{"group":{"id":1,"name":"Community","lockable":false,"created_at":"2012-01-18T18:02:15.000Z","updated_at":"2026-04-06T14:01:22.000Z","description":"Problems submitted by members of the MATLAB Central community.","is_default":true,"created_by":161519,"badge_id":null,"featured":false,"trending":false,"solution_count_in_trending_period":0,"trending_last_calculated":"2026-04-06T00:00:00.000Z","image_id":null,"published":true,"community_created":false,"status_id":2,"is_default_group_for_player":false,"deleted_by":null,"deleted_at":null,"restored_by":null,"restored_at":null,"description_opc":null,"description_html":null,"published_at":null},"problems":[{"id":57492,"title":"Compute the Tetris sequence","description":"In the Tetris sequence, which starts with a 1, the next term is the smallest positive integer not already in the sequence that has no common 1-bits with the previous term. The first five terms are 1, 2, 4, 3, and 8 because the binary expansions 0001, 0010, 0100, 0011, and 1000 have no common ones among consecutive terms, and they are the smallest numbers with that property not already in the sequence. \r\nThe discussion of this sequence involves odd gaps in the plot of the terms  (say) as a function of their position  in the sequence. A plot of  vs.  (below) makes one think of the Sierpinski gasket. Neil J.A. Sloane uses this resemblance to propose using “facial recognition” to connect sequences.  \r\nWrite a function to compute the th term of the Tetris sequence.\r\n","description_html":"\u003cdiv style = \"text-align: start; line-height: 20.4333px; min-height: 0px; white-space: normal; color: rgb(0, 0, 0); font-family: Menlo, Monaco, Consolas, monospace; font-style: normal; font-size: 14px; font-weight: 400; text-decoration: rgb(0, 0, 0); white-space: normal; \"\u003e\u003cdiv style=\"block-size: 539.7px; display: block; min-width: 0px; padding-block-start: 0px; padding-top: 0px; perspective-origin: 407px 269.85px; transform-origin: 407px 269.85px; vertical-align: baseline; \"\u003e\u003cdiv style=\"block-size: 84px; font-family: Helvetica, Arial, sans-serif; line-height: 21px; margin-block-end: 9px; margin-block-start: 2px; margin-bottom: 9px; margin-inline-end: 10px; margin-inline-start: 4px; margin-left: 4px; margin-right: 10px; margin-top: 2px; perspective-origin: 384px 42px; text-align: left; transform-origin: 384px 42px; white-space: pre-wrap; margin-left: 4px; margin-top: 2px; margin-bottom: 9px; margin-right: 10px; \"\u003e\u003cspan style=\"block-size: auto; display: inline; margin-block-end: 0px; margin-block-start: 0px; margin-bottom: 0px; margin-inline-end: 0px; margin-inline-start: 0px; margin-left: 0px; margin-right: 0px; margin-top: 0px; perspective-origin: 378.833px 8px; transform-origin: 378.833px 8px; unicode-bidi: normal; \"\u003e\u003cspan style=\"\"\u003eIn the Tetris sequence, which starts with a 1, the next term is the smallest positive integer not already in the sequence that has no common 1-bits with the previous term. The first five terms are 1, 2, 4, 3, and 8 because the binary expansions 0001, 0010, 0100, 0011, and 1000 have no common ones among consecutive terms, and they are the smallest numbers with that property not already in the sequence. \u003c/span\u003e\u003c/span\u003e\u003c/div\u003e\u003cdiv style=\"block-size: 63px; font-family: Helvetica, Arial, sans-serif; line-height: 21px; margin-block-end: 9px; margin-block-start: 2px; margin-bottom: 9px; margin-inline-end: 10px; margin-inline-start: 4px; margin-left: 4px; margin-right: 10px; margin-top: 2px; perspective-origin: 384px 31.5px; text-align: left; transform-origin: 384px 31.5px; white-space: pre-wrap; margin-left: 4px; margin-top: 2px; margin-bottom: 9px; margin-right: 10px; \"\u003e\u003cspan style=\"block-size: auto; display: inline; margin-block-end: 0px; margin-block-start: 0px; margin-bottom: 0px; margin-inline-end: 0px; margin-inline-start: 0px; margin-left: 0px; margin-right: 0px; margin-top: 0px; perspective-origin: 230.658px 8px; transform-origin: 230.658px 8px; unicode-bidi: normal; \"\u003e\u003cspan style=\"\"\u003eThe discussion of this sequence involves odd gaps in the plot of the terms \u003c/span\u003e\u003c/span\u003e\u003cspan style=\"vertical-align:-5px\"\u003e\u003cimg src=\"data:image/png;base64,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\" alt=\"a(n)\" style=\"width: 29.5px; height: 18.5px;\" width=\"29.5\" height=\"18.5\"\u003e\u003c/span\u003e\u003cspan style=\"block-size: auto; display: inline; margin-block-end: 0px; margin-block-start: 0px; margin-bottom: 0px; margin-inline-end: 0px; margin-inline-start: 0px; margin-left: 0px; margin-right: 0px; margin-top: 0px; perspective-origin: 110.458px 8px; transform-origin: 110.458px 8px; unicode-bidi: normal; \"\u003e\u003cspan