Physics
General
Easy
Question
A Shell of mass M and radius R has a point mass placed at a distance r from its center. The gravitational potential energy u(r)-v will be,
The correct answer is: ![](data:image/png;base64,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)
Related Questions to study
Physics
The correct graph representing the variation of total energy (E) kinetic energy and potential energy (U) of a satellite with its distance from the center of earth is.........
The correct graph representing the variation of total energy (E) kinetic energy and potential energy (U) of a satellite with its distance from the center of earth is.........
PhysicsGeneral
physics
The curves for P.E. (U) K.E. (EEK) of two particle system ae shown in figure, At what points. system will be bound.
![](data:image/png;base64,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)
The curves for P.E. (U) K.E. (EEK) of two particle system ae shown in figure, At what points. system will be bound.
![](data:image/png;base64,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)
physicsGeneral
chemistry-
The absolute configuration of the following compound is :
![](data:image/png;base64,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)
The absolute configuration of the following compound is :
![](data:image/png;base64,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)
chemistry-General
chemistry-
The name of the compound is ![](data:image/png;base64,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)
The name of the compound is ![](data:image/png;base64,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)
chemistry-General
chemistry-
Among the following structures which one is called Erythro isomer ?
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)
Among the following structures which one is called Erythro isomer ?
![](data:image/png;base64,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)
chemistry-General
chemistry-
How many stereo isomers are there in this compound ?
![](data:image/png;base64,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)
How many stereo isomers are there in this compound ?
![](data:image/png;base64,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)
chemistry-General
chemistry-
The compound
is known by which of the following names ?
The compound
is known by which of the following names ?
chemistry-General
chemistry-
Which of the following structures have same configuration around the chirality centre ?
![](data:image/png;base64,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)
Which of the following structures have same configuration around the chirality centre ?
![](data:image/png;base64,iVBORw0KGgoAAAANSUhEUgAAAQ8AAAFYCAYAAABNpHlxAAAgAElEQVR4nOydd2BV5d3HP8855+6bnZBJNhgIe08FqqCiuHAVrVrbamv3sMPXt9phl12vrW2tWjc4GIoooIDIEJEtmwAJO3vnrnPO8/5xkwACViKEoM9HgiFn5tz7fO/v+T2/IaSUEoVCoThNtHN9AwqF4vxEiYdCoegQSjwUCkWHUOKhUCg6hBIPhULRIZR4KBSKDqHEQ6FQdAglHgqFokMo8VAoFB1CiYdCoegQSjwUCkWHUOKhUCg6hBIPhULRIZR4KBSKDqHEQ6FQdAjjXN/A5wEpJacsmyJE6/8E0e9k6/6n2l1A+74nXKj9WFvK6Dk1QXRv2XpukLaMnqP1i+gfheK0UOJxVrEBSSQSoWThX5j58su8tlVDCDeGoxe3/eVB8tYvxDliEDnFxeRoEqRNU/UhPvjnDTy82Ka6WUQFIX8sF13zJR66rhjdMNCEOM5slHYjh7cs4bXf/4p/b7EIhS0cTifDbr2fm6+ZzBB7Fe/PeYSfPr+TcDCC5nSij/ka37v1Cm4cko6uKflQnB5CVRI7S0iJbZtIezXP3P07nt7gpfDGm/nOl4aTqllYkf3M++ndPP5BEgO/cx+3TR3LoLhDlK2ey1++8hizxv2E2d8cQV6yD5DsW/kUrz43m3cCN/PgnHsYqet4dK3dYpC2hRUOEqjaR/WSPzH2BxFue/Qubp44kHy3AwdhzOARDuxexG9GP0n3f/2JKyb04YIkN16nrsRDcdooy+MsYdsRIsEdzPjG3fynfCwTf/oV7pzSh2Shtc5UUrn9yTVMWvAkG5ISEWYlW15/jmcfmc6yYT9k0Z+uI8fQcInolCPxyq8Qm5iM+dD/cfMUnVlPfYnB3WLxaG3THg3d6cETm4A/xocYlEFuWjfSPA5chobAhRAx+H0+3MKBz+Mj3ufC69TRhBIOxemjxOMsIa0w5q63WbC6Gu+EvhT3yCPFcKALwbFjNfPyr5EuJZFDy5j34UbWlPsZfPsYChxOHLrgqEGQRFpmEUMGpvP3x2azeMdUesT5cbnAtqPGo6ZpCM1ACA0RaaD6yAH27ZXUG9EJjm3VU3ugmkYbEAJdE8riUHQYJR5nCWmatJRsZ0swSE5SInExMe3OyWPRRNQJGmmoo6q6iv0OJ+My0tC0jzpFBR6Pl26pcdjWIvYfDBEKN3Bk334OVdRh+pNIzcqju0eCNKHsdZ767Tu8Ge/B2SoQ0jYJNtZTFnaT11kPQvGZRYnHWUJKSWNDHdK22ldR2v93jCrYkugKiMOJ2+XCZ4dpDgSQ0oc8blVFYlkWwWAEIRLxejTCR9bzwatvsXzzdipcPSgcfCN3T8vGQEMW3sT3fno1Vw7uTrzeZnnUUbtvMb8e8m/8nfUgFJ9ZVJzHWUJzOEkdMJ5BWTGEKg5ypLqWgJR81DttV25lx4FKDhgZZGXnUexoZtvGLdTbEqt9bwmEqas9wo4dFWipX2BAngu9JoaBt32b/3nqUe69cjCpO5ezuhEsNBAGuuHE5XLjdrd+uVw4DB1dRF94NWFRfBqUeJwlNMOFs/dVfPsrV5Cyfxmzn5rBnBW7qA4ECAaDBAMBgiWLmbFoNRv31WL7cuk9agKTJ2RTveBpfjdvC4erGwkEAgQCQY7sWMby+XNZuj+Pm396OxfmxZA5dCB5ySkkkURiZjoF/R34QkEww3C4koZAiBZbYtkSaVvISACzvoYKaRGwbYIRm7BpY6sFN0UHUEu1Z41ozAbNu1nx9uu8+NQK9lTbpPRNx6dpoOmQVkBh/zFMHtKTwm5eRKSWytJNzJ+3mHlLNxHfLRXD6URKSYMNnvgsxg29hLHXDCYdgSEA24SKTXy4q5T39jTj27+Ud99bw/R3TPpOHMzlt3yDy0cNpoe9jV3LX+QfryzlzTl7yJz0BXpefBO3ThrGuJ5JOHRlhyhODyUeZ5WoQ8M0a9i/aQelpeXUaW1RnRpk9GP0BWkkxbgQgEBiS5NQSw1la1axu0ESsUV08hKTSlpOIUPyEtE1DaSFsC3Ce99hxnulHHDkMbF/Lo5DW9hVJ5G2jW446NZjIAW5WSTLCirLtvLBrjoipoVmGGhpvehT2J2CFK9arlWcNko8zksk0opQ9e7/8een5vLiB9WYzgRGjh7HpK/9glv6ChxqQqo4yyjxOF+RNmZTBeW1zTQGTCQaLo+P2OQMEj2gwjcUZxslHp1IW9KalKBprUluCsV5ijJuOxHLOsCmTW/zu9+txDTtc307CsWnQgWJdSJSSixLYpp2e0i54mwRtfI+zrqTMuo7ijRVUV4fxrINvAmJ+P0ePMelBoC0bexgAzV1jTQFIxguL/6EFOI8AqRJc3UlDS1hQpYDt89PQlIM7tbgPEwTdD1afuFU5RTOQ5R4KD6DSKQ0CQZDBAKQmHiyeFoJVoBAxU7WzP4njywoo+qIJO/GrzP12ku4ONuDS2+rgwK2Xc+h+Y/zyOzlLN9XQ1r3PgybfC9fm5qOo3oD8/79L95cd5Dd+z1kDRrL1B9+kctykhC1tYRME2maiKQkXDExePhsBOipaYuiU7EtCzMSIRKJYFoWlpSYtiRitQazEf2Ut8wIZjhEJBwiFDr6FQ5HCJsWEUv+l+C2Jg4d2sPy5dtOsV2A2UQ4XEtp4c947OkXef7+wbitKrbvqf7I4JbIljW8NPMICX3v4E/PP8Z9U0fCjJfZYNvUbt1D6o2/5sEn5/DUb8dTzPtM/+vb7GysZMOMuWzx+Ni9ailrd5RQGuaEKOPzFWV5KDoJCbakfuca1q3bwUERS3KvfvRIdaHVlLFD68v4Hj5cArCbOPTh+2zdspPSRjjWPSR0Ay1zAIP6FDEwOwbtJMFtUae0RMqP9ysJdzcSclP4UraNbTdQF9OH8QMKyMxPPGG1SoZ0RKpG2BHGbAzj9nsw+qST6XCTPv5msgBsG3PQKIZuClO/ooojVjPhplqsww0UZKXjjolFREA6+EyYHko8FGcfKZFmM1b1Jl575HUOGE7s1FiqmiwOhWqw6raz/8LejOvRlkJoEW6qo6biMIfrTiIengIaQ+YJpRqlXceud95kzfYDHGoOUF1TR2Wlzc6dSxFCg54TuHJYDwq7+Y6KgxXCrN7E6y+/yVvrK8kcnUJuz9YyB+07CbSE/kwctZjpixbwn91bKejdg+xLRlMIaK1+DCkEmm7g655O5oA0evrTiZ3Un01OB6RdQH63BOK8n51ldCUeik5AYjZXU7nycd7RxnHr7ZcyOFfQ9OFS5s0vYVkwn7sHxmMYUZ+iRGKGmmmur6O2FqxjREJoBqIpQDByolUhbdAdLjweLz4JzS1BDMPE4/Gg6QbCZUTPH/Wk0jaBkBi4vOnkGytZ8O5KIrGZ5KX3JNmANvemEHEU9RrCoIY1zJm/i6W7ahjRfRBIedSIEIKqgyG0pGSGTxtGvjcGMXQSXzi7D/ecocRD0SnYZoTGw/ux+xSQnOrF43MRcQUxPQFqYnrRzy/RENgAmpuEnGL6WrEkt0TLFrQhNA1S8slP8ZxQyEhoseSOvJKc4TaWrGX37v1s3RpmypShIDSEph0t+hw9AnQXRlI/Jk7rzaiLEog8UYm7vpFQ+6mjgTmyehUz5tdAjwl89Yc2h99dzcbFr7Fk2I8YlWTjxKLhw1dZd9CFnTGUcdl+bBuEaC1E/RmxNo5FiYeiExAYbi/pA0