Question
Given
and
the value of n = 2 will be given by the slope of which line in the fig.
![](data:image/png;base64,iVBORw0KGgoAAAANSUhEUgAAAh8AAAEuCAYAAAAuk3BEAAAAAXNSR0IArs4c6QAAAARnQU1BAACxjwv8YQUAAAAJcEhZcwAAFxEAABcRAcom8z8AAGivSURBVHhe7d0HmGxVlfbxIUdBcHRQxAQKKkmRJCiXHAcEAQVEJChIVpSgDijhKlEEJOcsoGRQQEQUiUoWwVFQEMTsmMeZ73z89txzb9lW56q+darf//Oc54aurq6u2mfvd6/1rrX/JYQQQgghhBBCCKH/qapqygtXaBhHHXVUtfTSS1c77LBD9eSTT0773xBCCKFnmW2a9Ij4aCr/8R//Uf3rv/5r9e///u/Vf/7nf0773xBCCKFnifhoOhEfIYQQGkbER9OJ+AghhNAwIj6aTsRHCCGEhhHx0XQiPkIIITSMiI+mE/ERQgihYUR8NJ2IjxBCCA0j4qPpRHyEEEJoGBEfTSfiI4QQQsOI+Gg6ER8hhBAaRsRH04n4CCGE0DAiPppOxEcIIYSGEfHRdCI+QgghNIyIj6YT8RFCCKFhRHw0nYiPEEIIDSPio+lEfIQQQmgYER9NJ+IjhBBCw4j4aDoRHyGEEBpGxEfTifgIIYTQMCI+mk7ERwghhIYR8dF0Ij5CCCE0jIiPphPxEUIIoWFEfDSdiI8QQggNI+Kj6UR8hBB6nT/84Q/VRRddVOarY489tnrmmWemfSVMUvpTfPzv//5v9eyzz1bf/va3q+eee676n//5n2lf6Rx/+ctfqkceeaT68pe/XJ188snV8ccfX5155pnVTTfdVH723//+92mP7C4RHyGEXufee++t1lhjjWr++eevFllkkeqqq66q/vznP0/7apiE9I/4IAYs+t/5zneq0047rfrgBz9YrbvuutXNN99c/fWvf532qPHz//7f/6t+8IMfFPW+5ZZbVhtuuGG13XbbVdtvv3212WabVeutt161yy67lJvrd7/7XXl8N4n4CCH0MjZiRx11VLXkkktW8847bzXrrLNWe+yxR/WTn/yk6/Nj6Fn6Q3yIbJx11lnVrrvuWm200UbVUkstVc0zzzzVXHPNVV1yySXVn/70p2mPHD/3339/9eEPf7hafPHFq/XXX79EPb7xjW9U3/rWt6qrr7662n///as3vOEN1corr1ydd9551W9+85uu3mARHyGEXuZHP/pRmZ+22mqr6dEPc7R587//+7+nPSpMMvpHfMgnHnzwwdUnP/nJaocddigL8pxzztlR8SGystdee1UvfelLi7i48sorSy6zhsj46U9/Wh1wwAHlMSuuuGJJw4jKdIuIjxBCL3PuueeW+fKMM86oTjzxxOq1r31tmZuPOOKI6he/+MW0R4VJRv+kXaQ4DOTnn3++uuGGG0r0odPi45xzzqmWWGKJaoEFFqimTp3a9sYhQB588MFqtdVWq+aee+4SjXnyySe7Fv2I+Agh9Cq//vWvS0ra/PTd7363+uEPf1itvfba1RxzzFGttdZa1X333dcVT17oefrTcHrnnXdWb3zjGzsqPv7rv/6rhA2lc970pjdV3/zmNwcNGYp07LvvvtVCCy1U0jNf/epXO+o7aSXiI4TQq4j8rrTSStVhhx1WNobmzEMOOaR62cteVi288MLFpP/73/9+2qPDJCLiY6Tweiy//PLVLLPMUm2xxRZDLvSiHBdeeGH1mte8prwG5lTej24Q8RFC6EUIjY985CPVqquuWkTI3/72t/L/igKWW265arbZZqu22Wab6oknnuiqLy70JBEfI+Xyyy+vXve611Xeqk984hNFxQ/FXXfdVS299NJFrHzoQx+qnn766Wlf6SwRHyGEXuThhx+u3v72t1e77bZb9eMf/3i6wPjjH/9YfHmMp/wfKgM7lRoPjSHiY6Soall00UWL+DjhhBOKx2Qo5Dbf+ta3FvGxySablH93g4iPEEKvwcch4quq5dRTT61+9rOflfRKfZlPRYZVJIqO+HqYVER8jASK3Y308pe/vIQKlfW2Vrm0w82k2oX4UF6mN0g3iPgIIfQaOphuvPHGpeqPV44H7qMf/ej06z3veU/5mvnRJk1DyIlqzBh6goiPkUB8fP7zny/iY/bZZy9VL0KHQyHNUosP7u7HH3982lc6S8RHCKGb8G4QBiP1Zegw/aUvfak0Fdt8882r/fbbr7QfaL0+/vGPV5tuumn14he/uKRfjjnmmOpXv/rVtGcIk4CIj5HClb3YYosVMSFkOJxD+/vf//4/GFQ12hkNTFlEjm6tQ112F27eZZddtjjK2z2mvs4+++yyIzE5hBDCYJgj9Cy69tprS1sBhtHhor01zPU77rhj2Xxdd911pZOpzdjA62tf+1qphFF2qxu1OTPG00lD58UH57L+FzOzdrsb4uPGG28svUO8VZqZDdcc55Zbbin5To+X09SgbDQQEhzh8qJDXXYOUkHaFr/yla9s+5j6YoAV3kxdfQhhIBZ+wkEbAWlmplACQlms4yqIiJHw9a9/vVphhRVKQ0YCZjBs4PRBWnDBBauXvOQlZa4eLqIc+obOig/KWEjNwLXYziwV2w3xoVGYkjHnEshhDhXJsGvQyY9Bdb755iud/fQJGQ3Clvvss0+plBnqki/VzOxVr3pV9d73vrftY+pr7733rh577LFEPkIIBXO0eVsDsNNPP73afffdi0ftFa94RenDQXyoVjEf/fa3v532XYNDPBx00EFl4+XQzeEOj7v00ktL40YbqA984ANlng2Tgs6JD7tp7cYt+gbeV77ylY4s+mOhG+JD3pOSF2nw3Lfeeuv0uvWBUPTve9/7ivDQVtjrGa2ZSmfAp556qpSoDXV5TZqZ8ZU4K6HdY+rL8+UkyRAmNwSHRoh8aOZH/gtnYmmIKAphfnNYpk2kBokEwWBz3UC0GFh99dWrDTbYoHr00UeH3YCKlEu5mKttoPy8kf6s0Gg6Jz6UkjIXCf9TsdzMjpyfGSF+qQUCyIC+4IILRhTKsyjfcccd1WWXXVZumnYdSS3uxIQbVISHf2LgzUVkXHPNNaULKlFw5JFHVr/85S+nfbXzxHAaQhgJ5jRpkOuvv76kdUVwl1lmmZLy0G/DHKL7qIiFOdC8OdLotc3SPffcUw7dNB857ZtPxNw32BqgV5IDOZ0ELnorqmzT5iTyob4v9AWdER8GqUVWqM5TuQzAiXQwW/RFJ4iIiy++uHgcVKY4yvm5554ratpgHuxmuu2224oxlHFTHtKuYGB6wu/5hS98obi47Q6OO+646bsCzy0syRtSl5g5Wp+Jqps3UcRHCGEwzIv8aeY3FXtSGzZQKvfM12uuuWapRjn//POLeCAixjJfMY9KzxAznptfTfTkiiuuGNScrwu0OdJjfQ9vibmVKNJ4bDhTf2g04xcfFnPmylVWWaW4lj2VS5UHJzPzUbfONalxsxisxx9/fFH0jrpXAeI16LB34IEHlhAi5/VgzcFESKh/38NHcffdd7e9CXlZNBkTWmSqcvN47pNOOqlEQ9ZZZ51yM0mHfO973+t6CDHiI4TQik2TjRAfh55Ee+65ZzVlypTq1a9+dbXIIosUHwcDqao95lIRXBu38SDKLWpMxLReDo4bLNWros9GceD3uBxn0c3TwMNMZ/ziw8A1kKUiPE3rNRGnuoJIYFxyRPOnPvWpYqykwv1sN5526IceemhR4YOZpoQZGaWobhENTcIGe81Cgk7OFaK0k3Bqoz+5wzXQOe+884oQGO8NPRIiPkIIEJllKDcX2gjprKxCT0ThzW9+c7XtttuWSLC5S5qcKOjmvBzCEIxPfFhc9Y/gVpav8zQDL+Wf55577qirPUaDG+jnP/95MVQSOoNdwo+DGT8JGKVkjsMfSamwr8tZPvTQQyVvefvtt5edhpwqxT5RN3XERwiTF1Fl8xZBcfjhh5fNk9SxCAcDqXlBawAbL2etiPym2i30AOMTH0JqtVnIU7S7iJK11lqrpCCGW9DD6In4CGFyQTzYbEmZSDXvtNNOJe3NN6ERIh+HCKxNHx/HUJuuEGYSYxcfBjOfA0+F0J5LlEOFCe+Hv7/+9a8v/6/TpxthuMPYwuiJ+AhhcmD+tImrfRxExkAfxxe/+MViLtVBVFQkaZXQo4xPfChpddS8HKOL36J2Lfv7RRddVP5fgxoGzpGUvIbREfERQv9CQDiU0hzKk+Y+t6lzz+tYvM0225RKQ+Wz7n9zbNIqoQGMXXxQ1NIoREh9KbdyYyhz9XeGpvprHhsV3nkiPkLoL4gHRv7ax6FnEh+H+9zcykjKx2HjV/s4ktIODWN8no+BKLmVZnGD+PtEVHtMdiI+QugPnKsimqyX0M4771x8HPoFSatoee6MKIdN8nHon2RTlw1daCgRH00n4iOE5iKtosKu9nEw5/PLOcZBv6Hax6G7svJ/fYMiOEIfEPHRdCI+QmgWBIR7Vdqk1cdBcOjwKc1S+zicyTSRpfshTBARH00n4iOE3keKRHdkB6dphkhg6ITs/CflsQ52cy/rEsrHwTgawRH6mIiPphPxEUJvwgTKm+HAyhNPPLH041h11VVLReC//du/Ve