style=\"\"\u003e (say) as a function of their position \u003c/span\u003e\u003c/span\u003e\u003cspan style=\"font-family: \u0026quot;STIXGeneral\u0026quot;, \u0026quot;STIXGeneral-webfont\u0026quot;, serif; font-style: italic; font-weight: 400; color: rgb(0, 0, 0);\"\u003en\u003c/span\u003e\u003cspan style=\"block-size: auto; display: inline; margin-block-end: 0px; margin-block-start: 0px; margin-bottom: 0px; margin-inline-end: 0px; margin-inline-start: 0px; margin-left: 0px; margin-right: 0px; margin-top: 0px; perspective-origin: 21px 8px; transform-origin: 21px 8px; unicode-bidi: normal; \"\u003e\u003cspan style=\"\"\u003e in the sequence. A plot of \u003c/span\u003e\u003c/span\u003e\u003cspan style=\"vertical-align:-5px\"\u003e\u003cimg src=\"data:image/png;base64,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\" alt=\"a(n+1)\" style=\"width: 54px; height: 18.5px;\" width=\"54\" height=\"18.5\"\u003e\u003c/span\u003e\u003cspan style=\"block-size: auto; display: inline; margin-block-end: 0px; margin-block-start: 0px; margin-bottom: 0px; margin-inline-end: 0px; margin-inline-start: 0px; margin-left: 0px; margin-right: 0px; margin-top: 0px; perspective-origin: 12.825px 8px; transform-origin: 12.825px 8px; unicode-bidi: normal; \"\u003e\u003cspan style=\"\"\u003e vs. \u003c/span\u003e\u003c/span\u003e\u003cspan style=\"vertical-align:-5px\"\u003e\u003cimg src=\"data:image/png;base64,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\" alt=\"a(n)\" style=\"width: 29.5px; height: 18.5px;\" width=\"29.5\" height=\"18.5\"\u003e\u003c/span\u003e\u003cspan style=\"block-size: auto; display: inline; margin-block-end: 0px; margin-block-start: 0px; margin-bottom: 0px; margin-inline-end: 0px; margin-inline-start: 0px; margin-left: 0px; margin-right: 0px; margin-top: 0px; perspective-origin: 237.267px 8px; transform-origin: 237.267px 8px; unicode-bidi: normal; \"\u003e\u003cspan style=\"\"\u003e (below) makes one think of the Sierpinski gasket. Neil J.A. Sloane uses this resemblance to propose \u003c/span\u003e\u003c/span\u003e\u003ca target='_blank' href = \"https://sites.math.rutgers.edu/~zeilberg/EM22/C27.pdf\"\u003e\u003cspan style=\"\"\u003e\u003cspan style=\"text-decoration-line: underline; \"\u003eusing “facial recognition”\u003c/span\u003e\u003c/span\u003e\u003c/a\u003e\u003cspan style=\"block-size: auto; display: inline; margin-block-end: 