Question
The graph represents a____________ relationship.
![](data:image/png;base64,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)
- Proportional
- Non-Proportional
- Linear
- Non- linear
Hint:
A line is simply an object in geometry that is characterized under zero width object that extends on both sides. A straight line is just a line with no curves. So, a line that extends to both sides till infinity and has no curves is called a straight line.
The correct answer is: Proportional
The graph shows proportional relationship. Because straight line that goes through the origin.
Hence, the correct option is B.
The graph of a direct variation is a straight line. A direct variation is proportional.
Related Questions to study
_________ makes a graph proportional.
The graph of a direct variation is a straight line.
_________ makes a graph proportional.
The graph of a direct variation is a straight line.
Write the constant of proportionality.
![](data:image/png;base64,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)
When a ratio is written as a fraction, the constant of proportionality is the number gotten by dividing the denominator by the numerator.
Write the constant of proportionality.
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)
When a ratio is written as a fraction, the constant of proportionality is the number gotten by dividing the denominator by the numerator.
Find the constant of proportionality.
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)
When comparing two or more ratios, the constant of proportionality is a fixed number that indicates the rate at which ratios increase or decrease.
Find the constant of proportionality.
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)
When comparing two or more ratios, the constant of proportionality is a fixed number that indicates the rate at which ratios increase or decrease.
Find the cost to have your lawn mower for 2 hours.
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s6b731lkNge3p6sCyLpUuXMnPmTEpKSgiFQiSTSQKBAIFAgP7+fp555hk6OjpYvnw5RUVFrFixgvLy8ouec2FhIYFAgL1797J7926ampoIBoPMmDGD1tZWIBVcIhjbiRMnOHDgAD6fj0mTJpGfnw9AUVERFRUVqKrKyZMnqaur44YbbmDJkiW0tbXR09PD1q1b2blzJ9FolBkzZnD69GmamprYv38/sVjMmfOiRYsIh8OYpklubi6maQ5LbRCmVDgb2WdZFu3t7fj9fvx+P2+++SYtLS2YpklDQwOWZVFSUsKMGTPw+XwMDg6i6zqqqtLd3T3snMlkEtu2HTOkaZosW7aML3zhCzz77LMcOnSIAwcO4PF46OjooLW11THhfuUrX8Hr9XLkyBEMw+D48eN8+ctfJhAIANDb20thYSHl5eW0tbWRn5/vMIdgMMjkyZOZM2fOsFSTG264gaeffppEIsHzzz/PokWL2LJlC729vZSVlbFkyRJKS0vp7Ox0xjEMg4GBARobG3n11VeJx+PMmjWLadOmOdqkqqpMnjwZgGeeeYb9+/cDsH37dh5++GGSySSmaRKNRqmqqnKsFMIEfj5LQBaXF1mmlkVaCAe4qqpUVVUxd+5cjhw5wrPPPktHRwfz5s3D5/M50rCmafT19XH69Gn8fj8DAwP09fU5Ifder5e8vDxCoRB9fX10dnY6monH42H+/Pl85jOfYf78+XR1dVFUVISqqhiGQX5+PrZtk5ub65jERIL49ddfz5133smaNWuIxWK8/PLLrF+/3skne+CBB7jnnnsuGC0ocu2mTZvGsWPH+POf/8xbb73FxIkTqaioGKa1WJblEEqhQcnw+XwEg0HH19jf309xcTFXXXUV8XicgYEBXnvtNXbu3EkoFOL9738/9fX17Ny5k9dff52enh5isZjjgwwEAnR3dxOPx7Ftm3A47ESaiuAVSCWNC62hqKgITdOIRCKOadi2bTo7O4GzieyqqpJMJkkmkyiKQm5uLoZhODl4cg6gYG5FRUW8//3vZ+HChcTjcbZs2UJjYyMvvfQS9fX1DAwMUFdXx7Fjx6isrHTGXLhwIQ899BBTp07F6/Xi8XiGBRF1dHQQjUad/RSPx4nFYgSDQQByc3NZvHgxFRUVNDY2UldXx5EjR9i2bRvRaJSamhquuuoqdF0nkUg42qzH48Hv93PmzBnnWiZOnEgwGHTmJWtabW1tnDx5EoBVq1bx0EMPUVZW5qyTz+fD4/FQUlJyThK/YHDiPmQ1tsuPLFPLIi1EAIWI+po/fz5bt26loaGB2bNnM2/ePBoaGhxiKAiDYACC2IrIQ0FkBNEKBAKUlpZSU1NDY2Mjp0+fpry8nNraWqqrqx2GEI/HncohIjhE13UnCXjq1Kk88sgjrFq1in379tHe3s7q1avp6elh+/btzJ49m1tvvZWcnJzzhm8LIj516lQKCwv5y1/+gmEYfPKTn3Si84SmIgJMhCbghqg0IqL+cnNzycnJYf78+eTn59Pb28vmzZs5duwYhYWFzJ49G5/Px549e9ixY4cTKDNv3jyKi4udtRSaQDQaddIKkskk8XgcwNFyY7EYkUjEuTd5eXnA8KovmqYxODiIaZoEg0G8Xi+WZdHd3e1Es8rjyhVoent78fl8TJ48GUVRmDhxIoqi8OCDD/Lxj3+czZs309/fT3t7O1OmTKG4uBhIRYnW1tYye/bsYVVr5IhZkQgtEt0DgYCz3l6vl7KyMpYvX86xY8c4deoUTz75JMeOHaOoqIglS5Y42rLf73fMstFoFMuyKCoqoqSkhCNHjtDd3U1/f/+wOYrqMRMnTmTChAn09fURj8epqqpi0qRJw3xnIvIxq51dechsvZIsxi0E8/B4POTn53PdddcRCARIJBJUVVUxe/ZsvF6vw8Bs2yYnJ4drrrmGwsJCTNPk5MmTTn6Xoih0dHTQ09NDfn4+1157LVdffTVlZWWoqkpraysbNmxwmBikGOG6det45plnME0Tr9dLIpHANE2nWoVhGEyePJm7776bz3/+8/zgBz/gRz/6keNHa2pqcpjh+QiQyP0SgQ4i1H358uUOYxHzED6nqqoqqquricVitLa2Mjg4COBU2ohGo5SVlTmmyFmzZjF79mxM02THjh28+eab1NTUsGTJEm666SZ8Ph+7du3iyJEjWJbF3Xff7QTfyAxZrDWktBDBCHp7ezEMwyHoImk7Go0SiUScqi/iGgcGBrAsi0gkQiQSQdd1RyuWk7OF5qYoCu3t7Tz11FNs3bqVZDKJZVmEw2E8Ho+j/UBKE6qtrWXq1KmUlpaiKArbt29nx44dDtMHOHPmDE899RTPPfecw4wBxwcmmJvQfvLz87n77rsJBoP09/ezevVq+vv78Xq9/N3f/R3l5eWOz1PMwev14vf7HQar6zr79++nra3NYdjxeNwxJYoKOgC7d+9m9+7ddHR0OFaHo0eP8vvf/56NGzcOy3sU+0gwyqyW9s4gy9QkiJBnWUsRG1ZsfrGxRRScOGa8wZ2MK+Yl5hkIBEgmkwBMmDCBsrIyZs2aRUFBAbNnz2bChAmYpkksFnPMcYIBPvTQQ0ycOJF9+/axYcMGh2G99tpreDwe7r//fqqqqgiHw3z6059mwYIF2LbNU089xRNPPOEwhd/+9rd84xvfoLm52dHcRI6WoihOztT3v/99du3aha7rRCIR3nzzTRRFobKykttuu81JvBU1Cd0RapZlEYvFiMViVFRUMGfOHIqLi5k9ezbV1dWEQiG6uroc05Ig8PPnz+e+++7D5/Oxc+dO1qxZQ3d3N1u2bOHw4cNUVFTw3ve+lxtuuAHLsgiFQg5TGxwcJDc31wmOKS0tpaqqytljmqYxb948CgsLHYbs9nNBiuEI7dfr9To+NzFfMT9d1yktLWXZsmVUVFTQ3NzMSy+9RGtrK2+99RbHjh0jHo9jGAahUGhYmLqqqo65MxKJ8PLLL/Ov//qvPProo9TV1dHV1UUsFuN73/seu3fvZuLEidx3333ccsst5OXlcf/997NgwQISiQT//d//zQsvvEB3dzdHjhzhe9/7Ho8//rjjnxJzFP5cj8czTBgRZr+FCxcCOP7ApUuXOozIXWcyGo06aSX/9m//xpw5c9B1nT/96U+88sor9Pb2cvz4cR599FHWrl3L4sWL+fCHP8zUqVNpaWnhhz/8ITt37qS/v58TJ07ws5/9jB/96Ef09/efU34tq7m988iaHyWIcjpCMhZmiWQy6bwXD7uQ6uQHfrwhXS6Noijk5ORgmiZFRUX4fD76+vpYunQpP/jBD+jt7aWyspJgMEgwGKS0tJRIJEI4HCYej1NcXMy9995LOBxm3bp1rFmzhueeew5IRed99rOf5YEHHmDy5MmYpsnMmTP56le/yubNm9m4cSOPPfYYv/nNbxyz2PTp050oRtm3YxiGw3zb29v54x//yCOPPAJAf38/CxYsYOXKldx1110UFBQ4xFkmQMLnIuYJKd/axz72MZYvX45t20yfPp09e/YwYcIEiouLKSoqctasoqLC8de9/PLLfPvb3+bHP/4xXV1dzJo1i/e9733ceeedjtabn5/PzTffzDPPPEM8Hmf69OnceOONTrL2vHnzqK+vJxqNUltbS3FxsWO+TSaT5OXlUVBQwIQJE5xrUFWVCRMmUFBQQG5urpOHZ5omfr+fsrIyCgsLnXVbsWIFjz76KL/85S95+eWXaW1tZf78+U4Eq67rhEIhRwBw75X8/HxuuukmotEoL7zwAmvWrEHTNMrKymhsbOSuu+5iyZIl3Hrrrfj9fmzbZvny5ei6zrPPPsuePXv4zne+w89+9jOi0Sh+v59Zs2Yxc+ZMfD4fhYWFFBQUONcg6jl6PB6HSZeXl7NkyRKOHj1KV1cXubm5rFy5kpKSEkdzisVihEIh8vPzqaqqcvyRixYt4utf/zovvfQSr7/+Ol/+8pcJBoNO2TWhFb773e8mNzeXP/3pT074PpzV+t71rncxZcoUZy9lceUgW9B4CKLOn9frdezlmqY5vhtRGUFOrBSa2nitHyfqPQoznphfV1cXra2tnD59Gk3TmDlzJmVlZcM0G9M0OXr0KM3NzUCKMcydO9c5R39/P62trTQ2NjqRjFVVVVRVVVFaWupoO4KZdHZ2Ul9fT29vr6P5iojJ6upqgsGgs+6GYTjEZ2BggKamJjo6OhwTkd/vp7q6milTpjiBD3A2+EXMXeSaHTp0CIDi4mKmTZvmFG0W6O3tpa6ujv7+fjRNY9q0adTU1DhMNhKJsHfvXk6fPu34fiorK5k9e7ZjRhOBGrFYjJdeegnbtsnLy2PWrFkUFhai6zoNDQ0cO3aMZDJJaWkp11xzjTNvy7LYvXs3p0+fJhgMMmvWLCcf79ChQ3R2dlJTU8PUqVPxeDwYhsGePXsc09y8efMIh8NYlsXg4CCnTp1yKmX4/X7WrFnDL3/5S8LhML/4xS9YuXKlkxwv73PDMOjt7aWnp4fjx487mqLX60VRFGpqapw8NrHOos5mb28v9fX1dHV1OWkJpaWlTJw4kYKCAjRNo7GxkcbGRgoKCrj22msdf6CqqsO6JzQ3N1NXV0c0GqWwsJDp06cP83uJJOtTp045aSLCTKqqKu3t7dTX19Pa2uow5bKyMkdAgJSJtquri5MnTzIwMEAymcQwDMrLy51cPLlos3g23KXnsri8yDI1F+SHQgQGuB31cmXv87UwudJhGMawucmECxhWbV8wPYGRHtqLrekYi8Wc6Do5QGCkc4prS1eId6QAEBGpKM9D9qH4fL5zjhX+GDmCLd39FQxqpGAROGtCEyZLkdDuPp+724AMYU50V/YQ15BujUcirJZlcejQIbZs2UJxcbGTl7V//35+8IMfsGXLFhYtWsSPfvQjx5Qn7qdYf9lqcb69L+YktwYSkZbpCkHLQpU8v2QyOez+yRaSdGO6hUz3+eRrTreectTiSOPI48nrLPZWlqm9s8iaHyXIPhfBuESdP0HERAKsgNDkxiMEgZA1T9u2nfJHQrORa0PC2YfZLcW7o8PE58IcBmdNiMKsJsLEIRXxJl4LH0i66xNjJxIJpxqIHNwgEy03IxTMQzAjQTjF9YucO1mIkfOQZGIl+53kMmFyDpl8jNfrdTTUSCRCKBRyzi3mLJtYxTwFY3BrBHKOlAz5eHcQA8CuXbs4fvw4zz//PF6vlxMnTtDT08OHPvQhPvShDzFp0iRnXu5IThF8Ip9XZhSCaYlnSBYK5HstMwxhGZGtH+L65SAReb+JdRJmaBFQI48l33OxLqLLgNDoxVji3ovrFWMIwUReW+FrThcMkmVm7zyymtoQxAMsHhxB/Pr6+sjNzXVCoHNycojFYgwODjr1BDPdgiSTkAnESBK+TGhkv5Rbw5MJuFvKlYmw25QrCKRMpEU+kIhic4eXu7Ua+drdErc4h2Cw4hziN/JnQjOQ5yMzFEFIZZO0+N6tFchrI+YkmIIQFNzrIYi08CHJ1yEzknRMVg5UEMxZjCmuORKJsG3bNhoaGohEIo4JuLKyknnz5lFdXe2sJ+DcBxmyhu/WhmVBQOwReQ+JtRamfkVRnMhDueGqvB/Fe3Ev3JVOxL4Rr0fa52LfyOeX1z7dfUtnvZDz+MarQPvXjCxTSwPhM3rjjTdYs2YNq1at4oYbbnA2+Z/+9Cd27drFvffee05R0/ECmSDKRFm8ls0oMkEScEeYyb4qWYtzf+9mouIYWdoW/idBdEQEnEzQxGt5Dm7t0V1oVtZMxbXIGoJMLGWmIxiE8I2JfCaxXmI93P5WWfM1DMNJS5AZvDt4RT5W1mTk0H43E3WbL2UNSzB0udfY+Qix+I3QlAUzdAs08tjufSUgmx7F+svCo5iLYIjyuovfCUFEvm/yXnULOmIvydq6W1gTx4m1kYO/5L0ojhfrLe9HMdesZnblIWt+lOCWEpubm3nuuefQdZ2rr76a3Nxc9u3bx3e/+11qa2udqEe3aY+7xPwAACAASURBVGg8wG1GkwmPLB2L/9OZdUbyHcjHpXvw3WPLGppMTM53frdm5PajyO/TaTRus9j5rlEQMXE9wiQmn8t9rCz5CwiNR9YWxPvz+SLd98M9d7eZE3AEA/c1yNqPm7HKjEvchwvlW8mCgywIuTUs971yr0G6126znzyeOI8b6cYb6frlCGfZ3CuOcd8T2SSdxZWLLFOTIEvJXq+XKVOmUFBQQHt7O4lEgkgkwhNPPIGqqvzDP/wD06ZNG9eBIgLpCMBIhOBCkql7LdwEX34/0mv5M5nIuAMGLhYXGsc9p5F+LxP6kc43EkOSrz3dGp+PqboDG84nSIjXsoAmGJwgzDLRl9fXzYjSjXm+fZHuu/MxfHlu5zvH2/nuYu5vuvVMd7z4TL7GdPcxiysL40u9yDDEJhXO/MLCQoqLi+nt7SUWi7F582bWrl3L3//937N8+fJh0WBZZHElQdZY3H9ZZPHXjCw1HoJs6xdmD6/Xy4QJE2hqauLQoUM8/vjjVFdXc8stt5Cfnz9MCs4iiyyyyOKdR5appYFwGPt8PqZOncqbb77J448/zuHDh3nggQeYPXs28Xh8mMM5iyyyyCKLdx5ZpjYEoXXJ/aoKCwupra3FsizWrFnD0qVLufnmm4eVxXL7erI4P+SowHR/WYwNzmd+zJogs/hrRpYaSxCh4IKpieioYDBIeXk59957r1NCR4R0Z5FFFllkceUgq6kNwTRNIpHIsPDqgYEB2tvbCQQC3H///Vx33XUoiuK0x4CzpXeyyCILsLGwseQPzv45H1iAgYU59PuzX2eV9SxGiyxTc0EEipimSUNDA2vXrmX69OmsWrXKyTPy+/1OUqa7JuKlQGiHcmV0EbiSKbjNfZfb9CfncV0Os5ic6C0LIZlc43RjyEnEmYScRC0KRIt9linYWBjEMUli2Ra2yVke5vyfYmiGHSNuDJIkiQEYto1l28TjCRKJJLYtajma2LYJiJMNG9D5s+1z9/TlgFwyTAi46eqTXircz6gYL1NzfSdpwlghy9SGoGkaPp/PqQT+1ltv8cQTT3DmzBmn/5c7YVTTtHP6PV0KRD6WnOiaaV/dhRJUM+X3EuO6K41kGmIcOfFXvM8k5MogcPlym+Q9Ku/bzK63hYKd+lMU0IYraCmtzMC2k6iAT/ehomFikkgYWJaN3+/F6/UMW7fUXlEYxtRc21BRzp/LlinIZdbk92MFOXdWThDP1FwvJmn9SkfWpzYEy0o1+5QLs4p+WYsXL0ZRlGHFWuXKDKMh9O5KDgJjce7zQZw/XaVx8fn5jh3Nhpcf0MtZamikcTIpkbrLi8maeKY1U3eSsVwmKzNzVlBQQFFSPMdKaVAphpP6s7BJmkkURcWjKChoeFGwvSqxwQR6jg/TtLBsG1UV1ylXRrGdsdyMDYavqbzPMgWxh+Xak2Mxbrpya8A5BbrTMaGxvLcXU0HoSkO29uMQhOlArkMn196TJTFBLC7UMmU8wP3w/a3Us7tclWDk9XynaoSmqzGZoZEAG8u2UBQPCmctjwA2BgpJsG1URUdBxTQ0FFtBVQAdjCSoaurPtkFRwbLMIaaoktLY0sFO+93l2s/pamKO5l6f77m83M/oeKMJWU1tCLZtO91xxQYVVcPlWnt9fX34/X40TXOqi4+VWU5ch5D85Bp8Yw1ZChRzkFu5ZGoTpyvnJFqUiGK/mYDIPRSS7uDgID6fD5/Pl9GqMJZlOS1nRP81Me+R+sONFRRFcfa0z+e7DJqajQIkkkkUJYHu8WKpyhCTszHtOLaVxKt50SwFy7QhCZqto+gwMBClbyBCUWEeukcjFovjD3hIJhNYlomuu4WQs/dMVAFy16ocqfPEWMCyLKdwNKSeXbkjg7tG59tFuiLhiUTCKYwt4J7faO+t3L1CjgYXDVavdGSZ2hBUVSUYDA6raq4oqVYg/f39dHR0UF5ezsDAAAMDA4RCIRKJBJZlOcztUpAuYEKcMx6PEw6HM24+0TSNRCLB4OAgiqIQDAYzvnnlh1T0bsvJycmYKVDuYm6aJj09PeTk5BAOh4lEIhkTHizLIhAI0NfXx+DgIAUFBU7V/kwyNcHEBwYGAAiFQs7eytS9VQAsiESiWIA/J4jm1THsJBYGqmKjKQpx08BOgNcOEtByMJImnQMD7K7fS7gohMIU/AEP8UQE0/Jj2xaJRAxFTbM37JRAFo3GUFXVaRvk7tAw5nMdYlyDg4OEw+FhLYJEENlonlvxfLhb+/T19WGaptP2Sv69wFgxNfHMiHZMeXl5522Ke6Ugy9RcEJtJbpvR0NDAG2+8wV133UVZWRnRaNTxrfl8vlGZscRDIPeoEhF6ojt0JsxkYuPruu4QgFgsRRjSdYR2X/OlQtZABeEVa55JDVFI0HK9Tl3X8fl8TpuVTMAtyeu6jt/vJ5FIZLTEmqqmOoqLtRXNbdP1fhsrKLaCbdgk1CQJy0DXVXx+naQNSTOlV3lVL6qioVgKHtWL11RpbGxjx94dNLQ1cOffv4dQyIdl24TCISzTQFVTgpZNmkhVWx3S9lOEV/y5e6SN+VyHntvBwUG8Xq/T+28smRqcja4U+7O/vx9FUQgEAiP61kYzX1VVh7UGEm4Zd4DVlYxxx9RGkk7G4rziTzYdRCIRtm7dyoYNG7j99tsJBoNOp2Wv14uu6w6DG+34cG6jzFAolDHfj2xa9Xg8JBIJFEUhHA5nbAPLJk9FUfB6vcTjcYLBoKNNZAJCABHa4eDgILm5ufj9/jE3q7jDojVNIxwOY5omubm5DjPNtOPd5/M5ZvXc3NzM+9VsBStuEY3E8OcEyM0Lo2oqJiaGbaHZgKmj6xpqAIhD095WXnlxCw0nj1A9p5opU2oIhfyYFugeSCYNNA1UVUQ/ugm2imXZmObZjubu5zFTPiFVVYlEIuTk5Dimc3d072jhfl5ycnJIJBIZtWrI6+X1ehkcHMyomXysMe6Y2tuBHGkGI/e5kn+nqip+v995HY1Gqaur49ChQwwMDAzr8iykGmBU5it39KN8nZkkfPLDJ/cWy5QkL48rxpKbX2ZaEhTzEmst7mMmA0bEnAShlRtSZtIBL+6jrutEo9FhkZAZG1cBxaNgKaCoqX2bSMZRUPBqXhRTBRtUHaJnLE7sbWTrhm0cPnCY/PJ8rrrqKnLz/ZjJVKSkbdlomoqqKijKSARcGQoiOTsvd7RpJp8heS3dz+1YnNvts0/X73As4U5BERaVZDI5bhjbXzVTc9/0dOGvbgj7tWEYWJZFT08P9fX1nD59mkOHDjFt2jTHni0COuRmhllkkQ7vVJDx5R7XGorhV1QFVVHxaB4UW0W11VQ0owX9JxPsfHU/e7fv5eTxRqykQVlpKVdddRWQYmiqKuIZRfqM0Nbk59YmZdQcH8R2PGI8BsePDyOpBCENnY8puaMR5QCMdJGK8jllCTqRSHDixAk6OztJJpNs2bKFaDQK4JjqMq3VZJHFeIKFja2mqn8oNmiCoUVBiUD3sQivvLCdjWu2cLr5Lbyql6L8IiZNmkRpZR62NcTMlBRDg/M9Y+O7OW8WmcFfnaYmMy33g3Ax34lADV3X6e3tpa6ujv7+fnw+H6+99hrJZNL5PTCsq3AWWfwtwwZs1ca0TRJGEiNpoGsesEEx4OSedl7fspdDdUfo7RzA6/NgGiYFFQVcc+01qBqYVoqhAZhWKhVguFl63MnhWVxm/FUwNVnzSucfkbP9L8ToZJt8e3s727Zto6enB8uyOHz4MI2NjZSWlg6LaJOrN2SRxd8yEpiYqo1H19C9HjAg1h6nse4kb2zaz6E9JzBiFnk5hRhmHDApL6+gsrYoxRRtUDWc/IDU8zmCu8DJ6hZmyfFnKsti7PFXJfaMpC2JIIR038sh/IIxCabW09NDV1eXU2g4Ly+PgwcPMjg4OKzySJahZZFFyrPlUXV0r46tpspYWRGTUw3NvPjcSxzcVY8VtfEpQVTLi22qVFdVM2vWLJRAii0pmu1oapqWesbSFmHO8q8sRsBfhaYm8rwikQjd3d1AKhQ1HA7j9/sdhtbV1cXAwACKkioWnJOTQygUcr4XFQJEyL6u69TW1jo+tTlz5jj5ZJCqYmAYxrhISMwiizGBXFvY9b+qgG0rxBIWClGsYAg1R6d8cgWz58wm3lNP11sxvP4QsXiciBmluKKQSTPKYCjWKhXFKKLw3L5zZfjLLGPLIg3GHVOT8zYMw3BCltevX8+f/vQn6uvrMQyDmTNn8qlPfYolS5Zg2zb19fX88pe/ZOPGjU7477Jly/iP//gPSkpKnGr7cp7Y3Llz+cY3vsETTzxBf38/Dz30EBUVFY6WJicujwYjhehm0k8nhwuLZFFN05yoz0xVlk+XwyWEikz6JsWc5LBkwzCcXK6xHFc+l5wLKOYoxrsckWVylO7F7lXbFU2oCIOONexH5/6vgKUoKASw1DiqDiTi5EzwcfPf38Rgv87WTXX0GwZx4oRK/JRfVUhosgd0AzTNYVupSMez2lpaiB8r5+avZTqUH4aXmnOPLb4f7fnF//J+yeS+Ec/H+aK6Rxr/SokrGHdMTVREgBRT6e/v55lnnuF///d/iUajPPzww8yYMQOv1+t0qe7q6uJXv/oVu3fv5p//+Z9ZsGABW7du5Y9//CO/+MUv+MIXvuCYIAUBEKH9+fn5FBcXO8WLvV6vU/FDJsaj2Why3pZ7816o/9WlbiQ3I5VzuESlj5HOn8nNm6lcmHTXLK/zhboSnA/nu/fpGImb6WUCcj5cuhzA841rK6nvFMS+tFLvrKFPxOW7GJttD1UN8agEdT+WMVRIWddpOdnKsZMNlE4sJBQqYP+hveQU5VA1rRwlR8E2oqD4MNMwogsJAOlyTt3fX+rzeT4C7l5D93M82nsrhD4RtS1HcMt9+dy5t6N5PmVXSro83/GAccfUhHYhJM+GhgaefPJJAoEA3/zmN7nxxhud3wrCfOzYMTZs2MCUKVNYtWoVlZWVFBcXs27dOl544QUeeughSkpKhpWDSSaTwyqMiH5rcNYPB2MbKCIzGtnPl6kyWXIAjfywpGtbMlaQmbTQiOVqLpksLCyPIx5UuchvJscV6+puWXQ5xpXvtSzEjISzzV1U8eLs/7ZE6BVSQRpDidGpQA+TeKSHnHABCj5QoLO5m5fXvULC6Oc9d95E2aQyJr3hJZCrU1Y1ASwFxZcDgKa8/T3nbrwqM5N0CdljBTkxWl5fOZJ6LMeB1D4dKwtROgj3iijzJTO28ZKzNi6Zmig6bNs2hw8fprm5meuvv56ioiL27NmDx+Nh4sSJ5ObmAtDU1EQsFmPWrFnk5+eTTCYpLCzk2muvZd++fTQ3N1NSUjLsJgqNLBaLOa1nYrGYU0JLvtmj3bzunDrxWSbNcW7TjKypZjLwRT63eO3xeDJeAVw+t6gzmUni4B5XlFMThbIzDTGuEIrezjyVkeLHhoIMbWso5VkR/w9J8lj4lCReJYlq2yg6RN8y2L65jsaTp1i6eCEz31WFp0Bnefn1KJqKPyel0aFrKOrZcP63A0VRHPeBe66ZXOuR9lGmnp9Mm1PFGLIgLdY0W/sxgxDEXtd1Jzm6t7eXlpYWvve979HW1kZlZSWLFy/mAx/4gFPrTwSByFJccXExsViM5uZm5s+f7zCreDxOS0sLTU1NtLe309DQwMDAAJs3b8bn81FSUsL06dPJy8tzznupm83tYxEbJ5FIkEgknCLDI+FSN5ps0hBmjWg06jBygYupwvJ2IEt8Yr7RaPSc6upjDbnArJirSKS/kPBwoWu6GNNYNBplcHDQ6UggvssUARQacSwWIxaLEY/HnTEvftyzUSBndbEUzsaIKM63CiaWOYBqJrGiJjHL4sCuRrZu3UtNVQ0L3jUPzWNiDEbwFdiYWCSIoyo+ElETVbcAM+2eu9AaR6NR5z66fUGjYQYjaSiqqhKLxZx9JJfJE9r4WAi7shVF0LJ4PJ72GRXXOdpnSKaTQph3a8NXMsYdUwMcbcnj8dDZ2UlXVxdTp05l5cqVRCIRjh8/zksvvUR+fj4rVqxwpGPBODwej9OTSPTzkvsGJZNJ6uvreeWVV+js7OTEiRNEIhG8Xi+xWIwZM2Y4hVMjkQjJZHJUVd5lpiZqIQ4ODtLb23tB8+OlbmDZTi60356eHmddRE3LTDA1cR7TNJ17mEgkhjVjHWvIDWANw6CrqwtFSfUbu5DfcjRMTRw/MDBAV1cXfr8/bSPasYa4poGBAQYHB50CuLIwM/LBcpShDVjYij1UTjg9kVdQUG0LkgNEemMkrD4a27vZ9uo+fN4c5l43D82r0ttxGsWfwFQS9MdMFC2E31eMaSnYRgSUS2NqfX19zv0UVhZheRiNxWMkv5gQxrq7ux1tTTAzMfZonxfByERKka7r9PT0EI/HnfPLgrDsThgtRKV+SAnYorfkeMC4Y2oiHF8wqWAwSHFxMTfccAOrVq0C4OTJk3z/+9/nu9/9LpMnTz4nGAJSLRw6OzsJBoNMnDjR2ZAi6mfOnDmUlZXR3d3NunXr6O7u5u677yYUChEOh6msrHSqvougkrFwRrsjEnNzczOeByceHNM0MQyDUCg0jNCPtclD1phEn6ZwOEw4HM7YgyNrJ5ZlEYlECIfD5OTkjErTvthxhZ9Wvp+ZlHzdJu1QKHTRTE2RmJot/GWKlWJoDC9WkPpSMDUbjCB6IkLH6QR7dtXx5qk3WXnnLcxeWIuqJlG9uSh6hISlEfbp2EoQW/UQ0DRsU0VhuO/vYiD7KQOBgCOsuosBjzWEcBwOh4cxNTnidSzGlv2+QugUrpWxhrtguxCwM+kKGWuMO6YGOOYFwzCYPHkyZWVltLW1Od8XFhY6bSEACgoKyMnJ4c0333SIdSKRoKGhgXA4zIwZMxyfjm2nWspUV1dTXV1NJBKhqamJzs5Oli5dSjgcHnYtmcpRExs4Ly8vo2HusmlGdEnOycnJyHgjIRgMEgwGL9u4pmkSDAbJzc11gn8yDaFF5ObmnhMllynIzCcYDL6NA4f+V+SPLMkIaaOikrSTYIFXG1rDlPUQu7uP3W+s49ixRhYvWciCZdMIFqlg+cDrAwL4FQvwYOMhiYIG6Iz+XgSDwctWYNzj8RCLxQiFQhlrMuuG6K3mpkNjBfeeFEKBqHULV34U5Pjw/EkQqriQKG666SaqqqpYt24d69evJx6Ps2bNGurr67nvvvuYPHkyc+fOZfbs2Rw4cIBXX32Vjo4ONm7cSENDAzfffDMTJkwYZqaQb5oIDkkmkyQSiWHXkikJUI6oyrTK744EfCeinC7HPIFh85TzcS4H3FGXl2udL2kcW/pzPjr7z7RNDNtARUVDO/vbOBCFfbsaOHG8hSlTJ7No6TyChd4UwxsqqG/bfmyCmHiwhhIHzs00u3jIkaXuuWZynd1jjuU47usW4wiLSrrfj9W47veXI0BlLDHuNDWhEsfjcQKBAFOnTuWee+7h17/+NV/5yldQFIWCggJWrVrF/fffj9frpbS0lAcffJCf/OQnPPzww+Tn59Pf38+MGTN48MEHHafueFKxs8jinYJlWeiKjq56sG3AIKXVWdB4uINXt+wklJfHLbcvo7gmBJyN/E8xL2UYA1OxSH2TLTeXxegx7piagDAbJRIJVq1axcKFCzlw4ACapuH3+5k3b54TmahpGvPmzeORRx7h2LFjzvGlpaVUV1cDF07wzCKLLIZYj6qlNDQLrLiJqmsoCgx0Jlm/7lUSFiyYN5uqaRNQPamDbDWVnK0oKaVNsd3h+/aQP23cGY+yuMIw7phaIpFwwr8ty8Ln82GaJmVlZUycOHFY8qMczaiqKpWVlUyaNOkcbUyE8Y8mgjGLLP4WoNigKTqKrWLHz+ZkRdsTvLphG01NJ5h3/Txmz52J6lOGfHFJFFUFRccSQSgKqEMZA2fz4rIMLYvRY9ztIp/Ph6IoxGIxx9YrIo9EeL1tp6qAiFw2TdPweDxomkYikRhmkzZNk0Qi4dQAzCKLLNJDQUFTtBQTMpxCIthxqNuxn61btjJtei1XzZ5CfmEqkEHRwFIMklYCi2SqBJfi5HGfLdtojztSlMUVinGnqQGOhqYoCv39/U7kkShynEwmsSyLWCxGMBgkmUw6ScxCg1MUxSloK0KAs/60LLJIB/tsHUiGGJFJSiQ24ciuo+zfdYAJxUUs/bsbCBeFsUgCHlBsFFVBwRw6yCLlO1NTHM8dIZJ9BLMYJcYdU5MTlE3TZHBwkNWrV7Nlyxanwkd/fz+hUIjly5fz7ne/m/Xr17Nx40bi8TjBYJCBgQECgQCJRIKamho+9alPMWHChBEZ23iL/rlUZP2KWZDKtT5bEgsbCxN7iLE50Y6kvu9ri/Daq9vp7uti+W0rmDyjkt7oAAZJLDRUbDRVx7LBtG1UJZWLporIkvFnLMriCse4Y2ruROqjR4/y5JNP0t7ezkc+8hGSySRTpkwhHo9TUFCAruuEw2EmTpxIPB7H4/FQWVnJgQMHeP7557nllluc/Ci3P07UdBMmTlFqCM6GgssZ/ZcKOXxXLqGU6Wr47jJZuq5fsLrGaOEOUxaVEcTaZzonD87WQxRJssL3mgm4z325LAKiIow7zP2cxGk3RGi+N/XGUBNYioWFlcomM1VUExRLIZkweHXza+w/dIBV772TqxdcjeK3SUSi2GigBgANy1LQFBVFUWGYzqcO18zOV+TkIqq2pNs/Y7XW7jUUezbdvrngGr+N8dL5/90pBPLzM9px051HWLZk2jTSsVcCxh1Tg3N7VOXk5HDbbbfx8MMPp/3typUrueOOO5zPEokEP//5z6mrq+Mf//EfCQQC2LbtREq6N45s0kxX/WO0RNGtCcr5VJmCGFNOqLzoMkqjHFdAFgbk3MNMQH4g5XlC5grQyueW