94xzuqffbZp/g4VAN6bIyjYZIQ8dF0Ij5C6B1EK3RzfuCBB4qoIC6c92ROdJ/ycTCTEiO33npr6YiceTJMQiI+mk7ERwgznz/96U/lvBTH0TtLatNNN62WWmqp0vPIn9qef/azny2HWz7xxBPl8UmrhElMxEfTifgIYebAOKqTqJ5GhIWGX295y1tKSsUJ2XwchIgGYSIhDrVMA7AQChEfTSfiI4SJg3hwqrXj4KVOdtlll3LEhPLYRRddtFp99dVLquXss8+u7rzzznIGC7NpCOEfiPhoOhEfIXSf3//+9yV64Ywqzb7WXXfdMs9pALbCCisUM6nmYOY9p8ymPDaEIYn4aDoRHyF0Bw3A+DgcR//JT36y2myzzf7Bx7H11ltXU6dOra699trq8ccfL0bTpFVCGBERH00n4iOEzqHU1bkqN910U/W5z32u2m677cqp3Nqc83FsuOGGpTHYJZdcUjqTaome8tgQRk3ER9OJ+Ahh/DicrfZxaGm+2mqrlZRKaz8OLdD5OJ5//vnMbSGMj4iPphPxEcLY4MvQTfT888+f7uN41ateVS288MIl2rHjjjsWH8fXv/71UtUSH0cIHSPio+lEfIQwcngynnzyyeorX/lK8XG8613vKv6NF73oRdUSSywxvR/HNddck34cIXSPiI+mE/ERwtDwZEiViGA4sG3bbbct/ThEOJTHrrfeesXHcemllxYfR4yjIXSdiI+mE/ERwj9DcGjqddddd5Uj6fk49ODg43C/8HTstdde1Zlnnlm8Hs5VieAIYcKI+Gg6ER8h/B/Eg9NgH3nkkeqCCy4oPg5RDVUqL3nJS6pll1222mGHHab348i5KiHMNCI+mk7ER5jsMIL+6Ec/qq688srq4IMPrjbffPPqTW96U7kvXv/611fvfve7q8MPP7y66qqrqsceeyw+jhBmPhEfTSfiI0xGzC3PPvts8XEcddRR1fve977SadRx9YsttlipXDnwwANLP47vfe97pR9H0ioh9AwRH00n4iNMFogH3gw+jlNPPbXabbfdSg8OYuMVr3hF8XHsscce1emnn159+9vfrp577rnMQSH0JhEfTSfiI/Q7f/jDH6b7OPbbb79q/fXXL2WxGoAtt9xyxcfx+c9/vrr55ptLGe2f//znpFVC6G0iPppOxEfoR5yrwsdx9dVXV5/+9KerLbbYovg4CI4ll1yy/PvQQw8tPg8+jpTHhtAoIj6aTsRH6BeIBz4Oc8fRRx9dbb/99tXb3va2Ijhe/epXl8oVPo6LLrqo+DikYHKuSgiNJOKj6UR8hKajH8fdd9/9Dz4Ozb+YR9/+9rdXu+++e3XaaadVd9xxR/Fx/O1vf0taJYRmE/HRdCI+QhORVnn00UerCy+8sPrYxz5WTovVj0PX0bofx3HHHVd97Wtfq5566qn4OELoLyI+mk7ER2gKUiQ/+clPqmuvvbY65JBDpvs4FlpooWrxxRcv56wcdthhxcfxgx/8oBhN4+MIoS+J+Gg6ER+h1+HN+MY3vlEdc8wx1fvf//7i4xDh0Op8nXXWqQ444IASAfnud79bUjDxcYSxIjo21itMKP0nPgwiuyUTmGtmDioTqfByN19DxEfoNdx/qk/uu+++4tXYddddq3e+852lF4c25yuttFL14Q9/eHo/Doe+/f3vf5/23SGMDWOojqpJ5SnL/uhHP9r28nWi18nGU6dOLX4ja9bPf/7zjMWJoX/Eh58lVOuobAdJccs7w+Gyyy4rpXidyhmbVE2Y1113XTl2e7Dr8ssvL2dL3HnnncUg1y0iPkIv4N5yj33/+9+vLr744uk+jte97nXVi1/84urNb35z6UJ67LHHVl/96ldL+iWR0dBJiIabbrqpOuKII8rYk86bffbZS4v9TTbZpNpqq63+4dpyyy2rzTbbrAjjZZZZphidmZv5jMzzoas0X3yY9JTn2WFts8021QYbbFCOzN5pp52q9773vSWsa6CdfPLJ5SCp8YZ0H3/88eoDH/hA2b0JHw92Mc3NN998pSzQWRLdIuIjzExE9ggJYlw/DueoLL300iXCwUBqcq/7cRAmDn6bmdHI0L/UAviXv/xldf755xfRMcsss5QxeeONN5by7PqS4rv33ntLBZXN4qc+9anSuG6BBRYoawYB0s15O/SB+DDxWYA1Hlp11VVLxMN5D/fcc0916623Vscff3w584GxzaFTnPPjMbF53hVXXLHs5KZMmVIG6lCX12KC7hYRH2GicV8LT/NxqEhRmUKM83AokV1rrbVK5ENHUqmXnKsSJhot+M37s846a0n72XgOhfG8//77Vy996UurOeecs0RAhvueMC6aLT5+//vfl0Ol/DzXGWecUcxtrTsr4TNREarWTkxKxmQ4Vr71rW+VifYTn/hECfFJwQx1/eIXv+jqxBvxESYCY5iHiZjg1eDZWGONNUrzL6Jj5ZVXLv/nXrv99turn/3sZ0mrhJmGcWqTOFLxAREQm1jREmNbpC50jWaLj9tuu61MepTqBz/4wXKuQ7uQLkObbolCavJ6wm1jTb8QHH6mXZ0Q8swm4iN0E+WuJmGnwzLobbTRRtPPVZEn32677Uq0kY9DO/T04wi9wFjEB79gnaoxnz7xxBPTvhK6QHPFh1SGPJ2Fd9555y0GTxNfO0yGZ555ZvWqV72qetGLXlSiH7/73e+mfXV0yF2vssoqxcjaCznBiI/QaRikCXmVA/waPFOEBsFBePBx8Hd8+ctfLge+iUAmrRJ6idGKD2mXvfbaq5SAv+xlLyvpRFH00DWaKz6eeeaZatNNN63mnnvu8jOZiIbacdVeDe5nvQZ4RcaCfgQiH+edd16porErvP/++6uHHnqoKGVRlokMN0d8hE4gEqh1uWiiE2KZqt0vymOJdj4OpYuMfCZ26cSUJIZepVV88CQ98MADxYjqMnaJDWuIAgLmUlE9KZc3vvGN5e8qJzO+u0pzxYcFn/dittlmqzbeeOPqhz/84bSvtIfyVX4111xzlUGptfNYkNNeaqmlSvhZdc3mm29e/m7x33rrras99tijqObvfOc7E5KWifgI40EEUBqSX8rYZaJebLHFio9DhM9ZKyrFvvnNb5bJOueqhJmFsUc8EAw2kyJug9EqPlRfEdN77rlnuYxz/qSdd965zNnOD3rlK19ZUvKf+9znivCYyA3kJKW54oOpTQWL/JxBNFxYjclU+HieeeYpjnylVmPhpJNOKqJHbbh20Mp6+UmUc6222mpll+haf/31y2OVAY82JE1x24XKoRMUQ11uJvXsdqaqe9o9pr7qxSNMbv7yl7+UqN2XvvSlf/BxcPqbqI3p2sfx4x//OOWxYUIRhWNuNmfpk3TVVVdVp5xySmkeRjgQDDZbzP+DrTGt4sOfonZSiK7PfOYzJWX/8Y9/vPrQhz5U0ojSim9961tLLxopeuvJeNsyhCFprvi4+eaby8/y0vfdd9+yyA+FCZQ5Tu+NBRdcsCjnsWCXyO8hVOc55LxN5MJ6/k/ImhDgLTGha6okFTOayduN5/uEC0VXhrosFqI5BJUbst1j6svNq9Q4C8nkgwA2oerH4fwUE7gJV45bIzApTOPjiiuuiI8jTAjmIYZmc5K5lMdIJRVxYFOlT9O6665bRIGqKpssAtk5QKuvvnrp3UFIt2Ng2uXBBx8sHg6X6EmddiFwPJYQJzxEQKRedD51v2Su7BrNFR/6Z8jReena5YoUDIWSWwswc6o0BRExFkQl/F7tBqXJ2s8hjNZcc83iR9FszL9H0+uDWGGSEtmxMAx1uSGlnvxeIi7tHlNfOvrxqGRRmTz8+te/LjtEqcC6OZ4JXFpFiqX2cbgfTMzJc4duYP5Tfs2bd8MNN1RnnXVWdfjhh1d77713ibSJFGvOqB2Cjrg2iOYzwkO6XNNIgkDXar47Gz3iYbDx2io+RmI49Tyi4VL4Nqh+tgov4ih0heaKD+E4C7u0i8H19NNPT/tKe5iM+DOkXShnnpFu4fcWJpQ7VwYsj2gRGCmqduTYqXGtqoe6/E6iLG5SUZd2j6kvN6z0U9R8f2P8GN/Cx8LUInGMoyZ1jZeEmvk4mEuJ9sHEdAijwRgylsy1DPjmm3PPPbfMf46akJ6W4mPYFxUWdZt//vmrl7/85WUuX2+99UqUQiqQWCaKr7/++tIwjKfPHErEEArDjdfRig9IszjnhTC3ofOaCabQFZorPpiO7NzmmGOOEZktPV40wuPXXnvt8u9uInS9/PLLj1gcDcTNJUIx3FWXGzu7QLVNu8fUVxaY/sTnystjgiZYdWq0gzPB20GKEIr6OVVWqJqPwySe8RBGizFjka7Nn4z7otD6HvEJiaQREOYjHaeNPSXaNkgibjpDm3+lOHTBNSYJFCkXJn3zsgic5x/PnDUW8QEbOELdkkikj/T7wqhprvjg0jfIKWc/U8hsqIGqOZg0BvFh0A+XpmmHSZsSd8MNl0YxaIURiQ8VA0KE3SDVLpMX95dxRVAIYb/nPe8pO0ipOGFjAsSRAnrgEMP60kRwhJFgnIgw8FSIOKgA0U5fKsICLTqx4447Fq8Q/4W5le+M2HWuD9GhSyjfhgjCkUceWZ199tnV1VdfXdKA0r/Sy90SwWMRH8SU9M4CCyxQUuZec3p9dI3mig+qWFiZEUmOTt+NwUpb3URMTJQ3Q