0px; margin-block-start: 0px; margin-bottom: 0px; margin-inline-end: 0px; margin-inline-start: 0px; margin-left: 0px; margin-right: 0px; margin-top: 0px; perspective-origin: 73.9px 8px; transform-origin: 73.9px 8px; unicode-bidi: normal; \"\u003e\u003cspan style=\"\"\u003e to connect sequences. \u003c/span\u003e\u003c/span\u003e\u003cspan style=\"block-size: auto; display: inline; margin-block-end: 0px; margin-block-start: 0px; margin-bottom: 0px; margin-inline-end: 0px; margin-inline-start: 0px; margin-left: 0px; margin-right: 0px; margin-top: 0px; perspective-origin: 1.94167px 8px; transform-origin: 1.94167px 8px; unicode-bidi: normal; \"\u003e\u003cspan style=\"\"\u003e \u003c/span\u003e\u003c/span\u003e\u003c/div\u003e\u003cdiv style=\"block-size: 21px; font-family: Helvetica, Arial, sans-serif; line-height: 21px; margin-block-end: 9px; margin-block-start: 2px; margin-bottom: 9px; margin-inline-end: 10px; margin-inline-start: 4px; margin-left: 4px; margin-right: 10px; margin-top: 2px; perspective-origin: 384px 10.5px; text-align: left; transform-origin: 384px 10.5px; white-space: pre-wrap; margin-left: 4px; margin-top: 2px; margin-bottom: 9px; margin-right: 10px; \"\u003e\u003cspan style=\"block-size: auto; display: inline; margin-block-end: 0px; margin-block-start: 0px; margin-bottom: 0px; margin-inline-end: 0px; margin-inline-start: 0px; margin-left: 0px; margin-right: 0px; margin-top: 0px; perspective-origin: 98.6583px 8px; transform-origin: 98.6583px 8px; unicode-bidi: normal; \"\u003e\u003cspan style=\"\"\u003eWrite a function to compute the \u003c/span\u003e\u003c/span\u003e\u003cspan style=\"font-family: \u0026quot;STIXGeneral\u0026quot;, \u0026quot;STIXGeneral-webfont\u0026quot;, serif; font-style: italic; font-weight: 400; color: rgb(0, 0, 0);\"\u003en\u003c/span\u003e\u003cspan style=\"block-size: auto; display: inline; margin-block-end: 0px; margin-block-start: 0px; margin-bottom: 0px; margin-inline-end: 0px; margin-inline-start: 0px; margin-left: 0px; margin-right: 0px; margin-top: 0px; perspective-origin: 94.1167px 8px; transform-origin: 94.1167px 8px; unicode-bidi: normal; \"\u003e\u003cspan style=\"\"\u003eth term of the Tetris sequence.