8w5lRp4piPmmI/IX1MaHlsOyLAxM0CxsQEfFStpggRZX2L3hANu37eC666/jhmU3ECjUMSwTCwMLUb1fRVXTra+S9uVION9aibUV1yw+G8v1TVe6SwiD7pyysRjXLSinKxeWCQYuV0WRE8qTyWTGBd6xwrhkaqIumdAsIpEIAwMDTlfrnJwcp10MnJU0xI3asWMHq1ev5tprr+XWW291GJOo9A1niZGu63i9Xvx+P16vd9jmEhtaMMPRwi0NZtIU6H4A3K1ZLgfkkjyXc9x3IsHcPfblkGovKdFbIdWFesgyqGs6KT3NRrE1dI+GnYBTjW+xbfs2csIBlq1YSqjQN5RYnf46xqIO4vm+kwluJtdYnFsuNJxpyPNxC9xjPUc3HRNWKqH5jweMS6YmTEeQKlUTDAbZvXs3X/va1/D7/ZSUlDB//nwWLVo0LBLS4/HQ29vLxo0baW5u5otf/CLhcHhY7zTbTlWlFsV9e3t7aW1tpbe3l+PHjxONRsnLy8Pv9zuMdaxKLckSYKb6qI0E0Ujyco4rm5Iv17jCjJKucWYmIAiP2Ctyi51MMjfZHCfXPBXjXggWFqq4HxZoioJuaWBCb2s/G9a/Qk9vD3fefSc1MyswbdC8oJln7+XlLKskaq+m04AzpbWJ53Qs6zxeaDwhyGdaOJI1NtEQ+XLSo9Fg3DE1oRUJwlBbW8s999zD/v378Xq9nDx5kj/84Q9MmTKF//f//h8LFiwgEAg4klxdXR2bN29m0aJFLFiwwKlgLqrEezweenp6eOaZZzhw4AC6rtPY2EhXV5fz/Zw5c1i6dCklJSVEIpHztj6/ENybUzwgF1ul/1IhS5xC6uzu7nY2cKZMn+4mmbqu09HRQTwed0y8mRpXEFrLsujs7MS2bUerz2TLG13XnYrufr8fOKvpZ2pcQWT7+voYHBx0UlYuhhgqFiSMOB6fF8u2MZImYX8YzUoS6Yrwxqu7OXzoENfNn0d1bRVdXT2oPp1Y7yC6rtHV1YWmaU6haHeD0kvBhTS1wcFBp6WQHM3srm86FmOL9YvFYvT29qLr+jlV+sfivsoaoWCgPT09RKPRYT5oN0MdLaMTY4r/Y7EYmqY5bporHeOOqcHZTWUYBmVlZXz0ox91vuvs7OTxxx/nscce4+mnn+b66693HuT29naef/552tvb+cxnPkNOTs4wW7wwhem6TnV1NaqqEo/HaW9vxzRNampqCIfDVFRUOJtYbqB3qTf8QnbyTElj56vrlmmfmttHkWmp/nxzzOQav9Pjns+3lv5AG1VPJUQrqoKSUNBJBXok+wx2vb6X1197nZqaGhYvX0ggz0vMjKN7VaKRGGH9bNBVOr9tJiEENHnckeb/dpBOC0t378Z6vrLw4fblu8cZq0AROcBIHsNtAr2SMe6Ymuy8THfzioqKWLRoEcXFxfT09Dg3Rtd1tm3bxvr165k5cyaLFy92krKj0agjQSuKQnFxMStXrkTTNPr6+tB1nYGBAe6//37KysqAc4M4RiOZyf4AcR7R1mbChAkZk+bljSv8jslkkvz8/IyZGmR/gBAKotGo03omk/3FxANpmibRaNTp3pBpM46qqgwODgKpjhFy8EgmCb1tp3oHer1eCgsLhxGmkcdNJY4lbQOP4k3VdUymPj7xVjNHDx+lIL+AW+5cQeWU1LMQ8gcYiA9SWVmOiur4p/Pz84dpGplcY6/X62je4nWmhUGhMRUWFg4zf8qBbGMxjjA3CuE5Ho87RdjHeo5uIR9SPfkSiUS283WmIIihUMdfeukl+vv7Wb58OQUFBUSjUTZt2kQ8Hqeqqsohos3NzTzzzDN4PB7e//73U1RUhKIoToWRdNFNcJbwJ5PJYSZGWToareTi3iyX5OC/RIjzi9D2TBIfGL62MnHPNIGXJUzZ9Ho5xhVIFwiUaaY2UuX6EY9RUkEhpmnh0XFy1jqb+3hl42YGByMsX76CSVMnggKmmcpG0zUVRQGss+kwbqk+04wm3bwyMaasvaRb37EyPcrnk6M6MzlPt4adEAGDUwAAIABJREFUjhZdDh/paDDumJowKYjSVi0tLTz11FO88MILlJaW0t7eTkNDA7fccgt3332308hv8+bN7Nixg4ULF7J06VLnhgl7OKTfGOJGujUzt017tHNK99nl3DyXwySWbrwLfZbJcS+H5HnRZr/LgHSmrDS/wrRMQMM2QVEh0Zdg57adNDed5PobrufahVfjyRkSSLCxbBPdk4qS1BR1GPG7XJGeYrx3Apk2sV5OF4Gbpsn38kpnZgLjjqkJJ6wgSNdffz1nzpyhra2NSCRCQUEBd911F6tWrWLGjBnOTSktLeWDH/wgS5cupbi4mIGBAfx+/5i0Xc8ii78WKLaCR/VgpUo0YkYt9r1Rz443dlBdXc2iv1tIoNgL6lAgg65gWgZYNh5dx87WucriHca4Y2qGYTjalW3bXH311UybNg3TNB1btgizF+YBXddZunQpixYtchhZIBBwUgPcGfNZZPG3CwXVBssEFHjzWDtbXtlCTk6IpTe/i6KqfLDBMJJYmo2ua+ho2IaSqtxvX56mq1lkMRLGHVMTzEowN03T8Hq9aJrmhJ5alkUikcC2bbxer1O4WM4n0zSNwcFBVFUdN6GqWWRxOWDGQVeho6WPVzdtJR5NcMutNzNlRg22BXhB0TQUDCwsdHQUW0kFlWTlwizeYYzLLSgc0cJ5KfxdPp/PiRDyer1OFJRgdKJjthwcEQgE3smpZJHFFQXFBs0DiUSSjS9tYv++OubMmcO111+DElCwFRtTNTExSA4xNbnAcRZZvNMYd5qaaBIqQl01TePo0aO0tLTg9XqJxWIO0yovL2fGjBlO8rXoin3mzBkOHz4MwKJFi5ww2SyDyyILsBM2DXtPcvDAQabUTGXhkgX4ClVQSTE02wDFwrINbEU9t31MFlm8g8goU3s7IaAX+1tRLUCEZEejUb7zne/w29/+lunTpxMOh/H7/XR0dHDbbbfxmc98hsrKSjwej1OY+Pnnn+fLX/4yEyZM4KmnnnIYnxyplS4K8nKFDAtc7gCW8ZBYORYYT5Fco4WiKKAo2EOcx1bs1GtFTZkMwfkfAANOHjnNK3/ZiF/1suLdN1E0OZxqhaaArmooqo0JeBUfOhooytk2abwzUYjv1Jh/K/toPCFjTO18IfDpfpuuvphgXuIzOYlTURTi8biTX7V48WK+973vMXfu3LRJi8LP9uc//5mf/vSnTrktv99PIpFwctDkZGQ3ksnksOuA4Um9mUCmctXcDFxosmLNLvSwjuU1ibHGqrzQ+SCHLIsAodHO5XxrJef5iMRccUxGhQh7aAw1VRnEJNXZ04aUjdG2URUd1VKwDFAVwISBjihbX3qV7vZOVr33TmpnVkEC8DPEEC0UFHQ7RToUNGwbFM9QKzbzbCsmEbglPyOXOt/zrbE7x/Tt5OWNBulC38cq/1DeK+L9+c49Uj7kpYybTsEYT4F0GWNqIy18OiYgh+inS1AVTET8RjAkn8/nZLoLf5o8tpxQbBgG69atczSzq666ip07dxKLxZzzAI4fTrwXhFYONJG7BIxFArab8ImqF3Lh0kxBPrfwO17MmJd6TfJDKdeXE3+ZrDohE1sxT/E6k1Vb5DHddRAzloxsgWXbmFZqH5mWAYp8X1VUxSaVQQ14YLA3xisbNrNvbx23LF/B9Gumpvqqqak/00idR/OcbRRqW+KFclYLFNdgD+++kCnhQQSOiedcMFJR9m40GOl4IRSJP7kc11gwNrE35T0LODThUq75YpCu9Yx4n8lWWGOJjDE1eUO7S8bID7ZgOrKGJjaGXHFC/p3YtLZtE4lEiEajtLS0sHbtWlpaWsjJyaG6upqKigoMw8CyLDZs2MCTTz7JtGnTWLZsGWvXriUYDBIMBodpamIc4V/zeDzOzRXX4/V6h81lLEriuOHxeJyK7pkuHSUEBjG/i5nPWMxXzEsE9VxqUei3M5Z47fP5Mr6+MHzP+Hy+YXsno1BT1kCPx4Pu0fGoHmxSyWcKKT+YlbRQNBvFq2DETI4eOc62rduYMXMaS259F8FSn1NRxLZtdJ+Ojo5JioEoKKQafyJphpoTlewutZbJ4s1CGPV4POfQkkxBdF0Q8x1ruPesbdvDBPCLOe5SxxwvFfnTIWNMTV5YWRqWGZnQdmRJzl3pWiRHu7U0IWl7vV7mz5/PmTNneP3119m0aRORSITy8nI++9nPsmDBAl5++WWefPJJJk6cyKc//WnC4TBPP/00Pp9vmLYlzplMJmlubqa5uZnOzk527drF4OAga9euJRAIUFxcTHV1NXl5eWMiEcoamngII5EIfX19Tj7dWEOWJoVG29/fj2maw7oapMNofAnpqvSLNj+Z1EjlKv2madLT04OmaQSDQUe6H825zwdFUYhEIvT29hIMBp3PMqkh2ilORG9/L4ODg4TCobNmJUvFMizMmElOIAcsqN93hG1bt6FpGktuehfesE6kN4rHo5PEIGbG/j97ZxolR3Xe/d+tql6mu2d69k3raJ0RQkJCQggJ0GY2m93BGzh27DgJJ3GS4+Osn3KS13aWE/skOXFwEhLbgO1gMCBbxjISEkgI0L4LrUijdaQZzdJ7d1W9H7pvze1Wz0hougYJ9x+PezTdXbfqbs99tv+Dp0LHtM1sWRpbQyDQLJ1sbpuGJSxsbIcvVa0AofbF1WC471mWRX9/v3P49fl8zjxzU1NLJBIMDAwQCATyajGWwuKgVjlQlYOBgQFSqZTDVSvvRb3Xke5F0g0h66hJ3tLrBa4JNbVIZ2EnS80nFos5pw8pXGCQ60xOUvU0XegnCwaDPPHEEzzwwAMADAwMsGbNGv7t3/6NxsZGWltbeeGFF3jnnXf4zGc+w65duzh16hQnT57k3LlzrF69mttuu41x48Y52lkymWTv3r28+uqrdHV1ceLECfr7+0kkEliWxQ033MDdd99NW1uboz1ebVXYQlOFfM54PE48HicSibgm1GR7UqjF43HndbjT4OWE2uUWlWp+NAzDyRcshblouHtSfbPRaBS/359nurpaDCfUZF/FYjGi0aizQbgdlGOLwZIs0WiUeCSe9X3ZkE6ZGOgEjADpqMWpk6dYv3Y9F7q6Wbp0KXXNdQwMREhZafwhLykzRdpOEslkyKQzeLwehCWKCjWhZZ9VFtdVCY1HYr4ariCnbdt5Uc+ySvNQ/qEPgssJtVgsRiwWc4SaSuYwkjmlaZpz2JLPoWmaY5kq5KFV73Uk+4WaLiW1w2QymWdhGK5PrgW46lMrtlGfP3+e06dP09nZSXd3N7quU1NTQ0NDAxMnTmTs2LFOYjVkNTPZ0fK0LUPw5WeamppoampyTr6aprFq1Sr27NnDvn37HM1q7969HDx4kIGBAQ4dOsSJEydYt24dfr+flpYWILt4/H4/ixYtYurUqVy8eJF169YxMDDAAw88QDAYJBwO09jYiM/ncwIsSrVByQksq2yrrO6lRKFpWB4WTNOkqqrKVeEiF4scz1gs5rD0u7nRq8I0FotRXV1NIBBw1Vcgx1P6Y6urq4FBc5J7DduY9iBLf3U4nJN0WbOjLnS8Xg/dp/p4b99+YpEYc2ffzK13zscT8GDrJgHhx8RER6PSG3T8c7quI+yc+dHWAIHI+dQsyyKVTuLxeAiHw3m1uUaqQQwn1KLRKLadZelXtSY3kUgkAAiHwyXX1OQhoFgwit/vp7a2Nu+z6vsj1f5Vq5Fq4bhWhNbl4JpQU0mCk8kkPT09bNq0iZUrV7Jt2za6u7sd5nvDMKioqOC2227jnnvuYcGCBTQ1NTnBH4UM1Wql5PPnz3Px4kXGjBlDMJit5ZRIJEilUtTX1zNt2jRmzJjBY4895jDyRyIR/uM//gNd1/n0pz/N7Nmznc1Nal7Nzc00NzcTj8c5cOAAHo+HWbNmOZuSagYttdCxLMu5fkVFxahEHUmzjSyEOhptys1O+ppKVUH8cjBN0/HjjZaPS/av1F7c3iBMTDwI0qk0fm9Ftm9tsj4yAzDBitscP3qcHdt2MKZ5DHfevYhgfUU2MEQ3AJtEMoHP6ydjZRAIKn2V2NjkRBpOxrWMOclYznP6/f5R2QhlZDPg+EpHC1IjHY02pWXDtm3HjO0W1Kok8hB4tdao0YareWqyM/bt28ezzz7Lyy+/zIULF/D5fM5pQ36mq6uL//u//+PXv/41Dz30EA899BCLFi3Kq58mNSJVRd68eTNr165l0qRJ3HHHHfT09PCTn/yEeDzOokWLGDt2LIZhMHbsWOc6PT09hMNhTNPkhhtuoK6uzhFQhdFL0hSXTCYvKaAH7jO9j1bkozRBuo1izyODeUoRCn25ttVIrtEoPaO2rfoNR2oWG7Ytsj61eCKWPXDZYKVA03JvpgELOo+c5vW166gIBFi2fCl1rTXZ9/w4eW26RwcBmsimBlgUpOrYilDLQfKwqs/pfH6EEYFD/X0of5Kb/VwYKVzKuVR432pw3VBzqBTPKp9BNdWrAWUjvf5owFWhpmkaPT09fPvb3+all16isbGRFStWsHz5cubNm0ddXR0AZ86cYceOHaxbt4633nqL//qv/6Kvr48xY8Ywbdo0ID9STw3qqKqqIp1O8/zzz/PMM884RS6ffPJJPv7xj+fZ9OXpI5VKUVNTw8SJE/H7/Wia5oT2SxTL0SgUZG5tiPI53Z486iIohf/hg6KwndFeLB/G4lT72j2BamHbFj6vj1QihWmZaAaDBT8NOH+mm3Xr3iARj7H4jjsY3z4uGy6ZS7IGOxsQkpvrxQ5vAi37WRtHYRNa/rwq5aFsqL76sE1jo7lehhMupbgPNXis8G/XujCTcE2oSb9YLBbjxIkTLF68mC984QssWbKEYDBIKBRytLBp06axYMECHn/8cd5++22++c1vcubMGU6ePJlXPkZlEpGdfsstt9De3u5E7snw3vr6eifwQw6KVKdramr4y7/8S86dO+cINUmUfL0MXBllDIdUJoXP8JFJZ7BNBqmsNEhFM7y7cRt79uxm0aJF3LxoNkYol3tm4AgobRhqWKESPapL5qNPSFPGNQ7XQ/qDwSCf//znmT9/Ph0dHXn8iuqJzu/34/P5uO222/j3f/933nnnHRobG4HB3DFVJZYckFKA1dfX57Uv/VIwKGDlCcS2baqrq6murnZOzNFo1PHJlVHG9Q5Dzy7tRCKRPTzaZDU1HfZtPcjmt99levt0Ft45n1BdEDuTZQWxuJTlXCAcZcymQKCVUcY1BteFWkNDAw899BD19fXouk46ncYwDOLxuCOUJOLxODU1NVRWVtLc3Ew4HHbeU3PbpCkwmUw6zmiV5ikSiRAKhZx/ywAI+T01x0OaHYPBYFlTK+MjA0MzsGwLbIEhcmZCASf3nWXtr9cQCAS4656P0TS+ETJgYSME2JjYGFnTooSdpXd0XovA5vpgmyjjow9XfWqmaeL3+/F6vY6TXGpZfr+fTCbDnj17iMVitLe3OyHdlmXR2NjoaFGGYThBDKlUCl3XnahJmaMSj8fzohAHBgac/DcpSE3TJJlMAjiBIVLAuZ03VEYZownTNtHQsn61WApsGOiOsPb1dVy8eJEHHnqQlglNWbYQAZpHYJLBxs6Ks8KlYBe8ls9+ZVyjcJUmS80rO3/+PKtXr8YwDO644w68Xi//9V//xU9+8hOi0ShLly7lz/7sz2hra3O0N5nIKEPMnRwZIZyE2YMHD/LUU0+xfv16QqGQExQSj8d57LHH+NrXvoYQgkgkwvHjx/nxj3/MqVOn+MM//ENuvvlmUqlUnnAro4yPAgQCTeQoz2xI9abZsH4Tx44dZeHCBcyddyO6V8sW/fRkORutnMTKxYkMd3EHZQ2tjGsNrgo1NWS6s7OTb3/727S3t7N48WL27NnD//7v/3LixAlCoRA/+MEPmD59Ol/60pccX5dKa2QYhhNYoiYEdnV1sXnzZhoaGviTP/mTvKid8ePHYxgGR44c4aWXXmLNmjW8++671NbW8ru/+7uOFliYPK2aIS8XieiWyXK4ZFM38JuopX4YzzzScS1UmLS8d2T4tYHH1iADRsYgFrc5dqaTDW9tpKGunoXLF6BXZ02SQoeMbWLbFppQ8s7UqEb1FeXfQzxfsd/LKD3cdJcU7oHXE0ZFqPX29rJp0ya6u7uprKzkwoULrF+/njNnzjBu3DgWLVrET3/6U3784x+zbNkyxo0bh9frJRQK5QWIFMtBCQQCCCHo6Ojgvvvuu+Q+TNOktraWW2+9lXA4TDwed7jppE9OXktql2oOk0qeLANP1AEvBQ1PsZDZ0RBq6qSVWrDMGXOL0FR9RjXZXeaPuZn3V0jVJP20bkMlDZBz7MqIlHO5XjnRJQMYAaxs9RgMLfs5DQvLNjEzGQxdQ6SyQs2n+zi0dxe7du/E6/dx9yfupmZstSOYbAG60B22ESArKWW3DPXq/DP/GSwr7RwS5TwqxeY73FpQ15D8XfY3lG5THi5PTm2nFKkxKqMIkDd31Gcsdi8jWUNqypTKJHI9HVBcDRTJZDIMDAzw0ksv8bOf/YxoNMrp06f5n//5H95++23S6TSappFOp6mrq+PgwYN897vfpbW1lblz57Jo0SLq6uryQvnVpE4hBKlUCiEEFy9e5MCBA4TDYYQQhMNhvF4vmUyGyspKh/Zq9+7dbN261WHsKMxHg0HuNDmYKnu9ilLkGw2lBRbWlnMDxXLxirGru92+7IPRYDFRy5KMVn0oNcDpg1EO5X8mT1ESuR+yJWYsbDSho3k0MHPVqGPQfWaAfXv30dvXz5Jld2bLyUiFTMgWBE6Fz2LNDyHQikH2q9q/pRAqw11DHozkHuFWonCxvLCh5lGpn1kVlMPNoZG2W9hvMoq8LNQYpECSFFlSeJ09exbTNDl69Ci6rjN58mSampqoqKjg1KlT9Pb2EgwG6evrIx6PX5LIqdbgEkJgGAahUIhdu3bx93//99h2lv/tnnvuYfny5U5Fa8uySCaTRCIRIpGIY3qU96qesjKZDP39/ViWxcWLF4lEIggh6OnpIZPJEAqFqKiocAZb/j7S/oLBTVeyMrg1oVRhLP2VkmfTTcZ89QAgT4Oj1a5Kii2fVyWgdatd6QOW7UI+v97QkBpajkFCDP4ur42WKyNj2dg5QWcnTXRbJ52w2LN3D6dPn6Jt6kRm3TQT3SswExbCyHI15q6EqgfaI+gLtT9lxHEpuBAvp6mp66VUfJOXa1+2KcdUjqeqoV4t5H5ZSPSgzl03zI/yepJIXrbnVnkdN+Bq9KOu69TW1vLQQw8RDAbZunUrlmU5OWWVlZV8+ctfpqWlhVWrVlFXV8fjjz/OjBkzCAaD1NbW5p1I1MJ1csCnTJnC1772NY4fP04ymeTMmTOsXr2a7du3A3DfffddIgglyau6GGT4v8fj4fjx4/zoRz9i7969mKbJyZMnSSQSHDp0CNu2WbhwIXfffTfV1dWXMGZfDVSzmHxWaSZ1S2NTDwty8soSMCrfphvtFo7nhQsXSKVSpNNpV9uV/WiaJt3d3U7k7EhZ+i/XrhCDpWcK2c6HbldArro0ueKbQthYmNgCyM1dXej4PF6sjIVl2ng0HTstEHGDQ/uP8fY7b1FVHWbevHnomoeukz1ggDByJqxcFWyncBoowu7qnre7u9uJNi40o43kusO9JwmNE4kEXq83T6iVsvisum6SyaRTwqiQZk8KtasVbDJqWz1sCyGc0jOq4B7qHq/2+eS15TPI9KvR5tW8Wrgm1OQJ3OfzMWXKFOLxONOmTePAgQP09/cTjUaZO3cuCxcupK+vj2Qyyfjx47nhhhuYPHmycx1pepRqvlp1Wtd1qqqqWLFihfP5VCrFhAkT+Mu//Et+9atfcf/99zsbt0wBSKVSJBIJZwOX15YbaiAQYMaMGVRWVpJIJNB1nd7eXm6++Wb8fj9tbW0Eg0GHhQQY8WAX2uEty3JIYd0UajDI+yirDqjP5Wa7UqhJAlw3yYULNTXJP1pY9siNduUJW62efnlNTQz6uURO0IhsarSJjYbAMrNsIV6PB0sT2BkL3dDRdYMjR46z7s3XiSXjLLlrCVNumIhl2xi6huE1BmMdhY1wxmTkQk3OW4/Hg8/nGzVNTWouci4V+thKMb7F7kEScau+Q9V/erWQ+1Whn066W9xiQJL3rlYfkeM3Wub6kcJVTU0dkMmTJ/Pkk0/yj//4j+zdu5d58+bx5JNPEgqFWLlyJXV1dSxevNhJuC4sZV7of5GDLM06sjaWpmnccMMNNDc3E4lEHN+Z/LyMopRVa1XTkFrK5qGHHgKyNd+effZZurq6+J3f+R2qqqqc55OmTig9sbEsZVFTUzMqk0ntTzXp3U3IMR4YGKCyspKqqqpRCdwwTZNoNEo4HM5juHETcjylz/eKnvOSnDAbMLGxFFYPARhZtpDcR8539nHgwH4SqRhzb76J9hnTqKj0Y6YhGKgoThtStL0PDmka83g8VFdXj1ogjlwjKv2e25AH43A4PGptQlawyQjx0Yh+lArKb7z5UW5YsjN8Ph8PPPAA48ePp7u7m4aGBubMmUMgEGDOnDn8+7//O+Fw2Cntol4DBn1NcvOV137ttdfo6upi0aJFtLe3c/HiRX74wx+SSCRYuHAhcKnzU2oH6qBJM6QaCWjb2SrYsjhoIpGgqqrKeR9KE1arnujU0+VwhRFHisL7ViOqRmuxyGdTn3c0Fs5w0WNut6lWgB/+C1ySK5bVoCzAys0N0DUv2GCnQBiQHIAt7+5k284dzJ8/l2XL7siGSNrSH5ejvLIvTUUTJRBqhdF5V+Y7HBnUsSwMJHOjLci3qBTOo1K1re5/sg3VLzvU/ZVKK1WVB+ke+I02P0K2I2zb5uzZszQ3N1NTU8Ptt9/uFPyErHC66aabHDOFfO/kyZM0Nzc7xTILS5PI025vby8vvvgiTz/9NA0NDSSTSY4fP84TTzzBo48+ihCCCxcu8Mwzz7Bq1Sp2797NxYsX+fKXv8zChQv5wz/8Q6ZNm+aYJgEnukjNsysmeNRw25FitMNmi4UMq4ul8HlL2a56MFHhtkaq+lbV391sVxVihRviB92AhPqbMEilkmRI4fMaCAPQ4N1N23hj/Qamt0/ntsW3UV1XTVf3eTAq0QSYaRvNEHmCSxRv5KogD4iGYeSZ4AqffbRQauFW7CBY2Fap2rvcvHQj+lENHpP/BvIO8aVus9RwNaTf6/Vy4sQJXnnlFW644QZuvfVWp7id7DTpI4OsBpVKpdiyZQs7d+5kyZIlTJ06FRgUNEIIx1FqGAbLli2jsbGRrq4ux+nf0dFBe3s7dXV1Tod3dHQQCoX47Gc/6/wtEAg4nJRDbTiFtnn1vY8CimlOo92uxEelT0sCQb4qJeT/ZYuiCZEtiGmnBHYq25dHd51g8ztbqa4Kc8ut82me0ICZMklbSdBy/St9dC7e+mjOow8TH/Z6Gc22rye4Xnqmt7eXl19+mRdffJHHHnuMe+65h5aWFifpWaW+Onz4MBs2bOD73/8+mqYxY8YM2tvbLxlQNb+spaWF5uZmYPDk5PF4LrHtL1u2zBGKsk1JZixDu0er8nIZZXxgyOQ06QyzQdgCoWW1ru7T/fz6V+sYuNjLx+5ewbT2SQgPpOIpMpbpXMS2LYd1H6d6dRllfHTgmlCTQqe6uprGxkZWrVrFoUOHWL9+PbfccgsTJ050Qvb7+/s5evQoGzdu5N133+X06dPcf//9NDU15anzMhdM/ZuqHsvfZcSiNHGqydRS0AkhnCCP0bL9l1HGVcHO/p+dy5gWNmCLbLkYDaw4bNm4lfePHeO2WxZx87wb8ASzcz6VSaF5cwFXtkXaTGEID0LTiouzYSiwyijjeoDrIf21tbV85Stfobm5mZUrV/LCCy/wq1/9ioaGhryk6yNHjmDbNq2trXzlK1/hgQceoK2tDcDx9UhWBpnP5PF48gILpKYmQ2GlUzOdTjth+/F43Ak1llrdwMAAwWDwuglZLeM3BEIJCLC1XCDHoO1Q6GAnbd7dtJMNb25k8sQ2Fi+6FV/YK6lGEJqN15tdB0LLpZ7IAyGDMkz+lFHG9Q7XWfqDwSBLlixh+vTpzJs3jzfeeIM9e/Zw8uRJ9u/f7+Ritbe3s2DBApYsWcJtt93G2LFjAZyyMbLYYWEycjqdxrZtJzdl//79/OIXv2DSpEk8/PDDTs22gYEB3n77bbZt2+YESbS3t7N8+XKqqqqckjZllHFtwII8BvxBs6MUaraA40dPsW7NOnxeH8uXL6NmTMj5qCUsbGFjCyubl2bbZclVxkcergo1KWhs26alpYVPfepTLF26lMOHD3P8+HEuXLiAEIL6+nrGjBnD1KlTGTNmjPN9KdCEEE4UpKq1qUnZlmVx7Ngxvv3tb/P0009z//33s2LFCmpqaujt7eX555/nhz/8IX6/n8bGRi5cuMCqVavYv38/X//610tGvFpGGaVBLlpSmGDrgJllGLFz4fgmdJ+NsnHDVpLJFHd/7GOMm9aaXdEFASZmJkPGTCMECKGXS6KV8ZGGqz41yd4hhHCYO1paWmhqauL2228f8rtqorSaoa/mMUkGAWliPHz4MM899xxr166ltbU1jwX90KFDfP/73yccDvO3f/u3zJ07lx07dvCnf/qnPPPMM3z2s59l/PjxeX66Dzvi58PIoxrttAK17Q+jrdF91izV1SVtDrJTDdoCc6+WsEBkQzmEnfMLm9n3krE0297dzt7du5g9axY33ToDw6MNJlWLXBiIJtC07NoTCExbYCPLzJTe7Fg+GH70cL2Np+tp8FKTUvODCv1ghTQsxRaGyugvA0XkdU6dOsVLL73E5s2befjhhzl69KgjTAGHGFmSGwM0NDQwbtw4zp49i23bTmpBsZw09RVKm0+lJqqqz+/2hluYU6OWnimWmK1iJJNcHWs1UVa+55ZfUz0YqfPxSuiMRvK8tshNOYmEAAAgAElEQVSW38z+lyNsth2plftQ9k+CrElRWGAJm4yRNZMbQmAIkVXW0mClLQ7vP8w7GzYyrrWVpStux1/py65mYWPZNpoQ2DZYFmQyFsLK1k8zhIY9VNTjFT7mcP1VyASk5nqOBMO1WYwwoFj+WKlQuHaKJWSPNF9tqLy+wtQi9TOlyAVUn0GteKBy0xZLNh9pu6WEqyH9Ho/HSaYu3EzkxCg2AdTseSGEQ2tlWRbpdDqvBtqFCxf4z//8T7Zs2cJnPvMZpk2bxt/93d+haZpT1XrSpEnce++9PPfcc3zrW9/ivvvu48KFC2zbto1Zs2YRCATweDxO/puq5clgFMlnB/kDP1IUm/zSb+gmJ2GxNqWwcTNgRr22fHbpK3W7lpravuqbdXMxaiIrQHRNx9Cy60HkmPXVCH3J5iFsQM/dHzoZTITQsDI2uinAB2cOdvHqS6sRwIq7ltE4rja7kqXbTVjYGGhCYBg6hqFn25R9MULdbLj+kpys6niWon+Hu4bK66qOr1tQD7rF2OtLRcZQ+G/ZnlrpYbjvjASqoJKkGNdLzIHrIf2FUlxlrSgslqgyTRQzBWqaRiAQcPLL+vv7ee6559i9ezePPPIIn/70pzly5IgjhGREY1NTE+3t7cyZM4fu7m6eeeYZuru76e3tpaOjg0AgkKctJZNJ3n//fQ4dOuRU1u7u7qalpYVwOExNTQ0TJkwgHA47fr3hqGuutK9Uho9YLMbAwABer3fYyXS1Gp16epX3f/HiRadSgVts+erJT0aw9vX1kclkRly+ZzjIcQKcigS6rhMIBEbM0j/cd00rg27oxCIJ+i72EagIoGsa2ALLttE1nWz+2OB9go2tQSITJxQMEk2bmAmLoLeCc6e7WL9uA/39/dy2aBGNzY1c7O5D0wWmbmLqJjYmmm0gbIhEIsRiMYLBoGMVcdtEePHiRUfIyLmlaualhm3bTjmpVCqF1+vNKydUKpb+wrWWSCScygtS2EjN9EosAMO9r15Hrgtd152SXJJLtJjGOBLIg61KFRiLxRBC5Fm6rmW4JtTkpC7kuitUZ+FSE5wMwQecfDM1LF9+9vDhw7zwwgt0d3czc+ZM/uM//oMTJ06wd+9eAoEATz/9NB/72Mfo6urixz/+MTNnzuTP/uzPSCaTbNy4kTVr1rB//34uXLjg3K8Q2ZIShw4dYt26dVy8eJHjx4/T29vLxo0bSaVSTJs2jcrKSurq6ohGo45WerUDLvtDnaTpdJpUKkUymXSNpV/2t5zEqVQq73W4+71aSPOFyhEoN6JkMunaZiufVfa12reXO5CMzNxqops6qVSSZCrpWANs28a0TTy6Z9B8RtadZmFlI/IzFqZhk+iP49N9RGJxNrz+Fgf2H2DWjbOYO+8mNKGRTlugC/ojA+g+DY9XJ51OotnCeU5JWVcKoXa5eZ5MJp0+Vq0xI8VQ7co5JNN5bNvOE6SlmlOF7cs1mkql8sz2UpiPxI2g3rscM8MwSCaTTrvFxrEUY6vGL8hxVPfHa12wue5Tk5u0qm0Bl2zU6kBITUFuNjLIREY/ejweNE0jHA6zZMkSjh8/Tk9PDydPnnROMpZlsX//fm6//Xb27NnDsWPHWLRoETNmzMDj8TBt2jSEEHzjG99g586dNDc3O8U+DcNg3rx5TJkyha6uLn71q1/R19fHo48+SjgcprKykpaWFgKBABUVFXl13q4GqlCX/RWLxfB6vTQ0NAwr1K52AhceOCRfn2ma1NfXD3uqHom/QPUHSE0tmUwSCoUIhUKumY1UM7dcqHV1dc74DYfL3dPlfEy6rhMLxNB1nfr6ejRdw7YtLNtC17Lhijb2IIWVbSNsgSYMzLhNZb2NoetsWrOZQwcPM3nKFO5YejuNE2oBqPRWgAf8CT+6V8/aMC2BZgv8fj8VFRXU19cX9d9+UFxuo5bvSSYfdXMe6WY7nFCT1hbpSiisoVhKn55cpzLNSKXaUwPbCr9XiMvdk+qikYJSCraGhoYhhdpI1pDq35ZtR6NRhBDXBZkxjAJLv6qh9ff38/7779PT05PH9iEDNTweD8FgkI6ODoftQ15HCg3bzhYC1DSNyZMn86d/+qfEYjGnqN6+ffuIx+NkMhm++tWvMmnSJHbu3MnZs2c5evQovb29NDQ0EIvFOHr0KJDlgJR0WZqmEQwGCQaDNDc3U19fz759+6ioqKCjo4PW1lbnPtQTVCkmkuwn1Xwx0msP16Zc7IURpmoQTjGMdHMqZhaSbbrpQywM9pE/l2tzJPekCR2h5V4dn6XAzjnAhPL/kBVvGhqapSPM3Pj44NShs7y1YSOGZnDLwvk0T66HrOUSM21i2eDz+bGFRcZK4dG9YJH3jKqZyi1NTWpIhb7pUgVODPWevH7h86rzq1SQ7ck1Iv2zar+WKjhGPpMqnGXbbmhqEqpVQyW8uB7guk9NPWWcP3+eH/3oR7z55pvE43GH9Ng0TdLpNBUVFTQ1NfGJT3yCu+66izFjxuRpedL3IfPf0uk0NTU11NTUOIPZ3d1NLBbD7/czYcIEDMNg9uzZLFu2jC1btvC3f/u33HjjjXR2dvL222/z8MMPM3v27LxJKjVEmbgtn0eeVNRJXYpTYLHvq6dqN1DsvlUtajTYVdQoOXlPbkG9dmG/utougJUNzhhsV+RIrwZfBz8vN2EgV06m92Q/r/1yDfF4ktsX3870GZMRusimAxhg2wJNgCZgIBHD5/U54fxwaUCTG/NVRbH+HY02i33ejbEt9PfLtksp0NTrFV77Sr9zNVCfSe5vuq6XhRoM8izKkwZkhdL+/fvZtGlTXgSjrLmm6zrJZJLdu3ejaRqf//zn8xyu0vcjuRsL/XJCCKqqqpg3bx7V1dWkUil8Ph8dHR381V/9FT/84Q/ZtWsXJ06coLa2lvvvv58HH3yQhoaGvJNQYckMqZUVLhQ3N/9SbASXgypMVEf+aAkX9W+jYacvNOeMRukZiUJfVi5rjVQ6hWVaBP1BLMtEEzlftJkLZozCu29u5tDBgyy49VYW3DYPT4UBJuABNNB9GiIbUInP68sFnwxd4sdNqPNotErPqIKlcB6NVrvy36Vat0MJymKCrpRQrUSF9+HmQaGUcN2npi4ouYGMGzeOpUuX0tzcTDwe5/z587z44ovMnDmTZDLJkSNHeOONN7jtttsc/kep4qtqsYQqeFpbW/nrv/5rh6ILsvb98ePH8/Wvf92pci0jKWUpnHQ67bD0DzVo1/pgjgTXgwP4owbbtvEaXjDAtEysjI1mgG7rWQnlhc2vb2Pbtm1MmjyZuTfPwV/jHcyY1siVlMFhCdE1HY3BHO4P67nKuL5RaNm4nuCqT02qr1LLicfjDAwMMH/+fP7iL/6CiRMnkkqliEQinD59mubmZu6++26+/e1vc/z4cfr6+vJ8aTJyTNqT1bwxGaljWVZe9exUKkU8HicQCOD3+4tWrDZN0zFpfpQFVxnXFuRhzKN70RDYHhBmzqxoQ9exi7z++npiyQSL71hM67SmQWGWVcay11GuqTF6WlkZZVyLcG0FFDpNIZt71dnZSV9fH6Zp4vP5qKyspLa2lkAgwC9/+Us6Ojqorq6mp6eHZDKZd021mq4ayKBqbX6/H9u2iUaj9Pb2omkaVVVVeYz+hcEKmqaRSCTKAq2M0YXImegyNmbaQlgC0oAFqV6Tl198mWQmyZJldzL1xjZAYJpkBVoO19cZuowy3IfrmpplWY7PTDKDbNy4kaeeeoovfelLeDwetm/fzu7du52Tq2ma+P1+x+8m8ySKUe7E43En2VqGn548eZKmpibq6uqwbdsxcUqGESEEPp+PaDRKXV0dDQ0NecmMZZQxGtDQ8AgPGcsaJOQXYEdtNq3bxMGDB7lz6R3cvnQxwhDYFlkOLTQskUsDcL4m/yujjN9suO5TUwMsmpqaWLJkCb29vXzve9/jmWeeob+/H9PMcuJ98Ytf5NChQ0SjUdra2hx/lzQzqs52NcxVCrT333+ff/mXf2HVqlU8/PDDfOtb30LXdXbu3Ml3vvMdtmzZQigUcoRnMBjkE5/4BH/wB3/gCMAyyhgNCBsEGrYNhq5nTYkWWCmLI3ve59VfrGbmrJnMWzAPT6UGJggv6JqGmSslAzJasizKyihDwtUiofJValitra184Qtf4MyZM2zYsIFEIkFVVRVer5e2tjYefPBBbNtm8eLFTJo0iVAodMl1VR+dGmZ/4sQJnn32WZ577jlHOKnmxpMnT7JkyRK++tWvMnbs2Dzqmbq6Ore6oYwy8mDnMqyF0MhkTCwTPJohqUQ4eeAM61avJxSsZOmKJTSPqXe4j0VOfkmCZIGWZdx3QkOcRspyrozfWLgm1NSoR5m8ZxgGN954I9/85jc5evQou3fvduqbzZgxg46ODmKxGIsXL0bXdWpqagAcTU6aCGVovwwa6erqYuXKlWzZsoW7776brVu3XkKaHAgEqKurY/r06Y5ZU4WMniyW1FiYj1IsbPh6N1sWe+ah8EFzhob6brE2R7MfC8Oxh8LVPq+wBWTIeq5tsG0LSzORnjBd19GFnvWjmRA7n+Cdt7Zw9PhRHnnsEcZNbgVf9vuaDqZpOcJKkBVy+Tlul8dIQ9wvZ80o5ksvBS6XfO0WhhzbD2m9F9uHCvu71CkFMjK6WN7stbjvuVokFC4tJ2KaJhUVFQ4hsIxI1DSNQ4cOMWnSJKqqqvKuoWpc6XQaj8dDJpPB6/Vy4cIF/ud//oeNGzfysY99jJaWFvbt23cJf1ksFuPEiRNs3LiRYDBIbW0tjY2NVFdXO/l0avkZOVh+vx/DMJzcOLg0/L3Um7HKHODmpFHHxbazRV1HSu4LVz7R5edUbX40cuTU9krBJD/sd3P1zwyhYWkmQkAmJ+l8wuP40tIDGd56YwsHDr3H/NsXctOiGxFB8iSV7slRLyEAfWhxJgWfuJSlxe2xFWKw6kKp18Rw78n3C3Py3HxeyXTkRv5W4bWKzdPCz5SifZUQQe678hmlcnGl9/xhwfUioVJT0nWdeDzOxo0b+dnPfsb27dtJpVJOVKLkXHz66adpb28fsvOkkPL7/QwMDLBy5Up27NjB8uXLeeKJJ9ixY4cTwi/JakOhEO3t7bz33ns89dRT9PX14fF4ePzxx1mxYgV+v59QKOQMYjKZ5OzZsyQSCWKxGF1dXUQiEQ4ePEhdXR1VVVWOaVQmjY+EYV59VjmpEokEyWSSaDTqeskHOUaRSATTNB1fpltQhZcQWQ49j8czIlLoK2lT9q1pmsRiMec5S0l6m98oaBkNLaMRT8RJpFLEkjFM20LYWYuAkfIgLMH+nYd5a9Nb1DTUcNudCzCxSccSoI2MxSEWixGPx52agm5DBmZlMhn8fn/eAdDNsU0kEkB2/bg5j1Qkk0nnJ51O5z1nqeaTqiVJcopkMkksFivJ9QuhrhNpvUokEpdEnF/LcFVTkycoaSo8deoU3//+93nllVeIRCJUVVU52pEM8S8M4y+Eqmq/++67rFy5Eo/HQ1tbG6dOneLIkSP09fVx8uRJDhw4QGtrK9OmTeNP/uRPOH/+PJlMhgsXLvCDH/yAb3zjG5imyac//ek8Oq+uri5eeeUVDh8+TDqd5uDBg0SjUSKRCB6Ph7lz57JgwQKqq6sds+rVLqLCBS8nTjwep7+/Py8VodRQT7eyHIvM2bscofFwuFJTkTQp9/T0kE6nMU3TNSoe9eQpn9UwDIdh/XKawHAYzvwo0hpej0Fvoo/IwAD9AyHS6Qy6ZWAKCz3p5fTRM6x7fT22sLlp7k1U1YTojfRjxtKgXX21BNu26e/vJxKJOKku8u+l4iotdk/y0FjIVDMSQXO5ORWLxRyiarX0jFvmVnkY6+3tdcpDSXo92fZI160cJ9l/hmHQ19fnHAILWUZKYX6ULEyquVFax4LBYEn61G2MiqYm0dPTw7Zt20ilUtx7771MmzaNiooKfD4f3d3dhEIhGhsbLzv55YKUydx9fX08++yzmKZJZ2cn6XSaNWvW0NTUxBNPPMG0adO48cYbgUFzaG1tLU888QRvv/02n/rUp5x7BhzzaDAYJBaLEY1GicViTJs2jUAgwMSJE6mvrycYDDoa2kgEm7wvdZLKAJjq6mrXT0hSqMmfcDjsWluFQk3XdSKRCJWVlVRWVrrWrqwPBTjm6HA4TCAQcA5dpYeAjI3QNERKw9QyhHwhbMPGp/vx2D56Lvbzzjvvcq7rHPd8/C5uXjyLDDbB6gp0I4BTPfQqoeu6w5gP7tJGAY5g8Xg8VFVVjQr9mqySYdtZln55KHN7A04mk9i2TVVVlVPEWGU7GsmcUvdPtVqJZVn4fD4n3qDUKHQXyQMDXJkJ9FqA6yH96obh9Xqpqqpi6tSpfPWrX2XWrFl4vV7n1OPz+Rx/2uWuads28+fP51vf+pajYUSjUbZv387TTz/N/PnzHV7HSCSCpmn4/X48Ho9zkpImL7koJLFyZWUly5YtwzAMLl68SCqVIhqN8vDDD9PQ0ODQaUk/VKmEjmoGs22bZDLpFDp1A4VJ6MFgcFTMj4XtyxI+brarLlbp11VLB7nOj5iw8A34qTAC+AI+hCZI9abZv2sfZ06f4qY5NzF34U0E6nxk0haGtzT3I9fKaI2p7FuPx0NFRUVJy78MBalNAE7pmdGAYRh5rg63IDUmWcBYFrcdLViW5ZTz+o3W1CTUjbO6upqpU6dy4MABDMOgtbWVdDpNJpOhrq7OMQUNNynVkja1tbU0NTXlvR8KhXj55ZeZMGECCxYsIJVKsXLlSrZv386iRYuYP38+x48f55lnnsHv93PLLbfkBYHIa0vBFQwGnVOY3+93JpM0WakpBleLQie3nMSS9sutyTNUhGexKKehvlcMV/pdqT2pWqKbBNHy3oo9oyvmVmEjhI1pW6QyKSzTxhDebMRiAg5uP8ymtzbR1NTEwiW3EKz3Y6VA82pEkzF8Hh/aMDGNw92XvCfZr4XPPJJ6alcLN82Pw33OjXZlYJk6b9UYgpHO42JjK/cEOZ5uHMbkM0ghKq0ppQ44chOuCDWpZfj9/jwmdBm+v2bNGv7u7/6OF154wREgyWQSr9fL17/+dafgXzHITVByQqoDm8lkHIYR+TfDMPD5fLz77rv88pe/JJPJEA6H8Xq9/P7v/z733HOPw3giIyrVqsyyPI5qBoDByDL5uZHY7Ic6yRbazEsJdYMr3PDVvxVDqSLK5LMVq/lVaqj+pMIN/koi+q4El4wfFhY2CIGOjkfzYAgNOwWn3jvLpg3vYFs2t966gNaJjdkvaWALG8NjoBWE7F/NfQ3Vr26aAgvX7mhVCSgWkeyWViHnrUqyLv9eimhI1YSpPofaRqkjTAuvD/n70/UCV4SaEFmWD2lSTKfTeL1eBgYGOHHiBN3d3axfv97xrwFO7tiTTz7pXGMoSA1GFWZygi1evJj//u//dir9CiG48847GTduHAMDA46PIRAIMGbMGCorK53vS0Gpak6ZTMZZqKoGqZ7MRqqlFfu+WmDRDai2fyDP0S3fH8m1rwSqj2ukwQtXck+yDdWRX8pTdeGmagsLW0AylaaiIsj5xEVIQjKR5M21G+k618WdS+6kbcYEtAoN28rmo2UTq224jFC7kuctjDQt1YFkKMj+VU/6H+T7V9NuMcFVyujD4dotFuZeink8VLtDPWOpIi6LXafYPLqW4ZqmJku5qCdi27aZNGkSCxYsYGBgII9xP51OU11dTTQavfxNK9Wg0+m0c2qR/rA5c+Zg21lWf13XCQaDzJo1q2jwCnAJQ796MhrqRF94eirj6vFh9aPbi1Ogk0jF8Rp+ov0JdKFjCYutG3by3nsHaG9vZ9acmQSrK0ADy7YcEaZp2rCmxzI+fFzOTF/GhwPXNDXVPySFW3NzM1/4whd4/PHHyWQyZDIZfD4fhmHQ29tLdXU17e3tw167mP1calgyAkqGvMp21c0rnU47NmJJlCyEcLTJMsooGWwbj+bBIzSiCRtSGsf3n2Hd2nXU1NRy54o7qBoXzFWvtjEtE6GBgY6BjotFNMoo4yML1wJFPB6PE5EkmfrD4TCVlZWOY7XQ9JNOpy+rutu27QSTSOEpAw6kyUOlwSq0TauCS+Ypeb3ecj21MlyAwKt7wIaqYJCje97nnQ1vY1mw/K6ltHQ0AFkNzRImulcgbLAzWdYQTamZVkYZZVwZXKfJisfjvPzyywghWLx4MVu3bmXPnj2OEFIDNFKpFL/7u79LS0vLkNeVvibVESyTA3Vdd3IqhBBOqRupicViMUdD0zSNyspK/H6/Y8Iso4ySwwQzCclIhl3bd3H21DnuuPMOZs7OWiRszSYjTBB2lvhKaGh2WUMro4yrhash/R6Ph2PHjvHUU09RU1PDmDFjeOWVV/j5z3/uCBK/3088HgcgHA7z6KOPDivUIN+fJQUXZDW97du38+yzz3LTTTfxhS98wTFHrl27lg0bNpBMJonH4wSDQZYvX86SJUuoqKggmUw6YfxllFEKiBxbfjpusnXzdg7s3c+c2XO5ddEtEAJMsA0bi2wCvwB0U4CVjZgso4wyPjhcLxJqmiatra1UVlbi9Xppampi3LhxRCIRfD6fk3chc9WkyXK466phrlLDSiaT7Nixg3/+53/mxRdf5K677uKRRx6hrq6Ozs5OtmzZwpEjR2hqaiIcDrNv3z527NhBIpHgwQcfdPxxZY2tjFJAZEMXsRI27x8+wRtr36C+rp6lK+4kWJc1gVu6TYYMVo7VWMsRFWOLLJF/QUWZMsoo4/JwlSYLoKWlhT/6oz/CNE2am5uZPXs2EyZMoK6ujmAw6FDqyLy2tra2Ya+rCjWZX6ZpGnv27OHHP/4xu3btoqOjA8MwHAHp8/lYtGgRDz74ILNmzULTNF566SW+/vWv8/zzz3PPPfdQUVFRNM+lWLh24TNer8Kw8J5VSqMP8z5Go72RhCdbsviZvB4CGw3bstDQEQIyKRPDo9N5+Ayb179D34VePvHAfTROr4H4oNwSCAwMQGCgoWm6bKRk+DD791rAtXQvI4Xb0ZZD7WnXU5Sn64wi1dXV3H777QAcO3aMzs5Ozpw5w5w5c5g8eTJTpkwhHA7nURhdjpFC5o/JwJC9e/fy/PPP09nZyZe+9CXWr1+P1+slEAhgWRbjxo1jwoQJzjUsy6Kjo4PGxkYuXryIrutOkErhgpSbvCQQLczkl7+XatCLpQ24NaGKsXuoqQxuQ45fsQRTt9pSF6vMV7tccqmwBbYARLbEp4mJFG3Z98G2BJotsEwLTRdYaYvYQIotG7Zw6vhJbl1wCx0d7dn6agYIDTTdRtharpQMkKuELWxw3GpX2SfF8tRGa0zVUlGqRcWtuTwUi4hcy24/d+H1S9FeYVqRem31p9SCR15PVk1R27xe4HqgiEr4G4lEeO2111izZg0ej4fZs2czc+ZM2traWLJkCa2trYwZM6ZoEU8Vkp7G5/PR2dnJ9773PU6ePMmXv/xlxo0bx2uvvZZHjitNnJIMNBqNsmvXLs6dO8dv//ZvOxubmjN35swZ3n//fc6ePcu+ffuIRqOsW7cOv99PfX09bW1thEIhLMtyWMFH0ldyMsl7kKVnZHCLG5CCWR4SYrEYpmmSSCRc19jkotV13UnBSCaTI+rHy0EKNdM0nXIsMnp22O+hYQuBLbJ9YmI6vwshSKcykIFwKEwiksBr+BBC481fv8WuHbuZPfNGFt62EHSbRCSJVqEhLIjHYmjGYFCIsDWEnQ0UsXLXl+18UEjTfzweJ5FIkEgkHCEOI9sAL5eQnEgknNIzapRzMbaRUrSplkcplvw9krlcrF35DIlEglQqRTKZzHs2tZ9H0q76DHKtyPYkF2OxaPGRjK26B0qhdrnKKdcaXBNqciNWmStaW1v57d/+bcaNG8eJEyc4e/YsP/3pT8lkMvz85z+npaWFf/3Xf2X8+PFDDoymaU4trN7eXr73ve9x+vRpvvjFL3Lvvfeyf/9+gsEg8XgcwzCc6Eo5QeLxOJs2beK73/0uU6dO5cEHH3SKjsoJEolEOHDgAOvXr+fs2bO8//77TokJy7K44YYbCAaDDjlyMpm86klcyM6vlp6RP24INVWQyo0gHo87r26WgIHBRWsYBrFYzCnE6pZQUxlLZD21ioqKS5hVikGIrAYlBYwlrBzrR06RMkFYGhcT/fiEl2Qyxf69B3jzjQ1UhUJMnzGdhtZ6Tp0/hZ7Q0ERWk0tlEggjNwY5gVYqoaaOaSwWc0qzlAKX2zTl2vP5fHmExiPZbK+kTbnJF/IxjgTy+6plRq4buT5jsVheDTfJCzsSZhE1FUleV9akTCQSRKPRPMGnfqcUbEBq/8k96HrR1lwNFAEcIkzTNKmrq+Pxxx/n/vvv59y5c+zcuZNVq1axdu1aNm/eDMA3v/nNYa8rN0IhBAcPHuT111/nxIkThEIhVq9eTWdnJ/v27cM0Tf7+7/+e++67j5tuugm/308sFuMXv/gF69ato7KykieffNIhRFbNioFAgI6ODkKhEOfOnePNN99kYGCAj3/84/j9fmpqamhubnZY7SXd0tVCnSzqxisJlN0SalKwyY1HnjgL/YulblcuRlkdwe/3Oz9utqtqapKlX5aeGVb7EEgHWLbfUIpB2gJdGOi2RjpuEgxVcHjPMdavXU9FRQX3fPxeJt04IRsQomUI1QYwbZO0SOEPVmHaJgKRrb2WE2q6rWGWSKjJA52sRgDu+phs23YOKSpLv5vtSs1CPmdh6ZlStFtMwxUiW11EViWQbcmD2Uhr1kntTK31mEgkEEIQCoUuYToqxdpR3Smqdj1SIT2acD36EfLttF1dXRw/fpw9e/awY8cODh48yPnz5/H5fHR0dFyW1UOIQQb95uZmfu/3fo+jR4+i67qTTL1jxw6nZIuccHv27OGVV14hnU6zcOFCZrCZJ34AACAASURBVMyYwaxZsxw1W2Wh9ng8TJgwgQkTJtDT08Pp06fp7u5mwYIFNDY2OgMtIyZLMdjqBJUbfiqVcrWsRWGbUqjJisVuQy6WQCDgCDU3Nz61b4PBoNPu5TY+i8EgRCnQpJaWFUbZD/kqYOBChC3vbKGvZ4Bly5Yy4+Z2jEqN5EAa4RV4Q94s0wgGmtCwsbNCLSfYspJTaXAE3SGJCoC8g4rbQi0QCGAYBoFAIE9Dc3NspfCWpWcKhY8bEEIQj8edPUa9n1K0W+iLFEJQUVGBrutUVFSM6NpDoZBcXfLsqpasax2umh/lgEhW/e7ubl544QVeeukl9u7di2VZTJ06lccee4w5c+YwY8YMqqurhz1xqPbecePG8eijjzqDkMlk2LdvHydOnMDv9/Pkk09SX1/P2bNn+dd//VcOHjzIN7/5TW699dY8RyjkO2Yty8pL6PZ6vY7gU8sxyO/IKMyrRaGzV/UBjpaTVm3X7fYKF6pcOG7WNSt0tsv2rqx/bUxh54ROLnDEygozYZMVQjbEexO888YWjh05yo0zZzLn5lkYvhzptpYmo2XIWLmAJAQmZgFhsRi8ntPy1fug1OcbrXmkmv7Ugy24F6gi56383a0AmUITauE8Uv9eygAVdexke/Lvxe6rFCgsqitLhI1WrbqRwNWQflVtBjh58iSrV6/m9ddfJxwOc+ONN/Lwww/z8MMP09jYOGzJGQlJgizbkBGOcjP0+XyO3Vk6qnft2uWYEJ966ilWrVrl2L0Nw+CTn/wk06dPzys7I2m45IDK00qxSV1Ya+hq+6vwGaWwHg2tSTVDjkabhSf40Sg9o4bxF/btUO1mZczgfeY+nf2fFEBW9vX9g51sfnszlaEqFt1+K9VjqsCT9cGl7TRef9ZsbuX+y1IWq/9xiYY2Uv9IsTnk9tjKsSxWKdkNFD7b5ca0lG2p0bsSpdZMVd93YZmbYvdVirbUf0uu3OsFrob0y01Sbvy1tbXMnTuXw4cP09fXR09PD9u2bSMejzN16lSmTp1KR0fHsMweUg2WAkcd5HQ6TSgU4nOf+xwwOLlaW1v5/Oc/T2dnJz6fj+7uboeJpLKy0qHWkvcsv6tOHtWXp4Ysl0KgfVhQfR1S0x1NZ3BhUVQ3zRuFRRzVaNcrGT9H7NggTMjF9jsh+udPXWD1L3+Nbdvc8/G7aZ3Y7Ag7oYFuaJiYmLaJJjR09KvWwq4UhZrKaMxTGUmrWjKK3VOpMeShpEQ+taGurfrSS+l7UsdMtWwM9/lSPKfcU9U9bjTnTyngep6aenJqaWnhc5/7HDfeeCMHDhxg+/bt7N69m5///Oc0NjbS0dHBd77zHSZOnDj0DedMhqp6LE2FhmHQ1tbG2LFjnbZTqRQzZsxgypQpeb49eZ1UKkUwGLwip3Kx966Xgb4SXC/RTaOLbBZZ2sogLIFH92BbIKSjzQORCzFe//UGevsucseSO2gd04rwiiz7fm5/szULG3tIQZZlICmdP+3DRHkelfFhwlWhpkbSyHyuKVOm0NLSwqxZs5g1axZr1qzhueee4+DBg3R2dl5xToSMdlJrq8lAB2nGlEJKmhn7+voIBoNUVFQ47PzyvfJCLGM4WJaFT/cNypmcUDOjNnt3HGDb1q3MnDmTebfOJVjrdyiu7Fzov5YL1ddszTE7yiARnB+uW0FWRhnXClwTamrwhNRmenp62Lp1K7t372b37t3s2LGDvXv3OsU9m5qaLsv9KGug+Xw+hBBOfTTIFvtUw7alb0wKynA47PyuRkglk0nHdFlGGYWwAY/hyQoiy8ZKC3QPkIb3D3Xy+prXaWpuYtldS6gMB0GHtG1iWhaeXFCIhLCz0i4r1ECUa6aVUUZJ4WqgiBpCres6Z86c4b//+795/vnnsSyLcDhMS0sLbW1tTJ8+nZtvvtnJGxsKkr1DFvWMxWIcOXKEvr4++vr6CIfD6LrO5MmTaW5uBrIC7Ny5cxw+fJju7m7q6uqorKykoaGBlpYWhBB5eSZllJEPGXYP8Ugan+YFG3pPDfDOpnfo6+vnk/c+TGt7E+lYJptvZoBX03LfHEyszv5kNTNnponC1nK+zrLAK6OMDwzXGUXUcFfpPB4/fjzjx49n3rx5LFiwgEWLFtHc3Iyu65c1P8oQehmpuH79ep566ikGBgaoqKjg7NmzeL1eHnnkEZ544gnGjh3Lnj17+MEPfsCbb76Jz+cjkUgQCoX44he/yCc/+UmAy1JzlfGbiWzedVY0WRb4/B40DQa6oqxZ+zoH3jvA0qVLmDlnJlhg+A2SVgpNgC0Emq1ng0VsDWHnLBe2jJ4UsoGy2bGMMkoE131qahRNY2Mjn//85/nKV77C7Nmzqa2tzftsJpO5bE0zIQarV6dSKRKJBLfccgsrVqxg0aJF9Pb28o1vfIOnnnqKpqYmHnnkEZ5//nl+8Ytf8NWvfpXf+Z3fobOzk7/4i7/g//2//8eUKVNYuHChk1tTxm8SLi9JpIlQy5keNUOQjmZ4580t7Nu/j7ZJbSxediu+KgPSIPwgsB26Y5GLFMn607Kkx06siHyVwSQy4a2MMsq4argm1KRPS4ZQA1RWVnLXXXfR29tLV1cXBw4cIJlMOmbImpqaS/xwhVAThH0+H48++iimaTqCLhwO09TU5ASAdHZ2smbNGmbPns0nP/lJdF1nypQp/PEf/zFf/vKXWb16NQsXLrwkP0tlF9E0zeEmlHDTVDlUfpEb7aivhSz2o4XRy8XLvWoCITQsRJaoWL6PFHODCWgCHd3SwAQrbYOAQ3veZ8u2LYRrq1hy1x0EGiuy4f169ms+w4uFCQg0oWW1Mk1gazZCE44QK5Sp4iOgrqk5h/LfboeEF1u3buaqFWvXjWt/kLbcylOD6y+a1VWfmkomLJOZT506xc9//nN+9rOfsXPnTqLRKJMnT2bFihX8wR/8AePGjXMiGgvD7GVEoyS+ldGVHo+Hrq4udu7cye7du1m9ejWf+MQnWLp0KfF4nHA4TH9/Pz09PTQ0NADZJO1AIMC2bduc+5WDl0gkOHfuHOl0mlgsxrlz5+jr6+PAgQPU1tZSVVVFMBgsGVdhIaWPbdukUinS6TSpVMp17kc1d0v6K92COp5y/DKZDJlMhlQq5domYVkmuiaw0DAtk1TGJJ5MIXQN07LBFhg6YGWADAIb0zIx8OCxKiAp0A1BV2cP69asJxKLsvjO25g4fXxujgOanc1bU7QtU2QPSykzSdpMkTJTTr6bbdtOMdFSQ45vKpVy5pL8O7i32au0Sslk8hLuRzfaVWmyUqmU8ze3BKq8ZiqVIpPJOJHYsk2ZbjSSNgvvW64VuSfINkvdn/KaMu1JMjgVspiouNbiEFwTamrJBKnhRCIRVq5cyXe+8x06OzupqqqipqaGAwcOcOLECTKZDH/+539Oc3NzXpCJmtAoa5/JRGhZcuLChQu89tprbN26lVQqRUdHBzU1NVRVVXH//fezYcMG/vM//5M5c+ZQVVXF1q1b6e3tZezYsSSTyTwzaVdXF2vXruXYsWPYts22bduIRCIIkeWdnDdvHvPmzSMUCjn+vasVboVJlfI+JLP6wMDAqLD0W5ZFJBLBNE2HpcUtqAtV13UikUje391BLr0EjUzGYiASweuvwLZz1E6WhdfQMTMJTDOFx9AxNEEqncKX0fHaPnq6+1mzbh2dJ09y082zaL+hg0QqRSIVy2agabaj6Umty9ayYxqNRolEIgxEBvL8zW7Ctm2i0ajzo9JluZmQHIlEnLxReWByc2xt22ZgYADASR0qVZ3DQuGirldZGioajWIYhvOckiC7FCz9Kju+pmlEo1ESiQT9/f15h9Ji93o1kPuupMSSub7qPV3rcNX8KLkS5WCfPn2aVatWce7cOe6//34WLFhAOBxm8+bNvPzyy6xcuZLf+q3foqGhIY82qXAhyo72eDyO1tbW1sbv//7v09PTwyuvvMIPfvAD6urq+NSnPsVnP/tZJk2axMqVK/npT39KOBx2tANpqpSQgqumpoZoNEomk6Gqqgpd12lqasLv9xMKhRxzpKSuGYlQk+3C4CSW1DTy+m5AraemJrO7TYmj9rd8PjefE8jWldaMrPDRMxiGjmEIDEPei43QLHxeL2ZGR9cEHkPPFf/USEZNtmzfxv79+5nePpVFi2+jsqqKRCpb787CxhY2mrBzTMe5jUbk00a5/ZwSck5KzlL10Ob25iTbK1z/bvFPqmw0sl3Z36VocygeScm8IcnUVeFdqjFWK4AU9msxoTbSw4N634V78PUC14WaNEEahsH58+c5dOgQN998M1/72teYNGkSfr+fe++9l0AgwA9/+EOOHTvGzTff7EyYQj+PLFciO1pdsBMnTqStrY3z58/zzDPP8O677/LYY49RXV3NnXfeyYwZM7h48SI+n49XX32VtWvXMn36dOdEIklR6+vrWbJkCZlMhoGBAUzTpL+/n0ceeYTa2lq8Xi8ej8cxP5Zyk1AnUCqVorKyclSEjKwKIDU1t6AuDqmpBYNB58c9QmORY8W3ME2LymCQymAF/goPdi5C0QY8mhfLtDAz2RwzNIGma+ze+x47d+2goameO5YsZuykJizLRvf7EZqGLewcIUj+xmLZg8FSyWSSYDCYp6m5LeDk3AwGg7l+cHdzsiyLeDyOx+MhFAqNyoaoEhoHg0HHcnIlLEGXQ7Hvyz71eDyk02mntmIpy92oh12VRi6RSKBpGlVVVXkH0eHu92ogry1zfsss/eDYY9VNPxaLEYlE0DSNuro6x79VUVFBbW2tU9UVLvUzyb+pNmvbtnnvvfdIp9O0t7djGAamaXLixAls287bnCsqKpxUgkOHDrFz506ampq48847ncrLgLM4wuGwo7WFQiHS6TTV1dXU1dU5n1OrepcScgLLAJXRmkxygRQStJYa6oJVT7ryEONewwBaLohIR9dB03J5ZMjCiCBsHU3X0TRAh/PHe3htzWvEU3E+vuLjjB8/FtsCzSsQGFmlTP4UhOdrtmzPyDtpy+d3e2wlx+lozSE5Z+XzjlabqpXhg3B6Xg1kWzJiejQ0cNUNUziPSgnZb+rBq7CUz7WOUfGpyQ6qrq5m/PjxvPfeezz77LPcf//96LrOli1b+PWvf00gEGD8+PEOfRVcap6TTkz57zfffJNNmzaxbNkyZs2axcGDB3n11VcZM2YMt99+O6lUCsuyOHPmDKlUis7OTl5++WX27dvH448/zpw5c4Z16mYymTzHt4Q0CxQzS3xQDGc+cNsfIduXJzI1AMcNqP2k+njUn9Ijm2OmkYtptMA0M1imiYaJZWfVNMuystT7Zq4EjAb95+O89urrXOg5z623LmD6rDYMv4aZBg2bdNrC49WzgSJ2VltD1lhjUFMrLAOjPr9bUMdU/ZubG35h6RnV0uLWs6q5sIVtuGXulIdrtWwS5FeqHgnU8Sm2ZsDdvUHdA9yep6WGq0VC1TB50zSZNGkSy5cv56mnnuKf/umfePrpp/F4PPT09JBOp5k/fz6TJ0/Os//LBaJeR/qyLMti7NixdHd38w//8A8O28j48eP567/+a5YsWYLH42Hv3r1897vfZevWrWiaxuTJk/niF7/osPkLIfKCT9QFKE0bsl0YXLjSzCEJlUcKVXCrvoHRii5SNyK3Q6HV39WTrmsh0rlXTcuaIkUuzD77pokmPHiEDpbAToOmQ3oAdry7n81bt3L7HQu5c+md6BiggeYF07Tx5OqlORzEBfeviUG/ZeEzjkY/F2oQbs8nef1iJVJcG1txaZmb0Wqz0MdV+JlStSVfCzV9N58PBvfgslADRwAZhuHUNquvr+fRRx/lvffe49VXX+Xs2bPOwEyfPp0//uM/dkyS8hqFpj1V4GmaxvLly5k3bx6xWAzbth1OyNraWkfQTJo0ib/5m78hkUiQTqepqqqisrLSUatVwVRoE1cHVzXPqQJgpGaAQvu/asd2E2qotfR9qvckUcqFUyzwRz0AuQKbLMNHzvVpWRa2ZWHoOrZtoQuDHPswZtpE1w2w4eDe47y2eg2Tp07hhpk3/H/23jtKjuu68/9U6DjTkwAMZjDIiciZA0AAkUgCJkVQwZKXa3lFriVbsrw+Z23ZOk60vZZ8vFz5D1M6sqWVdyWe1e5KMJf8WSIFiCAIIhEZBAmABEGQyGkwmNy5q97vj+pX87rQE4juahLSXAnsme7puvVCvZu+916qG6PoGmCDZoKJjp3HhAhpmqmJ1Vr/2qoafSUUFdX1r1pq8jM/D0MZQy9mnfmJuhzs/XLvYXntYge+H2NUlWz1uS03eZVaeTbcTYLNV6Em/epq1fxFixbxne98hzfeeIM333yTrq4upkyZwooVK5g1a9awQBfSHSgRiA0NDTQ0NLjamlrkWAo6GV+TTT/l30rgibzH4W4U9YGtlCU1QndI3uWRvkWnfj5CaOSyOUw95CAXw3D1zA327dqHJuBjK5czbfZkdPm05AWWLYTT7FMbzFV7dwTXR2iEflnI9zJZMv4Vj8ddqR+JRFi4cCEzZ87EsixisRjRaJS2tjYaGxsHvaa00GQFEUmqYJFIJAkAkZqGzClTS3FZlkUmkxlW1+0R+uUgzbWmnHqMmq4TMINggxGCvptJ9u48xKXz51m9ZjWz58/AiOhO3C0n0ANOwrQGGJrTyZr+3tUjNEIj9CGSb0JNCCfpOh6P82//9m9897vfpbOzk3Q67QoWKeS6urrI5XLU19fzwx/+kHnz5g14XdWVI904qVSKVCpVgEaMRqOEw2FSqZQb/9J1nWQySSKRIJlMYhgG9fX1bn+1weJiqstoxDK7S8ldNtnhU3eyo4XuvGWBlbQ58tpx3nj9GHPvWcCqtUsJxxyBZ+VsNFNzvgbYmoVOfysZDSdWp9KImjRCI1RZ8kWoCSFIpVJEIhEMw6CtrY29e/e6cSk1zhAMBl1UYU1NjZu9PhjJBp+6rnP+/Hm2bNnC3r173aoJdXV1rF69mk9/+tNMmjTJTbR+6623+OlPf8rRo0eJx+OMGTOGxx57jIcffviOYPkjQu4uIk2AZkHeVagJDU2YTsHhvMdbCMFbb7zHoQOHaWps4r7VK6muq3I8iDoYpu7UdwSEsMhZOUwzAPneaBLNL/+N0AiNUOXJF6GmaZqbmCyEoLa2lvr6ejo6OrBtm7FjxzJhwgS3ModM1oxEIkMm/kr3o3QVXrlyhevXrzNnzhyWL1+Obdvs3r2bZ555hng8zte+9jWCwSDHjh3j6aef5tq1a7S2ttLa2kosFmPSpEkFORkjAuqXkZzixE7VYfk7eSsNVwpdu9LOzldeJZVMs+mBBxk/fazzmQXoAktYjmzUdMflOBIuG6ER+siRrxVFZBLmnDlzePTRR9m5cyc3btzAsizGjRvHxo0bmTFjBjU1NUSjUTo6OpgwYcKQ15VuS9u2mT59Op/73OcYO3Ys48ePBxx04tatW7lx4waapnHr1i2eeeYZ3n77bT7zmc/w+OOPuw1E1dyhYgJNhSjfLRn1I1SMbNBsQM+bURIo4lBfe5r9u1+n7UYbK1uXc8/CaWjh/OcChC0QIl9pJBjM90szCtyLI+rQCI3Qh0++NgmVSMYFCxbw5JNPsmnTJnbs2MHhw4fdSiBz587ls5/9LPPnzx9Wvpd0E0q48tixYxk7dqybYC2r6Tc3N7NixQqCwSBnz57l0KFDTJ48mfXr1yOE4PLly9TU1FBTU3Nb8qRKMsFSVq9X/65cJXGK5dZ4c338IjVWWKnWM97rlw3iLq0u9dVhAGhYmoaJk1AvbBtTgMgCluD1gyd58/WjTJkymZVrlhGuD+YtNOefZuiYmAghI2j5DxSGBW5HreClQDGqhNta5eHd05XIjauka36weHel8i0rwUs9F/zkcyeffZTIV0i/WlB16tSpTJ06lXvvvZft27fzox/9iJ///Ofs2LGDsWPHMnXqVOrr64vWMytG3moe586dY+vWrWzfvp2+vj6WLVvGxo0bAcdF2dvby40bN/jxj3/MrVu3qK2tZdmyZXz2s58lEokU1DbLZrPcvHmTW7du0d7ezqVLl+ju7ub48ePU1NRQXV3NhAkTqK2tJZvNlnwoe4ukyvwXmX7gd+sZtT2IRKz6RWoRVrnWMpl9KL7eJpqa211Tc7pID/Q9TZAzLCxssjag6YicwM7YmOice/ciRw8cpK4mxooV99LQUkcmm0XotpOkLXS0nPf6In8/hTTQXUiFSI61EoqDVPy8uWqlutmHQgnLeLlEPvuNKlbzxVSe5Ui7GejeZT6eOsdyXssVxvBW9YD+wg+DtZ4ph5It67Kq50Gp7XQqRb5C+mWvLNM0yWazvPPOO5w8eZJjx45x8+ZNgsEgc+fOZfTo0S7ww5so6iW5adW4mm3bRKNRZs2aRTab5fTp09y4cYPXXnuNT37yk3R3d9Pe3s6oUaOYPHkyM2fO5ObNm2zbto0xY8a4lUfkPafTaY4cOcKuXbtob2/n/fffp6OjwwWxzJw5kwceeICpU6e6m+tOyev6lAIsHo/T3d3tulrLTerDLoVaZ2enu4H9LGkkhZrMEbx165bbI2qwPEUnwbm/rQt5QaYJfVChZms2GS2NHjTIJXPURRtIxzN03OwiFU/ws+dfpLOjg1VrPkZTcyOd7T30pHvQQ4BhowsDXdyZdizXNR6P09XVVVBBHvybZ3mg9/b2Eo/H3eo3pZY8Guq7uq7T3t6OaZrus1qJFjt9fX0IIdz4vFfA+CHUUqkU3d3dBIPBAs+UKgRKIbWakuTZ1dXl9h30ttcph+dICjPorzCUTCYxTZNIJFKWykl+k6+QfrmZLly4wIsvvsjWrVs5ceIE3d3dLF68mM9+9rPcf//9zJw5k6qqKhKJxJBAEXlNWdZK8mpubqa5uZkHHniAnTt38tWvfpUf/ehHbNq0yU0EX7ZsGV/84hfdnLh/+Zd/4R/+4R8wTZNVq1YRCoXccljz5s2jpqaGtrY29u/fT09PD7/2a79GOBxmzJgxjBs3zhXEpRT89Ao11bVgWRbV1dW+CDWpWUqXmGVZblpEJBLxzcXhrdMn8xaj0SiRSGTQB1JaapoXoZEXaMIWDspRaIpXUDjtX7IaoWAIYUC2L0t1NIZl2ezbc4AbbW0sX97KshVLqB0TI5lOEQtWY4R0LC2HIYw8dL80ymazbuV6vzVe9YC1bZtIJFKWKjFD7XMhBJFIxD0EvYLFr2obcrzRaNR9Hv0WaoZhuNWSZOsZ9TvlFGpyPLKZblVVVcEZq/ItZY6lZ0gC8uQ54VcBZT/I9+RriUZ86qmnuHLlCpqm0djYSENDA7lcjkOHDnHgwAEikQi9vb184QtfYNy4cYNeU21LA/1xNinompqaqK2tRQhBOp1m9OjRbpubdDpNNBolFosxY8YMvv/979PZ2ekuoDxkp0+fzvTp0+np6aGrq4tbt26xceNG6uvri95PuUm652pqany5vvcBkAeD7B9XCTeDfCh7e3uJxWLEYrES+ApsG4RmoQndkWsChGaD0Ilp1U7lDwE53eJadxun3z7N22+9zZw5c1m7YS21E6qwLYgGo1SHNKdHGjYGpT/MUnGQY6yUG0cqdLFYrCL8bNsmnU4TCASora2tCE/pfoT+1jOVoEAgQCqVorq62hcLRlV25fMqm3fW1NT4Gv9WO6FIj9vdQr4KNXlQdnV1ce3aNRcR2dnZySuvvML27dtdoRAOh9F1nUcffXRQoaYW+e3t7eXAgQOcPXuWFStWsHjxYlKpFM8//zxXrlxh6dKlRCIRFi9ezIQJE9i1axfLly/nE5/4BO+++y47duxg06ZNLFmyhHA47FoR6XTajQVqmuZ2uJXuR68LVLpYyzFfUiuTc+ene+qDvO/3PQyGQB2MBIprS8vDNbR8B+r875rmxN+shAPtMKMGZ985y46XXmHK5CmsXLWc2uYqByCp4T4VOTuHpjlFif2oFvJhgHL8pg+jKo/qUq00f1+LcHueD+j3dAw23nLcj+rylPV7f+U7X0uNwrIsRo0axcyZM+nr6yMcDgNOArUUHMlkEiEE9fX1Q2o8UmuQNSX7+vp4/vnn2bJlCxMnTuTq1av09vbyyCOP8Ju/+ZsEg0FaWlr44he/yD/90z/xjW98g2eeeca9rz/5kz9h6tSpLjBDFjXOZrOk02lXE/MiM+VmVtutl0qVPIDUB0NaERKsIZUPv/jKV6nQSN7S3TLwl5WfPVNlYw+I0tCEDhboNlgpi/jNBCfeeJNAIMDq+1Yz+Z7xLpBR0wFd86USiDrnfq+1tFzkvHoPwVKs/8H2u7qOUtuvRDNUSaplU445Hsz9qCqfapFhtVN1qbwHUz79mldp+Urv1VA4h48a+dokVHZTXrNmDWPHjnUFh2mabrAzEom4ftxcLjdknpq0kuS/ZcuW8eSTT9Le3s7ly5eJRCLU19ezYMECJk2a5G7Ke++9lz/90z/l9OnTZDIZQqEQra2tTJ06tQAqK68vA+vxeJxUKuWW1pJjA8fdCZTseigW66iEi0rlUalmh5KvylNtEjokeZpwQl6gwW1oRFm6Cg3slCOwzKDBzv/vVc6fu8jmzZuZMnUyelgvvG6+8r6pm1hYxVgOm7wovEqR6jrygg1KvZfB9qXawFIFHPhN3nGVC/04XN5qOky5rLdiFfOHOhfKlWLkbf81ElOjXyutqqqiqqqKcePGFWgXEgqvWkfpdNq15Aa84bxAkZrE+PHjGT9+vIvSUQPiavA2Go2yZMkSFi9e7Gqu6iJJy1Lt2C27+Hp5yzFIlFWpNNAm9PMglHOvPojSb+63MPUeNOVqTCoQWLZFUA86YxEQDISwMgLdFGhJjX2vHmD//oPMmj2Tj61aSSBkqAX7+1/zpHuStD8oqXMpNV61gW6l5nqgeyo3SS+HeihWkrekcgnSoQSIn/NbTIiooJhicTgxiAAAIABJREFUYyyVtwoek9eTaTe/8u5HtbVLOp1GCOEKLFnzUZKK4hnu4SYXT8a5QqEQ1dXVQH+QM5vNks1mCYVCGIbhujylJSZ5S9fiUIeM18dd6XjFCA1NGhqWsAiaQRAaIudU0keDs6fP89q+/UycOJ5Zs2djaRahagMrDUYU1OxpN2+bkWpYIzRCdxP5WiYLHG1DCjNVCEhtTloIgUDgA6OWpHDKZDJunpNpmm5VftlvLZlMuhahhDhLjRIoaA76QenDCIyP0MBkaAYip2FrTmNQsoAJt670sGvnHm51dbB+46/T1NKEHtAQmiCrZzEMRcnKv3pqhIzQCI3QXUC+lslSYaDS3aiatqqp+0EsH+l6FEJw6dIlXnvtNbq6ukin02QyGaZOncqsWbNobm6mpqaGvr4+jh07xsmTJwHHimxoaGDJkiVum5uhQAqlJq2OkL8khON6DBthR5plcYEf6fYcr736Gu+dO8uq1R9j4dL5dPX0EIgG0HQIRvJW+4c7hBEaoREqA/kK6YdCYSGDnt5SWNJVKF2Dg5HqU85msxw6dIgtW7aQSqWoq6sjlUrxv/7X/2LRokX8+Z//OQ0NDRw7doz/9t/+mwtEicfjXLt2jdmzZ/Onf/qnTJo0aVi81XuAu6cW2q8CaZpGQAtg5YTjbsy7/+20zdF9Rzl06BAzZs1gzQNrCNQYJG71USOq0fWAU4G/oPyWCzEZoREaobuMfAWKQH+wMxgM0tPTw6lTp+ju7mbOnDkueES6/rxon2IkE6QlkGPUqFE8/PDDrF69mlmzZmHbNk899RTf+c53WLVqFTNnziQYDPLwww87aLcpU8hms/z3//7feeqpp1ixYgW/+7u/W5C1/0HHOEIfLvWjHHVsy3YDYVbC4uLbVzh88Ci1NbXcv2kdtY1ViJxA6IJkJkWwKkBWZDE0HQFlqRwyQiM0Qh8e+VrQWCIJpSC6fv06P/zhD7lw4QJ/8Ad/QFNTk+uSlJDRoYqBSqsvl8sRDAZZv34969evdz/v6upC13Xq6uqorq7Gtm3Wrl3L+vXrXQsxmUzS3t5OVVUVzc3Nw87LKibEKoViG6HbSZYUljaVBhi6jsiCZsCtS53senkP6WSaBz55Py1TnKR+2xYEw0HMoEY6m0IP6Mr1RKGNVgqef4RGaIQqTr6XyZLweV3Xqa+vJxqNcuHCBbq6ugqAIcPNaZHWnPyurJTd3t7O9u3bOXHiBIcOHWLz5s088sgjblUQ27Z5//33OXz4MK+88gonTpzgS1/6Eps2bSqoIwmF+VvRaNQtWFpVVeXeqxS+flQUkPz9roqt5r9Af25TpWDXqjU/LAi2jYtQdNp+WvlqkDYmAWQRf02HVGeaIweOceXqZRbfu4R5S2dhBHQwQdc0dEMjFAqRsbKEcPaSswM9jscyTYW3tFulSmXJPVopkvtWHWcleHr3svqZX1RsTf0i9UzwM1+s2BjUxPK7gXzPU1MP5mg0yrhx47Btm9dee426urqCyhzxeJwNGzZQU1Mz6LVlnE5+17Ztenp6ePfdd3n//feJRCLU1NTQ3d1NTU1NgYV24sQJbt26xdixY9F1nba2NsaPH+9WKRFCcOPGDXbs2MHly5dJpVK8/vrrdHV1uWkJM2bMYNmyZW4MrxwHh9fiSyaT9PT0EAgEKlKlP5fL0dPT4xZ0HiwnpZTN7U2QNU2Trq4uNw9mwAoO6Bg5J+6Z1bNktDTCsLHIYVk2EaIEsyECuQAGJod3HWP/gYNMnjaJuUvmkMpk6LV6MQMBp7VQexu6oWEGTDKJlCK8PJj+EkmuaSKRoLu72y3Y7fcBIdevr6+PRCLh5m+qbv47oeG43OW+VYviSrrTcQ/GVwhBT08P4KT4BINBV+ksNf49WEURWaU/FAq5ObHyPBooT2+4JHEGajcHTdPo6elxU5P8KGis1nyUY+rr63MLZQw2po+K0PPV/agKHV3XuXXrFu+88w5Xr17lRz/6Ea+88grhcJhEIuFaX3PmzBlUqMnryZJO8tCfNGkSX/va1+jp6eHHP/4xzzzzDLFYjK985SsuOGXq1Kk8+eST3Lx5kxdeeIGnn36acDjMV77ylYLM+WQyydWrVzlz5gxCCDo7O7Ftm0uXLpHL5aivryeTydDX10cmkyEajZJKpUqaK2+OXjqddst0+aWZqZU9LMsinU5jWRaZTGbQAqalbl45RllSKZ1OEwwGSafTAwtToRPSwmBDUsSxzByEIGdn0XMGtiawkgI7ZXH13CX2791PU3MjrStbqRtdS8bOks6lCAqnyo2cX8uy0DUdW/iXWCoLC8h/8r1KxGQlz0wmU1DSyQ/hAv1jldWE5N7yCrdy8hVCuONTizPIw9kPvlKoyflVCxmo6Ow7XWO1dY+8D9kWS+VZbitc3v/dWB5Lkq+Wmnx45CL39vaSSCSIxWJ0dHRw5coVF0ASjUYJhUIkEolBr+u1iuSiB4NBwuEwsViMJUuW8I//+I9ud+1QKAQ4Fbw1TWPSpEksXryYeDzOuXPnSCaTRKNRd1O2tLTwO7/zO1iWRVdXF1u2bKGnp4cvfvGL1NbWEgqFXPenzJWTKQvlItlCY8yYMRUpTyMPBMuyaGhoGPRhLLdGlk6nqa6uHrySvHCsNduCKi2CMGyE4RwapghgCBM9q9F5rodXd+3C1gVr1q9hztJ7MCIalmZja1XouuE2WZRzWwkNM5FIYJomo0ePrqhGGw6H6evrK1jTUlzMwz2kA4EAdXV1d8Tjg/IVQriWaFVVVVnrlg4l1OSaqs9ouUpVeXnLZzSbzTJ69GhfQgVeq09aaqrC8FGxyAYiX2NqEswhJ6Guro6Pf/zjzJkzpyA5Ox6PE4vFsCyL8ePHD3pN1fVo2zbHjh2js7OT1tZWYrEY6XSavXv3YlkW06dPJ5fLcerUKbLZLAsWLHC7XO/evZu+vj4mTpxIMBh0Y3MyCVwuoGEYNDY2YhgG9fX1NDQ0FNyP1Jqk4PygpLod1U0qrdxh10Qsga9Xu/Sz/qPX/SjHOey6k4aNqQcRCDJWBs2GoB4Ay0E7HjpwmIuXLvDAxgeYvXgmRrWGLQSarqNTCEbyxn/8HK86vsFiQOUitZRSsXn1i6/6fKrPqZ8xRNVikaXtKgHekmlA3nJ65RqvOi41riXPBT8sNTlv8trSlVpqM+RKkq+WmtSC5UHS1NTEpz71KXeiZMsWuQlSqdRtQsNLqmady+XYu3cvW7duZc2aNTQ2NnLr1i327NnDunXrXMTj7t27OXDgALNnz2bMmDGk02l++tOfsnjxYtauXeua+mrFfTXNIB6PF7hwVG2m1EPRe7hVSgsaiN+HARQp9llxElj5LmcGBlgaQdMEC0RacPS1N9m1exdLly5h1frlmHWGA140nDJZwi7UQitBA43X73WuJGBCpWJj9BsUo1670s/RQFQO/sXG5fceKnYeyfPxV16oqdqhWl9RNgM9d+4cbW1tBAIBYrEYDQ0NTJo06bbEbC/JWFowGCQQCLBw4UJOnTrF8ePH6e7uxjAMlixZwqc//WlmzpyJrussWrSItrY2Tp8+zbFjxwiHw6xcuZJHHnmEuXPnFgSX5T8Z6JZlvnp6elzNTMYKpBVVjsX2Cku1nYUfNFB6wkCfqVSuh8lrtakB9iJ/jY2NZWdBMzE1gwABdFsDCy6cucKeXXtpaGhg+dpWomPDiCxYpoXQhNMglEJ+HwZVKv1DKmVyXr3KWrnAPgN9Xu5Ul6Hcj8Pdu+Xiqyq9xZSzcox9oGt4O2wXu7dSSc0HzuVybnnBu4F8bxKazWYJBoOuG/L8+fO88MILbNmyhbfffptMJkNzczOf/OQn+dKXvkRTU5OLsilGEtKqaU5r81WrVrFs2TLS6bRrNgshaGhocIPUq1atYsmSJaRSKQKBAOl02u0eIDsGQD9gQpI0v6WFJj9Ta0WW2nvsw8xzUx8+76Hg1/14+ak8h0O6rrmdqI2cY4HdPN/JgT0H6erq5Ld+67domTgONLB0C1tzKoxoSmMavw7AwUg96CvJ0w8abG/8MvEciq/fvIvx8oYo/OKjFsIwDKMgJPNRp4pA+lUL6Gc/+xlPPfUU165dc/PWzp8/z3e+8x06Ozv5i7/4CyZOnDjgdaUwkz24LMtyBZS31JZE8BiGQU1NzW2oStnTzVuyy7tZVASXl0pd6IFcM373NZMKgCQ5l5VyFXnnHYbTVFFg6gGEhZtgnb5lc/i1I7z55pusW7eOKXMmY1Y71fnNiOFYd+QwMAriLn7kFw5GkrfcX/L58HuN5TwXc2X5QbJNSSAQcMcJlS8tVyxOXe5rQ+F5UW7L1Ou6lmtZDJlcLt5qWy35eyU8R+UkXyH96iTrus5bb73Ftm3b6Ozs5KGHHmLDhg0Eg0FOnDjBT37yE15++WWeeOIJxo8fXwAiuO2mlZ5n3odVbuR4PI6u6y4wRJrR4XDYzf+QCEZV+MnrDLZJPmx//a8maaQzjjKjZ3XQQViCwwcOc/z4caZOnUrr6nsJNugIG+dzcMAkGhj63dHgcIRGaIRKI98tNSkgdF3n+vXrnDp1imXLlvH1r3+dxYsXA06yZiwW45lnnuHUqVMsXrz4tpicFCTSVSgtJCEEV69edeNpqVSKaDTK2LFjCYfDBQIqHo9z9epV+vr6XOuusbGRvr6+QXPjKq1ljlBxCgdDCEtDGjfvvX6Jvbv2Eo1GeeChB6hryffT06x8HUcN2xYEdBMd47bO2CM0QiP0y0e+CTUV1ipdd6ZpEgwGqaqqcoWIFBgNDQ2EQqGC+JYKnJCCUZrF0nV49uxZ/s//+T/s3LnTTRw2TZPly5fz+c9/nqVLl2KaJidPnuR73/sehw8fJp1OE41GmT9/Pn/xF3/BpEmTBhyHF/o+Qh8eaUJDswANei4leXn7DrLpHA9/fAOTF7aADZZmkxUZdN3AwCSkh0bWbYRG6FeIfO2nJoEU0lpqaGigqamJ/fv384Mf/IBPfepTVFVVsWfPHp577jksy2LSpEm3xbVUAAjgohMty6Knp4dwOMxv/MZvsH79empra/nRj37Ed7/7XWpra1m8eDHd3d384Ac/4NSpU/yn//SfWLJkCQcPHuRb3/oW3/72t/mv//W/Fo3xSN4DHYp++u1HqAhlAR1SbWle3b6Ttms3WN66grkLZzu+xiBoGpiGiZ2H/uuagbDzuMeRJRqhEfqlJ9/hLGq+WlNTE2vWrOH06dN861vf4l/+5V+oqanh+vXr9Pb28uCDDzJt2rSi4AtVaKiw+6VLlzJ16lQikQjV1Y77admyZUQiEVKpFNlslpMnT3Lo0CFaWlrYuHEjTU1NNDQ0sH37dnbv3k08HicQCLh1+VQhJZMrR+gjQBpYaZsjB49z5OAR5s6ex4rVrRjV+c80mxxZR6AJQT7dGi1f6FiMCLURGqFfevL9tNZ13a0lWFdXx2OPPcanP/1pxo4di2VZ3Lp1i6qqKjZt2sQTTzzBPffcAxTmnngrMJim6YJFAEaNGoUQgnfeeYdf/OIXvPTSS8yePZtNmzYRDoe5fv06N27cYN68eUSjUbem2vTp07l+/TonTpwgGAwWjZ2Fw2E3J85bNcQv60yOtxJIRO/cfhhuVk1z/g1JAt5/4wJHDh5l9OgxrFrzMWomRJ1dbJJHOlpOCxrNwNDy21sD9NuTgSs51oHmupI8K0GD7alKPi/e13Lz8/It9n6pPIqB4Aa6drnG6b3O3Rh28dVSsyyLVCrF4cOHsSyLJUuWMGbMGL7whS+wbt06rly5QkdHBy0tLSxfvpwZM2a431XjaSqqsVi5GIBr167x4osv8vLLL9PX10drayvz588HnLp7NTU1BINBN6/MNE2ampowDIMLFy6wYsUKwLECs9ksN2/e5Nq1a3R0dPDee+/R1dXFwYMH3Q4AMp9Otp8oFe7qRXOmUikymQzJZNK32o9eCH86nUYIQTKZHPR7pWxyIfJeQM3pX6bpOslsEjNrEsgEsXI5AoEwpqaTTCQJB0LkcjaGbtJ5qZu9O/fS29HDg5s2Mm5yE6l4Bs10rpclQ44smqajC6dIsWbraEJDaDZCF25HgnQ6TSKRcBWV0sY0eGKwpvUXv5VdHYZONi+dhBCkUimSyaRbcLscoKehcrMymQzg7OGBlNNy8pXjhP70GzWVwK9SUuqaquXXyhWDV8cgPV7yXJBzW26Bo6LA5R6Vc6ueycXooyL8fBFqEj6vaRodHR08/fTThEIh/uiP/ogDBw6QTCb5zd/8Terr60mlUtTU1LiHSzwed/uWeUndMGqprVwuR2NjIxs2bGDGjBkcOXKEV199leeff54vf/nLblHXnp4ed8Gqq6sxDIO+vj5s23Zz33RdJ5VKceDAAbZt28aNGzdcdOX169fJ5XIsWLCARx55hKlTp5ZcyFgF06hpDKlUit7eXjffxy+S7lXLsujr6yOXyxUAdopRKfdjW04/M6ELbGGjBww6ujrJ2jmyIkc2k0XHJGyEyKVteq044WCEvq5b7PnFPi6du8ycObOZNn0K8WSSNEn0kE6yL46tO8nxQgPd1tBtA03ooDlCzQj019Hr7u7GNE2i0WjJaziUQmOapttKSCb8y2fEr7WV4+nt7SUej1NdXV2Qb3Sn4x0qgVw+UzLk4C1ocKc0FN9EIuHOqVRe5XlRSoL0YAd4Op2mt7eXcDhcUONSPsel8Jbfl2cDOEUfent73ULKxWo/lkPQqQLatm2SySTBYJBIJFLg0fLSL7VQk5tZFis+e/YssViMkydP8rOf/Yzu7m42bNhAfX29W72/ra2N2traITVXNYEW+hN26+rqWLRoEYsWLaKpqYmf//zn/OIXv+Azn/kMQjjVu9XFiMfjXLt2jVgsxrRp09zrZTIZDMNg0aJFjB07lvb2dl599VX6+vrYvHkzkUiEUaNGMWnSJKqrq90DsZTDSbVA1aLCuVyO2tpaXw4+9YGTCbO5XA7LstzYpH+k9XeZ1jR66mqIxWLUVDmIWCtjo1k64ZowuVSWsB7hzcMnOHnqJPNmzuO+Tauoa46Ry1oEI1UQAJI2wVBA6VytoQndiadpTrdrzdAA4SbsV1dXE41GB0ysLwdJ5Uu2DamqqnJBVH4mX6ullDRNKxBq4F81CsuySCaTBAIBqqurC1rO+OXKUoVJdXW1K9TUw9kPSqfT5HK5gjWVgkBNOboTUq0ztfi7PJ9qa2vLNg6VpKCUdXnlPUAhIv2jTL63njFNk1GjRnHixAl++MMf8s4775BIJPjmN7/pxsLAaYpZV1fH1772tQEtNZVkwrRah1FdEE3T3PJcY8eOxTAMEokEPT091NTU0NfXx+XLl4lEIjQ0NBS0kgmHw0yfPp3p06eTSCS4fv063d3dLrpSHWMoFCqonHAnVGyjSCs0Eon43k9NkhRqXgWg1OuqJIQTPxOAZVtoukYkFCUcjBAOR9DRMSMGuYyNyNmEa6s4c+w9du/aw7hxzaxe+zHGTh4DIQjYprODdTDDJmjCzU9zBJrWX+4xH1dz7kFQU+MI0uF0VyjHXGiaUzNUHvSlXle99lCk67oLgpJ8B1+j0iybdDrt1nQt13WH4ikF50CtZ0oRLsVIKrIy33WgykJ3yneg9Umn066Hodg6lmqpye/Ks1ReL5vNVqQFVjnIV0i/pmmMHTuW9evXc/ToUfbu3Qs4vc9efPFFV1OVB7iu63z5y18e9LqqmzCXy7Ft2zYOHz7M2rVrefDBB3nvvffYtm0b8XjcbTWzYMECFi9ezNGjRzlw4AAPPvggO3fu5NSpU2zYsIFJkya5sbRQKIQQwo0LJJNJVwuUjfm8LXVK1fRVbVJqetKt6tdBIPmqPGXTzlLHM2iMiX5Bo2s6GmBqJqZmYmCQS1uYIQNDaKAZ9NzoYdeO3QhLsOGBDUyY5eSjiTRoIbAsm0w27bHSPKSBLQS60LCxsS3bFeByHvzSQOVcSEtYasCqK73Uaw/0mXTHZbPZgrX2c0/JMco95QU7+MFbjhMKn8VyrOlQwl8W+vXOb6lWqbd9jbqect/6ARhR+UhBncvl3Lq5Uvn/KJNvQk3GiIQQPPbYYySTSV599VXOnDlDOp1m2rRpbg81uQlk/cbBSJrjQgiCwSD19fVcuHCB//Jf/gt/8zd/Qzabpa6ujs997nN84QtfQAjBqFGj+NKXvsS3v/1t/v7v/56/+7u/I5fLsWLFCr7yla8QiURc7VIN4EuBK10qssqJLIqsaf39uErRyIohnbw15cpNxRBq0lXkh+XZTzZCBUroOiIHIicgpxE0TEdg5TSS6RQvvfAKZ985y8aNv8bMBTPQY45Q1PKWl67pYPXnL2rgxNEQ/dYaTp1INNDRnar9iitlqIOglLlQ3eVyTb2H1Z3SYPetrmmxvM+hBOKdfAb9tRCL1S4tNb41FF/ot6BUhcFPvmo/QG8qUCngsWJnAtxeO7Tcypi3RqkUrh/kefmwydfaj4ZhEIvFqKqq4k/+5E/YvHkz3//+98lms/yH//AfmDlzpjthUpgNVt1DXldtArhgwQL+6q/+yk3Elu1gxo8fT2NjI+l0GoAFCxbw5JNP0tXV5S7U6NGjGTdunIuIlIVYVTNbWi5S4AGuQC1HjEJuTnltuWGlNuZnYWP1QZc8pdbpm8sTsBAOQtFwhIyhmwS0ILqmOTEwIJ2weevNd3j71FvMnTWXZR9bRCCaL+ho4iAbdbBxfP45kcPQjXw0TS90PyrPoFwzOVb3voYQEHdKarNFtYBAJWJq3rEOt/BuKUJeehfkfvI2ZfUrpqbGENUDv1xIxGIk19UrNNVn+U5JXtcrwMpx7aH4qnzUM+6jLswk+ep+lIIqEAgwevRolixZwl//9V9j2zYtLS1EIhESiYTb1mC4mofaU2306NE0NDS4/GQZrVwuRyaTIRQKuX7oKVOmuMFWwDWlpamtVkGB/s62oVCoAIWkujfK4cP2au1eS80v8t63aqkNpmUOdUgMeOhpYJF/QBBgaWCAZoFm6Wg5wFka2q/fZPsvXiIUDLP+/jXUjo6BAZiQs3Kg9bsa9Xw+mtYPESmsHqL8LJUor+Y52EE91PoORyNXrZdyueGGc8+qxaZ+Vsp4B/tcHaP6nJTLLTbQZ15e5bIqBoupSb4DWVWl0EDrpe5bPzpfe/eL/L0S51G5yFegiLSqpLswGo0yceJEd3Isy3KLDkutTtVIimmyEo2jajLyb6RAk98NBAJuZX65AWRDUNXt6dVg1cRuoCAmIe9bdXfI75Z7/oppgeUi1T0iN63a0sIvl5yrOaNhCxuR1dCFgSFMyFfX77oRZ9eru+nu7uGTn/gEE+aM7wd5YKObWr4IVuE95PGU6Ih8FZFCoIhcNzVuOFRT2uGMdTiHmNdSk9f1M74lSd2jwxGopYxXggrUuOFw+Q5FA/FVrQmvpVYu8j7n6vOp8i1XyMDruVHf945P/b1cClMlrEK/yLc8NZnbABRo/t7EPnUxvAdMsU2pFkeWB3MikQBwD2U1b0TXdXp6etzPTNMkkUi4wjAejzN27NgCK0/dJKqG7W1NA7cHdMtFqsbpp9k/kIbpD0+BoekIIGfnMA3HXZjL5NCjOtiQ7suy/7X9HD/+OmvXr2XRvYscYIiFY6lpGgK7OCBE3jt5bdZB8Ms3C+Jb3riP366VgSwmv9fWy0999ZNvsb3kF9+BrMJyeFKK8ZKkWmnFvB6l8lE9N+rPxea3XM9uMdCUKrjvBvItT01CiKUQUhNOpXDwBiOlkCq2SeSEmqbpWk6hUIhTp06xbds2zp07x61bt6iurmbSpEk89NBDLF26lK6uLn7yk5+we/duwIH8JhIJ6uvr6e3tpbm5mb/7u79zBZo6BvVnVQtTN+zdkrvxUSKB3AfO3OXSOYIBDStn88bRUxw9epQJEyey4r5WQvUmZEALAyZ5yP7gB0aBwCuyNKq260ewfTCq5MHwYYzvw6IP48AdClBTyrx/0PGUe52917tbBBpUoJ+arFABDjz+6tWrAIwePdqtrpBMJuno6CCRSDB69Gjq6uoKLDav+0LTNNcKPHHiBPv372f8+PHcd999XLx4kZdeeolLly7xZ3/2Z9TU1DBz5kwXsi+rHZw/f57/+3//L5/+9KdJJpNEo9HbXAdSyGazWReqDP0xFFW4lWvRVX+5F0RSTvK6pOTP6mv5mQpydg5dN5w4WN6SCoZC5LI2V87f4LW9+zBNk48/+hCjxtU7Uiyady0KWWMrvz5CR2h2wavzqff+HbSIBMB4hZqvY6Z/HxUDFPjJV16/mNvTT0FXzC0n590P8q5nsXkuNz95HqluTy8Yp1QeULh35M/q/KouXvX3OyVvLNZrId4N5JtQk+ALiRrUNI329na+//3vk0gk+OpXv+omMgeDQfbs2cNLL73Eb//2b7NixQpXqHnNYe8DuXDhQhobG5kzZw7jxo2jq6uLv/3bv+X555/nkUceYfPmzdx///3cf//9Bff37W9/m1mzZvHlL3/ZraAxEEpLujeKWY/lyHEq9v1KWYCVdBPluYAAQzchp4EO1ZEqLrx3hd2v7qant4eND21k0rSJjtvRABuLnJXD0E2nSLGE6QsH16++Cq3wgRb5Ev062m3ux0o8qPL6foAnhsO3Ei5sL1Ua/j2U+7HUaw+Hr8q7HErDQO5EL8hJ/dwvN2s5Y3WVIN+EmteKyeVy9PT0sHfvXq5fv87jjz/OhAkT3KS+N954g5/85CesX7+e1tbW2ywINe6mTvicOXOYO3cugFviady4cWQymYKcN6nhmKbJwYMH2bJlC7Nnz6a1tdWF9KubRY2pyaRDr9tRfS33hqpETK3Yw+D3YWTqTgdq3dCxsja6ptHT1c2hw4e4cP4C8+bPZcXapU78TAfbtEnmUpimU3Vf5p1JqL4mtMLXAuRjIZ6/2EFf6TjTYLGQSvCU7/tF6rPq5VWaK9KIAAAgAElEQVQpIV7s1U9eg/1cTn6DXb/cMbUPA9BULvIV0i8n6Nq1a+zYsYPTp0/T3t5OOp1m69atHDt2zEUk7tu3z42vqcjEYlqPNMPVPBHDMDAMg/fee4/Tp0+zcOFCFi5cWCAETdOko6ODF154ga6uLr761a+6Jbm81am9LgZVSOZyOQKBwG1uu1LIa42qbgY/3Y+Sn9eNMTRP+X1R+KtK3ktozn9yGSeGZuo6ZOGtU6c5ceJN7pl5D2s3rsbSneLDuZyFZeUImCZCcwogG8Lov26xV026H0WB1aZRuGfUufVTC1Xdyd4cQL9dnuo+UqkUvkN9V3WRyb/3e469/OR7pRYRkFTMQyNf1bkt9zhlHF+dw8HWs5znkff6xfh+VMk3oabCxS9fvsw3v/lN3n33XbeEzre//W13wTKZDJ2dnVRVVTFq1CgXtFGsVIw8EGSemtr25caNG/zP//k/OXPmDI899pjbykatEn78+HF27drFypUr2bBhg3stFQhy8+ZNdu7cyfXr10mn07z++ut0dHRgmiZVVVVMmzaNuXPnEovFSKfTJeVwqKa9uomTyaRbSd4PSG0xza6zs9M9dAetrC50QMt7AQUaNrYGMnNa2AI0m4CmVGjRDWxboFsBREojEo0QMHROv/Uuh48ewQyZ3DNvJqFYkJvX2jGrTNLZFJohCAQDZK0smtDQMZ22MrqNbhd51Sw37qY+2rqmIYST9pHJZLh165abm1iuw6/oVAmBaZrE43E6OjrcdkVCiNu8Dn5QX18ffX19hMPhgvjanfId6rua5nTmCIVCBWXIhsp9HIqKCQtVuMTjcfe5CQQCBULNrzJo6XSazs5O9xySoDj1OR6MBvtcVejlvJmmSWdnp3vmDPS9UufZ20ZHtkuSBsBA911JF/dg5GtFEUnSCgqHw26LCNnTTLbFmDhxIvfeey+rV68uqNbhdQlms1nXJahpmhu7u3jxIlu2bOGdd95h1apVfOITnyCTybguRF3XuX79Os899xw9PT1s3ryZ6upqd/FUuH4ul3NbzmSzWXp7e8lkMrS1tREOh2lpaXGvKRPH73QjyfuTmpAUYKZpug+Ln3kikr+smiJdtAOTfptQE7qNjg2aTKwGyxLoOggBmqYTCJiQ1dEsA900COQMLp+/zssv7aS3r48N969j5ryZCB0iNWEsLCJmGPIZaSEjJMNxaEJDy7sib3+Vllwh6F8CTQzDIBAIEAgEbnM5+0FSSVB5epUYP0geiDKure7RUvgOZYnouk4oFHLnVu6tUl2tgwk1wB2fPFfU1jN+uHnluOTz743jyfu5U2VJFYqqp0k+o1LwFFvHUt2PUKgwCCHcs+huIF+FmmzLMn36dL7+9a9z5swZXnjhBYQQPProo0ybNs1N+g2FQixcuNAFbXiDsPI9iaLKZrMEg0E6Ojp48cUXuXjxIrFYjP/8n/+zW/7KtRLyi/Haa6/xi1/8gnXr1rFq1SpXmHgXa/To0fzGb/wGuq7T2dnJs88+S2dnJ4899hhNTU3U1NQQiURuSwMoldRNGo/H0XWdUaNG+bKZvA+M5G1ZFnV1dUN8Of+Sf3b6xXl/tZCcyGHiFLXG1tB0Jw9NVgzJdgjeeONN2m/eZM6i2Sy9dxkNzbF+N2ax57KEc0kVIpZluWkd8kDyS7DJeQ2FQti2TV1dnbvGflSEkCTXV3aqkGtaDmE62EEt4+eBQIC6uroBQwilkjfmIwFpVVVVrlKsCkK/LDUhBHV1dQUVkVQP01DW2HBJ3SvpdJpRo0b5sn+892vbNn19fWXpiVcp8hX9KA/jMWPG8PGPf5zW1laqqqpob29n48aNzJ07l9dff53Tp09TW1tLfX19gaBQNVoVKGIYhmtNHDlyhO9+97vMnz+fp59+uqBtjdw0mUyG9vZ2tm7dSjQa5dFHH3Ufck1zWoKoKE3DMGhqagKcRG5ZeLmlpYXm5magUKMp9aH1ukdkXDGbzfoWU1MfQNVNM6wq/Xlp5uY1ayIvzvLaHQJhg24YIJzKIVgCzdYcwZaFk2++zZtvvsnM2TO4995lBIK6W1GkIGlacSKWOgtyHmV6huqK8zsQLudWehbKBf0eiNSYmtoJ2q+4iyTJT1UY/Yg5qz9LnpK/Wm2o2HfKQfLZkVXzvSlIw1EchnNPXgtQHetwr3EnJMFzkm8mkyEcDvvCq9zka0xNmuCym3U6naatrY3z589z8eJFbt68yfe+9z3efvttWlpa+MQnPsG///f//rY+TAU3rDSuSyQSbN26lSNHjgDwjW98g76+PldQLV++nMcee4xgMMjWrVvZs2cPa9as4WMf+5irUQK3ac5yo6jdANRWM+p3yoGyKgbRHaxaQTmoGEpMddUOh6eGlG8aBmDnTSkNDacco/xdR3NQ9xCA9968wO49u4lUhVi3fi2NzY1Y5MgXbiy01oQ6L6WNWV0zFWJfCVReMX5+lx/y7iPvPflF3mot5R5nsbGocyqf4UrFeLzz6xciWp5Lfs2rSqoSpK7l3UC+CTVp+QghiEQigAPkePbZZ6mtraWuro6f/exnvPDCC2QyGU6ePElvby/Lly9n/vz5BQe6ag3puu4WQQ6Hwzz44INu07xcLkddXZ2LVpRFjiORCPfccw+f//znaW1tdTtsq4HddDrtuojUzSM3puxLJe9Davq6rrs+/FJIfShVtJGfZr8a1Fb5DRkfzMfUXGBIPpZm518DmoGGgW2DlbHQNDADTqyr53qcl1/ZSUf3LR565GEmzWzh1s0uYvUxB7Nog4NcdF41IWH5mptzdqdjVWMRcpxqJXk/SI1ZqnFTqen7balJy1t1VZXKd7DD2junXtDBnfIdyFIDCvZsMUvNj7VVkYjeZGgVJDcYDcc16bXo5XqqmAPvNUtZW7Xak7ze3SbYfHU/SjCHNF+7urpIpVJMnjwZTdM4efIktm2zefNmLly4wPvvv8+FCxeYM2eOG+SGQi1FFiQ2TZNcLsfDDz/Mxo0bgcLNrVbdz+VyLF26lKVLl7r+dqDAZSCbmqokhZdsDqrC+KWb0rsJykESCCPb4PgZoFWD0NLdMKT10u93zP+an4P8a954c2SebqBrgAW97XF27dzNpUsXWL6ilUXLZmOEdeLJONHaCDlLJxA0FJNMK+RZouYr51EFbcg95ncQXPJU91AlDgkJUimWY+kHqXMr59QPy0Ul+bxAf+k9lfxaWzm3KlDEL37yDJRAERXc5v27cpAqGKWL9Vce0i8nX7Z/MQyDSCTixsPeffddzpw5QzAY5IEHHqC3t5dvfOMbtLW1FYXgSg1Ebt50Ou26BNX3VZKWlTy8ZJxPajtSi+zs7GTUqFGuBqSi/6T7UWpG0K/5qUJzcMTg4KTGdeS45SbyO6amgifkP/n5wKQVGEzeKh65rE3AdCwzXQAGpHozefj+YVomtXDfAx9zfPQ2BMNBsnaW6lAE4Rpjop8XjoC8vfzVBxuvdFurVulAh0O5SE2RUPed/MwvASP3sjyQvHGoOz38htqL3piafC31sP0gMTXVivELKKLGuLw5j8Md72B/492v8jlV13MgS62UsUo+6jOhhnzuBvJNqEG/r1lOcjQapbGxkX379hGPx2lrayMWizF79mxefvllGhoaXM3HC8BQF09tFy+1JXWDyUXx5iCpG0U2D9V1nZqaGvdvpHBSzW61v5r8TL0ftYHonZBXk1WvNVRM7U75qoeN+vAMK0YoCl7ol2l5q89wBJqVRzoaWbjy/nVe2bGDWHWM+x/YQE1DjdtOJhgy8i5cga4XlrqSHkdR4pmkWvuqojCcmOVQczzQ9wcDC8i95Rf5dRANNVfy4JUVeNQDuZRnZKDvquvnfW6Gc79DUbHvy/2jnhHq35djXb2WtapIDxZvLxX0VOze5VhVS61S8co7Id+EmnQTBgIBN141YcIENmzYwMmTJ9mxYwe2bbNy5UrGjh3LO++8w82bN5k+fTow+KRJgaVpGvF4nEuXLnHhwgX6+vpcQMqKFStobGx0D2rZKDSXy9HX18f58+e5evUqGzZsIBKJuAeAXDx103itKE3TCuJxxVyXd0J3omV9aJtLU72BhW7CbCZHIGCi66AF4OaFW+zZuZt0Is26+9cxZcZE9EAeCWlATuTI2Vl0I5q/WhFwiObhcye37AHFfNDvDYeGOnwrDdrw3o9flot6/cHG5wdf79wWO9j9sNTK8TeD0VDnwUCflcLXa12rAvxuIV8tNRVwIYRg9OjR/Lt/9++4du0ae/bsYcaMGTzxxBP09fXR09PDunXrmDhx4qCar6Y5yEbpRz916hT/43/8D9544w3C4TDpdBpN07jvvvv4wz/8Q5qamrBt23VV9vT08Mwzz/D3f//3RCIR9u7dS3Nzs6tNyodCWmfZbNb9WVYekQvvF6prWHGtMvPzvjcsKvQQur8HAk6PGM2A+K0Ue3ce5MyZ91je2srSlYsJ1JqIrMAWTn+1nLDIWRlknpuD7C+/FaOixlRrvpw00Px5EYGD/W0578WLfixVkx8OqeOshABXraNKxCtVHn4qKsWu6V1Lv8h7FlXiPCoX+SbUgsGgW9EjEAi48YsZM2bwrW99i2vXrhGJRBgzZgzd3d08+eSTNDc309LSUnTR1AdRtrIBx/XX2trKr//6r7N69Wri8Tjf+973+MEPfsD48eP5/d//fTKZjNuH7bnnnuP//b//5+ZhGIbhWpWyUah6+AUCAaLRqGvpQSGoJJfLlW3BVSSi3zE1rztORV0O6W4DDwgxP3bpKrRwKuznBCeOnOLIwcNMnzydNWtWUlUbgRzYlsg3/cRp+qmDjY1Agk+E/NAhu5/NnSAgpbtaRXqq7upyoQGLXUcqSfKf3Ed+lW9S70VFP6r35+ehL+dV8lPjt37xUyuIyPdKXVdJ3jVSeajIUhXtWex7H4QGi6mpczvQvd0pFVN+vAjPjzr5aqmph70al+rq6qK7u5sLFy5w5MgRGhsbmTJlCuPGjRsy8Vd+Lq+7aNEiFi1a5C50NBplwYIFRCIRLl265NZJy2az/PSnP+WFF15g8uTJTJ06lSNHjrggj0wmQyQSKYAkg2OpxeNxenp63AoCkryW6J1SsWv6vYEGc5MN/V3vG/nvylibDboBZ09eYN++/YwZ1ci6dWupb64DC9AFRlB3Km4JG00TBEPBfkEGWAJ05XfNy+wD0mDzWY65/iDXqPThcLdo2KVQMcWiXPM82HW8Vlq513YggI+fyq7KV42n/coLNWn1QCGC8OzZs2zdupXnnnuOI0eOkE6nmTVrFuvXr+c//sf/yLx58waFqqoBSxXcoAqhK1eukMlkmD9/vhswf+mll9iyZQv33nsv9913H88++yzJZNL9vmw66oWthkIhN05XXV1dIHCHDawYgorFHaQV+UHjP6XwVxOESyE9AJ03utm9azfdnd1s/vhmptwz3pFMOmBqeZCIIGtlsaycI+AAnf751KAgD7vUuJo6zmLuwFJoOAAKrxunEuuqAqYklYqQG4pUt24l3I9ed2clnhnJV31GiyW63yl5502umRcoUm7yYgfkuPwqrO4H+V7QWEp4wzDo7Ozk5z//Od/61re4ePEijY2NCCF4//33OXPmDAB//ud/7paoGui6ajKreghns1n27dvHiy++yPz589m0aROBQIDt27fz7LPPMmfOHB5//HGqqqr413/91wK0JfS7Em3bpq2tje7ubtrb27ly5Qrd3d2cPn3arfvY2NhIKBRy61ve6QZT719102QyGTKZzKAVuUshb9UFGasEZx5ty8YtV+V51aT/0YUk6k4MTAg0dLLJHPt2HeD9c+dZMGc+s+fNRDNBpEHTIZVNYms24XDIAZZkM6TTGdB1p3kooAvdAYzku1lrrtFmcyfWmuoeSqfTpFIpUqlUgevoTmkwK0Gur+SXSqXcvCY/837k+so9JNdWvTc/SNO0gqruqivOr/EK4VSSBwpcu3IOyuWSU/kBpFIp0um087x4UJ7lsqS87kfJM5PJ+OJ+VCtBqWe4xBPcDeQ7UESWojIMg4sXL7Jt2za6urr4zGc+w9q1a8nlcpw7d45//dd/5bnnnuNTn/qUK2xUv66KxIH+qtzSHZnNZjlw4AA/+clP6Ovr44knnqCxsZGOjg6effZZ9u/fT0tLCwcPHuTmzZucOXOG3t5e/u3f/o01a9Zwzz33uBsnmUxy8uRJDh06RFtbG8ePH6e7u9vVCKdOncqaNWuYNGkSqVTKTTS/U1KtUPlQxONx4vE4fX19gwq1O9bWNJz+ZLqBEDa6ZjhFlNGJ98UROadCiC50bM12m3AC5EijmU4HakMY6MIgl7KIBqOIrODY0eMcPXiYMaNHsfjeRZgRg0Q6jZXLIWxBVqSxNcsB/BgGmXSWRF8STei4FY/R8u5Mvf9nTaCWT/5Aw80fqqZpkk6n3fmVoKPBDtyh5rjYw+4VavF4nEQiQSKRKEDZ+qX9yudF5euFovtBsuKPbduEw2E3p6pc+WrFSAjhjk/TNFfIlCOON5jgSKVSJJNJEomEq2h7K4CUwhcoEJKGYZBMJkmn0/T29rr35nUZljLHal6lHItUGH7lhZqcbBVU0d3dzdmzZ1m4cCF/8Ad/wMKFCwHc3lbPPPMMly5dcuNcXqGmLpZ8WAKBAGfPnuXgwYNcu3aN8ePHs3btWh566CHASdJubm7mnnvu4fLly1y+fJmenh7Onj1Le3s7+/bto6GhgRkzZriCSdM0YrEY48aNwzRNrly5QjAYZNy4cQSDQddKE6I/sbsUUg8aeeBJN4NamaGc5BQdttEMnCr60rWBgUkAYRTfwAKBCAiEaWNnwdBMtIxByAgSEEEuX7rM/t0HqIpUs3L5CiZObSGrZxGGTS6QQdiCQCDoVPLPWSDA0E0MzSBoKPl+0jp0f5F0Z3Oh7kfvv1LdkIM97PKQkPtEunHkevsl1KQgUflKQeqnMJUuObWijxdZXG6Sz6F8blSXoB8HsbymHKfcP95wRKnCRVUGvLm3cm7LLdRU97gKevED7e0X+Wqpybia6iqULr76+nq3or5hGNTX12PbNu3t7bflfXktGXXDXr16le9973ucPn2axx9/nPvvv5+amhpXENTV1fE7v/M7fP7znyeRSKBpGolEgm984xu8/fbb/N7v/R7Tpk1zLUPbtgmFQsydO5d77rmHmzdvulVHHnnkERobG90YnBRmpfRTk+PyamayGkt1dbVvQs2yc46lZgt03SDeF0fHIBwNo+sDpFVoYBs2aTuNGTAxCaDpYFTpdF3p49DBw/T29LH+gXUsbJ1HuDrodKsOCCzNBAtMPYAmBFbecopGq6iKRqmqqvL0QCsvqYjXaDRKNBp1S5GVQsMRauBovNFotECb91OoSf62bRONRgvi0X7yjUQi7vx63XJ+CTUJRItGo763nlGFWiaTIRqN3mbdlMpTDduoc5hMJjEMg1gsVlSolTrHqsIjUbuqx+1uIN+EmreSB0BtbS0TJkzgrbfe4n//7//NI488QiAQ4PXXX+fHP/4xpmmyaNGiQRdF13XS6bQLvd+1axfbtm2jqamJuro63n//fRexOGHCBCZMmEBLS0vBNTo6Ohg9ejTRaJSWlhZqa2vdB0NqQtFo1P37mpoastksjY2Nt/UaU0Er5SKpearWRPlJoBsaGjpooOlaf28xM29BFIup4YA5bGFi6iaGrTu7yIKTJ05x/PgbrFy5kiVLFhOuCSFsMHUDDOGAQHQNPQ8H0Wy7wJrwuwyPGvT2Wk5+ke0Zo2qp+SnUJHmBIsXyx8pJ0sWrAhr85Ae4hz9w2z7y09WqWmne8ZZK6hhUhUAq0H49K8XGIJWDX/naj3IBZA+pcDhMc3Mz9913H2+99RZPP/00zzzzDADJZJJbt26xefNmJkyYUPCgF4PLywr88vrhcJhz587x5JNPugdXLpdj4cKFPPHEEyxfvryg0HEqlaKuro7m5mZM0yzIe5MLKrUumeeTzWYLgBRq8d9Sg8KqpqXGDv3OU9NEvlo8NhoKX3JowkQg0IRW+AogdHTbRLN1MMBKCt48epL9+/fT3NzM+gfWE2sKIywcayyiYwmBLaQWKJz/e2DDfgMYBqNSeA/nu6rrT/U0+DVm7z6S9+B3XEQdp/qeX65AeX2vAq0Ks3Lz9VrBA12/HGeCvI4cj8pvIDdyOfgWy/OrBKK0HORrmSzp95VuujFjxvC5z32OS5cu8fOf/5yOjg43P2z16tU88cQTTJw48baF8k6mdFsKIfjUpz7Fpk2bXDNZXXzp1pRWmCzZNWbMGP7mb/6GeDxOLBYjmUwSDoddv7y81kDaphR2arfbcjw4Xn98xTeRJhyrTdPcdjLCbS+Tf3VsO6ertfMGl85fYeeOV0mlUvz6b32GWKPTTFCzwAzpCASZXAY0QVAPFWH8y0uDrWEl19cLuPplJ/VZutvHO5gb1S+FQVW+VEv0biBfK4qoGfadnZ0IIZg6dSrf/OY3efzxxzly5Ai6rhOLxVixYgWzZ88uKELs1bY0rb+Go2EY5HI5qqqqqKqqcqH1sr6jXIxsNusKLTXYGo1GicViBYsHFAg0yVd+T5JadV0KbT8OKL+FmyZudzOgOQKsGE/HWamDnf8sA+1XOzm4/yCJRJz77ruPybNbnARrDWd35auGOMoBFPgxvdf/EDXBUngP57tF5/NDGq+ve2oQd6NfPIc60P1+Ngcaczn5qgp1MbyB95wsBz8pLMuF6KwU+SbUhOhvAX7t2jW2b99OZ2cns2fPprW1lfvvv59FixaRy+V4/vnn2blzJxcvXmT9+vXEYrGi2ocQosBVKCuBqJX6VXCKEMItqixhvlLQSgtR0zT3GtKlqZL8nhSQaruScvuZ/fT/386MokgM2eiz2N9rmuaIpKzzu5W2Of3Wad48foJZ98xi1QOt6LYGAcDI74FkDi3glEqzsbGFQEOgLq3qfrxbXBzDJa8mre7pSozX69qt1Px6Xcvy50ryr4TgLrae5YiXei3rD/PZUEMhdwP5JtRknooQgqNHj/JXf/VXNDc385d/+Zeu+7C2ttZ1Cz711FNMnDiR2bNnE4vFCq6jag2yJxo4VpWsBCJJzRfzfkcGdWU3bJlUGAwGXXSP14cshZ2KnPPWeyy1n5rKT6VKbSLVj27n88CkyzBsOrlGmXSGcCiCoTtxNDsnePPYSV7atp3Jkyfy8U88TCAcwC0DooFmaIQCAQcxmb+uni8d4rXC72aB9kHWqdJjVF1Ikiqxr7yudPW9SpCf6EeVBiqRVyo/9fsqj0qFJVTPlDwH/QYZlYt8E2pyUrq6unj99ddJJpPMmDGDmTNnuoJI0zRCoRDr16/n6aef5siRI1y8eJFp06YNiCSS8TLpasxms9y4ccN937ZtYrEYNTU1BbBYGQdLJBJks1kXEivhv9LCk5nzamUCWU5LBZuoGqj8/U6p2MOnati+gQny7keB6Hc9KrwMzcBGEDACBMJBrKyFjdPz7P03L3LotcOMbW5k8bIl1IyqAh3sDOhh3F5pQuuPx2n5t0VhEloB+QmcUHl459ZPEMNAh0AlQBvFXPh+8h7MIvWbZ6l/MxgVm7ehns1ynAleS204HahL4auGjFRld6TzNbjw+HQ6zc2bN6mqqmL+/PlMmDChAMgBMG7cOKZMmcK7777LlStXXMtK5qupB750HUpL8MiRI2zZsoVLly6RTCbRNI1x48bx2c9+lnXr1rmux/b2ds6fP8+Pf/xjrl27xh//8R+zdOlSstlsAYTfCwc2DKdjdzqdvk1jUhNZy6mZyd99janJ0JamaNXk69flY14BI+BU+cjH0AzNAA362hIc3HeQi1cu8Wsf38TiZQswovkCxQEbDL0gbKbl/+eMi3xsrVATrIQ2r8YlvLUfK+Gq8q6n34F3r4VWqTn2Jur6zbfYOvq1rt541mDxrXLx8ioEg+2fcvH25lJWykIsB/luqUnBkEgk6O3tJZFIEI1G3dJSmqZx7do1tz1MMpm8rdyMqmFKYSitvcuXL5NIJGhtbWXKlCl0dnayZcsWnn76aZqbm5k3bx43btzg+eefZ/v27ezbt4+mpiZ6e3sLGn1Kv7Hq2lQ3k9RUpNYi8+S83yuFvJqZ75q8DVq+sDDa7RBzTWgOlD+V/z0I2d4sh/ce5dzFc8yZN5t5i+ZixHSE5VzLMB20YxGHjFK/8fbxSqvaTzCBqoWq//xMvpaHgtc6lFq3X/lGcrwqKlglPw+oYhawann4wc/bWsdP96N6bfVckAe/F3xWDn7qz37GKAdKEajEeVQu8jWmpuu6m5/W09PDwYMHOX78OEuWLHH7rfX29rJjxw5OnDhBJpNh3LhxwMCbUBUyhmGwbNkypk+fzuzZs91ac21tbfzzP/8zZ8+eZd68eVRXV7N48WKEEPT29pJMJl13pHQ/qvcsLUKgINdOVp9QtcBya9uV3Th5KVNkrg1MbMvGkDEyASIlOLX/bXbv3kPLxBbWPriGurEx168o7zyH5TaMUa20As53yQPiJ/mt+X7UtOu7OW6qUjHrTKVyj1O9lmyj5Qefgehue1Z9F2qxWIz58+czevRo9u7dC8DKlSuZNWsW6XSaI0eOsGvXLq5evcrixYuZNGlSQZUH76JJrVcKtSlTprifpVIpt4RMKBRygSB1dXWsXr2a+fPn895777Fnz54Ca1ACP9Tq6bIoa19fH9lsllwuR09Pj2slhkIhV9sOBAJl8zer41a1vnKTA9jQEG4StBNT05WK+47bUaCZGnZacPWd6xw++DqhYIhly5f+/+ydeZAd13Xef7e73zb7go3YCQIgAWIjIQAEAYIkSCoiZVILLbNoWyo7RVspJRVZjpIqO0tVqhynmJRUisLE8VJOYsWOKiXLlkRSpCSKKwgQOwgSCwliIUgCIGaImXlv3trdN3/0Oz33Nd4MwPNXHbkAACAASURBVJnXjwD8PhZqhm9m+vS9ffuee875zjnMWXhd0NzT1VhJhad8XN+tNvwcI4UIlA4uq5VG+7ruphuX336iOfwkTqHmQSoOfFLjrXddU14c4zXj3WZCdL2qRpPFeDE106VsymrUe1svAVr2BWj8fMqYovffylODkMSRSCRYtWoVn/3sZ/n+97/PL37xi7AxqO/7fPDBB+TzeebOnctjjz3GvHnzaooZR4PbprvIbBuilCKdTnP48GG2bdvGxo0bWbt2bU3ca2hoiEKhQCKRCOn8AvPFGxgYYM+ePZw7d45KpcK+ffvIZrM8/fTTpFIpFi1axIoVK8hkMmHagtSemwzMl0NSBfL5PIVC4ZJV+icrL2Elgg7VlkLjYTmQz4+Chnx7Aa/sk3HaKOQqpBMphj8c5sWfvcxHgwNsuHM98xbOJV/I4yQSlL0KuuTiWT4+Vbet0lX3pY2lq/aar0DpGqVm2za5XA6lgnqaU5nHiSDrKVqlX9zIcSoX27ZDeaOjoyEJKa6xwthmaMoVxBnwl7GaVfqBmo240ZDDJ1BD/hqPmTgZ1FNqUqFf1pHsQzLmRigBs6iwzG2xWAzHO969TRZmlX7xRJVKpYuqxFzJiL3zNQREkK9+9at0dHTwwx/+kPfee4+hoSEAMpkMK1eu5Dd+4zf40pe+RE9Pz0UBV/OrZQWtLZLJZEgakfjam2++yRNPPME777zD7//+77NgwYKa+1EqKKhcLBZrFrz5EJUKErzff/99Dh8+jNaac+fOMTIywttvvw0EaQOLFy+mra0Nz/MoFApTmidzfJJaID2/JIeukVAoXM9D+2AnLFAejgWuW8CyExRLJSg76JJHQtuMDrvs2nmAw28fYvnym7h51Y04bRaFchFHV/C0h+e7YCuUGounVaOggXKDqrczsP7ME6GUIJOXJw6I4tJ6rFedlD2b6oZ7qRO5bAzyzyzBFpfFJOt7vH5qccqVHoDm8zTnv9HQWocuOSnCYCq1RlhN9RSHzK0wps1DdqNgFjS2bfuiHm6NLpMFY2xH2W9FVpyHsEYiFqUmL5PkjNm2zS233MKsWbO47777OHbsGIODgySTSRYsWMCiRYu48cYb6e3tvSjnK7oYzcohUoPRdV3279/PCy+8QKFQ4JFHHuH+++8P8quq9xEW61VBGoG4J0UpmsHQvr4+tm7dysaNG0MLbWRkhIcffpienh66urro7+8PK5NMpZdaFPJS+L5PqVSis7MzBjJB1Woi0DGaCnYS0pkkyUSGTKqNZCaFVwBbK948cJQ9e/eycNEC7rz3DqbN6cd1PFLKD2JtSge1IwHQWLIBiCxTcoSQ4jhOWBWmo6Mjts1WTtCSaygyJU4apztOnp90TzfTReImbAiRQXJDo0y6OGR2dHSQyWTo6OgIN/ipyr0UGUc23Pb29osstUbHnszDsDxTUT6mZdUIOfWahNq2TUdHRyxEI1ORRYlyjcjFbQZiuUtROhDEq+Rhz549m9mzZ1OpVMhmsyQSiZpEa7i0yS7VQ0ZHR0mlUgwPD/M//sf/4Pjx42zcuJE/+IM/oK2tjb6+vpDcYVYoF99wPp8HxjrlmvGdtrY2Fi1aBEA2m2X37t04jsOqVavo7u4Gxk67yWQyFl+z53kUi0VSqVQ8DDkd+UZB0hallsLSFokMvHdsmJ07d+Jrj4133sac5XPAhqRtU+3iCXWIIB8H6XSadDp9USJ9o2G6eUWmMHDjhsiTcm3NQrlcxnXdmko8cULcjjK3ED+hQWtNqVQCqJEbN7QO2uyI16hZ8izLCvs5xjWv5sFLCrpfLSSfWCn9Munm4tY6aOzZ19cHjLUKNxOyL+e66XQa27b5wQ9+wF/+5V/yyCOP8OUvf7lmQYssgdSjlM9FplhzchqCMYtQWtO7rkuhUKCrqyv8fdPFM5UXyTyFmpZanFX6tQ+ep1HKw3YIyhR7NlQUylWgYXigzMuvbOfC8BB33H0HN65cEjA9PI22rYsV4+XIjYzFHG/cFoR58jX/xalkZE2Z8kxXVpwpDECNXBNxyjUTdaOkjTjkmuvHHGszKP3Rf42M48HFFm50P2j0O2PugeYaEhfk1YBYq/SLq0fcfECoSKQgcCKRCCt5iCtwIjPXLGistebNN9/k2LFj/PCHP2TXrl2k00GFeNd12bRpE4899hiFQoG/+7u/4xe/+AWvv/46Fy5c4LHHHmPjxo187WtfY8WKFRexs+QexFISJSiEBhgjrjT6tD9RgmejoO0gr8zCQikNWFiejW0lUK5CVzS7X93L6/v3c/PK5Wy441M4bQ7a91BJu5oF8PHvK+p+jP4sLpgB/GbKHW/TiTNvq55sM24bp9zoeh0vPt5omdGvUWXWaLkTvaNxyBrPVd1oWabiMtfK1WKlQYxKLbrRiyUjpwBRdhJDMxvuTQSp05jP5+no6OCxxx5j6dKlYZwsn8+HJ+ObbrqJ/v5+CoUCy5Yto6Ojg/vvv59UKhW6PqVBqHk6MYsWiyyx1GDsYUvAv1FB6Ohn8S4kjVI+oPE9H8uySSbaydjt4MKR10+y49XXmNbfxx1330amT9y0FhdlUX9MjEcAihumGzpaUSRumSb1W8Ydp2yRU68aRNwb1KUUWxyIzrN8H4cCN6/frM2+3vqJ84AQ/UyqO10NiLVJqNZBMWEJMkrzzlKpFPqhTVdFvQLF9a4rwX3Xdbn55ptZvnx5yBoUZWnmoCUSCe677z5gzHUgsb5UKhX6jMWlKPcpD7Orq6vGRSrXl0TIOLonx8lQA/D8Ch4+CcvBrUDSgYSVopAr8+HpQV56/hUyqRR33r2ZBUtn4HsajYdyfLQPlnIYT7FdzuI3T9Jxj9WUWc9tFLe1NJ7MZsiuN7dxy613H1OVdymiyERjnIr8qMVnyhkvPNAIl+d4cus90+jvNOLZmnMWd2ig0Yi19YxSilwux759+3j33XdD2q0wD/P5PKlUCsdxyGazTJ8+na1btzJ9+vQJr10qlUJGoygt0yVosoLkZCOki1KpFAZ35fe1rm1pY1lWjQLL5/Pkcrka95XIiOsEE/spMMi1RqFIOsmgaEhFce79cxw99DZn3v+A+/7RvaxZsxw0WErhV0tgodTHCaPVFx85cTZjk43Ka4bciWQ2y2KKymn2ibvZlmFUZiM9KZcbp2uEzIkUibgkozU2p6p8rpZK/BMhdo7mwMAA3/nOd9izZ09NLphpDcnDSSQS/PSnP72kUjNPJpL0KHk/YoGZJxulxpqHep4X5s+IxWfG8KInICGlSAURGHvwZr3CyQZRzRfSPMGbgfbJLjDz72qCy9Wq/I6y8TwfG4VSFuWSx6E3j3DojcOsWbOGFWuWY3cALpAGX3t4eDhq4q4El3qx5L7Mw4c55jggz2g8okhcJ1Ehp0QtNYiX0m/maJkym2EZm9ePEnTiQPR9NzHV8ZqKot7eYMo23+NGKZfxMJEVPhXZvu/jOM5FCrNlqRGwB8XFmMlkwkTptrY2fN8PWYXpdDqMrfX19YXW3HjQWodWlFTY11qHydEHDx5kzZo1rFmzpia5NpfL8eKLL/Lee++htWZ4eJibb76ZrVu3kkqlwt5v0dOOUqpu8qpZJ9KMyX1c1FuEZupBo+I+NYoTha89lAZb20GOmQ+H3jzM3n0HmDlzJp9afwvd12UI2tH4gEKpgCUp1fynSuWPxrjitpzGi6nFKVeebb2uAI2Ix14K9SrYxzleiTPXq48aVwxxIhnm/DdCjlxTZNZ7ho2aX/Ma9WKz9dIIpirXlBM9DF0tiE2pSQJkd3c3X/ziF7nvvvsoFov4vh8qJelDJknSHR0dzJw5c8LrRmnYvu+zbds2XnjhBXbt2sWBAwf4xje+werVq0M5Z86c4cknn+SHP/whxWKRmTNn4rouTz75JG+88Qb/4l/8i1BBmtc1XYvm4pVakUAYN5xKnoqp1MzalhJvnKqlVu+UZWFX+6kF4zh1+By7d+2nrbODrffdydwlM8AJEqtdv4ytq4msKLRl4fuayfogzVOuWOxiRce58ckzrVQqYT1POTzEfRJ1XTeUKzHYOC0mGa+so2gsLy5orcMxmtZ3nHMsh2IYs/6jccupWGpw8Tsk81mpVGrWrcx7o5SAuR8ppcJ1W0/hNGJ+TS6CqUBbZbIYs2Z6e3t5+OGHLzsb/XJcVzLhooTef/99Tp48ydmzZ2sWlWyaJ0+e5H/+z//JtGnTePzxx1m1ahVHjhzhd37nd/j7v/97vvKVrzB9+vSwp5oZJBXXZdSvLkpM3J5T3Yyj7iHTTTvVa0fdkEop8EBXNMqCC2fz/OJnL/LB2XPcd++9LFt1PaSoshx9nKSFEstMi6XWmDhF1GqKkxFYz1KLO7ZmnupN6zvuuJq5hkxLxvw8LshYRW4zZNazQhuZG1fvHZJ9IBonNed7sqjnRgUmXLONnF9zXJJCdSnleaVYc7ErNbNgrJyMfd8nm82Gp45UKhVS5+fNmzdhIrPneaRSqbAqSCKR4NFHH+XRRx/lb//2b/nmN7950QnGVELyWXt7OzNnzuTkyZMMDQ2xYMGC8LQnsTr5fbEkzBw2UZxmzGSykMUTjbdMNfl63FOmr1GeQjmK0lCJ117ZyalT73LD4sVcv+R6dDLggqB8NBWUpYKka19hqSpPpAH3VO8acVouE21wccbUmi2z3rVrYqrXmFzZa6Lz3AjLdCJLzfx59HcaPdbx1pH5eaNkmkpTPFGVSiXMAb7SEStRxMzjEo1/+vRpnn322bB/mhA1SqUSbW1t/MEf/AEzZswY95rmKddMtC6VSoyMjNTkx0lcb/78+Xz+85/nL/7iL/g3/+bfcM8995DNZjl69CirVq1i1qxZQK3roFAoUCgUOH/+fJinduHCBSwraFHT0dERlshq1AnFVMKSlB5XHhwW6KLm8P632LtrD3Nmz2Hj7bfT3duNShI2pq6e79G+xA2VXHTK92T2rDPLmcUFuX4ymQyT/ONme8l1ZYzmgS3uPDUgfL+inoa4IPJMT0bccqU4ghwwo1ZMoy01gewF9ay1RkOub/Z/jMpqpNyoooy7RmojEWuemqlgtA4adP7t3/4t3/rWt/jggw9qTlGWZdHR0cGjjz46oVIzFY/p2kmn02FVkuhm0d/fz4wZM1i+fDmpVIq///u/Z3h4mEKhwIIFC5g5c2bNw8vlcmzfvp3XXnuNgYEB3nrrLUZGRsK4z/XXX89dd93FggULwtp6k42pRReoXCefzzM8PBy6ci7rWhCWFa5eEKoFhbXWoEGjsHxIk+LcOx/y8nMvUyl7LL95OdOm9zOSH4EBBywXT5ewbR+0As8hmWxHe+B5FbQtEj/+eOWZSf7iwMBAWDU/zkrgYoG7rsvg4GCo1OLc5IVNVigUGBoaClm0Eu+KW5Fns9mwTqpYx3GzLgcHB8lkMuEYhUgVp6Um7W4kB9ZkVk/F9TmeJQZB/8ahoaFQkQu7uxGl18S7JdeD4GA0MjISkuzqyZnqHIt3TdaJzKm065ro+te8+1Hyx4AwcHz8+HF+/OMfUygUWLp0KadPn2bhwoXMmTOHHTt2sHjx4rCauCAaa5KHXSqVQkUmJzSzOLHJkty5cye/+MUvuOWWW3jkkUd47733OHjwILt27WLPnj0cO3aMG264oYbynUwmmT59OrZtc+LEiZD0kk6n6enpCcclgeKJMNHDjo5PPhMFfakNSGHh66AyiLZA4yHNX2xlo5SNdjXKh4SdClyPvmJ4MMuLz73MhcEhtmy9ixXLllD0S1hOBddTKO3hKw2eCkppYeG5HngKXwc90SZLFBEijOneEIUWVzDaDHabRBFRbBPJncrLKpuDJPhXKpWGpTFcaoORuZV/gkvJnOrmZJKcTEUap1KTfSBKsDIJMpNBPdeeXE9SiExlZiqhqcCsmWkWpxAmthmeaKT7UdaqeRhQStUQYq50ay3WgsYShxL3x/DwMGfOnGHZsmU8/PDD/PVf/zVLlizha1/7Gn/+53/OBx98QFdX14Tlp8RlKXUYzQ1Cqn6YTKFEIsGRI0fYsWMHK1asYP78+SxatIjVq1dTqVT41re+xaFDh5g/f36ohDs6Oli7di2rV6/mwoULJJNJLly4wCOPPEJ/fz9KKdra2mrM8ameYEylbXbT7uvrG9dSU1T93mh8QCsfX3tVhQM2NiiF5SnwFA42WkMp63LwyCE+eP8ca1atYd26W+i4LsPgQAnHStLV34Vlg1mF3/Id0MFHWoG2JqfUZJxyyrQsi5GRETo6OsLDQhyQzcGygn5f+Xyenp6emso2E93zVGVLA9Senp6aDutTweUoNXF7SgFxiF+p5fN5MpkMvb29oVK51MFhKpDrA3R2dtbsAfLzyWIipZbP5/F9P1xHprJrBFFEnp+p4IQp3tfXd5EV2ghlI94Tc/5GR0dDwwSuHItsPMSm1MxFLJMgrrp58+axadMmnn76aSqVCosXL2bdunV897vf5ejRo0yfPj304UYnUBhk8nDNk7Y07cxkMgA1ZI9CocDx48f56KOPuO666yiXy5w+fRoISCPRxSifKaXo7OzE9336+/vp7e2tuZ9GuBrqzZ0Z97kc96MFaCx8I3cszClzqp9p0K7PsSPHePXV7UybPo3b7lxPx8wMJMBKBu7JZDIBSgdJ2tXrKRlj4OOcaopaDaQiTNz9mqIxtWQyeVFN0rhgyjSZbHEjmUxe1L4ozjYp4uUwWzKZLuc4oLUO3asmwzRumGvInNNGu7RN60gqH0k1o0ZD3kG59lTdt58EYq3SHw1qdnV1kclkwkr7s2fP5tChQ/zVX/0V+/bt4/z585w6dYo77rij7jXNF0NOMZZlsX//fvbv38+OHTsYGhrixRdfpLOzk7Vr17Js2TLWrVvHli1b2L17N0888QSLFy/mzTffZN++fdx9993cfPPNoWUkVoQoVLNMVqFQoLe3t+4pcKJT0uWcoKLu1cvJUwsZSlWHow4djwG8iksqkSQw4wAXzp4cYNvL2ygWC9zx2fuZvmgavg+WB57vY6UtXL+CsoPrWjogh1jVQ3ZoqU3S/Rh1CckBxcyligPyLMW9LHN7OfGlqd6TOUbJo2qEpXY5bm1zbs2fXc7fThYiE8bcaHFXFInKa1SlmIliavXcrKYbcqow58201OR5xhFTM1mPpuvYZH9f6Yi1Sr9ATNp0Ok13dzcDAwNordmwYQNPPvkk/+E//IeQ/Th79uwagkn0pGCyuizLIpfLsXv3bn7+859z7tw5li9fTjab5ec//zmdnZ0sXryYFStW8M1vfpPvf//77Nq1i127dtHV1cXnPvc5fuVXfoWZM2eGrkpZPPWYiHKK+biMrss9NZoyLzd3qxqRg6pVZQtt0Veg/UChecEvXjiX5cXnXuTDs+e5Y8tmblp/IyoJygUccHFpS2ZwtUuSZGDlqSo70BoTqJTc6+TjFObGGs0ZiwvmPEaf4USbwVRO/WbM1PxnfjbVa9eDmaMVtRziHG+997WZlqnIiyMXMHqdeuvWPHhPVa5JojO9XiIzjooi9VIVTJbn1YBY2Y8mGUDiCZ///OcZGRmhr6+PTZs2sWXLFnbt2kUmk2Hz5s0sX778opfd3ADlpCK/097ezm/8xm/w8MMPh6a5nCyEaaaUYtWqVSxfvpwLFy7Q1taG4zgUi0XS6XRIOjEDoeap3jy9yPXNyh+N3ozNF/Oy/0bchAQpZQqwHCtQaC64BZeD+w5y8MAbrFq5itvvvg0raQVKLwVY4ONRLBdIZroaNpZx7zfy0jTDvWFurubBIXo/cciMKrRGyLzU39dTaI2SfSm55rjjJhbUUySNVmj1MFEifSPkRq830fNsFOrl9kX3vysdsdZ+9H0/TJQG6Ovr48Ybb+TChQt0dnayaNEiHn/8cfbs2cO7774btmQXhSIwXX0mxV0UXCaTCeNo8ntmbUah+QujUcz4dDpdoyyjCdrm9yZ7y3yB4mgdb5r9l/hNfKp1GVEoHdRwrBYCEQOOSs7n9f1vsm/fXubPmcf6zevITE9RKbooR2GrIPZGQjOaH42VsGGOEWpZiXFD1oTIk0NMnCdQ0yVlujvlszitF5OW3UyYMk233FRYiBPBfFfMg2ejlYwpz3ymZgjC3KsaYYWbrkC4eG7jUnDmM4uO80pHbEpNXHWyeSQSCU6fPs0TTzxBLpfjlltuYfr06dx4443MnDmTJ554gj/7sz9j6dKlPPzwwxedpKGWSmtuRuYDh7EgqqnczMrT4qsGaurUCbMyGrszc23kM3MhX2pTvNRiqLcwzeuP9/dajfE2LKqbBmos1FUCHMgNj7J3z16GPhrhi1+4m0XL5kMFEhkHFOSLoySSCdLpNIVS0AhVonO6KiEkQmpqfv5xUe+lj8Z74sLlzOlEfzdZmRPFZRrBzLuce5joni71+x8X0ecZ9/M14z/jPdvJyo3O0+U8v3rWThwY7zlORa7scebBvZ6X4UpGLEpNFIRZTf/8+fOcPXs2TEI9c+YM06dPR+sgcfLDDz/Edd0wybme+810DZqxNUl+HhwcJJvNct1114U92yTxdWBgIOyKncvlUErR0dFBe3s706dPD6uTVCqVi9wZIlc+MztjjxewNXGpxWC+iNFYz6UWk+u6QSzNSVIuBAraVlYYR8sPFfjp089w7O13uP+Bz7By3c0he9HXQXA9kUpgKYtyuUx7pp2g15q4M6uyzVtQkz/5yosoJ12zGkOcJ0+odT9GXUeX83eThTxfkRmNs8WJ6EYf93gleVe+j443DkTdyHHOaz2X4Hi/M9V7qBf6AOp6lMa7x0bg8rxGVw5iUWpKqTAvx/d9Tp06xR/90R9x7NgxDh8+jGVZ/Pt//+9DqnGpVOLgwYPk83l6e3vrUvlNk18WcaVSoVwuc/bsWd58801+8IMf8MEHH/CHf/iHbN26Ndy0Dh06xH/6T/+JAwcO0N3dTXt7e2iBfeELX+Cf/tN/GprX0d5qZja/JLCKfJOVNFXUY2pNdPIEjVbVBa6rtOa2ZND7rAyowJL75TMvc/z4cTZuuo1lK24KuP8WwZNXwpisc9o0LDWlrerXxscNo+NthlJrJqJWmqnUm30PjZI5kSUQl3Uy0XXruVgb5fIcT67pmjM/iwvmtSdyPzbqHTLDMR/nAHglIFaiiCiIkZERfvaznzEwMAAEk7R79+4w3jYyMkJ7ezurV69mwYIFIbNRELXMyuVyGM969913+au/+it2797NgQMHmDFjRvi3UtVEa83g4CCbNm3in//zf87MmTPDUjM9PT20tbWFVpy4IoXib9YlNF8SrXVIczVzjyaLem6qS52ONBpLWbiei6sVCWUHCq3qk3zn4Cl2795FV1cnG2+/jZnXTwsUIBpd/R2FwtIWlrJRvhUYcb7BrDIUmSR1T2Ws47niPq5LcCowDwvNelEnPqDEJy/6WbMtw2Yh6lpu1rNt9jONxrbicnVGvU+fxDOdLGJTaiaTsL+/ny996UucPHmSvXv3UqlU2LBhA9dddx3FYpF8Ps/ixYu5/fbbueWWW2pOBdEgrFhTYqktXLiQxx57jM9+9rP8+Z//Obt37w5zVszE2nQ6zZw5c1i5cmXoFpX7FCVmZu/DWNpAqVQil8uFblG5H7OKwFQQ/fuoH/tS17csG+WrgBxiATZ8eOwjfvKjJ+nt7WXznZuYuWBaUKTYqp5stcZRdmiBCX1fVbtgq2op40YmWV983/UZa3FhvHluBpqRshCFGZdupNyJrhV1A17q9xslczz3Y6PfzejP4nQBRl2dstdE416NkmciyupsKTXGJlxrzbx58/jDP/xDzpw5w1NPPRW6/WbNmhVOVCKRoKen57Lceabpn0gkmDNnDtOnT2fWrFmUSiWKxWKNH79SqTAyMsKxY8d49tln6evro6OjgxtuuIFMJhMqtmjXXgiqBmQyGTo6OsJ+a+Y9SA7eZDHRQpl4MWmUAh+NpRS2Xb1nC0bPF/jpU88wODjIAw89wKp1K4KGnwBKo22NXe12rbCoZm5X3YuB5SbsSXFDBrE1H1/psFLJVMfbKBfRx5FrbnofN9Y0FbnjWaXNkDueC3Sq1x7vZ+bcmlZEXDLNa8cRTxpPXtSV3Mjx1pMdVdhxvDf13ONRZXqlIzalZpIAUqkUc+fOZe7cucyfP59sNkt3dzeDg4MoFZShchyHZDJJsVisuU70IZoPWvLSzIK4iUQi/FweRmdnJytWrODgwYN873vfY3R0FNd1+fVf/3UeeuihmuaglmUxOjrKiRMnyOfzZLNZjh07RjabZffu3XR0dNDX18esWbNIJpNhqa6pVuk3yQRAWLi0WCyOc22Nb/mBUvNtEiqBox3ywwV2b9vHkUNHuHXtLSxevAgnYVPKV/ASHr7t4Vs+CZVAF8GxbHzfw7YdyoUKAJVita+c0mhV9d+Hmo+GKTVZI1JZvRFu3InkikVeLpcplUqUSqWwi3lccsV1XiwWQ5mNtmLqQbwVxWKRQqFAqVSqcWk3IqG8Hnw/KDbueR7FYjGMPU/VSr2UIpXxCXnL9BRNZfOfSKkVi0UqlUo4XpFjxqMmC6VUuDblPpRSYTeLYrFYl0jSqDCIhF7kOV5NiDWmJosLxlpwpFIpdu3axbPPPsuePXuoVCrMmTOHrVu38vDDD9e0gan3gMx4mTxQiXvJJiV/K0SVRYsW8Y1vfIPBwcGQifkXf/EXfOc73yGZTPK5z30urBsJcPbsWf73//7fHDlyBM/zOHPmDPl8nvfffx/f99m8eTMPPPAA06ZNo1QqhUzLyc4T1Ur7vudhWcGYxOWZcBJYdpWuKKhW9fC0j20lSNpJRvI5bBK8c+gYz7/wPNOvm87yFcvB0oxcyDHqjlJRJay0wsNDuYqEl8BWDr72