5FGYUM1JBuMz372s6WihSJmMh3KDa21uhuSGZR5dDwt3Yci4mNyYSybEE3gzi2yACiJFbq2wzThm+zdD3fffXd5rHslhMEwpghTIkP0zNhiqj/hhBOKz2KXXXYp6V0VfgzuhK05h8gQXSM+VBJq0kUEK9vWLVTq+OGHHy6pC88/keNQFEUqmvhwjzC1tsNrIoA01RO50eHUnC2q7tC5bq5hk5zmig9YbLn2hfSUvcozthMEnNQGE1U+WBt2woWyZ2bijG7nohYxkad047kxBxMUojIHHXRQETtCj0OVhI2XiI/+xwRpTPFxnHPOOcWkx8dBeOvGyMdhgVDazcchGpJJMwzE3FiLDGX8FmhdanV8FiETIdAywFwpgsb8yf9gjDGsm8t83aFrNnN8baJq5k1zpsaNqqSG2pR1E3O6aIoon2P1ee5EnkVARGtUchFFfmfiyonjhBJPCj8KIeX3VXrrMUP1EQnjptniw/NzTlPkBo0dHzc1hzI17083mI6mdobykNR4u5SJvKUQojIrfUOEGQcqdb1FuLKlejSmMZiF6txsBn6toAkTuU2eD9EZN3s3QouI+OhfLBRy4CZKYtb4Fc4mao1TIW2hYalAfp+cqxJg3jIWRL3MRyJgemWceuqppc9F3SuD98IcRVhImZhDCQ6GUAswMUKUELW8ROZ0AthzmtPMv7003rwe4kL1I3+fwgICxJrk39KQ5kmXe8mf5nwm2LqihkhRzGDtyL3UVZotPiBiIY0i8qFvgXJS504YRG4cg4yKV2ao5HWw1IyIh5uQUubVEC0ZqOBFQ4gdzyWlYkBrVOPm1PmUgiZcpGa8HqFvSryb4caIj/6C0U5+mo9Dmo+PY7nllisLg/FpAhUKJ0hE+vSE6eb4Cr2NDQ8hIK2gXJpx026+LmNlNK57ZRg/0s6EhjnaPGd+FDWry1h5OvjjeOhER2yuzHtNWIjN1163TaHfY6jr0ksvLY9zkq17TYqFgNcqIffThNB88QEqXzkWwSEkSBzI81GyGpBpXCP3OFhDGvBwECsakZ144omlaVm7G87N7rk4tA888MDSptcOganU37m9fb+Ii4Hc7Zs24qP5mOyIVJE1UTMCVoib695iIQxuHEu5GOcaJInshcmDuZTQlNqoe2UwcBKoIr7mLVFZKQY7fgKjFhlvectbys7enGjOUsZqs6WDLcFi3jD+bMyy8IYJoj/EByzy8uIMU24oiz8V7GYdicufapYr58K2kxjuJiRkCBRCxIIgVCckaQciZDdRN3HERzOpx6sxQ8jWPg73jhShXSkRIqompy4a0pQdaBg75g2bFqX5fBR6ZYigSq/xnKnwa+2VYawQqcaNCJleGdLMyq0ZKI2tuleGnT3h6vkjXsNMpn/Ex2Ql4qNZiJzVPo5PfOITJedc+zik8qRZ7GaFzy0WdqMRHP2Hz1TEViWI9Jn5UjRC3wvCQdTWPS0CZk6VdnOZW6WX+TVEO0Ra6zJWKQSbLn41rQQYJqXxMn5CDxLx0XQiPnqfOqpmF6uDIqOoXSrBweBnJ6tZHFOfhUgV1UC/UWguBIC0hv5Arb0ymIj5LZg7lasyERMY7mdGSaZ1KTfjRdqNKOXnYB6te2XUIoOoTcokNIiIj6YT8dG7SN/p98LHYZFRIaVsUahchZYFxY5Vyk5L6twvzcbiTziKbPHvtPbK0Btoiy22KJ87UWEMaHdPbCy11FLlOPfWXhkM7Mo9VecpHZXijcgIfUTER9OJ+Ogt+DL4gOp+HMLjmjLpOqqssfZx3HrrrSUaYjFJWLx58HW165XBeK7iTiWcKjumT32I6oZcBKiGXYzxyl7rXhnGA4+HMcGTYVwk+hX6mIiPphPxMfNh3tN63yLExyGM7j7Q1E7HRDva2sfhM0o/jmbgMyImmX2V3msNLiKhlJ940CtjnXXWKaKSwPR5L7DAAmX+c3owP49KuEMOOaSIk9ZeGYzwREZ9hkkIk4yIj6YT8TFzIDhUDtQ+Dv0ULEI64NrtKm1s9XFYaLLI9B4+E58lkSHqoEJOdYjmgIcddlhJg/Bc6JWhk6xeGfVprMqg/Z/eKyJaPm9l9jwdemU4X0RDLukSP4OYiegMoRDx0XQiPiYOYXA5faF2qRM+DtUI8vbMo5rLSbXwcShtHEnJdpgYfA7mI2X3TJoPPPBA6XMhPSYqxX+jemSDDTYovTJErPhzpEx8vgzCvqaHkF4ZDKOqUzSoEhVx78UoHMKIifhoOhEf3cVOVbmrfLyeCfvss0/ZBatSsQMW7dC8ibFQi34h+oz7mYfPSyqDJ0NkStRJFOL888+ffuS7czxUGDmQT5mzSJXP0sF8Dk6TSvEYfTV8jz4boiGMwcykzMEpYQ1hXER8NJ2Ij+7Al+H91Lrfe8zHoSpBhMMYd8CWw6v4OCxII2lkFzqL+YXIUMaq7JRp02FhOng68l2UQvtwJk9lrHwZohkiGfXxCNtuu23pEOpoBFEQvTK02vZ8KkzyuYbQFSI+mk7ER+cwXjV9slPWuEkY3pkYdsROkBV215tBTp9pMOeqTAz8EnUkQwMt5ae8NM4iqY98r3tlEBU+K10/lbMSjMpbNW+TEiMY+TnqXhnKWHk9+DKSMglhwoj4aDoRH+PDguPwLCH1k08+ufrgBz9YvBuaPAnH+/uee+5ZFixeD36BjOvuQMhJcYlk6O6qR4rDv5g4jXO9MpSprrHGGqXLJ5HhM3KZd4gPZa4+L2WsKlOccnrbbbeV8mcpMYIxn18IM53uiw+XG9/OJXSeiI+xYafLx8EL4Ahuh3KpZBCSF+0Qsj/++OPLScgqFnKuSmfxfvJOOIuJqJPeIv6UpSpjrXtlMHrWkQzVJYygvBpOjXaQY13G2torQxkrs296qITQs4xefNQhUIdi2UVweLvR7R4JDj0NTAyc5CYB4Wmh0SyM3SHiY+RYjLxHtY/DOOUFkFZhPKx9HPo5CO+nPHb82HyYHzTkuvvuu4unQkRCZEKEQjqEwdPJqzYtxB+RoSGXXhnGtYiHMlamXkehE4ROdiUKzTt8GfmcQmgUoxcfwqHy4VzjdozMWioA1MM7TdFuRY5V3wO171oKm0SUtoXOE/ExNNIqfBwWrKOOOqp63/veVyIbjIcWOxEPpZOMioSyhTK5/9Fj8bchIQj0t1AdctZZZ5VW4eYHxk4nruqLoVLI+y+aQWQ4wbfulWGjIuLk89BDxQnVGrgRGVIy+WxC6AtGLz6ESRnv6hbBTFxq5IkQYoQoUaLmZEaO87oXQsRHd4j4+GeE2kXl9NoQyrdz5gfgDbCz5uMglh3SVfs4Ujo5cogA/gnRBxFOJch6ZZgDlKhqsGbDsfjii5exSWgQHKIbxF7dK0NVirTXDTfcUKIixm8tMkRM8nmE0LeMXnwIcVrw5Fid0mjCEFK143nqqadKqsXExEFux+kxOgXavYTOE/ExAz4C1QsXXHBBEcEWOtEN52rox7HDDjuU5lCqWYzR+DiGhiAjzPgoRI68r6JH3lvvpWgF/wWflzHo/BrlrHwaUimiTB//+MfLMfEEynXXXTe9V0ZERgiTmtGLD+FVgoJZbCQhUP0STDzESOg8k118GI9Er9JJ74WIHB+HE0PtvGsfh6/zcfArxR/wj7iPf/WrX03vlXHxxRdXxx57bBEOGqg5o0S0qO5zUnf9dDqrNKsUq6gnYaK7K8+MSpXHHnuszBM2LERG3vcQwjRGLz5MInYtGvCIbDz99NNl8hfZEAGRlrGzMfHYhX7jG9+odtpppzKxhc4zGcWHnbJFzULZ6uPQpVJvBx1Ipfz4BqT7eBEmu1fAe1b7Mvi26iPf+SukQPgtGHAd7U5UEBfzzTdfiRqJbPBxOUiNf0OKRekx467nsRkRIbHRYEiPyAghDMPoxYe0ipM7mUtdcryaMTGU2QE5hImDXdWLXSeTmRJGxrHQeSaL+LCgqT5xjkbt47BQEhtEh/C/6gk+Dh0qiRML4WTD+2SDoJTYZsB7UffKYObUx4QJfMqUKeXId5UlCyywwPRIkW6g7lvvJbPo6aefXk7r1StDq3IbDiKDmEu6JIQwRkYvPkQ8dBM0gTGWKoGzAKq3/8xnPlP8HcLcdkdaFvu6g5qcFhk6Tz+LD4ubkL2omShG7eNgXuQvcA4H8cvHwZMwmc5VsfgrHSYy+K2Ya6WWTjnllHIv7rbbbmUDsNZaa03vlUGkOfbd31deeeVyH3ucI+J9n0iI82lEi7yXPBmJYoQQusDoxYfdpN2lUjopF7li5YmqC4R0TYby6iYuC4cdqCZAJrPQefpRfFhUpfL0hLCQErpSAVIAdud8HUSusD9hYpz16y7c4s8Y695yD4kgOk9GRGJgrwypJ++PlAmhoUur0lbnm6g6q4981yuD6daGgHBx7072tFQIYUIZvfiA0OvAfggmScLD+QsWD3DLa0JGpNT/FzpLv4gPEQtjh0dIdQQfh/4P0ipSA2uvvXYp3xYBsWgaV/20Kyee3CNEhvtFGasSVL0ypk6dOr1XhsiP90V/DKXDDKDeH2WsSlz5q5w/U/fKUApbH/nOq5WS4hBCDzA28TEQk6ZFw85KaJzh1MJAoDiEy0Qa8dEdmiw+6jFicdT1Urts53Yo17R71x/G//maQ8Ck/PrBx0EAEBkqwJSxikKoCKub99W9MqRGmD2JC++HP/k0+KiUuhJjhFrdK0PqhZmUiOPLiMgIIfQonREfHO8MgCZNzZzU8ouKCIfLQ9d9PjIZdp6miQ9jQFpOukRJJ9+QhdaZHdqcOzBM1EMDKosy02RTF1JCSTSQyHC+keMH9MogGAiH+sh3Ikt7d+JCNEO6hJ9FtMd7QZAQJo58l3LRGE3ZMDHmvUzKJITQMMYvPoTLGUwPPvjg4ogXGrYDqydEoV7dJJVFJvrReZoiPnz2BCgfB2Oyg8MssASH3b0yT//vFFKlm006V8XrJAKIAa9dFJCwIqCkQKRC6l4ZepAQGVqLi/A4Al60R6WYDqF1GWtrrwxpTpES91oEfAihDxi/+GCGs3u1aNjlKeVrFR+iH3vssUcp12NCDZ2ll8WHMaD/g8VY0yql2Sqf+DgsvEySGlmJBjgPhFDt9bSK8S6tIfIg4velL32p+sIXvlDKWOsj3/XEYJAVxah/V6JDabBeGY4kUMZaH/n+zW9+s/TEESFh/owvI4TQ54xffFgs7NZEP3g97PJa0y5KIIXVhdBNqqGz9KL4sIDycajIIDzt7O32LcT6cSjvVNpp8bar78XFVpSBGOKh0CuDeD7ppJNKhM/rF7nRK0OayO/m/BJ/6gKqV4YKHb+7ihR9SRxHQITplcFQyjBLyPSTaTaEEEbIP4sPokH5rBI8OzHh8uEWBmZAooM50M5W+NzCY2GU0951113LwpjdXOfpFfFhnNT9OEQzNtpoo+kHi1mg+YFEP1RfSL/0SnmsxZ9Y4i1p7ZWh9wXxoIyV90KvDF4M5b5ElFRRa68MJcHEiUgIb4cTcpXGEhl1U64QQgiFfxQfJmChYL0DGN0Y4ggJkQyLxWD4mhy1SZj4YKATYtbmWh6bQc4uL3SemSk+LKg63jowzA5fNKC1H4eF2SIuasC7wMcxsxZhQkfaz+sd2CuDJ4nnQhWJXhmacGli5n3VndeYJqKlFL3fJ5xwQvF0OPJd2a+eJARM3V48IjuEEIZkhvh4YXGY4nAouWmVB3Z6zHDy1SZeuzmT62AQF0SK8LLDpc4777zSBMoOcCjhEsbHzBAfymOZi0UylHw6Pp3gUA6qo2arj2NgP5iJQBqH+bO1V4a0oF4ZjgLYYIMNSq8MwoLIWGCBBUpUo+6V4TA1RwjolXHhhRdWN954YxEsxHmdLonICCGEMTNDfOy3335TGOX23Xff0nNA+JmQ0LpaCN3EbYfXbsIVcrf7VRLI22GHa3LW3VR54N13353IR5eYKPFBQFrMdbfdfffdi49DxYZOmhZyqbVTTz21pOAYMrvd5tw49DOMMWWsohAEr5b+om3SPMat1IiGXMTR/PPPXwSSNJAoBwOsA+hUpeiVoWuv1IvDEYkm45pwisgIIYSOMkN8LL744lMsZHZ39a7ORTRIqUjDEBG+NhChZ7lxFxOhSRvC3L5X8zHGvUzinadb4sNnJYLARKwdt74UtY9DpEBUTBRBzwqRAR6hThuKvQaLv/FUH/nu7BHRiKOPPrpUWYm8tPbKULpLZHhPvEZ+Da/TY30PYV33yvC71V0/eT8yPkMIYUKYIT5e2BlOMam3K4clHBhKhdrbLTAMelI2vj4wxaL/gTC8/g4pte08nRYfPl/VGNIVtY9DPw4RDl4IC33t4+jUuSq+n6iV1hNxIAqMJaJH5E10wvjjIdHEjqhQxuokVq+L+VPliROVRe5UX0m1iN7pleF11m3/IzBCCGGmM0N8rLDCClMY70QxiAQhbQuRHLemR47ZFpJuF/mQTydcmO4G4vE6nBIodpmhs3RCfPiMpC9ErfgceB6kK0QRVHasueaaJaUmNaGEdjznqvhZBAuRIb0hTeM0VSbO+sj3uleG9AjB4/wSaRPpE+LDaa2tR77XvTKkX1RoGb8pYQ0hhJ5lhvh4YYf5wuZxSpnY7Ww1ThJSt5MU0h7K88EHoNRQRUOrudBC4/+kY5hQdWkMnWWs4sPi7PPg4yAulZUSGa95zWtKzwo+DkKAaLSw68cxGh+HcVCLDKk8aQ7REj0v6iPfCVpjznkljskndPxsRlBjTq8M5dv1ke91rwznoaha8fon2swaQgijRTRXJNZZZ+0uG7Fu++TGgvnVGnHFFVe0fd1aCzz//PPTHl2V6LX1wv8PfKxNpt9zWhBihvh4+umnpxAbJn07TLl9lzw6855d8WCmUYuBI7t1bpRT18uhLmUULrcwDhY16TcMIKkmCyPjrehRN0P9oxUfogIEocFx4IEHljSKtIVFX5msktOjjjqqpF0MFINpqNfvax5T94bhC+LzUbJdH/muq6cqmOWXX74ICykTxk+CQ6WM1uO6g/pdBvbK8JwETLffxxBC6BYaFdpE2dzb2JlrVZT6tw2+zVntlewlrGfmc2sFz5853GtfYYUVipeOF1Dfphprns2sdd/cXj/WHG8t8D4IYrzADPHxwj+maIXNmyFnzqchDC6qQVwMV2brBfqBjvxWSWAXLXQu6mEx6eeoh7by3iPKTuWERZRPQbmmhZx3wdeJkk4voCMRHwa1hleqOaQqiAEDnwAgBnyvaAR1K3Xhs2qXtvA8hIDBo4xWhZOBVpexEi56uxhshGt9UJpoihtu4403rnbeeefyvois6ZWhOspziY5I/RhLERkhhH6C58w8pyKQZ2222WYrbSy++MUvlgVZ9KAXo7jWAfO94IG1xnw+yyyzlLS86kKbTetaDbHiqAhzvPXF4+kCQQk+Pu/DtMf/o/jwP6ITvBv6JHhDhlsMan+IELs3V3qlbrdOuOj9QQ3144JCkBk4dvhSBM4qYYoUKbLIqhDiXyDIKFxloA888EBHFe5g4sNA9kGLWFnoDQADRnmsnhbSHUpSDQo+Dgt/HZmqx4DUhpCbahYl014/Y7HfS68MzbeIDM9Ziwy9MnxNgzoCTC8QPT9Ew/wcr9G4ii8jhDDZULxhnZhrrrnKMQw2e01BytumddZZZy2ZDuvDQGgBIsO6ZxNqs0uMtFnz/ll81BALFoih1JjFl9iw2xf5UFUg/M6QaPHq512sxdquXyhKUzZvtvdBusIiK9LhT2fb8DnU3T/9KSUlWtKJ96ZVfEiTeF6mYdUeDMTSHUybVCixIL1BbRsgBo/8m6iI1ysKwVQqWiPypYy17pXhd+TJIDSkSwxCUQ5Cy2N9DyFT98pwkxE/dc+XEEJoCuZmqd5Ob5BEEcypc889d8kOWDObgiiHNUTURqqID7AV75d+SzbiTvCWQlc5Och7+M/iQ8jd7lz1ikO0vDmDCRDRDkZAx6FLsQjnC7f4XoquF3NYncCCzR+jGkOpJ7OmCEi7dEUt4kSALNQqN7SeZ760MI+XWnz4sL0m7z8fB7FQ+ziUoMo3EktMT1JrPiNRCdEJ1S3ECyXO40OoqHQRyfA7EjDbbrttiXqIfhCcnsPv7HRX6TqiJ76MEEI/YC4zR7MMiNba0XcC4kP6ebziw9orouCgSn+Htcfm/9FHHy0eEptA6ezBvJqjxWa6Fh+i5q3iw8+wJvB26K1krRHhHmI9mCE+nnzyySkcqQwkUgd2tSoN/CKDiQ+/LGUj92+XbUdsMdai3W5Y2WO/YVBafPW+EDoTyWCMHG5weg/1nCAS5plnnvIBWbw931jw3otYSO9o+kWASIEoSXURH7qQen0e47OUeiEU614ZRIbHSsMQKVIxPDr8G1OnTi1pMy3ylcO6SWqRQVQOomZDCKHxWNBtKi22No3mQhUr4xUh4xEffjYBwENoM2lutyFkyrcO89D5t8iD9cUazhSqfQJT6FBZjJEwmPiQAeF3lG638aUjiKBhNqIzxMcFF1wwxY58wQUXLOZAu+LaaDrcblZYncLi9WAyZEjxi/uw+g1K05ts8Fjsqb2hzLitUIe8MKIKBAiBxlszGhg+iRh9MYgJr2GOOeaoXvgISy7OwNB8S6qFwHDEu3SJz5XYIAx9zgZu3StDZQqVX/fKMKgiMkIIkxXRavPri170orLJVBHIUC+FrlpwrJvG8YgPkXKRZ6/DPO45RKul0VWaEh2OjBAIcFmnRL9FsIkVwYDxRKbbiQ9rH0+fjavWCewXMgAj+DkzxMfRRx89xYskHvwyPA2jeaEea2esN4SFzosRku83qEjvkQ+AqdJgGg0MnFIZL7zl5QRV0Y/hPBEEhxCaUJZBRdV6DW4KQs9zufzdJRJClCibFukQ9XA6sRtHr4xbb721CEtq2YAmMsarikMIoV9oFR/1/DrnnHOW6kDFAyeeeGIRDqMVIeMRH+ZpBQQWeBHqekPpMEwbWRER64uIuLnd2sIKYT1QCGBzOVbRhIHiQ3BBIYL/c6SFRpR+7gh1wwzxocmYN5aq8qT1jtcT+ftQVysqI6gyHhAKsZ8QueB9mHfeeUvkgsGUuXY0UIqEWR2hoBoN9HYQb0ceeWRxFoskERR+dqvgGHi5QfhKeDeoYmEwxlEGIbXayqf5RHLlypUrV/vLXKmnhfl04Bxr7rZRF2lw/INo+Ej9jeP1fNTrsfPSzPMuKfJ2Tco8zoZVFFwERCuF2h8yFlrFB58gT6h1ntVi9tlnL18TQW8tvR2CGeLjBSU3xeKmFXrdBt0L5W/wf8pJ9YLwwTA1HnTQQcWsyNGqqqHG93pThfZH+8b2OsJMog7SHITDRRddNKhwGArK2eDzITKJDiZgVI4QctIpQwmO1strI4woURflnitXrly5Rn6ZOy2oQ8275mVrJiHAUzFwI96O8YqPGusw4SEdRBQMFm2whki9L7TQQsUTMpb1qqZVfPi5xJkDO0Vd+D0JNeujwz9HYEWYIT5OOeWUKTqbCifVDcEoGB4FphXdyvyyPhS/iDdO2kGJpXRLjTeBIqSI+AdGGIJpBNQlUWVQMngKf43FSex9m2+++coA5rlgzmmHqiMRC9ELSrv2dgx3eX3Ekc+zjn4QPKI2zFMiIbly5cqVq/1lzTN/DjbnSnlrN8Ccz5TPptBN8TFwHa3FB2GhtcJgaJ/A+zeezXJNq/jQ10kAQksFqRZ/14bBxtf6r+fXMCmeGeLjjDPOmELN6MBWl4DyAXhy9b1eOEFh0bSYecOV+vjBA3+IkIw3lq+gn8SHvhhSJhZ3VSLCWCM1m7YiD1dHPhh7B4t8iDx5/33ojEQGm+954eMqf7oBfNgUuJvEZ+N5/Z1INBhUsahu0Ydk1113LSqdWVV+kELlJVGto6pJmidXrly5JvtlTmSgNI+ab+tL2ptXT1WJNZC/YjR9jMYiPlSzaNIo8l4LnJGKD32muiE+FCxIN9VeQe8Zv6cUjMgRq0CrfaMNM8THOeecM8UvwpSo0mEgclr8B3whBEq7x9QwOHpjfYAjUYNNgSij6gwcb7B82mh7dRAr+mb4ABmBtKgdLkdGwKlw4XQmXPg5/Hziw0V8UKLUOkMqo5S+HZqD+bzq02nl/qRxGFGZlDyeS1pazWfqdFg/h+BRo+13k0fsJwEZQgjDYZFuNZwSIeZTKQYRb5UjY2meOFrx4XVIzfNiEhn1Yj+zxcfAPh/WeUEKm1zvlc05f6EN+yAaYIb4uOCCC6ZYmOyK67TLQDSo4pql+IZKNyjhFCHwpvST+PC7+NClXEQXhJpa/S4jgRvZKa5yid5vnUZHUjtOAIiQSMWoqfY6dMojLIgPilO+jfBjglLVogxYhEMjOAKDMNFwjPjRp0TFDFHiT7lLn60bgsCiXP1+TLVMsTrXEZOUvuobn38/fbYhhFBTiw+bOr2Z+Bz5Jyy44+nYPBrxIaNgrV1llVXKkRY2hfVGsNfEB7xeBSf6S/n9bHZF9q2RbTawM8THJZdcMsWLHKqCwy+iBwgR0uru9cQWIh+Knb2mVkL99957b9+VcOpv7wOQejEoW9XocHjPeDwIBt8vDUIZjjay4OfJMVKaSq5qg5TBSEx4fdI0Rx99dPnM9GAxAPwsPhxNwwgT7dCpasbhOlrC2yPXSZC48Rx+VEdLiB03AR+K36M1WiLExvsjWjKemzOEEGY2Nlf6H/E08k2Y2zqxljGm1n2iLNLtxIf1QOGGjaNzYMzF5lpHltTYGNoEm6uts4NRG06tEUNVVo4EpbtSTsQHr0u7JqKeX/ds6X6Ps8l1un2b1h0zxMcLO+UpHsiQKJ3AGetJnPVhkVL1wtnK+GjR1O+COdWhZXbaFI4PSlUMI45DZfgJ+k18SDfpmcFPIW1CgWoUNpyAIM7UWTOAippwChsYY/GMtMLDIcRFFHotIh/Cg0QI4cAg6zwXVUla7hrU9WdCJBALbixmWoPYjaalsPSb31O0hMCh0o2PuhdMfcaLaIlIivyon2OHMDBakmPxQwhNwnxtZ28j3ok1zFwrvS7SbX62+TSfSuFo326DyDfhGA4dQq21FnqePht5G816cy8lzldp/bGRtQE0v7amyG10vXaZDB2srTmagIq8EFajmYc9r3VPTw8RclF70XEbb+tH6/vj73ygIuf6kBAg1ghawe9HQE2zKswQH1deeeUU6QCLip0u5eJP/gJGVO26fY3HwA7bAlTvjv2/xU7DE2pMyY031mLXb+ID3sTdd9+91E77MCzsFvDB0hDeA4swYWfAUKu+Z7SN3NpRp4GYgBl8KWvmJGLQzyMEDVBCQa8QUQtiUvrHgGr3mv2fQW5AS7OIltTNbQxAERV18CJcfq5oiXFC7BgDxgS1XUdLvI46WmI34WahovWB8b4x1g723oUQQtOxEbf4M2paPy3gohE2blLhLn4JkQ5rp4VbOt1aakNnniRepNDZGsy3BIwIijmWWLG5NZcSF+ZY3yc6zyT7whJf5mmbU+kXc/tIIDwclqrNBitFbcC19ouC83VYc2pUuQhCtD6WAKElVFt6ndaOrbbaaob4uPbaa6dYqLwhcjV+uVqEeDMIE7t1KkZUQ2ifgpOP8gvaYQsj+bfF0PcIx/djCJ6YsNAzHzF0et+kLqQ4pDYMErt83hl5OuEzbzyR5v3RQVa0pBMLbi0+Wo/U97yEhZCeFJlF36D3mdZ5QgcACd3xjxBTI1HDvu73olypbz+vjpb4Hf1eIl+t0RLjxntElBBrrdESr0kUrY6WiLR5LsKIQvf+9aN4DSFMLizKdTTZfGfudfm76LWr9f/rS1t0c6xIhpSGiLL53OPrxxAGhI2oiXncYwkGKXXrQ/04f9c6w5owmLViINZvVZGyG5qK1c/ltZrrbUSteTXWRQLJ6x74e/o/r1PhxAvrzgzxceONN04hKPSgkHaxKOlWRkHVJ6E6QM4vxVQipG6xveWWW8qL44WgvPyfxUeoyG65H8UHLPBCZd4rC61d/nrrrVfCYdrMerPt9rmUlSgTZxSr95HqHG/Eo6ad+GjF+18bVaXSDAQ5R+kTQoQ48PoNaGkgA2kkBtiB1CFBYTVht8GiJbwloiWEKzFEkEkb1RE37yNDFs9Ka7SE8Uq0hFASMUoKJ4TQFIgCc6O5fzSX76nnunpT2e5xLvOvx7lsgM377R7nayPd+Hou0ZTBnsvVul6M9Pd8gRni4wXRMMVuVL7fL2jH6fIiXfUv5RoOAkTOhzu2X8VHjQ9GSsXOn6ITDSEyhLeUsVrs+WKuvfba4n0wkDrJcOKjFYNExIJC5uGxuItWScu4CALiU8rG+S/8ISMdpIPh+/3OVLvnq70lxKvcZh0t8Z61RkukcDSzI0zqaIlqHs3SeEu8r63REuKK6PF5jGSMhhBCmGnMEB+O1BftsJsfb6hbZYWKipF2fesHiCzpCCYlCyw/g/fSYm9B7Fb6YDTio8biLDRnsRaxIgA0iGFaVbLLsyFas9tuuxWXNbHgd+vkou65vGdeB7HbGi0RaSOOWitxam8Jj03dyIbPSLSEidfXRUu4sJUV19ESQsv7IoUzWcZiCCH0ODPExwsLwRSLQScmaAtLJvqJYSzio5VaiBBK0mmiHoxEyq6Znvg11l9//VLXrfJJJ1ShtW5i7BiLfk4dLRFFEy0RYZI7raMlmq4xN3m9ojd1gxuvm1ucgYu3hLgSLZG7ZLiSLtShj1D2+/uZnRRXIYQQBmWG+HjhH1P+7/9Ckxiv+GjF4itKUxtVLfCbbbZZ8YdIgYgyMKpyOPMCcTkTCBO5aPtZokjylqIlBASvkdfLW1JHS3hvuMBFc6RwVBlptMOlTagwSYuWqMQRLeEtUY/OoyJaQoyJlkgZ+XkRJiGE0DEiPppOJ8XHQBiH1HKLFDCLMtRKdfh5PBjKwxznXJ870AsmUFEM6b76TCKvrfaWcJrvsccexTciraTqh+lWhEc1jhJolVx1tKTuWyJawqxbR0vqsrc6YhJCCGFURHw0nW6Kjxo7f+kJ1SZnnXVWqWZSlSLNwR/i7yINGs8pr+ZzGUvFTDeRxiGmVPMoB9PshydEtERd+v7771/Mts68IUBES6Rv/I5Kz5Wct0ZLpKEIL9VOrdESTm7mWj8v0ZIQQmhLxEfTmQjx0QpRoQeHKIDuecygoiB6eEjPqJgSXTjjjDNKbbvFuFtm204gckEsiGZoEa8ZUB0t0QhODb2GciIhdbRE9IcokcLRfK+Oloio1CcHq3DyHMrQGWlFhogfaapES0IIk5yIj6Yz0eKjFYu2BVv/FyceK5W1OBMiuuKKIuhoJ2XBqKpipikLr6gFofCrX/2qiK3WaInoj99XWfUOO+wwPVpCfBEmokH+Llqi301dieMYbk12REv0eyF0fGYiRdI4oiUhhDAJiPhoOjNTfNRYqO3q+SGcpqsTntejLFaEQLdbZ7/ocMcYqnqlbojTRER/lAfrUqvpWR0tIbJEg1qjJZrLMepK4xAloiWt3hLREiXNPkffW0dLvJda22vu0wtemhBC6CARH02nF8RHK3bvDJ96gyjNFR3QHMziq4upRXe77bYrDdk0B3MyYq/5Q8aKqI5qIeXBoiUan9XREtEO0RKRINESXWa9F4SIg5+8N96jOlri8/Q43XIHRkuYaXlwCLikcEIIDSTio+n0mvhoRTUIr4OGc5qViQZoCFZHABg46xN3GVWJll72h4wVUQvvhdLdVm+JvioqiUQ8RIt0xRUhEi0hQuo0jksUqY6W6G3isb6n9pboSCtawlBbdygOIYQeJeKj6fSy+GhFREBfENEOVTGqY2qjqvbpoiPa0fNTMKp2uqNqryJSxDtTe0tES3Sd1UeFaVeESLSEZ0S0RN8SJlcCrj5duo6W6MGiYsfj20VLRGSSwgkh9AARH02nKeKjRpqAudLu38KoXJXvgVHV78Go6mA5jcJ0M9WmfqIbmfUC3ie/NxEmxVJ7S4aKlvDW1CXChIloCbGy7rrrlp4sIk+1t8R7W0dLpL5yJk4IYQKJ+Gg6TRMfrUgNMKqqJHGgod9FZUi9gC6zzDJFmDCq6