWl87HLI7U8t3TWJ/lM5bmlM8rvS5TO/mQ3aPlYJKad+0Xp/D05PKN8HHL4BsAUVlE6NyfKZIL41DGPG88pna0TfKYyh9KZHJPSOWTaeViUzt+TE9HKxyGxNCYwhcWXzhTBzQkwu5areE7pfM73PJfSqXTW085c8Nu0c/conX8kl94qH4tcmgtgbIsvnZtytk8pi+cUyNYliaaidCqdUU8711yc9o3S+UeyyED5WCSmncDYFl06czJO/UI6dkrHLGVKp9IZrWlnq1TI+1E6h8myquXjYdoJjG3RpbNVksZOqVVydy10+1I6lc7I0pj1tDNXUGiVChlG6Rzm6upq8Hgkpp3AmJTOA1Nq7ZLf9RqY+1I6lc6N+nEx7dwtSuf7qaedFxcXD1sZwOEWXTpzjGXK2XNSLmO5SevrSrnWZv09T618tE3Osq9vv5S/K3+O0rlemXaWj0uSqVWrVMgfUTrfTz3t/PDDD99tXwBjWHTpPERrarmL+nuSXUtdKQXvsWuKKp1KZynH35WPjWnn01E630+WxqynndfX1w9bGcBhlM4tnls6NxehL7PvtHMzMc2kdhulU+ksmXbuH6WznfpxybQTYAxK5xbPLZ2tyyYlu5bC7FZPSX3qQvZKp9JZq6edmVi1SoX8HqWznUw7y8clyVUSAA6ldG7x3NIZ9VKYmzxVDHMh+82xpE99rdKpdNZypnH5+CRv3rxpFgtROh/L+fn54LEx7QTGoHRucUjpbH3vJimLmYaWU8x8fS5zs1k5aZfd8XXp/Oqrrx7+5mnl9yVK53LU086XL182S4UonY/FtBOYgtK5xSGlM7btZn8qKZ45pvMpm4noJimhu2itD//9998//O3jlM75u7+/HzxGiaUx21E6H0/W8i8fn1wPFuAQSucWh5bO2Ld47lo4W8Uxu/R30bpPmbLuoi66ya5T0jEonbs5OzsbPE4pD61SsfYonY+nNe28vb192MoA9qd0bjFG6YzczrZjPMvkrPfHThzaSCltlb8ku9i3ldbcdgrnZhd+nUwxU2Zbcputs/KT3JddJ6WHUjp38/bt28HjlJh2vh+l8+nU0858oAF4LqVzi7FK50YKX4pbWfpS2FIUd5kWtnZtP5Z8/Ubr7x/L5v4c8jOnoHTurl4a07Tz/SidTycfVsrHKMkhHADPoXTSDaVzdznpo3ysEtPOYZTO3fL69evB4/T5558/bGUA+1E66YbSuR/TzsejdO6W7777bvA4Jbk8F8C+lE66oXTup552ZmlM084/onTunhcvXgweq1yaC2BfSifdUDr3V087Fas/onTunpubm8FjlZh2AvtSOumG0rm/6+vrwWOWaWerVKwxSud+ybKq5eNl2gnsS+mkG0rn/n799dfBY5ZcXV01S8XaonTul2w35eOVpTFNO4F9KJ10Q+l8nouLi8HjZtr5e5TO/VNPO/0bBPahdNINpfN5TDvbUTr3T2vaCbArpZNuKJ3Pl+PvyscuE6tWqVhTlM79k6Ux62lnjhsG2IXSSTeUzucz7Xw/SufzUj9upp3ArpROuqF0Hqaedubai61SsZYonc9Lpp3l45bkmrAAT1E66YbSeZicaVw+fklWm2kVizVE6Xx+zs/PB4+daSewC6WTbiidh8u62eVj+PLly2apWEOUzufHtBN4DqWTbiidh7u/vx88hslal8ZUOg9L1vIvH7+sfgXwGKWTbiid4zg7Oxs8jikPrVKx9Cidh6U17by9vX3YygDep3TSDaVzHCkG5eOYrHHaqXQennramQ80ANsonXRD6RxPdoWWj+Uap51K5+HJh5XyMUxyCAdAi9JJN5TO8eSkj/KxTNY27VQ6x8nr168Hj2NOVgNoUTrphtI5rnramcvgtErFUqN0jpNcdqt8HJNcngugpnTSDaVzXPW084MPPmiWiqVG6RwvWWigfCyzEAFATemkG0rnuLI0Zj3tvLy8bJaKJUbpHC83NzeDxzIx7QRqSifdUDrHVz+ma5p2Kp3j5uOPPx48nqadQE3ppBtK5/gy7Swf0+Tq6qpZKpYWpXPcZLspH88sjWnaCZSUTrqhdE7j4uJi8LiuZdqpdI6fetrp3yhQUjrphtI5jbVOO5XO8dOadgJsKJ10Q+mcTo6/Kx/bTKxapWJJUTrHT5bGrKed19fXD1sZsHZKJ91QOqfTmnbmjORWsVhKlM5pUj+upp3AhtJJN5TOadXTzlx7sVUqlhKlc5pk2lk+rkmuCQugdNINpXNaOdO4fHyTrDbTKhZLiNI5XbK6VfnYmnYCoXTSDaVzelk3u3yMs652q1QsIUrndDHtBFqUTrqhdE7v/v5+8Bgnd3d3zWLRe5TOafPFF18MHt+sfgWsm9JJN5TO4zg7Oxs8zikPrVLRe5TOadOadt7e3j5sZcAaKZ10Q+k8jhSD8nFOljjtVDqnTz3tzAcaYL2UTrqhdB5PdoWWj/USp51K5/TJh5XyMU5yCAewTkon3VA6jycnfZSPdZbGXNq0U+k8TnIyWvk452Q1YJ2UTrqhdB5XPe1cWilTOo+TXHarfJyTXJ4LWB+lk24oncfVmna2SkWvUTqPl3ppzCxEAKyP0kk3lM7jytKY9bTz8vKyWSp6jNJ5vFxdXQ0e68S0E9ZH6aQbSufx1Y/5kqadSudxY9oJKJ10Q+k8vkw7y8c8ydSqVSp6i9J53NTTziyNadoJ66J00g2l8zQuLi4Gj/tSpp1K5/FTTzv9G4Z1UTrphtJ5Gkuddiqdx09r2gmsh9JJN5TO08nxd+Vjn4lVq1T0FKXz+MnSmPW08/r6+mErA5ZO6aQbSufptKadNzc3zWLRS5TO06R+3E07YT2UTrqhdJ5WPe188eJFs1T0EqXzNMm0s3zck1wTFlg+pZNuKJ2nlTONy8c/yWozrWLRQ5TO0yVr+ZePvWknrIPSSTeUztPLutnlc5B1tVulooconaeLaSesk9JJN5TO07u/vx88B8nd3V2zWMw9SudpU087s/oVsGxKJ91QOufh7Oxs8DykPLRKxdyjdJ42+bBSPv7J27dvH7YyYImUTrqhdM7D7e3t4HlIepx2Kp2nTz3tfPXq1cNWBiyR0kk3lM75yK7Q8rnocdqpdJ4+ORGtfA4SS2PCcimddEPpnI+c9FE+F1kas7dpp9I5j+TSW+XzkEtzAcukdNINpXNe6mlnb6VN6ZxH3rx5M3geEtNOWCalk24onfPSmna2SsVco3TOJ/XSmKadsExKJ91QOuclS2PW087Ly8tmqZhjlM755OrqavBcJKadsDxKJ91QOuenfk56mnYqnfOKaScsn9JJN5TO+cm0s3xOkkytWqViblE655V62pmlMU07YVmUTrqhdM7TxcXF4HnpZdqpdM4v9bTTv3FYFqWTbiid89TrtFPpnF9yTHD5nGTaCSyH0kk3lM75yvF35XOTiVWrVMwpSuf88uOPP76blJfPS66SACyD0kk3lM75ak07b25umsViLlE655nz8/PB82LaCcuhdNINpXPe6mlnVppplYq5ROmcZzLtLJ+XxLQTlkHppBtK57zlTOPy+UmytnarWMwhSud8k7X8y+cm14MF+qd00g2lc/5evXo1eI5ev37dLBVziNI535h2wjIpnXRD6Zy/t2/fDp6j5O7urlksTh2lc96pp51nZ2cPWxnQK6WTbiidfaiXxkx5aJWKU0fpnHfyYaV8fpL7+/uHrQzokdJJN5TOPmQ3aPk8JXOcdiqd808Ozyifoxy+AfRL6aQbSmc/eph2Kp3zT05EK5+jxNKY0C+lk24onf2op5254Pfcpp1KZx/JpbfK5ymX5gL6pHTSDaWzL/W0c26lTunsI1lkoHyeEtNO6JPSSTeUzr60pp2tUnGqKJ39JMuqls+VaSf0SemkG0pnX7I0Zj3tvLy8bJaKU0Tp7CdXV1eD5yox7YT+KJ10Q+nsT/2czWnaqXT2lXraeXFx8bCVAb1QOumG0tmfTDvL5yzJ1KpVKo4dpbOv1NPODz/88GErA3qhdNINpbNPOf6ufN7mMu1UOvtKlsasp53X19cPWxnQA6WTbiidfZrrtFPp7C/1c2baCX1ROumG0tmvetqZay+2SsUxo3T2l0w7y+csyVUSgD4onXRD6exXzjQun7vkzZs3zWJxrCidfeb8/HzwvJl2Qj+UTrqhdPatnna+fPmyWSqOFaWzz5h2Qr+UTrqhdPbt/v5+8Pwlp1waU+nsN1nLv3zucj1YYP6UTrqhdPbv7Oxs8BymPLRKxTGidPab1rTz9vb2YSsD5krppBtKZ//evn07eA6TU007lc6+U08784EGmDelk24onctQL415qmmn0tl38mGlfP6SHMIBzJfSSTeUzmXISR/l85icYtqpdPaf169fD57Dzz///GErA+ZI6aQbSudyzGHaqXT2n++++27wHCa5PBcwT0on3VA6l6OedmZpzGNPO5XOZSQLDZTPYy7NBcyT0kk3lM5lqaedl5eXzVIxVZTOZeTm5mbwPCamnTBPSifdUDqX5fr6evB8ZtrZKhVTRelcTj7++OPBc2naCfOkdNINpXNZfv3118HzmVxdXTVLxRRROpeTbDflc5mlMU07YX6UTrqhdC7PxcXF4Dk95rRT6VxW6mmn1weYH6WTbiidy3PKaafSuay0pp3AvCiddEPpXKYcf1c+r5lYtUrF2FE6l5UsjVlPO3PcMDAfSifdUDqXqTXtzBnJrWIxZpTO5aV+Tk07YV6UTrqhdC5XPe3MtRdbpWLMKJ3LS6ad5XOa5JqwwDwonXRD6VyunGlcPrdJVptpFYuxonQuM+fn54Pn1bQT5kPppBtK57Jl3ezy+X358mWzVIwVpXOZMe2E+VI66YbSuWz39/eD5zeZcmlMpXO5yVr+5XOb1a+A01M66YbSuXxnZ2eD5zjloVUqxojSudy0pp23t7cPWxlwKkon3VA6ly/FoHyOk6mmnUrnslNPO/OBBjgtpZNuKJ3rkF2h5fM81bRT6Vx28mGlfH6THMIBnI7SSTeUznXISR/l85xMMe1UOpef169fD57jnKwGnI7SSTeUzvWop525DE6rVBwSpXP5yWW3yuc4yeW5gNNQOumG0rke9bTzgw8+aJaKQ6J0riNZaKB8nrMQAXAaSifdUDrXI0tj1tPOy8vLZql4bpTOdSRLqpbPc2LaCaehdNINpXNd6ud77Gmn0rmefPzxx4Pn2rQTTkPppBtK57pk2lk+38nV1VWzVDwnSud6ku2mfK6zNKZpJxyf0kk3lM71ubi4GDznY047lc51pZ52ev2A41M66YbSuT5TTjuVznWlNe0EjkvppBtK5zrl+Lvyec/EqlUq9o3Sua5kacx62nl9ff2wlQHHoHTSDaVznVrTzpyR3CoW+0TpXF/q59y0E45L6aQbSud61dPOXHuxVSr2idK5vmTaWT7nSa4JCxyH0kk3lM71ypnG5XOfZLWZVrHYNUrnOpPVrcrn3bQTjkfppBtK57pl3ezy+c+62q1SsWuUznXGtBNOR+mkG0rnut3f3w+e/+Tu7q5ZLHaJ0rnefPHFF4PnPqtfAdNTOumG0snZ2dlgG0h5aJWKXaJ0rjetaeft7e3DVgZMRemkG0onKQblNpA8d9qpdK479bQzH2iAaSmddEPpJLIrtNwOnjvtVDrXnXxYKZ//JIdwANNROumG0knkpI9yO8jSmM+ZdiqdkpPRym0gJ6sB01E66YbSyUY97XxOYVQ6JZfdKreBJJfnAqahdNINpZON1rSzVSoei9IpSb00ZhYiAKahdNINpZONLI1ZTzsvLy+bpWJblE5Jrq6uBttBYtoJ01A66YbSSaneHvaddiqdsolpJxyH0kk3lE5KmXaW20OSqVWrVLSidMom9bQzS2OadsL4lE66oXRSu7i4GGwT+0w7lU4pU087vb7A+JROuqF0Ujtk2ql0SpnWtBMYl9JJN5ROWnL8XbldZGLVKhV1lE4pk6Ux62nn9fX1w1YGjEHppBt16RwrP/zww8NPoEetaefNzU2zWJSpS+eY+e///u/mz5R5p94mTDthXEon3ahLZ1YT+frrr5+dzz777N3tKJ39q6edL168aJaKMnXB+Kd/+qff/uM//uOg/PM///O721I6+0ymneU2keSasMA4lE66Mfbu9RTP3I7S2b+caVxuG0lWm2kVi02m2L2e4pnbUjr7TdbyL7cL004Yj9JJN5ROHpN1s8vtI5PwVqnYROmUVkw7YTpKJ91QOnnM/f39YPtI7u7umsUiUTplW+ppZ1a/GsvmsJ5D89FHH727rSSrcX3zzTdey5g9pZNuKJ085ezsbLCNpDy0SkWidMq25MNKuW0kb9++fdjKxvHLL7/89u23374rj/XPOjRffvnlu9uGuVE66YbSyVNub28H20iybdqpdMpjqaedr169etjKxpXXn/LnbPLJJ5+8e43K3//0008PX/27FNb8eaabKZit709yG8onc6J00g2lk11kV2i5nWybdiqd8lhyIlq5fSRTLY3Zmnbm9WlXKaGb17NWUkzzNXBqSid/383z1VdfvTs+qH4BzKflzXFD33//ffPFK9+fr5mS0skuctJHuZ1kaczWtFPplKeSS2+V20guzTWFvHaWPyfZp3Ru/Pzzz799+umn791Wkj9XPDk1pXPFUra27ZrJi+AmrRexfF8K6OZ2UlRTTqekdLKretrZKpRKpzyVN2/eDLaRZIpp51ilcyMDhPr2EsWTU1M6Vyglq36RS2HM8UH1sUOllMxtL2abTEnpZFetaWddKJRO2SX10phTTDvHLp2x7bU6AwM4FaVzZTZFa5NMKFM295FdONsmpFNSOtlVlsasp505PKQsE0qn7JKrq6vBdpKMPe2conRmorltV7uTizgVpXMl8gLUmm4+Ntl8Sl1gkykpneyj3l7qaafSKbtm6mnnFKUz8vpe326SYYPd7JyC0rkCrU+8edHJxPJQdfE8pMQ+RelkH5l2lttLkqnVpkgonbJr6mlnlsYcc9o5VemMbbvZx7p92IfSuQKtF50xi1b5gjllgVM62dfFxcVgmymnnUqn7JN62nno609pytK5bdo59Ymf0KJ0LlyO16xfbFJCx5SJ6ea2lU7m5LFpp9Ip+yTHBJfbS6adY5mydMa2Yzun3DMFLUrngqUM1tfcTMbYrV7bTFOVTuYmx9+V200mVikRSqfskx9//PHdpLzcZnKVhDFMXTo3r3V1UqThmJTOBWvtVp/qchmbaeeYL5Q1pZPnaE07b25ulE7ZO+fn54NtZqxp59SlM69x9e0n+blwTErnQpW7vMtsLug+hRRapZM5qqedWWlG6ZR9k2lnuc0kY0w7py6dOZm0vv1N4JhscQtVH3+0yZSXyci135RO5uj+/n6w7SR//etfB/+tdMouyVr+5XaT68EeaurSGfXtbwLHZItbqJyZWL+45GDyno1dOlM288I+xTGuzM+rV68G28+f//znwX+PUTpTNlM8//d//7f599J/pph2HqN0tt4TEh+6OSalc4G2XSKj94PG69KZEpE/E9kl9S72On/5y1/eFU+Rp1JfPuns7OzhVep5jlE6Wz8jUTo5JqVzgVqXSUrGfhE7thSH1u8lInLq5BCO51I6WQulc4G2Hc855UlEx/I///M/v/3Lv/xL8/cTETlVsufluY5ROrddq9PhRRyT0rlAS/9Ea+IpInPMc5fGPEbprG9/EzgmW9wCrWE3Snmsnsg+ybGdmUpt8m//9m/NrxPZN2/fvn14hdrPqUqnpTA5NqVzgdZQOgGWYurSmdf++vaTqRYLgW2UzgVSOgH6MXXp3HZyaf4cjknpXCClE6AfU5fOTDTr20+cRMSxKZ0LtO3s9awYBMC8TFk6ty2JnJ8Jx6Z0LtBSr9MJsERTls7cTn3biT1fnILSuUDbViTyyRZgfqYqnZlyfvTRR+/dtvcCTkXpXKht6+wCMC9Tlc7W7aaEOpaTU9FCFmrJqxIBLMkUpXPbbnXH9nNKSudCbTt43HXZAOZl7NKZYlnfXvLVV189fAWchtK5YNumnTnmcwq//PLLuxfPqW4fYInGLJ0plvVtJXk/gFNTOhcsJbB1EPmnn3768BXjyotdXjwB2F3rGPx9S2fORs9re307eQ9wWBVzoXQu3Lblz8bezZLby4tbii4Au9n2Gp0P8Pm7x15TcxhVLpHXKptJXpe9JjMnSucKbLtu51jFM7eT27NbHWA3KYM59rK1N6qVlNAyra9JMjXNlNQZ6syR0rkS247vzIlFz/0knBe1zYufMyIBnvZYYdw3mXDm9vL6ntdgRZO5UzpXZNsZjfmkvc8n45TUfH2+L7GyBQDwFKVzZbIL/LFP2vnkvPnUnDK5Sf47RbP83vx/n6zpQU6kyHadbbZ10kb+PIeJZDt3DBzANJTOlUqRfKx8PpZ8n+kmc5cPRJsT3Frb8WPJ9/lABTAupXPl8saa6U7eZFMmW2/QmylQTkjyRszcZVLZOoY523AmnvU2vJnktz6E5XZMPgHGoXQCi5HDR+rd5/ucLJcCWl9+Jv/tygwAh1M6gUXItLKe1OfPniNT0fJ2cruKJ8BhlE6geymXZUlM9l3RpZYJaXl7iifAYZROoGvZJV6WwyTHZx4qu+TrXfWKJ8DzKZ1At1IMWye/jXXCW2uCmmM8Adif0gl0qz72Msmfjal1Xc9Dd90DrJHSCXSptVs9GXv3dy4VVv+MTFddSglgP0on0KXWlDNTybFlV339cxLTToD9KJ1AdzJlbBXBsXetb7R2sU9RcAGWTOkEutM6wSfJrvAp1JdP2sSZ7AC7UzqB7rR2rSc5znMK2ZXe+nl2sQPsTukEulMvVbnJVCf3ZM321s/LBBSA3SidQHdaBTCZyrYz5ce4CD3AWiidQHdaBTCZyrbSmUsnAbAbpRPoTqsAJlPZVjoTAHbjFRPoTqv8JVNROgEO5xUT6E6r/CVT2VY6rcMOsDulE+hOqwAmU3EiEcDhlE6gOyl7rRKYJSunsK10TrUCEsASKZ1Ad459cfht1+nMykgA7EbpBLpz7GUwt61INNVkFWCJlE6gO1l5qFUCp1ohqLX2upOIAPajdAJdahXBqS7Wntutf5Zd6wD7UTqBLm07uSfHX47pp59+eu9npIROtc47wFIpnUC3Wmexj31GeeukJVNOgP0pnUC3ciJPa9f3WCf4tG7ftTkBnkfpBLrWOpN9rGJYHzf6ySef2K0O8ExKJ9C91iWNDr18Ul1mM/HM8Z0API/SCSxCq3g+99hLhRNgfEonsBgpi/UxmCmju8qu8/rEoeyqt0sd4HBKJ7AoOfmnPqs9x2KmkG4rj5liXl5eDgpr/v8+hRWAxymdwCLlOp6tC8ingKaUblL//aZsmm4CjEvpBBYtk89MObPbvFUyNyU0RXPsC8sD8AelEwCAySmdAABMTukEAGBySicAAJNTOgEAmJzSCQDA5JROAAAmp3QCADA5pRMAgMkpnQAATE7pBABgckonAACTUzoBAJic0gkAwOSUTgAAJqd0AgAwOaUTAIDJKZ0AAExO6QQAYHJKJwAAk1M6AQCYnNIJAMDklE4AACandAIAMDmlEwCAySmdAABMTukEAGBySicAAJNTOgEAmJzSCQDA5JROAAAmp3QCADA5pRMAgMkpnQAATE7pBABgckonAACTUzoBAJic0gkAwOSUTgAAJqd0AgAwOaUTAIDJKZ0AAExO6QQAYHJKJwAAk1M6AQCYnNIJAMDklE4AACandAIAMDmlEwCAySmdAABMTukEAGBySicAAJNTOgEAmJzSCQDA5JROAAAmp3QCADA5pRMAgMkpnQAATE7pBABgckonAACTUzoBAJic0gkAwOSUTgAAJqd0AgAwOaUTAIDJKZ0AAExO6QQAYHJKJwAAk1M6AQCYnNIJAMDklE4AACandAIAMDmlEwCAif322/8DpNpqSgTD2v0AAAAASUVORK5CYII= | The trapezoid ABCD shown in the figure is? | A. Right-angled trapezoid; B. Isosceles trapezoid; C. Irregular trapezoid; D. Cannot be determined; E. No correct answer | A |
438 | 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 | As shown in the figure, given that ABDO is a parallelogram, OC = OD = AB, and the area of the right trapezoid ABCD is 18 cm², what is the length of AB in cm? | A. 3; B. 4; C. 5; D. 6; E. No correct answer | A |
439 | 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 | As shown in the figure, given that ABDO is a parallelogram and OC = OD, the area of quadrilateral ABCD is 18 cm². What is the length of AB in cm? | A. 3; B. 4; C. 5; D. 6; E. No correct answer | A |
440 | 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| As shown in the figure, AB is parallel to CF, and the distance between AB and CF is 30 cm. What is the positional relationship between BD and AB? | A. Parallel; B. Perpendicular; C. Cannot be determined; D. No correct answer | B |
441 | 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| As shown in the figure, AB is parallel to CF, BD is perpendicular to AB, and the distance between AB and CF is 30 cm. What is the area of parallelogram ABGF in cm²? | A. 600; B. 280; C. 500; D. 480; E. No correct answer | A |
442 | 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axavpVl4W1bTLu5BK281mttJKVZVZh5kAki4H8fPqPD/AB1/wSP+BHxM8Waj468e+P8Ax1rmvas4kury51DTWklZVCLnGm4AVFCqAAFUAAAACvt74FfA4fAjw5H4Q07xz4j8W6NaQQW1jba/NZ3H2GG3BVUgkt7S3l27cLtkdwAqhQvOQD3SiiigD//S/fyiiigAooooAK4/xr8QvAPw10qLXfiN4l0zwrps8y20d1qt5DYwPOys6xLJO6KXKozBQckKTjANdhX5A/8ABav/AJNZ8Lf9jnY/+m7UaAPv/wD4ax/ZZ/6LJ4M/8KHTv/j9H/DWP7LP/RZPBn/hQ6d/8fr8Af2XP+CUv/DSnwJ8M/Gv/haP/COf8JH9t/0D+xPtnk/Y7ya0/wBd9uh3bvJ3/cGM45xk+/8A/DjH/qtn/lt//fKgD9f/APhrH9ln/osngz/wodO/+P0f8NY/ss/9Fk8Gf+FDp3/x+vyA/wCHGP8A1Wz/AMtv/wC+VH/DjH/qtn/lt/8A3yoA/X//AIax/ZZ/6LJ4M/8ACh07/wCP0f8ADWP7LP8A0WTwZ/4UOnf/AB+vyA/4cY/9Vs/8tv8A++VH/DjH/qtn/lt//fKgD9f/APhrH9ln/osngz/wodO/+P0f8NY/ss/9Fk8Gf+FDp3/x+vyA/wCHGP8A1Wz/AMtv/wC+VH/DjH/qtn/lt/8A3yoA/X//AIax/ZZ/6LJ4M/8ACh07/wCP0f8ADWP7LP8A0WTwZ/4UOnf/AB+vyA/4cY/9Vs/8tv8A++VH/DjH/qtn/lt//fKgD9f/APhrH9ln/osngz/wodO/+P0f8NY/ss/9Fk8Gf+FDp3/x+vyA/wCHGP8A1Wz/AMtv/wC+VH/DjH/qtn/lt/8A3yoA/X//AIax/ZZ/6LJ4M/8ACh07/wCP0f8ADWP7LP8A0WTwZ/4UOnf/AB+vyA/4cY/9Vs/8tv8A++VH/DjH/qtn/lt//fKgD9f/APhrH9ln/osngz/wodO/+P0f8NY/ss/9Fk8Gf+FDp3/x+vyA/wCHGP8A1Wz/AMtv/wC+VcP44/4IgfEmwtbZ/ht8T9J125dyJ01axuNJSNMcMj2735dieCpVABzk9KAP23/4ax/ZZ/6LJ4M/8KHTv/j9H/DWP7LP/RZPBn/hQ6d/8fr8Af8Ahyp+1N/0NPgz/wADtR/+V1H/AA5U/am/6GnwZ/4Haj/8rqAP3+/4ax/ZZ/6LJ4M/8KHTv/j9H/DWP7LP/RZPBn/hQ6d/8fr+RHwR+zT4h8f/ALRE/wCzXofivw+uvx3t5p8OozXFyuk3N1ZBy8cM62zSNvMbCNjEFkIAUncu77w/4cqftTf9DT4M/wDA7Uf/AJXUAfv9/wANY/ss/wDRZPBn/hQ6d/8AH6P+Gsf2Wf8Aosngz/wodO/+P1+AP/DlT9qb/oafBn/gdqP/AMrq+b/2oP8Agnp8aP2TPAOn/Eb4ja14f1HTdR1OLSo49KubuacTzQzTqzLPaQKE2wMCQxOSOMZIAP6jv+Gsf2Wf+iyeDP8AwodO/wDj9T2n7U37Md/dQ2Nj8XvB9zc3LrHFFHr+nu8jucKqqs5JYk4AHJNfz9fsuf8ABKX/AIaU+BPhn41/8LR/4Rz/AISP7b/oH9ifbPJ+x3k1p/rvt0O7d5O/7gxnHOMn6f8ACf8AwRO/4RfxTo3ib/hcv2n+yL23vPK/4R3Z5n2eRZNm7+0W27tuM4OPQ0AftF45+Kfwx+GMVpP8SvF+j+E4tQZ1tm1fULewWdowC4jNw6ByoYZC5xkZ6155/wANY/ss/wDRZPBn/hQ6d/8AH68P/bj/AGJ/+GzdK8I6Z/wmf/CH/wDCLTXk2/8As7+0PP8AtaxLjH2m32bfL65bOe2Ofzw/4cY/9Vs/8tv/AO+VAH7jad8TfhtrHg2b4jaT4s0m98J26SyS6xBf28mnIkBIlZrpXMQWMghyWwpBzivOP+Gsf2Wf+iyeDP8AwodO/wDj9eP/AA6/Y1/4QH9jbWP2Sf8AhL/t/wDatlqtp/bX9n+V5f8Aackj7/sn2hs+Xvxjzhux1GePzg/4cY/9Vs/8tv8A++VAH7ZeCfjT8HPiXqE+k/Djx3oPiu+tYvPmg0nVLW+lji3Bd7pBI7Ku4gbiMZIHesPX/wBpD9njwnrN34c8U/FHwto2rWDmO5s73W7G3uIXHJWSKSZXRvYgGvjj9iX/AIJ2/wDDHXj7XfHP/CwP+Eu/trTDp32f+yvsHlZmjm8zf9ruN3+rxt2jrnPGD4h8fv8AgkR/wvL4yeLPi3/wtj+xP+EovWvPsX9hfafI3KF2eb9vj39OuxfpQB+k1p+1N+zHf3UNjY/F7wfc3Ny6xxRR6/p7vI7nCqqrOSWJOAByTXeeOfin8MfhjFaT/Erxfo/hOLUGdbZtX1C3sFnaMAuIzcOgcqGGQucZGetfi74T/wCCJ3/CL+KdG8Tf8Ll+0/2Re2955X/CO7PM+zyLJs3f2i23dtxnBx6Gvu/9uP8AYn/4bN0rwjpn/CZ/8If/AMItNeTb/wCzv7Q8/wC1rEuMfabfZt8vrls57Y5APcP+Gsf2Wf8Aosngz/wodO/+P16Pp3xN+G2seDZviNpPizSb3wnbpLJLrEF/byaciQEiVmulcxBYyCHJbCkHOK/Dn/hxj/1Wz/y2/wD75V+j/wAOv2Nf+EB/Y21j9kn/AIS/7f8A2rZaraf21/Z/leX/AGnJI+/7J9obPl78Y84bsdRngA9g/wCGsf2Wf+iyeDP/AAodO/8Aj9dn4J+NPwc+JeoT6T8OPHeg+K761i8+aDSdUtb6WOLcF3ukEjsq7iBuIxkgd6/E3