eiP/8uO/tkkRypYMei/ex938nAm5qoaw6wc8ZS5NQxFCbEkNJjKN16DD29q2gauqYhpUSTTpxOJ04nOJ3OUx8kW48TBv5gC678LOKyM4iHqPOkteq83XyAzSsPEOfJZ/D4XmS0VFFbspKyFhgab1O7/P+YXRpP0gVjGd9To7FqG+992I0JE1I+k8IBSjwUnYEAzZOMb8A9fHPzP5jx0Nf4V7lB3NBrmPiVCfQxF/C/Vz2KffVD/K90EPNpLycEEEd2tpe0tFPtJQkc+pCNr/6RHz63K7pyM3gaX79xLJMHpOIOllGy9C0efbSUEX/+BZekXMq0q7fwr9ceYNpTzcRl9WHQVd/mJ4mNbPnHTfzhlZ18WOXE5f4nf3EnklU8nqn3/oDPrHKgwtM7lUhkH5s2bWfePA8//vFIXK7PmXZLSSTYQktLANPW0N1enC4DEQkSaAlieP34PM5o1nAn3ItlhjFDzTQFLSwJmsOD3+vG7dSRlokZCREKg+714RASGW4mGAoRMkEKHZfHi9+pEQk10RwwiVg2tOZHO10ePH4fTj06ZfksSsjn7N2rOKcIgeHyEON0R6sxCi06qgwvTrcHIQSa6KTQIyHQDAdOPY4ET6vrVIjW0gQCoRkYLh3DFf03AC4fPpcXr2w7RdR/4vTEYbjbGntF99W0z35DLSUenYgQBm63h8RED9pnZb3uNBGaduJgOkemfZt4nfTqQnB8IPnHhJYLgX5W7rBro6YtncjRrFp59JNJoThPUZZHJ2BZFrZttafjCyGQdtREFpqILj8qFOcZSjw6gcpti1m3ZTdl1RKJC29MJv0njCKhdDN67yKS4uPxKitEcZ6hpi1nhWhWZySyj5XPvMWSdWupdXvwJ6TgwUDXnMS6gux8ezv97vsJlwzrRbbrJL4AhaILoyyPM44ETEIt+1nx5IP87tkWCq+8nhtuGs/QwhS8RAg2HGbrgrk0p0oCAZtQCHCd6/tWKE4PZXmcaaQN4Srqd8/jRzfdz9qhv+T+ey5lUv9U3Fqra19KrEiEptKt1CfmkxgXi9/x2SkSo/h8oCyPM420IVBPZPd6ltdJCvv0ITUpCeexORVCYDhdxPccGA2D/ugpWvVcrcYoujLKzf8piS6/So414MKBFg7u3k6jbeN0udD1Tx4FYNs2kUiExsZGIpEIyjBUdFWUeHQAKSW2bWNZFiUlJRw6dIhgMNi+3eF0kZreHQ0BtoWUNm0pVm3YUmLZJ7Z6DIVCbNmyhbvuuovS0lIsy1ICouiS6A888MAD5/omzjfq6upYvnw5L7zwAqNHj8a2bQzDwOWKej2F24vIyCZu3SxmrjbJKsoiLzsRr661xnjYRILNNL7zW54szcbhTSDdH52iGIaB1+slEAiwYsUKUlNTSUxM/EgquUJx7lHi8QmRUtLY2EhjYyNHjhxh/vz5rF27lgkTJpCVlYXb7W7NZRAgHBiORIqHpnP4rVeY83YZNcJDYpKDcH099RVlVLz3BF/aMJI7LipkYKbnOGFwOp3079+fVatWceTIEWJjY0lMTERTwWSKLoRabfkERFoL9r744ots2bKFSZMmMXLkSDRNw3UKn0Z0amNhWx/yxkNP88aq7ZS2FbDyp+Ae9y0e+1I/kvxONKEdl97R9pJUV1fz6KOPkpqayqRJk8jJyVHWh6LLoMTjJLQ9Etu2qaioYN26dRQUFFBRUUFlZSV9+vShsLDwEzhCo54Oy7IwTfu4VRRdN6LHf0zWpWmalJaWMnfuXNxuN1dccQUZGRmn5YBVKM4WSjw+gpSSSCRCc3MzwWCQffv28fTTTzNx4kTGjRtHbGxs+6f/J7UCGhrq0TQdt9uN1loK75Mc3/bSbNq0iSVLliCE4MYbbyTt1BVuFIpOQ4lHK7ZtY9vRorqlpaUsWLCASCTC7bffzoEDB0hNTSUpKem0HJdSSkKhEHPmzCEtLY1hw4bh8XhOe+phmiZr165l2bJl+P1+brnlFtxuN4ahwnQU5w7lgWslGAyyZs0aVq1aRUNDAzExMWRmZuJyuSguLiYlJeU4q+G/0bacW1JSwtKlSykrK+uwv0LXdQYMGMCECROorq7mhRdeoKWlRS3hKs4pp/3RJaVkw4YNLFq0iG3btmFZFm63m969e3P77bcTExNz3jj12mI1QqEQpmmyevVqamtrueqqq7jmmmtaC+h+TPHcj0FKSTgc5qWXXqK6upq4uLgOn0sIgcvloqioCCkl06dPZ+nSpYwdO5a4uLjz5nkrPlt0yPLIysri4osvJikpifXr1zNw4EAuuuii9jiHU9Naxv4kUZlt20+97aO7Hr/vyb4+/nBJMBhk2bJl3HvvvWzcuJFJkyZx8803k5+fj9/vx+VydTi+wrIsqqqqWLBgAVJK4uPjP/Ug93g8FBUVMW3aNGbPns2WLVtobm5WFojinHDalocQgqSkJBITEykoKCA2Npbi4mJ69eqFw+E45XHStlnwyy/x/Hsl7K4XmBIy+17Ilff8htuKwxx+437uf249Ow62YFkSPW8EQ6/+Cn++sXd0AB9zLtsysU2ThsPbef+pb/D7JYKwKRCiOyNumMao/HiS6vfhv/EGBhoGx1ShBKJTlIaGBhobG0lJSSE+Ph6v10tubi4Oh+OMBGSFQiFmzpzJgQMHGDlyJCkpKWfEQvB4PPTq1Ysvf/nLvPDCC0QiEUaPHv2xz16hOBt0yOPWFqyk6zqaprX7Aj5+cEgu+s6fGDrmPzzw9xJK00dwz8+vYXisBM1Bt0t+xh9Hv8/z351FaVx/Rt1zI1/IiYlW3oLWv1qXUK0yNr4+nX/c9yor+tzC3568hh4+J26tlnUzHuX5+5dQlnkl3xhzPQOyj14fohbHsmXL+Otf/0paWhp/+tOfuO+++3A6nRiG8akHeJsV0NLSwn/+8x/q6upITU0lLi4O+HTJbm3P2OVyMXjwYI4cOcLSpUuxLItx48ad6JNps8KQtP5prdspEG0B8zLaoS1au7e1+K8Qn5mWiIqzR6e6612+WByxfjw9c0jNKCA/xo/HIdA0EG4/sc5YfG4PHo8fvz8Gv8sRLdXXJhzSBlnB2pf/w2NPvsu2CT/g1T9eTY5hoAsQIpkv3P1Hhlz4Hnt272J/W7FdKQmGgsyfPx+Xy0XPnj154IEHiI+Px+PxoOv6GQv/tm2bmpoa3nrrLerq6pBSkpGRQUJCwhnzTQghcDqdXHXVVdTX1/P+++9jGAajRo06zgKxrQiRYEu0s7wNNgLd4cLh9uPUTHQrSDgcIRixsWxAd4DDg99t4DI0JSCKj6XTxEMcU69Ts0MEGqo5cuggmqGjaxKwse0q6oMRTK1tMH+ksLa0oWIzO7bsZEcwlf5jh5OtG7gcR38NXZMk9RtDUr+xDBVtjZMlBw8eZOnSpei6TlpaGgMGDGgPtjqTDkfLsti/fz9PPvkkVVVV6Lre7j85k+i6jq7rXH/99Tz77LMsXryY1NRUevTo0W6BSAlrn/s9z814kTd2tlAbctC9V0+uefB17h6sY6z7F397Zg4zFu2lqVni6tGP5Cn38+o9g0mPc/HZbRqgOBOck0ABWbmOFW++RdmSGDy6hq4B2EjZTMVeD72vHnWSg6J+E/PwAQ5Xl1PjyyUrPe3Eqv1CINr8wO0bNQoKCnjggQfQNA2/33/WEs0aGxvZunUrGzZswLIscnJy8Pv9Z/w6bfj9fq655hoWL17MjBkzuOWWW8jJycHhcKAZBiO++gsGjhvLoKcX8JcPcvi/OV9njNeNgY0Y9z3uHzGR0X+bydvzmxn46IPc0MOLJlQtEcV/p0NLtW0BVaZpYllW+5fW2ic02lpAO3VcROpIvvCVUfzkzhFkHicea3nunlcoA6TZRP2hw+zYdpAGW+LPHUjvDB9aoJlgIBC9l5PfIEf9G9DWrksgiI8/WemdM4eUkj179vD6668TCoXQNI1evXqdkZWWUyGEID09nTFjxmBZFs888wxf//rXSUlJifqkdAOh6chYL3r3ZJJNEzsSItJ6vGnamJZE2tGGzA5diYbik9Eh8SgtLeXDDz9kxYoVlJeXs2DBAhoaGhgwYACrV69G0zT69u1LXl7eSc8hNA1NNzAMBw7jWPEwMPSon0K21FB15AMWvrGWKqucKudNfPPOUQzJ7UtBYQ9SDtZTVrKXplE9cHKMgS1taDpEXUMDZY5e9OnWaoec5TEhpSQQCLBr1y6WL19OKBTC7/dTVFR01sUDIDs7mzFjxlBVVcX06dOZNm0aSUlJrVGoEoKV1Ow8witP19HNOFps2bbK2bl6B+VkMfCs3KHis0qHlmrD4TB1dXUUFBSQm5uLy+Wivr6+3VloGAbhcPi446SUWKaJGQ4Tqaqj2VVHg2UhDS3q97csrPoaapubafCFMUU8qcWT+OrQy/HULeTfz8fjFDoyfRBjJ15KRflsXpnxdx7xfYk7Li8myamjA1rdbjZv38Laai+9hvU6ZqXm7GJZFlu3bmX58uXU19cD4HK5yM/PJybm07Zu/u8IIcjKymLq1Kk8++yzfPDBB4wcOZLExERAgG1iBhupKi9HOI32R2JFqqltbCGC8nAoTo8OiUdRURFFRUUn3f7lL3+5fb9jsW2bNTP+yqJ3FrB0ZR11vk38y3uIK6++k/HdTarff4rn5i5g7tpd1Hv3UuasY0vfHowILeDlFbvZlftDxhoOXMJPVr+Lmfo1H95ZbzLzF/eza3E+MQ4dXYCRmE5C4SAGDxjEyCw6bcUgFAqxevVqFi5cSCAQQAiBbdvk5+d3ShRo2xJuZmYmd9xxBxUVFUdzX4QAfxapA3tzz8+upcjnbI8OjAS2sPj/XmbR/CaVq6A4LTrkMO3IQBCaRmrRYIbE5tPjUrCkICYlk5x4DcMw8Gf2ZdD4buQNM7FsiR6bSkJKChnmWMb6e6G/sYbqxlxqiSfe042sPhP5YnpvBvT5kP22jWzNbdeS8sgrKKRf97jWpsWdw+7du9m4cSPl5eVIGfUfaJpGYmLiGV9p+TgMwyAjI4P09HSg9bWSgC3bnUTHBd0JgRQCu9PuUPFZodNWWzRNJ2/4JE7uBdGJKxzDJYUnbrGtInIHNZNU8SLxsdHPRiF0hO4ntlsRI64vYsTZvPFPyLvvvsuKFSsIBALtDuP09PSjFcY6kRNXkiSivplIaTkVUnKczdjYQENjA5VCO7kDWqE4BV02p7t80zzeev53PLYyGv044u5/cGdsBnHn+saOoW3l6fDhw2zatIn9+/e3p/UbhkGvXr06lIJ/xu7Ptlnz3O+Y8fLLvLG1gapmg59ct5hr7n+JLw9yoq3/F/98dhYz3t5NQ4tg/df38J8pP2H6VwaQ5HcqH4jiY+my9TzMcIBgSxPBCKBpODyxeF1Gl1pKlFJimibPPvssjz/+OOvXrycSiSCEICEhge9///vceeedJCcnnxMBkZZFONBEMBQibIFEoBkGTl88Ht1GM1sIBEMEIza2BDQHuHzEewwc+vGlERWKj9JlLQ/d4cYb68R7XM7Fub6rE9E0jeLiYoYNG0YgEKC6uhopJV6vl8LCwk71d5zk5nB6/Tg8/qNTEtGah4QGug+f04u3zR1yzHPuis9a0bXospbH+UJbUFxb4FxzczPl5eXU19czYMCAcyseCsVZRInHGaDtEX60jkjbiotC8Vmky05buj5RobBsSW3pWvYeqqUuIKI/Nzw40i5gdI8kDBGiatcW9h2qojYUzWx1ePxk9B5Fj0SBWbGV7aXllDeEo+H0rhi8mUWMKUxUWa2KLo0Sjw4hgQhSHmbNrJW89cEiKlokQvcjsAlZNg0OP3v6TmLEVT1p2vYeH7y9gDfXlFMSSGLkVRcyOXk4ufEGgcObWbNyCfPnbeFwrZOkcRczeHwyowsSlONB0aVR05YOYNshAvV72Pz6n/nDYzXETPkSt181ghE5cYAkWFvKjkWP8PCfduK56RvcdtUQhrQsZfor65hdM5Bf/ulG+hs6DkNH2hFsaxNvPvwqK7fF0P+Bb3NNdwOnQ1dLpYoujZqQdwA7WEPN9sU8/vPnOFg8hS9OGc3QgmQcTidOp4vY1AL6XvFDvjyhiRX/eYFFq/ZQEQIjzoc3NZEkw4hmHAOaJtANHcNhYBhGaxaspoRD0eVR05YOIFsaaCrZyMIjNqP69iY9Pg5Xa8vI6KB34HAk0H9IH9wvL2ZXaTnlaSDrStixdAP3HXyNGCFas4ktoI6D24N48ibQV01VFOcJSjw6gDRNIi3NVEpwe7wYhn7SokRerw9dqycYDBEOg+1OIaXnQKbcNJTU9jqhNrCXD15ex74WNYNUnD8o8egAmseDNyOLgbqg8kg5LYE8bOlGb288G21yfejQfsJmASnJ8cTG1KO54ojv3osho8eQrYEuBFHLI47m1Qeo366