STgJhoeHUSichIPv+vjKH1NqygvvoRFKzXQlDw8Ph27fuFrPiNxUKhVa7ul0M6+kcQAAIABJREFUOvbka4lNFAoFstksHR0dNcolbkstl8uRz+dDcpTIbvQmL7Asi+Hh4bBos7yHEJ+lpnXAoNZah5WBmqHUSqUS2Ww2zHeVeRXlOhXGoLC6TXlKKbLZbJh6ZFpV5n1OdU1JHq+MSYpT/IN3P4oSk8mXE/lPf/pTvv3tb7Nv376QgCEkj6GhIb7+9a/T3d1d95rmwxIav7ykxWLxosr58vsdHR0sW7as5lodHR385m/+Jtu3b+dLX/pSzelqxowZ/Nqv/VrYi+r555/no48+4ld/9Vfp6Ohg+vTpzJ07t6Zg8lQeuEKhqwQOGWK+MIqnPbp7u7DtoABWAI32CdrJYGN5VSZm0uf022d49bUdaEtz7wP3smj5ApStUFZAIvHxsByCVjW+qrobg03dti3y5VGUtujs7kD7BFncKpRac7+TRVSpySbY2dlJV1dXrC+OrMNKpUJHRwddXV0XNdCMC7LRdnZ2Npw5Ox5kvI7j0NXVVfN5nDILhQKpVCoMJzRyw60Hsfi11rS3t9cURIjTzVsoFHBdN/Q0mYeFKe8JqraGpKmYS6VS2AEhDvejycT2fZ9CodCi9ENtqw+Z/DNnzvD0009z5MgRVq1axZYtW7Asiz179vDKK6/wN3/zNzz44IOsWbOmrm8XgrYWUtFdXDnCoiwUChe5ADzPY3R0FMuywqojruvS1tZGb28vnudRKBTCE7S4K9etWxfK++CDDzh//jx33nknnZ2d4b00bFHJ2ldj/6uVT7FUJNOWxrEDF6FCYVkJ8H3wFGgrpO/nLhTYt/t1Roaz3Hn3nSxftRSnwx67bp3bjL7w6UyQq5dpy1z8yzFCKsKYVWHihOM4oTyTNBQnZLPPZDIXuZTihLjFmjW3WmvS6TTpdLqpMsWqaWtri6XKTz0opcI2O3F3mDDdj5Zl1cT345Bj/j8QVnu6GhDrkxgdHaWzszOcqPfff589e/Zw00038e/+3b/j9ttvx7Iszp07x7e+9S1+9KMfceTIkbD+oyxOc6JFgZnMrnK5zMDAQBjjMumo2WyWZ555hr1793L33XezefNmDh8+zHe/+10qlQr3338/bW1toYkt8uTEIi5N13UplUo142kY0aGeUhO3CeB6LtrT2HYioNj7VS1V/bty1mfP9tc5ePAgN61YyrrNt+KkbJjooKi46AQ9HrmgkagX/B6fDNN42aa8RpAmPo5sc5zNkB2V2QzUG6eJOMY7kbw4LbV6Y22UnOh9R9dNXKin1K4Wt6MgVktNlIRMku/7lMtllixZwq233kp/fz++75PJZLjpppv48Y9/zLlz50K3SZQgYiY9VyoV0uk0b731Fn/5l3/JL3/5S95++22KxSK/93u/x4oVK/id3/kdtm7dSl9fH0ePHuWZZ54Jafpz587lX/7Lf8mdd95JuVwOfcbN2OAuwiVEWsrGSliBC1KD7+kwn4wKHDt0ku3bX2XGrGncedcWuno6cMs+jm2Jd7GFFlpo4R8EYs1Ts22bfD4fmsqpVIquri5efvllnnzySb785S/T1tbGq6++yjPPPIPv+yxYsOAiWr34l03lJgzHBQsW8Nu//ds88sgjpFKpkDWYTqeZO3cutm1z++23h3R/seISiQTTpk2js7OTSqUSJmpfaVBY+J6PbQePyiu5QaK0E1hq5898xLbt2yi5Re7bfA9zFs0CD5ykdVFpq0mWa2yhhRZauGoQm1JzXRfHcSiXy6FSmzVrFp/61Kc4efIkf/zHf8x//a//ld7eXs6dO8epU6dYv349119/fd3gvfy/KEtReqlUihtvvJFyuRyy6SR/TeiomUyGVatWXXSP0STtT8xSuySCRp3aD0giKhMotKEPs/zy+Zd478xpttx1ByvW3oRlEygvg1GsVaw51C200EILVwxiU2rSXr2rqwvP86hUKvT19fGVr3yF9957j+eff54PPvggVE7z58/nc5/7HEuWLBlXocEYi6xUKoXV+IUlJEF/k5IqLlATohiFCWdSgK8MaMaKNFpYVqCVlFLYTpBFXRgqsfO13Rx9+xA33riYWzasJNWVxM2DnQLX9Ug4NjpqrcnlW2ihhRauQcTaT02Uy4kTJzh8+DDz5s3jhhtu4F/9q3/Fpz/9aQ4dOkS5XGb27NmsX7+ezZs3h4wpM5BusiCleKkk6opFKAqqWCySTCbD2o1STksUoed54d90dHRcoZaZgYAKGboPFeAWfY6++TYHDuynd1ov6zdtoKevBzywk6BsSFg2Y/HdaqHHS2CqNOQWWoBPpnB0C43Fleu1ujRi7acmsar9+/fz3e9+l82bN/ONb3yDu+66i9tuu43jx4/T1tZGOp1m1qxZYWPRiXKHojkUjuOQy+XIZrNs376dffv2sX79eh588MHQvTgyMsL27dvZtm0bAwMDVCoVOjs7uf3223nooYfCIsmmVWeyj+Sf5GqYnQIaAQ2Yww0qL1pY2HgeJBMKXQFVNd7OnDzPq6+8SqlY4p577mHhjXOxqsx05YDnaqyEQoUESVVXrZn3L9armfAZB8znKha23EfcTTNFtjw7seabAaVUSH4aL10lDpkQb15aFELyMlN5PknEkccl140+w+h8T0V29IBptt0SxPG+mMaDmXP3STSbnSxipfRLTO29997j0KFDLFy4kEolKMWUTqdZvnw5MJZnIhX1J4JJMZV8tGeffZbnnnuOnTt3cvLkSTo7O3nwwQfDivvnzp1j586dvPvuuyxfvhytNTt37mTfvn2k02k+85nPkMlkwrI0QkqRhE6TeSn3IDUf46Bma62r8TOFVNtxK5pEWpEdHOXlF17mwsAQ69avY+nNi3EyNn7ZR9lWoMgsH5SFP9bis3phI2eAQJGa994sSn89eebXOOVG6fzNgsgzO7I3Q6b5tRn4JGTWkxcHvT76/82k15tyot83sqJIVGmbe98nfUC5XMSq1KQ7tUyQ1FSUenQyUYlEglwuRzqd5vrrr58waVPIIKJYPM+jp6eH2bNnM2/ePM6fP39Rk8LZs2fz2c9+lra2NlauXAnAjh07+OpXv8r3v/997rrrLtLpNJVKhVQqFZ6qRZ48aLFiJI4nlqA8+Mni4rUyVukDD7yyJpFSVAo+u7ft5/Cho9x04zLWrV9HR3+1bqUCcTNqfLQ2PJfj9EGrl0PUrIVrvrD1Tr1xIiqvGRaFKbOZm0M9eXGOt94YmzW/9TBV2fWUlrluzd9p9DjrXUs8G+MpuanCrNRkNkW+Wqw0iFGpiTIQIoZt2xw4cIA/+qM/IpPJhErB87ywUn4qleLxxx/nhhtuGPe6ZkFWUYr33HMPW7du5Uc/+hFvvPFG+DuimLq7u9mwYUPN30+fPh3Lssjn8/T09IT3IfclD9Qko5hjM2WYpbkmg3qbq7gN0eBrja0Ubx86wSsvb2P2rNlsvfsO+q7rqlbT10HNSEcIJcFnGvNahjwI4m0GKzLqRon7BGp+NTeJZp3w622816JMkRuVGZfsiTb1OMf7Scgdz5KS+5nqnjCe4ooq1Xr3NVlEK+yYNUr/wVtq4sazbZtEIoHrupw8eZKTJ09O+Hf/+l//6wl/Li5NKUsjhBTf9zl//nxNz7NKpVJjdYmCzWaz7Nixg2KxyBe+8AUKhUINczLabw0C1mU0JiPdAaSg6VQxtlirMRjLRmtFot3izDvn+OUvXyBhJ9m4YSPXzZ0+RpBUqqrICOpHVgsgi9tRq4BlEiowJI6napRaMyyJeqdZU2acbk9T1njxkLhQT24zNgkzZin/3wz3cr1xxjle01XWTJkyv+NZVY2QAWPeIHN8ccTUou5MM/zyD16piRkrrkLf95k1axYrVqwgmUxSqVRC1mK5XA5dhr29vZe8tknJFxak+dBFKZkvmCi/0dFRXnjhBf7P//k/zJs3jy9+8YsAYe3ITCZDNpvlZz/7GS+99BLDw8O89dZb5HI5Tpw4QalUYvHixTzwwAMsXbqUQqHAwMBAQxK3g/sNFk9+tMjIUBZbB6W6nn3yOU4eP8GWjXdx3aw5ZAdKkPEoJvL4vovGx9M+miC2ppVGqeDxKl1tKqjt6v9XF6vyAkdn9VBw4cKFsFZgnKdb83vbtjl37hz5fJ5CoRCLTBgregvB+jl37lxYAzRuwoi43oeHh8N7aJY1nMvlGB0drXGnT6VK/+XIHRwcDGuzytqKE1prstksvu8zOjpKMpmsqZg/FYwX01IqaD3z0UcfYVlWTUHjRiibKJFJZA4NDVGpVC5ih0fvcbIQroAZ+y2XywB106OuRMTaegaCiRbL6tZbb+XrX/868+fPJ5fLhfE0sajS6TTTpk2b8Lqe55FMJkNlKApM2jGIcgLCxS0klEKhwM9+9jOeeuop2tvb+frXv05PT0/4O6YveebMmSxdupSPPvqI4eFh2tvbWbhwIUop5s2bF9aATCQSoZxx50KrQMmM8xXl4/tUu0/bKGWTSvikkyksbbFz+x6OHDrMsuU3c9vm9fR0t+GVfUiCjY1KaCzLwfM9bNtC2TbFSgnLGlNqgUfSGbsf7aEJLDzZeKSjuBxE4kA9peY4Ttg+KC65plKTijIiVz6LC0qpUJbIk80vbss0OrfNIKqYY22WUpONWOSarWemgomUmvSAlPCKPE+RPZU5jna3Fpmy35kFlBup1GQsZhxNrNErJ493YsTqfpSTkuSJ9fX1sWrVKmbNmnXR71+uS0QWqpwoTIsveg1hWiYSCXbt2sUPf/hDOjs7uffee1m2bBmrV6+uefnlobW1tbFp0yY2b97MRx99xP/9v/+XwcFBfvd3f5fp06eH1xe2pGVZaMZeXCVl8WWNCZ8++hXwcKnoCo5K4nseNja2ZeMlOrEKDmdPneX1nfu4fuH13H//fcyY0wUpQNtgQVqlQPkoZTEmUOHXRNIUNT8VEomu7ekli7i3tzf2zVa+Slyzs7Nz3JZDjZSrVJDbmM/n6e/vj73mpygRKevW09NT827EOc9y6JKu8ubP4hxvuVwmlUrR19cXyhPEIVeUmdZB65lkMnmRG62RcuXa+Xwe3/fp7e0N5TdSpvmczIag5XKZ/v7+KY/jUjJln83n8yFJbiLizJWCWGs/yoPu6elh/vz59Pf3jzsBlzsxpVKpRgGZOW3t7e24rhtuIHI6PXbsGH/yJ3/C2bNn+f3f/33uueeeGp97XaKGHmthLgs12s12rOjyBCckPfFXZVUDYwps28HyFfhQybucPXGG7TteoyPTyYa1n2L2wumQAF/5eLhYlo2FNUbVNzLRrDrJ1sr4JiSLyEdNImnUe+njpkZH5Zqum2Yw8wTNGOeVIFNSYkR+M1CPqBEXosSbuGTXu04zn6cZj23lqTHGPEylUtx11120tbUxf/58uru7p7SRRAOzWmueeeYZnnrqKQ4fPsy5c+f4/ve/z8DAAJ/5zGe4/fbbOXXqFNu3b+fDDz/ke9/7Hi+99FLom77hhhu45557WLFiRd24mLmILr2YxsgZxkeX/BsL8HyXpEoGf6/hwsAQe/fu4/g7x3nw8w+y+tYVQT1HFVA+fNUqwN9CCy20EEWslH7XdfF9nxtuuCGMR8nPJqvUxAorFovh9xJbu/XWW1m9enXojpTGdnPmzOFrX/sap0+fxrZtstksjuOQSqUYHR0ln8/XuA8aBrnUBO5HBSSUg68tqAQmVGGozLG33+H48ROsWrWK9RtuJdHpgEtg1FkKR9kXy2uhhRZa+AeOWJWaFAoWa0dqNk71ulprUqlUGPz/lV/5Fe6///6LFJKYzosWLeKrX/0qcHGAXir6T839VsdCk/sliHfV+xqYXQqtLWyqplcZDu0/zM6dO+nt7eXTn/k0qb5kqAjLrge2j+WYUbIWWmihhRYgRg+WuB+FkSj/P1W/rNDzJcYlrEeJn4nFZdafMxlKEjiXdIB0Oh0WPW5oMBkdkkfG+woapcHyFHigPc250wPs3rmHwYFB1q5fS9+8riqrA3DAtoVNpkOiRwsttNBCCwFiU2qe51Eul0MFJIpNmJCThTByzGC/VN5PJpMhnVasNHGBmnkrlUolVLJSuX/KQVBt/DPgT/BfyJD0AQ8+em+IV17axtDQEGvXrmXJkiXBffqAA1ppbKeaBuG62C0XZAsttNBCDWIlipgJn6LIJFl6spByWlJR3rTITGqv/L/kj5w+fZrjx4+TzWZRSjF37lxuuOGGkEZeLyXAxISsI1OZWebHY4rS8z1sa8xadSwn+CM/kOeVPY4cPMq+vftZsngJd999Fz4+WvuopIVGU8pXSHcmjfto3Jmk2Qy5Fq5NRPO5Wmih2Yi1oLFAKXURHX6yMJMO630vBBVJIPQ8j+PHj/Pf/tt/48CBAyHD0fM8fvM3f5Pf+q3fCq1IeQklzmaWh7EsK8ysl78XZaq1Dqj140CjKZQLtKfaAaiUXRLpZGCB+eC7Pm+/8Q4v/PIFpk3r59OfuZe+GV2c+3AQbemAgm8p0h1JtA6+T1gJNFW5kzgjyNhEkcucua57WTTlyR5MTDq/mTbRjMROk8ZvMlovFU/9OGONXmeiccVJO4+Tfj3RXJnVNORQGXfahKyhenIakSs2nszxyoE1Ik9tvGuYazfO1jNStcmUK2ONzkkcuYBTwTXHCpe4mmTfj46O8id/8ie8+OKL/PZv/zZPP/00/+t//S/mzZvHf/kv/4UdO3Zc1EfMfEjyoCT2Zv5MlOalFpanPdrT7QGZxFekk+nQ5YgFZ0+e5/lnX6Kjp5M779pC7/ReXK2xUgpsZVD5AxekEFOm8vCiOVrRl1RctvX+TQViQZvXku/jPtmLPNOSj1Ou6aGoN39XS96PCZm78f7V2+zjvg+ZVwkjyGfye3HeQ1Sm3JOESBqNS81ro2SaylOqpzTKMIkb15RSi75YAGfOnGHPnj2sXbuWL3zhC7S1tbFw4UK++tWv4vs+zz33XE0nbSmhJNeTF6ZYLF60CZoleSaC8gMl5FU0lraxtIUuAhqKgyV2vrqH9z44zbJly1h563LSvQl8y6NMGWyNlvxqVS2lVW0iOikTzZgr82v0Z+I+ln9iTU21/E900xOLMW5LTeQANWMxC8SO9+9yrx+1FOqNMVr2KC6I7OjcNiPZPI7rm0psPETXZiMSwCdaE9H/N+VECwvU+3c5suUa8r05xnotaBo199G5vJrazzTF/dgsiJtTCoFalkWxWKStrY3h4WE+/PDDsLxMJpPBsiyOHDlS0xtNriNf0+l0uKnL9xBZwJdQLkk7ia99tOtjpVWQb+aBX/LZvX0fB17fz5q1a7h1/S04XU5glTkaT7n4Sgd9q1U9WVNTLvVeluhibvQGVU9RyPw2Y5MXeaaibtT1J/rePCA0w01jKutolf6p4FJ/L8+x0ZZaVFlFN3yzbmvcVqJ5T2LBRN+dqd7DeOtJ1u2lfm+qMA+AzbC8G4lrSqmJ2W9O/pIlS/jH//gf8+Mf/5hvf/vbbNiwgWQyycmTJ/F9n2w2W1PSy7IshoaGeOutt8hmsxQKBd566y3y+TwvvPACXV1dzJo1i5kzZ4Z/k0qmUF5A5vCtKt1eabTlgVbY2sH3fPyyRpfA9ixs5fD26+/w/HPPk25Ps/rW1XT2dFLIFfHQ5PI5CpUCw/lhbGusFJZVrbgvlfeVmrq7QSqC53K5mv529TDVxW1uSELsGR4eboq7SGKl5XKZkZERMplMWHKtETG18UgSjuMwOjpKNpslm83WNF+M00LVWjMyMsLo6CgdHR0XuZQme81LzVUulwsLRjeqoPF4cRwInqvUYRSvSzTmPdUYcBRKKQqFAtlslo6OjnCcH0fmpX4u+5F4h2zbZmRkhGKxWFMxv5GxPDOmJmPJ5/N1Y2lXKq4ppRZ1t1QqFbq7u3n44Yfp7+/nJz/5CT//+c/p7u6mUqlw4cIF7rjjDtLpdE2Fkmw2y0svvcTRo0exLIvjx48zOjoaxt02bNjAli1b6O/vp1wuUy6WsbR9sVKrsh+Vb2FrB9u3yZcLWK7F+TMDvPLCdjzXZ/2GdfT091AslSgVi3i4ZIsjFCt5crkEWApLB45HS1toDOU2BaVmWmmu6zI6OornebS3t4fFoM3fi34/GdRTatKxoRFV1SeSq7UOlVoul6O9vb2mduh4uJwxT8T6s22bfD5PLpcjl8vVsHXjVmoiM5vN1txbozd5gVJBmx3JB5X47FQ3xYmUmtaa0dHR8LNmKrXR0dHwmZpKTX5nKhClJgdM27bJ5XKh9ykaammEXLF4pVWX1jqstzuVVKxm4ppSajC2QZuFiNPpNHfeeSerVq0KT+g/+tGPePLJJ1m9ejVATbuVnp4eNm3axNq1a8lmszz77LOMjIxw//3309/fz4wZM5g1axadnZ1BQNivtpEBsCTt2pda/aAtLN9C+RZUwB/yObD3AKfffZe7PnMn6+/+FIlkEixNynfwlUei4nBhCHp7+rBsCyu4OJaUKtZVR+Qk16/5sptz5rruRdXy670kk92gokrNrNLf2dk5qWterlw57XqeR6lUoq+vr2FKzZRjfgVC1zVAX19fuC7NOF9cSCaTdSvmN8o1FoWQpxzHoaenp0apNdJ9FV1/mUwGrTWZTKamhdFU40wTKbVSqYRt22FIQ55no5SaeQ9ybcdxKBaL9Pf31x3bVMdrKmZ5dmIFXy1EkWtOqcFYlXCzQHEmkyGTyTB79mwOHDjAtm3buOWWW1i5ciVAjYXX3t7OunXrsG2bCxcucPLkSQYHB7njjjuYMWNGeE3x5aMJmYzaCtrJBHX0PZIksXFglGC2fdi5fx9vHn6TJTcv5ba71pPuTYV5bglVbaqKJuUkaU9lwvy2+rX3Jw/z5ROmqNkmpVlIJpPh5tsMSE++VCpV09G8WTLrEQDiQqlUIp1ON21u5eAg1XqaJVPqvEr1oGbJlSpFcW/4slaEsBbX84x6DySkUy6Xa+KFVzKuKaWmtQ6LG2utw2ah5XKZs2fPUqlUOH36NP/v//0/Tp8+zaOPPsr69esvelgSAAZqFm30VB9uSh5QBj+hKftlfMut8koVGhXmo+HBydff55WXXqF/+jTuuHcz6ekp8Any0bRBBPE1yreqDT7jOc1H2VpmXKuZC7dZbS3M06fJQmvGWMXdKPKaIfvjMO0aKXOi1jNxMSPHi8k22moyYaZpNDofL3rf8v/jvStxraWPy9i8EnBNKTWxOMQnLMro+PHjPPHEE+zZs4dMJsPChQv5Z//sn/HQQw+RyWRwXbcmkdvEZT1UBdhg2QF1XxM4Ch0clK/QRVAKhk7n2PbyNrKjI9x/7wPMW34d1V9uoYUWWmihAbimlBqMsfNEubmuy+LFi/mP//E/ksvlQtdIe3s76XQ69ItPCRaQAFTgPlSAj8bCBlehNFSGNdte2c6Jd09w++bbWbt+9ZiV11JqLbTQQgsNwTWn1MQFKYpNWEnJZLKmpb0weVKpFJ7nUSgUyGQykxOqwNNjbgilLfA8lALLUmhXs2/PfvYf2M+ceXO4bcsG7B4rsNIS1LRZa6GFFlpoYfK45pSaGUQV1pWZbwEBaURYcEIrn7RCE7l4VLQbsBM9i6QKmIra1Rza9xYvvvAi7R3t3POP7qFzVhto8CyNrz0SlkNLrbXQQgstTB3XlFKrFyQWKqywwExmj5ktP5WcIY2PVj6OFRDutT9G+Djz9nleev5lLMti852bmb/yOgA8fHzLx/XcQKm19FkLLbTQwpRxTSk1UVDiWjRLBAm9+MKFCwwNDYWuwt7eXtrb23Fdl3Q6PSF7ymSvmT/3CcpsJexEUPmjAsqG/GCFXdt2M3h+kC1btrD6UytDYohyLBQ+yYQTdMOuE1hrNnX2aqoa0Aj8QxprM3GlU75buDSazYBuJK4ppSYwy8uYZV9ef/11nnnmGfbv3x8mMH7lK19h48aNJJNJYKxyulhxUkVEMuqj5Xl838dJONiWg64mRCsb3ILH67teZ+/efaxevYo161eR6KlacQnQ2sf1K9iWjaXssFgxTL0U1eXCtExFyTezaoCZ/C0KNe76j/WSv5uFaIWLuJ9xNMFb1nacsiV3qxnP08RESchx3UP0uo3MP4wenM3vTXq/WeOzETBLuAkj/GrJTxNcc0rNLL5pPoT9+/fz7W9/mxMnTvDAAw+wZMkS2tvbWbFiBalUilKpVEMscV03LPUDY8mzUnXDfHl9X2MpG9u3oQJY8M6hk/zyueeZfd113LruVrpmtoMFFc8lgRN0sbZtbC5mXkrCY5wKJpoH80nkbplNXCXXKK4k1mh+WLPzbsz5bVZ1BpEp6yjOnC1BdH6bpdyiuVtRRRB3Dlc92Y0qKRedS/P65tga+XxNRXa1KDPBNafUzAcrp47BwUG+973vcezYMR599FF+67d+i97e3vD3xfUo+WrmhlOvIna0crXWfqCcgrKPnH/7Att+uZ1KucwdWzex8KY5kK5WG/FcHOwgn82zsMbZ3Mz7jwP1Tpn1DgNxot58xi3rkxjnJyVXZDX6NH85Ms1xNktutJhA3Ap1vHXbKHn15i/aWcL8WSPHabZIMnvGXQ245pQajJ2gxIR+66232L59O7NmzeL+++/H8zzOnz9PW1sb7e3tQTysmqhtVkQoFAqMjIwERYvLZYaGhsLq42YpHsdx8AoaG0V5pML2l3fw7run2HzHZpYuX4xOgVY+rnZRqSrLURNU9leBKzJa/0o2I9OFGhfquW6asYDrnerjrCwy3jjjHKu52UbHGWcMczwLXO4jbmut3te4YLpVTWvYdPfGJTdqPUU/nyxMhWyOBy6uTtNIRC1Dsy3X1WKxXXNKzYwfiFI7ceIEQ0NDJJNJvvOd7zAwMEBnZydr167ld3/3dy9agOVymWPHjnH48GHOnj3Lnj17yGazPPXUUyQSCebOncvKlSvp7+/H9TwSOknCT1IquOzdvpc3D77BvLnzWX3rKjztU8gXcRNe2pSoAAAgAElEQVQVPMtFWYqS76BdRcJPYlmKsl8CVRtnKRQKYWX3uCw2s2eS2Xqmra0tVten+Yxs2w5rToorMg6YFovruuRyuZA8FFeXYhgb6+joKPl8PkwrMZVOHJD46OjoaFhN3tyc4lQ0+Xyecrlc03qm3ubfSORyOYCwmpCp1KYyx/UsMblesVhkdHQ07EogiiDaIWAykL+Ptp6pV6W/kZDxuq4beqykrmbLUvsEYMYrtB4raDw0NMTQ0BDXX389t956K/39/Zw4cYJdu3axZMkStmzZAgTKTHLczpw5w4EDB/jwww85ffp02FetVCqRy+W4/vrrmTlzJsViiUrRpc2yeOuNt3nlpVfp7ujh9o2309ffTYkKRb9IqVJAO34QcytZJP0UlrJx0bi2i6+DDUc2QbEOy+VyU5Sa67pUKhVc16VcLjdNqTmOE46zUqnEKldeUhljuVwmkUjEqtRkkzCfp3we5yYvSs2Ua/YajHO85XI5VC5RqzQOuVJwAQjf+UYqtXrygJp1a1pOjbASTde83L/neVQqFSqVSjjHjVZqpiIVuWYbmqsB15RSM19YIXpAQOdvb29n5cqV/Pqv/zodHR3kcjn+9E//lH/7b/8tjz/+OOvXryeTyYQPcs2aNSxduoSBgUGe/MmTDAwO8Oijj9Lf308ymaavtxdL2XS0d2KlFYMnhji4/yBexWfz/ZtYsnYhtmORTiZRTjtJ5aBUtblnCtJWGqti42uNSqfDRSQbvlgtXV1dsZMnRKnJPXR2djZlAYtS6+rqorOzk66urtgsF5OcIRZMZ2dn6H6OO54nrY26urrCz+KcY5PQlEgk6OrqwnXdpsT0xErr7OxsWJPQiWBu7u3t7SSTyRq3/VTnuZ7bGoJqRPJM5X0VpSYH66lArDNRmGZ1pO7u7ljYu6ZCloORjKOZTOGp4JpSahAsQClmLA/ohhtuYMaMGWGtx2QyGXarPXfuHNlsNmyTrn2fVCpBOjMNxQz6+nuZvms6VsJi2bJl9Pb24ntg6erLZClyHxXZ8cIO3jv5Hrdt2MDyTy3F6QyII8qGtJMkoWyEtG87wfc4YGuIEiBlI5I6lXEpNbPPleM4jIyMhF0JmglxPY5XVLrRUCpoGZROp3EcpylyE4kElmXVtLqJO7Zl23ZYBq5Z45QxOY4TpsnEzbqUjuZAGPNuBuQwJHPbyOdZj50s/dQSiUQ4t41GVFFKKyqxhK8GXB2q92NANkj5HmDevHksW7aMn/zkJ+zatYtkMsnRo0c5dOgQDzzwABs3bgziK37VclGq2rXao+yV8XwX0BSLQSsbpQkSrLWidMHlzT2HOHX8FIsXL2bl2uU43U7AhHSqLWUUBOT9oHRWwA6RG2bcaiLNJGuY3zfbzdBMYkpUXrPGWo+s0UzZzYJJYojKjvM+xlu7cc5zs9+XieQ18/250nFNWWrix5cK/XLqWLhwIV/+8pepVCr85//8n3n88cdxHIc1a9bwla98hf7+foaHh+ju7qpeaKwOo6Wtap8zC98lsL6q3hTf83nnreO8uu0VkukUGzavY/rifnAJlJVVPflohVY6UGgttNBCCy3EhmtKqUVRqVSAwPe9adMmurq6eOONN3Bdl97eXhYvXsyyZcuwLIuurq467gMLjUIRNOtM2smxkvo+fPT+CPt27yebG+WB+7cwb/EclK3QLihDqQVux6uDDttCCy20cDXjmlJq4t8ulUqkUimSyWQN+2rt2rXccsstFyUwlkolfN8nk0kCPlpplFagAmWktIWlxXUIaCgOV3j+uRc4dfwUn/rUWlbdtgKrW+GXqzkzjoXrVYLGoVdJfkcLLbTQwtWOa84fZvqcRZlUKpUwZ8ZxHCqVSvg7lUqFVCpFJpOinstYFBo+aFeDB17Z49AbRzh08BAzps/gjrs3k+yp1klzFCpl4ekgHqdb5fdbaKGFFpqGa8pSg0CRpasUeVO5+b5PsVgEggogo6OjpFKpME8JfJRtlJ+Rr7r6z1fYygYP3tx9lBdeeIHrZl3HnfdsoXNm0B8NG5StQPn42sNWdkuptdBCCy00EdekUpOCxI7joJRiYGCA3bt3c+LECUZGRshkMnR3d7N+/XpuuukmKpUKmUwKX3yLwvIgYDiqqpXmpGxGL4yyY8d2zpw5w6OPPMqSW68HF7QDWBqNj699LGVhKQvXdwN35iRias2qmQe1xVObjWa7Zz+pIq1x1Qj8uHKvNXmfFD6JdfRJrV2RfTXgmlNqEEy+5K0opdi7dy/f/e538X2fuXPnks1mOXv2LK+88gq/93u/x6pVqwCpCBDEzXw/6HGm/epnQCFf4tUXtnPi+Enuu+9ebl6zHL+ksZIKLI2n3cAyU4QWmmVZEYVWZ2Hosd+Pu+KDCTOuKKV9JGG3GQvY87yw04H5/3HAHJNsDJJn1KzxyoFLElvjhiTT11tTceaMyWHSPCjFndwehciM+7nWKy4s71JcOWv10OgiytFak1cTrjmlFn1xtdbMmDGDhx56iLvuuoubb76ZQqHAf//v/50//uM/5p577mX58mUoNJbjoPHQfsBgtG2wsXBsh0QywbaXtrN3316W3LiEzffcTqrbxs1qrBRB409Vn+UY9kkLuq0Zvs3qPStdN1etWbkn8vKb9RGbgU/CMvyk5ck8x52QXE+W+XmcMs0ctWYlmtdDs5R4NI7fKGVqXkNkSMX8uDFeFZWrAdecUpPivOZJ4+abbw5ZjxA8oLNnz9Lf3093dxe+r1EKLK0DtaMUKhWcpJPVUji5kRw7d75GT28vWz+9lbbeNPjgdAeVQVBq4jw0HSi0MMamAtcmVXmmLjRfjGYmd5pFVOOsDWh+H1WocSbKTuXnk4VpHUZbFsUtNyqrGV6A6DibITea4G0qmKm61Seq/Rj9Pvo3Uxnv5SjF8Q4KjZQrz9P0qFzpuKaUmizoej2HPM/jnXfe4cc//jFHjx7l4MGD/JN/8k9Yt25dWFbH8ys4doJsNseJd06QGx6llC9z6tS7HDlyhM7OTvr6+xgt5RjNFkgkHYqVIpn2DGWvXC01Apav8C2wfPAtjeVbgTUWvd/qZ0qPKTC571KpRKlUolAoxOKqMi00OQgUCgU8z6NUKsVWWNgco7iqpHSZpFbELdd1XfL5PG1tbeHY43phRWahUAj/mQo8ro1e6vaJzOjcxqlgCoUCjuOQTqfD+Y1zvL7vh90PzGK8jej6MJHSkHktFos1HRAasZ7MGpJSf9G2bYrFIuVymUKhMG7tx6nMsVxPGOMQjFOKWVwNuKaUmnkyNBeCnDKKxSIXLlzAdV1mzJhBoVAIa5oJsQStuPDRBXZuf423jr6N9hWv73+ds2fPsGjxYk69d4rDbx2ivbeNnt4eCsUi2vJxPbdqjQVGl675WrXQIopNq2pith57AUSBFYvFWJWaOV+yEciLIsotDpjKVGuN4zgUi8Wwnp3rurHIBWqUWrFYpFgshptG3DJFuRSLxaZY4Y7j4HkexWIxlN0MpQbBWBOJBIVCIVxbZguVRkNrTalUCteTWRy8UXMcdQXC2DtaLBZr4peNOiTJ/iXzJh0tZF+IKrVGjFMKMUtlfqVU2HqmpdQ+AYjPOdrHSTaupUuX8s1vfpN8Ps8PfvADnnjiCebOncuXv/zlMetOa9rb2li+fDnz5i6gVCiRG8kxe85s1t+2gVmzZrF81XKcVAIS0NPeRalYIJ3I1CgnE0opfOVXlRiG1VZVecbfyYsoRVJTqVSslprIlOrfnueFVc7jQDTOIgVa5V+cRBGzA4Ik58c5VqjNlRR5YqnFKVfWvBwU4h6nQGtNMpkMDynR6vVxyUylUuEaljJ5cVmHsoZFnqQGmeNslOUf7acmY5OvjfYwmHuC2aqpGc2KG4VrSqlFiQ7yQknStVSc7unpYdmyZeTzeY4cOUIul6Ozs5NKpUwikaS3r4+1a2/FchLks3nOnD3LmXNn+fzDD9Hd0we2JpF08PCxbOhwOrBlKuX9qTHXVGClVW/Nx7QMLo7FiXIuFou0t7fHstGbFfrl/8WNkk6nY1vA5osobMd0Ok0qlSKVSsVGVDFPtb7v097eTltbW9huKE6CjLhuSqUSmUymaYQc3/fDnmZmW6U4WYHSZNZxHDKZTKhY4twQtdYha7etrS22CvamPHmGhUKBTCZT0yQ0jvHK+you3fb29ljkmCQf05UbZ1/HRuOaUmpAzYlQFvvBgwdxXZebbrop7PG0a9cuAGbOnBm+8LadABSWbZFqS4NtoYoK7WiUA4lUkrbOVNgV1lY2nudi284Y67GuUgOMxWdHpr3ey1CPVNBIROMN5v/HuemZ1xW3sLxIcdLcxa1iuv0kZtBouVHLQLwA8rk82zg3e9PNa3oszJ9N5drjQWJojuPUzLmgkeMdj1kaJYg0eqzR99J8nvJz82sjEH0n43pHTQs3KsPcV8e7xysB16RSg7EXd3R0lNdee40XX3yRu+++m1QqxQcffMBPf/pTbrrpJjZs2BCesgSawLiyAA8PDxdsjetXQhla62pdSDWmvDC+Ms5nVxii7sBP6h6aJScay2om1byZTNao3GtZ3pWGTyJ9oVG4Fp7dNafUTIg7YvHixZw+fZq/+7u/o1KpMHPmTNatW8eDDz7I+vXrw7b3mUxmwuvVW6hxWjUttNBCCy18PFyzSk1O5KlUivvuu4/bbrstJCIopaqlsYL4huu6pNPpj33CaimzFlpooYUrC9ecUjOZQlID0rZturqCBqBCThC2klhpZvv5S6FlnbXQQgstXJm45pSaqWwkaC25T5LDAgE5wHVdEokEbW1tYbzj/7d35dFRVXn6q1RVak9VJZWF7AmEYET2CGFXFB0btcF2GQbbcY5Ouxy1e8bu9sy4TTuO086IPUxP9/S4Ybt1uzUiQjNhEREIsgcISSCB7AmpSiW1vFpeLfNH5ne59QgQUlUR4X3neCK13Xvfu+/+9u93LmElCzIZMmTIuPRx2Qk1IJYehzLcgMEYGyWFkDUXDAaZgNNqtSMaKxkYrbRv6ZjfhuD+NsYdDUJhKRJJcjtcfBvXVsroMxr4tvbtt7HOSym1/lJU9C+dq5MAUAo/n80nzXQDBosJyQ2p0WgYpQ+f+SPNojxX2m4i587/DQaDGBgYGNUqfr/fD4/HM2pFusAZdg9RFJM+Jq0rJSUFvb29o1ZQSnVqbreb1Y0lO8uM9j0xp9BrQPIPIo/HA4/Hc9Z8kgVapyAIsVnMSWIvob9erxcejyemXCMZhd68BykQCMDlciUkk5a+zz/vQ+0NCunw+5b+trS0oLGxEf39/ezzXq8Xhw4dQlNTE/vsaJ5jl5VQUyhiW84MVU8CAGq1OsaCA869GaX1GkOlwCdyI9Pvnzx5EuvWrWMHUjIgvT6NjY3YsWMH7HZ70sYksmlaZ09PD7Zt24a2trakH/QUQw2Hw3j//ffhdDqTcsBL66Wi0Sj6+vqwdetWdHR0sGuQ7IJkl8uFb775Bvv37wcQu/54IH22+P/8fj+2b9+OAwcOsDFpPokGjRkKhXDgwAHs3bsXLpeLjZfoEgqFQsGuXSgUwtGjR1FTU5NUSjleEQmHwzh69Cg2b97M3pd+7kLrpT1ABA9S8FYg7VGyvKk1FU939tFHH+Gxxx7Dxo0bAQAOhwPvvPMOfv7zn6O6uhrRaDSpnK5D4bISavFA6qahG05uqmAwGNMnibfg4n1whhLAp0+fxtdff824KZMB6aHa1taGQ4cOYWBgIGljSh8+r9eLbdu2obe3N6mHPFEaKRSDXHZfffUVW2eyhWlKSgocDgdqamowMDAQU+CaLCiVSrhcLhw+fJgJNaVSmXTXVSgUwt69e9Hc3AzgzB5LJss7HfaHDx9mFiLvpovnOkuVWvr/YDCI9vZ27Nu3DwMDAzHenETdWzpvgDPWUlNTE/bt28fmws9pOOC/Q2GX+vp6ZlmRxUXrIFLllJQURnRO31UoFJg2bRp6enqwdetWNDQ04JNPPsHq1asxbdo03H777UwISo2IZOKyjKmNBLy2w/OekSYIgBEgk5ZDXIl0SI10XBqTfoc2kMvlgs/ngyiKSXFrkOZFFq7f74fb7UYwGEyaMOUJfikDNRAIMObxZMW6eMbzQCAAh8OBYDDIXNHJOnAjkQg0Gg0CgQD6+vpi7mcyrbVoNMpcnbRnqUNAskicyZoYGBiA1+sFADY23etkjEkdLTweDzt4g8Eg47uM5zoTOwoAlk0NDO5fl8sFr9fLzgWygngyh5GOS/dPr9cjHA5DFEXG0u9yudhceA5RXtk+H+jZNhgM6O3txeuvv479+/ejqKgIU6dORXl5OfLz85GRkQGTycTmE4lEoFar2VyUSiXmzp2LpUuXYsOGDXj++efh8XhQVVWFBx98EGPGjGHZ58lsACyFLNT+HwqFYkjfMrmKOjs7sWXLFlgsFvZZlUqVMLJYnrpJo9Fg3759sNvt2Lx5M6xWa9IOBGoxodVqcfjwYbS0tGDbtm04ceJEwsejMVNSUti4ra2t6OjowM6dO5PKlg+AHTiCIKC/vx87d+5Ea2srYyRPBqLRQfLZxsZG9PT0YPv27bDb7UlnnYhEInA6nairq4PP50N1dTU8Hg87XJKxXlIA29vbAQBbt26F0+kEgBiKrkSP6fP50NjYCJ/Ph23btuH48eMIBoNQq9XsWR3puKT8kVIkiiLUajU8Hg8OHjyInp4e7NixgxEqE89svHEkEsR0xlDXhbq6OrS3t2P9+vVMGZN2Nz/fviILi6xAh8OBffv2Yfv27dBoNNiyZQuMRiMsFgvKysowc+ZMTJ48GaWlpcjOzmaClaxStVqNyspKrF+/Hl988QXuuOMOPPHEEyguLmbXI9leCSlkocaBatt4rUKj0aCsrAwHDx7E3r17Y7RO8hebTKYRt0yhQ57aVyiVShiNRjQ2NmJgYABfffUVKzlINIgElhjrjxw5gr6+PtTU1MBsNid8POCMxhcKhaDRaOBwOOB0OlFbW8sstmSACJvT09MhiiJcLhd2796Nuro6+P1+aDSapIxLh2B/fz87QHp6elgLmmRpr2St1NfXIxgM4vPPP2eKWLIC97Sezs5OeDwebNy4MSapIRkuSLJEjx07BgDYvXs3zGYzezZJkRnpuCQAiOibt34PHz6MgYEB7Nixg91nUtjIUhyp8kDXMhAIQBRFdsacOHEC3d3d2LBhAxMsFyPUePJusqJ7enpYsg0pJBaLBU6nE06nEy6XC+np6cjJyYkhqgAAQRBw4sQJCIIAk8mEvLw8FBcXsx6JZE2OZraxLNQ4SAOvCoUCer0elZWVKCsrA3CmeR5pScS8PtJDgoSoSqWK8XdXV1djYGAADzzwADIyMhJ+CEkfgnA4jKysLLS1tWHevHmYNGlSQscjENs3rbeurg4pKSmYM2cO5s+fnzTfO1kR0ehg1/Ndu3Zh2bJlGD9+fFLG48cFgGPHjkEURSxevBhTp06FXq9PahakQqFAe3s72zsPPvgggDMHWbKY7Ht6ejAwMICcnBzcf//9zP0kzZ5LFFJSUuD1evHBBx9AqVRi0aJFKCgoAHB25uBIQHMm4UgWDlmFdXV1uOeee2AymWJa7dD5MNKxSSgSKEb64Ycfwmaz4fHHH2e/L+2Td74xpW5Rp9MJu92OU6dOISMjg1loM2bMwJQpU1BUVASj0YiMjAz2DKWkpLB+eZ9++inWrFmD4uJilJaWora2FsePH8fYsWMBYNStNEAWagy0caV1bQBgs9lgs9lGJf2b0NzcDI1GgwkTJsBqtY7KmHv27EFvby+mT5/ONmWyoVar8dlnn2HChAmYOHHiqIxZVFQEv9+PsWPHYsKECUkdiw4ZOtwnT56MadOmJXVMgtFoZIk/5eXlozJmQUEBfv/738NsNiddYSAEg0EUFBRAEASMHz8ehYWFSR+T0tZ1Oh0qKirYM5qMNkb8b+7ZswddXV0oLy9PyHkUCASwePFijB8/HgsXLkR+fj5sNhsMBgNrB0Vg3Un+3+rasGED/ud//gdTpkzBj370I2zbtg2vvPIK1q5dix//+MejkhA1FK44ocb72v1+P7RaLdOqiHGEbga5woYTM4tng0m1WHI5UJBYKnATVW9ENWI6nY65hnjWFb57+HDdG8MBrUepVMLtdsNkMrHEAv4zfBJNvCAqNBIwWVlZ7P6S6ygZ4FOnaR00XjLjamRZiKIIg8HAXkukG4iSMMitSQlOUuuBXPPxuB+l14pcqJTBp1AoYDabmSVK7i8gvgJ0PgORnsFIJIL+/n7W2FYQBCbU+HhVIp5P/pkXRRE+n48lb5DbkZ6VixmTvqNWq3HvvfciEomwPnjnAt8q6v3338eqVaswffp0PPbYYygrK4MoiqiursbWrVtRVVWF2bNns6SoZPe446GIjrYY/RbB33zgjOZBh8xQ/l/KGiPXwrmQiIOe5kPB7/b2dpSWlsYwNNAhGW88hj9oaFzyn+fn58dkq5G2lYhx6dAhjS8cDqOpqQl5eXkwGo1naXWJOvTpoKHD8NixYygrK2MdxpMJKiw/duwYKioqWNZpMh90ulcdHR0QRRGlpaUJEd6UOMW7y3mBEw6H0dnZidTUVGRlZTEqunjB70UCPTPRaBT9/f3w+/3IyclhSijR5MUjYAKBAOsNR+xD5GLs6+uDx+NBYWEho+OjseNNxuEVEFpnSkoKnE4nBEFAfn7+Wb/PKxjDBa8gD8fKpAxlv9+PlpYW2Gw2ZGdnM8Wtq6sLPp8PNpsN6enpMTG/0fJ0XVFCjeJhpK2rVKoYrTkUCrEDngTJxdZ/XCx4jRM4++GV/pvmydeKjAQ8H2YgEGBBbnqPLzEg7YwvxowXoVAIoihCo9HE/E1mc1S6/8CZ+0Wp2COhSBsu+AOKru1oUh1RYg7V6gHxW798sglf6BwKhaDX6wEgphSFMuXihVQxlc6H9i1v5cSzl3iBLYoiu5d0jtB8yANEwg9AXAkqBMo0TE1NPWvtvFDn3YIXuz5eBFxoX/Ax8aHmSs8RX94w2riihJo084c2SigUwpYtW/Dee++hs7MTwWAQV199Ne69917MmjULPp+P0WklC/RQ8sFt3hUofTAT4bri3YsE+k0+DTqRnIV8phb9DQQCzHfPb0d+jYmyhOkw8ng8MBqNSYmB8KBrTOUaoigybZ6EebLAHzLS+cS7l8/nAucFDD9mooQaWQVDuePPJfTiAd/541zv88levMdlpOCtalof7RkSKkOt8WL388V4RqSKMIUu+Pvq8/kQDoeh1+uZF4zOstHCFSXUgDNaM938SCSC2tpavPDCCwiHw1i+fDnsdjs++eQTZGZm4tlnn0VFRUVS50QPKq/BS032c7lf4o3lEYLBINOm6QFNlMuRB7lIgsEgNBoNuxf8wU+f4w+oeA8pOmikVnF/fz+sVmvSXSNkoVHGbDzp3sMF7Q+65rTfE3nAkADj9yv9FwgEWKYcfXaka5ZauLR3Kd0+Go2y+Djto0TFLGkMfh0kWOnA5j0ZNG687ke6juTVIAuYt5JpDvSsECnESNY9nMxJPgPyfDFifj8kKgdguLjiEkWkmpzb7caf//xn7Ny5E6+88gruuusuOJ1OdHV1sddLSkou2BU7nvnwBy1tDH5D0AMiJRblv3eu3z7feyRIidiZwB8I0nGHEq4XAzoE6GCVJi9I5xyP1smDtEuqnSFNl+rWkuUmobFUKhVLiuHjUeeyxIeDC91funZ8ASzdz3gOXN5lRfuCv360Zt5K5InGRwLe8uHd79KYKL+X+L0ar/uRDm16ZqT7hX9mqVYtHrcnJaqlpqayhBTe3XuuNcWjsAxnrnzsn2LDdF5QGIPe4xOkRjNz/IoSaryWSg+21+vFkSNHYDAYUFVVBQCwWq2YO3cuqqur0dzcDK/XmzShRg+n1CqKRCIQBAEAoNVqWcyL19DiOZhoo4XDYQiCAJ/PxzRrrVbLCrL5jKdExLlIQFL80uFwQKPRIBqNIi0tDVqtNibQnsisS9Li6f8FQYAoijAajXH97vkQiUTgcDiYi0oQBHZ/jUZjTCFrIh98qqXi76tKpYLVao3J6BsJePcixZB8Ph+8Xi876MhqIovUYDDEZe3z+4BX7ERRZHya4XAYGo0GRqORJXfE64jiLWzek+FyueB2u5GamgqtVgu9Xh/DAsIrLiNdr0ajgcfjQTQahcFgYN4UoucLhUIQBAF+v5+RNuh0uqR5AOjskVqCZL2REsNbrRTPHQ3eUcIVJ9T4OI5Wq0VKSgpLyeUFl8FggCiKcDgccT8YFwLvevP7/ejp6cH+/fuxd+9eVqw7lGYY75gKhQJOpxObNm3C/v374fF4oFarYbFYcNNNN2HixImMnYH/TjygQ3Dz5s04ePAguru7maJRWlqKJUuWICcnhwlTaQbmhcbnP8MffgCY+8bv9+P06dN47bXXEA6H8fDDD6OoqGjI34gXzc3N+O1vf8viW+SqMxgMWLJkCebNmxeTaMErEBdaJ289825rpVIJQRBQU1ODb775Bh0dHQiFQpg+fToeeOCBhKyLV3Y6OzuxadMm7N27F+FwGGlpaYhGBzMSibzg1ltvRXp6+ojHo5IMspIoOePLL79ktVvRaBQ2mw0zZszAtddei5ycnLjvI88eFIkM8pQeOHAAW7ZsQXd3NzQaDfLz89nzwrtDLxRX45UZ3l1HXJInTpzAhg0bYDabsWLFCkaXR5+htdvtdphMJkycOBFz5sxBaWkpgDOKO59AQ+ONBDy5OyWm0B6g+D+fbEbCfbQjXFeUUOOTDnjXDAVgeYosnU4Hg8EAp9OJQCCQ1HnR4SQIAr788kts2rQJ27dvR0tLC8xmM2bMmHHWOoZz8F3ogYpGo2htbcXu3bvR19eHkpIS+Hw+7N69GwcOHMCTTz6JBQsWxLg74g3E0wGxdetWHDx4EFOmTEFmZjs7DzgAACAASURBVCaam5vx1ltvobu7G4899hiysrIAnOmWMBxLcSiXLD9n+u7p06fxq1/9Cr/5zW+QnZ2NW265Bfn5+WdZEomwoFpaWhjjwvz582E2m+HxeKDT6aDX62MSRy5WqPFr5q1al8uFjz76CB9++CF0Oh0mTpwIjUYDm82WEIEtHc9oNMJkMjFuQHLx1tbWYufOnTAYDLj77rtj5h3PHMLhMON7/OUvf8kYaQKBALZs2YJt27bh0UcfxdKlS9k9jcdKIGtNFEUcOnQIv/jFLxAKhbB48WL09/fjo48+QkNDA37605+ipKSEeVuGq5hQaQsJt5aWFnz22Wf45ptvsHHjRlx33XW44447YDabmdD86quvsHLlSowZMwYTJkzA8ePH8dVXX8Fut+Nv//ZvYTAYWDkFJSQlyiMgZToh0DUmK5Mwmq5H4AoTarybjy66y+WCTqeLcReQm0gQBJjN5qRmqPEB3nA4DKPRiHHjxqG9vR09PT1Ji/XQA2Sz2XD33XfDarUydo3XXnsNzzzzDDZu3Ig5c+aclZwSL8LhMK6//nrcfvvtmD17NpRKJY4fP44nn3wS27Ztw913342cnJwYF1cgEBiWC0ManCYBTP/u7e3Fu+++iz179qC0tJTFK0g4kFIjFeAjfTAjkQiysrKwZMkS/PSnPz3rfZ4zdCgX2/nWSb9P7kxgcI9v2rQJK1euxLhx4/DUU0/h2muvjbF0eY/FSNYjtYZpD/FwOBxwOBwQRRG33HJL3CUTJCj5e7tjxw7s378fv/71r7FixQpEIhH813/9F37zm99g9+7duOGGG2CxWOIaFwCjxbPb7VizZg0OHTqEjz/+GPPmzYMoinjppZfw4Ycforq6Gvfffz+jzRuOUKP7x99PrVaLzMxM5OXlISsri2USkgLe1dWFP/zhD3C73Xj++eexYMEC1NXV4Wc/+xk+//xzLFq0CJMmTWIeEP6ZGc1Skm8Ll/8KJSD/Lz0YBoMBWVlZ6O3tRW9vLzsgWltb4ff7kZubm7R4Gs2HHlSj0Yj58+fjkUcewfe///2kERkTUlJSUFhYiKqqKpSXl7NaptzcXGRkZMDn88UwciciE5HcRzfffDPmzZvHXm9ubkZvby+mTp3KGDD4hBgKQF/ot3k3HC8wotEoBgYG8N5772HdunV44okncM0117BDRHqdyU0YL87XkJEPsgOxQu1CoOtCApDWGggE8L//+78IBAJ45JFHMGvWLJZ04PV64Xa74z7YKBbLdysPh8Pw+/0IBALw+XzYvHkzdu7ciaqqKlRWVkIUxbiSRfhYKLkhlUolzGYz9u/fj+7ubqSkpMBms8FoNJ6VDh/vetVqNdxuN44ePYqioiLMnTuXWUI33ngjzGYz6urqWFcC/ow535p4BYbi2QUFBfibv/kbLF++HMXFxaxdEjCotLS1taG+vh5Tp05FRUUFQqEQJkyYgHnz5qGzsxP19fUxrkBS5hOxn78LuKIsNdo8ZO6rVCpkZGRg2rRp+Pzzz7FmzRpMmjQJXq8XW7duhU6nw4wZM5JamMtnkkldZ3xiQ6JBzB5U9EwB7r6+Phw7dgwmkwnXXXcda6kRDAYTltTAW1G//e1vcfDgQdTX1yM/Px/33HMP4+7jM8kuppCV7jNfIAsAH3zwAT755BM8+uijWLhwITZs2AClUgmPx8MEIp8yPpy4yIVALBBvvvkmjhw5ApPJhPT0dCxdujQuDkipK53+njp1Cs3NzTCZTHjnnXewevVq2Gw25Ofn45FHHonb8qdrxKe001+Ks/T09GDTpk2IRqP4i7/4C0b3BoxcyND9JBoutVqNxYsXY9euXfj4449x8uRJjB07Fnv37kUwGMT06dNhNpvjTm6iujASoKWlpWhra8P69evxve99D8CgIuF2u3Hy5EmW3DWcMSkOxWcZ88oPvUbhEfIiRKODjPrAoFJO309PT0coFEJbW1tMMtBw49GXC64ooUY3lc+KSk1NxYIFC/CDH/wA1dXVaGxshNfrRUdHB2655RZUVVUltXCQP5RIA6bGlclo1UHgGS6AwQeMWMDfffddVFVVYeHChSzbi08npnmPBNRgkLTcq666is3n9OnTaGhoQFlZGbKysmLYGy7GepFabIIgYP369diwYQOWL1+Oe++9l72XkZHBuC+B2Ho9Po16pOudMmUK/vEf/5FlzLW2tuLzzz9Hc3Mzfvazn2HKlClnJbYM5yDm3+ddXd3d3fD7/ejr60NWVhby8/Ph8/lw5MgRvPXWW3j00UdHtA4Cn05P4A/QaDSK9evX4/Dhw5g7dy4mT54MIPaZGymi0SjjWqSQQWpqKm666SaYzWY0NTWhq6sL+fn5MJvNrKVQPM8vuf1EUYTZbMYTTzyBoqIivPjii/j973+PtLQ09PX1wW6345prrmHxpgspD0MJMN5NLoois4S1Wm1MXSNdb57bEhhsF0MNU+l6EeicuRKE2xUl1ACclV4aCoVQUFCAhx56CDNmzEBzczPUajXGjh2LadOmISMjI6kbgawgojBSKpVQq9UshpAsS42yEOkA7+zsxMaNG7Fjxw5UVlbi4YcfRlpaGgRBgF6vZ9ZqInzyFNeh2Np1112H5uZmPPPMM3jjjTdQWlrKhJr0AL3Q7/LuXMqQ83q9qKmpYdbDgQMH4PF4sHPnTvT39+OFF17AX//1X2P27NnIzMwEkBgSXgDIzc3FX/3VX0Gj0SAUCqG3txcqlQpr1qxBTU0NKioqzuKA5Fu1XAh0MNJ36FpNmjQJS5cuxezZsyEIAtasWYO3334bSqUyLsHGC/9oNMrSu+k+NTc3Y+3atTAYDFi6dCmLaUlJnS8WpFiRG9rpdOIPf/gDamtr8cYbbyA/Px9tbW3YunUrPv74Y3z55ZeYNm1a3KEDUjSVSiX0ej1KSkrwwx/+EAUFBSxc0dzcjPr6emRmZsZcn3OxfgBnSmrINc0XNNN3VCoVBEE4q6Cad43zCtDAwADUajXMZnOMN4o/Qy5U23o54IoTarRBeW44pVKJkpISFBQUnMXYn+xNINW4yNXg8/kSwh13obHD4TA2bdqE9evXIzc3F/fccw+uuuoqFBcXQxRF5nLkYxoARnxN1Go1K6cgjVKlUiE/Px85OTnYs2cPfD4fe12a1n8hSONSqamp0Ov1WLJkCYqKiiCKItPg6+rqoFAoMG7cONhsNtbjjPYAXZ94BZtGo2FUYDk5OZg1axY+/PBD9Pf3QxAEdv/5rMLhZrdKmWfy8vJYokJ6ejqUSiVMJhPGjRsHQRBw+PBh+Hy+ER/2dF3pmigUihhGiU8++QSnTp3C9ddfz9yrvNtspKB7T0w0giBg7969EAQB2dnZSE9PR3p6OoxGI9avX4+DBw/C7XbDZrPFVWw+FBONyWTCnXfeyTKm33zzTYiiiPHjxyM9PZ1ZlOe7f7yQ5r0L0WiUcWYSi4lGo0EwGGQKptlshtFohMPhYPcyEAigo6MDRqMxpnSCfofP+L7cccUJNdJ4aIPypKfkciIkwmUyHPBZUGRFWq1WRh5Kad98rdNIyUL5+J1KpcLhw4excuVK6HQ63HfffSgvL2dWGcX0eN9+vDGZSCSC9vZ27NixA+Xl5aisrAQA7Nu3DzU1NSgoKEBubm7MHPmMuwul9NNf/nMGgwFz5szB3LlzWZZpJBJBY2Mj9uzZg7vuugvTp09nBzUvxC7GdcUL31AoBKfTicOHD0MQBMyePZt1+t60aRMUCgUmT56MtLQ0dugPlR59IdBc6TcsFgtmz56NdevWYceOHbjqqqsgCAL2798Po9GI22+/Pe5EH+CMG5Jnpz9x4gS2b98Ok8mEm2++mSX8kHIQTxYpfyhTITl1Z66ursaKFStYkkxraysWLFjA9mq8iiHtCRI+Go2GKaNr1qzB6tWrce2112L+/PlMSF1I6aP3pdaUtNBbp9Ox+VPiWFZWFiZNmoTdu3ejpqYGt9xyC+rr67F7925kZWWhqqoqJg7N//7lbqUBV6BQ4wPbF/P5ZIGEhlKpZDVi27dvx759++BwOLBu3To4nU5WhE1zindz0vfr6+tRX18Pg8GAjz76iLkcFQoFSkpKMG/ePJSUlLDYWrws83TAHTx4kNVvKZVK9PX1wefz4b777kNeXl7M9aHvxXMgkvuPmDw8Hg9cLhcEQTiLDzGecXikpqbim2++wY4dO7Bx40bYbDY0Nzejo6MDf/mXf8na0AxllQ3X/cizWACDNWO33HILOjo68Nlnn6G1tRWCIMDhcOCGG27A/PnzE1KiQuNSTafb7cbatWtx4MAB3HvvvZgzZw7L2tPr9XFbCXySl8/ng8FgwD333IO2tja8+eabOHToEARBwIkTJ1BRUYHFixcjIyMDQHzPMJFQE0NJX18fNm3ahPr6egiCwNoJLV++HOPHjz+L7u584EuM6N8+nw8dHR3YuHEj6urqUFdXh9bWVqxcuRLz5s3DggULkJubizvvvBMdHR344IMPsHv3bjQ2NsLj8WDFihXIzMw8i9GEd8lf7jE15fPPP//8tz2JKxm8kKWC0oaGBigUCpSXl8NqtbI+UcR6wVtPIz0seD+8UqlETk4O3G437HY7uru74XA4kJqaijFjxsBms7GHJF5XHLXoUKlUGBgYQF9fHwRBQFFREZYtW4YlS5aw1vHSBzGeccmqIEudLLaSkhLMnj07rnom6UHBzz0zMxM+nw8tLS1MgF5//fV44IEHkJ+fH7MuqVfgYoSaQnGGaDY7OxuFhYXo6+tDT08PAoEAli1bhh/84Acsm3WkShFZzSREyT0XjUbR0tKCwsJC3HHHHSguLo5RvuIp2AfO3D8+yzI/Px9paWlQqVSw2+0AgPLyctx+++2YO3cu0tLSRjwePy4pHikpKeju7sa+fftw7NgxiKKIadOmYenSpaiqqmL0VaS4XUzCDyltkcggyfaOHTsgCAJyc3NZF3qTyYTx48fDaDQiLy8PeXl56O7uRk9PD9LS0rBkyRLceuutsFqtMYXQhEQVX1/quOJY+i9FUEIIuS6kDST5FiLkZuJ98hcDut2UCCFtG8HHWnihyReJk2U5EkhjQPzYlChDGZJ0mEgZLC60tqHAxxX4xpXxxJf4cUmIAWcODf6+8qTJdA2kBz2fxTictfLrJa5H/hoCg/fX7/czVxStfaQHG1/ATfVvwKBV6vF4WIo51c7R2iORSNwWIt+9HDhTc0pCVSo0yTKPZ708JZS06JyPfVJIgE9WOp8Q50MOQKzreqiWQdTSxWg0DtmolcgJeI+DNJZ2MbHp7zJkofYtY6jCW3pQpO1oKMbGxxbiGY/PfqQxyZICzgSz+WysRIC651Kcgq8nI6FOBM78oTHcmNpQUCgULDFF+tvxumSGOuwIfJYaJTlQVqY0o40+N5y5DKfFiiAIrL0PudCoCJp4MEcCEhaU3ccngvDCneJufF/AeOjV6Nr4fD6oVCq2b+l9Yp4Jh8OM1zVe8NeWiIP550A6PiXODIf9hp51uob8vidlIRQKxcTV+Ho/aadtXtngMyR5hhxAttRkJBnEzMBbZvzBRoKNjy35fD5Eo9ERHUz87eYLS+nhklIR8S1ieLdaPIdTIBBgZKfEIJ+amspaV0hdj8OtrznfViaBya+Hr69KlMAeap4ulytG8yYhTkkC/Nwv5sDhlR/eTUbvpaSksA4TvAcgUfEtILZGjRQi3hKme00WSTwWIoFPruCtNzrMgTOx2wtZTBcCLyT436XXpR226bN8ecW5QIJM2lFAqmjRZ6gAW6vVxvw/r+yS54H/rXhd9981yELtEoF0Q/ManPQA5HGxm5XXLKWFylJ3lrS+JZ5kDf53SJslK5Gn7+FdJdJ5jVSokZVGAlOaOj+c3x4OhnJDkkYtZThPBKcnf9DS//NuQXL3keuTLOSRNpEEYjNMgTPucDo4aXxeCSJLIl6LmBcW5O7jS2+kz4fU0xHPennmD/51HnwN7HCyPfmSIV5ppT1DVi4/Ph8GoAxoKlEiTltpDPpKsdAIl7dz9TsCsiJ41g6+fUVKSgo7kPmDIR4uN+nBymv8/O9LNT5pLOdiQVouNT+kcaRCjB+bvx7nwvmuRTQaZWnYfOxjuNlgPPMDf68udB3ofcocjUajrDfexVzHoT5Lr9Fc+L2hUCig1WrZwUhCjJhT4rl/NA5dE96VC5yJI9LceIuOX4f0Hp9v7Tz4GBS/T/nng65DvD3NpOPyc+GFC43Hz2E4CVX8HPnnHxiakYTuLd9JhF8/KTFSy0wq3C53yJaajEsWvEDlNd+hNM94MkEvBJ54WCoIRyPoLo0nSt1b/PtDua34w1KahJSs+fLzI+HKXysSany8R5qVyc+bXxdvAfKvyZAByEJNxiUGPkZDh6NUmEljR4RkChhpwTtp6cnk5+STR3hI184X8vKxNd6FTeUM8boAL2bOvJv3XK/TOoZyt9HneQuPj+nyVuCVUFQsY3iQ3Y8yLkkoFIqYDDKpdcYHwEnLTzZ4y0N6sCYL/MHPC3Uamyeb5hMVeEHCl2DwykGy5kvlIjQ/Eli8dcu7MGne0qQZnl2D1sCvm/+cDBkE2VKTccmBP/D4VGXe7TRUkksyBQz/+5SOPxrj8uOfS3BLC20pMURKdjyaVi1PpwXgnGnwUotNmsTDZ//yLCY8ZNejDB6yUJNxSYHX3nntXtq/i//MaIBIkKVxvGTGqKQp6UMli1xIOPGZl9L082SAhBAVf/PXhtyM0uJ9qpfkiYPJGgNi+QqHUiJGS7GQ8d2ALNRkXFKQHlBDxZVGK0GERyQSgd/vR0tLC06fPo3CwkKUlJQkdXy6FkPVPdG4ZM1Qg9cTJ04AANLT0zFu3DgAsQkjyb5W/LyAwQJw6lFYWFiIvLw8RCIRNDU1wW63Y8yYMSgsLIzJVOSzgB0OB1paWhCJRFBYWIjs7GxWH0aWuizUZPCQuR9lXFKgmjK73Y729nZ0d3cjGAyyppDRaBSCILD3+/v7EY1GE1JUfC7QIXvw4EE899xzePXVVwEMNgAlJvpkQKFQwOv1oqenB52dnejp6YHdbofdbofD4UBvby/a2trg8XigUqmwfft2PPvss1i1ahXGjRuHq6++mlGq8dbPcCy8kYKP5wUCAXzxxRd46qmn8P777yMtLQ0VFRVob2/Hs88+i3/9139FMBjEpEmTkJaWFlNrR/PeuXMnnnnmGaxevRqBQADl5eVIS0uLEfKyUJPB44pj6Zfx3cD777+PX/ziFwCARYsW4emnn8Y111wDlUqFY8eO4aWXXsJXX30FrVaLH/7wh3jxxRdj3HU+n4/Va/HFudQ1WaFQxPAx8pDGgXjWEZVKhYyMDMaxCMTGu6RFyNIYIF8kLC2ejkajbE7024FAAM8++ywOHTqEYDCI/v5+1lQ2PT0dBoMBoijihRdegFqthsFgYES+NL5KpYLH44FWqx2yi7g0UxI4E4eTFsbzRchE5cS3eOGty+bmZnz66afYu3cv7rnnHtx2221IS0tDR0cHPB4P7HY7ent7odfrGbWU3+9n9VdqtRpVVVW49dZb8dJLL+Gdd95BaWkpli9fHnPf5EQRGTxkoSbjkgJxE4qiiIGBAQBAQ0MDurq6WOudxsZGHD58GHa7HVarlcVv6KAltpJQKISuri4YjUYoFApYLBbodDo4HA4IggCj0ci0frfbjWAwCK1WC51Oxxg4nE4nFAoFDAYDSktL8eqrr8Lv97Pf8/l88Hq9Z8WC6HC3WCwxjSCptQgJP41GA5/PB5PJBLPZzIqZiSHCYrHg5ZdfZr3Y3nrrLaxatQoKhQJ/93d/h/vvvx/9/f0wGo3QaDTIzc2F1Wpl7Uc6OjpYobvX60UoFGLUWVqtFgqFgglJomtLS0tjfJE0z/7+frhcLqhUKuj1ehgMhhjrOBQKYWBgADabDcBgDHLHjh3Yvn0768BQWFjIXIY8yTC1qPH7/awwn+ZjNptx++23o7a2FmvWrMEXX3yBBQsWoKSkhH1XTueXwUNWcWRcUuC5HwmNjY3Yt28fgsEg3G43amtr0dbWBuDs+Fp/fz9ee+013HDDDaisrMTixYtxxx13YM2aNRgYGEBPTw+efPJJzJgxA3fddReOHTuGaDSKP/3pT+w7H3/8MRQKBTZu3Ijvf//7mDFjBrZu3YpTp07hRz/6EWbNmoU33ngDkUgEtbW1uPvuuzFz5kw89dRTWL16NW677TaUl5fj5z//OWpqahg336lTp/DP//zPqKysxPe+9z08/vjjuO+++1BVVYUHH3wQhw4dimlUSm1isrKyYDabYbVaWedw+rdWq0VWVhYAYOPGjXj88ccxb948vPvuuwiHw/jmm28wefJkzJw5E6+++ir+7d/+DVVVVbjuuuvwxz/+EXV1dfjv//5vLFy4EFOnTsXLL7+M7u5uxlJx6tQp/Pu//ztWrFiBu+66C4sWLcLixYuxatUq9PX1QaFQwO12Q6lUIiMjg1l6fX192LVrFzo6OjBnzhzMnz+fWagejwfhcBgmkwl9fX14/fXXsWzZMowfPx633XYb1qxZwxhvotEoysrKcPPNN8NoNGLnzp04cuQIq72TIUMKWajJuORAWXAAoNFoWFPRrq4utLW1oaGhAcCZBo7Evu90OvHSSy/hX/7lX6DT6fC73/0Oq1atQjAYxLPPPouXXnoJer0ekyZNQjAYxO7du9HX1weXy4V9+/bh6NGjsNvtcDqdCIVCqK+vR0tLC4xGI0wmE7PmIpEIBgYGIAgC/H4//H4/Tp06Ba/Xi9tuuw1///d/j7Fjx+KDDz7AmjVrIAgCOjs78atf/Qq/+93voNfr8U//9E947rnnYLPZ0NXVhY6OjhiXGtXCkRVKVF+UGMIf6pHIYONTt9sNp9MJu90Ov98Pn8+HSCQCr9eLvr4+RKNRPPjgg/jJT37CBOyWLVtw55134rnnnoNKpcLq1avx5z//GYIgwOVy4d1338V//Md/ICsrC6+//jpWrlwJlUqFV155BW+//Ta8Xi+Lh3m9XgCD1lNzczMaGhqg0+kwa9YsZGdns7VkZGRArVbD7XbD7/dj0aJF+OUvf4kbb7wRe/fuxdtvv422trYYt2ZpaSlKS0sRCARw5MgRZi3LrkcZUsg7QsYlBYqLEXJzc1FcXIyGhgYcOXIEhw8fxunTpzFmzBiYTKaYOFBrays+/fRTCIKAWbNmobKyEjNmzMDcuXPR39+PdevW4fjx46isrITZbEY4HEZLSwuOHj2Ko0ePsvjbnj17cOrUKZbpOH78eFx11VWwWCwIh8Pwer0QRRF6vR7RaBRerxcajQZlZWUYN24cpk2bhvLycgSDQRw8eBA+nw+nT5/G2rVr4fP5sHz5cixbtgxjxoyB2WyGVqtl8S4AMSz3ZK2Fw2EmULVaLXPVAWdS3v1+P4v7qVQq1n7F6/VCqVQiOzsbY8eORXl5ObRaLSM4zs/PZw1pw+EwDh06hEgkgq+//hqrV68GAFRWVsJiscBoNMJqtaK3txe7d+/G6dOnWfalwWBgCkl7ezt6e3uRl5fHmtvS+rxeLwKBAKLRwSaqBQUFKCkpwdSpUxEOh3H06FG0tbWxFjcAYLPZcNVVV0GlUqGpqSmmGacMGTzkmJqMSwZDFRhnZGSguLgYNTU12Lx5Myt8njJlCnbt2sX6hEWjUbS2tqK7uxtFRUWoqKhAamoqQqEQMjMzmavr5MmTmDdvHqxWKxwOB/bu3Qu73Q6324358+ez12pqatDb2wtgMFElLS0N9fX1rE0OHaipqanQaDQQRRF+vx/AmQQQes/tdqOjowMnT56E1WpFdnY2otEoszBFUYQoiiyBg+JEPIM7MW7w/bz4NjoqlQppaWksPkV/vV4vVCoVIzMGAK1WC71ez2J/oVAIBoMBFosF9fX16OzshFKpRHt7O7q6uqBWq/HOO++guroa0WgUPT09GDt2LHQ6HUvwoHXwhdIUn6PEFVJWaA2UyKLRaFhMkd7v7++HIAgwGAyIRCLQ6/Uwm83w+/0szilDxlCQhZqMSwaUqRcIBFgGokajQWVlJbq7u7Fp0yYEg0HMmjUL06dPx65duxAIBGIYKURRZG7BaDQa00zS4/EgGo3CarXi2muvRUdHB2pra9HS0gJRFHHjjTeirq4Oa9euZVZdWloaJkyYAIPBAJ1Oh5SUFGZlhMNh+Hw+drBTfzudTgeTycSEVSAQYF0CNBoN42AkK4xcaGR1kJtRqVSyVjWUOELXxmAwMGuOT9YQRRFarRbRaBQ6nY4JYLoWwGDtmNfrhVqtZu9TQ9HU1FSYTCZ4PB709/cjEonAYrHgxhtvxLx586BWq5mQ9Pl8yMvLY9mTpERQkgwJLZ4vEzhTy8Z3lOaLxAEwgUjv8RmaVHNHa5KTRWTwkN2PMi4pSJnmNRoNJk6ciKlTp6KhoQEtLS2YPn06CgoKYoh9FQoFsrOzkZmZCUEQMDAwAIVCAb/fD7vdDlEUYbPZUFBQAJVKhQULFkChUKChoQFff/01VCoVpk2bhuuuuw5GoxFffvklmpqaMHv2bBQWFjIOQ17waLVaJqxEUWQp7sFgkAlbSr3PzMyEXq9nsTg68OlzPCcjn3LPxxbJuqEMT5/PF/MZyhok1yQfk+NZPPR6PWtTQq/zHZWpLnDChAnIysqC1+uFzWbDjTfeiEWLFmHBggXIzs6G0+mE2+1mJQt88076d19fHzweD7u3lJUaCAQgimJMuQXNT6VSMQEdjUYZ5Zfb7UZKSgqMRiNbF/2VIYMgW2qXKK5Uohc6+Ei79/v9sFqtmDVrFrZu3Qqr1YqFCxeisbEx5lAEgLFjx+LWW2/Fn/70J2zbtg3Tp09HJBJBTU0NVCoVbrrpJowdOxYpKSmYOXMmLBYLjh8/DqVSialTp2LMmDFITU2F2WxGS0sLAGDixInIyclhcyILLRKJwOfzMasN6wze4gAACBBJREFUGLSAKNZDhzrNMTs7G4sWLcLGjRtRXV2N2bNnQ6lUorW1lX2GQJYMdTbmCYJ5fkcal6wcsgzVajVzhWo0GgQCAWalAmDWpSiK8Hq9MQknwWAQPp8PWq0WkyZNwoIFC1BdXY0PPvgANpsNs2bNQlNTE9auXQu/34+Kigrk5OTE9JhTKpXIzMyE1WrF0aNH0d7ezuZJgpmv/QsEAixeCMT2rCNB53A4cPLkSQQCAeTl5THKMhrvSn1evotItutYFmoyLhnwDPxqtRppaWlITU2FSqXC4sWLkZeXh5SUFIwbNw7Hjx+H1WplcZdgMAir1YrHH38cFosFu3btwosvvsgSIu6//37ce++9SE9PhyAIyM3NxcyZM+FwOJCZmYnJkyejoKAABoMBV199NZqammAymTBjxgwYjUbmwjMajczqCofDzC2ZnZ2N9PR0AIPWD8WILBYLBEHAuHHj8Pjjj8Pv96OxsREvv/wy8vPzYbfbY1qu0Pp5lypZP16vF3q9Hrm5udDr9axImfgVVSoVMjMz4Xa7MWbMGCb4cnJyYtyVSqUSFosFSqUSVquVWUlGoxEWiwVZWVnw+XwoLi7GT37yExQWFmLnzp147bXX8NFHHyEYDEKv12POnDnIzMyMactD8y0vL8eYMWOwc+dO1NbWoq+vj8XWwuEw9Ho9srKykJ6ezual1WphtVrZunhB1dTUhMbGRmRmZmL69OksWSbZveFkfPcgcz/KuKQQDAahUqlw6tQpNDQ0wGKxoKKigiUREDo6OtDY2IhoNIrs7GyUl5czC6CzsxMnT56E3W5HMBhEdnY2ysrKMGbMmJgx6urq0N7eDq1Wi6KiIpSUlCAUCrHsOwC49tprkZmZCYVCAbvdjhMnTsDpdCI3NxfXXHMNBgYGUFtbC0EQMHbsWIwfPx4+nw9NTU1ob2+HzWbD+PHjkZaWhlAohCNHjqCzsxMAMDAwgPfeew+bN2/GsmXL8OKLL6K4uDgmxsQzkPh8PrS3t6O1tRUpKSlsTZQt2dvbi+PHj8PlcmHy5MnIzs5Gd3c3jh8/DgAoLi5GSUkJenp6cOjQIajVapSVlSEvLw9utxt1dXVwuVzIyMjAxIkTWSH46dOn2fV0u93Q6/UoKipCZmYm0tPTmVDkmVQ8Hg9+/etfY+XKlbDZbFi1ahVuuOEGRKNRDAwM4MSJE+jq6kJeXh5jiuns7MSBAweQlpaGsrIyxvN46tQprFy5Eq+//jpmzpyJ//zP/0RFRQVzdwIyU7+MM5CFmoyzMJItkchtJG0rw8ddgEHqKD4GQ+PzB5u0/xow6P4KhUJMy9dqtWet4Vy8iOSa478zFEEwCUz+dXJX8v3hAGDdunV46KGH4HK58PTTT+Ohhx5i1gy58kKhEMuulLLbA2CuS4qRXQjU24yn+AoGg8P+Pg/p9QoEAkhNTWWJMYcOHcKPf/xjbNu2DStWrMDKlSuZZcff26GuN2W5CoKAP/7xj/iHf/gHeDwePP3003j44YeRlpbGitql1F+JEnAXs6dH4xg9F6n3aOF8a7yY9Se7tlAWajISDj42wme8SV8bCiTMiLuRBAQVG1O2G3Cm+Jo+Q3VaOp0OgiBAoVBAr9fD6XQiEonAbDYjEAjE1GjxtFb0eyQgid4KADusaXyak0ajiWkaSmskjkSVSgWfzwedTscEnt/vh1KphMPhYOwdhYWFyMrKYtmSFouFxes0Gg3L5kxNTWWHuTRBhC8FICWArnUgEGAuU75HGQk3EqKU3UiF23Q/aDwahzI5KQNUq9UyIRQIBGA0GuHxeNDT0wOXywWtVou8vDxYLBYWI6Q5pKamsqQXvjEozcnpdKKhoQF6vR7l5eXsvuj1+hjl51KBdI9f6N/AmeeDh7Qx6ncBdM/oGRhqrVJlMtGQhZqMbwW04fmNTxYNHZYkYDQaDcsspBYlfDIBPfCUIMG3PqGDPRgMIi0tjR2eJMDIcuN/kw4SEgB+v5+x8UejUfh8PhbHU6vVzPqhuVHavclkYhmYPJciFW5TKr3JZGJZkBqNBv39/ayAmg5tQRCYdUrCkawZ+m2+hIGUAmDwEKECbL5sgsYDwH5fq9UyhYDuA41HAp2EGqXt0/UOhULQ6XTo7+9na6dxdToduw50P2g+NF+ap06ng0ajgSAI8Pl80Ov17J4olUoIgoDU1NSkH44yEgMpCw6VviQLCRFqlFZ7rup+OrguhPNpJOeqQzmXlibXrXy3QQLG6/XGWGxkLdEhSokCpP1T/RS5pXw+H/sMCRhKwyf2EuI5JMuIhBN9lgSgKIowGo3MvebxeNhvAYPWEI1Lz4Ioisyao9R0nU4Hl8vFGEnIAiUmfZoTJV8Q6bBer0ckEoEgCOy7JEQBxAh/pVLJrEveIuKFGx+7o+vr8Xig1+uZIAPOWFTUzFPa2YBvlurxeGCz2eD3+1lpACkoNE4gEIBSqWQClHge+Ro3sqj51jn0WXr9UrPQZFwaSIhQI863eDFSLrehmCguBKkApQf9UnRnXMmgmqbhgq/3ihfSOF2ifuNcc0zEeOcbZzjXJt45kBuWrO/z/db55kPfPddnktnHTsZ3G7L7UYYMGTJkXDaQTRIZMmTIkHHZQBZqMmTIkCHjsoEs1GTIkCFDxmUDWajJkCFDhozLBrJQkyFDhgwZlw1koSZDhgwZMi4byEJNhgwZMmRcNpCFmgwZMmTIuGwgCzUZMmTIkHHZQBZqMmTIkCHjsoEs1GTIkCFDxmWD/wNTaQqaGYkzLQAAAABJRU5ErkJggg==)