/hxj/1Wz/y2/wD75V9n/sS/8E7f+GOvH2u+Of8AhYH/AAl39taYdO+z/wBlfYPKzNHN5m/7Xcbv9XjbtHXOeMEA+x9f/aQ/Z48J6zd+HPFPxR8LaNq1g5jubO91uxt7iFxyVkikmV0b2IBrPtP2pv2Y7+6hsbH4veD7m5uXWOKKPX9Pd5Hc4VVVZySxJwAOSa/Nn4/f8EiP+F5fGTxZ8W/+Fsf2J/wlF6159i/sL7T5G5Quzzft8e/p12L9K8/8J/8ABE7/AIRfxTo3ib/hcv2n+yL23vPK/wCEd2eZ9nkWTZu/tFtu7bjODj0NAH7ReOfin8MfhjFaT/Erxfo/hOLUGdbZtX1C3sFnaMAuIzcOgcqGGQucZGeteef8NY/ss/8ARZPBn/hQ6d/8frw/9uP9if8A4bN0rwjpn/CZ/wDCH/8ACLTXk2/+zv7Q8/7WsS4x9pt9m3y+uWzntjn88P8Ahxj/ANVs/wDLb/8AvlQB+42nfE34bax4Nm+I2k+LNJvfCdukskusQX9vJpyJASJWa6VzEFjIIclsKQc4rzj/AIax/ZZ/6LJ4M/8ACh07/wCP14/8Ov2Nf+EB/Y21j9kn/hL/ALf/AGrZaraf21/Z/leX/ackj7/sn2hs+Xvxjzhux1GePzYu/wDgh5a2FrNfX/xyS2trZGkllk8OhEjRBlmZjqYAUAZJPAFAH7RaR+0V+z74gtdSvdB+J3hfUrfRrc3d9Jba1YzJaWwYIZp2SYiOPcyrvbC5IGckVif8NY/ss/8ARZPBn/hQ6d/8fr+Pfxb4UstH+I2q/B34DeLLvx/perTwWP2yGzOmpqkkUm4KsP2ibdbrKA6tI4UlRIVUKrV9raZ/wTNv59NtJ9V+IKWl9JFG08MelmaOKUqC6LIbpC6q2QG2LuHO0dKBpM/oy/4ax/ZZ/wCiyeDP/Ch07/4/R/w1j+yz/wBFk8Gf+FDp3/x+v52v+HZH/VSf/KP/APdlH/Dsj/qpP/lH/wDuygfKz+iX/hrH9ln/AKLJ4M/8KHTv/j9H/DWP7LP/AEWTwZ/4UOnf/H6/na/4dkf9VJ/8o/8A92Uf8OyP+qk/+Uf/AO7KA5Wf0S/8NY/ss/8ARZPBn/hQ6d/8fo/4ax/ZZ/6LJ4M/8KHTv/j9fztf8OyP+qk/+Uf/AO7KP+HZH/VSf/KP/wDdlAcrP6Jf+Gsf2Wf+iyeDP/Ch07/4/R/w1j+yz/0WTwZ/4UOnf/H6/na/4dkf9VJ/8o//AN2Uf8OyP+qk/wDlH/8AuygOVn9Ev/DWP7LP/RZPBn/hQ6d/8fo/4ax/ZZ/6LJ4M/wDCh07/AOP1/O1/w7I/6qT/AOUf/wC7KP8Ah2R/1Un/AMo//wB2UBys/ol/4ax/ZZ/6LJ4M/wDCh07/AOP0f8NY/ss/9Fk8Gf8AhQ6d/wDH6/na/wCHZH/VSf8Ayj//AHZR/wAOyP8AqpP/AJR//uygOVn9Ev8Aw1j+yz/0WTwZ/wCFDp3/AMfo/wCGsf2Wf+iyeDP/AAodO/8Aj9fztf8ADsj/AKqT/wCUf/7so/4dkf8AVSf/ACj/AP3ZQHKz+iX/AIax/ZZ/6LJ4M/8ACh07/wCP0f8ADWP7LP8A0WTwZ/4UOnf/AB+v52v+HZH/AFUn/wAo/wD92Uf8OyP+qk/+Uf8A+7KA5Wf0S/8ADWP7LP8A0WTwZ/4UOnf/AB+j/hrH9ln/AKLJ4M/8KHTv/j9fztf8OyP+qk/+Uf8A+7KP+HZH/VSf/KP/APdlAcrP6Jf+Gsf2Wf8Aosngz/wodO/+P0f8NY/ss/8ARZPBn/hQ6d/8fr+dr/h2R/1Un/yj/wD3ZXI+Ov2APDXw38K6h4z8XfFQWWl6cm+R/wCxssxJwqIv2zLO7EKoHUmgOVn9Kf8Aw1j+yz/0WTwZ/wCFDp3/AMfr0fwP8Tfht8TbW5vvht4s0nxZbWTiOeXSb+3vkidhkK7W7uFYjkA4OK/jE/Zw/Zr8d/tQfFO2+HPw6ikNp5gkvtTmixDYWO/DXE6hiN2PuRB8u3yg9WH9j/wW+Dvgj4C/DbRvhd8PrJbPSdIi256yXE7cy3ErHJaSVssxzgcKuFAACT1SiiigD//T/fyiiigAooooAK/IH/gtX/yaz4W/7HOx/wDTdqNfr9X5A/8ABav/AJNZ8Lf9jnY/+m7UaAPf/wDglx/yYp8M/wDuNf8Ap4va+/6+AP8Aglx/yYp8M/8AuNf+ni9r7/oAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACviD/goN+0j/wAM1fs463r+jXX2fxZ4jzo+h7WxJHdXKN5lyuOR9miDyK2CvmCNW++K+36/ki/4Kf8A7SP/AAvv9o6+0DQrrz/Cfw783R9P2tmOa6Dj7fcr1H7yVRGrKSrxwxsOpoA/Pjw9r+s+E9f0zxT4cu3sNW0a6hvbO5jOHhuLdxJFIuf4kdQR7iv7bP2Zvjlo37RvwQ8LfFzSAkMms2oF7bIci1v4T5d1BgkttSVW2FsFoyr4wwr+Huv2e/4I6ftI/wDCDfFDVP2evEl1s0Xx1m80ve2Eh1i2j+ZB0A+1W6bSSSS8MSKMtQB/S9X5A/8ABav/AJNZ8Lf9jnY/+m7Ua/X6vyB/4LV/8ms+Fv8Asc7H/wBN2o0Ae/8A/BLj/kxT4Z/9xr/08Xtff9fAH/BLj/kxT4Z/9xr/ANPF7X3/AEAFFFFABRRRQAUUUUAFFFFABRRRQAUUUUAFFFFABRRRQAV/PF/wU+/b1h8aNP8Asw/AbUpLqzM5g8Q6jZMSLxx8g023ZCS8e4/vyv32AjBKeYH9z/4Kgft8WXw+0HU/2cfg/qKy+LdWiMGuahbyc6VbPjdbRsOPtM6kq5zmJCekjKyfH37E/wCyxb+E9Ls/jB8QbMPr1+gl0y0mTmxhbO2ZgePOkXBUYzGpH8ZIUGlc9O/ZE/Zisfgz4bi8V+KrVZPG2qx5lLgMbCFx/wAe8ZBYbu8jjqflHAyftGiig2SCiiigYUUUUAFFFFABRRRQAUUUUAFFFFABRRRQAUUUUAFFFMkkSJGllYIiAlmJwAB1JJ7UAZ+s6zpfh3SbzXtcukstP0+J57iaQ4SOOMbmYn0AFfjH8U/iH8TP26Pi3o/wf+DmlTXOlJcsbC25TzGA2vfXZ+7GiITgn/VqSOWYg7P7Tv7QPiD9o/xdYfAn4JWk+raZcXiQotsm+XVrwN8mwYyIUIJXJAb77YCrj9//ANhX9jfQf2SvhfHZaglvf+PdcUTa5qUQ3DdnKWkDMAwghGBz/rH3SEAFVQMpSPUP2Vf2ZfBH7K3wosPh54TjW4v5FSfV9SK4l1C/KBZJSCSUjBGIo84RMDLMWZvpOiiggKKKKAP/1P38ooooAKKKKACvyB/4LV/8ms+Fv+xzsf8A03ajX6/V+QP/AAWr/wCTWfC3/Y52P/pu1GgD3/8A4Jcf8mKfDP8A7jX/AKeL2vv+vgD/AIJcf8mKfDP/ALjX/p4va+/6ACiiigAooooAKKKKACiiigAooooAKKKKACiiigDP1bT/AO1tKvdL+0zWf2yGSHz7Z/Lni8xSu+J8Ha65ypwcEA1+aH/Dob9jb/oHa1/4NH/+Jr9P6KAP5Cvgx+zl8NPG/wDwUU1D9mrXobp/BVt4j8UaYkcc5S4+z6TFfPbAzAZ3AwJuOOefWv3O8Pf8Epv2T/Cev6Z4p8OQ67Yato11De2dzHqjh4bi3cSRSLlPvI6gj3FflT+zT/ymS1f/ALHPx3/6I1Sv6faACvyB/wCC1f8Ayaz4W/7HOx/9N2o1+v1fkD/wWr/5NZ8Lf9jnY/8Apu1GgD3/AP4Jcf8AJinwz/7jX/p4va+/6+AP+CXH/Jinwz/7jX/p4va+/wCgAooooAKKKKACiiigAooooAKKKKACiiigAooooAK/Mj/gor+3VpX7NHgqf4f+AL9Jvihr8O23WMq50m3kB/0yZWVl3npDGw+YneflXDewftvfti+FP2TPhjc36zw3njrWYZI9B0xjuLzEbftM6jkW8JO5unmEeWpBJZf58/2ZvgN4k/aY8can8efjdcTarpdzeyzyvcHEmq324M+QAALdCcNtwuQI0GFYKDSOv/Yu/ZgbxXOPjl8WbaS7SWYz6XbXeWN1ITva9nD5LqWP7vcfnILkFdpb9aKigggtYI7W1jWGGFQiIgCqqqMBVA4AA4AFS0GyVgooooGFFFFABRRRQAUUUUAFFFFABRRRQAUUUUAFFFFABRRRQAV+T/7Zn7Uq+J/tHwJ+E8r332uVbbU7u1y5uH3Y+xW+zJfc2BIV+9/qxkFs+l/tm/tX23gfTb34UfDq8D+Jb1Gh1C6iOfsEMikMiMDxcMD1HMY54faR9X/8Euf2C4vAOi2n7Rnxm0hf+Eq1JVm8P2NwoY6dZugK3ciHhbmYN8ikZiQA5DuVQM5y6Ht//BN/9hjT/wBm/wAEW/xL+IdisnxO8SW4aZZVVv7HtXyVtYjjImdSDcN/e/dr8qFn/UOiigzCiiigAooooA//1f38ooooAKKKKACvyB/4LV/8ms+Fv+xzsf8A03ajX6/V+QP/AAWr/wCTWfC3/Y52P/pu1GgD3/8A4Jcf8mKfDP8A7jX/AKeL2vv+vgD/AIJcf8mKfDP/ALjX/p4va+/6ACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooA/mC/Zp/5TJav/wBjn47/APRGqV/T7X8wX7NP/KZLV/8Asc/Hf/ojVK/p9oAK/IH/AILV/wDJrPhb/sc7H/03ajX6/V+QP/Bav/k1nwt/2Odj/wCm7UaAPf8A/glx/wAmKfDP/uNf+ni9r7/r4A/4Jcf8mKfDP/uNf+ni9r7/AKACiiigAooooAKKKKACiiigAooooAKKKKACvnj9pv8AaV+H/wCy18Mbz4jeOZPPl5h07TY3VLnUbsj5YYt3RR96R8EImWwThW7v4v8Axd8CfAz4e6v8TfiNqC6fo2kRF26GWeTB2QQISu+aQ/Ki5GT1IAJH8p+ra98Xv+CkH7Q9z4j8UznTNFswCYonMlto+m5wkMAcjfLKRy2AXfc5ARdqgDPhj4I+I37d3xr1z4s/F7UZpdLSdZNQnTcqcnMWn2YYnYiJxgE+WmCTudS37PaFoWj+GdHs/D/h+zjsNOsI1hgghXakaL0AH8z1J5PNY3gXwN4a+G/hXT/BnhG0FlpempsjTOWYk5Z3bqzuxLMT1JrrqDaMbBRRRQUFFFFABRRRQAUUUUAFFFFABRRRQAUUUUAFFFFABRRRQAV8Z/ta/tP6Z8F/Ddx4V8M3KzeNtVhK26rhvsMcgx9pkHQMBkxKc5bBIKgg+gftHftD+HfgF4Ra+mMd94jv1K6bp7MQZG6GWTbyIk6k8bj8oIJyPk7/AIJ5/sZav+1v8QdR+Pnxy82+8F6bemSVbgEHXdQOWaIFcYt4TtMpAwcrEgxvMYRKVj2P/gmB+wr/AMLBvo/2o/jtYPfacZmn0Gyvh5n2+435bUZ9zEuiuD5auv7x/wB4flC7/wCiaq9paWthaw2NhCltbWyLHFFGoRI0QYVVUYAUAYAHAFWKDIKKKKACiiigAooooA//1v38ooooAKKKKACvyB/4LV/8ms+Fv+xzsf8A03ajX6/V+QP/AAWr/wCTWfC3/Y52P/pu1GgD3/8A4Jcf8mKfDP8A7jX/AKeL2vv+vgD/AIJcf8mKfDP/ALjX/p4va+/6ACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooA/mC/Zp/5TJav/wBjn47/APRGqV/T7X8wX7NP/KZLV/8Asc/Hf/ojVK/p9oAK/IH/AILV/wDJrPhb/sc7H/03ajX6/V+QP/Bav/k1nwt/2Odj/wCm7UaAPf8A/glx/wAmKfDP/uNf+ni9r7/r4A/4Jcf8mKfDP/uNf+ni9r7/AKACiiigAooooAKKKKACiiigAooooAK5vxh4v8M+APC2qeNfGWoxaToei28l1eXUxISKGMZZjgEk9gqgsxwFBJArcu7u1sLWa+v5ktra2RpJZZGCJGiDLMzHACgDJJ4Ar+W39t79rTxz+238Xrb4G/BR5Z/AdldiGzihLquqXEZO6/ucqrLCgyY1cYRQZD8zYUA4L9oD42/FL/go1+0OnhbwnJLZeC9NlmOkWcuRDZ2MZCPf3Srx50oIJGTtLLCrH7zfpx8HvhD4T+Cngy38G+E4jsU+bc3En+turggBpZD6nAAA4UAAVx/7O/7Pnhn4A+EzpmnsL3W9QCPqV+RgzSLnCID92JMnaOpySeTx9B0G0Y2CiiigoKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAryf4y/GLwn8EvBdz4u8UShnAZLO0VsS3lxjKxJwcf7TYIUcnsD1Hjzx54W+Gnha98Y+Mb1bHTbFcsx5Z2P3Y416s7HhVHX6ZI/I74ZfDz4rf8FJv2kXtPMfS/DWmATXc/WHSNIEuFjQ42yXUuSEBGZH3MQsSNsCZSsdJ+yX+zh48/wCCgvx61Lx78S5LmLwTpsol1e9jzGjbceRplo2MBypG4gfJGC7He6b/AOqnwp4U8N+BvDeneEPCGnQ6RoukQpb2lpboEihiQYCqB+ZJ5JySSSTXL/CX4S+Avgh4C0z4bfDbTE0rRNKTaiLy8sh+/NM/WSWQ8u55J9gAPSKDEKKKKACiiigAooooAKKKKAP/1/38ooooAKKKKACvyB/4LV/8ms+Fv+xzsf8A03ajX6/V+QP/AAWr/wCTWfC3/Y52P/pu1GgD3/8A4Jcf8mKfDP8A7jX/AKeL2vv+vgD/AIJcf8mKfDP/ALjX/p4va+/6ACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooA/mC/Zp/5TJav/wBjn47/APRGqV/T7X8wX7NP/KZLV/8Asc/Hf/ojVK/p9oAK/IH/AILV/wDJrPhb/sc7H/03ajX6/V+QP/Bav/k1nwt/2Odj/wCm7UaAPf8A/glx/wAmKfDP/uNf+ni9r7/r4A/4Jcf8mKfDP/uNf+ni9r7/AKACiiigAooooAKKKKACiiigAoor8I/+Cn/7fmpeHbu9/Zk+BuomPVJVMHiLVLRw0kPmcf2fbujErKeROcBkyIwdxfaAeK/8FKf24fEvxf8AG93+yz8B7mS58OW862Wp3FhlpdZv92GtYivLW8T/ACHAxLIGPMYUt337Kv7L+mfAnQm1rXPLvvGOqRqLqcAMlrGefs8DYzjP32H3yB2Arzz9jr9k0/CuGH4l/ECEHxbdRMLa2OCNOilXDZP/AD3dSVYj7qkr3avv+g1jEKKKKCwooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACsrXdd0fwzo954g8QXkdhp1hG0088zbUjRepJ/kOpPA5rQnngtYJLq6kWGGFS7u5CqqqMlmJ4AA5JNfjN8efir49/a9+L+mfAT4I28mp6XLeG3sYIG2/wBpXCKWkuZSSFWCJVdlLcLGrSsRnCApOxna7qfxK/4KEftGaR8MPhzHLbaGZCtnHMD5NlZxDNxqF2FO0NjJxnukKFnYF/6e/wBm79m74cfsv/Di1+Hnw8tf7st/fygfatQusYaaZh+SIPlReB3J88/Y1/Y88Efsi/D06FpDLqninWFjk1rViuGuZUB2xxA8pBEWYIvU5LNyePsOgwbCiiigAooooAKKKKACiiigAooooA//0P38ooooAKKKKACvyB/4LV/8ms+Fv+xzsf8A03ajX6/V+QP/AAWr/wCTWfC3/Y52P/pu1GgD3/8A4Jcf8mKfDP8A7jX/AKeL2vv+vgD/AIJcf8mKfDP/ALjX/p4va+/6ACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooA/mC/Zp/5TJav/wBjn47/APRGqV/T7X8wX7NP/KZLV/8Asc/Hf/ojVK/p9oAK/IH/AILV/wDJrPhb/sc7H/03ajX6/V+QP/Bav/k1nwt/2Odj/wCm7UaAPf8A/glx/wAmKfDP/uNf+ni9r7/r4A/4Jcf8mKfDP/uNf+ni9r7/AKACiiigAooooAKKKKACiivz4/4KAftt6b+yT4CttN8NiHUPiH4nSQaXayHclrCvyvfXCD+BWO2NTjzXyBlUkwAeN/8ABSr9vlv2e9IPwa+E94v/AAsbWrdZLm6TDjR7KYMA+c4F1KBmJSDsQ+YwGY935rfsbfsr30t9afHf4sxtcXtwwvdKtbgl5TK58xb6csclyfmjDZOT5h+bbjif2X/2efF/xw8bN+0P8cZptSs7m7N9H9uy82rXW7IlkDf8sFYDgja+AoGzIP6/UGkY9QooooNAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiivzJ/bZ/aivtGnl+CPwyuH/tW5VU1W8tzl4hLkCzixz5rgguyn5QQg+YttBN2PPv2wP2itb+J/iy3/Z++DUk2oW9zcx2F2bMFpdSv5ZRElnCF5eMPheP9Y5wMqoLftR+wJ+wboP7KPhk+LPFflap8S9ctxHfXSHdDYQOQxs7Y9xkDzJOrsBjCgZ8X/4Jtf8ABPeL4IWFl8c/jFZrJ4/1K3Dafp80YP8AYsEygksGGReOp2ueDEpKdS1fsHQYt3CiiigQUUUUAFFFFABRRRQAUUUUAFFFFAH/0f38ooooAKKKKACvyB/4LV/8ms+Fv+xzsf8A03ajX6/V+QP/AAWr/wCTWfC3/Y52P/pu1GgD3/8A4Jcf8mKfDP8A7jX/AKeL2vv+vgD/AIJcf8mKfDP/ALjX/p4va+/6ACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooA/mC/Zp/5TJav/wBjn47/APRGqV/T7X8wX7NP/KZLV/8Asc/Hf/ojVK/p9oAK/IH/AILV/wDJrPhb/sc7H/03ajX6/V+QP/Bav/k1nwt/2Odj/wCm7UaAPf8A/glx/wAmKfDP/uNf+ni9r7/r4A/4Jcf8mKfDP/uNf+ni9r7/AKACiiigAooooAKKK8L/AGjP2gfAv7M3wr1L4qePpWNrassFpaxkCe+vZQxitoQ3BZgrMT/Cis54U0Aeeftj/tbeDf2R/hi3izWQmoeI9V8yDQ9KLFWvbhNu9mIyVhhDq0r+6qDvdQf5xfhP8L/iV+2z8W9U+N/xru5rjRrm58y+ueYftTRgKlnagfcijUKhK/cQYB3nIhll+M//AAUa+PF1488cStZaFZskUrxcW2mWCsWSztdwIaVgSckEliXfjiv2N8MeGdE8G+H7Dwt4btEsdM0yJYYIYwFCqvc46sxyWPViSTyTQXGNzWtLS00+0hsLCFLa2tkWOKKNQkccaDaqqq4AUAYAHAFWKKKDUKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAoor5T/aq/aQsfgN4RWDSTHdeLdYVlsLdiGEK9GuZkyDsXkKMfO/HQMQA2eeftlftRn4SaSvgLwJdofF+qITNKpDHTrdhw5HaaTP7sHOAC5A+Td6F/wAE0P8AgnzPdz6V+1F8fLRpppm+26BpN4hZnZiSmo3ayDJJPz26n/ZlJ+5XjH/BPr9g/wAQftJeJov2lv2g/Mu/CLXbXVrbXXzya7cxPhmlDZ/0RHXawx+8xsACA1/TBQYSdwooooEFFFFABRRRQAUUUUAFFFFABRRRQAUUUUAf/9L9/KKKKACiiigAr8gf+C1f/JrPhb/sc7H/ANN2o1+v1fkD/wAFq/8Ak1nwt/2Odj/6btRoA9//AOCXH/Jinwz/AO41/wCni9r7/r4A/wCCXH/Jinwz/wC41/6eL2vv+gAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKAP5gv2af+UyWr/8AY5+O/wD0Rqlf0+1/MF+zT/ymS1f/ALHPx3/6I1Sv6faACvyB/wCC1f8Ayaz4W/7HOx/9N2o1+v1fkD/wWr/5NZ8Lf9jnY/8Apu1GgD3/AP4Jcf8AJinwz/7jX/p4va+/6/nc+EH7Vf7QX7I/7Anwp8f6L4a8N6/4G1O+1PTbdpp7tNRiuZNQv5iJo12xlGMUu1kbgBQwycn6W/Zp/be/bM/at0bXNc+Fnw98Grb+H54re4F/qF7bsXmUuuwKHBGBySRQB+xtFfkP4g/bX/bH+Ffxv+Hfwr+Nvwk0XRdM8ea5p+kw6pZXU1zbyJd3McEphlVyokjWTdskCt0O3bzX68UAFFFY/iDxBofhPQ7/AMTeJr+HS9J0uF7i6urhxHDDDGNzu7tgBQBkk0Acv8Uvih4K+DXgLWPiT8QtRTTND0SFpppGI3OeiRRKSN8sjYSNByzEAV/Kx8Zvi58Zf+Ckvx3htdJt30vwxpW5LCyZ2a10uyZvnubgj5WuJeNxHLEKi/KoNdl+1/8AtY/EX9vv4qaf8KPhJZ3EPgjT7hjp9mSYzeSL8rahfDO1VVc+Wrf6pSersa/QP4E/Bbw78DPAdr4R0ULPdviW/vNpV7u5IwzkEkqoHCLnAHuSSFRjc6j4ZfDfwx8J/Bmn+CPCVuIbOxQb5CB5lxMQBJPKR96SQjJPQcKoCgAd9RRQbBRRRQAUUUUAFFFFABRRRQAUUUUAFFFFABRRRQAUUUUAFFFec/Ff4neG/g/4F1Lx34okxbWKgRQqQJLmd+I4Yx3Zz/3yoLH5VJoA5L9oH45+H/gN4Fl8TaoBdaldloNNsgfmuLjaSM85EScGR+wwB8zKD8I/sd/sm/EX9vX4qXfxh+L91KPAmn3ijUbklozfSR4cadZhSCiBSA7qR5anglyCON+DPwZ+Nv8AwUl+Ns2r6vM+leEtKdRfXwUm1021J3La2qtxJcSDoOpPzvhQBX9V/wAP/AXhT4X+CtF+HvgewTTNC0C1jtLS3T+GOMYyzdXdzlndss7ksxLEmgxlK5uaHomkeGtF0/w54fs4tP0vSreK0tLaBQkUFvAgjijRRwqoqhVA6AYrUoooJCiiigAooooAKKKKACiiigAooooAKKKKACiiigD/0/38ooooAKKKKACvyB/4LV/8ms+Fv+xzsf8A03ajX6/V+QP/AAWr/wCTWfC3/Y52P/pu1GgD3/8A4Jcf8mKfDP8A7jX/AKeL2vv+vgD/AIJcf8mKfDP/ALjX/p4va+/6ACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooA/mC/Zp/5TJav/wBjn47/APRGqV/T7X8wX7NP/KZLV/8Asc/Hf/ojVK/p9oAK/IH/AILV/wDJrPhb/sc7H/03ajX6/V+QP/Bav/k1nwt/2Odj/wCm7UaAPgr4uf8AKGj4J/8AY33f/pXrldb/AMEv/wBpj4Qfs3fA74teIfiT4gtLK9W8tbiy0wzL9u1Bo7dwqW8Ay7bnIUvt2JnLEAE1yXxc/wCUNHwT/wCxvu//AEr1yur/AOCYX7NHwk/aQ+BXxd8O/EXw/Z31+13bW9hqbQr9u095LeQq8E4HmIFfDFAdjYwykZFAH6mfs++E1/ai/ZL+DPir4p6jdX2t6bqdh4qjvS4knN9pmoSSxgtIGOxkBibvsOARxX35XxB+zfezfsz/ALC/h3U/i9aS6JJ4E0S7n1K3mGyZTBNM4jVWxl5PlEY/iLKB1r678G+I18YeEND8WpayWK63Y218LeUgyQi5iWXy3K8bl3YOOMigDoJporeJ553WOKNSzMxAVVAySSeAAOpr+Zf/AIKD/t16t+1F4gT9m/4AJNe+Dvtkcc88Abzddu4nzGEX/n1jcB03ffZRIcBVr2P/AIKcft+p4h/tT9lb4G3DXSyymx8RalAN/nsG2PpttwSw38TOvUjy1yC+ed/Y4/ZjT4PeHP8AhMvGVsj+MtZQHaRk6fbMoIgBI4lbrKR7IOFJYHFXPQf2XP2d9L+A/gmNbyNJ/FmrIr6pdA7gpyStvEe0cecEj77ZY8bVX6eoooN0gooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiqWp6lYaNpt3rGq3CWljYxSTzzSMFjiiiUs7sx4CqoJJ7CgDG8Y+MPDvgHwxqHjHxZeLYaTpcfmzzNk4BIVQAOWZmIVVHLMQBya/Hi2svjZ/wAFHvjnaeEPBlmbLQ9PLMnmZNppNkzAPc3Lj70r4GAOWYBE4BNSfFD4lfFH9uT4raX8Gfgzpc0+kNc5s7XGzzSmQ17eN0jjRSSM8Ip7scV/Sd+yF+yz4R/ZP+E1p4E0Mpfa1d7bnWdT2Ksl7eFecEKG8mLJWFG+6uScszEhlKVz0P4CfAzwL+zn8LtI+FPw9t2j03TFZpJ5dpuLy5lO6W4ncAbpHPthVCooCKqj2SiiggKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigD//U/fyiiigAooooAK/IH/gtX/yaz4W/7HOx/wDTdqNfr9X5A/8ABav/AJNZ8Lf9jnY/+m7UaAPf/wDglx/yYp8M/wDuNf8Ap4va+/6+AP8Aglx/yYp8M/8AuNf+ni9r7/oAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigD+YL9mn/lMlq//AGOfjv8A9EapX9PtfzBfs0/8pktX/wCxz8d/+iNUr+n2gAr8gf8AgtX/AMms+Fv+xzsf/TdqNfr9X5A/8Fq/+TWfC3/Y52P/AKbtRoA+SPht+zN+07+1r/wT7+E3w08ES+EdG8GaVqOp6pFc6hf341K5njv9QixJFFYyRRIrTSgBZJCwCsSpyo+hv2UP2Of2/wD9kG18Q6d8PtY+G2rWXiR4JZ4dUuNYk2S26sqvG0FpCRkPhg24HAxg819Yf8EuP+TFPhn/ANxr/wBPF7X3/QB+KP7Rv7Iv/BSf9qWyt/DfxI8e+BNN8MRTJM+laPNqVvbPIh4kfzLKSWUrnKq8pQEAgA81d/4KPft8aJ8GvCt9+zZ8Eb3f4wubQWOo31s/Gi2rIEaKN1/5e3j+UbcGEHdkSbce9f8ABQL9vTQ/2W/CkvgvwPcw3/xR1mHNpAVEsemQvx9ruVzjdjPkxtnc2GYFAQ341/sYfs13njjVZPjz8XYZNQgnma502O9YyyX10zlpL2cuSzAPyu/JkYlzwAXBpXPRf2If2XE8M2Fv8Y/iHZEa3dgtpVnOn/HpAwGLh1YZEz87B/AnP3mwn6VUUUGyVgooooGFFFFABRRRQAUUUUAFFFFABRRRQAUUUUAFFFFABRRRQAySRIkaWVgiICWYnAAHUkntX47/ALTf7RHif9oPxdbfAL4HW0+qadd3i2v+h5eXV7kNhUQKcG3U/MM8NjecKBXc/th/tXXOp3N38C/hFJJcXNxJ9i1O8ttxkkkLbDZ22zlix+SQjrygzk1+o/8AwTU/YV/4Z08KH4qfE+wT/hZHiKHakLjL6PZPz9nB3FfOlwGlYAFf9WDgOWDOcuh7B+wH+xnpv7Jfwxf+3lhvfiB4l2zazeRnesKj/VWUD4H7qLksR9+QsSSojC/e9FFBmFFFFABRRRQAUUUUAFFFFABRRRQAUUUUAFFFFABRRRQAUUUUAf/V/fyiiigAooooAK/IH/gtX/yaz4W/7HOx/wDTdqNfr9X5A/8ABav/AJNZ8Lf9jnY/+m7UaAPf/wDglx/yYp8M/wDuNf8Ap4va+/6+AP8Aglx/yYp8M/8AuNf+ni9r7/oAKKKKACiiigAooooAK+GP2iv+CiH7N37NHiY+CfGN/fa14jhVWudP0aBLma1DgFfPeWWGJGYHOzeXxglQCpP3PX5mftK/Dz9in9nj4BeNLP4n6dpV7q/ia21G7E2piC48R6xqdyXcSxzFRO0gncYdAqQjn5VFAH1n+zv+038I/wBqHwjceL/hRqUlzHYyiC9tLmPyLyzlYbkWaPJGHAJVlZkbBAbKsBwXxP8A21fhP8N/iHcfCXTNM13x74x