sDsX5g/J5dADhTSL2gjFcN0hj94qV7KioosGysGwL27aw7ACh4F6WLlhPS/cx9C/KonscIOVRP4euYxhGewX6tkLN0rZbS6ApFF0bJR4dQNP9JGWN5JuP/Z7RR57l/t88w8uLt1FXW0t1TR2lm1cz82dT+c3aK/nZ377JFSOzMQJBGvYepnLDDnY0NBAMRbAlhINBGnbvZe/+/exuaiDQ1EAgFI5m0CsNUXRh1FJth2jrfGcTDpXx1m9/zDNvfcimGpBoyMRcEif/mNe/PYwEfx1L/vy/PDX7XdaUS2wEcRmFTHlgFt8Z6abu7Qf5zRNvsmRLDZYEvVtPcq79GXO/PUIlpym6NEo8Okw0m8y2LWzbRh6ttYNsbZykaxqaLrAtC9uyWxswRRsv6bqGpuvRbbbVGtp+/DalG4qujBIPhULRIZTPQ6FQdAglHgqFokMo8VAoFB1CiYdCoegQSjwUCkWHUOKhUCg6hBIPhULRIZR4KBSKDqGyas8xtm0jbfuYbm3RVH3R2v/g2H4vbVXaT1Zk+aR9YaTdXpS5LQJWaBpCaCDt1u1HI2OPbpMI7OOOQ2jQWkagM9t4KrouSjzOMfWHtlF2qIaGoERKJx5fPOk5GfjqK9AyM/G53ThaB2uouZaKfTsorQq3RcfjTMwiNyudtATvCeHsthWhpXI3h8urqGiUWBi4vElkFPXEWbWPloYj1DaHaA6DFDpOXxzJuX3J9EWgbi/7jtRQ1RjBtAXCHYszOYd+WTG4HboqzqxQ4tH5SKS0MCPV7Fq+hXfm/4tVZXXUhLwY+EhIyWfAyF6E3niL/F89wIWFWSRpTVTuLWPDsnGfRe8AACAASURBVCUsWzWXrUe87dZCMLmA0QNHc/lFQynolUGcpiFtC2lXU7Z2K6veep6V23dTFojDwI03Jp8R14yj+Y25NHKYA5UH2bC5miPhWIZeNo4pdz3MDT0hsvNt5ry6iLlvbqO6yUH8mIspvvQO/npD73P69BRdB5Xb0qlIwCTQsI8P3/43Dz2wHvfFN3Hr7ZcwplcqXkLUH9jCymef5NWllfT7+cNcOzgFuXs+rzwxj0W74hn49bv5+aUF7Wfct+xRpj+5iK2iH+O/eQc3DM3BHapkz9JH+dcjGynPGsekaVdw5YhcYoVFJHCINc/+k9nvVpJw4z2MTy5j2cz3mFddzMP/nMYwnwshbQQ24cBG5j44gw92xTDs9z9kSr4HTYCuzA4FyvLoXKSESDW1Je/y9C+eYVv/h/jLnZdxUVEKHl1D4CApZwiXfv8CRoxfwoHcGGKC21nwymze2qaReuXNfOuSAgyHo32KkjN6GleXl1M7YwUz/p1Jj/xbGdjyPs/96gnWdv8Gd956LdeOzMavCTThwNDzGHP3byge+x774nPwlR+AWA8GMcREwoSDdvvtmhET045mAmtCdKk+wYpzjxKPzkTa0FhJS8la3qkwKBoxnIyEeFxCtIuB0HQcvjhSRk8hxY4gdn7Izn2HaUoYwbi+vYj7SKq+rsdQ0LMHhd0/YPGu9azaMZULmlaxcHcLqRf1JDcthRhNa6vMjNAEQgoS+44lEQjU22gNJex+dx2//ekS4o4RCGnXsHd1FZ7ssQzvrGekOG9Q4tGpSMJNjVSUlVAlYGBcLIZhnFDwJ7rSooEU0NJEYzhExOXC5/We9KwutwePR2CaddTWhqko28bhcJgsrxeX00l7adWjFzgqVkKAK57YjAwGDh9AmlNv382K7MN5YCP1tB5vBbGrV/HEI2+wtaoJT7/L+cK4sYzrGYOuq1X/zxtKPDoTCbph4PP5ARCt/50SASSlkOLz46puorK2FknSCSdtbKilvt7C7cokM1UjpjYOcUyP3I+dbAgN4UmjW9EAJt9wORd4He2bIoEN+LbW8sEu0JAgdeymGAovvYLswE5WLz1CyXu76JM3gFQlHp871CvemWgaeko+aWOv587CMCtffpnthw/RaNvYrVXGbFsSaq6jefkf+fd7tez1DaFvz0wS6kvY/P5aKizzuNiMiFnD5k3b+bAMEotGMK44juSJd/LNEUkcWr2SD7bt5kjQxLRsoqXPTDCDyI3/Yc77u1l3GKQtwZYIJKI1tkQIEb2f6FFIBOgOSO3J0AH9GFGQRJ/hxWQWFeJTcR+fS5R4dCZCB2cSifkX8a1f3EPRuj/ws+//gxnL91ArW4PA6svYv+QR+swqYFCmi6ykfMZcdwOX94XSV/7Ct/61BtlWQxXY8vJv+Nczm6nMupGf3DeZ3l43/qTBfPs3P2REyyL+/vNHeHj6WspbyyASqoflv2TqPC8ur4/iZImorCO45zCHP7ruVlNNdWMD5a3drCSAobHpkcuYdtM9fP3fr7PiSAXKj/r5RC3VngOkbWOaIczICh6f9mte2bCXslY/hEzpSerV9/P294bhduoYmoZtReNCSt9/jZd+8yue3HlU8+0Rd/H926/jrguzMRwGuqGBbYG0iVgbeOlHf+a5mSvYpmtomgB3DEx+iDe+l8/+Z37FYzNXsOKghS0hJa83U3+/kB8MkzS9dR/3/+NN5q+rwJYSI6sv2Tc8yOLvDkLHImIdYemjCyn3pdLvy1cwwKlmwJ83lHicM6KP3bbtaHHk1p+2h5ufpF+tlHZ0f/voS6Zp2inD06Vtt4eztx/RGmYuWkPQo+dtC13Xo9dtjfOQMjqNagtPl1JiNlXSGIJIxKRs41ZEfByFw4fQzaHE4/OGesXPGdHBLkS0wvpxW8TJ3ahRYdER4vjclpPmtXBUiIBjxKP1ugja5iLHClfbPgIdhERvm64IQbixks3PfY2/vmNS0wK9J3+Dq64YSrKat3wuUZaH4rSwW60ZEK2JdOKYBt+KzxNKPBSnxfFvF3FiDInic4OatpxjbPswW7YE8Xrjyc+PP+UUpKvQ1e9P0XmopdpzTCRygA8+2Mm2bVVYljICFecPyvI4x7SvaKjZY5dGSgm2hX14DYveeZfZ75XhS8xkyPX3cmVPgcfZuhQuJVK2UFO2ieUvPs/8fTa2NYAp37yU4b0zSNINpF1L9d61vPGn2awTAosBXPbVSYzom0lCIIAMhyEu7jhneFe095R4KBSfBGljWztZ9tJC1uwT5F58MflNpaz8/hOkPXMzg1J8xAoNKW1aynayb8sWKvpfz9WDw2x+7n4e+3slNbfdyFUjC/HW1BA8WE7jRVO5upuGLpLpnhaLuWULuyIR6t1uxMKF6DfcQG/Ada5/91OgxEPRdZES2zKRlokpBaaMlkHUhUTXRLQZuGYgW0sqmqZFJGJi2fYxJ4mWczQMA6fD8akS+GT1XnY0+9Hy+3DFJYPx7EmkTJ9Pg7Cx2spGInCn9aBnQjbZ7nh8hBkUcy17f15BVWklVSO7IXauZM7f/sgL1Vlcce8z3D7ITXpMHR+uPkCV7SN3YAyuOItlh6BnGrj0/35v5wIlHooui5Q2zaWb2Tj97zz89LtsLLqcL95zF5MCc9haE4dRdA1fGZMOMoy09zPzu7fztyWl7Koxj55EaOCOxXP1b3n9h+PpkxV/sgvxsZPG1jwfkVhEj7i5vLHnELPfjmVKcinv9bmIm5xO/MdcT/f48Xn8+ADbNIjrO4gLPMvx2ZIIFilFY5n8kwFcVjGLH35jFJU/foGvXtaTzLgAZQcreXVnPMNichiaCs4uKhygxEPRJYnm7tj1m1n3ziL+8XoP7nr1L4zUV7Ng1grmrd2Ja+x4xuW3ZRgbQHeu+O1cxrUECYc/Ih5Cw+P1Eef/aEmD6HUi4RDBQAjTslqTANsPxnC6cHk8GEIg9O5ceP2NVDz2BH+890e8Ou5uHnt4HDFO49ROCSHg8GGMmyZR3L+IHsRDfBzx/W3M0Hd5aW4a3//DSnb3jqH76Ku4sv2w1kLYdE1/ByjxUHRFWkdvw769HA7X4Lznq4zNc+JxjOHKset49VARafEX0DMhmhEspQkcZP7/fo1/vruP3bVt4hGdSuCOwX3FL5n53QvpnRF3/LXMBkK7X+EHX/4775fX0QStQfsC8JOUOYavP/lnrs5xEC8itByyyLroMm7M3s+ufz7OFx/w89pPLyE7wX38ryAl0raINFez7AM3Y0ZnkZMZi5ACoQlAw3C6EfnjmOCficMI0aTrxHP+LIEq8VB0PQTR2idOJ4amYdVW0hhIwWnWsfPDA9i+bFK7+XA3tVBbbWKkxhGj53LNw/O50mqLgKU9FB8Euq5h6CeZAzji8FxwO39bemt7Cwx5zGe9buhouoGQNvahRTw3dw+NKf2Y+rXLcQwfSq+f/J0FpSOZ6nWSZhwd9mawkfoDm/lw0dPs7P0ghTE+7MYgjZoTn89A1wVS2simKhpz88mOiSWBrmtlnAwlHoouisCXVURebjndZr7Kq6+Wk6dvYPXyPAb0cZAa3szC1/eimX763jaW3kJDN3T003pHR4eqrhvo/+VA2wLhTCZVbKJi/3qWLA+RWLGfhm496evTcUYq2LuplogvidhYm9oNc1n0xixe1m/m21kb2L2+hormHuR1SyE7oZYdB+uwzRBW5QaqCi8nLjGZmI4/rHOCEg9FFyQ62df8efQaaPC1gM2b7yzmLZFFr69cx4SCOg68v4x19SGyLhpDL0M/65GvQtPQU4ZzyU0BnMtXsGjuQpyxqeR+6XtckheLN/Ahq1dvoTm1F91zItTt3U6JXcRAuZ7liwRCpDPgsn50Sw1w+MNVzF2yC2m4YeAN/GBsIRkJnrN6/2cDldtyjgkGP+C556pJTc3nsssKMYzzZcbbSbR1vIt+ezQJr/Uv2ZYf3Cn2fmsHvdZ7auvod0zJ6LYbO7rPMbRXaGvfJo7pDHh+TVlAWR6Krs4xA7RtLB4rFJ074FoHeasAtP37ZHdzdB+O+9lHt53PuULK8jjHRCJV7NkTwuPxk5kZi65qYyjOE5R4dAFO9omqUHR11LTlHCCljbQiSMskYklMSyJ0Hd1wRkOuW8MTNCHOmzV/xecPJR7nAtvGDDay+k9f4IHZlWw9YqM5chg4+Vam3noFGe/PQfvWNxmm6/hPUZJQoTjXqA+2TsS2TCLBfezf9G9+1KMvX1pxE3c9sZz1JSXs3DGH31wj2PHzK/jW81vYslsSCp/rO1YoTo3yeXQiZugIu5e9yFO//DMzuv0PL/z9JvomefFpGm15FoGKfexdNpfVg7/OlEydRJeyPBRdEzVt6UTsuv3s37qBpfs8DL71Igq8bjyirQ5oVCI8qTkUXfdNLiDq81DCoeiqqGnLWaAtCOijRl24tpbyA/vYq+lkZ6TjNIzjg4xaYxp0TWBo0azKtvPZto1lWarimKLLoCyPM4yUklAoRE1NDcnJyTgcjvZAINMMEwy2fHztiFOcs6amhvLycjRNo6io6LwOLlJ8NlCWxxnCtm2qqqrYsWMHJSUl1NfXU1tbi2VZ7ft4U3PpMWAYA+JNtq77kCPNAUJWtDMbrTUyCVQTLHuPd8tsWiJHz2+aJiUlJbzyyiuUlJQQDoeVFaI4p+gPPPDAA+f6Jj4LRCIRVq9ezdy5c6murmbChAlIKXG73e1d24TbR1yCjzRrP69OX8rWQDzdc1NIifPgwIK6vZRteZcnVteRkVdMZozWXknK7/fj9XqprKzkjTfeoFevXvj9fvSTpZkrFJ2AWm3pIG0+jZqaGmbPnk1qaipJSUm0tLSQnJxM//79T2wFKW1kpIHGim0sW/IGT/5xDUZRGgnJfpzCBl8i8T0GMWrYSL7QOzVap/OYwyORCAcPHmTmzJk0NTVxxx13kJGRga6f/axSheKjKPHoAFJKLMuisrISTdP4y1/+Qm5uLhMnTqR79+7/ZTBLpLSwzVpK1+yiImISgWhIqSeeuNRs+mXFnrxx9THXfeyxx0hNTeXiiy8mLy9PWSCKTkeJx2nQZm0cOnSIWbNmMW/ePH7/+98TGxuL3+8nNjYWp9P5X62AaIk6G1vKY6yToznZp2p03YZt21RWVvLwww8zcOBAxo8fT1paWvuxCkVnoMTjNDh06BA1NTU4nU4CgQDvvfce119/PYmJiac1aKWUmKbJhg0b6NmzJ7GxJ7c0Pg7bttm/fz9PPPEEhYWFXHXVVR06j0LRUdRqy8fQZmlYloVpmsyZM4d7772X1157jd69e3PnnXeSkJBw2gM2FAqxefNmfvCDH7Bz584OrZoIIejevTtTpkxh3759vPzyy5im+d8PVCjOEB2K8wiFQrS0tBAKhYDoG9npdKLrOsFgEMuyEK2NdjweDz6f74ze9NmmbTBblkVNTQ2PP/44gwcP5rLLLuPqq68mKSkJozXAqyPU1dUxffp08vLy8Hg6Vn6ubbrTr18/KisrWb9+PXPmzGHKlCmfaOqkUHxaOiQe69atY86cOSxatIiKigoKCgoYOXIk3