\u003c/span\u003e\u003c/span\u003e\u003c/div\u003e\u003cdiv style=\"block-size: 344.7px; font-family: Helvetica, Arial, sans-serif; line-height: 21px; margin-block-end: 9px; margin-block-start: 2px; margin-bottom: 9px; margin-inline-end: 10px; margin-inline-start: 4px; margin-left: 4px; margin-right: 10px; margin-top: 2px; perspective-origin: 384px 172.35px; text-align: left; transform-origin: 384px 172.35px; white-space: pre-wrap; margin-left: 4px; margin-top: 2px; margin-bottom: 9px; margin-right: 10px; \"\u003e\u003cimg class=\"imageNode\" style=\"vertical-align: baseline;width: 346px;height: 339px\" 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9wAAAHaHEIilXfvg7ujK2x+PXn/vk9HPP/xi8iwM183P7le/h9ffu13d5jEAAMCuEAKxlARAb/3i7riS+6AKgOr7KrwM2/UPv6x+D+V3kccAAAC7QgjEUj6/f7K7S7q/3Pz0weQRDE9C0HYQ2vUcAADAtgiBWJnzTz81uQfDc/7o7Hg6+RvI4zwPAACwC4RALOXqxWdGl58/V91P+PPDi89WEwxVfgdXx7+BEoa2HwMAAGzbmW/GJve37vj4eHTnzp3JI3Zd1QVs0tVFAAS18ru4/PyRAAgAAAZiX/IMIRAAAADAKexLnqE7GAAAAMAACIEAAAAABkAIBAAAADAAQiAAAACAARACAQAAAAyAEAgAAABgAIRAAAAAAAMgBAIAAAAYACEQAAAAwAAIgQBW7N5XX4+ufXB3dOXtj0evv/fJ6OZn9yevAAAAbI8QCGDFfv7hF6O3fnF3dPOzB9V9QRAAALALhECsVVpEpBKcVhG5bSqtJZotJtrzwD661Qp88l1/a/w9zy0AAMC2CIFYq7SGSLiT20wl5Ell+PX3bj96vtliIqEQHJp797/WGggAANgqIRBrkwpvs9Kb4Of6JASqX3tQ3W9LKwotJthnVy8+O7l30vmnn5rcAwAA2DwhEGsjyGGoLj9/NJ7OTR7V6ueOJo8AAAA2TwjE2rQrvWkFcWnyuKuSHGUeLSbYZ/n+pjVQvuO5n9tLre+7kBQAANi0M9+MTe5v3fHx8ejOnTuTRxyCVHQz1s/n97+uKsE/bHSTqbqEffqgeu25o6c654F9lu//vfsPT4SheS7jYN376mH1OGGR7zwAAOy3fckzhEAAG9S+Cl5aCb356oUTQREAALBf9iXP0B0MYINKC6AiA6TrGgYAAGyCEIi9kJYTuXR8swUF7KPzT5+d3KtlzKBMgiAAAGDddAdjJ5XxgorrH31RVZKrCvPRU6Mbb7w8eQX2S77bb31wt2oBVA8aXXcDy/P5bhsjCAAA9o8xgZYgBCKaleQuqTi/+f0LKsrsrQSaVegz/i5f//DLJ8YIeve1F6vXAACA/WBMIFhSKsV9AVCkAn1ryuuw6xLwJMQ8f3R2/H1+coygBEQAAACrJgRi57QrxXCoEgYZIwgAANgUIRA759Kcl8q+8vbH1ZQBo2FfXb34TNUFrIQ/V195tmoN9/p7t6vvt8HQAQCAVTEmEBuXSm3pznVpXPntGtsnwc6tasyUs9U8ze5f6SrTbiXx7mvfM0YQeyvf53v3H1bdw976xcmr4CUgevPVC48GkAYAAHaPgaGXIAQ6fKncppJbQpy0fEiAM28Ft/33RZZjsGgOQVr/tMfEEgQBAMBuMzA0BystcdJSJ4HMouOWpEVP829yv3kp+La8x+vvfVJNud/++yLPtVtQwD5qjxEUCYXKbwAAAGBZQiAWUkKZBC51OHN74SCo7fP7X1ehUvuKSHlcgp1Ms0KerMf18eunXR/YpjJGUJugEwAAOC0h0B5JKJIK4DZDjnZLnLqFwu0nApw+7QpuunGVgKe0+CnSQqj5XvN87nv3v67Wx2DR7Kt0+Xr3tRd7g6AEnQAAAMsQAu2JEpCU1je71BqgdFWZJ6RJBTdjm5SBnNshTwm6llUv48Ho+kdfzB1Mwa6pxrga/05y25agc57fGgAAQJsQaA8kFEmgUSp+CTmaV8vapFypq0vWbd7wJkFQAqCuZWU5paVD5umqBM8jy1FRZp9Vgen3nwyC8vyyvwsAAGDYhEB7oCvQuPfVw62EHAlmVnUFrlRku7q8RD5bXr/xo5eXqvCqJHMI8ltLEJTfSb7TeZwulQAAAMsQAu2BVP7aoUauILStoKO+pPvJ8KZrHWdJi4arHYFS87Plti8Ias5TLg+f+5muvrK6sAq2Kd/jG2+8XP0O6t+ey8QDAADLOfPN2OT+1u3LdfW