061e+1DS/C9gNQnsLZArNJclpIkXAZTtDM4yuVyyhvza/4I2eH/Dfg34XfFH4tt4jtdQ1G5WBbnR4JGFxY2+nLcSLJcIwAzPvYxsu5Qqn5txdV8x/4I7+INV8d/tM/Fn4geI5TdaxrOkyXVzM3LNLeX8cspyfVhQB+5fwM+Pvwt/aM8EReP8A4UauNU00uYZ42UxXFrOoBaGeJvmRwCD3VhhlLKQa9lr+a/8A4JHeN7zwv+1l8QPhpBIY9H1+wvZPJBwguNNulMLY6fLFJKv4197eLP8AgpHr3iA/ErWf2cfh5F438I/CaGO41nXL3UTZRTqzMrLZwLDI0gAR3DswGxC23lNwB+rVFfl9D/wUjj139ku8/ap8EfD7+1rfw3qKab4h0m51b7HNYyytCiPBKLWYXMbNcRc7YyATxlSK8f03/gq18QvGvwc134r/AA8+Al7eWvhScjWrmXVVbTrKBvL8p1m+zxyTyMXbzIkjHlKFdmKtwAftDRX5D6N/wVK1b4ifBu+8e/B34O6p4k1/w5a3F74ktmuhHpui20AZhK16YgbgyIpdYo4w+1XzjaC31H+xJ+2XoX7Y/gbV9fttDbw3rfhy5jttQsTP9pjAnQtDNHLsjysm1xtKgqVI5GCQD8V/2af+UyWr/wDY5+O//RGqV/T7X8wX7NP/ACmS1f8A7HPx3/6I1Sv6faACvyB/4LV/8ms+Fv8Asc7H/wBN2o1+v1fkD/wWr/5NZ8Lf9jnY/wDpu1GgD3//AIJcf8mKfDP/ALjX/p4va7T9s79sjwR+yR8PZNUvni1Lxlq0Ui6JpGctNKBgTThSGW2jbG9sgt9xDuOR8j/sn/tJfD39l3/gmP4A+Inju4V5QuuR6bpyOFuNRvP7XvSkEXBIGcb5NpEa/Mc8A/kF4H8NfEX9vn9oLXfip8Trl00k3An1CSPcIoYA3+j6baZOVAj+UHJKqC7lpGG8Gkaf7NXwW8V/tR/EjVPjj8brq41nTGu2nuZ7o5bVb3j91wRthiG3IUBAoESAAHb+zkEEFrBHa2sawwwqEREAVVVRgKoHAAHAArP0LQtH8M6PZ+H/AA/Zx2GnWEawwQQrtSNF6AD+Z6k8nmtWg2irBRRRQMKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAr8+P2w/2tYvhvbXfww+Hlxv8V3Mey7u0JA06OVcgKR/y8MpyuPuAhuuBXo37Vv7UOmfA3Qm8P6Ay3XjTVIS1rFgMlpG2VFzKDkHBB2IfvEc/KDnlf8AgmJ+w3qPxM8Sx/tS/HSxN1oUU0lxotleoWbU74sGN/MrjDW8bFjGP+WkvzcImJAiUj23/gln+wXL4Nt7f9pP406Q0Wv3Kq/hrTrlSrWcDqd19NGf+W0obEKsAY1Bcgs6GP8AcqiigyCiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigD/9b9/KKKKACiiigAr8gf+C1f/JrPhb/sc7H/ANN2o1+v1fkD/wAFq/8Ak1nwt/2Odj/6btRoA9//AOCXH/Jinwz/AO41/wCni9r7/r4A/wCCXH/Jinwz/wC41/6eL2vv+gAooooAKKKKACiiigBkkkcMbTTMERAWZmOAAOSST0Ar5v8AGfgL9mb9sjwPdWGqDQ/iDpMRltE1Cwngu5rGfA3eRdwFmglHBIDDIxuBU4P0BrWj6d4h0e/0DV4vPsdTgltriPJXfDMhR1ypBGVJGQQa/ND4cf8ABLzwf8HPF994j+Efxc8a+ELTUV2TW1hdWqs8fUI7vbsjhSTsLxsy9jnJoA+CP+CcfwI8QeCv20PjZ8LEupLzw34a0jV9A1C7CnyrgTXccVsHA+VZXRHkCnkbXA707/gjZo+peD/2jvir4J8Qwm01fS9Ie2uYH4eOazv0ilU/7rnBr93Pg58EPh18CfDc/hv4e2DwC/ne8v7y5le5vtQvJP8AWXN3cSEvLK55JJwM/KAOK8H+I/7Efgbxb8VL343fD/xPrXwx8bavaPY6ne+H3t0S/t5ceaZop4ZB5rBV/eIVIZVcgsAaAPwm/YG8BeLfF/xU+PnjPwlFJJJong7xNFazRKzZ1HUg0dnGCv8AE4WRlxydvFe7f8EX/G/g+bWfij8DvF/2ac+MLK0ubeyulRo72K2WeK8gKPxJmOZCY8HKBzjAbH7efs7/ALNvws/Zg8C/8IH8LbGSG3mk8+7u7pxLeXs+MeZPIFUEgcKqqqKOijJz8WfFX/gkp+zx8Q/iFcfETw7q+teCLq+uftVxa6TLCLYTMdzPbiWJnhZm+bhigP3UUcUAH7cfg34M/DT9gr4xfDn4OWOlaNBpMukzahp2mNHvt7m61KyZWuEUl1eSNV27+SgXHygY+NP2T8H/AIJGfHDP/P1rf/pHZ1+nviP9gr4O638CB+zrpWra74c8KXV2L/VH0+5tzfaxdKySCW/uLq2uGkbzI0f5QgyqjG1Qo47wn/wTj+G/gj4OeJ/gN4b+IvjS18HeLrhLm/tftWlszMFCSKkh00sizBYxIBywjUZALhgD89f+Ca+D+wf+0oD0+y6t/wCmZq6H/ghmT9k+NC54D+Hv5ahX3J8Ov+Cb3w2+FPgLxl8M/A/xH8baf4e8eWxtdUtxd6W25WwrtGx03cjvFuiYg4KOwIyFZez/AGX/ANg/4a/sk+ItV174X+LPE1zDrkMcN9YalcWM1pceTuMLsIrKGQPEXfYVkH3iCCDigD8YP2af+UyWr/8AY5+O/wD0Rqlf0+1/MF+zT/ymS1f/ALHPx3/6I1Sv6faACvyC/wCC1Klv2WvCoHX/AITOx/8ATdqNfq74q8VeHPA/hzUfF/i/UYdJ0bSIXuLu6uGCRRRIMlmP6ADknAAJIFfyO/t2fti69+1f8T5ZNOlltPAHh+WSLQrFhtLKQFe8nHGZp9uQD/q0wg53s4B4v8GvAHxG/aV8SeF/hpJfXD+GvCUEkXmkZg0uxnuJbuYIAMGWaaR9mcszEZPlp8n73eA/Afhb4aeFrLwd4OslsdNsVwqjlnY/ekkbqzseWY9fpgD8svCH7Mus/Gv9k34fL8Pzpmmak1/qV7qE960sRuCtxNbxktFFKWKoiqAQAAOOSa47/h2/8cP+g54d/wDAm8/+Q6DSOh+11Ffij/w7f+OH/Qc8O/8AgTef/IdfP3iD9nbxJ4b+M2m/A7UvEGi/29qXkp56TXBtIJ7hS0MErm3EgkkGzaFjYfvEyeTtB8z7H9F9Ffij/wAO3/jh/wBBzw7/AOBN5/8AIdH/AA7f+OH/AEHPDv8A4E3n/wAh0Du+x+11Ffjz4H/4J9fGbw1418P+I7/WdAkttK1C0u5VjuLoyNHBKsjBQbRQWIXjJAz3FfsNQNMKKKKBhRRRQAUUUUAFFFFABRRRQAUUUUAFfPP7Q/7Q/hb4BeFjf35W+16+Vhp2nBsNKw48yTHKxKfvN3+6vPTsPjF8YvB/wT8Hz+LfFs/qlraoR593PjIjjB/NmPCjk+h/NP8AZh+AfxG/4KI/tD3Xjbx/5lv4K0uaJ9auoiUjht1BMGnWYJzvkxgkH5FLyuS5USBMpWO9/YE/ZB8RftjfFfUfjx8cY57nwTYXZuZ3lXaNZ1AOCLRMjAtowP323hVCwoBuLR/1E2lpa2FrDY2EKW1tbIscUUahEjRBhVVRgBQBgAcAVj+FPCnhvwN4b07wh4Q06HSNF0iFLe0tLdAkUMSDAVQPzJPJOSSSSa6CgxCiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooA//X/fyiiigAooooAK/IH/gtX/yaz4W/7HOx/wDTdqNfr9X5A/8ABav/AJNZ8Lf9jnY/+m7UaAPf/wDglx/yYp8M/wDuNf8Ap4va+/6+AP8Aglx/yYp8M/8AuNf+ni9r7/oAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigD+YL9mn/lMlq//AGOfjv8A9EapX9Ot3d2mn2k1/fzJbW1sjSyyysEjjjQbmZmbACgDJJ4Ar+Yr9mn/AJTJav8A9jn47/8ARGqV6Z/wU0/bkv8A4meIZf2YvgbetdaBDMlvrN7ZMzPql9uK/YYDGfnt0YqHx/rZflHyJmQA8o/b3/a88S/th/FPTvgX8DFur/wbY3a2tpBbZL67qRcr9oKKeYV4ECt0G6VsFgsfzB+15+y3c/spal4E8H61fC+8Q63oK6pqvlkNBDdSXE0fkwnALLGqAFj95skYBAr92v8AgnP+wdbfs6+HYvin8TLRJfiTrMJCxthxpNrKP9Shx/r3X/XMOmfLBxuLfnx/wWq/5L94I/7Fhf8A0tuaAPXP2I/+TYPBf/cR/wDThc19WV8p/sR/8mweC/8AuI/+nC5r6soN1scT8R/Hej/DLwLrfjzXj/oejWzTFM7TK/3Y4lJ4DSyFUXPGWGa/mr8SeL9f8VeLdQ8b6tdMdX1K7e9kmQlCszvvzHg5UKeEAPygADpX6O/8FFfjF9s1TTPgro0/7rT9moartPWeRf8ARoW7/LGxkYHIO+M9Vr8vKDObP6P/ANnT4tQfGn4TaP4yZ1/tJV+yaki4Gy+gAEvA4USArKo7K6jrXuNfh5+wV8Yv+EC+KR8B6vPs0fxnst03H5Y9QTP2dhnp5uTEQB8zMmTha/cOguLugooooKCiiigAooooAKKKKACiiigAooooAK4/x5488LfDTwte+MfGN6tjptiuWY8s7H7sca9Wdjwqjr9Mkbeu67o/hnR7zxB4gvI7DTrCNpp55m2pGi9ST/IdSeBzX4weOPEvxF/b5/aC0L4V/DG2dNJNwYNPjk3CKGAN/pGpXeBlQI/mIwSqgIgaRjvCZSsWvB3hL4pf8FIP2lo9E00zad4ctTvllwJINF0lWCtIVLKrzykDgHMkh4xGnyf1XfCX4S+Avgh4C0z4bfDbTE0rRNKTaiLy8sh+/NM/WSWQ8u55J9gAOD/Zo/Zt+Hv7Lvwzsvh34Et1eUKkmpai6BbjUbzbh55eSQM52R7iI1+UZ5J+hKDEKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooA/9D9/KKKKACiiigAr8gf+C1f/JrPhb/sc7H/ANN2o1+v1fkD/wAFq/8Ak1nwt/2Odj/6btRoA9//AOCXH/Jinwz/AO41/wCni9r7/r4A/wCCXH/Jinwz/wC41/6eL2vv+gAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKK/Kn/gpL+3Uv7PfhlvhN8L79T8R9fgzLPG2W0azk6THgjz5RkRLkFB+9OB5YcA/n8/aF8U+IvBv7YXxh17wpqM2lakni3xVbrcW7mOVYru6u7eZVYcjfFI6EjnBOOa/a3/AIJm/sBD4fWdj+0N8Z9O/wCKoukWbQ9OnX/kHwuuRczIw4uHB+QH/Vrz98/J+Tf/AATr0HSfHv7cnw807xtarrUFzd6neTJd5lEtxbafdXUckm77zLNGr/NnJHOea/sQoAK/mr/4LVf8l+8Ef9iwv/pbc1/SpX81f/Bar/kv3gj/ALFhf/S25oA9c/Yj/wCTYPBf/cR/9OFzX1ZXyn+xH/ybB4L/AO4j/wCnC5r6soN1sfnl4s/4J9+H/GvibVPFviDxxqM+o6vcy3U7/Z4gN8rFiFGThRnCr0AAA4Ffnb45+B+leE/2mLb4E2+pzT2E+p6TYG8dFEwXUUt2Zto+XKecceuBmv6H6/FH4y/8pD9P/wCxi8L/APoqyoJkj6Gg/wCCbfg61njurXxvqcM0LB0dIYlZWU5DKQcgg8giv0dsIbq3sbeC+uPtdzHGiyzbBH5rgAM+wcLuPOBwOlW6KCkgooooGFFFFABRRRQAUUUUAFFFFABUU88FrBJdXUiwwwqXd3IVVVRksxPAAHJJqWvyQ/bP/aUvPHGqx/Ab4RTSahBPMttqUlkplkvrpnCx2UAQFmAfhtmTIxCDgEOCbscb+0r8afFf7UfxI0v4HfBG1uNZ0xrtYLaC1GW1W95/e8gbYYhuwWIQKDK5AA2/0RfsY/sb+CP2SPh7HpdikWpeMtWijbW9XxlppQMmGAsAy20bZ2LgFvvuNxwPI/8Agn7+wXof7LfhSLxp44tob/4o6zDi7nDCWPTIX5+yWzYxuxjzpFzubKqSgBb9J6DFsKKKKBBRRRQAUUUUAFFFFABRRRQAUUUUAFFFFABRRRQAUUUUAFFFFABRRRQAUUUUAFFFFAH/0f38ooooAKKKKACvyB/4LV/8ms+Fv+xzsf8A03ajX6/V+QP/AAWr/wCTWfC3/Y52P/pu1GgD3/8A4Jcf8mKfDP8A7jX/AKeL2vv+vgD/AIJcf8mKfDP/ALjX/p4va+/6ACiiigAooooAKKKKACiiigAooooAKKKKACiivlT9r79qnwj+yf8ACu48aaz5d9r9/vt9E0suBJeXe3O5lyGEEWQ0zj7oIUfO6AgHmP7fP7Z2l/sn/Dhbbw/JBefEPxIrR6RZP84t4xkSX06f88oz8qKf9ZIQACqyFfyd/YC/Ys8TftSeOJv2lv2g3uNS8L/bXuVF4xabXb9Wyxcnk2yN989HI8teA2OK/ZS/Zs+KH/BQv41ap8cPjlfXE/hO3u1k1O9YmM3sqYKafZjokarhW28RJgD5iK/p80TRNI8N6PZeH9As4tP03ToUgtreFQkcUUY2qiqOAABigD+ZH9mOCG2/4LGapbW0axRReMfHSIiAKqqtvqgAAHAAHAFf1BV/MF+zT/ymS1f/ALHPx3/6I1Sv6faACv5q/wDgtV/yX7wR/wBiwv8A6W3Nf0qV/NX/AMFqv+S/eCP+xYX/ANLbmgD1z9iP/k2DwX/3Ef8A04XNfVlfKf7Ef/JsHgv/ALiP/pwua+rKDdbBX4o/GX/lIfp//YxeF/8A0VZV+11fij8Zf+Uh+n/9jF4X/wDRVlQKZ+11FFFBQUUUUAFFFFABRRRQAUUUUAFFFfEH7Y/7TifB7w5/whvg25R/GWsoRuBydPtmUgzkA8St0iB93PCgMCbPNP23v2o08M2Fx8HPh5eka3dgLqt5A/8Ax6QMDm3RlORM/G8/wJx95sp9v/8ABNP/AIJ9ab8LND0j9oL4xaf5/jjVIVudK0+4TjR4JRlJHRv+Xt0IJ3AGEHbgSbseG/8ABMf9gJPEP9l/tU/HK3a6WWUX3h3TZzv89g29NSueSWG/mFG6keY2QUz/AEE0GLdwooooEFFFFABRRRQAUUUUAFFFFABRRRQAUUUUAFFFFABRRRQAUUUUAFFFFABRRRQAUUUUAFFFFAH/0v38ooooAKKKKACvyB/4LV/8ms+Fv+xzsf8A03ajX6/V+QP/AAWr/wCTWfC3/Y52P/pu1GgD3/8A4Jcf8mKfDP8A7jX/AKeL2vv+vgD/AIJcf8mKfDP/ALjX/p4va+/6ACiiigAooooAKKKKACiiigAooooAKKK4f4k/Ebwd8JPA2sfEXx9qCaXoWhwNcXEznnA4VEXq8kjEJGg5ZiFHJFAHHftAfHjwJ+zh8MNU+KPxAuNlnYgR29shX7Re3b58q2gUkbncgk9lUM7YVWI/m++GngL44/8ABUr9o278ZePLqWx8K6ayi+uYsi10uxBLRWNkrZBlfnGckndK+e6674i+O/8AwVX/AGkbbRNNjfSfCWksTDBkvaaJprMA88pGBJcygDJ6u2EXaijb/Sj8E/gv4F+APw40r4Y/D2zFrpemJ8zsAZrmduZJ52AG+RzyT2GFGFAAAOo8AeAvCfww8HaV4C8D6fHpeiaLAtvbQRjAVV6lj1Z2OWZjyzEknJrsKKKAP5gv2af+UyWr/wDY5+O//RGqV/T7X8wX7NP/ACmS1f8A7HPx3/6I1Sv6faACv5q/+C1X/JfvBH/YsL/6W3Nf0qV/NX/wWq/5L94I/wCxYX/0tuaAPXP2I/8Ak2DwX/3Ef/Thc19WV8p/sR/8mweC/wDuI/8Apwua+rKDdbBX4o/GX/lIfp//AGMXhf8A9FWVftdX4o/GX/lIfp//AGMXhf8A9FWVApn2P8eP22tD+FTHSPDfhu/1bUpTIsVxewS2NgWiO1yjyKHn2NwdihT2evqz4XeKL/xt8NvC3jHVY4orzXNMtL2ZIQyxLJcRLIwQMWYKCeAWJx1Jr88f+CmYH9l/D49/O1L/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| As shown in the figure, what is the area of triangle AEB in cm²? | A. 140; B. 150; C. 160; D. Cannot be determined; E. No correct answer | A |
443 | 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axavpVl4W1bTLu5BK281mttJKVZVZh5kAki4H8fPqPD/AB1/wSP+BHxM8Waj468e+P8Ax1rmvas4kury51DTWklZVCLnGm4AVFCqAAFUAAAACvt74FfA4fAjw5H4Q07xz4j8W6NaQQW1jba/NZ3H2GG3BVUgkt7S3l27cLtkdwAqhQvOQD3SiiigD//S/fyiiigAooooAK4/xr8QvAPw10qLXfiN4l0zwrps8y20d1qt5DYwPOys6xLJO6KXKozBQckKTjANdhX5A/8ABav/AJNZ8Lf9jnY/+m7UaAPv/wD4ax/ZZ/6LJ4M/8KHTv/j9H/DWP7LP/RZPBn/hQ6d/8fr8Af2XP+CUv/DSnwJ8M/Gv/haP/COf8JH9t/0D+xPtnk/Y7ya0/wBd9uh3bvJ3/cGM45xk+/8A/DjH/qtn/lt//fKgD9f/APhrH9ln/osngz/wodO/+P0f8NY/ss/9Fk8Gf+FDp3/x+vyA/wCHGP8A1Wz/AMtv/wC+VH/DjH/qtn/lt/8A3yoA/X//AIax/ZZ/6LJ4M/8ACh07/wCP0f8ADWP7LP8A0WTwZ/4UOnf/AB+vyA/4cY/9Vs/8tv8A++VH/DjH/qtn/lt//fKgD9f/APhrH9ln/osngz/wodO/+P0f8NY/ss/9Fk8Gf+FDp3/x+vyA/wCHGP8A1Wz/AMtv/wC+VH/DjH/qtn/lt/8A3yoA/X//AIax/ZZ/6LJ4M/8ACh07/wCP0f8ADWP7LP8A0WTwZ/4UOnf/AB+vyA/4cY/9Vs/8tv8A++VH/DjH/qtn/lt//fKgD9f/APhrH9ln/osngz/wodO/+P0f8NY/ss/9Fk8Gf+FDp3/x+vyA/wCHGP8A1Wz/AMtv/wC+VH/DjH/qtn/lt/8A3yoA/X//AIax/ZZ/6LJ4M/8ACh07/wCP0f8ADWP7LP8A0WTwZ/4UOnf/AB+vyA/4cY/9Vs/8tv8A++VH/DjH/qtn/lt//fKgD9f/APhrH9ln/osngz/wodO/+P0f8NY/ss/9Fk8Gf+FDp3/x+vyA/wCHGP8A1Wz/AMtv/wC+VcP44/4IgfEmwtbZ/ht8T9J125dyJ01axuNJSNMcMj2735dieCpVABzk9KAP23/4ax/ZZ/6LJ4M/8KHTv/j9H/DWP7LP/RZPBn/hQ6d/8fr8Af8Ahyp+1N/0NPgz/wADtR/+V1H/AA5U/am/6GnwZ/4Haj/8rqAP3+/4ax/ZZ/6LJ4M/8KHTv/j9H/DWP7LP/RZPBn/hQ6d/8fr+RHwR+zT4h8f/ALRE/wCzXofivw+uvx3t5p8OozXFyuk3N1ZBy8cM62zSNvMbCNjEFkIAUncu77w/4cqftTf9DT4M/wDA7Uf/AJXUAfv9/wANY/ss/wDRZPBn/hQ6d/8AH6P+Gsf2Wf8Aosngz/wodO/+P1+AP/DlT9qb/oafBn/gdqP/AMrq+b/2oP8Agnp8aP2TPAOn/Eb4ja14f1HTdR1OLSo49KubuacTzQzTqzLPaQKE2wMCQxOSOMZIAP6jv+Gsf2Wf+iyeDP8AwodO/wDj9T2n7U37Md/dQ2Nj8XvB9zc3LrHFFHr+nu8jucKqqs5JYk4AHJNfz9fsuf8ABKX/AIaU+BPhn41/8LR/4Rz/AISP7b/oH9ifbPJ+x3k1p/rvt0O7d5O/7gxnHOMn6f8ACf8AwRO/4RfxTo3ib/hcv2n+yL23vPK/4R3Z5n2eRZNm7+0W27tuM4OPQ0AftF45+Kfwx+GMVpP8SvF+j+E4tQZ1tm1fULewWdowC4jNw6ByoYZC5xkZ6155/wANY/ss/wDRZPBn/hQ6d/8AH68P/bj/AGJ/+GzdK8I6Z/wmf/CH/wDCLTXk2/8As7+0PP8AtaxLjH2m32bfL65bOe2Ofzw/4cY/9Vs/8tv/AO+VAH7jad8TfhtrHg2b4jaT4s0m98J26SyS6xBf28mnIkBIlZrpXMQWMghyWwpBzivOP+Gsf2Wf+iyeDP8AwodO/wDj9eP/AA6/Y1/4QH9jbWP2Sf8AhL/t/wDatlqtp/bX9n+V5f8Aackj7/sn2hs+Xvxjzhux1GePzg/4cY/9Vs/8tv8A++VAH7ZeCfjT8HPiXqE+k/Djx3oPiu+tYvPmg0nVLW+lji3Bd7pBI7Ku4gbiMZIHesPX/wBpD9njwnrN34c8U/FHwto2rWDmO5s73W7G3uIXHJWSKSZXRvYgGvjj9iX/AIJ2/wDDHXj7XfHP/CwP+Eu/trTDp32f+yvsHlZmjm8zf9ruN3+rxt2jrnPGD4h8fv8AgkR/wvL4yeLPi3/wtj+xP+EovWvPsX9hfafI3KF2eb9vj39OuxfpQB+k1p+1N+zHf3UNjY/F7wfc3Ny6xxRR6/p7vI7nCqqrOSWJOAByTXeeOfin8MfhjFaT/Erxfo/hOLUGdbZtX1C3sFnaMAuIzcOgcqGGQucZGetfi74T/wCCJ3/CL+KdG8Tf8Ll+0/2Re2955X/CO7PM+zyLJs3f2i23dtxnBx6Gvu/9uP8AYn/4bN0rwjpn/CZ/8If/AMItNeTb/wCzv7Q8/wC1rEuMfabfZt8vrls57Y5APcP+Gsf2Wf8Aosngz/wodO/+P16Pp3xN+G2seDZviNpPizSb3wnbpLJLrEF/byaciQEiVmulcxBYyCHJbCkHOK/Dn/hxj/1Wz/y2/wD75V+j/wAOv2Nf+EB/Y21j9kn/AIS/7f8A2rZaraf21/Z/leX/AGnJI+/7J9obPl78Y84bsdRngA9g/wCGsf2Wf+iyeDP/AAodO/8Aj9dn4J+NPwc+JeoT6T8OPHeg+K761i8+aDSdUtb6WOLcF3ukEjsq7iBuIxkgd6/E3/hxj/1Wz/y2/wD75V9n/sS/8E7f+GOvH2u+Of8AhYH/AAl39taYdO+z/wBlfYPKzNHN5m/7Xcbv9XjbtHXOeMEA+x9f/aQ/Z48J6zd+HPFPxR8LaNq1g5jubO91uxt7iFxyVkikmV0b2IBrPtP2pv2Y7+6hsbH4veD7m5uXWOKKPX9Pd5Hc4VVVZySxJwAOSa/Nn4/f8EiP+F5fGTxZ8W/+Fsf2J/wlF6159i/sL7T5G5Quzzft8e/p12L9K8/8J/8ABE7/AIRfxTo3ib/hcv2n+yL23vPK/wCEd2eZ9nkWTZu/tFtu7bjODj0NAH7ReOfin8MfhjFaT/Erxfo/hOLUGdbZtX1C3sFnaMAuIzcOgcqGGQucZGeteef8NY/ss/8ARZPBn/hQ6d/8frw/9uP9if8A4bN0rwjpn/CZ/wDCH/8ACLTXk2/+zv7Q8/7WsS4x9pt9m3y+uWzntjn88P8Ahxj/ANVs/wDLb/8AvlQB+42nfE34bax4Nm+I2k+LNJvfCdukskusQX9vJpyJASJWa6VzEFjIIclsKQc4rzj/AIax/ZZ/6LJ4M/8ACh07/wCP14/8Ov2Nf+EB/Y21j9kn/hL/ALf/AGrZaraf21/Z/leX/ackj7/sn2hs+Xvxjzhux1GePzYu/wDgh5a2FrNfX/xyS2trZGkllk8OhEjRBlmZjqYAUAZJPAFAH7RaR+0V+z74gtdSvdB+J3hfUrfRrc3d9Jba1YzJaWwYIZp2SYiOPcyrvbC5IGckVif8NY/ss/8ARZPBn/hQ6d/8fr+Pfxb4UstH+I2q/B34DeLLvx/perTwWP2yGzOmpqkkUm4KsP2ibdbrKA6tI4UlRIVUKrV9raZ/wTNv59NtJ9V+IKWl9JFG08MelmaOKUqC6LIbpC6q2QG2LuHO0dKBpM/oy/4ax/ZZ/wCiyeDP/Ch07/4/R/w1j+yz/wBFk8Gf+FDp3/x+v52v+HZH/VSf/KP/APdlH/Dsj/qpP/lH/wDuygfKz+iX/hrH9ln/AKLJ4M/8KHTv/j9H/DWP7LP/AEWTwZ/4UOnf/H6/na/4dkf9VJ/8o/8A92Uf8OyP+qk/+Uf/AO7KA5Wf0S/8NY/ss/8ARZPBn/hQ6d/8fo/4ax/ZZ/6LJ4M/8KHTv/j9fztf8OyP+qk/+Uf/AO7KP+HZH/VSf/KP/wDdlAcrP6Jf+Gsf2Wf+iyeDP/Ch07/4/R/w1j+yz/0WTwZ/4UOnf/H6/na/4dkf9VJ/8o//AN2Uf8OyP+qk/wDlH/8AuygOVn9Ev/DWP7LP/RZPBn/hQ6d/8fo/4ax/ZZ/6LJ4M/wDCh07/AOP1/O1/w7I/6qT/AOUf/wC7KP8Ah2R/1Un/AMo//wB2UBys/ol/4ax/ZZ/6LJ4M/wDCh07/AOP0f8NY/ss/9Fk8Gf8AhQ6d/wDH6/na/wCHZH/VSf8Ayj//AHZR/wAOyP8AqpP/AJR//uygOVn9Ev8Aw1j+yz/0WTwZ/wCFDp3/AMfo/wCGsf2Wf+iyeDP/AAodO/8Aj9fztf8ADsj/AKqT/wCUf/7so/4dkf8AVSf/ACj/AP3ZQHKz+iX/AIax/ZZ/6LJ4M/8ACh07/wCP0f8ADWP7LP8A0WTwZ/4UOnf/AB+v52v+HZH/AFUn/wAo/wD92Uf8OyP+qk/+Uf8A+7KA5Wf0S/8ADWP7LP8A0WTwZ/4UOnf/AB+j/hrH9ln/AKLJ4M/8KHTv/j9fztf8OyP+qk/+Uf8A+7KP+HZH/VSf/KP/APdlAcrP6Jf+Gsf2Wf8Aosngz/wodO/+P0f8NY/ss/8ARZPBn/hQ6d/8fr+dr/h2R/1Un/yj/wD3ZXI+Ov2APDXw38K6h4z8XfFQWWl6cm+R/wCxssxJwqIv2zLO7EKoHUmgOVn9Kf8Aw1j+yz/0WTwZ/wCFDp3/AMfr0fwP8Tfht8TbW5vvht4s0nxZbWTiOeXSb+3vkidhkK7W7uFYjkA4OK/jE/Zw/Zr8d/tQfFO2+HPw6ikNp5gkvtTmixDYWO/DXE6hiN2PuRB8u3yg9WH9j/wW+Dvgj4C/DbRvhd8PrJbPSdIi256yXE7cy3ErHJaSVssxzgcKuFAACT1SiiigD//T/fyiiigAooooAK/IH/gtX/yaz4W/7HOx/wDTdqNfr9X5A/8ABav/AJNZ8Lf9jnY/+m7UaAPf/wDglx/yYp8M/wDuNf8Ap4va+/6+AP8Aglx/yYp8M/8AuNf+ni9r7/oAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACviD/goN+0j/wAM1fs463r+jXX2fxZ4jzo+h7WxJHdXKN5lyuOR9miDyK2CvmCNW++K+36/ki/4Kf8A7SP/AAvv9o6+0DQrrz/Cfw783R9P2tmOa6Dj7fcr1H7yVRGrKSrxwxsOpoA/Pjw9r+s+E9f0zxT4cu3sNW0a6hvbO5jOHhuLdxJFIuf4kdQR7iv7bP2Zvjlo37RvwQ8LfFzSAkMms2oF7bIci1v4T5d1BgkttSVW2FsFoyr4wwr+Huv2e/4I6ftI/wDCDfFDVP2evEl1s0Xx1m80ve2Eh1i2j+ZB0A+1W6bSSSS8MSKMtQB/S9X5A/8ABav/AJNZ8Lf9jnY/+m7Ua/X6vyB/4LV/8ms+Fv8Asc7H/wBN2o0Ae/8A/BLj/kxT4Z/9xr/08Xtff9fAH/BLj/kxT4Z/9xr/ANPF7X3/AEAFFFFABRRRQAUUUUAFFFFABRRRQAUUUUAFFFFABRRRQAV/PF/wU+/b1h8aNP8Asw/AbUpLqzM5g8Q6jZMSLxx8g023ZCS8e4/vyv32AjBKeYH9z/4Kgft8WXw+0HU/2cfg/qKy+LdWiMGuahbyc6VbPjdbRsOPtM6kq5zmJCekjKyfH37E/wCyxb+E9Ls/jB8QbMPr1+gl0y0mTmxhbO2ZgePOkXBUYzGpH8ZIUGlc9O/ZE/Zisfgz4bi8V+KrVZPG2qx5lLgMbCFx/wAe8ZBYbu8jjqflHAyftGiig2SCiiigYUUUUAFFFFABRRRQAUUUUAFFFFABRRRQAUUUUAFFFMkkSJGllYIiAlmJwAB1JJ7UAZ+s6zpfh3SbzXtcukstP0+J57iaQ4SOOMbmYn0AFfjH8U/iH8TP26Pi3o/wf+DmlTXOlJcsbC25TzGA2vfXZ+7GiITgn/VqSOWYg7P7Tv7QPiD9o/xdYfAn4JWk+raZcXiQotsm+XVrwN8mwYyIUIJXJAb77YCrj9//ANhX9jfQf2SvhfHZaglvf+PdcUTa5qUQ3DdnKWkDMAwghGBz/rH3SEAFVQMpSPUP2Vf2ZfBH7K3wosPh54TjW4v5FSfV9SK4l1C/KBZJSCSUjBGIo84RMDLMWZvpOiiggKKKKAP/1P38ooooAKKKKACvyB/4LV/8ms+Fv+xzsf8A03ajX6/V+QP/AAWr/wCTWfC3/Y52P/pu1GgD3/8A4Jcf8mKfDP8A7jX/AKeL2vv+vgD/AIJcf8mKfDP/ALjX/p4va+/6ACiiigAooooAKKKKACiiigAooooAKKKKACiiigDP1bT/AO1tKvdL+0zWf2yGSHz7Z/Lni8xSu+J8Ha65ypwcEA1+aH/Dob9jb/oHa1/4NH/+Jr9P6KAP5Cvgx+zl8NPG/wDwUU1D9mrXobp/BVt4j8UaYkcc5S4+z6TFfPbAzAZ3AwJuOOefWv3O8Pf8Epv2T/Cev6Z4p8OQ67Yato11De2dzHqjh4bi3cSRSLlPvI6gj3FflT+zT/ymS1f/ALHPx3/6I1Sv6faACvyB/wCC1f8Ayaz4W/7HOx/9N2o1+v1fkD/wWr/5NZ8Lf9jnY/8Apu1GgD3/AP4Jcf8AJinwz/7jX/p4va+/6+AP+CXH/Jinwz/7jX/p4va+/wCgAooooAKKKKACiiigAooooAKKKKACiiigAooooAK/Mj/gor+3VpX7NHgqf4f+AL9Jvihr8O23WMq50m3kB/0yZWVl3npDGw+YneflXDewftvfti+FP2TPhjc36zw3njrWYZI9B0xjuLzEbftM6jkW8JO5unmEeWpBJZf58/2ZvgN4k/aY8can8efjdcTarpdzeyzyvcHEmq324M+QAALdCcNtwuQI0GFYKDSOv/Yu/ZgbxXOPjl8WbaS7SWYz6XbXeWN1ITva9nD5LqWP7vcfnILkFdpb9aKigggtYI7W1jWGGFQiIgCqqqMBVA4AA4AFS0GyVgooooGFFFFABRRRQAUUUUAFFFFABRRRQAUUUUAFFFFABRRRQAV+T/7Zn7Uq+J/tHwJ+E8r332uVbbU7u1y5uH3Y+xW+zJfc2BIV+9/qxkFs+l/tm/tX23gfTb34UfDq8D+Jb1Gh1C6iOfsEMikMiMDxcMD1HMY54faR9X/8Euf2C4vAOi2n7Rnxm0hf+Eq1JVm8P2NwoY6dZugK3ciHhbmYN8ikZiQA5DuVQM5y6Ht//BN/9hjT/wBm/wAEW/xL+IdisnxO8SW4aZZVVv7HtXyVtYjjImdSDcN/e/dr8qFn/UOiigzCiiigAooooA//1f38ooooAKKKKACvyB/4LV/8ms+Fv+xzsf8A03ajX6/V+QP/AAWr/wCTWfC3/Y52P/pu1GgD3/8A4Jcf8mKfDP8A7jX/AKeL2vv+vgD/AIJcf8mKfDP/ALjX/p4va+/6ACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooA/mC/Zp/5TJav/wBjn47/APRGqV/T7X8wX7NP/KZLV/8Asc/Hf/ojVK/p9oAK/IH/AILV/wDJrPhb/sc7H/03ajX6/V+QP/Bav/k1nwt/2Odj/wCm7UaAPf8A/glx/wAmKfDP/uNf+ni9r7/r4A/4Jcf8mKfDP/uNf+ni9r7/AKACiiigAooooAKKKKACiiigAooooAKKKKACvnj9pv8AaV+H/wCy18Mbz4jeOZPPl5h07TY3VLnUbsj5YYt3RR96R8EImWwThW7v4v8Axd8CfAz4e6v8TfiNqC6fo2kRF26GWeTB2QQISu+aQ/Ki5GT1IAJH8p+ra98Xv+CkH7Q9z4j8UznTNFswCYonMlto+m5wkMAcjfLKRy2AXfc5ARdqgDPhj4I+I37d3xr1z4s/F7UZpdLSdZNQnTcqcnMWn2YYnYiJxgE+WmCTudS37PaFoWj+GdHs/D/h+zjsNOsI1hgghXakaL0AH8z1J5PNY3gXwN4a+G/hXT/BnhG0FlpempsjTOWYk5Z3bqzuxLMT1JrrqDaMbBRRRQUFFFFABRRRQAUUUUAFFFFABRRRQAUUUUAFFFFABRRRQAV8Z/ta/tP6Z8F/Ddx4V8M3KzeNtVhK26rhvsMcgx9pkHQMBkxKc5bBIKgg+gftHftD+HfgF4Ra+mMd94jv1K6bp7MQZG6GWTbyIk6k8bj8oIJyPk7/AIJ5/sZav+1v8QdR+Pnxy82+8F6bemSVbgEHXdQOWaIFcYt4TtMpAwcrEgxvMYRKVj2P/gmB+wr/AMLBvo/2o/jtYPfacZmn0Gyvh5n2+435bUZ9zEuiuD5auv7x/wB4flC7/wCiaq9paWthaw2NhCltbWyLHFFGoRI0QYVVUYAUAYAHAFWKDIKKKKACiiigAooooA//1v38ooooAKKKKACvyB/4LV/8ms+Fv+xzsf8A03ajX6/V+QP/AAWr/wCTWfC3/Y52P/pu1GgD3/8A4Jcf8mKfDP8A7jX/AKeL2vv+vgD/AIJcf8mKfDP/ALjX/p4va+/6ACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooA/mC/Zp/5TJav/wBjn47/APRGqV/T7X8wX7NP/KZLV/8Asc/Hf/ojVK/p9oAK/IH/AILV/wDJrPhb/sc7H/03ajX6/V+QP/Bav/k1nwt/2Odj/wCm7UaAPf8A/glx/wAmKfDP/uNf+ni9r7/r4A/4Jcf8mKfDP/uNf+ni9r7/AKACiiigAooooAKKKKACiiigAooooAK5vxh4v8M+APC2qeNfGWoxaToei28l1eXUxISKGMZZjgEk9gqgsxwFBJArcu7u1sLWa+v5ktra2RpJZZGCJGiDLMzHACgDJJ4Ar+W39t79rTxz+238Xrb4G/BR5Z/AdldiGzihLquqXEZO6/ucqrLCgyY1cYRQZD8zYUA4L9oD42/FL/go1+0OnhbwnJLZeC9NlmOkWcuRDZ2MZCPf3Srx50oIJGTtLLCrH7zfpx8HvhD4T+Cngy38G+E4jsU+bc3En+turggBpZD6nAAA4UAAVx/7O/7Pnhn4A+EzpmnsL3W9QCPqV+RgzSLnCID92JMnaOpySeTx9B0G0Y2CiiigoKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAryf4y/GLwn8EvBdz4u8UShnAZLO0VsS3lxjKxJwcf7TYIUcnsD1Hjzx54W+Gnha98Y+Mb1bHTbFcsx5Z2P3Y416s7HhVHX6ZI/I74ZfDz4rf8FJv2kXtPMfS/DWmATXc/WHSNIEuFjQ42yXUuSEBGZH3MQsSNsCZSsdJ+yX+zh48/wCCgvx61Lx78S5LmLwTpsol1e9jzGjbceRplo2MBypG4gfJGC7He6b/AOqnwp4U8N+BvDeneEPCGnQ6RoukQpb2lpboEihiQYCqB+ZJ5JySSSTXL/CX4S+Avgh4C0z4bfDbTE0rRNKTaiLy8sh+/NM/WSWQ8u55J9gAPSKDEKKKKACiiigAooooAKKKKAP/1/38ooooAKKKKACvyB/4LV/8ms+Fv+xzsf8A03ajX6/V+QP/AAWr/wCTWfC3/Y52P/pu1GgD3/8A4Jcf8mKfDP8A7jX/AKeL2vv+vgD/AIJcf8mKfDP/ALjX/p4va+/6ACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooA/mC/Zp/5TJav/wBjn47/APRGqV/T7X8wX7NP/KZLV/8Asc/Hf/ojVK/p9oAK/IH/AILV/wDJrPhb/sc7H/03ajX6/V+QP/Bav/k1nwt/2Odj/wCm7UaAPf8A/glx/wAmKfDP/uNf+ni9r7/r4A/4Jcf8mKfDP/uNf+ni9r7/AKACiiigAooooAKKKKACiiigAoor8I/+Cn/7fmpeHbu9/Zk+BuomPVJVMHiLVLRw0kPmcf2fbujErKeROcBkyIwdxfaAeK/8FKf24fEvxf8AG93+yz8B7mS58OW862Wp3FhlpdZv92GtYivLW8T/ACHAxLIGPMYUt337Kv7L+mfAnQm1rXPLvvGOqRqLqcAMlrGefs8DYzjP32H3yB2Arzz9jr9k0/CuGH4l/ECEHxbdRMLa2OCNOilXDZP/AD3dSVYj7qkr3avv+g1jEKKKKCwooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACsrXdd0fwzo954g8QXkdhp1hG0088zbUjRepJ/kOpPA5rQnngtYJLq6kWGGFS7u5CqqqMlmJ4AA5JNfjN8efir49/a9+L+mfAT4I28mp6XLeG3sYIG2/wBpXCKWkuZSSFWCJVdlLcLGrSsRnCApOxna7qfxK/4KEftGaR8MPhzHLbaGZCtnHMD5NlZxDNxqF2FO0NjJxnukKFnYF/6e/wBm79m74cfsv/Di1+Hnw8tf7st/fygfatQusYaaZh+SIPlReB3J88/Y1/Y88Efsi/D06FpDLqninWFjk1rViuGuZUB2xxA8pBEWYIvU5LNyePsOgwbCiiigAooooAKKKKACiiigAooooA//0P38ooooAKKKKACvyB/4LV/8ms+Fv+xzsf8A03ajX6/V+QP/AAWr/wCTWfC3/Y52P/pu1GgD3/8A4Jcf8mKfDP8A7jX/AKeL2vv+vgD/AIJcf8mKfDP/ALjX/p4va+/6ACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooA/mC/Zp/5TJav/wBjn47/APRGqV/T7X8wX7NP/KZLV/8Asc/Hf/ojVK/p9oAK/IH/AILV/wDJrPhb/sc7H/03ajX6/V+QP/Bav/k1nwt/2Odj/wCm7UaAPf8A/glx/wAmKfDP/uNf+ni9r7/r4A/4Jcf8mKfDP/uNf+ni9r7/AKACiiigAooooAKKKKACiivz4/4KAftt6b+yT4CttN8NiHUPiH4nSQaXayHclrCvyvfXCD+BWO2NTjzXyBlUkwAeN/8ABSr9vlv2e9IPwa+E94v/AAsbWrdZLm6TDjR7KYMA+c4F1KBmJSDsQ+YwGY935rfsbfsr30t9afHf4sxtcXtwwvdKtbgl5TK58xb6csclyfmjDZOT5h+bbjif2X/2efF/xw8bN+0P8cZptSs7m7N9H9uy82rXW7IlkDf8sFYDgja+AoGzIP6/UGkY9QooooNAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiivzJ/bZ/aivtGnl+CPwyuH/tW5VU1W8tzl4hLkCzixz5rgguyn5QQg+YttBN2PPv2wP2itb+J/iy3/Z++DUk2oW9zcx2F2bMFpdSv5ZRElnCF5eMPheP9Y5wMqoLftR+wJ+wboP7KPhk+LPFflap8S9ctxHfXSHdDYQOQxs7Y9xkDzJOrsBjCgZ8X/4Jtf8ABPeL4IWFl8c/jFZrJ4/1K3Dafp80YP8AYsEygksGGReOp2ueDEpKdS1fsHQYt3CiiigQUUUUAFFFFABRRRQAUUUUAFFFFAH/0f38ooooAKKKKACvyB/4LV/8ms+Fv+xzsf8A03ajX6/V+QP/AAWr/wCTWfC3/Y52P/pu1GgD3/8A4Jcf8mKfDP8A7jX/AKeL2vv+vgD/AIJcf8mKfDP/ALjX/p4va+/6ACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooA/mC/Zp/5TJav/wBjn47/APRGqV/T7X8wX7NP/KZLV/8Asc/Hf/ojVK/p9oAK/IH/AILV/wDJrPhb/sc7H/03ajX6/V+QP/Bav/k1nwt/2Odj/wCm7UaAPf8A/glx/wAmKfDP/uNf+ni9r7/r4A/4Jcf8mKfDP/uNf+ni9r7/AKACiiigAooooAKKK8L/AGjP2gfAv7M3wr1L4qePpWNrassFpaxkCe+vZQxitoQ3BZgrMT/Cis54U0Aeeftj/tbeDf2R/hi3izWQmoeI9V8yDQ9KLFWvbhNu9mIyVhhDq0r+6qDvdQf5xfhP8L/iV+2z8W9U+N/xru5rjRrm58y+ueYftTRgKlnagfcijUKhK/cQYB3nIhll+M//AAUa+PF1488cStZaFZskUrxcW2mWCsWSztdwIaVgSckEliXfjiv2N8MeGdE8G+H7Dwt4btEsdM0yJYYIYwFCqvc46sxyWPViSTyTQXGNzWtLS00+0hsLCFLa2tkWOKKNQkccaDaqqq4AUAYAHAFWKKKDUKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAoor5T/aq/aQsfgN4RWDSTHdeLdYVlsLdiGEK9GuZkyDsXkKMfO/HQMQA2eeftlftRn4SaSvgLwJdofF+qITNKpDHTrdhw5HaaTP7sHOAC5A+Td6F/wAE0P8AgnzPdz6V+1F8fLRpppm+26BpN4hZnZiSmo3ayDJJPz26n/ZlJ+5XjH/BPr9g/wAQftJeJov2lv2g/Mu/CLXbXVrbXXzya7cxPhmlDZ/0RHXawx+8xsACA1/TBQYSdwooooEFFFFABRRRQAUUUUAFFFFABRRRQAUUUUAf/9L9/KKKKACiiigAr8gf+C1f/JrPhb/sc7H/ANN2o1+v1fkD/wAFq/8Ak1nwt/2Odj/6btRoA9//AOCXH/Jinwz/AO41/wCni9r7/r4A/wCCXH/Jinwz/wC41/6eL2vv+gAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKAP5gv2af+UyWr/8AY5+O/wD0Rqlf0+1/MF+zT/ymS1f/ALHPx3/6I1Sv6faACvyB/wCC1f8Ayaz4W/7HOx/9N2o1+v1fkD/wWr/5NZ8Lf9jnY/8Apu1GgD3/AP4Jcf8AJinwz/7jX/p4va+/6/nc+EH7Vf7QX7I/7Anwp8f6L4a8N6/4G1O+1PTbdpp7tNRiuZNQv5iJo12xlGMUu1kbgBQwycn6W/Zp/be/bM/at0bXNc+Fnw98Grb+H54re4F/qF7bsXmUuuwKHBGBySRQB+xtFfkP4g/bX/bH+Ffxv+Hfwr+Nvwk0XRdM8ea5p+kw6pZXU1zbyJd3McEphlVyokjWTdskCt0O3bzX68UAFFFY/iDxBofhPQ7/AMTeJr+HS9J0uF7i6urhxHDDDGNzu7tgBQBkk0Acv8Uvih4K+DXgLWPiT8QtRTTND0SFpppGI3OeiRRKSN8sjYSNByzEAV/Kx8Zvi58Zf+Ckvx3htdJt30vwxpW5LCyZ2a10uyZvnubgj5WuJeNxHLEKi/KoNdl+1/8AtY/EX9vv4qaf8KPhJZ3EPgjT7hjp9mSYzeSL8rahfDO1VVc+Wrf6pSersa/QP4E/Bbw78DPAdr4R0ULPdviW/vNpV7u5IwzkEkqoHCLnAHuSSFRjc6j4ZfDfwx8J/Bmn+CPCVuIbOxQb5CB5lxMQBJPKR96SQjJPQcKoCgAd9RRQbBRRRQAUUUUAFFFFABRRRQAUUUUAFFFFABRRRQAUUUUAFFFec/Ff4neG/g/4F1Lx34okxbWKgRQqQJLmd+I4Yx3Zz/3yoLH5VJoA5L9oH45+H/gN4Fl8TaoBdaldloNNsgfmuLjaSM85EScGR+wwB8zKD8I/sd/sm/EX9vX4qXfxh+L91KPAmn3ijUbklozfSR4cadZhSCiBSA7qR5anglyCON+DPwZ+Nv8AwUl+Ns2r6vM+leEtKdRfXwUm1021J3La2qtxJcSDoOpPzvhQBX9V/wAP/AXhT4X+CtF+HvgewTTNC0C1jtLS3T+GOMYyzdXdzlndss7ksxLEmgxlK5uaHomkeGtF0/w54fs4tP0vSreK0tLaBQkUFvAgjijRRwqoqhVA6AYrUoooJCiiigAooooAKKKKACiiigAooooAKKKKACiiigD/0/38ooooAKKKKACvyB/4LV/8ms+Fv+xzsf8A03ajX6/V+QP/AAWr/wCTWfC3/Y52P/pu1GgD3/8A4Jcf8mKfDP8A7jX/AKeL2vv+vgD/AIJcf8mKfDP/ALjX/p4va+/6ACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooA/mC/Zp/5TJav/wBjn47/APRGqV/T7X8wX7NP/KZLV/8Asc/Hf/ojVK/p9oAK/IH/AILV/wDJrPhb/sc7H/03ajX6/V+QP/Bav/k1nwt/2Odj/wCm7UaAPgr4uf8AKGj4J/8AY33f/pXrldb/AMEv/wBpj4Qfs3fA74teIfiT4gtLK9W8tbiy0wzL9u1Bo7dwqW8Ay7bnIUvt2JnLEAE1yXxc/wCUNHwT/wCxvu//AEr1yur/AOCYX7NHwk/aQ+BXxd8O/EXw/Z31+13bW9hqbQr9u095LeQq8E4HmIFfDFAdjYwykZFAH6mfs++E1/ai/ZL+DPir4p6jdX2t6bqdh4qjvS4knN9pmoSSxgtIGOxkBibvsOARxX35XxB+zfezfsz/ALC/h3U/i9aS6JJ4E0S7n1K3mGyZTBNM4jVWxl5PlEY/iLKB1r678G+I18YeEND8WpayWK63Y218LeUgyQi5iWXy3K8bl3YOOMigDoJporeJ553WOKNSzMxAVVAySSeAAOpr+Zf/AIKD/t16t+1F4gT9m/4AJNe+Dvtkcc88Abzddu4nzGEX/n1jcB03ffZRIcBVr2P/AIKcft+p4h/tT9lb4G3DXSyymx8RalAN/nsG2PpttwSw38TOvUjy1yC+ed/Y4/ZjT4PeHP8AhMvGVsj+MtZQHaRk6fbMoIgBI4lbrKR7IOFJYHFXPQf2XP2d9L+A/gmNbyNJ/FmrIr6pdA7gpyStvEe0cecEj77ZY8bVX6eoooN0gooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiqWp6lYaNpt3rGq3CWljYxSTzzSMFjiiiUs7sx4CqoJJ7CgDG8Y+MPDvgHwxqHjHxZeLYaTpcfmzzNk4BIVQAOWZmIVVHLMQBya/Hi2svjZ/wAFHvjnaeEPBlmbLQ9PLMnmZNppNkzAPc3Lj70r4GAOWYBE4BNSfFD4lfFH9uT4raX8Gfgzpc0+kNc5s7XGzzSmQ17eN0jjRSSM8Ip7scV/Sd+yF+yz4R/ZP+E1p4E0Mpfa1d7bnWdT2Ksl7eFecEKG8mLJWFG+6uScszEhlKVz0P4CfAzwL+zn8LtI+FPw9t2j03TFZpJ5dpuLy5lO6W4ncAbpHPthVCooCKqj2SiiggKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigD//U/fyiiigAooooAK/IH/gtX/yaz4W/7HOx/wDTdqNfr9X5A/8ABav/AJNZ8Lf9jnY/+m7UaAPf/wDglx/yYp8M/wDuNf8Ap4va+/6+AP8Aglx/yYp8M/8AuNf+ni9r7/oAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigD+YL9mn/lMlq//AGOfjv8A9EapX9PtfzBfs0/8pktX/wCxz8d/+iNUr+n2gAr8gf8AgtX/AMms+Fv+xzsf/TdqNfr9X5A/8Fq/+TWfC3/Y52P/AKbtRoA+SPht+zN+07+1r/wT7+E3w08ES+EdG8GaVqOp6pFc6hf341K5njv9QixJFFYyRRIrTSgBZJCwCsSpyo+hv2UP2Of2/wD9kG18Q6d8PtY+G2rWXiR4JZ4dUuNYk2S26sqvG0FpCRkPhg24HAxg819Yf8EuP+TFPhn/ANxr/wBPF7X3/QB+KP7Rv7Iv/BSf9qWyt/DfxI8e+BNN8MRTJM+laPNqVvbPIh4kfzLKSWUrnKq8pQEAgA81d/4KPft8aJ8GvCt9+zZ8Eb3f4wubQWOo31s/Gi2rIEaKN1/5e3j+UbcGEHdkSbce9f8ABQL9vTQ/2W/CkvgvwPcw3/xR1mHNpAVEsemQvx9ruVzjdjPkxtnc2GYFAQ341/sYfs13njjVZPjz8XYZNQgnma502O9YyyX10zlpL2cuSzAPyu/JkYlzwAXBpXPRf2If2XE8M2Fv8Y/iHZEa3dgtpVnOn/HpAwGLh1YZEz87B/AnP3mwn6VUUUGyVgooooGFFFFABRRRQAUUUUAFFFFABRRRQAUUUUAFFFFABRRRQAySRIkaWVgiICWYnAAHUkntX47/ALTf7RHif9oPxdbfAL4HW0+qadd3i2v+h5eXV7kNhUQKcG3U/MM8NjecKBXc/th/tXXOp3N38C/hFJJcXNxJ9i1O8ttxkkkLbDZ22zlix+SQjrygzk1+o/8AwTU/YV/4Z08KH4qfE+wT/hZHiKHakLjL6PZPz9nB3FfOlwGlYAFf9WDgOWDOcuh7B+wH+xnpv7Jfwxf+3lhvfiB4l2zazeRnesKj/VWUD4H7qLksR9+QsSSojC/e9FFBmFFFFABRRRQAUUUUAFFFFABRRRQAUUUUAFFFFABRRRQAUUUUAf/V/fyiiigAooooAK/IH/gtX/yaz4W/7HOx/wDTdqNfr9X5A/8ABav/AJNZ8Lf9jnY/+m7UaAPf/wDglx/yYp8M/wDuNf8Ap4va+/6+AP8Aglx/yYp8M/8AuNf+ni9r7/oAKKKKACiiigAooooAK+GP2iv+CiH7N37NHiY+CfGN/fa14jhVWudP0aBLma1DgFfPeWWGJGYHOzeXxglQCpP3PX5mftK/Dz9in9nj4BeNLP4n6dpV7q/ia21G7E2piC48R6xqdyXcSxzFRO0gncYdAqQjn5VFAH1n+zv+038I/wBqHwjceL/hRqUlzHYyiC9tLmPyLyzlYbkWaPJGHAJVlZkbBAbKsBwXxP8A21fhP8N/iHcfCXTNM13x74x061e+1DS/C9gNQnsLZArNJclpIkXAZTtDM4yuVyyhvza/4I2eH/Dfg34XfFH4tt4jtdQ1G5WBbnR4JGFxY2+nLcSLJcIwAzPvYxsu5Qqn5txdV8x/4I7+INV8d/tM/Fn4geI5TdaxrOkyXVzM3LNLeX8cspyfVhQB+5fwM+Pvwt/aM8EReP8A4UauNU00uYZ42UxXFrOoBaGeJvmRwCD3VhhlLKQa9lr+a/8A4JHeN7zwv+1l8QPhpBIY9H1+wvZPJBwguNNulMLY6fLFJKv4197eLP8AgpHr3iA/ErWf2cfh5F438I/CaGO41nXL3UTZRTqzMrLZwLDI0gAR3DswGxC23lNwB+rVFfl9D/wUjj139ku8/ap8EfD7+1rfw3qKab4h0m51b7HNYyytCiPBKLWYXMbNcRc7YyATxlSK8f03/gq18QvGvwc134r/AA8+Al7eWvhScjWrmXVVbTrKBvL8p1m+zxyTyMXbzIkjHlKFdmKtwAftDRX5D6N/wVK1b4ifBu+8e/B34O6p4k1/w5a3F74ktmuhHpui20AZhK16YgbgyIpdYo4w+1XzjaC31H+xJ+2XoX7Y/gbV9fttDbw3rfhy5jttQsTP9pjAnQtDNHLsjysm1xtKgqVI5GCQD8V/2af+UyWr/wDY5+O//RGqV/T7X8wX7NP/ACmS1f8A7HPx3/6I1Sv6faACvyB/4LV/8ms+Fv8Asc7H/wBN2o1+v1fkD/wWr/5NZ8Lf9jnY/wDpu1GgD3//AIJcf8mKfDP/ALjX/p4va7T9s79sjwR+yR8PZNUvni1Lxlq0Ui6JpGctNKBgTThSGW2jbG9sgt9xDuOR8j/sn/tJfD39l3/gmP4A+Inju4V5QuuR6bpyOFuNRvP7XvSkEXBIGcb5NpEa/Mc8A/kF4H8NfEX9vn9oLXfip8Trl00k3An1CSPcIoYA3+j6baZOVAj+UHJKqC7lpGG8Gkaf7NXwW8V/tR/EjVPjj8brq41nTGu2nuZ7o5bVb3j91wRthiG3IUBAoESAAHb+zkEEFrBHa2sawwwqEREAVVVRgKoHAAHAArP0LQtH8M6PZ+H/AA/Zx2GnWEawwQQrtSNF6AD+Z6k8nmtWg2irBRRRQMKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAr8+P2w/2tYvhvbXfww+Hlxv8V3Mey7u0JA06OVcgKR/y8MpyuPuAhuuBXo37Vv7UOmfA3Qm8P6Ay3XjTVIS1rFgMlpG2VFzKDkHBB2IfvEc/KDnlf8AgmJ+w3qPxM8Sx/tS/HSxN1oUU0lxotleoWbU74sGN/MrjDW8bFjGP+WkvzcImJAiUj23/gln+wXL4Nt7f9pP406Q0Wv3Kq/hrTrlSrWcDqd19NGf+W0obEKsAY1Bcgs6GP8AcqiigyCiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigD/9b9/KKKKACiiigAr8gf+C1f/JrPhb/sc7H/ANN2o1+v1fkD/wAFq/8Ak1nwt/2Odj/6btRoA9//AOCXH/Jinwz/AO41/wCni9r7/r4A/wCCXH/Jinwz/wC41/6eL2vv+gAooooAKKKKACiiigBkkkcMbTTMERAWZmOAAOSST0Ar5v8AGfgL9mb9sjwPdWGqDQ/iDpMRltE1Cwngu5rGfA3eRdwFmglHBIDDIxuBU4P0BrWj6d4h0e/0DV4vPsdTgltriPJXfDMhR1ypBGVJGQQa/ND4cf8ABLzwf8HPF994j+Efxc8a+ELTUV2TW1hdWqs8fUI7vbsjhSTsLxsy9jnJoA+CP+CcfwI8QeCv20PjZ8LEupLzw34a0jV9A1C7CnyrgTXccVsHA+VZXRHkCnkbXA707/gjZo+peD/2jvir4J8Qwm01fS9Ie2uYH4eOazv0ilU/7rnBr93Pg58EPh18CfDc/hv4e2DwC/ne8v7y5le5vtQvJP8AWXN3cSEvLK55JJwM/KAOK8H+I/7Efgbxb8VL343fD/xPrXwx8bavaPY6ne+H3t0S/t5ceaZop4ZB5rBV/eIVIZVcgsAaAPwm/YG8BeLfF/xU+PnjPwlFJJJong7xNFazRKzZ1HUg0dnGCv8AE4WRlxydvFe7f8EX/G/g+bWfij8DvF/2ac+MLK0ubeyulRo72K2WeK8gKPxJmOZCY8HKBzjAbH7efs7/ALNvws/Zg8C/8IH8LbGSG3mk8+7u7pxLeXs+MeZPIFUEgcKqqqKOijJz8WfFX/gkp+zx8Q/iFcfETw7q+teCLq+uftVxa6TLCLYTMdzPbiWJnhZm+bhigP3UUcUAH7cfg34M/DT9gr4xfDn4OWOlaNBpMukzahp2mNHvt7m61KyZWuEUl1eSNV27+SgXHygY+NP2T8H/AIJGfHDP/P1rf/pHZ1+nviP9gr4O638CB+zrpWra74c8KXV2L/VH0+5tzfaxdKySCW/uLq2uGkbzI0f5QgyqjG1Qo47wn/wTj+G/gj4OeJ/gN4b+IvjS18HeLrhLm/tftWlszMFCSKkh00sizBYxIBywjUZALhgD89f+Ca+D+wf+0oD0+y6t/wCmZq6H/ghmT9k+NC54D+Hv5ahX3J8Ov+Cb3w2+FPgLxl8M/A/xH8baf4e8eWxtdUtxd6W25WwrtGx03cjvFuiYg4KOwIyFZez/AGX/ANg/4a/sk+ItV174X+LPE1zDrkMcN9YalcWM1pceTuMLsIrKGQPEXfYVkH3iCCDigD8YP2af+UyWr/8AY5+O/wD0Rqlf0+1/MF+