bp1Y+nSpWzcuBGPx8OQIUO48sorue66686bN7Nt2wQCAWpqaqitrSUlJYVwOExDQwMej4du3bqduIryCZFSEg6HOXjwILNmzeK2224jJubTlb01DIPx48djGAaLFi3C5XIxceJEXC7XefPMFecnHRKPESNGMHz4cJ544gmeffZZfvWrXzF06FCEEFx55ZX87Gc/Iysrix/96Ed069btY88VCTRzeNsHlNZLTFsiNEFsej6Z3XNIMRppPLSTDaUNR2tGJnQnOyuD/OSTNPAh2jS6peYAFQdKKKvToo5H6SOjqAexkWZ0jxNXUjIx4vgScrZtEw6HMU2Tw4cPs2DBAlauXMkf//hH7rvvPgwj+qg+zYC0bZuDBw+yYMECAoEABQUFeL3eT3VOTdNwu90MGzYM0zSZOXMmaWlp9OvXTwmI4qzSIfE4thbjR78/2baPI9xcz84lM5m3aj2vvx8kfcAFfOGm27ksNptEbx0VW99i1rzVbHx9J85+/cmccB3XXhxLXrL3I4VnJVDD3jUf8u78hWzYs5WmmBxidA074iOnKJ3AzoP4BgxjxA1TGObT0MXRYrWhUIgVK1ZQUVFBTk4O48aNIz8/n5iYmDMWRxEOh9m5cyezZs1CSkl+fj5e70dFsGPExMQwbNgwhBA899xz3HrrrRQVFeH3+5WAKM4KHc5tOfYNeaxgnGzbx715fUnpXHTPbxne+1esq7a49I6buOWqAWQI0Mii4JJv8Luxxfxu2ZP4bvgWk6YMp3fs8eeILn3Wsfe96Tz7n1Wsr8tjzC0PctvlxSTqYJuVbJ33Mou211AXsGholOCLWgKRSITNmzeTnJzM/v37OXDgABkZGfTq1Yvi4uIzOvCOHDnC2rVr2bt3L36/n4yMDFyuM9MDXdM0kpKSGD16NI2NjcyZM4drr72W4uJi3O7WbmZSYtsW0jKxJdgS0DSEZqBpAiEtNGlj2RJLSiTRVo2apqFr0YQ9haKNc58Y1yYumoZIi8Pvd+MT4mg6epsg0WbZnDh1kLYkUrGO+Y+/xOq6fgz+4s3cOfkCYvW2N30q/a6+h8KhJVRJN1qcjiZEuyXw8MMPc8011zBmzBhiYmKIj49H07Qz/om9bds2FixYgGmaZGRktIeun8nr+P1+rrjiCqqrq1m6dCkOh4Pi4mJ0XUdKm0BdFWuf/z2L90eoCUqE4SKj3ziGj7+cobHl1K+fwb8XHaSmKYItHJA9lCGjLuSGIWl4NBWIpjjKuRcPoD066vBS5vxjM5tfT8LV+lMrEiISPMDmqgATOFr34lgkErNsE2tLK4jkZ1BYkEuMrkc/TQUg9Gjn0ewifEevhqZpxMfHM3HiRAoLC8nIyPjUPoiTYds2NTU1bN26le3bt6PrOj169Gj3o5xpnE4nU6dOZdasWSxfvhzLsujXrx+aEOhOFyk9BnBB1Vz+8GoN8cOHU5SdTopXoDvceLr1oFevKmb+cgWRQRfSZ0QWOUkeNDX1UXyELiIercQV0n/sML4wOIeY1jerHWkmEtyAuWwZnlOFQ0io2reH8sY6LKcDj/vUjsJjf+pwOMjMzOSmm27C4XCctcFsmiarVq1i6dKlNDU1kZSURO/evY9L1z9TCCHQdZ2kpCQmT57M9OnTWbJkCV6vlwsu6InLH0fRpGlkug/z7LYWisZN4tLRA8h1aUAiruLLuDLbTcnfdmP1G8uk8cMYkuo8qWgrPt+c9miRUhKJRDBNk2AwSCQSIRwOEwwG0TSNUChEOBwmFAoRCARoaWlpN811XW93Pp500HgzySsezIgxRSS0i0cjkUCEFe73cSKhbh2LXpzNjJmrqErJo/jGB/jphCTi4hLxebyEhMCWElvKEz4tLTv6cwHoWvQeNE3rcKzFJyUUCrFq1SpWr16Nbdv4/X7y8/PPmlhBVES6devGddddx6uvvspLL73EXXfdRWJiYjRGBQluDSEsrEATTZHWKYm0iITDRGzZ2mReKKtDcVJO+91r2zYLFy7kiSeeYOnSpTQ3N3PrrbcyatQo0tPTWbRoESUlJTgcDtasWcPll19O7969+Z//+R+mTZvGtGnTyM7OPnkilzh+1UYA8pjvhZQQSaPvZXeQc/X1tJRtY8bf36Fs1BSyh17LDSNX8syWDby7/ANGXzCcDKEd1wzF2vEaiw/H0JB6Edf1EnRWf6WNGzeyfft2mpubkVLicrkoLCw8K5bHsTgcDnJzc7nsssuYN28ef/jDH3jwwQejoiVN2P0i/3ztrzz9E6N95QlASotAXQ7XXQv2Wbs7xfnOaYuHEIKJEycyYcIEbNvGtu12qwI47mfHOgMnT56MrutomtZe30JaFrYVIRxsJhQMENp4hLKDFRxsycNjCByaxGppJLBrG5ubm8kLBKl3x5IR4yOtqZpqEaZg2lSy3QZuvYirvv0dav7wb/711wf52u47efinl5AuBGg6YtN/+Nn7ceT26cMPij7aJvDs0Bbe/tprr7Fy5UoCgQAQncb07NnzrFoebQghKCwsZOLEiSxfvpw1a9YwevRo0AwouJG7vzKeu6/uR2p7j1ybSHAZf5v8DKDyFxSn5rTfvZqm4XQ6cTqdn/ritm1RU7admT+eyiMbw9QFbV588B22bvwet952O5Pjt7Fp5i+57W8baQlbrHzoyzy/8BYm5jSQc2Amz5Zk4784gckjLsHjduLofgW3/66Aoj5P88RDP+LyGTamBAwnYtwP+P3dE7hxWCa6dvaHRFvd0dLSUkpKSqitrUVKicfjITU19axf/1h0Xae4uPj4pWehg+bCcHjx+vzEutreChYB3Dg1DYvzr/myovM4pw5TTTdIyivmzumbuc22sW2J0HSEpqNrYIgBDP/2y2z+hhWNPhVa1IqQNkL+L18t28XCv7zNdjmeGOHAicBw9GTkbQ8y/NafR2MVZHQZGKHhMPROm7+3haI///zzbN26FdM0EULg9/vJzs5ut746ixOmR7aEQBAzHME6NjFPgoyECUo7Om3s1LtUnE+cU/EQmobQNDTDgeMU+2iAcczG5opd7D94mPJGCIcsYi8ZQaFDpy3USjMMtE6YDvw3LMuioqKCefPmUVZWhmVZGIbRvtLS2eLRhm2GObJ1Nds2l1G/rZySpBjeH5iA0bOINFeQwOHNvL9sBRsaK/GXbWXD5nziyKNn6vmV3Kg4+5z7UXaaNO7fwPpl77F6H/iSuzP4uu+S5gBnF7OvQ6EQr732GpWVle0tExwOBykpKfTo0eOciYcZDrFn+VyWlBr0H5uOEGXsXruV9G5FdEtopmH3Ct7eEKD7+GKEOMiWDRuIiU1S4qE4gfOwGJDkuDvuoo2RGhoaeOihh5g7dy4HDx7ENE1cLhejR4/m17/+Nb169eoUh+kJSHmSqUhb4ylJ658TtqvVWsVHOQ/F4/zANE22bdtGSUkJlZWV1NfXEwgEyM3N5brrrjsrkawKRWeixOMs07ZcGwwGCYfDGIaBz+dTwqE471Hi0UnI1mLHCsVnhfPOYdrVsS0LKxIh0lzL5ue/yt/eNSlvak3yyxrGwEtu4IErctFEOUt+fx/Pra1mf72JrmnkDr+UyXf8iGty6ihf+Gt+/MwWDla2oOkaWs9xjJ3yRe6fXHiuf0WFAlCWxxnHDB1k7+rZPHrH35g/8Sc8/o1xFHbzoQlB6aoXmf3kc7xVfRUPvfFNhlkh6pf9k+/9rgTHiC9wz72TGRyfgMewsQINVFYu5cnbn6d5yCTGfvUaRnWPJdZjdEkHseLzh7I8zhTSBlnD7hWv8sRDjzGr+DvM+tV19I7342ptyRI/6UZi/AbaL//A7V+M58XHb6EgxofjgjxSe+SRHxuDxwECDd0dR0JCLD6HC+nxExcbQ6xbvVyKroNKXThTSAtqdnFg20ZWVyUx8IpJ5DrdeLTWwkZCYOixdO9+ARPG5WKvf423tgeoCgAyQqC5nuqqSqoqK6msrKSyqpLKyjqawiZWezcoFS6u6Dqoj7IzhoT6GuqqjnDA5WJg96wTcmgEAq/XT3pGGlK+y94DEQJekEdWsHDVQnbMi8PraEuNlwSbqjm81eDCC9XMUtH1UOJxppCAYeBwuvDYAQLBIBLvCbtYtkXo/9k77/g4qyt/P2+ZotFo1Ltsy5JcZbk33BsmgB0gGAg9CQtZCCUkIbuQTcImv5CFJJsEUiGUxRSbagzYGGxccO9NbrJcJEuWZPU6M2+5vz9mJMsFY8ty5T4fZH2Yt828mvt9zzn33HP8ASCKCJeCpgLpk7ju+kn89O7hpB0jHkv4540v03ieP4pEcjpIt6WzUDVI6Epi1xx60sCWdZuoMwysdrsIO0D1kRK2b9uPFj+WYT3dREe21moN79Sud63S5qdIZ0Vy8SHFo7NQVIjsSvdBY7h6fCr1n73K3xfvpbS6gUAgQCAQoOrgRtZ9Pp9PdqZw9Q9uYUyGjk81oKaO5vomGmyBZdmhtTC2gV1fQ60RpNG2CJoWQTNU2VwiuRiQbkunoQAeknJGct33I3ClLWb+rN/y2wU+HA4HAvALcEZ2YfK9dzBqehrlb/2Wt1asYMvaGtSy/UR5arl6yvWMTqyhafMs/vX+Qj4q2IkV8LPXEWDPxIncOTKDCKesYi658Mg8j05HABZBfzW7l37GlpImWszQq474rnTrM4hxPWOxAlXsX76QbeV+av0CRXcSnd6TnLxh9PE1Eji4gkVbK6lqDCIUHeK607VnLhN6xeN2SPGQXHikeJwjQmtaQgWOWlEUJVTDJLQDQtihXneCcKwjtE0Jd8ATQoQaM4WKu7b1rZEFiSUXA1I8JBJJh5ABU4lE0iGkeEgkkg4hxUMikXQIKR4SiaRDSPGQSCQdQoqHRCLpEFI8JBJJh5DiIZFIOoQUD4lE0iHkwrhzTiiBV4TTzL86s7x94yXlNKuHifaHnrwRVluzp9M9p0RyaqR4dDqhdSm2bWOYgi2v3s+ri4vYW6WCiCEjdyzT7r6epCXvIL57D7leD9GKwLIFZds/Y/HsP/LqehVdUxCWgRh8Kw/cPJVrB6SBqqKioB4z8mvI/2gm7789j8+LTCxb4HQ6mPLTV7l9ZBLevbOZ9c6HvLPyMMK20bwxaFMe4+93DSIzPuIC3SPJ5YBc29Lp2EAt9ZXL+d3UX/KmexL3PzaD6VdkEWXVUbp5AR/9+VleL8zle2/+i9tyo8nw7Oazv7zCP94rpenKO3j+rkFEOjXMYCPbZz3C65/pRF15H/c8ehX9VAX9GPPFxmhponb3F8x7cw4/ezeKpz/9IVemphHv0lDMZuprd7D89bnMe/kAff7+/5iRl0yi14muSvtD0nGk5dHJWGY9h3cs4o3Hfsi/Eh7lud/fyoSeScQ6dRQRT+Lksik2LQAAIABJREFUe+g16Bpu+uh5Vnkd2EYxn/72V7yw1MR91b/z9MMTSXVquHQF24wm8cE/ompP8Y95f+OXDRZ/+tlVZDod7dwOFUdEFL6YGHyp8TgG5JCXmEiMS0VVBDgiiPT5iPZG4lZdeGPiSfS60GW0S3KWyK9QJ2PXlVK2eRkfbbAYfPVEBqUnEudyoKoKqqajuz1407Lpe9/T3NPHR1L5KpavLKTW1YXhw/qRE+HAqamAgqq70N059B4wmG6eBopWLWX5fiO83P8kDakVG8tqpra6iqqqSqqqqqiqqqKysoa6hhaCF+B+SC5fpOXRyViN9dQcOkC+onBzRjouh/OU+4vyUg40NRLoEk1ifNxJ94mNSyA61qShYicFOw6xr6aaWs2JI7E7GQlRxHjCxYGaD1O5Zh4/vvN9Yj3OtieDGWii5lALzshBDOnEzyr5eiPFo5MJBPzU1dcgviKcIETox3a6cesaimkQCBoI3MfNhAgMI4BpgmI0ULPrA1786wK2636CXb/P/f82hclDknECeLuQPHYSL718K709Thzh2IjhL2DNzPd47697z82HlnwtkW5LJxMZl0xWv6H0jxWUFO6nqsVP8DgfwzZaCBzezPqSIE2JvRiQkUBUXTn7DhTRJAR228420ExJ8UFKazzExF/ByP7DuHXu+7zx9p+4qW4jtYcKKQ2Gp2FPEfqWUXFJZyPFo5NRY7qQOep6Hrt5AKXv/pmX317KlqJKGo0gQcMg2HCEit1f8ML8tRRWGZgx/Zl4zTjyoqvYuvBj3tl4CNMwCAaDBA2Tks1z+GTRHmpihjDtgduYMmUMeRFe3I5ceo+NISkBtKARmtb1t2AdqaHGFgRtsGwbYZuIlib8zY3UYmPagqAV+i3n2SRng5yq7WSEsBHBRloqtjDv3beY/cZ+XDkpxKb4cCgaREThTOlOWp8xfHd0Fzw6KM0HyV+7ggUL15J/qJaklCQMG9CcHAkGSInLZcz4sQwfnUOypqAKk2DhYmbt8NGrTzyRpevY9OmHzF2xh892RnDVPRO55safMCUngqiyJXzx+Ye89u5aNuwI0v1b19Fn3AwemZJNt7gINDldK+kgUjzOEcI2MfzFbPt4FXtrG6mzBULVICqZmOzBfHNAyjEtFCyjkZqiXRRs2sjOGjBsAZoT0gcyol8WuWlRaApYTZU07PyEJ78wGDXmKkZkutBKt7J3dyH7GwSmUNFdHjKvuI68FAeemm3s3L2HbUWNIUFyeiFzFNMGppDic0nxkHQYKR7nChGufm7boalVoH0VdDXcAPvo7gJsG/u4iuooKqoS2repZCvr5z7Hr19axJrqWHLTo5lwx38w4+pxDE7T26ZvFVULV2K3UdqqsIfdFEWF8PlU9SRp7BLJaSLF4xIi2FxPddkBCkvrwwIjiEvPJj0liWiPLoVAcl6R4nGJIcIWzVGO9nORSM4ncrblnCEITbWu5rXXPmf58mI6Q6dDLo/a7kcKR2fSKs5f+adq2+84MT/m9ct7ilwmiZ1TbMBECCsc+wi9Kgf7xYkVaKSxOUDQBN0VgcfrwXWyx6sVJOBvpr7ZQFEUXN5YPE4VTRUY/iZaWvwELBVVc+ON9eBsLZFg26Hj1cvjmS3FQ/K1R9gWIlhDwYJ/8vJH61i3M0B8/0lMuf9+vtPHg0NrDW4LhO2nbusi5s2exR+WHiQ+SqXft/7GvTdk0SWihC0fz2buR8tYdUBD13py+wuP8c2u8XgDfszmZizLQon0osXF4oFwe9FLk8tDAiWXJEIIhG1j2zZW+LcQdtgNaG/wt/b9tbEs69gf2z5rd1AIC7t6A7ujrud7//UK7z93F5N7N/LRF3sxrFYXJtw/OLiHFUvz2bC3H7+c+RZvv/qfJLz4f+woLeVAwT603tdyy18W8NZL/8kDo9fw1N0vs7m8nO2fLWFLRTXb9xeweclCNgQE9lm96wuPtDwkFwRhWfgriikp2MXOw43UxXWjX15v0mo2UEwGySnpZMS6ESJIoKGCPSuXsbXCIGi2G3KKihIRQ1yPoUwflIbaQXdAUXW0lClMT7YRooWqhkSystzcnNwVl662WR2gQABEpIpItrCbmrB1FWVgCgleF+nZU/CFfVJL78awa+5g+Eu7qLcaaWluwK5qJCk2isgIFw3NoLrO/j5eSKR4SC4AAru5mG2fLWTpp1soi4nCTi2lrNRPUv7fKOx9J5MmJpMRAwgLM1DL4V0bWV/YQkvQCp8jnDMTnUZGRA7XDkxtZ0aHg5hCYNuhHJdjUdoFnhUURQ35Do0H2Lh8OQuX76E5uieTejnaVW0LC0hUd3L7JFC082Ne+3MTB4Yko0+dQI+4WGLbi5eu44yJJX30YLq4U0kd0p0DppcWZxRJ0Q4yY5RL2mUBKR6S805oUDfuX8n60joqB9zKA3f2I9koYttHc/jN7gwmT8iga2L7EokKiqahaxq63m64KSpo2gkV0YQQiKYi9m1ezcfzNlEcNI/OnigqqhpPt/4jGPeN0eTFO1DaItgCRAQxdhm7dlbwHD3o9dBwkpwamhIa6gqRZHTrx4jRh9iysJC5f99Krx8PJmC3d0IEzQ0mFSUmI382jT5xUUSmjiItdAXU8NT6pSwcIMVDcr4JD+LmqgqavU7c3buRGu3CaSWRHrWHg8njSIyJJV63sayQVaC7okjq3pe+EcET3RZPLPHJUe0EIIzqIiImhW49euIOmm1xEUVRUVQfSSmxeI/59guIzGLI1G70HZxO8ryNzNtURq0QJLa3XBoL2bTpAFsqenHTw1dh9vuMuQveYn3fVCKivCQ6bFpKt7J3x1bWcwUz+sfgVjVAaRONywUpHpLziwIIBV9Gd7yb8inavJaCXkPIbFrOey+4yBvTgi/KYP/y7QQ1jbjRfcmO6kLe1XeSa588xKiqKqpy1GVQFAUikknrm8T03mNO4baEfocqy4twjgY4DYPImCii+vcmWVUJ7RIubO0vZ9+2/Wzck0DurVn0vfFKSpY9Q2VTgNqAjbbnE1ZtyacgYgTfnJCKl60sW5JEbr9EEhNcaNrlox5SPCTnGQUUgbvrBCYNMBFvv8/T3/k7Dd5u9Lz1J/yo3xoW/eO/+UAbwdjrvslNqgqKiqaBpmlfffrwNZSwX6Cp8FVHCduiYuFTPDV7CwWHmxBdhjBk8nX84PpsvEoApWwhv/v5OpJuvpWxwwcw/IoiSg/O4sc3vIbPpZE47lEeyU4luOxpnn3rXT7e2oIZ8TELX/SCksFVj/2SHi7HZWV1gExPP4cIwAJWM3NmC9269WTMmK4ylTyMEALbCBBobqLZb2KrTly+aCK1AM0NTRiKC7fHQ6RTOw/BAYHVUkddUxDDEqC7cXs8+NwOQKDYLdTVBNAivbhdOorpx9/cSIPfQlEU9MhYoiMciEA9TS0t+I3QWUOulIPI2GgiHBqXkdEBSMvjPHKZfXPOEkVR0JxuPE43nmO2ROCLO9/9ZBS0iBhOflkFNA/RCe3epTOCSGcEkcfv6okmxhN97t7mRYYUj3OOA5fLwuGQ+XiSywvptpxTbEI5B60z+tJlkVw+SMuj0zmaztzan7a9aLSlG1yItyaRdCJSPDoZ2zIJ1JdTuv1z1hUJ/IZAc8SR0TeP9NgI3EYjzuwsEhUlnHgkkVyaSLelkxDCRti1lO/Zzsr3F7Ikfw3+hB44bAWXM5b45DjsmnosLYYRjz3I1ChF9oqVXNJIy6OTsI1aijfOZf7bnzB/VwpX3PNb7pzai1hdQ1f9lOdvYO2iFez2Q20dEHWh37FEcnZI8egkrLoCNn66gM/WVRN984/49+sGEaUQti7cdB00meTMPEbX1dEYK2MekksfKR6dhFV+gIKDhziopXBDn55EKQrHeyXO2CSSY5JIRlYTk1z6SPE4Q1pDREcXWoVSoWsqDlNRWUFATSfC5TqpZaG0/XOi5WHbNqZpAqE07NNPxZZILgwyc+kMEEJgmiYFBQU8//zzHDlypG3A+3wxREX5TpiSPeb48D8nK4y7detWnn76aX7xi1/Q3Nx8Dj+FRNI5SPE4DVqtgoqKCt58802eeeYZEhMTSUhIaLMQnHlTmDp5HCMpZs6suexpCRAwDGzbxrZMbDOIKPqCXUte4c/rTlSP6OhoMjIyiI2NbRMp+0tWkUokFwNyqvYrsG2bhoYGVq1axcKFC/H5fNx+++1kZmYe61rYJqJuC8vee40nn/6CvZnf5qW/zKBPjAenbcLBRczZVsNm93ieva0/qsIxHeMgZNmUl5ezePFiYmJiGDVqFD6f78RaFRLJRYAUj5MghMCyLBoaGjh48CAff/wxwWCQSZMmMWLECBwOB6qqHjuohQ3YmFYlRdsW88qDf2e5Q0PVtdC2Pt/guuu/xQ8mdQ8VsVFObPVo2zY7duzgD3/4A5mZmdx7770kJyefeC2J5CJAisdxCCFobm7m4MGDrFu3jjVr1jBp0iTGjRtHYmLiOR/EpmnS1NSEw+Fg5cqVpKen07VrVzwejxQQyUWFnG0J0xpnOHToEJs2bWLPnj04HA4effRRMjIycLvdZ3yuhoYGfD4fmqad9sDXdR2v10tlZSXvvvsuw4cPx+v14vF4vvpgieQ80mHL42wMltN+grZ1lz/Zcce2BOzoU7m1NWBVVRVbtmwhPz8f27YZOHAgI0eOxO12n9G5hRA0Njaya9cu9uzZw9VXX01sbGyH3t+2bdvQdZ3Kykqio6Pp06cPuq5LC0RyUdAhy0MIccJMQOsX+nREpTU34lSDoLUh0PHioahquNakfYJ4tJbQP92h1TqLsnr1arZu3YphGPTq1YtBgwaRmJjYoViDZVmUlJTwyiuvkJSUhGEYZ3R8e3Jzc9m3bx9ffPEFMTExZGRkEBMTI8VDclHQIfHYvn07y5Yto6CgANu2cblcZGdnExsbS35+PjU1NaiqSnJyMt27d6eqqop9+/ZhWaGeG3l5eYwfP54ePXp86TXKd6xhxUezWH5YYKMgUOh37feZMqw3yfUb2LDiU+asrcAKNxfTBt7Id6YOJC/9qxeN2LZNMBjk8OHDvP/++wSDQbKzsxk4cCBdunTB5XJ1eIA2NzezZ88eFi1axBNPPIHL1fHOPoqikJKSwrXXXktLSwtlZWVUVlbSo0cPKSCSC06H8jxSU1MZNWoULpeLVatWkZ2dzfDhw8nLy2PAgAHs3r2byspKhgwZwoABAxg2bBg9evRg0aJFJCcnM3jwYOLj4095jaikdPIGD2CEr4zZs8txDx5Lz6wE4tzgjE0na+BAhvf1UjF3J6LPZEbnhUr4n2pItVpMFRUVzJs3jz/96U8kJCQwffp0rr76arKzs89KOAAOHTrEokWLqKmpoWvXrmctHpGRkfTt2xfTNHn11Vd5+eWXT+zMLpFcADpkeSQkJJCQkMCGDRtYvXo1/fv3Jy8vD1VVcbvdxMXFkZqaysCBA0lISCAYDLZZKLm5ueTm5uJ0Ok95jcj4FHoOHIazZjuidzqjR40lr0sMPt0GZyJpvfozormSNdpeug4aw6jeUSR6T/5xWgebYRisXbuWxYsXI4Tg9ttvp2fPnkRFRZ31dGirMBUWFvLRRx/hcDjIyso6azFqde+ysrKYMWMGADU1NbjdbiIiIjrcYlEiOVsu/tkWRYEIFw5FgG1hWYJQeT873OT41Ie3DuqSkhJmzpxJdXU1EydOZNSoUURHR3daDoVt2+zbt4/169dTX19PSkoKbre7Uwa3pmmkpKQQGxvLtm3buPHGGxk6dCg//OEPSU9Ply6M5IJw8YtHsBZl01PcPfZ/cOoqTk0lJB4WphWB6hzCD05yWKtomKbJJ598wrvvvsvEiRO5++67SUxMbEv06ixM02TNmjXMmzcPVVXJycnptMVtrdaH0+kkPT2dW2+9lX79+hEREYFhGOi6fsrP0tqw6HihVVobOIdfP7pZObqtdUvbbkr4P1mP9evOxS8erhiUIf/Fa3+5hZEZ0fh0DQULKOPAxs959pZ5OE5ymG3blJeX869//YuWlhYef/xxsrOzcTgc5+RJXVVVRX5+Pnv37iU6OppevXqh6517ezVNIy0tjXvuuYfS0lKefPJJxo0bx+TJk4mLi/vS4yzDj7+5ieagTWguSscTFYnDNlE0BVuYGC0tBCywBSiqhjMymginhma1EPT7aQpYoc5riori8hIV4cSlq1JAvsZc/OKBcuwT8XSPUhQSEhJ4+OGHiYyMDHdEP3dp3itXrmTdunUIIYiPj6dfv36dLh5AW3f31phHY2MjR44cwel04vF4jrFAzGA91cWH2bHkTT5bMo8vSqNwKBoKmUy57zaiN68iZkQ2HncdBTNfYfbmKgpKLLr2TmXaj/7OnRP7kl7+OR+99xrPvZdPZVE9EdndiJ/2n/zu7tEM6fb16VEiOZEOf7vbR/zb/z7TmYD2dTFOus22oaEZv21jhZPGFAHCsrD8fpoJ9xk9DlVVcTqdXxmYPVta09lXrlzJhg0bMAyDqKioc2J5tKKqKklJSTzzzDMcPnyYVatWUVBQwJQpU8KZsAIIUL57Li//6k1WHslg6L89xzt3DCcBC5UKFvzuv3n1iyJifFncctddPPL7Kxj93otM/LWTJ2b+hG9kxhOjK5BwLbf0HEC/wR/y/H0L6f2Pl7kjN4oYlwzUft0542+3bdsUFxeze/du1q1bx5EjR1iyZAnNzc14PB7y8/MpLi6mqamJzz77jG7dulFXV8fGjRuprq5m2bJleL1eunfvTnNzM3v37qVnz55t06StVJfsp2D5J6xZnk/L5h3Me9+DMmUaI3O6ENl0gAPbP+eT+YtY13CAps/exds4hm8MyiQ9xh1qYNypt+nktM7grFixgt27d+P3+0PtB3WdrKys81LQp6KigoKCAmJiYggEAmiqiq6D0rSZec+9yGct/Rlz33d4aEY/4lFQ0IBUJv3wLwwYv4RiZwq+SB1aFHA5UHqmk6ArqG3B6dAiQds+mURLvs6csXgIIaiurmbnzp1EREQwadIkqqur2bNnD9HR0RQVFTF48GBUVWX//v2YpklNTQ1VVVVMmzaNYDBIYWEhUVFR1NbWsmXLFrxeL5mZmcdcp7mmigMHSihUc7jrTlAO7qTs8Fjqu3ZBb6ji8KFyDgUTGX1TAlRsZ09RD4b3TCct2h168J4H9RBCEAgEmDt3Llu2bCEYDOLxeIiMjMTn852XadTc3FwyMzOpqamhvLycpMQEor1uxP6VrN1fh9Yrl5yePfCpejipJ3RjHA4HKcOvJCV8HsMP2C1Y5av58HWTHXEeXOE6irZZQ2n+LgqB3gDCRti0dZ+Xq36/npyxeKiqSl5eHrm5uce4KK0Dpf1r7b9Q7V0ZVVXRNA0hBBMnTgRO7ICemjucb/UezPVtKeoKmq6jaWD7hjC+ywDG3nK0sZKmaajhBWjn63sshGDHjh1s3bqVqqoqhBB4vd7zOn2q6zo+nw/DMKipqcHlciFsi7rCnRxuakD3RuKN9JzmPVFAWJiGgWEYaJoKCCzDxDCssBtpQs1GFsxfxeZ9FSiZAxk6ZjKTe395wFZyeXLG4tFqlp9rTlXHU9U0uMA1PlungmfPnt1mYQH4fD4yMzPP65O4NTickJAAwsY2mtF1FygqwhZgt7a8bP/+bWgT+bCFpHvQ0sdx4z23MyLNR6QWet0yisn/9EMaP/4sZLfUB1Hj4ok3qzlYtI8tSzIY0vsKYs7bJ5ZcDFwCsy0XH62xjpKSElavXk1lZSWWZaHrOvHx8W3icUFMeUVB1V14R93ClX238/buTWze2p9xOX1J0vU2b05YFnbhJ6xrTENNHsDg1vluITghIeToyUHRIGkAo7sNYlTtarbk+6m0u3G++9pLLjwyZN4BbNumtraWWbNmcejQIYLBIBByx+Li4s675XEsCqg6Svwwvv39Oxjt3sXCf/6V381cTYnfjz/8Y26dya8XHmFXnZMcn4FtBKC5GWX3QQ6bJi02mJaNbRnYDXW0VFZQpAoMIOB0s//jX/M///kzfvbqYlbVN+Dg5EWfJZcvspJYBzAMg8LCQq655hrKysrw+/1AyNW6/vrree6550hJSfmKs5xrBLbZREPtRub/dSYz/7WQHS6NVmfPPeVRfnXPtUzp4+DgoteZ9dxfeTO/iZIaSOyazLWPv8G9U/uSWTqb9994gaff2cWRqgARKalETv8Vz93ZnyHpfrYv3MbBSgcDHr2FgYBsGPH1QYpHBzAMg0OHDvHMM8+wefNm9u3bh23baJrGtGnT+Otf/3pWq2k7j9AaICMYpKUlSNAw27a43BFERLhRsTEDfoxgAMMCU4DmcKG7PDhUgSYC2GYQf9DGsAQCBaFqOHQVh6ZQkr+DI7V1dJ06lQykKft1QopHBzk+Ga64uJj6+nri4+NJSUm5yFa7inAoo12ubruYTOval9b1K6HXQ9uUthS80Oe1gi2s/eOV/Pb9g2wthV7fuJe7H3ycOwaefplGyeWBFI8OcKpM2qNV0gglVp10wCrhSmgnbru48yUEtmlgW0EsS2DaoXUwDocDh+NkK4wklzNSPDpAsKmGyqLt7K04WiZRjUmnS3oa3eIjQLGxzSbKdm6jqNYkGK7YGBmfRlq3bJLdQZrLdrHtYD2GFZ4ujUoiJb0LPZK9sgm25JJATtWeAaZRQ0XBHjYvW8ma3csp9yejhJs3VatRdE3vw5RRI+h/RTdiglXsXTSLBes2sWCLgZ7WhTHX38S0a3NISmikYfcCPpi/gQ2f7SeQ1JWUsdOYNtVHz2Tvhf6YEslpIS2P00IAzRRv+ogP/u8DFuRHM/CRR/jlNb3aOr8dXP0qb70wh9WVXRn50L/zbxN74LODaGt+x3f/HiBp6jT+7fbhdFcVNAXAAFbw3A2zqZ9yC5NumcDweAVdlXaH5NLgYorqXaQIEBbU72LD/E/4dFsA3zV38fCV2aiK0lYkIH3QdK67fiT93Jt55/mPWFNlEwy7JMR78UQ6cVsWlmlhmmb4xwpVoZf6LbkEkW7L6SBsKNvN3uJSyiOyGdKvD1GqSnsjQdM8dM3MpGemh7eWr2PtXsGoASKUeVmxjs9f38GhZXF4VCV8nAmUsf1AkNwL8qEkkrNDisfpIAQ0N9EcDGA4nUR+Sfc2l8uNO0LDsuqobzxa9k+J6kKP3H5cOSKT2DbxMIAdWJs3Enm+PodE0olI8TgdFBXik0j0+ogsbqT8yBEQyces/BdCUF9XS3VlAJcziy5pCuF1ZSiRaWT2G87YyXkktcU8goCL/Of20HBRT89KJCdHxjy+kvBisLRB9O6dSapRxOaV6ygNV25vjVZYVhUFO7aztaCJ2H5jmJyt4tRak7C+5NQi9I+MeEguRaR4nA6KAloGo264hVumptMw7898+3crCPhb8Le00NLSQv67T/PKzFUUpd/Nb/8wg54OELaNP2gR2FVEWXEZFUYQ27KxbYERNPHvLaSwvp6agB/LDIbaa0olkVwiyKnaMyCUFdrAoS2f8sbPHuMvW4IIQpaFa9T3eODf7uLRK7NRlSAt9buY/YPbeW51DRUtIFDoc+Xd3PnD/+bmrmUUzHqEO5/dSFWjgS3ANfBb3Pzd+/mfGX1lWwPJJYEUjzMidKssy8IwDMzwQjMB6OEU7VBJvpDVYRgGRtBo20fT9bZ9TCMYaoIddn308DZN08+oWbdEcqGQ4iGRSDqEjHlIJJIOIcVDIpF0CCkeEomkQ0jxkEgkHUKKh0Qi6RBSPCQSSYeQ4iGRSDqEFA+JRNIhpHhIJJIOIZfknweEbWO3VVsP1R5ra8jdWjFdiNDaGVqrs4e2QWi7+iUNvFt75raeG0BVWtsntNYUCbdeQEFRlXBvWoFyzPWU0PUUpa20okRyKqR4nAcaynZTVHqEqiYB6DjcsXTpnYOn8hBqagqRERE4EATqyzlyqIAD1WAJQnVEYruRk5FIWoy7reTh8ecuLq2gsjF0bt0ZQ9e+PfBUHoJEH0b1YSrLq6n2h9fXOCNI7DGUrj6BWn+AgyUVlNcFsQQoDg9qYjZDukUT4dDk4jzJKZHicY4QtokRLGPHwg2sXjGX7VVNNKoxuHHh8iTRc1A2FXM/J+fHDzFuQDJKYSFrly1j3a71VPvj0FQFYZvUuOMY2HMY48aOoGduBvGqgqrYGIEydn6+gdXL57K9soFGNRYXTlwRyfQcmkPFB5+T9dBtJFftYPfCBcxdU8LOI25GTR/BN+8ZSFIvB2rpFlYs+JQ5c7dy+LBB/MRJ9Ljybvpn+PA4L/QdlFzsSPE4J5gY/jK2ffxHnnlmG/oVN3DT/dOYOCCdKCVIc9V+Vr76AlvrK3GXVbK7YTkb56xgRVU2w7/3NE9O6EaEQ8UyWji04llmvvIGf926h9F338rtI9KJsqrZ/vGz/P6ZzTBkGjfe902uHNKVKCVIS+1BVr7yPNvrK3FVehg+8V4m9MnBE/0Jf96UxQ+fuocrvI5QsCvvBm7P6Umq/TaLPmlk8GO/5NZeJy+xKJEcjxSPzkbYYNTiL13O68+8xe6ej/PEndOZkpeKR1FQFBeRcb2Y+IOnGDhuBcVaLQv/8i7LyrrQ55YbuH9CNxyaGoo96E66jL2P6WUNHHhtGe+86KN/5gyGBJcz63/fYlfOj/jJndczdWAaXkUBnERE5zD+gafoP3YFFUndSHSroAjwutCSo/HZFqZhtDlApmVhCYF9Ie+Z5JJEikdnI2xoqSO4dx2Ly23SZgwkLSGBCFU9GoRUFRwuN0lDJhG54R+8WFxGU+xQevfsTpxDaxvYiqqjqHF0zepBqm8ZqwrXsXX3ZPpbq1laZpE6fSBpyUm4FbWtsyyKgsPpJGnIRJLC5/EDNJdQum4zT//HahLdR//sZrCK4k3l2K48hggBol1wV1FQFfUib4EpuVBI8eh0BMHmJsr37qTStsmO8uLwA2wXAAAd0ElEQVR0nOI2NzdSbxhYLicRbtdJd3G53DhdNoZZR01lE+WVO6g0Tbp4I3E6HF8d2FQUcMbg65LOuG+MJtPjaBMow3+Qzf417N0nUIxajKKF/Omp99lW00jcmNu44erJjOsRLYsTSU5AikcnI1DQdAe+mPjQC5bVNvV6dDJVIOzQ1CzxSWR4IyltbKSyphZLJKMp4XkVIRDY1NVV0dio44nsRnqaE5+ZAIqCsKxw3VPt2Pdg2whho7S3Ghw+otJzGXPllfSJdLYl+ARb8tF2llC7rx5sHdVIZdh372GIfytrFlVQtv0gdT36E3M+bp7kkkImiXUyiqKixaUTM+m7PNBPZ/OHH7B13wHqxdFq60IILKMFY9UfeKMogajUNKIbD7Jly05KTRvLDhV3E8JCWIcpyM9nX10UKQPGMnJAF6Kn3Mv381xsn/cRmwsKqbfD+Rqt5zaDGKv/xGvL97Klol2JdyFOWso9dKwCzki0bgMZMWgww7vEMmDcYLr3zsZ3nu6d5NJCikdno6igReFJHMZDf3iCMVVv8bvHn+NvH2ymLOAn4PcTrCmhefGvGDu/B30zB/Dof97L9DybHW/9lYf/uQ4zGMAf8BMIGqx/6TH+MbsY57Dv8vNfTCc7woc7figPPP2fjKl7nz///Dmee3cjpX4/AX+AYN1hjMU/Z9InmXRN8NI3JohtBlGqajD2FFGMwLDBsmxsy0BUVVBTW8khVcFAodkwWPPMOK676cc88OI8Vh8uB5DtISQnIGuYnjMEtm0hxHpm3v80Mz9Zz24rNKehxmYQdcNTLPrJaBK9oZiFbVZS8Pks3vj973l1t8AUgOqA8T/kyfuu566RGTg0tTUJNHzuDbzx8O+Y+dFadpgWAlB9yXhueJpFPxlNSuQRVvz917z85nwWHhJYQsWbmME3n17MIyM0HGuf5g//ep+3VpVjWKAkdMdz3W/4/NGhpMXUsPxvC6hKz6LXtybSB9BO9XElXzukeJxTbEBgGCZG0Aw1tQYUVcXhcKA7nOFUdbAtE9sysC0L027NMNVA1XHoKg5NRWvfHLf9uQ0T2wq5Loqi4nSGKrkLy8Q2DSw75ArZqKi6A1V3ogkTFRPbsjAsgWWH3J3mmkNUNYcaeJftO4S3W1dyBuQShzRTJcciA6bnlNBwczg0dP3YlM3jpz9VTUfVdBACx9G9TtGG4avPregOVF1Hbxf2oDUYiw7oaA4R2m5bNFUUs+/dR/nzMoWaFhh444+5aVBPEjry0SWXPdLyOA+0LXSj3YK4iw1hY1smwjIwBVg2aJqOrutomnRYJCcixeM8YNuVFBY2A16ys2NR1YtRPSSSM0O6LecByyph8+ZyoAtZWTHIfnCXDq05M0KI0HQ2CqqqHvMAEK3lFGzRNmWuKuF9RGvgnHCJhdDrl8MDRIrHecC2BaZpoyitdTckFwPt/xZfloJvBRqoWjuTfy0qorIhjrwpUxk3dgA5vqOunBA29r5FvDZvDVv3V5PQawSjrprBuEwQdiVrZ/6TxXtqOeLPov/EsUy+uh8ZaCjChpoaiI4GXW8Xj7o0kAF0ydcQgRDNVFQUsXTpTizrZKIuIFhNc9lq3tnTlb6DxzMkdj+r1y/n082Hju6DgW1tZ87/fkRBeTRZw/qQWFvK+hcWsK2xnsOL3qMgYSi9x0ylp3sTK+c+zwvvbOBwdRWHlixmi6axee5cNhcVUS64pBYoSstDctEgbDv0Q+vskIIS/j9VVVFUNeQihCunCXFc8pqitKXkn7zyWvgYYSNEgMbGWoqL6zDNHIC2JuVtVogeiTtpEFdP85LoU7HidnNopw/sdgFk20KU5bOyLo0+k65gyqR4aj5fy4ZVB6lzTSZ74LVcFZWOV4dAtzqs51ez84tN5I9wUbu2hJ4jriAlqoXNDSaOJkj0npt7ey6Q4iG5aLAMk5K5f+eVVz9iiZFCl2tu5sahMSTseoc3PA/x2+u6EemoYPnff8Prc5ayuiI0K9SKqjlQxj3IE3dfy42DU3Bo7dRDCAQh4TEtC8sKYhgGpmlgGAa2sNE1DU3X0MLlH1Gd6BHxdHPZmFYpn9fmMrpfOrn9201eqzpKwgAG+F5ixeYooqMzicCgpHt/7tCduJO6EomCbVs4snqSmVJK4wEHTpeH7nEHmbu+lMFaOmnxXlI8l5YrIGdbzgOBwGbee68MRenCjBm90XU59XksAsxmgvtn89BtO+jznW8x8QoH9bsKWLYwn2qjlB6P/4W7erhxYeBvagil4luEMnHDKLoD1RlJhNuFx6nh1NVjriFEKYt//wQvvPcFqw5bmKaFYdg4HHpINK58nN/fP51vDU49epTRCCXv8Mjdz/HZ3jJ8Ux/k+/d+j++OSia8IgjTCOIvnM3vfvY87+9LZ+ht3+VnD4wnM8IVsmaEwBY2VvkyFm1qokLtz61TUkNChoaqgKapaKoaDsleGkjLQ3LhEQIz0ML+pfNpuPsR+k/JpVd3D0p0A4eP7OC/t1zJPZk6uqaAVcGqfz7Bi28tYvnh48RDc6BOfoz/9/0buG142nEXUVCUdCb95BUm/kQgRD0HDhSxcmUdN900El3XUFXlhMCp4vBC5t38cdHtlH7yK377cSU78gsoH5VMcujNo2BhHXYy7LGH0d9awNp3X+AJZySvPDAalxJyu4ThJ38n+GKTGDgsDV3TQCOcEHiqZMCLFykekouAUKzCEeFBqa4n0OLH8FvUHTpM6ZF64nskkWzbNJXVovoSGPXw84x50MIW4TT+1rOEs3RVVfvyqdC2GY3QNVunXRXleOEIBVTscHV627JJGD2JUfuLsJw6WmtsRgSxi9/i5/9Xy5AZ47nr58OY+ul81q34mPdLRzEjzcKoK2XP4pfY6BhLty598AZaqDPd+KIcbWuVLkWkeEguPAporgjSx3yL7GcWs+XTSppTGqneVkVZaTdunl7I8pUqR5ZVkHX3BPp3TyRe+7LowOk+xXXcbg9JSeLkWb8C7GATdYcL2FZUH5qRqdpGdVIOmTkpOA7vZ3eFRUzPrsToiSQ3bGXv9vVojjioaCIYm0qs0kxlwQZWvPlb3qwfw8hBTWQd+pTPCyMIqsO4blICmnZpTc+2R4qH5CJAAc2Nln4t999ssmDBKlbsUokaOJEp382jj38F//fCu/CNR7kqLoY49WxLIyooiofk5O5t4nGC3ChgtdRQuW0+b358ENOyIXcat1w5hAldm9i3YROfL22k3wM5DE+9int+VM7rn2xm8ewmonOGMmz6DMZHN7N78RusqEonxr+PPcsPULAyjq55Y5h6awKqeum5Ku2RAdPzQCCwmfffLwO6MGNGH3T9UoqpSyQnR1oe54FQOrLKpf2ckUiORYrHeUBR0hk0KBbwykrkkssG6bacB0L9ZI8G5qSASC4HpOXR2bRmMobToG0h2nrMinDetaKEqomFXBmJ5NJEikcnI4TAtiwCDZWs/duNPDW/gcP1CpDGwKtmcPXUISTv+ALX/f/OMJcTJzISIrk0keLRaYTMCtsuY/+GD/njLX9gbs/v8b9/voFhXWPxUMeez97k7V8+w1JjLA9dKxiUBU6ZqS65RJExj07DBruKnZ/P5p//8xLvxTzI+8/fTN/oCForjArbpqVoJwfXfsaWkQ9zQ1cHEZq0PCSXJtLy6CxsG6oKOLRzCxuO+BhyywQynU4i2tf/VBW8mX3I7daHXFWFSzxJSPL1RkbsOgkhLIzKMqoOF3PY7aJ71y4nFg5WVBTNgaLrKKomhUNySSMtjzNEhBdKtbS0UFhYSI8ePYiIiEBBIRgM0uJvBhER6kMrjtfm49o9tpuytW2bmpoaSkpKAOjXr99JFmtJJBcPUjzOACEEfr+foqIi1q5dS1lZGcnJybjdbhRFJTI1h8zeA+i+dgt783dTN7oXUWhHO60JAS1VNFcdZJs6iEEpGo5wzMO2bYqKipg/fz5CCPr06YOuyz+P5OJFe/LJJ5+80G/iYse2bSzLori4mC+++IJVq1ahKApTpkwhLS0NhyPcpskTg9frwlu7m0/mrKRUT6RLlxgidBUsC7PmILu3r2HWxkpi03PpGqPSfpmL0+kkISGBlJQUSkpKUFUVt9stRURyUSJnW05BqE6moKWlhRUrVpCfn4+qquTm5jJkyBBiYmJOcCssfzVVB9exaN5c3nyxAO/QTHxRbpyKgoiKJzKzPwMHDOOGwSm4TlJRLBgMsn//fp544gkmT57MddddR2pqqnRhJBcdUjy+BNu2MQyDAwcO8N5776HrOv369SM3N5eUlBR0XT9phqiwbWw7gBGooGD5Tg5bNiahtHThTSQ+I5vBXaNRFeW43rMhLMuitraWJUuWkJmZSVxcHPHx8Xi9XpmRKrmokOJxHK0B0ZqaGubPn8+KFSuYPHkyAwcOJDU1lcjIyNO2AFotlzO1GoQQGIbBnj17ePbZZ+nbty833HADXbp0kRaI5KJBOtNhWgd6Y2Mja9as4b333iMzM5Of/vSnpKSk4HKFi9me5sC1bRu/38++fftIS0sjNjb2tI9VFAWHw0H37t0ZN24cGRkZxMTEYFkWmqZJ8ZBcFHTI8rDto01yWp+s7Wn/tG39aR2cx3fp+tInadsCs6P9ORSUcA1KEZrlDNeYbHfGUO2MM3zKt1obBQUFfPDBBxQXF3PbbbcxePBgXC5Xh572TU1NvPLKKxw6dIhbb72Vfv36nbHbYVkWpmmybds2Fi5ciNvt5sEHH5QCIrkoOGPLQwgRymdoacE0TWzbRlEUdF1HCIFlWQgh0DQNp9NJRERE27bm5mYCgUDbdrfb3TY4T7yOjWUECbQ00WLYWAJUVUN3eXA7HThVEyPQQmOLiSUEKCrobiIjXES69NMaXK3uQX19PR9++CHr169nwIAB3HvvvcTExJyRpdEe27Zpbm5mzpw53HzzzcTFxZ3xOSDUhMjpdOL1eomIiCAQCFBbW0t0dDSapskYiOSC0iG3Zc2aNcyePZslS5ZQW1tLRkYGI0aMoLy8nD179lBWVobX6+X666/nscceIykpCYBZs2bx+uuvc+TIEUaMGMEdd9zBhAkTTn4RRaFq33Y++J8HeXHDEQ6U28SkJTD27v/i9humM1zdxto5f+Q/Xt1C1cFa9NRUvBPu49Hbr+X2EceX3T8W27YxTZO6ujoKCwt56623SEtL47777mvLr+jowLRtm+rqapYuXcqePXtIS0sjKiqqQyLUekyPHj3IysqirKyM1atXoygKkyZNCueXSAtEcoEQHcS2bfHCCy+I8ePHixUrVohgMCgMwxDz588XkydPFo888og4dOiQsCxL2LYtLMsSgUBAvPTSS+Kdd94RJSUlbdtOcRURrCsX9R88LPLyHhV/XJgvSmxbWEIIW9jCCFSKygNvicfSrxZ/nLtDFDTYwrSFOOUZbVvU1NSI1atXi2effVbcf//9YtmyZaK2tvY03s9XEwgExKZNm8S1114rMjIyxIYNG0QwGDzr89q2LTZu3Cgeeugh8fjjj4uKigphWdZZnVMiORs6HDBtfeKJ42IY48ePZ+nSpVRXV1NQUEBSUlLbGg+/3098fDyZmZmkpKScRiwhFOMQCET3JKLdOg7DwAhtwTJMTNPCsm1sEd7/5ALZ5jbt37+fLVu2UFRURFpaGr/5zW/wer2d5gY0Njayc+dOVq1aRbdu3YiMjOyU8yqKQm5uLr/85S8JBoMsWbKE7t27k5OTQ3R0tLRAJOedTp1tUVUVXdeZNGkS7777LvPnz6d///5ER0ejqio7d+4kKSmJ5OTkMwhChjtuVW3hi7kG1ZvjcIe32FYzLXV72e43iP+SuG+rcBQXF7N+/Xp27dpFTEwM06ZNOyfrR/bv38+HH36IYRhkZmZ+aUynIzidTmJiYjhy5AgffvghI0eOJD4+Hp/PJ8VDct7p9KlaTdMYNGgQmzdvZsOGDaxatYqpU6eiKAqFhYUMHz6chISEM/iyK6HVqMIg0NJMS0sENq2WRzMtTX4s9cvbbtm2zcqVK9myZQsAY8aMYcCAAW1xiM4adK1TswUFBaxcuRJd1+nduzdud0jqOus6mqaRkJDAQw89hMfjobCwEL/fT48ePb50FkbYNrZl0VJ9iL0r32T+ThHutBZPj+EjyY5z42kpg+wE6j+Zw7JSQVPQRtV0MgZOYOiIUfR2lVK+9RPe+OIwwaAJqo6aOYyRw4cwsVf8SRPeJJc3nSoerYMxPj6eYcOGsWvXLt555x3Gjx9PQUEBsbGxeDyeMx9IigLJI/nG7TfyzRHd8RESDzNYRd3hRTS/9jKeU5xSVVX69OlDr169SE1NPXGpfCdg2za7d+9m5cqV1NbW4vV6ycnJOSdBTV3XGTJkCPv37+fzzz8nJyeH5OTkk6bLg0DYlRxYv4L5r3zGFw1+el8xiDhVQwfK1r7H2m0HaIrswoQf3kovr4/oI/P5x+wmsq8axbdGReBQBTYKujuCuOhy5vx6Kc4rv0FeTgQuh4YlBLLAwNePc5Yk1q9fP/r378+rr77K3Llz2bdvHzfddBPx8fFnPphCTUGPXc7eukm0bj/5oaqqMmzYMBRFOafTm6ZpsnbtWubPn08gECAmJoYePXq0WR6djaIoJCcnc/PNN6MoCkeOHKGmpoasrKx299cGUcveFXN4c+ZCllT1584ffZvpQzPwqioqAWoO7GZn4lL21oHqyaL/9Ey6e8t4aafGqGuu55oxeWQ4FRSRTMrgadze08v+P+0nctQ1XDtlBP0SnHxp50fJZU2HxEOEk6raB0tbYwut1ofP56N///506dKFZ555hjFjxuDxeHC5XCccA5zoQrQlidkhhSg8TGWTn0Zb4FVARUAwiFVeRpGwiWt7T8e6MIqi4HQ6Odfs37+f7du3U1FRgWmaWJZFt27dcDqd5yQeoSgKXq+XvLw8lixZwocffojP5+NnP/vZ0WsKG2p2sG35ClYVKiTfcgPXD8sk1q2H7QQnyT0GEZ/anaEtLQR9TjSHjao7INqDy+XAIQSIcFNnVEBFVVQ0VcGhKehq+PvQgTR8yaVNh5LEFi9ezBtvvMGSJUuor6/nwQcfZMyYMfziF78gLi6uLXCal5fHTTfdxJNPPsmVV16Jz+c75lxFRUW8/fbbzJkzh9/85jcMHTq0za0RwqZsx1ref+oBXthQRekRm+ceXMim7/ySO2d8kyvU9ax+9w/85MUNlDU3s/qn32bmhO/z2N3f5K4rMs7rl1gIwfLly1mxYgXNzc3ouk5MTAxut/ucJ3Kpqtq27kYIgWmaCCFCIm1bULqP4sMlHPFmc0XvHrhV9RgHQ1FUdG8sXm8MiqKGyikKGwre4M8Pv8RrPjcuXYVwtq/pb6KyOJFvC4EQFsIG07SxbIGu6+j66SXoSS59zjg9XQhBIBCgpaUFy7KwbfuYbFK1XT8SEc7g9Pv9OJ1OHA7HMfGG1m2maeLxeHA4HEfT2W0LywgS9LeEM0wFqqqjuSJwO1ScioVpBGjym5iWAFUD3UWk20mESz+jFPWO0mqB1dTU8POf/5zXX3+dpqYmoqOjGTduHC+++CLx8fHn5X2YpklRUREbNmxg+vTpIXfJClK19H959l9v8FHzGGY89lceHaEQ4Wh/b9q7gwrYBvWLfs2V/9C46sbJ3DqxB/GtRUeEHyOwkj9MeI24x37CdRMF++a8znPPL6Q0KZsRD77Aczd1w+uSJeG/Dpyx5dHqBrQVwGn3+vFma+sCr9ZiNsc/kXRdJzIy8pjjjx6rojlduB0uXO2/3EqohZKi6Dh1F7q7vfYpKGe4tuVsMU2TBQsWsGPHDgzDQFVVfD4fAwcOPOEenSta73NWVhZZWVltr6GqJKR2JT4xFWW/RSAQwLJdHJMPIwRYQWzbwlTdOBXCqf4RuCOjiY6NJT7cH0LYfgJNXtyaigYo9GLCvb/lih//An/hel56ZhWlN6TTzaXhOuFdSi43OhTzOBNT/FR+8Cl9ZEVBCdfB+JIdQIEL+YwT4UJBH3/8Mdu2bSMYDOJ0OomNjSUnJ+eczOqcihPupaJCrylMnHiQfcXLWDDzVcZn38iwNB+usAhjNFG/fw3bD1awN+UWvpNrICwL/EEsy8ZWNFA0FGwURYAZJChsTCEwY+NwOhrx79vN4eIyYm66nQynAwetCxkllzNySf5ZIIRgzZo17Nu3j+bmZoQQbZZHr169Lnz5QEUFLYm+E67n24EgNf98k5/cu5+HH5tCmkMLDfK6QtYdcVCfMJT/6F5FydbtFOQfpGFrPdvXJ7ChVyzDunUhQW2g+fBWNq1axsamI6Ttyyd9Vyq1TWvYtfg1Zu+IhN5J3DD+m6Q5nPKL9TVA/o07iAivIJ41axaFhYUYhtH2utPppHv37ufd8jiR0LNf9fVi6A3/zlN5g/jod++x7M3X2xLtyB7PhEmTeHhoPP7K3eQveIM5hSoDrohCK17DplUZxEd3JS6ihvLti3ltUQ2pE3Lg8GqWLI3EOXk8t/38Gq46WMAXLyzhEBbxyC/W1wFZSayDtK6Vuf3221m7di01NTUYhoHP52PChAnMnj37sl42b1sG1QVfsD1/F7srwFLceOJ7MvW6ESSGXRfJ5Y18QJwFzv/f3p3FRlXFcRz/nnNnaadjF2gL3aBYtooFlULasDXFYNCgCcEIRsCogRAN+iRPmmDCAy/GmBiUN4MhgEhAiKFaiRYiQgCDC6CEmkBZSp1paWe6zdxzfLhTVIwmMxEd8P/JfZlkMsncTP4587+/8z+BAOvXr6e9vZ1IJEI0GsVaS11d3V0/sEdpB+smGByI0xeHnIIw4+obKfY58qP6n5CVR8bsyOW9spa+WIyhwUHC4TChUOjmI9A/3mA1cuFlJ2793L9rEguRPaR4ZMIarPEyLq6xuMZilQYU2tH4HY1OZVWsm8S1YIwFrVHay6BoZdAYkq7FNcZLbyovI+NztGw0E1lPVpjpGInMG5eB7it8u20Nb7dBJJ4ag1gzj/mPLuPVRyaCdrHmKm1vbWTnsUtc6DHgOIytbWTR86+xYsowXYc2s2nHac51xLBao6rqqVu8ks1Lp8hGM5H1ZOWRBmuSGPcy7ccPsnXDLg7MXM3WVQ9RURTCGpeOk7toPXCY79QyXnlvJbMdg+n5hc5j29m05SzXyup56fWlNJSWURg0uLEurnQeZeeGPVwbVUf9uqdZUFNMWUHwXw26CZEJWXmkwbgRzrbsYNu7H9FSvYb3Nz5JbShAOOCAm2B85SpG5ecSe3MLLzzn8OGWp5hWWsWY0tGEasZRXDmJqSWjyPe7GAMqVExJ6WgKg7n05xUxZmwp5YW3fxOfEP+Eu/M54m2S7PqRc6dOcaIjxMxFTcwIB8n1eRvNlPbhBMupqJ7B7OmF3PhyN60/DdI7BN7hEEmGh+L09nQTiUaJRqNEIhG6b/QRH06SkPWfuMPIyiMNNhrh+vVOOoIBFlSW42jNzb6mUigc8sL5lI4pIpn4mvaLSYZqIYiCzqMc2reHM3vD5PzudOvEYB/dl0I0rGyk+b/5WkJkRIpHOnw+/D4/AWMYHB4GQn96i+u6JIYTKBUiJwha480XKW9i8ctzeePFeVQFfrvtQ7Gv+GDtNi6P7DUR4g4hf1vSoEsqGTdhApP1AD98f46epEvSGMA7pMq6/fREr3Lh5wiB0iYemBggd6SFkZp2prRGpcYWaJXZoVJCZAMpHmnw5VczrWEuD88qoKNlB+8cuUh3f8ILgZkkvZeOc7KtlSMXy1i47hnmVuUQ9oOyQN8Aib4B+m95uGX748STCQb5y0mKQmQleVSbBmtc7MA1rpw/wf59h/n8fC/3T6oiJ+jHYumJ9zCczGPylIU0r6hnvOrlwqd7OdLWyvbPrtJXWM1jqx9nUfNSGsuSxM58zJ5PWti98zSxonupXfIE8+bMZ/mscnwSEhNZTnoeaVDaQeVVUDG9hGerZzDni4N802WJJ7xJZgU1s6i5bzrNU4vxaYtJKPy5eYyubWL5BAvaxz2F+QS1wRgX7Q9RVN3AkrUPYpUDhfnkBZxUGlWKh8husvLIgLVeytRa76Q6OxJPVxqtFY5WaFJ9EONiLN6JdkqhUn0OjUXhDQ52jcWmpqR5vRAl8XSR9aR4CCEyIg1TIURGpHgIITIixUMIkREpHkKIjEjxEEJkRIqHECIjUjyEEBn5FeIDuUm1BkCQAAAAAElFTkSuQmCC)