3IQMd30qXsPtfT8KTDLC83cpgWaeENunatWzokm5k9YDTD6tldXWBScugDB4dzx3VLSLu3a9bQ2Xesi3Sbe780fYCMgAAAIZnX/IMIdAeKd2/BBwAAACwO/Ylz9AdbI8k/BEAAQAAAMsQAgEAAAAMgBAIAAAAYACEQAAAAAADIAQCAAAAGAAhEAAAAMAACIEAAAAABkAIBAAAADAAQiAAAACAARACAQAAAAyAEAgAAABgAIRAAAAAAAMgBAIAAAAYgDPfjE3ub93x8fHk3mx37tyZ3AMAAABYrUUyitiHnGLnQiDhDgAAALBP9iXP0B0MAAAAYACEQAAAAAADIAQCAAAAGAAhEAAAAMAACIEAAAAABkAIBAAAADAAQiCAJf38wy9Gr7/3yejaB3dHNz+7P3kWAABgNwmBAJaQAOitX9x9dPuWIAgAANhxQiCAJdz67MHo3ldfTx6NRjfHj29++mDyCAAAYPcIgQAAAAAGQAgEK5bWIc0WIhymqxefGZ1/+qnJo9Ho8vPnRpdfODd5BAAAsHvOfDM2ub91x8fHozt37kwewf7JAMG3JuPCXHr+aHTt1QvVfQ5TxgAqXcASAF0e/5sDAADDsy95hhAIVqRcKarp3de+N/rhxWcnjwAAADhE+5Jn6A4GK5KBgtty1ai0DgIAAIBtEwLBijx39Hh8mCJjAwmChi3fgXQbW3ScqKqrmUvOAwAAKyQEglNIF7AEPLMq69c/+sJg0QNUdxG8XXUTzG0ezyPfqfpv6sl3BwAAWAUhECwpFfW08sl05e1fVbd9UolPCKAyPxz5t77+4Rejm589qO7nNo9nfQcSFJXQMFMezxseAQAATCMEgiWk5c+irXsSAqjMD8e9+w/H08nvRx7n+WlK+NP0eWs5AAAAyxACAazB+aOz4+nkOFF5nOenOf/0eJ7x1NQ13hQAAMCihECwhMvPH1VTW7vy3pTXLr9wbvKIQ5d/76sXnx1/T87V//bj2zye9h2JH47nufrK47/L40wAAACndeabscn9rduX6+pDpMtOGQcoLTVSUU83sVwqPo/bXXiuXnymMzjisFXdu+4/rFsGzQiAmkqXsEX+BgAA2I59yTOEQAAAAACnsC95hu5gAAAAAAMgBAIAAAAYACEQbFHGEMpl49uXBAcAAIBVEwLBliT8ef29TybT7eoxAAAArIsQCLYgLX+uN1oA3fzswYnHAAAAsGpCINiCXDL8XusS8u3HAAAAsEpCINiCy88fjc4fPTV5VKuee/rkcwAAALAqZ74Zm9zfun25rj6sQgaFvv7hl6N7Xz0cnX/67OjqxWeq5/NcXHr+3OiHF5+t7kOX8h0K3xcAANiefckzhECwZRkHKC2AUqF/64O71fhAkefe/P4FFXs65fuSQcXLOFK+LwAAsD37kmfoDgZbVrqA3fz0waMAKMrg0blq2LUP7rp6GCfk+9IcSDz3bzW+PwAAAG1CINhhCYXS2uOtX9ytpoRB0Ke0DhIYAgAAXYRA0CMtK5otLdap633ag0RnnusffVFV8iHdvi4/f27yqJbvSAKgBIaCIAAAoE0IBB3S4ub1926Prrzz8YlxV9YhlfW8VwKepq73LJV8LYJISPjuay9W4wB1BYbr/M4CAAD7SQgELQlZEsikK1YJXdbZqiLj/pT3mtetz+5P7jFkCX+uvXphdPUVg0EDAACzCYGgpasVxef319OqQmsNVuHyC+dOdA3LfVcJAwAA2oRA0JLWFe3uNc8dnXy8KvV7nZ08mt+l548m9yChz1HVNezd1743mV584jvcJ4NJp3thptwHAAAO15lvxib3t25frqvP4UuFuIzRkwp217grq5KuZrm0dyrg54+eqgKevFe6id27/3X1/uW1SGhUQqm6BYhAaJ+ULoZpXZZ/x7TYWdd3a5Z8r668/avJozLO0Pd8pwAAYEH7kmcIgaBH1S3s/sONVYjroOfso0CgdBXL49wvt80rP+W5BFS6/uyP9iXc03XrxhsvTx5tVtfl5PN9yjhDAADA/PYlz9AdDHokYNlki4i8VwmAIvfL43KboKhZaU8oVA8sff9RaMTuyr9Tpqa09lr3Fei65P3a6wIAABw2IRDsuRIilMvZt1t2sNsSxuTfbNOBTFqUdQVP6WIIAAAcJiEQ7Ih5WoKktVDzKlCRvytTwoRU7q+8/fHkVXZJ/v36Luc+z7//qtTfl4eTR4+lW+EmW78BAACbJQSCJSVwqVrgvP1xNZD0spX4spzX37tdLWtaS550C7s6Y/yfqoI/aR3E7sl4O+0xnPLvugstcK5efGZyDwAAOERCIFhCuu5kLJ66G8+DE4M1LypXBivLyVRdFeyUrULy91nHZdeJ9coVuDIAc1p1JRCq72+uBU4ZY6pp0+sAAABsnhAIllCHLA8mj2q3lhjTpYQ1TXUY1L+sVOC7KvFtWXbCqbRSYvekRVCuCpZAaNNXd0s4mNZiTfN8pwAAgP0mBIIltSvN558+O7k3vyrQOWovZ3rIs0hrjRIEGSOIpnwvMjW1HwMAAIdHCARLKAPolrAmt88dPfWoC1bV0mLOSnXG+CmDPTdDobTgydTVKqhrcOH2gNFNaV1kjCAAAIBhO/PN2OT+1h0fH4/u3LkzeQS7LwHN9Q+/rG4T+iTEKeFPGetlWqueIn+TZZR5r7z9q+o28lxCn3QfisyXQKcdMqVbUfSFPe3lMFz5Dr1VBYx1l8YEiAkjy3cq35VNd1EDAIB9ti95hpZAcAqla1apPDeDmbQGyhW/2mFNl1LpzvJufnpyrKH8/fWPvpg5tk8GmJ5WeS/L0TWMfM/efe3FKjispxerAcnTdbBMWo4BAMDhEQLBKd376uHk3pPS0uLKOx/PFQRN0wyCUoEv4VNTad0xbX2ynAwILAiiBIaZ8t1pDnSe70n93OKDnQMAALtLCAQtqfimFc88FeBUlmcNCJ15EgTNW6FO5TxTWwmC0kIj3czaLX7qint9mflpMl+CIC09mKb6nownAADgcBgTaMcljEg3n6YMQJwAoCsoYHkJaUowkspv2b594+ikVU4uCz8rdCmyvBs/enmuf7f8u6dLTlclPH+flkAJgrLO6cYz7zo0ZTnGCCLyPUvXxeb3KN+PrrARAAB4kjGBOLVU8BMEJBBoTuU5VisDPDdbP5T7XePxZPvn+UXClyxr3n+3VLwzVktXYFSvV93lqw4DF780fWQ5n9/X0oNJIDj+LmWA6NzPlKBRAAQAAIdFCLTDMkBwKupd0gKl7zUW1wxW2rrCknr+xbf/IqFLae3TJeFT6V529eIznWERLKIOHl+svnNlwGgAAOCwCIH2mIr/6tStH+ZvUbPstk9XvkWkYp5Kefv96vWtn0tY1NVqKK06mi072urLgj8zeQT19yrfua6BxwEAgP1nTKAdlpYmzXE6UkHLc7k1VsfqVV28xlMGTW628qnDkvoqSk0ZPyitcTJvHbacHd9/+OjfK89lWXH+qA6ZugKdeTTXLbrG8sl6ZL60NkrYlNfz3L37dQunurvbw2o9Lk3CIZV9AACA09uXPEMItONSiS9BQwkPVN7Xp4Qm54/OPg54XkiLmu7t/TgEOqr+Xcq/V5S/KctbJvxpKusWy/77ZxmnXQ8AAABOEgItQQgEAAAA7Jt9yTOMCQQAAAAwAEIgAAAAgAEQAgGPZMygax/craYythEAAACHQQgEVBIA5Wp0b/3ibjXl6me52hgAAACHQQgEVNLyp1zePhIK3Wo8hmnyfSlXywMAAHaTEAiAU0mLsbQiS+ux3GpBBgAAu0kIBFQuP380ns5NHo1G559+anRp8ri07tDKg7Z8J65/+EXViqxuDfSgeuy7AgAAu+fMN2OT+1u3L9fVh0NVdQn79MHo8/tfVwFQgqGMD3Tvq4eTOWqXxs9fe/XC5BFDlu9MWgA1Q58EiDd+9HJ1CwAAQ7AveYYQCOjVNzh0Kvdvfv/C6IcXn508w5BdefvjqgVQke/Fu699b/IIAAAO377kGbqDAb3aLYCK0gXI2C/Em6/WgWC6E+b26sVnJq8AAAC7REsg4AkJdxL03GpdMawtLYLOHz01uvHGy5NnGLJ8Z9pdwMoVw/J8uhcCAMAh0h1sCUIgdklp5ZKK65DGNml37ZlHWoAIgmi79sHd0fWP6kBRF0IAAA6Z7mCwxzIWTgZELpe8TmuGIahabdxf/KpO+ZuhbCPmk+9DCYAit+lCCAAAbI8QCFrSAqh0YYn6ktdfVvcPXa4MVj73IvI3y/wdw+N7AgAA2yMEgg7timrfAMnUhtRdjvmcPzpbjRfVdP7p8XO+KwAAsDVCIGipB7A9N3lUuzSQAW0vv3Duic8e0yru9fY6ejTWi1ZBRL4X7auGZUygWfLdabbEAwAAVsfA0NAhXcJufZauUQ+rAOjauDJ7qKqxWybd3Z47eqoKgsrj5ucv2yQy3+f3v340f0KgjJ+U+TM+UFqAHPp2Y/XyHcu4QeU7dPXiswaSBgBgL7g62BKEQLBZaW1RD3z9+Gpgaa2xaHiTynsG0m623khLkKuvPCsIYm7tK9OlBdG7r704tSUaAADsAlcHA3Ze1e2mdTWwW+Pn0qonr82rar3R6r6Tx7k6VAIimCXfl/Z3MY/v3TceFwAArIoQCAasq4VFWmIkuEkQdO2Du5Nn+yUsarbeaErFPi2E5lkOw5bvYnsg6WiHiwAAwPKEQHAKdQCyv4PYZiyfTF3mbckz6/L5ZTmLtCxieKrfUbsl0Pi7U8ahAgAATk8IBEtI5TQtZR5Pt/e229PVi89M7