zT/ymS1f/ALHPx3/6I1Sv6faACvyC/wCC1Klv2WvCoHX/AITOx/8ATdqNfq74q8VeHPA/hzUfF/i/UYdJ0bSIXuLu6uGCRRRIMlmP6ADknAAJIFfyO/t2fti69+1f8T5ZNOlltPAHh+WSLQrFhtLKQFe8nHGZp9uQD/q0wg53s4B4v8GvAHxG/aV8SeF/hpJfXD+GvCUEkXmkZg0uxnuJbuYIAMGWaaR9mcszEZPlp8n73eA/Afhb4aeFrLwd4OslsdNsVwqjlnY/ekkbqzseWY9fpgD8svCH7Mus/Gv9k34fL8Pzpmmak1/qV7qE960sRuCtxNbxktFFKWKoiqAQAAOOSa47/h2/8cP+g54d/wDAm8/+Q6DSOh+11Ffij/w7f+OH/Qc8O/8AgTef/IdfP3iD9nbxJ4b+M2m/A7UvEGi/29qXkp56TXBtIJ7hS0MErm3EgkkGzaFjYfvEyeTtB8z7H9F9Ffij/wAO3/jh/wBBzw7/AOBN5/8AIdH/AA7f+OH/AEHPDv8A4E3n/wAh0Du+x+11Ffjz4H/4J9fGbw1418P+I7/WdAkttK1C0u5VjuLoyNHBKsjBQbRQWIXjJAz3FfsNQNMKKKKBhRRRQAUUUUAFFFFABRRRQAUUUUAFfPP7Q/7Q/hb4BeFjf35W+16+Vhp2nBsNKw48yTHKxKfvN3+6vPTsPjF8YvB/wT8Hz+LfFs/qlraoR593PjIjjB/NmPCjk+h/NP8AZh+AfxG/4KI/tD3Xjbx/5lv4K0uaJ9auoiUjht1BMGnWYJzvkxgkH5FLyuS5USBMpWO9/YE/ZB8RftjfFfUfjx8cY57nwTYXZuZ3lXaNZ1AOCLRMjAtowP323hVCwoBuLR/1E2lpa2FrDY2EKW1tbIscUUahEjRBhVVRgBQBgAcAVj+FPCnhvwN4b07wh4Q06HSNF0iFLe0tLdAkUMSDAVQPzJPJOSSSSa6CgxCiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooA//X/fyiiigAooooAK/IH/gtX/yaz4W/7HOx/wDTdqNfr9X5A/8ABav/AJNZ8Lf9jnY/+m7UaAPf/wDglx/yYp8M/wDuNf8Ap4va+/6+AP8Aglx/yYp8M/8AuNf+ni9r7/oAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigD+YL9mn/lMlq//AGOfjv8A9EapX9Ot3d2mn2k1/fzJbW1sjSyyysEjjjQbmZmbACgDJJ4Ar+Yr9mn/AJTJav8A9jn47/8ARGqV6Z/wU0/bkv8A4meIZf2YvgbetdaBDMlvrN7ZMzPql9uK/YYDGfnt0YqHx/rZflHyJmQA8o/b3/a88S/th/FPTvgX8DFur/wbY3a2tpBbZL67qRcr9oKKeYV4ECt0G6VsFgsfzB+15+y3c/spal4E8H61fC+8Q63oK6pqvlkNBDdSXE0fkwnALLGqAFj95skYBAr92v8AgnP+wdbfs6+HYvin8TLRJfiTrMJCxthxpNrKP9Shx/r3X/XMOmfLBxuLfnx/wWq/5L94I/7Fhf8A0tuaAPXP2I/+TYPBf/cR/wDThc19WV8p/sR/8mweC/8AuI/+nC5r6soN1scT8R/Hej/DLwLrfjzXj/oejWzTFM7TK/3Y4lJ4DSyFUXPGWGa/mr8SeL9f8VeLdQ8b6tdMdX1K7e9kmQlCszvvzHg5UKeEAPygADpX6O/8FFfjF9s1TTPgro0/7rT9moartPWeRf8ARoW7/LGxkYHIO+M9Vr8vKDObP6P/ANnT4tQfGn4TaP4yZ1/tJV+yaki4Gy+gAEvA4USArKo7K6jrXuNfh5+wV8Yv+EC+KR8B6vPs0fxnst03H5Y9QTP2dhnp5uTEQB8zMmTha/cOguLugooooKCiiigAooooAKKKKACiiigAooooAK4/x5488LfDTwte+MfGN6tjptiuWY8s7H7sca9Wdjwqjr9Mkbeu67o/hnR7zxB4gvI7DTrCNpp55m2pGi9ST/IdSeBzX4weOPEvxF/b5/aC0L4V/DG2dNJNwYNPjk3CKGAN/pGpXeBlQI/mIwSqgIgaRjvCZSsWvB3hL4pf8FIP2lo9E00zad4ctTvllwJINF0lWCtIVLKrzykDgHMkh4xGnyf1XfCX4S+Avgh4C0z4bfDbTE0rRNKTaiLy8sh+/NM/WSWQ8u55J9gAOD/Zo/Zt+Hv7Lvwzsvh34Et1eUKkmpai6BbjUbzbh55eSQM52R7iI1+UZ5J+hKDEKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooA/9D9/KKKKACiiigAr8gf+C1f/JrPhb/sc7H/ANN2o1+v1fkD/wAFq/8Ak1nwt/2Odj/6btRoA9//AOCXH/Jinwz/AO41/wCni9r7/r4A/wCCXH/Jinwz/wC41/6eL2vv+gAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKK/Kn/gpL+3Uv7PfhlvhN8L79T8R9fgzLPG2W0azk6THgjz5RkRLkFB+9OB5YcA/n8/aF8U+IvBv7YXxh17wpqM2lakni3xVbrcW7mOVYru6u7eZVYcjfFI6EjnBOOa/a3/AIJm/sBD4fWdj+0N8Z9O/wCKoukWbQ9OnX/kHwuuRczIw4uHB+QH/Vrz98/J+Tf/AATr0HSfHv7cnw807xtarrUFzd6neTJd5lEtxbafdXUckm77zLNGr/NnJHOea/sQoAK/mr/4LVf8l+8Ef9iwv/pbc1/SpX81f/Bar/kv3gj/ALFhf/S25oA9c/Yj/wCTYPBf/cR/9OFzX1ZXyn+xH/ybB4L/AO4j/wCnC5r6soN1sfnl4s/4J9+H/GvibVPFviDxxqM+o6vcy3U7/Z4gN8rFiFGThRnCr0AAA4Ffnb45+B+leE/2mLb4E2+pzT2E+p6TYG8dFEwXUUt2Zto+XKecceuBmv6H6/FH4y/8pD9P/wCxi8L/APoqyoJkj6Gg/wCCbfg61njurXxvqcM0LB0dIYlZWU5DKQcgg8giv0dsIbq3sbeC+uPtdzHGiyzbBH5rgAM+wcLuPOBwOlW6KCkgooooGFFFFABRRRQAUUUUAFFFFABUU88FrBJdXUiwwwqXd3IVVVRksxPAAHJJqWvyQ/bP/aUvPHGqx/Ab4RTSahBPMttqUlkplkvrpnCx2UAQFmAfhtmTIxCDgEOCbscb+0r8afFf7UfxI0v4HfBG1uNZ0xrtYLaC1GW1W95/e8gbYYhuwWIQKDK5AA2/0RfsY/sb+CP2SPh7HpdikWpeMtWijbW9XxlppQMmGAsAy20bZ2LgFvvuNxwPI/8Agn7+wXof7LfhSLxp44tob/4o6zDi7nDCWPTIX5+yWzYxuxjzpFzubKqSgBb9J6DFsKKKKBBRRRQAUUUUAFFFFABRRRQAUUUUAFFFFABRRRQAUUUUAFFFFABRRRQAUUUUAFFFFAH/0f38ooooAKKKKACvyB/4LV/8ms+Fv+xzsf8A03ajX6/V+QP/AAWr/wCTWfC3/Y52P/pu1GgD3/8A4Jcf8mKfDP8A7jX/AKeL2vv+vgD/AIJcf8mKfDP/ALjX/p4va+/6ACiiigAooooAKKKKACiiigAooooAKKKKACiivlT9r79qnwj+yf8ACu48aaz5d9r9/vt9E0suBJeXe3O5lyGEEWQ0zj7oIUfO6AgHmP7fP7Z2l/sn/Dhbbw/JBefEPxIrR6RZP84t4xkSX06f88oz8qKf9ZIQACqyFfyd/YC/Ys8TftSeOJv2lv2g3uNS8L/bXuVF4xabXb9Wyxcnk2yN989HI8teA2OK/ZS/Zs+KH/BQv41ap8cPjlfXE/hO3u1k1O9YmM3sqYKafZjokarhW28RJgD5iK/p80TRNI8N6PZeH9As4tP03ToUgtreFQkcUUY2qiqOAABigD+ZH9mOCG2/4LGapbW0axRReMfHSIiAKqqtvqgAAHAAHAFf1BV/MF+zT/ymS1f/ALHPx3/6I1Sv6faACv5q/wDgtV/yX7wR/wBiwv8A6W3Nf0qV/NX/AMFqv+S/eCP+xYX/ANLbmgD1z9iP/k2DwX/3Ef8A04XNfVlfKf7Ef/JsHgv/ALiP/pwua+rKDdbBX4o/GX/lIfp//YxeF/8A0VZV+11fij8Zf+Uh+n/9jF4X/wDRVlQKZ+11FFFBQUUUUAFFFFABRRRQAUUUUAFFFfEH7Y/7TifB7w5/whvg25R/GWsoRuBydPtmUgzkA8St0iB93PCgMCbPNP23v2o08M2Fx8HPh5eka3dgLqt5A/8Ax6QMDm3RlORM/G8/wJx95sp9v/8ABNP/AIJ9ab8LND0j9oL4xaf5/jjVIVudK0+4TjR4JRlJHRv+Xt0IJ3AGEHbgSbseG/8ABMf9gJPEP9l/tU/HK3a6WWUX3h3TZzv89g29NSueSWG/mFG6keY2QUz/AEE0GLdwooooEFFFFABRRRQAUUUUAFFFFABRRRQAUUUUAFFFFABRRRQAUUUUAFFFFABRRRQAUUUUAFFFFAH/0v38ooooAKKKKACvyB/4LV/8ms+Fv+xzsf8A03ajX6/V+QP/AAWr/wCTWfC3/Y52P/pu1GgD3/8A4Jcf8mKfDP8A7jX/AKeL2vv+vgD/AIJcf8mKfDP/ALjX/p4va+/6ACiiigAooooAKKKKACiiigAooooAKKK4f4k/Ebwd8JPA2sfEXx9qCaXoWhwNcXEznnA4VEXq8kjEJGg5ZiFHJFAHHftAfHjwJ+zh8MNU+KPxAuNlnYgR29shX7Re3b58q2gUkbncgk9lUM7YVWI/m++GngL44/8ABUr9o278ZePLqWx8K6ayi+uYsi10uxBLRWNkrZBlfnGckndK+e6674i+O/8AwVX/AGkbbRNNjfSfCWksTDBkvaaJprMA88pGBJcygDJ6u2EXaijb/Sj8E/gv4F+APw40r4Y/D2zFrpemJ8zsAZrmduZJ52AG+RzyT2GFGFAAAOo8AeAvCfww8HaV4C8D6fHpeiaLAtvbQRjAVV6lj1Z2OWZjyzEknJrsKKKAP5gv2af+UyWr/wDY5+O//RGqV/T7X8wX7NP/ACmS1f8A7HPx3/6I1Sv6faACv5q/+C1X/JfvBH/YsL/6W3Nf0qV/NX/wWq/5L94I/wCxYX/0tuaAPXP2I/8Ak2DwX/3Ef/Thc19WV8p/sR/8mweC/wDuI/8Apwua+rKDdbBX4o/GX/lIfp//AGMXhf8A9FWVftdX4o/GX/lIfp//AGMXhf8A9FWVApn2P8eP22tD+FTHSPDfhu/1bUpTIsVxewS2NgWiO1yjyKHn2NwdihT2evqz4XeKL/xt8NvC3jHVY4orzXNMtL2ZIQyxLJcRLIwQMWYKCeAWJx1Jr88f+CmYH9l/D49/O1L/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| As shown in the figure, AB is parallel to CF, and the distance between AB and CF is 30 cm. What is the area of the shaded region in cm²? | A. 440; B. 450; C. 460; D. Cannot be determined; E. No correct answer | C |
444 | 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| As shown in the figure, a trapezoidal piece of paper has a square cut out from it. The area of the largest possible square that can be cut out is 16 cm². What is the length of AB in cm? | A. 3; B. 4; C. 5; D. 6; E. No correct answer | B |
445 | 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| As shown in the figure, if a trapezoidal piece of paper is cut to form the largest possible parallelogram, what are the base and height of the parallelogram in cm? | A. 12, 3; B. 16, 3; C. 16, 4; D. 12, 4; E. No correct answer | D |
446 | 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| As shown in the figure, if a parallelogram is cut out from the trapezoidal paper, what is the area of the largest possible parallelogram in cm²? | A. 36; B. 48; C. 54; D. 64; E. No correct answer | B |
447 | 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| As shown in the figure, a trapezoidal piece of paper has a largest square cut out from it, with the area of this square being 16 cm². What is the area of the largest parallelogram that can be cut out from this trapezoidal piece of paper? | A. 36; B. 48; C. 54; D. 64; E. No correct answer | B |
448 | 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 | As shown in the figure, it is the expanded view of a cubic container, where AB = 6 dm. What is the edge length of this cubic container ( ) dm? | A. 6; B. 4; C. 2; D. 3; E. No correct answer | C |
449 | 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 | As shown in the figure, the volume of this cubic container is () dm³. | A. 6; B. 8; C. 10; D. 12; E. No correct answer | B |
450 | 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 | As shown in the figure, the maximum amount of water that this cubic container can hold is () liters. | A. 0.8; B. 8; C. 6; D. 0.6; E. No correct answer | B |
451 | 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 | As shown in the figure, it is the unfolded diagram of a cubic container, where AB = 6 dm. What is the maximum amount of water this container can hold in liters? | A. 0.8; B. 8; C. 6; D. 0.6; E. No correct answer | B |
452 | 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 | As shown in the figure, the perimeter of triangle ADC is 17 cm. What is the sum of AD and CD? ( ) cm | A. 10; B. 12; C. 15; D. 17; E. No correct answer | B |
453 | 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 | As shown in the figure, triangle ABC is folded along the straight line DE so that point B coincides with point A. Given that AD + CD = 12 cm, what are the lengths of BC and AB in cm, respectively? | A. 10, 8; B. 12, 8; C. 15, 9; D. 17, 10; E. No correct answer | B |
454 | 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 | As shown in the figure, triangle ABC is folded along the straight line DE so that point B coincides with point A. What is the perimeter of triangle ABC in cm? | A. 17; B. 12; C. 15; D. 25; E. No correct answer | D |
455 | 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 | As shown in the figure, triangle ABC is folded along the straight line DE so that point B coincides with point A. If the perimeter of triangle ADC is 17 cm, what is the perimeter of triangle ABC in cm? | A. 17; B. 12; C. 15; D. 25; E. No correct answer | D |
456 | 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 | A rectangular wooden block is shown in the figure. What is its length in decimeters (dm)? | A. 3; B. 0.3; C. 30; D. Cannot be determined; E. No correct answer | C |
457 | 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 | A rectangular cuboid of wood is shown in the figure. After cutting it into 5 segments, the surface area increased by 40 dm². What is the area of the rectangular side ABCD of this prism in dm²? | A. 10; B. 5; C. 15; D. 17; E. No correct answer | B |
458 | 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 | A rectangular wooden block is shown in the figure. After cutting it into 5 pieces, the surface area increases by 40 dm². What is its volume in dm³? | A. 170; B. 120; C. 150; D. 1200; E. No correct answer | C |
459 | 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 | A rectangular wooden block is shown in the figure. After cutting it into 5 pieces, the surface area increases by 40 dm². What is the volume of this wooden block in dm³? | A. 170; B. 120; C. 150; D. 1200; E. No correct answer | C |
460 | 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 | As shown in the figure, the three-dimensional shape is composed of a rectangular cuboid and a cube. What is the surface area of the rectangular cuboid on the left in cm²? | A. 144; B. 208; C. 96; D. 224; E. No correct answer | A |
461 | 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 | As shown in the figure, the three-dimensional shape is composed of a rectangular cuboid and a cube. What is the surface area of the cube on the right in cm²? | A. 144; B. 208; C. 96; D. 224; E. No correct answer | C |
462 | 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 | As shown in the figure, the three-dimensional shape is composed of a rectangular cuboid with a surface area of 144 cm² and a cube with a surface area of 96 cm². What is the surface area of this geometric shape in cm²? | A. 144; B. 208; C. 96; D. 224; E. No correct answer | B |
463 | 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 | As shown in the figure, the solid shape is composed of a rectangular cuboid and a cube. What is the surface area of this geometric shape in cm²? | A. 144; B. 208; C. 96; D. 224; E. No correct answer | B |
464 | 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 | What is half of the area of the circle shown in the diagram in cm²?(π = 3.14) | A. 3.14; B. 1.57; C. 12.56; D. 6.28; E. No correct answer | B |
465 | 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 | As shown in the figure, the radius of the sector coincides with the diameter of the circle. The area of the sector is half of the area of the circle. What is the central angle of the sector? ( )° | A. 30; B. 45; C. 60; D. 90; E. No correct answer | B |
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 | As shown in the figure, the radius of the sector coincides with the diameter of the circle. The area of the sector is half the area of the circle. What is the length of the arc corresponding to the sector in cm?(π = 3.14) | A. 3.14; B. 1.57; C. 12.56; D. 6.28; E. No correct answer | B |
467 | 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 | As shown in the figure, the radius of the sector coincides with the diameter of the circle. The area of the sector is half of the area of the circle. What is the length of the arc corresponding to the sector in cm?(π = 3.14) | A. 3.14; B. 1.57; C. 12.56; D. 6.28; E. No correct answer | B |
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What is the angle ∠1 between the radius OA and the line l2? | A. 30°; B. 60°; C. 45°; D. 150°; E. No correct answer | A |
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What is the measure of ∠AOB? | A. 90°; B. 100°; C. 120°; D. 135°; E. No correct answer | C |
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What is the area of sector AOB in cm²?(π = 3.14) | A. 3.14; B. 9.42; C. 12.56; D. 6.28; E. No correct answer | B |
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What is the area of the sector in cm²?(π = 3.14) | A. 3.14; B. 9.42; C. 12.56; D. 6.28; E. No correct answer | B |
472 | 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 | As shown in the figure, in the rectangle ABGH, fold along DC. Is ∠BCD ( ) ∠DCF? | A. >; B. <; C. =; D. Cannot be determined; E. No correct answer | C |
473 | 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 | As shown in the figure, in the rectangle ABGH, fold along DC. What is the measure of ∠BCD and ∠DCF? | A. 60°; B. 45°; C. 65°; D. 75°; E. No correct answer | D |
474 | 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 | As shown in the figure, in the rectangle ABGH, fold along DC. What is the measure of ∠ADC? | A. 90°; B. 120°; C. 105°; D. 135°; E. No correct answer | C |