chemistry-General
chemistry-
The two structures given below are :
![](data:image/png;base64,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)
The two structures given below are :
![](data:image/png;base64,iVBORw0KGgoAAAANSUhEUgAAAMgAAABbCAYAAAA2qspzAAAIrklEQVR4nO3dTWwS6xoH8D83d0GNRpaNK0yqGRMTaXJipr3RDhsDunDcGLqbboquDl05Lm7oTUymO3DV9GywK8xJFDandGEyfl3BuICFCcaP0K7AFXQjJC6euzhOr23pyxRmYKTPL2HD0HlfKH/ehwnzjI+ICIyxrv4x6gkw5mUcEMYEOCCMCXBAGBPggDAmwAFhTIADwpgAB4QxAQ4IYwIcEMYEOCCMCXBAGBPggDAmwAFhTOCXCMijR49GPQV2TPl+hfNBfD4ffoFpsjH0S6wgjI0KB4QxAQ4IYwIcEMYEbAakgLjPB9/uLY6Cu/NizBN6B6QQh893HdggEP24bQDXfT7EOSVszPU4zFtA3Hcd79Of8N/fp/Zs+fzwXziXuIgNWkPU7UnyYV42IuIVpJDHH5jF7RtTBzZN3biNWfyBPK8ibIwJA/L543sAF3H+YD6AqfO4COD9x8+uTIwxL3DsKFar1UKj0XBqdwCATqeD5eVlnDhxAul02tF9M/c1Gg0sLCzg7Nmz2NzcHPV0+iIMyNT5iwDeo+si8fkj3gO4+GN52draQjgcduyF2NzcxPT0NADgy5cv2N7exvT0NEqlkiP7Z+5Kp9MIh8OYm5uDaZp4+PAhotEotra2HBujUqk4ur+uSGiDFgGaTX86sOVTepaARdr46b5ms0mRSITu3LlD7XZbvOtD1Go1ikQiFIlEqFar7dlWLpdJlmXSNI3q9Xpf+2fuKhaLFAqFKJFIULPZ3LOtUCiQJEmUTCb7fn9YstksybJ8YAyn9QgIEW0sEgBa3Dj8vv1v5NXVVQqFQlQul21PpN1uUzKZJEmSqFAoCB+byWRIkiRKpVK298/cVa/XSdM0kmVZ+H8/yv/5MMlkkmKx2MAhs6N3QIjIWkmwe9u7cqiqSpqm7ZlwtVolWZbJMIyee+/nk6XZbFIikaBQKESmadp7GswVqVSKJEmiTCZj+29ElcJh2u02qapKyWSy36kemc2A9JbJZCgUClGxWNy9r91uk67rpChK15Konxdpv3K5TIqiUCwW47JryETllF12PxxrtRrJsky5XK7f6fbFsYAQHb5qmKZJkiTtPjknltn9stksSZJka8Vig7FbTtnV6/1gBdGJsY7K0YBYdF0nWZb3rArNZpNUVaUbN2449kVtv2azSbqukyRJXHa5pJ9yyq5uFcXq6iopiuL6l/HDuBIQov+n3nohrSNc+4Pjhmq1SoqiHPhexPpXLpcHLqfsssqu+fn5gY6IOsHVU25brRaWlpbQ6XRw5coVvHr1Ctls1q3hDpiZmYFhGFAUZWhjjquFhQVcunQJiURiKON1Oh1MTEyM/Dd4rp4PEggEkMlkcPPmTTx48ADfvn1zc7gD/H7/UMcbd4FAYGhjeeV/989hDBKLxfD161e8fv16GMMx5pihnVF4+vRpnDx5cljDMeYIPuWWMQEOCGMCHBDGBDggjAlwQBgT4IAwJsABYUyAA8KYAAeEMQEOCGMCHBDmaZ1OZ6Tjc0CYp83MzIy01RMHhNny/fv3kYybzWZx//59rKysjGT8oQVElmWUSqWhPFGrI2Or1YIkSa6PN+4qlQpKpRKSySTy+bzr4zUaDdy+fRuqqkKSJBQKBezs7GBmZsbx7p29DC0gkiShWCxiZ2cHFy5cwPPnz10Z5+eOjMViEZOTk66Mc1zk83ksLS3h2bNnePv2LdbX1xGNRvHhwwdXxltZWcHc3Bwqlcruh5vf74dhGEilUgiHw8O96vEozvO1zhl3slWPEy2Exk21WqXJyUnSNG1POya7UqkUqaratUNiKBQiXdcdO1/c6nyj6/rueIZhkCzLVK1Wdx/XbDZJ0zTSNG0ojRxGEhCLE6163GghNE6azSZlMhmSZZmCwSAZhtHzA6TdbpOmaZRIJISPMQyDgsHgQL2q6vU6xWIxUhRlTxAsxWKRZFk+0EXF6q75dysgcWPDQYw0IESDterJ5XIUDAZdaSE0jmq1Gum6TsFgkBRFoUwmc+B1q9fru9vsqNfrpKoqRSKRrm9wEcMwSJIkymazwsdZq8b+1axer1Pu39d6tsYdxMgDYjlK2VWtVikSiZCqqtxNsU+maZKmaRQIBEjTNDJNk16+fEmyLPdVjh2l7OpWTtmRy+X2fZAerbl6PzwTEIuo7LJamYZCIS6nHNJutymTydDU1BSdOnVqoO9vvcquXuWUHdYKp+v6j5Vilrrkg+hTmmYdWEU8FxCi7mWXVU4ZhsHllAuePHlCV69edWRf3couu+WUXalUit785zfBKnH46nIUngyIxSq7zpw5w+WUy0zTJEVRHN2nVXYFg8Ejl1N2iMsoZwIylL5Y/ZIkCaZpwufzIZfLjXo67IgikQgURUGj0UAwGHR8/z9fAS26/zqa+66A1i/+qQlzld/vdyUcAICoikW8wZ9/HbxG4Oe//sQbLEId8BrlHBD2C4tibWMRbxLnEP/5cuSFOM4l3mBxYw0D5mM4rUcZc010DUQq4j4ffLt3LmKDaOBwABwQNhaiWCPCmgt75hKLMQEOCGMCHBDGBDggDMDfJ5l55aI1XuLqJdic8O7dO1y+fHnkl+Iad51OB61Wi08w28fzAQmHw5iYmMC1a9eGdn08xiyeLrGWl5cxNzeHp0+fYn193bXTPBk7jGcDUiqV8OLFC+i6Dr/fj2w2i/n5+ZH3SWLHiydLrE6ng+npaRQKhT2/40mn09je3kYqlRrh7Nhx4skV5O7du7h3796BH7klEglUKhXXOqIwtp/nAvL48WN0Oh1omtZ1ezabxdLS0tD7I7HjyVMl1tbWFm7dugXTNIUXrc/n81hfX+dzRJjrPLWCLCwsIJVKCcMBAKqqIhAIDLeBGDuWPBOQRqOBeDwORVFsPX51dZWPaDHXearEYsxrPLOCMOZFHBDGBDggjAlwQBgT4IAwJsABYUyAA8KYAAeEMQEOCGMCHBDGBP4HT0Yk8VCve6YAAAAASUVORK5CYII=)
chemistry-General
chemistry-
Which of the following represents same enantiomer as :
![](data:image/png;base64,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)
Which of the following represents same enantiomer as :
![](data:image/png;base64,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)
chemistry-General
chemistry-
Calculate the d- and
-isomers formed by the following compound.
![H O O C minus C H open parentheses C H subscript 3 end subscript close parentheses minus C H O H minus C H B r minus C H O H minus C H open parentheses C H subscript 3 end subscript close parentheses minus C O O H minus](data:image/png;base64,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)
Calculate the d- and
-isomers formed by the following compound.
![H O O C minus C H open parentheses C H subscript 3 end subscript close parentheses minus C H O H minus C H B r minus C H O H minus C H open parentheses C H subscript 3 end subscript close parentheses minus C O O H minus](data:image/png;base64,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)
chemistry-General
physics
Which of the following graphs represents the motion of a planet moving about the sun.
Which of the following graphs represents the motion of a planet moving about the sun.
physicsGeneral
chemistry-
The configuration of 1 and 2 carbon atom in the following compounds is –
![](data:image/png;base64,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)
The configuration of 1 and 2 carbon atom in the following compounds is –
![](data:image/png;base64,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)
chemistry-General
physics
Which one of the following graphs represents correctly the variation of the gravitational field with the distance (r) from the center of spherical shell of mass and radius
Which one of the following graphs represents correctly the variation of the gravitational field with the distance (r) from the center of spherical shell of mass and radius
physicsGeneral
chemistry-
Which of the following is the enantiomer of the structure ?
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)
Which of the following is the enantiomer of the structure ?
![](data:image/png;base64,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)
chemistry-General