The graph of a direct variation is a straight line.
Find the cost to have your lawn mower for 2 hours.
![](data:image/png;base64,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)
The graph of a direct variation is a straight line.
The table shows two sequences of numbers.
![](data:image/png;base64,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)
The rule that describes the number of T-shirts sold relates to the amount earned is.
In direct variation, the ratio remains the same. x/y = k.
The table shows two sequences of numbers.
![](data:image/png;base64,iVBORw0KGgoAAAANSUhEUgAAAeoAAABXCAYAAADLTgYlAAAXxUlEQVR4nO2dvW6rStfH/7w6V3G0FUUM15AislO4ML6AFLYrS8+jSEO9FZqUbrBObaToPJKrQJELCClSBCvFvgaDomhr3wZvkTMcPgaMPzCQvX4SUoLxzN8DzJpZaxYoURRFAPD333/jv//9LwiCIAiCaA9//P33301rIAiCIAiiAEXMqAFAUZQmtRAEQRAEASBhmvFH2YcEQRBZFEXpTD/RJa1At/SS1vrITpr/ryEdBEEQBEFUgAw1QRAEQbQYMtQEQRAE0WLIUBMEQRBEiyFDTRAEQRAthgz1b4KmaVAUJbcZhtG0NIIAABiGAUVR4Lpu01IKGY1GqftH07SmJRWS1dql9FvXdaEoCkajUdNSciwWC2lfWue1S4b6NyEIAjiOgyiKUlsYhlAUBev1ummJxG/Ker2Goii4urpqWkopmqZhMBik7h8xAG4bo9Eop5VzDkVREIZh0/K2MplMwBhrWoaU9/d36Lqe60ujKMJ4PK6lTjLUvzlPT09wHAf9fr8TNzDxtXBdF7PZrNZO7lhsNhvc3t6m9j09PQFA67wAT09POa3L5RKMMTw+PjakqhqGYYBzjuFw2LSU1kCGmsB4PIau6+QGJ07OeDzGZrNpWsZB6LqOj4+PpmV8CcIwhG3b+P79e9NSWgUZagIAMJvN4Hleap9wiye3xWKR+7zIbT4ajcj4E0RLCMMQQRDg8vKyaSmFGIYBy7KgqmrTUloFGWoCAHBxcQEAsdFdr9dgjKXiL0EQwDTN2M2nqip0XcfDw0OuvDAM4XkeptPp6X4EQTSA53mtNn7A5/3IGAPnHL1er2k5UtbrNTzPy7nsCTLUxD9kR7C9Xi/3bFxVVcE5x+vra7xvNpvBtu1ceY+Pj2CMtbZTIIhjsFgsWnudJ1d9M8ZgWRaWy2XTsgqZzWZwHKdpGVs5Pz+H53k5b2Oda3zIUBM7k7wgxQKg7GKa+/t7zOfzk+oiiFMShiFM08RqtWpaipSnp6eUR+zl5aW1GR6u60LTtNYvKASA29vb3Gpvx3HAGEuFBo8JGWoCAApHg9lRo2z2zDlPdVbr9RpBEHTipiOIfRGz1DbOpmU8PT2Bc47ZbNa0lByTyQR3d3dNy9ib8XgMx3FgmmYt5ZOhJgAAv379AoC40xG5rdnca8557rvT6RSe58XG/uHhQXocQXwVNE2Druudi6dOp1MEQdCqVEyRjtWVAU8RYp1PHW2bex818XuSNa7i/yqz4l6vF+dn3t7ewrZt+L5fp1yCaIzRaARN0+IcauIwnp+fEQSB1FsH/Ptu5i69T/rYkKEm4LoubNtGEATxvjAMpSkSRaPFm5sb3N/f4+zsrLWLawjiUAzDwGaz6Wzu99vbGxhjrUp/KmpLwzAQhmFnBkRiAW0dbUuu798cwzAwmUzg+37qAhsMBrBtO2WYNU3L5VoLrq+vEQQBJpMJbm5uatdNEKfGMAzYtt16Iy3CVtlBteu6rV781gXEorcsi8UCpmni+fm5noqjBJl/iS8EYywCkNssyyr8jmVZuWMdx4l0XZcer+t6BCAKgqCun0G0gGP2E47jSK9LsTmOc1D5x9IaBEGpTgCR7/sH13Msvb7vSzUek7rtBee8sK/Zlbqv2WPpFGT1Kv/sBPAZC4h+4zgAcRhdc1UR+9GlfqJLWoFu6SWt9ZHVS4aaOBpilTilZX1tutRPdEkr0C29pLU+snopRk0cBfHAEzLSBEEQx4UMNXEUVqsV5U4TBEHUALm+CYLYiS71E13SCnRLL2mtD3J9EwRBEESHyM2oCYIgCIJoluSMOvdksi65BwiCOD1dciN2SSvQLb2ktT6yk2ZyfRMEQRBEiyFDTRAEQRAthgw1QRAEQbQYMtQEQRAE0WLIUO9A0VtpuoKmaVAUBYqiwDCMpuXkGI1GrdR1CsIwhKIoWK/XlY43DAOj0ahmVQRBtIFWGGrRSZWlhy0WC+nrxYhqGIYBTdMQRRGiKMJyuZQeI85D2dYGYyq0El8L13WhKEprByFisN62+wH4tx8t6ydl+sXjf09NFb2CxWKR071YLGrXuGt7yXQeg1YY6l+/fsV/n6Lxf0een58xm81Kj1kul7Ehj6IIvu8DAIIgSO2XGfku8DvP2LvCZDIBY6xpGVJc10W/38/dD7ZtNz6wGI1GGA6HsCyr8BihP3uPTyaTk/e7VfQKNE3D/f19SncURbi9va1V467tNRqNcjo550fxwrbCUAssy4Jpmp11LbeZIAialnBUxKCC+DoYhgHOOYbDYdNSpNzd3cGyLKiqmtrv+z48z2us39I0DbPZDJvNpvS48Xicu2d6vR4sy8L9/X2dElNU1QsgHlhXOfbY7NJeruvC87yczuVyCV3X8ddffx2kpVWG+vr6+ig/iiCIbhGGIWzbxvfv35uWUsrZ2VnTEnJsNpuD3lp3eXl50oF8Vb3imlitVidQVR1Ze5W9lGg2m8G27YPqbJWhBj5HrbZtV1pUU7SgRrYwR8S+gE8XhSyGII4RW9kIORuLKIpbZMuUlZtcpJbUtm2EnoztF8VtRHnAp1vxmHGTXcm2RZm7LXmc7BzL1iwI13YyrmQYRhzP9jwPtm1L699FW5HOolibLPa/C9nr9St6nAzDkM5W28RwOMTd3V1u/3w+B+e81dq7yI8fP8AYQ6/Xa1rKVjabDa6urqSfXVxcAMBB923rDHWv1wPnfGs8dV8URcFgMIhjCLquQ9M0GIaB1WoV77csC4wxaeMOh0O8vLzExwZBII1bLBYLTCaTVMzCcRwwxqQDkeFwmNJWduMvFgswxuD7fqp80zRThu3p6Sl23ziOEx93atbrNSaTSSq+9/LykmuH5+dnKIqSOs7zvMqx5efn51Rcablcxm5yXdfBOc/FuKpqy6JpGizLir8zn89zOoVhTZ4jy7Iqr/AWxj95rTHGDh6ht4n1eg3P82qPOR7KcrmMMyfEuRPnp6vrNgDg7e0Nuq43LSPHx8dHKxcQy9orCAJ8+/ZNerzox5NrsXYmSpD592T4vh8BiIIgiKIoioIgiABEjuPEx1iWFTHGUt/jnEe6rufKE9/3fT/e5zhOrsxk3bJysseLYznnuWMty0q1n9AgflOZ7rJyi8j+vmy92d8p27eN7Hk5BMuypG2cRNd16TUozl22vOz1IL5fpFfX9cJzt01blrLzW6VcznlKf9k1K6Pomj0Fx+4nGGOpa7Povt6HOvo0ca72uae2cahe2X1Rpc59fscx2rZML+c84pzHfWtysyzr5FqTZSXbS3bvyr5T9rns+CStm1EDnyMQy7IwmUyOXnY2NiLcKrIZvK7r+Pj4yO2XxdGur68BIB5pPz4+Qtd16az46uoKnudVKleG67qFLiFVVaHrOl5fXyuVdSrOzs4qLbiRxXl2cR3t44Ksqi2JqOPx8bHwmPv7+0LP0HQ6RRAEpXW+vr4Wxr2K9ncN13WhadpBMdZTMhqNwBhLedK6nCZoGAZ0XW9t+wvPUZTwSAVBANM0G8ngaKq9WmmoAcRusKbTtd7f3ysdlzUO7+/v8DxPmod86ABkm0tIVdXa45iyuGvZjTMej8E5B2Ns747tINdRCftq830fpmkWrlEoc4f9+eefAMp/UxiGOD8/r6yni0wmE2nct42MRiOoqhqHjsTfIgWnaywWC9i2jaenp6alFMI5z4VEVFWF4zgnD/802V6tNdTAZ0y1y+lauq7ncv+SW5fJ5lxHFfKrxXdEjLZNnds+2nq9Xm5m1dTDI7qISMfqwmIhkX4ju8aXyyUYY41PKnbBdV2Yphk/K6GtFPX9x1igtQtl7SUmaT9//pR+V2gUg/N9aLWhHo/HYIx1Il0rezLOz89ry/07OzsrLTsMw1avQL29vUUURWCMte4BJPtoEzOrbLiGMVZ484qZ9Labt6pHp4s8Pz+nVuGLzbbtlDeqDXx8fJQ+iEXTtM6cK7F40vf9Vg+Srq6uCvu5urxrMqq0V1GYFPh39fohfXKrDTXwmZ9m27b0JigyhmVxw2MgK//x8TF1MkSuXdVnN+/CxcVFYdlhGMLzPEyn06PXe2za+mALYD9tl5eXuTKKckAfHh4K1zAIBoOB1L0n8ku7zmazkXqaOOcpb1QbODs7K8013mw2nQhThGGIfr8Px3FabaSB8n7u7e3tYONXhartNRgMYJqm9LPVaoWbm5uDdLTeUIt0LVnHdH19jSAIUi4nwzBqf8rO/f19KgVqvV7DNE3M5/Oc7n6/n3PPiNzefVFVtbBsxlgr3YnZdCRhbIpyD+tgMBjg+fn5KNpk53A+n6fSNr5//y5NLROxrm2hAhGby15rjLFWptN8ZYR3T7Y2RJyftqeXhWEIxhgsy2rt4rEkyX4uyWKxgGmatT8IZZf2ur29BWMs98yH0WiEzWZz8LXRekMN/JujmL1JVFWNVwAm3WR1P25us9lAVdW4zn6/D9/3cydzuVzGedNJ1975+fnBeZdFZfu+38qcziAI0O/3Y50iB/yUHYa4WbIPNdlH23K5zD1wRlXV1EIT4RIXueFiEzn4VWYDURRhs9mkrrUoijAYDA5sDWJXNpsNhsNhzlWvqmojj7gUJN+KZ5omgiCQPoRHhBCT/eW2Bws1qRf4vM+S60YURYmfp133ZGTX9hLXQB3XhhIlfEuKorTG1UQQRDvpUj/RJa1At/SS1vrI6u3EjJogCIIgflfIUBMEQRBEiyFDTRAEQRAthgw1QRAEQbQYMtQEQRAE0WLIUBMEQRBEi8mlZxEEQRAE0SzJ9Kw/yj4kCILI0qWc1C5pBbqll7TWR3bSTK5vgiAIgmgxZKgJgiAIosWQoSYIgiCIFkOGmiAIgiBaDBlqolUoigLXdSsdaxhG5Tf+uK57UFaD7Pu71H9sNE1Lvd6VIIjTsVgscm/Tyr5y+Ji0ylCPRqPafzDxdbBtG3d3d03LaISbm5va37teF+L1oLJ3OwvW63WuI6w6gDsGh9QvXuOYfMd5nci0bhvEyQxNUwO/be0l7MKpjOI2XNeNX1UrNvHK4brOeWsMdRiG8DwPnHM8Pj42LeckNDkj6zqu64IxVvs7advK9fU1giA4mTE4FqPRCMPhEJZlFR7jum783m2x+b6PyWRyEmNySP2nNnbr9TqnNQgCmKYJwzCk39E0LX6nc3IT72s/JdvaS9O0+L3uYrMsq1ajuI3xeJx677zYxznHfD6vpc7WGOrHx0dwzjGdTjs7UyBOx2q1wnA4bFpGY6iqCl3X8fb21rSUymiahtlshs1mU3rceDzO5bz2ej1YlnWSvmHf+sMwhGmaWK1WdUtM6cpqVVUVjuPAtu3c8cJ4bzsHp2Bbe7muiyAIsFwuU/tvb2+h6zoeHh5OIbMy0+kUnufVUnZrDPX9/T2m0yl6vV4nZwrEafE8D9PptGkZjTIYDPDy8tK0jMpsNhuMx+O9v395eYkgCI6o6Lj1//XXX+Cc488//zyhquqEYQjbtk86kCijSnsxxk6o6DjU4ZZvhaEOwxBBEMRuTM65dLQkYlvr9ToXYxGGXRyzLa6UPa4oRlPknk5qESQXHBmGURhTEdpt24bnefExRa6qJKKObfGaKjG25G9I6hW/KfnbRRxpW2wxG08qcu1n23+XEIDQV3SDZ6+NbbHFbDtVOQ9lZNtA1l6ibZPtkGyD7HmWXZuXl5e1jeCJ3Viv17BtOzf7a4rX11foup7a9+PHj9aEi6q018XFBYIgyN2/6/Uanufh+/fvdcvcC1VVj15mKwy1cHsLptOp1G0j6Pf7qWC+ZVno9/tYLBZgjOXiStkTLY7zfT8V+zBN8ygxY0VRcH5+HpfLOU+NDG9vb+P9uq7Hx227yReLBSaTydZFDK7rYjabSWNsMk/FbDYDgPjY5I0sBhKr1Sr+HIC0nWTxJLE/yXq9BmMMjuPExw0Gg8qrsn/+/AnGmPSGMAwDpmmmNNzd3WEymeSOFcYwqSOKIjw/P5cORsoQ7t1keZqmSdtrs9mAMYYgCBBFURz3Wq/XmEwm8f4oivDy8pI7d2Kg8rt4n97e3nLGpy31z+fz0rj7KTEMQ2oEPz4+9r6uj02V9lJVNe63xP0j1g/4vl+LQTyEWq/PKEHm35PBGIt838/tcxwntS8IgghAxDnPlQFAql/X9dzxAHL1JctP1ss5j3RdLzw2WY7jOLnvJ+vM7i8qW4aoLwiC3GdVy9F1PbIsK1dm0Xc559I6fd/P7bcsq7Cc7G+XnZMoKm+/JEV1yc5Jss7s9SG7xpKak20ltCWp2u6ivbLfLdJa1pYyndva69gco5+wLCtijO1c766/9Zh9WlH9juOkfkvZdViljl0R11dyk8E5jzjnkWVZueOT13qdWqNov/YS98uu14ygbtsmzsE+51xGVm/jM2oxG8i6Y25ubgpjKbLYpK7rqVm5YDAYpFzDZauFxQKd19fXnX5DFlkcTtd1fHx87F3m4+MjdF2XjiKvrq4qu0Df399z+8pSnGR1irb79etXvO/+/j6emcvKSLZpUXy5avxS9huActdeVtt6vUYQBIV1cs6PHv/Nhih0XZdqPTs7g+d5lWJdXYzh7YNhGNB1/aAYd131393dNRr3FQvKxOb7fmE4SXgqk8dvWyV+bHZpLxHCEx7K4XDYaCpZFhESFLP8usIKjRvqh4cH6erd6+vryp3VNpIrHLe5f1RVrS1Hr8jAVP1uMp6d3GRuXVkM/tjxzJ8/f8Z/B0GAyWQi1ZesV7RtHQtudnHtCfd5Eefn53uvjM2uT+j3+zt9X6R6MMbo1bP4DPnYtp1LiWlD/YvFApqmtSLuKxALcj3Py4X9OOe5NKyyVeLHZpf2EqlnQRDEmpfLZTywaIuxFqGzOq+Bxg21bduwbTvXuYtO9HfJqa5CMp4t2wTCa5CNwdcd38vGepNbWxbZ1I2maQjDMDfD2ZXlchmvvxD3xO+I67owTXOvNqy7fpFe1MZru8g7WDQJubi4KP38GOzaXrPZDJZl5Tx6YmBhmmYdMltJo4ZaGJSizr2OvMmzs7PSmVIYhq1bpADsNsNbrVawLOuko3zG2E6u/aTbfFfOz88LP6vaRt++fStNtXl/f9954Y1wpx9z5icWHjLGpK7JJtOV6kYsqqvTpXhI/T9+/ACA2PORnWT0+/1WuWmvrq4K749D7seq7NpeQRDg7OxMWta3b98A1DuwaBONGurVaoWbm5vCz+t4+pJY8i8rUzwdLRk/LTKQp57pixzOKm1RdDPW+ZCD4XBYaVClqioYY9L0u6odWtFgq6yNsnF40fEWpW7Ztl0Ycy8iGQqosn8XZOEh0UmJTusrEYYh+v0+HMdpxEhXqV88GCW7icGT8Gg18cQv4HMtyNXVVfx/Wd/39vZWmElxLHZtr7LBv7inmp5UHfpsgKo0ZqiFUby8vCw8po6nL6mqCs45+v1+bjTGGAPnPHVjisFC0ogYhnGUmf4ui8B6vV6hbsMwUrOt4XCYcwspilLr7EvEjmQLWLL55vP5HLZtp4ykaNMqi6PEbDjbDr1eD7qu52LCRbnMlmVJU9Y0Tdtr4ZJwHyavFZFStwvZ9hIPqkh2usC/s6A2xUePQRiGYIzBsqxGFo81Xf8ujEYjqadFdg0n+74ki8Xi5E9Uq8J8PodpmtI86slkAsdxGlL2iVgHdJJFeGVLwuukanpGcin/tvQbWcpPUT0i3Sa5FS2tF/WKTdST/Y4shWebPpE2lCy3DJluWWqFSGcQm+M4kWVZqTq2pUWUpR+JMst+j9hkKWXZlBKhqyxlqkr9st/u+740RUqmo6jcqulZ2WtFXHvZdihr22wZRedonxSnY7BvP8EYy/2ubDtFUf78ZbeqqWv7aj20/lOnZ8nuubJ0q2x6VtMpT2XtJbsXivqUU2iVaavSb+9KVq/yz04AnyP5xL8E0VpGoxFUVW3lQp5T0VQbdKmf6JJWoFt6SWt9ZPU2vuqbIPZhMBicJJ2krcjWUxAE8TUhQ010kuvrawDFi8G+Oo+Pj615bjNBEPVChproJGJhTNsWwJwK0zRLMyYIgvg6UIyaIIid6FI/0SWtQLf0ktb6oBg1QRAEQXSI3IyaIAiCIIhmSc6o/yj6gCAIgiCIZvjf//4X//1HyXEEQRAEQTTEf/7zHwDA/wNtuzkAuxh4cgAAAABJRU5ErkJggg==)
The rule that describes the number of T-shirts sold relates to the amount earned is.
In direct variation, the ratio remains the same. x/y = k.
The coordinates for the origin in the coordinate plane are________?
Since the origin is a reference point it will always be (0, 0). At any point which is represented as (a, 0) where ‘a’ arbitrary is any number will lie on the x-axis but not on the y-axis. Similarly, any point (0, b) where b is an arbitrary number will lie on the y-axis but not the x-axis. Also, any point (a, b) where a is an arbitrary number, as well as b, is an arbitrary number will not lie on the x-axis as well as the y-axis. Hence the intersection of the axis will have to be (0, 0).
The coordinates for the origin in the coordinate plane are________?
Since the origin is a reference point it will always be (0, 0). At any point which is represented as (a, 0) where ‘a’ arbitrary is any number will lie on the x-axis but not on the y-axis. Similarly, any point (0, b) where b is an arbitrary number will lie on the y-axis but not the x-axis. Also, any point (a, b) where a is an arbitrary number, as well as b, is an arbitrary number will not lie on the x-axis as well as the y-axis. Hence the intersection of the axis will have to be (0, 0).
Choose the type of graph shows change over time.
A line graph is a graph of two variables that are in direct proportion.
Choose the type of graph shows change over time.
A line graph is a graph of two variables that are in direct proportion.
Solve the proportion
![3 over 12 space equals space blank over 4](data:image/png;base64,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)
The unitary method is a technique for solving a problem by first finding the value of a single unit, and then finding the necessary value by multiplying the single unit value.
Solve the proportion
![3 over 12 space equals space blank over 4](data:image/png;base64,iVBORw0KGgoAAAANSUhEUgAAAEcAAAAjCAYAAADG1RdTAAAACXBIWXMAAA7EAAAOxAGVKw4bAAAABGJhU0UAAAAXQ/cXWQAAAW1JREFUeNrtmbFLQkEcx39IiESLNDQKEhEO0ioS4dIQDhE0RINI4NTQP9Du2BqNbdHgINIS0dDgFg0RLf0PDfFoye9xv6HynplP8y6/H/gsz8fj7uvdvXu/ExmeCuzANxjBZ3gCF4XIDdyB6U/X1uAVo4nnlRG4ycMnxvCVJVjXdWeLcVg+vnnESPrJwm3YhRuMw82CBkRiiBiBm6IuyjPPLdyFczClO+YXWGM0IuuwrdMo0h1zlbEQQv7ZLtwlCe0fS2JIfeK0IoSQkFiBx/A+5vcyvBRbZH/X+/YD6Vs16eJ+DhsDHmK+1PfEFr0MBXin13zGtPdxXG++3zwkBx88D+cUHkwjHBG/q4NmKbgesV+Jwynp1PKRtI7q3DTCyYgtuJc9DacJDxPMiJHDMcc1LbjpaTBFx4j+k3DyGsyyx2tN19G+iYezCs/gfOBVh7GHY87ML8SeSITIREdOW0eOzGI4Pw2/0GsuA9vZA+Zuke2Ic+1AAAAAq3RFWHRNYXRoTUwAPG1hdGggeG1sbnM9Imh0dHA6Ly93d3cudzMub3JnLzE5OTgvTWF0aC9NYXRoTUwiPjxtZnJhYz48bW4+MzwvbW4+PG1uPjEyPC9tbj48L21mcmFjPjxtbz4mI3hBMDs8L21vPjxtbz49PC9tbz48bW8+JiN4QTA7PC9tbz48bWZyYWM+PG1yb3cvPjxtbj40PC9tbj48L21mcmFjPjwvbWF0aD4MCaZ1AAAAAElFTkSuQmCC)
The unitary method is a technique for solving a problem by first finding the value of a single unit, and then finding the necessary value by multiplying the single unit value.
The constant of proportionality is?
![](data:image/png;base64,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)
When comparing two or more ratios, the constant of proportionality is a fixed number that indicates the rate at which ratios increase or decrease.
The constant of proportionality is?
![](data:image/png;base64,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)
When comparing two or more ratios, the constant of proportionality is a fixed number that indicates the rate at which ratios increase or decrease.
This is a table with a proportional relationship between A and B. Find the missing value of B.
![](data:image/png;base64,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)
The proportion formula is used to depict if two ratios or fractions are equal. We can find the missing value by dividing the given values.
This is a table with a proportional relationship between A and B. Find the missing value of B.
![](data:image/png;base64,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)
The proportion formula is used to depict if two ratios or fractions are equal. We can find the missing value by dividing the given values.
Write an ordered pair.
Each point can be identified by an ordered pair of numbers; that is, a number on the x-axis called an x-coordinate, and a number on the y-axis called a y-coordinate.
Write an ordered pair.
Each point can be identified by an ordered pair of numbers; that is, a number on the x-axis called an x-coordinate, and a number on the y-axis called a y-coordinate.
The Y axis is _______?
The x and y axes are also called as abscissa and ordinate respectively. But, as they were not given in the options, we did not consider them and stick to the axes.
The Y axis is _______?
The x and y axes are also called as abscissa and ordinate respectively. But, as they were not given in the options, we did not consider them and stick to the axes.
The X axis is _______?
The x and y axes are also called as abscissa and ordinate respectively. But, as they were not given in the options, we did not consider them and stick to the axes.
The X axis is _______?
The x and y axes are also called as abscissa and ordinate respectively. But, as they were not given in the options, we did not consider them and stick to the axes.
If Justin ordered 5 ice cream bars for $12.25, Each ice cream bar cost is?
The unitary method is a technique for solving a problem by first finding the value of a single unit, and then finding the necessary value by multiplying the single unit value.
If Justin ordered 5 ice cream bars for $12.25, Each ice cream bar cost is?
The unitary method is a technique for solving a problem by first finding the value of a single unit, and then finding the necessary value by multiplying the single unit value.
Determine the missing value in the table.
![](data:image/png;base64,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)
When comparing two or more ratios, the constant of proportionality is a fixed number that indicates the rate at which ratios increase or decrease.
Determine the missing value in the table.
![](data:image/png;base64,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)
When comparing two or more ratios, the constant of proportionality is a fixed number that indicates the rate at which ratios increase or decrease.