475 | iVBORw0KGgoAAAANSUhEUgAAAr4AAAFcCAYAAAAu471hAAAMPmlDQ1BJQ0MgUHJvZmlsZQAASImVVwdYU8kWnluSkJDQAghICb0JIlICSAmhBZDebYQkQCgxBoKKHVlUcC2oWMCGrooodpodsbMo9r5YUFDWxYJdeZMCuu4r3zvfN/f+958z/zlz7twyAKif4IrFOagGALmifElMsD8jKTmFQeoGCKAAbUAF7lxenpgVFRUOoA2e/27vbkBvaFcdZFr/7P+vpskX5PEAQKIgTuPn8XIhPggAXsUTS/IBIMp486n5YhmGDWhLYIIQL5ThDAWukuE0Bd4r94mLYUPcCoAKlcuVZACgdhnyjAJeBtRQ64PYScQXigBQZ0Dsk5s7mQ9xKsQ20EcMsUyfmfaDTsbfNNOGNLncjCGsmIvcVAKEeeIc7vT/sxz/23JzpIMxrGCjZkpCYmRzhnW7lT05TIapEPeK0iIiIdaC+IOQL/eHGKVkSkPiFf6oIS+PDWsGdCF24nMDwiA2hDhIlBMRruTT0oVBHIjhCkGnCfM5cRDrQbxQkBcYq/TZJJkco4yF1qdL2Cwlf44rkceVxXogzY5nKfVfZwo4Sn1MrTAzLhFiCsQWBcKECIjVIHbMy44NU/qMKcxkRwz6SKQxsvwtII4RiIL9FfpYQbokKEbpX5qbNzhfbFOmkBOhxPvzM+NCFPXBWnlcef5wLthlgYgVP6gjyEsKH5wLXxAQqJg71i0QxccqdT6I8/1jFGNxijgnSumPmwlygmW8GcQueQWxyrF4Qj5ckAp9PF2cHxWnyBMvzOKGRinywZeBcMAGAYABpLClgckgCwjbext64ZWiJwhwgQRkAAFwUDKDIxLlPSJ4jAWF4E+IBCBvaJy/vFcACiD/dYhVHB1Aury3QD4iGzyFOBeEgRx4LZWPEg1FSwBPICP8R3QubDyYbw5ssv5/zw+y3xkWZMKVjHQwIkN90JMYSAwghhCDiLa4Ae6De+Hh8OgHmzPOxD0G5/Hdn/CU0EF4RLhO6CTcniQskvyU5VjQCfWDlLVI+7EWuBXUdMX9cW+oDpVxXdwAOOAuMA4L94WRXSHLVuYtqwrjJ+2/zeCHu6H0IzuRUfIwsh/Z5ueRanZqrkMqslr/WB9FrmlD9WYP9fwcn/1D9fnwHPazJ7YQO4CdxU5i57EjWANgYMexRqwNOyrDQ6vriXx1DUaLkeeTDXWE/4g3eGdllcxzqnXqcfqi6MsXTJO9owF7sni6RJiRmc9gwS+CgMER8RxHMJydnF0AkH1fFK+vN9Hy7wai2/adm/8HAN7HBwYGDn/nQo8DsM8dPv5N3zkbJvx0qAJwroknlRQoOFx2IMC3hDp80vSBMTAHNnA+zsANeAE/EAhCQSSIA8lgIsw+E65zCZgKZoJ5oASUgWVgFVgHNoItYAfYDfaDBnAEnARnwEVwGVwHd+Hq6QIvQB94Bz4jCEJCaAgd0UdMEEvEHnFGmIgPEoiEIzFIMpKKZCAiRIrMROYjZUg5sg7ZjNQg+5Am5CRyHulAbiMPkR7kNfIJxVAqqo0aoVboSJSJstAwNA6dgGagU9BCtBhdgq5Bq9FdaD16Er2IXkc70RdoPwYwVUwXM8UcMCbGxiKxFCwdk2CzsVKsAqvG6rBmeJ+vYp1YL/YRJ+J0nIE7wBUcgsfjPHwKPhtfjK/Dd+D1eCt+FX+I9+HfCDSCIcGe4EngEJIIGYSphBJCBWEb4RDhNHyWugjviESiLtGa6A6fxWRiFnEGcTFxPXEP8QSxg/iY2E8ikfRJ9iRvUiSJS8onlZDWknaRjpOukLpIH1RUVUxUnFWCVFJURCpFKhUqO1WOqVxReabymaxBtiR7kiPJfPJ08lLyVnIz+RK5i/yZokmxpnhT4ihZlHmUNZQ6ymnKPcobVVVVM1UP1WhVoepc1TWqe1XPqT5U/UjVotpR2dTxVCl1CXU79QT1NvUNjUazovnRUmj5tCW0Gtop2gPaBzW6mqMaR42vNketUq1e7YraS3WyuqU6S32ieqF6hfoB9UvqvRpkDSsNtgZXY7ZGpUaTxk2Nfk265ijNSM1czcWaOzXPa3ZrkbSstAK1+FrFWlu0Tmk9pmN0czqbzqPPp2+ln6Z3aRO1rbU52lnaZdq7tdu1+3S0dFx0EnSm6VTqHNXp1MV0rXQ5ujm6S3X3697Q/TTMaBhrmGDYomF1w64Me683XM9PT6BXqrdH77reJ32GfqB+tv5y/Qb9+wa4gZ1BtMFUgw0Gpw16h2sP9xrOG146fP/wO4aooZ1hjOEMwy2GbYb9RsZGwUZio7VGp4x6jXWN/YyzjFcaHzPuMaGb+JgITVaaHDd5ztBhsBg5jDWMVkafqaFpiKnUdLNpu+lnM2uzeLMisz1m980p5kzzdPOV5i3mfRYmFmMtZlrUWtyxJFsyLTMtV1uetXxvZW2VaLXAqsGq21rPmmNdaF1rfc+GZuNrM8Wm2uaaLdGWaZttu972sh1q52qXaVdpd8ketXezF9qvt+8YQRjhMUI0onrETQeqA8uhwKHW4aGjrmO4Y5Fjg+PLkRYjU0YuH3l25DcnV6ccp61Od0dpjQodVTSqedRrZztnnnOl87XRtNFBo+eMbhz9ysXeReCyweWWK911rOsC1xbXr27ubhK3Orcedwv3VPcq95tMbWYUczHznAfBw99jjscRj4+ebp75nvs9//Jy8Mr22unVPcZ6jGDM1jGPvc28ud6bvTt9GD6pPpt8On1Nfbm+1b6P/Mz9+H7b/J6xbFlZrF2sl/5O/hL/Q/7v2Z7sWewTAVhAcEBpQHugVmB84LrAB0FmQRlBtUF9wa7BM4JPhBBCwkKWh9zkGHF4nBpOX6h76KzQ1jBqWGzYurBH4XbhkvDmsejY0LErxt6LsIwQRTREgkhO5IrI+1HWUVOiDkcTo6OiK6OfxoyKmRlzNpYeOyl2Z+y7OP+4pXF3423ipfEtCeoJ4xNqEt4nBiSWJ3YmjUyalXQx2SBZmNyYQkpJSNmW0j8ucNyqcV3jXceXjL8xwXrCtAnnJxpMzJl4dJL6JO6kA6mE1MTUnalfuJHcam5/GietKq2Px+at5r3g+/FX8nsE3oJywbN07/Ty9O4M74wVGT2ZvpkVmb1CtnCd8FVWSNbGrPfZkdnbswdyEnP25KrkpuY2ibRE2aLWycaTp03uENuLS8SdUzynrJrSJwmTbMtD8ibkNeZrwx/5NqmN9BfpwwKfgsqCD1MTph6YpjlNNK1tut30RdOfFQYV/jYDn8Gb0TLTdOa8mQ9nsWZtno3MTpvdMsd8TvGcrrnBc3fMo8zLnvd7kVNRedHb+Ynzm4uNiucWP/4l+JfaErUSScnNBV4LNi7EFwoXti8avWjtom+l/NILZU5lFWVfFvMWX/h11K9rfh1Ykr6kfanb0g3LiMtEy24s912+o1yzvLD88YqxK+pXMlaWrny7atKq8xUuFRtXU1ZLV3euCV/TuNZi7bK1X9Zlrrte6V+5p8qwalHV+/X89Vc2+G2o22i0sWzjp03CTbc2B2+ur7aqrthC3FKw5enWhK1nf2P+VrPNYFvZtq/bRds7d8TsaK1xr6nZabhzaS1aK63t2TV+1+XdAbsb6xzqNu/R3VO2F+yV7n2+L3Xfjf1h+1sOMA/UHbQ8WHWIfqi0HqmfXt/XkNnQ2Zjc2NEU2tTS7NV86LDj4e1HTI9UHtU5uvQY5VjxsYHjhcf7T4hP9J7MOPm4ZVLL3VNJp661Rre2nw47fe5M0JlTZ1lnj5/zPnfkvOf5pgvMCw0X3S7Wt7m2Hfrd9fdD7W7t9ZfcLzVe9rjc3DGm49gV3ysnrwZcPXONc+3i9YjrHTfib9y6Of5m5y3+re7bObdf3Sm48/nu3HuEe6X3Ne5XPDB8UP2H7R97Ot06jz4MeNj2KPbR3ce8xy+e5D350lX8lPa04pnJs5pu5+4jPUE9l5+Pe971Qvzic2/Jn5p/Vr20eXnwL7+/2vqS+rpeSV4NvF78Rv/N9rcub1v6o/ofvMt99/l96Qf9Dzs+Mj+e/ZT46dnnqV9IX9Z8tf3a/C3s272B3IEBMVfClf8KYLCh6ekAvN4OAC0ZADrcn1HGKfZ/ckMUe1Y5Av8JK/aIcnMDoA7+v0f3wr+bmwDs3Qq3X1BffTwAUTQA4jwAOnr0UBvcq8n3lTIjwn3Apqivablp4N+YYs/5Q94/n4FM1QX8fP4Xh8R8bjIPi4cAAACKZVhJZk1NACoAAAAIAAQBGgAFAAAAAQAAAD4BGwAFAAAAAQAAAEYBKAADAAAAAQACAACHaQAEAAAAAQAAAE4AAAAAAAAAkAAAAAEAAACQAAAAAQADkoYABwAAABIAAAB4oAIABAAAAAEAAAK+oAMABAAAAAEAAAFcAAAAAEFTQ0lJAAAAU2NyZWVuc2hvdG1bUAcAAAAJcEhZcwAAFiUAABYlAUlSJPAAAAHWaVRYdFhNTDpjb20uYWRvYmUueG1wAAAAAAA8eDp4bXBtZXRhIHhtbG5zOng9ImFkb2JlOm5zOm1ldGEvIiB4OnhtcHRrPSJYTVAgQ29yZSA2LjAuMCI+CiAgIDxyZGY6UkRGIHhtbG5zOnJkZj0iaHR0cDovL3d3dy53My5vcmcvMTk5OS8wMi8yMi1yZGYtc3ludGF4LW5zIyI+CiAgICAgIDxyZGY6RGVzY3JpcHRpb24gcmRmOmFib3V0PSIiCiAgICAgICAgICAgIHhtbG5zOmV4aWY9Imh0dHA6Ly9ucy5hZG9iZS5jb20vZXhpZi8xLjAvIj4KICAgICAgICAgPGV4aWY6UGl4ZWxZRGltZW5zaW9uPjM0ODwvZXhpZjpQaXhlbFlEaW1lbnNpb24+CiAgICAgICAgIDxleGlmOlBpeGVsWERpbWVuc2lvbj43MDI8L2V4aWY6UGl4ZWxYRGltZW5zaW9uPgogICAgICAgICA8ZXhpZjpVc2VyQ29tbWVudD5TY3JlZW5zaG90PC9leGlmOlVzZXJDb21tZW50PgogICAgICA8L3JkZjpEZXNjcmlwdGlvbj4KICAgPC9yZGY6UkRGPgo8L3g6eG1wbWV0YT4KhBmkFwAAABxpRE9UAAAAAgAAAAAAAACuAAAAKAAAAK4AAACuAAAi6XMT0uQAACK1SURBVHgB7J17zB1F+ccfUIhUhRYpAYslUlChchFEESGRtqTBRIWIsVbBBEVsvaWINjQh2psRDRXxAqh4J7UmKvEfGrloDUqBWJBLiUCBSgE1VkDU0tJ2f/McfrvMmfec991zds7uzOxnkpOzu2eun2fmzHefnd3dIzNBCBCAAAQgAAEIQAACEEicwB4I38QtTPMgAAEIQAACEIAABDoEEL50BAhAAAIQgAAEIACBVhBA+LbCzDQSAhCAAAQgAAEIQADhSx+AAAQgAAEIQAACEGgFAYRvK8xMIyEAAQhAAAIQgAAEEL70AQhAAAIQgAAEIACBVhBA+LbCzDQSAhCAAAQgAAEIQADhSx+AAAQgAAEIQAACEGgFAYRvK8xMIyEAAQhAAAIQgAAEEL70AQhAAAIQgAAEIACBVhBA+LbCzDQSAhCAAAQgAAEIQADhSx+AAAQgAAEIQAACEGgFAYRvK8xMIyEAAQhAAAIQgAAEEL70AQhAAAIQgAAEIACBVhBA+LbCzDQSAhCAAAQgAAEIQADhSx+AAAQgAAEIQAACEGgFAYRvK8xMIyEAAQhAAAIQgAAEEL70AQhAIGoCTz75pPzlL3/x0oaZM2fK1KlTveRFJhCAAAQgEB4BhG94NqFGEIDAAAR++tOfysqVK+XRRx+V5557boCUY6Nee+21Mn/+/LE/cAQCEIAABJIggPBNwow0AgIQ2LZtm5x33nnys5/9rIBx6KGHyoIFC4p9e2P79u2ydetWuf766+XBBx/s/HTVVVfJBRdcYEdjGwIQgAAEEiKA8E3ImDQFAm0ncMcdd8hb3vKWAsOcOXPkhhtuKPZ7bfz3v/+VD33oQ3LdddfJV7/6Vbnooot6ReMYBCAAAQgkQADhm4ARaQIEIPACgS1btshrXvOaAkcZ4auR1fM7bdo0Wbx4sSxdurRIzwYEIAABCKRFAOGblj1pDQRaTeDpp5+WKVOmFAzKCl9NMHv2bDn22GNl1apVRXo2IAABCEAgLQII37TsSWsg0GoCzzzzjEyePLlgMIjwXb9+vUyaNEmOOeaYIj0bEIAABCCQFgGEb1r2pDUQaDWBKsK31eBoPAQgAIGWEED4tsTQNBMCbSAwjPB961vfKhdeeKG8//3vbwMi2ggBCECg1QQQvq02P42HQFoEBhW+O3bs6KwJ1seYnXPOOWnBoDUQgAAEIDCGAMJ3DBIOQAACsRIYVPhecsklsmLFCvnxj3+M8I3V6NQbAhCAwAAEEL4DwCIqBCAQNgFX+L761a+Wc889t6vSu3bt6jy+7M477xT9aED4diFiBwIQgECyBBC+yZqWhkGgfQRc4VuWAMK3LCniQQACEIibAMI3bvtRewhAwCLgCt8TTjhBfvSjH1kxRHbu3CmbNm2Se+65Ry699FLRVx0jfLsQsQMBCEAgWQII32RNS8Mg0D4CrvCd6Dm+a9eulTPOOAPh276uQoshAIGWEkD4ttTwNBsCKRIYVPgqgwMPPFAuu+wybm5LsUPQJghAAAIOAYSvA4RdCEAgXgLDCN/PfvazcuaZZ8qpp54ab8OpOQQgAAEIlCKA8C2FiUgQgEAMBIYRvjG0izpCAAIQgIAfAghfPxzJBQIQCICAD+G7Zs2ajvdXH4VGgAAEIACBtAggfNOyJ62BQKsJVBW+v/nNb2Tu3Lly++23y4knnthqljQeAhCAQIoEEL4pWpU2QaClBJ566inZf//9i9bPnj1bbrzxxmJ/vI3//e9/cvzxx3ced/bQQw+NF5XfIAABCEAgUgII30gNR7UhAIGxBJ544gmZNm1a8YPesPb73/++2O+3kWWZzJs3T37+85/LkiVLZOXKlf2ichwCEIAABCImgPCN2HhUHQIQ6Cag3t3TTz+9OHjwwQfLAw88IK94xSuKY+7GfffdJx/72Mfkj3/8Y+enu+++W44++mg3GvsQgAAEIJAAAYRvAkakCRBoM4Hnn39ennzySbnllltk8eLFsmXLli4cU6dOlSOPPFImTZpUHN+1a5fo0gZN98gjj4h6fDUcddRRokKYAAEIQAACaRJA+KZpV1oFgdYQuPzyy2XRokVe2rts2TK55JJLvORFJhCAAAQgEB4BhG94NqFGEIAABCAAAQhAAAIjIIDwHQFUsoQABCAAAQhAAAIQCI8Awjc8m1AjCEAAAhCAAAQgAIEREED4jgAqWUIAAmES+OIXvyj6IUAAAhCAQDsJIHzbaXdaDYFWEfjd734nS5cuFf3+7W9/K+94xzta1X4aCwEIQAACLxBA+NITIACBpAmo2D3ttNO62oj47cLBDgQgAIHWEED4tsbUNBQC7SOgyxrU0+sG9fiq+CVAAAIQgEC7CCB822VvWtswAfU+6mfdunXyhS98gUvuI7SHK3pV7Cr7PCB+cxJ8QwACEGgPAYRve2xNSwMgoJfcc/HF5fbRGET55ut58xJykeuKYT350GMECEAAAhBoBwGEbzvsTCsDIaCiLF9vmouxQKqWRDVsvnmDXHHril9OQHJSfEMAAhBInwDCN30b08LACOyxxx5FjRBdBYrKG66g1Qxd0ZsXYnve9Rh2yMnwDQEIQCBtAgjftO1L6wIkYIsuvL5+DNRL9E4kZrGDH/bkAgEIQCAmAgjfmKxFXZMgYF+OR/hWN6ktYDW3skxtOwySrnqNyQECEIAABJoigPBtijzltpqALdYm8ky2GtQ4jXeFq0btt7ShXzZuHoOm75cvxyEAAQhAIEwCCN8w7UKtEidgC9+yHsrEkQzUvF5LG4YVrW5ew+YzUAOIDAEIQAACjRBA+DaCnULbTsD1NGZZ1nYkpdvvClVNWNVrbp+I+MivdGOICAEIQAACtRJA+NaKm8Ig8CIBW2xVFW4v5pr2ls1MW6recvXQ6nfV4ObNyUhVoqSHAAQgEB4BhG94NqFGLSFge31VuKn4JfQmoKz6vZSid4rBj9r20NTYZHCGpIAABCAQOgGEb+gWon7JEnCFFl7f3qZ2OWmsUa3DdcsaVTm9W8pRCEAAAhAYNQGE76gJkz8ExiFgX15H+I4F1Ws976jFqFvmqMsb22qOQAACEIDAqAggfEdFlnwhUIKA7WHk0no3MFeAKh8Vofo96uCWzUnJqImTPwQgAIF6CCB86+FMKRDoS4BXGHej0ZOBUa/n7S6x957tjdcYiN/enDgKAQhAICYCCN+YrEVdkyRgC6y2e31tD3hu7CaXGtgnJW23TW4PviEAAQjETADhG7P1qHsSBGyx12Zx5S4vUOM2KXq1fNs2IdRH60CAAAQgAIHhCSB8h2dHSgh4I2B7Ftt4Sb2X6A2Fg1u3psW4t05HRhCAAARaSADh20Kj0+TwCLR5uYPddrVMiF5vV/yGIsrD68nUCAIQgEDYBBC+YduH2rWEgHtJvQ1vDdM2uzexhexNdQU64rclg5NmQgACSRFA+CZlThoTMwFbWKUuqlwPqtotZNGb9yvbRiF6pvN68g0BCEAAAr0JIHx7c+EoBGonYHt9UxZVvURvLELftpF2kJTtVPsAoEAIQAACNRBA+NYAmSIgUIaAK6piEYNl2pbHsT2mekyFo3p69TuW4Ar3GDzVsbClnhCAAARGTQDhO2rC5A+BAQjYwjAl4dtrPa+KXW1jjAHxG6PVqDMEIAABEYQvvQACARGwvb4xC0Mbqd2m/HgKXlL7JEXbldKJSm4nviEAAQikRgDhm5pFaU9tBB555BHZvHnzhOXpM3r3228/mTx5skyZMkX23XdfsZ/b62Zg/xa7mHI9o9rWFERvbjNb/KZyopK3jW8IQAACKRJA+KZoVdpUC4GvfOUr8vWvf12eeOKJgcrbc889Zfr06TJr1iyZM2dO5zN16tQij1TElCt6VRjGtp63MEqfDdebjfjtA4rDEIAABAIhgPANxBBUI04Cu3fvlptvvlk+//nPy5133lk0Qr22hxxyiBx++OEyY8YM2bFjh/z5z3+W+++/v7NdRDQbe++9tyxZskQuvvjizrYtpmIVUrZ417bG2g7bTv22bXtpnJQ82v3azHEIQAACsRJA+MZqOeodFIE1a9bIvHnzijp9+MMflh/+8IfFfr7x/PPPy4YNG+TTn/603H777fnhzvfMmTPlF7/4hbz+9a/vWgoR03IHVwRqw9ogBF3vdhva3NV52YEABCAQCQGEbySGopphE7j11lvl5JNPLirZT/jmEXbu3CkrV66UFStWiG7n4YgjjugI4rPOOktURGqIxVvqij+te5sEoNv+mE5Y1FYECEAAAm0ggPBtg5Vp48gJ3HffffLGN76xKGci4ZtHXLduXWetry6ZyMPcuXM7Sydmz56dH5LQX2Hsij6teBuFn7vEI3S7FR2MDQhAAAItIYDwbYmhaeZoCWzcuFF0qUIeygpfjb9w4UK58sor86Sd79WrV8vVV19deH1DFpGu2FMPtXp69bttwV3qEYu3vm12or0QgEB7CSB822t7Wu6RQBXh+69//auzrvef//xnUaNTTjlFli9fLioqNYQooFTkLV26tBDnWs82LW3Q9vYKrviFSS9KHIMABCDQDAGEbzPcKTUxAlWEr6JQj696fu1wzTXXyEc+8pHiUEiXzXstbUDgFaYSlw9sXmTDFgQgAIEmCSB8m6RfQ9nnnntuZ+2pPm6LMDoCVYXvQw89JHpjmx2+/OUvy9q1awuPaijLHVxRp3UOpW42v6a3XU4watoilA+BdAiUfYHSS17yEjn11FOLhuvN1LfcckuxP97GG97wBjnooIPGixLnb8aLREiUgHlubGZ6ZXbAAQdk27ZtS7SVYTTL3NzWYa289WPW+A5UMfNnlJnn+XblsWDBgsyIpeKYWe4wUJ6jiKx1yNuo37qvdST0JuDyglVvThyFAAQGI3DppZdm5lnxXf/H9n+zbk+aNCk7/vjjM/Mc+SJz88Kl7Oijj8722muvcdMedthh2U9+8pMiXUoberc4IVECH/3oR4uObZ4pm2grw2hWVeGrrTjyyCMLe+mf1jvf+c5O4+w/s6aEk5brijjdJ0xMwLYfzCbmRQwIQKA8gQceeCA79thju+YO8wKlzCyVy7Zv3943o2effTb70pe+1JVO/6vMfSWZiuOUA8I3Uetu3bo122effYpOfeKJJyba0jCa5UP4vvvd7y7spX9AxxxzTKdxtuBsQjip6LXFm26bNathgI+gFi6/JmwYASaqCAEIDEngV7/6Vdd/tIrXskE9u/b/u3kDadmk0cZD+EZruvErrpdB7M6s2+ZNYeMn4tehCfgQvmeccUaXzXKBZAun/NjQFR0woQpctx8hegeEaKK7HGE4OENSQAACvQmsX7++63/6gx/8YO+IPY6+/e1v70r797//vUestA4hfNOyZ6c1ul700EMP7erMKl4GXXeaIJqRNcmH8J0xY0aXzT7xiU8U9bXFpwrhOoIr1rQOdZVdR/vqLsPlCcu6LUB5EEiTwF133dU1d5inAZVuqHlRUlfap59+unTaWCMifGO13Dj1di975KLpZS97WWaeFTtOSn4alkBV4fvcc89l5u7brj+gb33rW0V11NOb27EOr69dnpZbR5lFYxPecLkifhM2Nk2DQE0E8hvZ8zlC7+8pG+bMmVPMLZr+mWeeKZs02ngI32hN17/iur5HO/DixYuzs846q6tT6xIIgn8CVYXvvffe22UntZ95EUJRURVI+Z+afo8quOVoWVyW90vbFr+cUPhlS24QaCMBhO9gVh/dDDpYPYjticA999zTEUjqPdy8eXN20003dQmm1772tdmuXbs8lUY2OYGqwtc887XLTnpjonmjW55959sWTKPwFLqX4hG9Xfi97bgnF4hfb2jJCAKtJIDwHczsCN/BeAUf+4ILLugIqPe+971FXd3HZP36178ufmPDD4Eqwtc8iLzrCRwqOJctWzamYrZg8i2WeoneUYjrMY1q6QHblpxgtLQT0GwIeCKA8B0MJMJ3MF5Bx1YPoT6wWifSdevWFXX95je/2eVNnDt3bvEbG34IVBG+73nPe7rsc/jhh2e65tcNrlhyfx923/Yka9/RfUTvsDTLp3NPNlhSUp4dMSEAgRcJIHxfZFFmi1cWm5k+lXDZZZfJRRddJMcdd5yYZ/EVzTIPqpZp06aJfmswD7cW89BrMQKriMNGNQJmiYmY5+4WmZgnaIh5aUix32/je9/7npx//vldP+tris3JSdexfMes3/b2CmOzhliWLl1a5KdlGPEl+qpdQj0EbHtqieaEQ8yJRz2FUwoEIJAEgbvvvlvMSyyKtpiXH8ny5cuL/fE2zI1wXXrB3Nwm++6773hJ4v+tjDomTvgEdN2urt81PTL7/ve/P6bC+mgs/S3/LFq0aEwcDgxPwLz7vGCrjCd6dJw+MuYDH/hAVxpNd/HFF49bCfXE5jZUz+ywwc4nzw+P47A0q6VTO+Y20G8CBCAAgUEIuB5f+/9k0O02PNUBj6/pFSkEs25XzCVzOeCAA+Sxxx4T8+iyrmZt3LhRZs6cWRybMmWKbNmyRczSiOIYG8MTuOqqq2TBggVFBmeffbaY95x32cH8kcnDDz8st912mxiBK3/961+L+Hvvvbd8+9vfFvP8xeJYvw312OdhGA+henTV02uHYfKx07M9PAH1vKvnNw/q8VV7ECAAAQiUIeB6fI866ig588wzyyTtXJk0rygu4uLxHeSUg7iNEsifxbdkyZK+9Zg1a1aXZ+m73/1u37j8MDEBXYdrxGu2evXqbP/99+9ia/5FMn1fullikp1yyimdz3777TcmjhG82cc//vHOEzgmLvGFGLaHcFCvr51W66j7RmSVLZp4IyKgNlB75B+87yMCTbYQSJCA6/HlOb7jGxmPr5lpYg+2N/dNb3qTHHLIIT2bdOutt4p5gUXxm8bdsGFDsc/GYATMchG5/PLLSyXac889ZfLkyWIEskydOlVOOOEEMaKz83nVq15VKo88ku0h1DzKeAc1jbuet2zavFy+R0vA9cSz3nq0vMkdAqkQcD2+um7XOLZKNe/000+XG2+8sYjbBo8vwrcwd7wbCxculCuvvHKoBvzhD3+Qk08+eai0JGqOwCDLHWyhnNcYUZWTCOvbFb96UqMnKAQIQAAC/QggfPuR6XN8fIcwv4ZO4Kmnnspe/vKXdy6R3nzzzdmOHTvG/Xzuc58rLqeaLpHNnz8/9CZSvx4EjBgq7Kjb/YJeMlc72x8uo/ejFcZx27ZqN10GQYAABCDQjwBLHfqR6X0cj6+ZWWIOX/va1+TCCy/sPMrkrrvumrApjz76qMyYMUN2797dias3VenNcAceeOCEaYkQDgHXi2uG95jKud5DjYAHcQymIA/YHn31+KrdCBCAAAR6EcDj24vKOMd662GOxkBAH2FmRGzHm3fNNdeUrvK73vWuLg/gihUrSqclYjgEbM+g6xW0fzPDv3MTWzg1pyYTEVB7qt3yD176iYjxOwTaSwCP72C256GRg/EKKvaaNWs6E6O5OSrbtm1b6bpdf/31xYSqE+tBBx00UPrSBRFxpATsZQwqdDW4gknti2gaqRlGlrltX+w4MsxkDIHoCfzpT3/qmtPPO++80m1ynST6BtjUA8I3UgubpQqZeVNYp7NP9LIEt4k7d+7MDj744K6Boq81JsRFwBW5rlBCLMVlz161dW2qNidAAAIQsAm4c8G8efPsn8fdNk936tICjz/++LjxU/gR4RupFVetWlV01iuuuGLgVsyePbtIrwJJvcabN28eOB83gebFBwb0AfoAfYA+QB8YTR9w5111XNmsjzvuODdKz329UvzKV76yK+1NN93UM25KBxG+kVnz3nvvzZYtW5bpiw/yjv66170u++Uvf5lt2rRpwtZonB/84AfZS1/60iJ9no++bEFfmatlDBvyvPgezR8eXOFKH6AP0Afa3Qd0frZfoGRuTh8zn59zzjmZuQk60yc/uWHr1q3ZHXfckZm3u41JN3369My8dbTjCNOnRKUYeKqD+QeJKZglCvK3v/2tZ5X1CQ3bt2/v+ZseNEscZJ999ul8941kfjjppJNEX3YxTLDvRh8mPWkgAAEIQAACEOhPwIhRKfsCpb322kv+85//iOoDDfoUJyNu+2du/aIvaPrMZz5jHUljE+Gbhh2DaYUtfHVwEkZP4LTTThNzZl8UZNZ7iblhodhnIw0C7uPpzPpf0WMECEAgfQLMrf5sjPD1x5KcDAEGZ/3dQEWvit88qOhV8UtIjwDiNz2b0iIIlCHA3FqGUrk4CN9ynIhVkgCDsyQoz9Fs7po13nbPgAPKDg9/QMagKhCoiYD9H8//ezXoCN9q/EjtEGBwOkBq2kUM1QQ6kGJse+PhD8QoVAMCIyTA3OoPLsLXH0tyMgQYnM10A5Y7NMO9qVKxd1PkKRcCzRBgbvXHHeHrjyU5GQIMzua6ge0F1Fpwk1tztqijZFf8crNbHdQpAwLNEGBu9ccd4euPJTkZAgzO5rqBe+MTwrc5W9RVsmtzxG9d5CkHAvUSYG71xxvh648lORkCDM7muoHrAWTtZ3O2qLNkV/xywlMnfcqCQD0EmFv9cUb4+mNJToYAg7PZbsByh2b5N1W6a3fu+m7KEpQLgdEQYG71xxXh648lORkCDM5muwFe32b5N1U6dm+KPOVCoB4CzK3+OCN8/bEkJ0OAwdl8N7BtwHKH5u1RVw1c8ct637rIUw4ERk/A/l/nik413gjfavxI7RBgcDpAGth1L3uz5rMBIzRUpLveF/HbkCEoFgKeCTC3+gOK8PXHkpwMAQZn893A9fzh9W3eJnXWwBW/nPjUSZ+yIDAaAsyt/rgifP2xJCdDgMEZRjew7aA14tJYGHapqxZ4/esiTTkQqIeA/Z/O/3k15gjfavxI7RBgcDpAGtpF+DQEPqBi7bGI1z8gw1AVCAxBwB7PCN8hAFpJEL4WDDarE2BwVmfoIweWO/igGHce9IG47UftIWATYG61aVTbRvhW40dqhwCD0wHS4K7r9cVL0KAxGiraXe/LzW4NGYJiIVCRAHNrRYBWcoSvBYPN6gQYnNUZ+srBFT3c5OSLbFz50A/ishe1hUAvAsytvagMdwzhOxw3UvUhwODsA6aBw1zqbgB6oEW63n9OggI1FNWCQB8CzK19wAxxGOE7BDSS9CfA4OzPpolfEDxNUA+zTLsvcLNbmDaiVhDoR4C5tR+ZwY8jfAdnRopxCDA4x4HTwE+u15c1ng0YIZAi3b6A+A3EMFQDAiUIMLeWgFQyCsK3JCiilSPA4CzHqc5Ytk0QO3WSD68sV/xyIhSejagRBHoRsP/HuVG5F6HyxxC+5VkRswQBBmcJSDVHsS9xa9Gs76zZAIEV597shvgNzEBUBwI9CDC39oAy5CGE75DgSNabAIOzN5cmj7pePry+TVojjLI5GQrDDtQCAmUJMLeWJTVxPITvxIyIMQABBucAsGqMattFi+VSWY3wAy3KFb/0iUANRbUgYAjY/+GM1WpdAuFbjR+pHQIMTgdIILuuyGG5QyCGabAaXAloED5FQ2BAAsytAwIbJzrCdxw4/DQ4AQbn4MzqSIHIqYNyfGW4/YL1vvHZkBq3gwBzqz87I3z9sSQnQ4DBGW43cL2+XC4L11Z11oyb3eqkTVkQGI4Ac+tw3HqlQvj2osKxoQkwOIdGN/KErsBhucPIkUdTAH0jGlNR0ZYSYG71Z3iErz+W5GQIMDjD7QbuZW2e7hCurZqomXtFgBOjJqxAmRDoTYC5tTeXYY4ifIehRpq+BBicfdEE8YMrbljuEIRZgqmEPX45MQrGLFQEAjiVPPYBhK9HmGSFxzf0PuB6ffHqhW6xeuvn9g9udquXP6VBoB8B+6QUh0U/SuWOI3zLcSJWSQIMzpKgGoxm2wivXoOGCLRod70v4jdQQ1GtVhGw/7cRvtVMj/Ctxo/UDgEGpwMkwF13uQNe3wCN1HCVXPFLH2nYIBTfegLMrf66AMLXH0tyMgQYnOF3A/dyNl7f8G3WRA05QWqCOmVCoDcB5tbeXIY5ivAdhhpp+hJgcPZFE9QPtp0QvkGZJqjK2OKXfhKUaahMywjY/9ksdahmfIRvNX6kdggwOB0gge7agkaryKXsQA3VcLW4OtCwASgeAv9PgLnVX1dA+PpjSU6GAIMzjm6AoInDTiHU0l3vy81uIViFOrSNAHOrP4sjfP2xJCdDgMEZTzdwvb5cPovHdnXXFPFbN3HKg0A3AebWbh5V9hC+VeiRdgwBBucYJMEecIUvyx2CNVUQFaO/BGEGKtFSAsyt/gyP8PXHkpwMAQZnPN2A5Q7x2CqUmtril5vdQrEK9WgDAeZWf1ZG+PpjSU6GAIMzrm5gCxmtOcsd4rJf3bXlZKlu4pQHgRcIMLf66wkIX38syckQYHDG1Q1cIcNyh7js10Rt3T7DzW5NWIEy20aAudWfxRG+/liSkyHA4IyvG9g24/J1fPZrosbc7NYEdcpsMwH7f5orc9V6AsK3Gj9SOwQYnA6QCHbd5Q54fSMwWgBVdMUv/SYAo1CFZAkwt/ozLcLXH0tyMgQYnPF1A/fSNQImPhs2VWP3pAlPVFOWoNzUCTC3+rMwwtcfS3IyBBiccXYD224sd4jThk3U2j1pou80YQXKbAMB+z+aE8xqFkf4VuNHaocAg9MBEsmu67nD6xuJ4QKopit+udktAKNQheQIMLf6MynC1x9LcjIEGJxxdgNXvOC5i9OOTdXaXe+L+G3KEpSbKgHmVn+WRfj6Y0lOhgCDM95uYHt9Eb7x2rGpmrvil6sGTVmCclMkwNzqz6oIX38syckQYHDG2w1s4autQLjEa8umak4faoo85aZOgLnVn4URvv5YkpMhwOCMtxuw3CFe24VUc/s/gCsHIVmGusRMwB5X3NxWzZII32r8SO0QYHA6QCLbdT12/MFGZsAAqssJVABGoArJEWBu9WdShK8/luRkCDA44+4GrmhhuUPc9myq9u56X252a8oSlJsKAeZWf5ZE+PpjSU6GAIMz/m5g25BL1fHbs6kWuOKXk6imLEG5KRCw/5e5ElfNogjfavxI7RBgcDpAItxluUOERgu0ym5fQvwGaiiqFTwB5lZ/JkL4+mNJToYAgzP+bsByh/htGFILbPHLFYSQLENdYiLA3OrPWghffyzJyRBgcKbRDWw7IlbSsGlTrXBPpOhPTVmCcmMmYP8ns9ShmiURvtX4kdohwOB0gES6a3vptAlcoo7UkIFU2xW/o7zZbdOmTfLYY49Vbvn06dPlsMMOq5wPGUDABwHmVh8UX8gD4euPJTkZAgzONLqBK1QQvmnYtclWuDe7jUr8Ll++XK6++mp5/PHHKzV30aJFsmrVqkp5kBgCvggwt/oiaXSKcZln/rIjp7YTYHCm0wNsry+Xp9Oxa5MtsfuU1mOUJ1T333+/nH322bJx48aiyW9+85s7x4oDZmP37t3y7LPPinqK165dK//+9787P59//vnyne98x47KNgQaI8Dc6g89wtcfS3IyBBic6XSDOkVKOtRoyUQE3H41St/L6tWrZf78+UWVPvnJT8o3vvGNYt/dePjhh+V973ufbNiwoZPu2muvdaOwD4FGCDC3+sOO8PXHkpwMAQZnOt3AXe6A1zcd2zbZkjr7lVvWRMJXufzjH/+QI444QlSgX3fddU2iomwIFASYWwsUlTcQvpURkoFNgMFp04h/2/bOIXzjt2coLXAF6ajW+65fv17e9ra3Fc0uI3w18sKFC+XBBx+UG264oUjLBgSaJMDc6o8+wtcfS3IyBBicaXUDV6CMck1mWuRozUQE6rjZ7bbbbpOTTjqpqMqnPvUpueKKK4r9fhu63nfz5s0ya9asflE4DoFaCTC3+sP9fwAAAP//T7lZlAAAKNlJREFU7Z0L0FZF/cdXQAiU8JqKgVoQDYoKmENhUwGWkmKgOZE2RiiKE5A1UF5KmAoqSQsFB5Uis6wUyRkzS+mCwIxZoqhcIi/cBVMuAgqkz39/5z/nuOe853mec9nnec7lszPvnNvunt3Pb/fZ77vnd/YcVNFBESBgicBBBx3k5UTT8lDkese06Sc/+Un117/+Ndf1ofDZITB16lQ1bdo0r0DStqSN2QpPPPGEGjRokJfdhAkT1KxZs7xjdiCQFwLm7zBjazqrHYTwTQeQ1H4CdE4/jyIcfepTn1J/+9vfvKrwo+uhYMcCgWD7sil+4wjf22+/Xa1du1bdfPPNFmpFFhCwS4Cx1R5PhK89luSkCdA5i9cMRPSKOHGDTWHi5sm23ATM3w2bTxXiCN+RI0eqdu3aqQULFpTbGNQ+kwTMPsLkQzoTIXzT8SN1gACdMwCkIIemXW0Kk4LgoRopCQT/ubrxxhuVuEGkDVGFr/wzd/bZZ6sLLrgA4ZsWOukbQsD8DUb4pkOM8E3Hj9QBAnTOAJCCHAYfR/PDWxDDZqgaQX9fG+I3KHz79Omjhg4d6tV67969atGiRWrDhg3OuVGjRiF8PTrsZIkAY6s9ayB87bEkJ02AzlnMZhCckcPdoZh2bnWtguI3bTsLCt969UP41iPE9VYRYGy1Rx7ha48lOWkCdM7iNgNz1hd3h+LaudU1M9uZlCWN+A0K38985jNq4sSJXhX379+vVq1ape677z61fPlyhfD10LCTMQKMrfYMgvC1x5KcNAE6Z3GbgU1BUlxK1MwGAbOtpfknKyh8qy1ntmvXLnXGGWeofv364epgw4DkYZ0AY6s9pAhfeyzJSROgcxa3GeDuUFzbZq1mwbaWVPxGFb5S//Hjx6tt27YhfLPWGCiPQ4Cx1V5DQPjaY0lOmgCds9jNwNZMXLEpUTsbBIL+vkledosjfB955BH18ssvq6uuuspG8ckDAlYJMLbaw4nwtceSnDQBOmexm0FwJi6N/2WxSVE7GwTSit84wtdGeckDAo0iwNhqjyzC1x5LctIE6JzFbgZB4Zv0EXSxKVE7WwSCwlfyjfPPFsLXliXIp9UEGFvtWQDha48lOWkCdM7iNwPT3UFqy5q+xbd5K2qYVvRKmRG+rbAc92wEAcZWe1QRvvZYkpMmQOcsfjMIzvrGmYErPh1qaINA8J8rebIgPr6yjROWLl2qzjrrLC/J1VdfrWbPnu0dswOBvBBgbLVnKYSvPZbkpAnQOcvRDEw74+5QDps3o5byT9W0adOUbN2Qpn398Y9/VMOHD3ezUmPGjFE/+9nPvGN2IJAXAuZvLk/Z0lkN4ZuOH6kDBOicASAFPQzOyPFDXFBDN7FawScJcuskKzmYRZ45c6aaPHmyd+qjH/2oWrZsmXfMDgTyQoCx1Z6lEL72WJKTJkDnLEczCIoU3B3KYfdG1TLMnzep6N23b5/aunWrWrx4sZo0aZJ6/fXXfcUeO3asuuyyy9Spp56qunXr5rvGAQSySoCx1Z5lEL72WJKTJkDnLE8zMGd90zyOLg8xahpGICh6pS0l8ed185Z1eOfOneseVt127NhR7d27V7Vv375qHC5AICsEGFvtWQLha48lOWkCdM7yNANT+EqtcXcoj+1t1FSeGtj057VRJvKAQFYJMLbaswzC1x5LctIE6JzlaQa4O5TH1rZrGmw7kn9S1wbbZSM/CGSRAGOrPasgfO2xJCdNgM5ZrmZgzvri7lAu2yetbdC1QfJB9CalSbqyEGBstWdphK89luSkCdA5y9UMgjN3vORWLvvHrW2Y6KXNxKVI/DISYGy1Z3WErz2W5KQJ0DnL1QyCwpeZu3LZP05tzacDko4nBHHoEbfsBBhb7bUAhK89luSkCdA5y9cMTEGDmCmf/evVOPjPkcTnH6R61LgOAT8BxlY/jzRHCN809EjbhgCdsw2Swp8IChseXRfe5JErGObagOiNjI+IEPAIMLZ6KFLvIHxTIyQDkwCd06RRnn3T7sz6lsfutWoaJnr5p6gWMa5BoDoB8zeWpSOrc4pyBeEbhRJxIhOgc0ZGVaiIpruDVIwf5kKZN3Zlgu1B/hmSmV7ZEiAAgfgEGFvjM6uWAuFbjQznExGgcybClvtEuDvk3oRWKiDtIPhRClwbrKAlk5ITYGy11wAQvvZYkpMmQOcsbzMwZ/lwdyhfOwhzbUD0lq8dUOPGEGBstccV4WuPJTlpAnTO8jYDU/gKBdwdytMWwkQv/rzlsT81bTwBxlZ7jBG+9liSkyZA5yxvM8DdoZy2D/7Dgz9vOdsBtW4sAcZWe3wRvvZYkpMmQOcsdzMwRRDuDsVuC2H+vNi82Dandq0jwNhqjz3C1x5LctIE6JzlbgbM+pbD/kE7S63x5y2H7allawgwttrjjvC1x5KcNAE6Z7mbQVAQ4edZvPYQ5s+L6C2enalRtggwttqzB8LXHkty0gTonDQD3B2K2waCohd/3uLamppliwBjqz17IHztsSQnTYDOSTNg1rd4bUBsGlyfF3/e4tmZGmWXAGOrPdsgfO2xJCdNgM5JMxACZjtAIOW7TQT/kZHa4NqQb5tS+vwRMH9TWSoynf0Qvun4kTpAgM4ZAFLSQ9wdimH4oGuD1ArRWwzbUot8EWBstWcvhK89luSkCdA5aQZCIDhLyEtu+WsXYaIXO+bPjpS4GAQYW+3ZEeFrjyU5aQJ0TpqBS4BZX5dE/ram7aT0uKvkz4aUuFgEGFvt2RPha48lOWkCdE6agUsgKJ7wS3PJZHcbnKmXkuLakF17UbLyEGBstWdrhK89luSkCdA5aQYugaCI4jG5Syab2zDXBkRvNm1FqcpHgLHVns0RvvZYkpMmQOekGZgEzFlfHpebZLK1HyZ6+UclWzaiNOUmwNhqz/4IX3ssyUkToHPSDEwCwVlf3B1MOtnYN/85kRLJPygy0ytbAgQgkA0CjK327IDwtceSnDQBOifNwCQQFL7MIpp0Wrsvtgl+lALXhtbahLtDoBoBxtZqZOKfR/jGZ0aKGgTonDXglPSSOaMos4gifgmtJRDm2oDoba1NuDsEahFgbK1FJ941hG88XsSuQ4DOWQdQCS8z65sto4eJXmbis2UjSgOBIAHG1iCR5McI3+TsSBlCgM4ZAoVTPhcYRFbrGoQ5+y6lkBl4/HlbZw/uDIGoBBhbo5KqHw/hW58RMWIQoHPGgFWiqKbgwt2h+YYP8+fFDs23A3eEQFICjK1JybVNh/Bty4QzKQjQOVPAK3BS3B1aZ9wgeykJ/rytswd3hkASAoytSaiFp0H4hnPhbEICdM6E4EqQjFnf5hs5zJ8X0dt8O3BHCKQlwNialuC76RG+77JgzwIBOqcFiAXNAuHbXMMGRS/+vM3lz90gYJMAY6s9mghfeyzJSROgc9IMqhEIPnLnJbdqpNKdx583HT9SQyCLBBhb7VkF4WuPJTlpAnROmkEtAsz61qKT/lrwnwvJEdeG9FzJAQKtJsDYas8CCF97LMlJE6Bz0gxqEQgKMz5hXItWvGtB1wZJjeiNx5DYEMgqAcZWe5ZB+NpjSU6aAJ2TZlCLQFD44u5Qi1b0a2GiF7bR+RETAlknwNhqz0IIX3ssyUkToHPSDOoRwN2hHqF4102ekpL1eePxIzYE8kCAsdWelRC+9liSkyZA56QZ1CMQnPXF3aEesfDrQY4SC9eGcFachUDeCTC22rMgwtceS3LSBOicNIMoBMx2wiP5KMT8ccJcGxC9fkYcQaBIBMzfTCYL0lkW4ZuOH6kDBOicASAchhIwH8/zaD4UUdWTYaKXfx6q4uICBApBgLHVnhkRvvZYkpMmQOekGUQhEHxMj3CLQk0p8x8GSSH/NMhMr2wJEIBAcQkwttqzLcLXHkty0gTonDSDqATMtoLwrU1N/lGYNm2akq0bROwKNwIEIFB8AubvJa4O6eyN8E3Hj9QBAnTOABAOqxIwZy8RcVUxOWJXWJkBf16TBvsQKD4BxlZ7Nkb42mNJTpoAnZNmEJWAzF6ago5Z37bk8Odty4QzECgjAcZWe1ZH+NpjSU6aAJ2TZhCHALO+1WmZbCSWzIrjz1udF1cgUGQCjK32rIvwtceSnDQBOifNIA4Bc9YXd4f/JydM8OeN04qIC4HiE2BstWdjhK89luSkCdA5aQZxCJjCV9KV3d0hyEOY4M8rFAgQKDcBxlZ79kf42mNJTpoAnZNmEJeA+Ui/zLO+Yf68iN64rYn4ECgmAcZWe3ZF+NpjSU6aAJ2TZhCXQHCWs4xL9QRFL/68cVsR8SFQbAKMrfbsi/C1x5KcNAE6J80gCQGz3ZTJ3QF/3iSthTQQKB8B8zeyjJMDNi2O8LVJk7wQvrSBRATK6O4QnOkWcLg2JGo+JIJA4QkgfO2ZGOFrjyU5aQJ0TppBEgJBEVj0GY2ga4MwQ/QmaTmkgUA5CDC22rMzwtceS3LSBOicNIOkBMy2U2R3hzDRW+T6Jm0PpIMABN4lYP4+Fn1i4N1aN2YP4dsYrqXNlc5ZWtOnrngZ3B3MOgqwMq9ikbrBkAEESkSAsdWesRG+9liSkyZA56QZJCUQdHco0ixosG7CCNeGpC2FdBAoHwHGVns2R/jaY0lOmgCdk2aQhoA5I1oUYRjm2lCUuqWxNWkhAIHoBBhbo7OqFxPhW48Q12MRoHPGwkXkAAFzZrQIbgBhordIM9kB83EIAQg0iABjqz2wCF97LMlJE6Bz0gzSEDCFr+STZ5Fozl5LXUTIy0yvbAkQgAAE4hBgbI1Dq3ZchG9tPlyNSYDOGRMY0dsQMAWjiEQRv3kKIt6nTZumZOuGLNVj7dq1at68eUq2hx12mBo2bJgaPXq0W1S2EIBABgkwttozCsLXHkty0gTonDSDtASCs755WronWHZhkSV/3gceeEB96UtfUnv37vWZ6fzzz1cLFy5U7du3953nAAIQyAYBxlZ7dkD42mNJTpoAnZNmYIOA2Y7y4u6Qxp/3nXfeUevXr1dbtmxRvXv3VkcddVRkjPv371dr1qxxRGvfvn2rptu8ebOS6zt37nRmei+66CK1fPly9a9//ctJM2PGDPWtb32ranouQAACrSNg/ibmaTKgdcRq3FkDJEDAGgHd1Crun7VMyah0BLRrgNeOZD/rwSyvtH851oI9UrHvvffeSo8ePbz6Svo+ffpU/vGPf9RNP2fOnIoWyV7a4447rjJz5szQdNq9wYmnZ3Ur69at8+J8/vOfd86fdtpp3jl2IACBbBFwx1XZEtIRgGA6fqQOEKBzBoBwmIiAiMY8tCUpZ5jojVrpO++801dPs84HH3xwTfF7/fXXO2lPOeWUyooVKyp69rZy9tlnO+cmTZpU0bPIvmLo2Vzn2kc+8hHf+V//+tfO+S5duvjOcwABCGSHgPnbkJ1S5bMkCN982i2zpaZzZtY0uSuY2Zaizp42s5JBcS7l1f68kYvwwgsvVETcjhw5siJ5vfnmm5UlS5ZUtDuCI0Qlv+HDh4fmd//99ztxZPb22Wef9eJs37690q1bN+fa7373O++87Lgiu0OHDpVNmzZ51774xS868fv16+edYwcCEMgWAfP3MFsly19p8PHVrYlgjwB+SPZYlj2nLK/uEObPe+KJJ6qXXnopstnGjBmjduzYobSI9b1UpgWx0rO46q233lLdu3dXWqT68hSfXvHVlXijRo1SCxYs8F2fMGGCuu2225w89Eyw53e/YcMGJ93u3bvV0Ucf7aRduXKlevzxx530Uid5EY8AAQhkjwBjq0Wb5E+rU+IsE9BN05k9ki0BAmkIBGdU0+RlM63M6prt3N2P64sss65a3IYWbdCgQc49+vfv3+a6Frre/W+99daa14Ozvr/61a8qHTt29NK7ZR86dGhFC+o2eXECAhDIBgG3r8qWkI4AM766FRHsEeC/UnssyUkpc9ZXC2GlxWXLsMhSZWHr85rr9doqo6zs8J///Efdcccd6oorrvDVWY7vuusu59wTTzyhzjzzTN91mdnt2bOnc+5zn/ucs0yZGUG7Rqi5c+eq559/Xr3vfe9T2i9YjR071psZNuOyDwEIZIMAY6s9OyB87bEkJ02AzkkzsEnAXBdXRK8Iy1YEsxzu/cUtQNwDTHFuo4ziLvGBD3xADR48WC1atEh16tTJvaWzPemkk9TLL7/s7EtccbEIBj2rqw4cOKD0Sg3q6aefDl7mGAIQyBkBxlZ7BkP42mNJTpoAnZNmYJNAUHDamlGNU8Ywf15X9Eo+ZhnTCl9Zx3fIkCHqjTfecGZk9YtqvqLqB3xKRO3//vc/5/yuXbtU165dfXHkQNYBfu2119R73/teZ93eNhE4AQEI5IoAY6s9cyF87bEkJ02AzkkzsE3A9oxqnPKFid4w8W22+7Dr9e75yiuvKL2er5o1a5Y3mztixAj1i1/8wvnYhJter9qgjjjiCOdQrwih5EW3sCAzxu6LdiKA3TRhcTkHAQhkn4D5GyP/ABOSE0D4JmfXkpQvvvii84WnKDfXyxYpvTanOvTQQx2fv/e85z1RkqWKQ+dMhY/EIQRszqiGZF/1lCm4JZLM5spMr2yDwYybRPiKn+3ixYvbCFm95q7SS5w5s7xyz40bNyr9sQvn9rIyw7Zt24JFcY7F/UF/pMLZX716tdIfxAiNx0kIQCAfBBhbLdop3btxpG42genTp1fk60y6CcT6a9euXaVXr16VyZMnV/RLLQ0rtlmuht2EjEtHwGxXWlg2tP6Svxa3vv4lKznUCpLGLaOkTRJkhQct8ivuig5ufrL+rhteffVV7z5a+Lqn22zNr7np2eQ21zkBAQjki4D7eyBbQjoCzPjqVpS3oL/IpB577DE1ZcoU9cwzz3jFP/744503tE844QSlxbHSg6TzuHPp0qVqzZo1XjzZufLKK53HquIvaDPwX6lNmuTlEjBnVGXGVWZVGxHCXBtMf95q97Q5K61/0tW4ceO8lRvE5eHBBx/0bt25c2dnjV95gqM/euGdN3cOOeQQtXfvXsf1SNwh5OkPAQIQyC8BxlZ7tkP42mPZ9Jz0p0bVJZdc4t33sssuU/Pnz/eO3R0Ryvfcc4+67rrrfIvhi4CQt8b1bLAbNfWWzpkaIRmEEDCFpVwWcWg7hIleEdjST6IEs+3HSReWt3xkQv55le2pp57q+wf3gx/8oBKXJwkifIMuTCJ05ZwwkuXKtm7dGnYLzkEAAjkiYP6+NOL3L0co0hdVAyTklICeyfUee+qWUNHCt2ZNxMVB+/v60syZM6dmmrgXpRzuX9y0xIdALQJuu5KtFpa1osa+psWt124lfzmOew8zj7hpwwosH5WQsmj/X99lvTavV9a1a9f6rsmB/lqbd/3iiy9uc50TEIBA/giYv3/5K322SoyzSLbsEas0zz33nDfASaeoJ3wlc/0pU18a8fu1GeicNmmSl0nAFJaybyOIQDXzlfabNG/xA3bbf9I8zDrpD1U4+X3ta18zT1cWLlzo3Ud/yMJ3TQ5+85vfeNfnzZvX5jonIACB/BFwf1tkS0hHAILp+LU0tczgmp0hivCVGSIzjX58UtGPU63Vw8zbWqZkBAFNQESqzfYVzE/yrvcSWy1DmPnZEL4DBgyoSP9ctmyZ77b6wxSVY445xmGhXZ181+Rg4sSJzrUjjzyysmPHjjbXOQEBCOSPgM3fvvzV3m6JEb52eTY1tyTCd/PmzT7xIJ1Jr/dprdx0TmsoySiEgDk7K0IzaTBnZ902myY/KUdc4as/N1zR6/ZWVq1a1aYas2fPdvrpl7/85TbX5IT+lLFzXX+gorJp0yYvzs6dOyvuig633HKLd54dCEAg3wTc3ynZEtIRgGA6fi1NnUT46gXxfcJXr+pQ0V+BslYPOqc1lGQUQsAUrElnVU3xLO1VjtOKXreoUdu/9DnX315mdUeOHOm4MPzhD3+oiIuDnNMrO9R8GiMuEHK/c845xxG/8nsg/sBybvTo0Vb7tVs/thCAQGsIRP1taU3p8nVXhG++7OUrbVzhK+uE6s+h+oTvueee68sz7QGdMy1B0tciYM6qSluLI1glbpjorXW/uNfM/OuV7dJLL/X1RalPp06dKqeffnpFL19W99Zvv/125ZprrqnolRu8fERMyz8HNv+ZrVsQIkAAAg0nwNhqDzHLmenWlNewcuVKdfLJJ3vF1z6+ocuZSQT5bKl+G9z5CpSbQNbw1Y9blR5o3VOpt3qmystDN1Nvnx0I2CJgrumrxaXSYrNu1sHl0CSBFohKljCzGeKWTfvcO19i3LNnj+rdu7fzF3fNXVmuUPsBKy2EVf/+/ZV2f7BZJfKCAAQyQICx1Z4REL72WDY9p6DwlfU+9WNSpV98UXrmyFnAfvv27eqpp55SDz30kNJfcPLKKJ8x1m+Hq2HDhnnnbOzQOW1QJI9aBEwRK6JXxG+tELY+byNEr5TBvFej7lGrrlyDAASKSYCx1Z5dEb72WDY9p6DwjVoAWRhfvvzWt2/fqEkix6NzRkZFxBQEzHZWa9bXFKLu7WrFd+Mk3Zr3Q/gmpUg6CEAgSMD8zeNpapBOvGOEbzxemYodFL7ymHPs2LGqa9euTjlff/11Z5ZXZsiefPJJJY9E3SCPU8ePH6+mT5+uZPbXVqBz2iJJPrUImC4F1WZ9zTiSV7V4te4T91rc2ei4+RMfAhAoJwHGVnt2R/jaY9n0nILCt5aP74YNG9TkyZPVb3/7W185Bw4c6PgHir+vjUDntEGRPOoRqCUwzWtuPs2afTXv3Qyh7daPLQQgUGwCjK327Ivwtcey6TnFEb5u4a677jo1Y8YM99DZTpkyRf3whz/0nUt6QOdMSo50cQmYbc11XzBdDdz8miV65X4IX5c6WwhAwCYB8/cOV4d0ZBG+6fi1NHUS4SsdpmfPnmrjxo1e2bt166bkJTizY3kXY+6YedA5Y8IjeiwCpiuDzK5+4hOfUNOmTfPl4Qpi38kGHiB8GwiXrCFQYgKMrfaMj/C1x7LpOSURvlJIWfnhrrvu8pVXllXq1auX71ySAzpnEmqkSULAFJnB9CKEZaZXts0MZpmaOdPczDpyLwhAoPkEGFvtMUf42mPZ9JySCl/99TalP4XqK+/SpUvVxz72Md+5JAdm50ySnjQQgAAEIAABCFQnwNPU6myiXEH4RqGU0ThJhe93v/td9Z3vfMdXq61btyr9BSjfuSQHCN8k1EgDAQhAAAIQiEbAFb6yNv8DDzygXnzxRSUvsIsLY7t27Zy1/Hv06OE88fr0pz+tOnfu7GSsP42urr76aqU/bR7tRkWNpQESckpgxYoV3qdKdfus6FUd6tZEPlt82mmn+dLpD1/UTRc1gpSDPxjQBmgDtAHaAG2gMW3g8ccfr1x44YWVgw8+2Dfe6qVMK/rLjb5z8hnzL3zhCxU94VXRE1OVOXPmRB3OCxuPGV/dM/MalixZoj7+8Y97xa+1nJkbady4cerOO+90D52t/Mco/wkSIJBHAuZLbs1+mS2PvCgzBCCQXwKyKtMNN9zgrcsvL/Vefvnl6rzzzlOHHXaYU7HNmzer559/Xv385z9X9957r6+y8gJw8ImvL0IZDgor6UtQsdtuu833n91FF11U2bNnT2jNH3300cqZZ57pi6/bd0UvZRYan5MQyAsBLXa9dq1fZstLsSknBCAAgcgEdu/eXZExXsZt+dPuC5W5c+fWTf/www9X9EpOXrqvfvWrddMUPQIzvjn772bfvn1q27ZtSj/qULoBO8uQBatw1FFHOUuWHXnkkWrLli3qpZdeUloQ+6IdfvjhzlvvkyZN8p3nAAJ5JGD6ljPrm0cLUmYIQKAWAS161YIFC5wo4scrT2ovuOCCWkm8a+IDPGDAALVz506l3R7azAJ7EUuyg/DNmaFF7M6ePTtyqbUPkNI+P87fEUcc4TR+Wb1BOoyIXwIEikDAdHdgGbEiWJQ6QAACLoH58+erMWPGuIdKPkT1/e9/3zuOsnPfffepiy++WA0dOlQ99thjUZIUNg7Ct7CmpWIQyD4B8UP705/+5DyVkCcTr776qjr22GPViSeeqM444ww1atQodcghhzgVkXg//vGP1Z///Oc2FTPXz9XuDkpmfQkQgAAE8k5Afhf1C+nqjTfecKrSpUsXtX79eiVPdOMG/SK786GqZ555Jm7SQsVH+BbKnFQGAtknoP3H1MKFC5X2UW8jUOVH/c0331QSR4J+I1nJI75zzjnHmeH497//rfTKJKGVxN0hFAsnIQCBHBOQmV6Z8XXD+PHjlV6ZwT2MtZUPV8lypuvWrYuVrmiREb5Fsyj1gUCGCcishaw+IsJXgojVz372s2rChAlq4MCBzizG3r17lQjchx56SN10001q165dvhrJdXddSvOC6e7ArK9Jhn0IQCCPBOT38rjjjvO9o7NmzRr1oQ99KFF1Dhw44LwjdPzxxydKX5RECN+iWJJ6QCDjBETMim/56tWrnZJ269ZNPfjgg0qW46kW/vvf/yqZ4bj//vu9KJs2bVLdu3f3jt0d091Bzrmzxu51thCAAATyREBmaK+44gqvyOLeIL+JhHQEEL7p+JEaAhCIQEBWFZG3ikX8SpD1Jv/+978r8TmrF/bv36+GDRvmrGQicZ977jl18sknhyYzZ31Z3SEUESchAIGcEJCnY3fffbdXWnnv4cknn/SO2UlGAOGbjBupIACBGARk1kJmL9zw05/+VE2cONE9rLt97bXXHJEsC7MvXrzY9+EWM/HUqVOVLNAuAXcHkwz7EIBA3gjI0zD5vXODvO8gqzNECfLxiuAypsF04jIhnzQuW0D4ls3i1BcCTSYgqzHIy2lu+PCHP6yeffZZ1aFDB/dUpK18sUiW8RH3iBEjRoSmwd0hFAsnIQCBHBKQ1W3MF9FkOdNbb701Uk1Gjx7tPGFbvnx5qNuXrBQhM8rXXHNNpPyKFAnhWyRrUhcIZJDA+eef77yo5hbtRz/6kZo8ebJ7GHkrS5316NFD6a8VOT/Y1RLi7lCNDOchAIE8ETj66KN9Pr2XXHKJuueee2JVQX4vr7rqKl+aa6+9Vk2fPt13rkwHCN8yWZu6QqDJBOTLgSJW3377be/OK1asUP369fOO4+yIG8NZZ53lLMJeLZ0564u7QzVKnIcABLJOYPDgwWrZsmVeMYcMGaIWLVrkHUfZkZd85aW47du3e9HlXYvevXt7x2XbQfiWzeLUFwJNJHDzzTerb3zjG94dZWke8dNtdGBN30YTJn8IQKDRBILvRpx00klKPj8cN/Tp08d7sVjS7tixQ8mqOmUNCN+yWp56Q6AJBC6//HI1b948707ihvCXv/zFO27UjunuwCeMG0WZfCEAgUYSuOWWW9TXv/513y3ka5d9+/b1nat3IKvnyHsVbti3b5/q2LGje1i6LcK3dCanwhBoHgF5Y/jRRx/1bhjnrWQvUYId3B0SQCMJBCCQKQJLlixps4JNkn/k5UU2cTFzA8KXVd7dtsAWAhCwTEBWcJAvDblBXrK4/fbb3cOGbnF3aCheMocABJpAIDh5IL65K1eujLUqDsLXbyhmfP08OIIABCwS6Nmzp9qwYYOX46RJk9RPfvIT77iRO6a7Ay+5NZI0eUMAAo0iIC4K/fv3970gHHdlHISv3zoIXz8PjiAAAYsEgguwX3rppeqXv/ylxTtUz8p0d5BYPNyqzoorEIBAdglceeWV6o477vAK2KVLFyW+vrLOb5SA8PVTQvj6eXAEAQhYJBB8K1ke28kHLZoVzFlfPmHcLOrcBwIQsElAVmGQ307zc8W9evVSDz/8cKRlyRC+fmsgfP08OIIABCwSkEdy3/zmN70cu3fvrjZu3KhM/1vvYgN2+IRxA6CSJQQg0HQCu3btUsOHD1dLly717i3r886fP1+dd9553rngzvr1650X5GTrBl5u4/mf2xbYQgAClgk88sgj6txzz/Xl+s9//lMNHDjQd65RB7g7NIos+UIAAs0m8NZbb6mZM2eqH/zgB2rPnj3e7U855RTn62yybJlMLrzyyivOer8LFixwvprpfkCoU6dO6sILL1R33323at++vZe+bDvM+JbN4tQXAk0k8M477yj5MRZ/NDdcf/316nvf+557GGu7e/duJcJZXlaLGnB3iEqKeBCAQB4IyEeAZs2a5Yha87e1WtnlAxbjxo1zPvUus8RlDwjfsrcA6g+BBhOQWQdZv9cNhx56qFq1apV6//vf756KtBURPXLkSLV69WrfEmn1EpuzvqzuUI8W1yEAgTwRWLdunXr66afVtm3bnD9xiTjmmGOUrKjj/h177LF5qlLDy4rwbThibgCBchMQb6oBAwY4P84uiREjRqjf//73sXx9r732WnXTTTcpWdR90KBBblaRtqZPMS+5RUJGJAhAAAKFJIDwLaRZqRQEskVA3BOGDBmi3njjDa9g4msmS5t17tzZOxe2IzO93/72t9X06dOVvKwmXy6KG0x3hyRfPop7P+JDAAIQgEA2CSB8s2kXSgWBwhGQmVZ5K1le0HCD+P/ecMMNjgtDhw4d3NPeVhZvnzJlipKX5L7yla84a1kmeSkDdwcPKTsQgAAESk0A4Vtq81N5CDSXgMz8jh071vfdeCnB8ccfrwYPHuwsyN61a1clL29IXFm3UtwUZsyY4VsWLUmpcXdIQo00EIAABIpFAOFbLHtSGwhknsCBAwfUnDlznCV1nnrqqarlFReI0aNHqwkTJqjTTz+9aryoF0x3B15yi0qNeBCAAASKRQDhWyx7UhsI5IrACy+8oJYvX662bNnirD3ZsWNHdcIJJzh/InYPP/xwa/Ux3R0kU5Ywt4aWjCAAAQjkhgDCNzemoqAQgEBaAuasL6s7pKVJeghAAAL5I4DwzZ/NKDEEIJCQgCl8cXdICJFkEIAABHJMAOGbY+NRdAhAIB4B3B3i8SI2BCAAgaIRQPgWzaLUBwIQqEnAnPXF3aEmKi5CAAIQKBwBhG/hTEqFIACBWgTMWV/cHWqR4hoEIACB4hFA+BbPptQIAhCoQ4A1fesA4jIEIACBghJA+BbUsFQLAhCoTsB0d+ATxtU5cQUCEIBA0QggfItmUeoDAQjUJYC7Q11ERIAABCBQSAII30KalUpBAAL1CODuUI8Q1yEAAQgUjwDCt3g2pUYQgEAEAqa7Ay+5RQBGFAhAAAIFIIDwLYARqQIEIBCfgOnuIKn5hHF8hqSAAAQgkDcCCN+8WYzyQgAC1giYs76s6WsNKxlBAAIQyCwBhG9mTUPBIACBRhMwhS/uDo2mTf4QgAAEWk8A4dt6G1ACCECgRQRwd2gReG4LAQhAoEUEEL4tAs9tIQCBbBAwZ31xd8iGTSgFBCAAgUYRQPg2iiz5QgACuSBgzvri7pALk1FICEAAAokJIHwToyMhBCBQFAKs6VsUS1IPCEAAArUJIHxr8+EqBCBQAgK4O5TAyFQRAhCAgCaA8KUZQAACpSeAu0PpmwAAIACBkhBA+JbE0FQTAhCoTQB3h9p8uAoBCECgCAQQvkWwInWAAARSEzDdHXjJLTVOMoAABCCQSQII30yahUJBAALNJmC6O8i9+YRxsy3A/SAAAQg0ngDCt/GMuQMEIJATAuasL2v65sRoFBMCEIBADAII3xiwiAoBCBSbgCl8cXcotq2pHQQgUE4CCN9y2p1aQwACIQRwdwiBwikIQAACBSKA8C2QMakKBCCQnoA564u7Q3qe5AABCEAgSwQQvlmyBmWBAARaTsCc9cXdoeXmoAAQgAAErBJA+FrFSWYQgEARCLCmbxGsSB0gAAEItCWA8G3LhDMQgEDJCeDuUPIGQPUhAIHCEkD4Fta0VAwCEEhKwHR3uPHGG9XUqVOTZkU6CEAAAhDIEAGEb4aMQVEgAIHsEJBZXxG94udLgAAEIACBYhBA+BbDjtQCAhCAAAQgAAEIQKAOAYRvHUBchgAEIAABCEAAAhAoBoH/AwTxXyXxhUcHAAAAAElFTkSuQmCC | As shown in the figure, in the rectangle ABGH, fold along DC. What is the measure of ∠ADC? | A. 90°; B. 120°; C. 105°; D. 135°; E. No correct answer | C |
476 | 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 | Quadrilateral ABCD is symmetric about the line BD. Connect AC and BD, intersecting at point P. What is the positional relationship between AC and BD? | A. Parallel; B. Perpendicular; C. Cannot be determined; D. No correct answer | B |
477 | 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 | In the quadrilateral ABCD shown in the figure, what is the area of triangle ABD in cm²? | A. 12; B. 24; C. 6; D. 9; E. No correct answer | C |
478 | 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 | In the quadrilateral ABCD shown in the figure, what is the area of triangle ABD in square meters? | A. 12; B. 0.0012; C. 0.0006; D. 6; E. No correct answer | C |
479 | 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 | Quadrilateral ABCD is symmetric about the line BD. Connect AC and BD, intersecting at point P. What is the area of triangle ABD in square meters? | A. 12; B. 0.0012; C. 0.0006; D. 6; E. No correct answer | C |
480 | 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 | In the rectangle ABCD shown in the figure, ∠ABE = 60°. What is the measure of ∠EBC? | A. 30°; B. 60°; C. 45°; D. 90°; E. No correct answer | A |
481 | 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 | In the square BEFG shown in the figure, what is the degree measure of ∠CBG? | A. 30°; B. 60°; C. 45°; D. 90°; E. No correct answer | B |
482 | 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 | As shown in the figure, quadrilateral ABCD is a rectangle, quadrilateral BEFG is a square, and the shaded area is a sector with ∠CBG=60° as the central angle. What is the area of the shaded sector in cm²?(Use π = 3.14) | A. 2.09; B. 3.14; C. 4.71; D. 6.28; E. No correct answer | A |
483 | 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 | As shown in the figure, quadrilateral ABCD is a rectangle, quadrilateral BEFG is a square, and the shaded area is a sector with ∠CBG as the central angle. What is the area of the shaded sector in cm²?(Use π = 3.14) | A. 2.09; B. 3.14; C. 4.71; D. 6.28; E. No correct answer | A |
484 | 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 | As shown in the figure, the area of parallelogram ABCD is known to be 2.4 square decimeters. How many square centimeters is this equivalent to? | A. 2.4; B. 24; C. 240; D. 2400; E. No correct answer | C |
485 | 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 | As shown in the figure, the area of parallelogram ABCD is 240 cm². What is the length of CP in centimeters? | A. 12; B. 13; C. 15; D. 20; E. No correct answer | A |
486 | 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PfbYY+5x9U20G70GfUPQh4teR/QDTPRe6r1rMsLYYx4KxCkaxgoMtYqjLTZRsOTdZtvC+IADDnCPe/PNN/uaZOp66ca+ITStnzhEGHtqiWhnHn/88b4GKB7GaS01bSvvNtsUxhqlpMfUqKWffvrJ18ZTuOo1ZKH7NW0ERYgw9piHAnEszPIEp1q+afe3MM5zkalo4KYtEy1T6adzzz3XPabG82cR17ceR99E9HqbijD+fzYPxU477eRrgH/lDWO1hruFrIWxQiaJthMGUFVh3G/6Resaa6zhntObb77pa9Ppgp26KtICWa9P2ySMG87mofjf//7na4B/5QnjLEEsuvqvbSZtV6ETDZWigZu2bBB0jun56JzLyt4vfXjp/YqOJtH7bqNGsn5o1tHQh7E+nbUT9WnNPBSIyhrGaUGswFDXhYqx7dq2rdWn0FQrMHrhT3W6b9Ew1vOrA3371PPRt9E89Py1XlrJ2p1RV0MfxjYPhfqxgJBaYOqH1PGhr8pJJ7rCNAyFpBKur21bay5aoqEetqSjF6i0zLYTHX8bPkba8+8XXY/Rc9H1mSL0WvU67L0Iiz50whZzEw11GOtKLvNQIE70ZLcSbSHbKJxuJa7VrHBUvQWmWr/RFmxS0KsVHLausy4bJI1U0nOIfqDo+apO70XcUMAovW+6n94bfdtQSLfBUIexxjjq4NCYR2AYvfvuu65UTWP37QNBY/pN3IdNUndP2w11GNs8FPo1EDCMLACrpl+16nH0K1ejFrE9vg1Ls24h6/9W14NazVqmkK5L33cVhjaM9Xt47XT9Ph4YVhaGVbOQDbshFK6qi7aE1fWg8E26aKfunLZ0TYSGNow1U5R2rGaOAoaVBVyVNAOiHiM6D4W1hONEuy90Xyu63fSRE3GGMow1d6rtZM2pCgwrOw+qpLnB9RiaKzykkREK1zjqntA6Ct1oK1ghrNZx2/qWhzKM9VcFtKP1VwaAYVZ1GIfzUOiv6ITUDZEUxhIXxEaBrOVtMpRhrL+3pQNEf38LGGZVh7H+jqS2nzQPhcI4aXxwdAhclFrWdqGvDYYujPUXaHVw6C/SAsOuyjDWL1r1F9a1ff3F9Thq4RYdIaFuCsK4wfbcc093cNx5552+BhheZ599titV0KgInWt55qHIyropmv6ru9BQhfEbb7zhDg7txL/++svXAqjCjjvu6M63vPNQdKMgVvdG0kiMphqqMD711FPdwXHeeef5GgBV6HUeijQ2aVL0p+lNNzRh/OOPP3aWX355txM/+OADXwugCscdd5w717pdhMvLfrWnb7dqIbfJ0ITxTTfd5HbigQce6GsAVCFpHoqywlN90W3qKzZDE8ZbbbWVOzgef/xxXwOgCnHzUIi6FdTPq9ZyG8O0V0MRxs8884w7ODbddFNfA0AmTZrkSpk23nhjd75Fp8O00RVW1PerurZ1NxQ1FGF82GGHuZ1/3XXX+RoAYsFYFpuHYptttvE1/7H+XrsAFxb9gKPNM7Jl0fowDueh+Pbbb30tALFzoyxJ81CIwthGQKibQq3iaDDrwlzajzna3L3R+jC++OKL3U4u+6sY0AYWgmV477333LZWXHHFpeahMHEhq/kn1I9s02xaifYvqzuj7NEZddL6MB49erTbsbNnz/Y1AIwFXxlsHorTTz/d1+Snfma1jNVCtuemoha0wrmN8xibVofxvffe63bkLrvs4msAhCzsevXHH390nYciD7WC1Ycc/gHStv3iLqrVYbzHHnu4nXjXXXf5GgAhC7pe2UiJ8ePH+5ryqJtCLeO2/eIuqrVhHM5D8ffff/taAKGywtjmoXjggQd8TbkUxG0fm9zaMD7llFPcwXH++ef7GgBRCxcudKUXs2bNcufa+uuv72vKNwzD3loZxpqHYrnllnMHyIcffuhrAVTB5qG49NJLfQ2KaGUYMw8F0B9fffWVO9dU2t6NULVWhvGWW27pDo4nnnjC1wCowtVXX+3OtSOPPNLXoKjWhTHzUAD9Y/NQPPfcc74GRbUujJmHAsjup59+cqWIRx55xJ1r2267ra9BL1oVxp9++qk7OFS+++47XwsgiZ0vRey3335u3VtvvdXXoBetCmPmoQDyKRrG8+fPd+uttNJKnV9++cXXohetCmObhyJpxicASyoaxvqL0lrvjDPO8DXoVWvCmHkogPyKhPHvv//eWW211dx6b7/9tq9Fr1oTxsxDAeRXJIzvuOMOt87ee+/ta1CGVoTxnDlz3MGx5pprdv755x9fC6CbImG8ww47uHUefPBBX4MytCKMmYcCKCZvGL/00kvu/lXOQzGsGh/GP/zwA/NQAAUdeuihrmR17LHHunPtsssu8zUoS+PD+MYbb3QHx0EHHeRrAFRh0aJF7lxT+eKLL3wtytL4MGYeCqA/rrrqKneuMQ9FNRodxk8//bQ7ODbbbDNfA6AqG220kTvfnn/+eV+DMjU6jNXXpYPj+uuv9zUAqvDwww+7c415KKrT2DD+5JNP3MGhwjwUQLX23Xdfd64xD0V1GhvGF110kTs4TjzxRF8DIK8rrrjClTTz5s1z55rmofj11199LcrW2DBeZ5113AHCPBRAcTqHVNKcddZZ7j7MQ1GtRobx9OnT3cGx6667+hoARXQL499++62z6qqruvu88847vhZVaGQY77777u7guPvuu30NgCK6hfHtt9/uljMPRfUaF8avv/66OzjWWmst5qEAetQtjMeNG+eWMw9F9RoXxieffLI7OC644AJfA6CotDB+8cUX3bINNtjA16BKjQrjxYsXd5Zddll3gHz00Ue+FkBRaWF8zDHHuGXMQ9EfjQrjG264wR0cBx98sK8B0IukMGYeiv5rVBhvscUW7uB48sknfQ2AXsyaNcuVqCuvvNKda0cddZSvQdV6DmP79Ewro0aN6kyYMKEzbdo019VQxFNPPeW2tfnmm/saAFXZcMMN3fnGPBT9U0rLeMGCBZ2xY8e6naerr7ptFL4zZswYWa5gnjt3rl+a3SGHHOLWnzp1qq8BUAWbh2K77bbzNeiH0ropJk+e7HagWsBxFMo2TEaBnKeFHM5D8f333/taAFXQOaxz7bbbbvM16IfSwlgt1rQwFv102UJVXRZZXXjhhW6dk046ydcAqILNQ7HyyiszD0Wf9TWMxcI4T3fD2muv7dZ57bXXfA2AKpx55pnuXNM33W7UHTllypSRlrQV3VZjS8tnzpxJ12JGfQ1j7RzbYVl3kM1Dsdtuu/kaAGVZY401XBHNQ7HKKqu4863bPBQKYd1P14J0TSjsdlQAhwFNGGfT1zCeOHHiyA4KL/KlUQjr/vfcc4+vAVAWOx/F5qHYZ5993O044bWfbq1nywTCOJvSw1g7KnpxTn3FYRDrkzQLm4dC3RQAymfnpGy//fbu/w899JC7HcfOY7WIs1yE1/1V0F3pYZxWNIoiz/zDNg+FLuABKJ+dmzYPxZgxY/ySpYUX4LM2qPQNOO3bMv5TeTeFPj3Vh2RD3+w+3T5Vtdzu//HHH/taAGWyc8zmobj88sv9kqWF327zUP8yuqs8jEP6NLWdqe6MNDYPhX7sAaAadj5aWbhwoV+ypLBxREu3Gn0NY7HOfxW1mJPYPBQUCqU/5eijj/Zn39LCLgr6gKvR9zAO+5b1/zg2DwWFQulfeeGFF/wZuLQwjJPOW/Sm72Ec9h3nuZgHYHAI4+qVFsbd5qYQTRBkO7RbnzGA+gjPXfqMq1FKGGv4ioatWchGZ2XTbX2a2n00RrHIzG0ABsdmXtS/KF/PYWyflt2KdqA+UXuZ0xjA4FhXpApdjOUrrZsCQLupEWWt4zzdjIwzzoYwBpCZuhetu1HXidK+5WqZgpguyWwIYwC5KFzt9wJqKdt0mUb/1w+81C1JEGdHGAMoRIGrH4BY14WKWs2qyzp3Bf5DGANADRDGAFADhDEy0Twi4bwi+n+Wr6K6j32N1b/8eguIRxijq3B8abSk/bUHLVMfok0IpbGpup22DjCsCGOksjkJFMg2jEl1YSs5roVsAR5tCeu+qmfsKbAkwhip1IqNm+o0/AFAdK4CLbOxqHHjUG1Z1r+DCAwDwhip0roUNL40LoytPulXWrq/ltM6Bv5DGKMw68KIhrGFbdIk5NaFEV1P1Fq2vmbdxy76RVvY6u7Q9m0b+nGBbmsdrRt2j+h52nOKLgPqgjBGYdb/G+0ztiBNCj0LY5WQtqN1bTIpFQtYa2UrrNWiDrtItJ7+1XYV5LZt1atYoEeXAXVCGKMwhZuCLsoCL08YK2TjWq3W+lbR/411hVh4hxTWtiy6PXvsuFY5MEiEMQpReCrU4i7uqV4lTxhbqzV6UU+tY7WKFazhsqQuEim6DBgkwhiFqPsg6QKcwk4lTxgrbMPb3RDGaBvCGLmpv1Ut2SQKO5U8YRy93Q1hjLYhjJGLRi10CzItV+AltZytSyLcjm6rRLspkhDGaBvCGJlZEMf9kCOUNP7YqF7Lwwtvuh2tiwqXEcZoG8IYmWQNYtF9LFzj7m/LwlZwOEY4bh11bYQXCwljtA1hjK66BbFCMtqHbP3C0fG8uq36aH+yhaSKRk/otugxdd/or/n0mEmhmiWM44bkAYNEGCOVQs9GOqSVuCFuCkOta8GqINbtpIt/Nj44WrSOPhBCYUs62s9sfdIq0fXCx7DnBdQBYYxE1vrsVtJamWrV2q/l1Lrt9ss3Pabup/tbcEfDNnxsKwp+a/XmWRZtoQODQhgDQA0QxgBQA4QxANQAYQwANUAYA0ANEMYAUAOEMQDUAGEMADVAGANADRDGAFADhDEA1ABhDAAD1+n8H5pKDw1/NJSdAAAAAElFTkSuQmCC | In the parallelogram ABCD shown in the figure, what is the perimeter of triangle CPD in cm? | A. 24; B. 30; C. 36; D. 37; E. No correct answer | B |
487 | 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 | In the parallelogram ABCD shown in the figure, the area of ABCD is 2.4 dm². What is the perimeter of triangle CPD in cm? | A. 24; B. 30; C. 36; D. 37; E. No correct answer | B |
488 | 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 | In the parallelogram ABCD shown in the figure, point D and point D' are symmetric with respect to the axis CP. What is the length of D'P in cm? What is the relationship between CD and CD'? | A. 10, CD = CD'; B. 5, CD = CD'; C. 5, CD > CD'; D. 8, CD < CD'; E. No correct answer | B |
489 | 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 | In the parallelogram ABCD shown in the figure, point D and point D' are symmetric with respect to the axis CP, and CD = CD'. The perimeter of triangle CDD' is 26 cm. What is the length of CD in cm? | A. 8; B. 10; C. 5; D. 12; E. No correct answer | A |
490 | 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 | In the parallelogram ABCD shown in the figure, D and D' are symmetric with respect to the axis CP. What is the perimeter of the parallelogram ABCD in cm? | A. 28; B. 30; C. 36; D. 56; E. No correct answer | D |
491 | 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 | In the parallelogram ABCD shown in the figure, point D and point D' are symmetric with respect to the axis CP. The perimeter of triangle CDD' is 26 cm. What is the perimeter of the parallelogram ABCD in cm? | A. 28; B. 30; C. 36; D. 56; E. No correct answer | D |
492 | 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 | As shown in the figure, in parallelogram ABCD, M is the midpoint of AD, and point N is on AB. Given that the area of triangle AMN is 5 cm², what is the area of triangle AND in cm²? | A. 10; B. 5; C. 15; D. 9; E. No correct answer | A |
493 | 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 | In the parallelogram ABCD shown in the figure, what is the positional relationship between AB and CD? | A. Parallel; B. Perpendicular; C. Cannot be determined; D. No correct answer | A |
494 | 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 | As shown in the figure, in parallelogram ABCD, M is the midpoint of AD, and point N is on AB. Given that the area of triangle AND is 10 cm² and AB is parallel to CD, what is the area of triangle CAN in cm²? | A. 10; B. 5; C. 15; D. 9; E. No correct answer | A |
495 | 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 | As shown in the figure, in parallelogram ABCD, M is the midpoint of AD, and point N is on AB. The area of triangle AMN is 5 cm². What is the area of triangle CAN in cm²? | A. 10; B. 5; C. 15; D. 9; E. No correct answer | A |
496 | 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 | In the triangle ABC shown in the figure, AC is parallel to DE, and AE is connected. What is the relationship between the area of triangle ABE and the area of triangle BCD? | A. Equal; B. The area of triangle ABE is twice the area of triangle BCD; C. The area of triangle BCD is twice the area of triangle ABE; D. Cannot be determined; E. No correct answer | A |
497 | 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 | In the right triangle ABC shown in the figure, there is a triangle ABE. What is the height of triangle ABE from the base BE in cm? | A. 2; B. 3; C. 4; D. Cannot be determined; E. No correct answer | C |
498 | 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 | As shown in the figure, the area of triangle ABE is equal to the area of triangle BCD. In triangle ABE, the height from the base BE is 4 cm. What is the area of triangle BCD in cm²? | A. 16; B. 8; C. 4; D. 2; E. No correct answer | B |
499 | 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 | As shown in the figure, triangle ABC is a right triangle, and AC is parallel to DE. What is the area of triangle BCD? ( ) cm² | A. 16; B. 8; C. 4; D. 2; E. No correct answer | B |
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