qUhpTDZK0IIBB6Z+gRh70kdLXEK9WDREkLEOKm7vBIqBItoSX0Ss2iJyJNDEDVoq7u8JoUTQugwER9Np8nioxWiQlrAGS7nnXdeKUt1ZotqGbt4C6gzZxzNrxrEY2O2/EeIBGkVUYw6WqL52Q033FBO/20XLVGJI/XlTBzjqI6W6GYrWuKx+pa0RkseeeSR4s/pF6NwCGHCifhoOv0iPlohRBhVndnCqKoU1Ym2du2qQiyaDorTMl0qYrL4Q8aK94YwIRZEMgZGS1orcXRvdZCgQ/lESJwerP28ipw6WuK8H5U4dd8S0RK9XlQ48a3wsPh5+UxCCIMQ8dF0+lF8tGIn/+STT5YTbZ2xUp+4S4ioBlH9wah67rnnlh05P0kiIiOHQHDxl2h21hotafWWEIBbbLFFMbby5Sy88MJFmIhMMcCuuOKKJVqi0Vxr3xLpNOXGDisUrfJziKB8RiFMaiI+mk6/i49W+BwsYvpmHHbYYWUxdHS+E3cZVvkXHASn0Zn3IibK8SMKxVtCAN5///0l7VJ7S0Q9RD9ESwiP5ZdfvkSmREqkyohDvh1t6UVLVOLwlvCknH322dOjJSIxIjKEiZ+XzyyEvifio+lMJvFRY3HS+dNiyIdAcEgVSA3wL1gE9cJwTL7qEJ1C9dnIotY5RC6kV6THVCR95zvfqa6//vriLdF7hE9EBGTzzTcv/VxERwiSujx4ySWXLKk0n1tdiSPCoufLZZddNj1awrsirZYThEPoKyI+ms5kFB+tWJAsUBY/u+l99tmn7LQ15rILX2WVVcqOW8qGx0FL9Bglu0edwpFi0dfle9/7XjEIi5acfvrppbRatET6TAnwcsstV8QI0ejz0vNl2WWXnR4tUYmjS66Th51ATODU3hK9UWp/SQihUUR8NJ3JLj5a4Q8RwicymFGZUnUFXWSRRUoKYI011ii7cSZWVTUWryxcE0dteNVXRFSjjpZccMEFRRx+8pOfLB1v3/Wud5VOuKIlBIlLVGtgtMTpyc7R8Vm3RktEY/ycNFQLoWeJ+Gg6ER//jAXHjtgBdoyTds3bbrttqdZgkHSeiv4X/AcWPn1GtCRPWH/mUKdwGF71FqmjJbw7hOIRRxxRfeQjHylnAtXREmJSl9f6BOE6WkK47LTTTtX+++9fyrIZkY0BXXM9txLhJh9qGEKfEPHRdCI+hsYiYxesEkbo/zOf+UxZoOyqCRGtyf2bR8HXtSHP4tQb+AykcPh7REseffTR6o477ihGVYcWtouWMB7XJwi7VObU0ZJtttmm2nPPPUvTujpaopzb83r+nIkTwoQR8dF0Ij5GjkoKqZbvfve7JeJhd2wnbecsNeOsGRESVRyOyJfCiT+kN/G5KKsWyRDR8JkOjJbsu+++5fNUjs2ErIEafwnR+epXv7pES6TiCJedd965tPQXJaujJbwl7iljJimcEDpKxEfTifgYGxYT5lOn6Sob3WuvvUoPi9qouuqqq5bwvUPw7I4ZKLMr7n18RnXred4PHhDREi3jdc6toyX8QAytoiW6vIqWML0SoXW0RGqOeDE26mgJcWM8iKR5/pRzhzAmIj6aTsTH+LBwWKxEOW655ZbSGEuFhQ6fykItSmuuuWYJ1+sEyjsgPJ8Fp1n4vAhO0RKRDJU4oiU+c+mXdtESkTB9ZIwDZw0ZC3W0RAmxaMlAb4loieeW6otYDWFQIj6aTsRH52B8tJN14q6dsmZYqip0VNXIjFF1o402KqWfun/aVes/EZoLUSIdx1uin4hoRu0taRct0ciu9paIkmioJo0jWrLyyitPj5a0ekvqaInxkjNxQihEfDSdiI/uYNcqwvHwww9XV1xxRSnp9B7zChAijKo6rPr/nLjbnxCjhAJh8utf/3q6t0S0ZKC3hJlVtEQlDqOr1vOOAGiNlhgvA6MlmuB5zqeffjpG5zCZiPhoOhEf3cciZPERUq+NqmuvvXbZ8Xrv9RKx2xUpuemmm0rJaELu/QuBYEwQm0qEeYdES/iHBkZLdtlllxIt4SFieCVInCBs7OhbIlqy4YYblvGjb4loycknn1wE7+23316icKp9iCA/M+Ik9AmTR3y4eS0gSintZu1iOl1aZ3IQhrdTGuqyONk92e2M9+dHfEwsPi8dVWujqrbgzIk8AcyqQvKMqieeeGJpomXhiBCZXBAI5hufvXmGT6j2lpx22mklWqITr2gJEVv3nyFKjCPVVyIoU6ZMKd6S1r4lhI1oiV4oyoOJHz/LGIswCQ2i/8WHG9PNr2rhwx/+cGnrLI+vYREXuwVEMyqPGy8mGueJeN6hLseR6zugNHC8noGIj5mHna8D10Q7jC9t3IXYpWUsIBYWn7e2746wTyOzQCAQDISDihki9pprrpkeLTnooIOmR0tERbSbN56cIqxMmNfEkQF1tIS3RO+aU045pfSp8Xw2WEy1/EvmtYiS0IP0t/hw8zl4TK5V9QLRQRy4yTWVYg7z/3YW3/rWt0pUYjw48ZM50Q6GEU2Itd0lH2xS0SxpvD8z4qM3MNYcRy/srk/IlltuWQyqPhvh9Y033rjsXh0xL5RuAcqiEFqxEWFItRmyYbr55punV+I4xXnvvfcuc9haa61VPEcMr3XETVWOXiYqs2pvyYEHHlgdc8wxpSGbvjUOYhRtVYbMX5KIXJiJ9K/4UFbHFCYM7ib92Mc+Vs7zcONZ8PVtIBYsEm7erbbaqoQyxxMBsYOx833/+99fRA4PwGCXkk47lPGaFCM+eguCwhgT6SB85f1VyIiE6CMhnG6sHXrooUWoiJwYjxEiYTDMEcaU05mljG2UzDUMq8cee2wRGcSGOaCOlkjjmNcYXvUx4TmpoyVEDDFD1HzlK1+ZHi2RDlbxk2hJmAD6V3w89NBDZdKfZ555yk6A6h+40FP+8qeiH0KbjmaXzx8rl1xySbXiiiuW3QpxI8w+2OUmH6/wQMRH71L7Q+66666yUDjNVdWDagiNzHhFtt9++5LLdxieMs9OpP/C5EAKTwTNGBMtYYiWAhRdY1olcKX9REtERHhLpG6IEn+KluhlUkdLlBJL+xA0jNVf+9rXyrypkksap+nVOF67uVcflrvvvrtsPpVA2yi490Se6s2DxyUy1FX6U3wYRCZ0N9l8881X8qmaC7XDIOMFkQ6xQ7ALGKso0ITKgsJcNlGLSMRHMxCJE/J28qreD84jMVaIELtTh6I5cVfu/s4770xH1TBmLKCiaQz2A6Ml55xzTpkbtZKXbt5kk03KOJQiJEgIYycI85aIltjA8ckxyIrmtkZLpBlV+thI9fJYJdJ4bK688soSieT3Y+QluEQhibNdd921+sIXvlAqjKSqTj/99BIJCl2jP8WHG8J5DaIecqN2BEMZ/YgT/RvmmmuuMgAp37HAdCjy4casb0Y/t5u7hYiP5mG36rOSh7fLlKaTrpMetAist9565RRX0RK7MpN7jKqhE9gU2XANjJZIERLFdbTkPe95z/RoiZQhYUIoS+nU3pJ3v/vd06Mlxx13XImWeC7REunEXjgThxeLd4Z4IrJcxIf+PFLffmceLcJfEQCxJSK02mqrld9jZr72Pqc/xQezlnDirLPOWjwdqlCGghfE42ebbbayGxBmHAtK6NysPB2UM2Orv1tglNjJ8etyKHzZKSI+mgtBYSF47LHHyq5MHt5uzK6TP8Sfzh+xW+NfstNMI6rQDWyWLNSiJSJ0oiWiABroqdYSLeEtcfRAHS3R1VWUhL9ExKT2lrRGSwZ6S4x1m0M/q9vjWLT7wgsvLKLCa/S6VDdKyYss2gR4HTabTOC6Frv/VBYx8rrnfD10hf4UH6pI7CCJD3n25557btpX2mPRloufY445ipOcQBjLjcEzItUj2sJHovmUXYJ/u1FFRYT5iBI3YSdSMxEf/YHJ38TP9HzxxReXscQgKCJXG1XtRk3mxndO3A0TgXlQGlv0TRpCtMRmjR+Ex62Olij53XrrrUtERBRPhEQkz9j1d5s7c6toiZRjHS0hDkRLjHvRkk6dieM5eO9EMFQfEiD8fQTJYHO7VJX0lJQMDyCxNdzaEcZMf4oPA9qkLZLhxqByh4LSN9FLu7hJhLrHIj54PoQshfSkb/z7rLPOqk466aQykLVfpqi9Nu50ERphyfEQ8dF/GBMmet4P48cOkidE2NuEbteppwgRy6jqsZ2YsEMYKeZH3jiRuLoSR0RBtOSqq64q0RLeCd4S0RKl5nW0xDgWXbBRq6Mlvs58rVU9gS1S3OotUYI8mhTOgw8+WCI0PH/aH0grEVDDQdCL9tg06tNjIxq6Qn+KDx4OJr7ZZ5+9Ouqoo8qOcig4nQ3Uueeeu6j2seb67EY5qXU2FK6zY3DDuEEtEG5MuXy7AX1AtFOm9tv9LApc6kanzKEuvUrcYNI9RE+7x9SX8KdJIv6B5mAM+cw484lYOXYRtLrplC6YDNM+Ww5+E+xYxm4IncL8Yt6T1qj7loiW8DjV0RKN0epoiTG8zDLLlBQO47+xzWdSR0ukzgdGS/g4zNuDiW7PT6jbUO63335lgznS+8L87WeJXBM/mS+7Qu+JD5Mt5cm8STmP9nLGgtydUJ/Ix9SpU4vxaSieeuqpYvKbc845S508Bd+NCdwgJk6EzwkGERC/a7tGY854oNgtMENdCyywQEkvEU5utnaPqS8eAqImu+TmYTwSsaJbwsdy8Ho22DmasJnkhJalGU3OdmztxlUIMwtjWLTEHM/rRBCYa5W71tES41ozvjpaQmgb23VzxjpaIr1DzLQb4wSPKLM0uiiLzq+j8W54nbrPuo+sDREfXaH3xAe1bAcvDSLsNdqLIjY56yppUdZcbLi8Hf+F0B+xYsBruNMN8VGjioE4cnO42dpFZtwwjm4XHRnqcnMSHnYKTF7tHlNfdgBCmLmZmo2x6T4htI0TuzzVXcSsSZpo9W9dfH3dBDre9F4I3cScZFNETBAP5uDaWyJlUvctMY/xzZmnbaTa+Z5EK/jsLGu8UiKCo53zaqHUzXVgktN74sNgUv51/fXXl7r00V7UtEl59dVXL2kXA3W4aheCRVSA+LBz5MYeLV63BWEkA9bN4aYgjng23GwDkUdVm+73GeriB2COovTdjO0eU1+eL7vh/sJYM1Ycy86oKsduLIiC8QIJXetjIALI2EeIG6uZVENTMFaJB2ZR85hoiUMbjft241iVihOELWvveMc7ShQj9Bz96fngmNY0RkqCqBhK+VLbfCEmaz4MOcnRllcRHEJ0hIuB7+cPhQPleDTkI5XhyjGOlRhOQ42JuPXEXTl1bv+XvvSlJVxdn7jLDE2oppFZ6EdESqRqLGs2ocqGQ8/Rn+KD0BBuJjw0GtNMhkpuBw+GEDUPhlRPuzJbz+f7TdbylQO/Lhcv/y4nqWRXO+124UDUYsdiwPktReQ5x0rER2iHNIt0C6HLbEx0cPATIlJ0jHxC2CqylDka3xEioR+QqpF2t6wpIFA1lrHdc/Sn+IDqEpEIC7Pdn0VeWqQVYkI4Wq5cjlDUo10bdmVbGj056pqZdWCkgtBQHsbcpKZc6FuFwkCRYkFQ8aJsUqSFo1oYsV3ocKREfIThII41UdIfRDdHhmemPVVXBLDmS0x+0jZSlumoGpqMNDsv3CyzzFI2eWkW1pP0r/gwecoNEgzKbk2waseZmJgu7Qg1cpL+UFIlOkKwDBQCFLOv1aW7FnnRkYGTM9OqMlq7yte//vVFrHBxuxHsQPlYlM4q6WUI9FjhwMEiJCMl4iOMFGNbhIOYNiEzdhs3zM86QCp31OHR/6vCMnYJl/GI4xAmGps88760uwpGvrh2m8Gh8FhVkjajEeJdoX/FB2oBou058aGclvlOgyad9oSehaNFPOTK2w0y4sMpkausskqpQ999991LqmbgQPa9dpcOBttmm22K6c/PUp/u3ADnd2iVrSKFc1vt+3iFByI+wlgwrhmdiXF9cVRCuR+IbLvFt73tbWWsShEyZIvQdWK8hjARKFioj8wQ5RtpkzGY282lqsisDcP1iQpjor/FBwykusGXSZbB04Sq0Y3achELIbmhVLHvd/aGEyHlxwerGPEc6tcJHo8nROr+IwSHjn31QWFD/bzREPERxgvPkUoo94joIC+I0nNpRIKbaU9zM94RZtYYVUOvI8Jn0ymlztivDYNqyOEEiLmdZ0+nVePeYXnDFRCEMdH/4qPGYi8cZ/AZTATHaMJpKlp8/0i/x+OErIkRl7+P5ueNlIiP0CncI+4LXXeV5WrfvsMOO5QdpLSM9IxJXBibEFfe617qxrgOYbyIUB988MGl8kVBgWIAKXSbQ/6/1g2gOVpna5tEHVVFyY1/ojzjuytMHvHRr0R8hG5gwiXURQb5Pxiz9cxRQaZiRjWBMefMIiFtPqj4Q0IvYSwS0krLpRT1Q9L/Q8qdJ08kT6RPNFxDR1WPBIruqlLtg6XiQ0eI+Gg6ER+h24j61UZVQsPEzUMlEkKIMKoSJjpQXnvttcVgHX9I6AUIEJ4NBQYqEkU1+PecOu6gO6kVjcgUAjgjiRgxzodLxYdxE/HRdCI+wkRCVDCqyos7JoBR1TkbSseV7prQmasdG2DC99jsHsPMhkeJCOG5Y0ZVVu7EaGNYlOO2224r1V0RHRNGxEfTifgIMwMTNA+Uk0WVlDtVV1fh+sRdZlU7StVe8ug5cTf0CsSwaB4h7SJMMi4nnIiPphPxEWY2tRBh8HPSqGPPt99++9K4z5EFet+su+66xahqp6m/TfwhIUxqIj6aTsRH6DUIi9qoevjhh1ebb7558Yc4cbc2qurue8UVV5RQt/LGCJEQJhURH00n4iP0Mkpx9caRYyc41l9//WrRRRctY9ZZM1q9Eyg33HBDaWQmghIhEkLfE/HRdCI+QhOQZ1e66Cj0s88+u6RgnLmkfwh/iAoEPUX0VtDsTGO/VMyE0LdEfDSdiI/QNIgKZ23ceuutpdeCczicr0SI6Eg5ZcqUcoyBskdnIjljIx1VQ+grIj6aTsRHaDI6TT7xxBMl7eLYA+ciOXhR2a4DGjfYYINSzqvN9SOPPFIqZlK6G0LjifhoOhEfoR/g8+APUQnDiOpkXQcxEiAiIipnGFe1y3ZuEsGSipkQGkvER9OJ+Aj9hh4MmpPdd9991YUXXlgdcMABpVRXSsaJu7pTbrvtttVnP/vZUtorhRN/SAiNIuKj6UR8hH5G9cuzzz5b3XHHHdXpp59e7bnnnqUltooZl9N3eUYcGFYbVeMPCaHnifhoOhEfYbIgzeLcmFtuuaWIjZ133rkYVflDREUcHkacnHHGGcWo6qTSpGVC6EkiPppOxEeYbDCc/uEPfyi+j+uuu66kX/QLYVR1LyyxxBLVhhtuWO2///7VJZdcUj366KPxh4TQW0R8NJ2IjzCZkWJhVH3ooYeqyy67rBhS3QtaujtjZumlly5HqDOwXnXVVTlxN4TeIOKj6UR8hPB/MKrqCSLlojS3PnFXtYx7RIpmu+22q4488siSusmJuyHMNCI+mk7ERwj/jIgIoyoTqmZlmpatvPLK1UILLVQqZphWGVVPOumk0nVV9CRCJIQJI+Kj6UR8hDA00izSLTfffHP1hS98oXr/+99f0jGEiPTM2muvXe21117VOeecU9I3aWQWQteJ+Gg6ER8hjBwn6P7gBz8oJ+5OnTq12mqrrUojM0LEibubbLJJdeCBBxb/yOOPP146sMaoGkLHifhoOhEfIYyeuqPqAw88UISG+0iFzGKLLVZKd5dbbrlqyy23rD7zmc+Uipqf/OQnOfo/hM4R8dF0Ij5CGB9SLMynd911V0m9fOQjH6nWWGON0sSMP2SllVYqqZpjjjmmHIbHS5KKmRDGRcRH04n4CKFz6KiqXfttt91WnXzyydWuu+5arbjiitUiiyxSGpm9853vLP/na8RKTtwNYUxEfDSdiI8QOo/0yp/+9KfqRz/6UXXjjTeWqIcy3WWWWaaU7i6++OLVeuutV330ox+tzj///JK+ScVMCCMm4qPpRHyE0F1qf4hOqV/5yleqww47rNpiiy2qN7zhDUWI6KzqBN5PfvKT1eWXX16MqumoGsKQRHw0nYiPECaOupHZ9773veqiiy4qlTHrr79+9drXvrYIEUbV9773vdURRxxRIiZKfKVyQgj/QMRH04n4CGHmQFQ899xzpUnZWWedVe2zzz7FE/KKV7yiGFVXWWWVascdd6w+//nPV9/4xjeKqTX+kBAKER9NJ+IjhJmL9IoyXEZV1TC6puqeyqiqbFf57pQpU0qX1dNPP7265557cuJumOxEfDSdiI8QeofaqPrDH/6wuv7666ujjz66GFXf/OY3l0ZmjKr6iTh3xvkzDz/8cBEuIUwyIj6aTsRHCL2Jyhet2mujqoZlm266aWnp/uIXv7h64xvfWL3rXe+qPvWpT1VXXnllTtwNk4mIj6YT8RFC70OI/OY3v6nuu+++YlQ94IADqnXXXbf0D3nJS15SvfWtb6222Wab0vL9a1/7WvXzn/+8mFtD6FMiPppOxEcIzYIQef7556s77rijGFX33HPPYk4lQoiRVVddtRhVHYLnMb/+9a9jVA39RsRH04n4CKG5iG44N6Y+cZfoUK678MILl46qa621VhEnZ555ZinvTSOz0CdEfDSdiI8Q+gNGVQ3Krr322upzn/tctfXWW5dGZu5vf2600UbVxz/+8eqSSy6pHnvsseoPf/hDhEhoKhEfTSfiI4T+ou6o+uCDD04/cXfjjTcujcyU7mrx7sTdT3/609U111xTWsCno2poGBEfTSfiI4T+hdeDP+Tuu++uzjvvvOpjH/tYteaaa5beIZqZ6SXyvve9rzrqqKOqr3/969UzzzyTjqqhCUR8NJ2IjxAmB0QFcXH77bdXp556avXhD3+4mFOJEGJk9dVXLyfufvGLXyxGVaIlRtXQo0xO8SGk+eMf/7jkWLsBE9nPfvazcuT2DTfcUHK4juh+4oknOh4ejfgIYfJh7jKH3XTTTdVxxx1X7bDDDsWo6nyZ173uddU666xT2r2fffbZMaqGXmRyiA+LPXOWroOEgKY+73//+6tHHnmkozekn/P000+XI7Z32223aquttqq23XbbUr+/+eabl/DokUceWX5up0KjER8hTF7MX1q1/+AHP6iuvvrq6vDDDy9+EA3M+EOWXHLJapNNNqkOOuig4h/5/ve/X4TLRPhDfvnLXxZjrC6uAy9zoNfCYGve0mDNOTkx0U4a+l98aF184YUXltMnCYGVVlqpLNbzzjtviUZ0cqC7mfwcOxAlcoceemh18cUXV5deemk5XOrd7353tdRSSxUR4jCqv/71r9O+c+xEfIQQIMWikdkDDzxQ5hxH/NdG1Ze+9KXVsssuWypozEs2Yd3sqErcOOfGa7DRs/nabLPNpl86u5oPbdBszjxGymj//fevTjjhhOJfcRBfhEjf0v/i449//GOpn3eo0wc+8IFy6uT8889fzTnnnOWkyU4NbqpdGdwrX/nKaoUVViiiw80jBeOi6OVhiQQTAQFC/Y83JxvxEUIYCFHB8yH1e84551T77rtvtcYaaxR/iNQMo6oF/9hjjy0iodP+EOLDZuzyyy8vURcCaLbZZquWWGKJaq+99ioC6LDDDist5w855JCyafvQhz5U0kXOwfFanX/jtZnDQ9/R/+LDDfXkk0+WG8FFiBAInRYfOhWqxV9wwQWrz372s0V4DIQIccaDG1AToWOOOaZ0LxwPER8hhMEgAqR4pYPNdyeffHKJMIgA66i66KKLlg2Z//M1YqVTJ+6aW4kgkRg/Y4455iiVOlrMO/PG5WeJ1mgnL3WktTxRUp8ITIzoa8KzEvqKyWc4veKKK4ohq5Piw65BnlUqR8pFSoXQaIcbjVCYa665yo14//33j2vHEfERQhgJBIU0tL4gX/3qV0vUw4m7/CEOuhOdWG+99UqUhG/NgXidOHFXemeDDTYoc67zbPhABsN8/Ktf/arM01OmTClR6re97W2ln0kiIH1FxEcnxAfviHzqrLPOWlzn2iUPxcEHH1wEg/TLl770pUGrbry24S7mWc/FVKaapt1jWq9O7GhCCM3GPGDeEQ12oq5oA18GASJ6y5vGm/GJT3yizJkqa3jUxjJ//PSnPy3dWW24hhMfNaoCpWzMqyImvCsiKJ1MDYWZSsSHBXm8nHbaaaXO3k2iLfJwqRRhRK9h9tlnr4444oii9Afy29/+tuw+pGaGutzM8803X/WmN72p5FbbPab1uu6660qoM4QQQFBIayjJNTcRHCIgL3/5y0tqZvnlly9GVZU0IiaqWEYzb45FfMBr4vvwGkRAmPbHm6YOPUPERyfEhzbHog8vetGLSl29XOZQ3HLLLcVUNcsss5RGQRoHDaQOVb7qVa8a8lpggQVKxGWeeeYpZrJ2j2m9HFIl/xtCCAMhRPjVpI752Pbee+/SvEyU1om7PBjf/va3R1UlM1bx4bXceOONxUtnidp0001LpGYs0ZfQc0R8dEJ8UOcLLbRQESBK3IZrXubGtpsgGpT/EhoDEQ2Rk/XcQ12O4iY8/E4777xz28e0XhdccEF2DyGEYSEwCAcVJyeddFK1yy67lLSyCMlo0h9jFR+QwmY+tVHTs8Rr6VZ5cJhQek98ULXKUhkzLZKjvTi7h1LG3RQf3NmeX75yKFrFB8NXO/HBsGoHolPqUBdzmMoZN7VS3naPab28r8mbhhBGgzlNk8aHHnpo1MbP8YgPqRfGU2W6oi9XXXXVsPNraAS9Jz4MLKkLByhpDzza69577x2ye2g3xIc6dVEPuUk50+FuTg106rSLErfxpEFS7RJC6GXGKz5UBRIf5jnm2IiPvqD3xIeUhbMKtt9+++q9733vqC+HLg3VObQb4uOUU04pvUOU2vr7cIZOFS6LL754uaH4Rdr1BBkpER8hhF5mPOJDtHbllVcuG7VXv/rVxfDaqaMpwkyl98SHlIBF9Lvf/W6JYoz24pUYSlB0Q3wwkC699NKleuWAAw4oDXOGgmtcikaqhgdDmmmsRHyEEHqZ8YiPb37zm6WSzxL1jne8ozQoS9q4L4jhtBPi49lnny1O7Lnnnru4wYdyZBMaW2yxRXns29/+9uqee+4ZtCHZSIj4CCH0MmMVHxqcaUWgyoY/zrkvIiGhL5h84kPjGo109OTgnB6J+CAOtP4VjWFqHfg9lLjWxK95zWvKjXLuuee2Lbf1fddff31p4KORz9SpU8eVckHERwihlxmL+LB5Y6Dn9/B9IstSLp04jDP0BJNLfBjQZ555ZmkIRklr2Ttc/tD36GC60047lRuIH0VaZWBkQ0mYnh0c2W4YN0prya3yMOcm6CIo3aLK5cEHHxxX1AMRHyGEXsbcuOGGG45YfNikKefdcccdSyWf+e3oo48ux1gMFlEOjaP/xQdxwYTqQDenO0qPaAbmV3ayrEY6vqaErN05BsTBkUceWbr9MT2tvfba1cMPP/xP0Q//lo8kQERA3GS+T2mYrqLHH398EQi+5jRJqr4T5yZEfIQQepnHH3+8WmuttUq0eTDxYS4kLmzIdHZWPMAXx2TqWH7t3QfOuaHR9L/4EH1QgSJf6Fh9kQetg90E7373u6s99tijHIUvCtKuSsWAv+mmm8r3OQnSUdDyju0UuPQLv4eGPCIbziPg79CamDjQUEzjMOKlU+HDiI8QQi9CdNh8OS7fpku0md/OPOx8q/pyLIQ2CSId5jFtCHQ1NXeau0VOYjLtO/pffIhcWOw19hJtGOyirAdLwejbceeddxYR4kYYKlVClHi8n3nDDTeUjqdKa/2dqucF6WToMOIjhNBrmONEnB1YR1SIOEtb+3Orrbaq3vOe90y/bAKdCm7DZjPoey688MKSemHQT6qlL5l8htN+I+IjhNCLPPfcc9X9999f3X333UNeKv6Y+R955JGyuSM4kmLpeyI+mk7ERwghhIYR8dF0Ij5CCCE0jIiPphPxEUIIoWFEfDSdiI8QQggNI+Kj6UR8hBBCaBgRH00n4iOEEELDiPhoOhEfIYQQGkbER9OJ+AghhNAwIj6aTsRHCCGEhhHx0XQiPkIIITSMiI+mE/ERQgihYUR8NJ2IjxBCCA0j4qPpRHyEEEJoGBEfTSfiI4QQQsOI+Gg6ER8hhBAaRsRH04n4CCGE0DAiPppOxEcIIYSGEfHRdCI+QgghNIyIj6YT8RFCCKFhRHw0nYiPEEIIDSPio+lEfIQQQmgYER9NJ+IjhBBCw4j4aDoRHyGEEBpGxEfTifgIIYTQMCI+mk7ERwghhIYR8dF0Ij5CCCE0jIiPphPxEUIIoWFEfDSdiI8QQggNI+Kj6UR8hBBCaBgRH00n4iOEEELDiPhoOhEfIYQQGkbER9OJ+AghhNAwIj6aTsRHCCGEhhHx0XQiPkIIITSMiI+mE/ERQgihYUR8NJ2IjxBCCA0j4qPpfP7zn6/e9ra3VR/84Aerp556atr/hhBCCD1LxEfTOfPMM6tNNtmkOvDAA6tnnnlm2v+GEEIIPcs/iI/XvHB9OlezriOPPPLTb37zmz+9ww47fPrJJ59s+5hcuXLlypWrh65Zp0mPEEIIIYSJ4F/+5f8DHOIxo5p2KrcAAAAASUVORK5CYII=)
- OA
- OB
- OC
- OD
The correct answer is: OB
Related Questions to study
The alkyl halide is converted into an alcohol by
The alkyl halide is converted into an alcohol by
How much quantity of electricity has to be passed through 200 ml of 0.5 M CuSO4 solution to completely deposit copper
How much quantity of electricity has to be passed through 200 ml of 0.5 M CuSO4 solution to completely deposit copper
So here we used the concept of integrals of special functions and simplified it. We can also solve it manually but it will take lot of time to come to final answer hence we used the substitution method to solve. The integral of the given function is .
So here we used the concept of integrals of special functions and simplified it. We can also solve it manually but it will take lot of time to come to final answer hence we used the substitution method to solve. The integral of the given function is .
So here we used the concept of integrals of special functions and simplified it. We can also solve it manually but it will take lot of time to come to final answer hence we used the modulus function to solve. The integral of the given function is
So here we used the concept of integrals of special functions and simplified it. We can also solve it manually but it will take lot of time to come to final answer hence we used the modulus function to solve. The integral of the given function is