j0pnzMteU772aogaEZYxLDlkvJdqsHGx98fAADg9IRAsISEIplSOc2U7lD72mJhrpY8U0KgSx2XlO+Slh4Z+HdfwzLWq687WBgYGgAAVkMIBEvI5dHb9rXFQtZ7lnTT6QtvcgnveS7jXcIyYwTRpas7WMKfXCYeAABYDSEQLOG5jhYL558+u5ctFi71jAnUlAAn4U1fS553X/ve3J+9aln0UT3wNBQ3P33wRIialkHzBIwAAMB8hEAwp4QfacGS6fIL56rKadWFZTzlfrpF5bUEJQk49mUg5HYlu3yedqgzrSVP32ftWk7Uy7qvaxhTzRNQAgAA8xMCwRwSViT8eDR9cHf05vcvjG786OVqSkuY0lqmXGI98+xDEJR1bAY1aX2RwaL7xmfJ57zVCnA6W3GMl5kWU9OWM22sIYYlwerlxvhSuZ/nAACA1RECwRwy6HMz5CgtYqIEKAlGmjJPBl3e9SCo67OlJdO07m3l809ryZNlllCsT8aASauidoDE8Fx+/mj07msvVuFqNb16oXoOAABYHSEQLCnhTi4NXwKMhCZtpUXQtLBkF+Uz5fNNC2dKyJPAqK/b1yxZRsYHuvLOx090MWN48h269uqFahIAAQDA6gmBBmpa5X4RWc6qlrVLEtoklCitVDLeTzvkyPN1q5nbVWDSNU+UVjO7GnL0XeJ9nn/Xehvcrz7f1VeWG8A3y8iUMGjXW00BAADsMyHQwKSynZYbCS76rvQ0j/xd/j4tOLKsQ2rFkc+SUKNM+YxplZAuKs0xS4rSfWqaEnLsYougtOLJZ1tWHeI8rJaTsZGmSUiW+bqUMAgAAID1EAINTEKITAkuSguVRVtfVIHGZBm5X5aziwHHMjK2TzOMqD/j/Sq8uNrT7SnzJAhq/l1bXsv4O7so3W/6wpl5ZGyfe/cfVmFZV1BWZJDoBE5d2zDPdT0PAADAagiBBqY9eHGCiWnBRZdU9lPpb9vVgGMVyjaqgqAluz1FWswsur03Ja14Mk0LcWaZFeLkkt+Zp2u8lwREGUg7YdqhBIoAAAC7RAg0MO3Bi5dpfXH+6GznZb9zOfBDkKCiqb2N0mpm2e5T0664tQsScuWqTM11bK9veZzbMiUYK8FOWkuVIKn5t81LfucS9Hlc/r5sz9JSreqG9/bHC7dSAwAAoN+Zb8Ym97fu+Ph4dOfOnckj1qEaxDeDHU9a8qTynlBjUamop0tYWU5CoVzeuVnp32cZF6i0mkoo1LWNyjzZBglAMsByWkNlG3eFZAmA+rpCbVtaJ5XAJZ8l90vLroR7+fz5N898CXJyezLgORmc5e/LPKXlU+Zpf/Z6W52tbrvGVcr82Wan6aoGAACwbvuSZwiBBiiV8nTpinblfRGrWs4+K9ug+flL6FGUIKQdgOyKBDAJBjO2U1StgTYcViVg6htcO+sza8BpAACAbdqXPEN3sAFK5T6hxWmDm1UtZ5+VbdCU55pTeW5XZRyeEgBF6ZK1SUP+DgEAAGyKEAh2QLv10Lblcvazrna2SmmN1Cfd0XZt+wAAAOwjIRBsUcKNhC2vv3e7ut10C5zIWEbtlkpZr7qL1u2NBDDT3qMOpG5vZdsAAAAcEmMCwYal1Uu6YEUuGd/sipUwZtnBuk+jDHLdXJci63TjRy+vtUtbGRh6WhiUq4ndeOPlySMAAIDdYUwg4AllEOYy7k47dEkIUq5KtkkJnXJp966gJ+uUS7av0zxjAuUqbJtolQQAAHCohECwQQkxulrbNCXsmDZGzrrkKlxphdQl67POdUogNivgSVCUkKrMJxACAABYjBAIdtDNTx/MFYysWloEJQxqy3rUYxetZ7DoWzOCsaqb3MVnqve/8s7Hoytvj6fJrbGCAAAA5iMEYuMSIqy7ZcmuSsDSDFkyzk0CjtINq7p/9NSjq3NtY0DkhC1Zr7b8u2VdEr5s+t8uYxI1g7G0piq36ao2xO8SAADAogwMzUalsp4xcdLlKdLF593XvlfdH5IS7CT0yTbIdkmokSkBUG6LzJNtNM+4OauS90+40hdArXqd8vmvvP2ryaOTyjZqD6LdlHm2MaA2AABAGBgaOuSqWKUVR6ZU/jfd0mUXlBZBJUTJbR4nzGgGQJHHaRW0ydYuWY83v3+huu1ShUQJ81rruqy08ulTvifTxlLKPAnP0j0MAACAbkIgtqoKE35xt7pEOaXVS3dXrARBu7SdEsqsomtYPtusK6JlnlkyT1qYDTFUBAAAmIcQiLVKxbxuxVFX8p876r8EeUKOIct2qLo9TbrKteX1tHbZVBBUB1LTu3tlnTbdSmmarM+sQaYBAACGSgjE2iSsyMDG9QDHdSuW5qDIbQkSMl8q8kOSliv1Nro9sztTCYI2FbpM6xJWlCBo2X+3LP/S8/Xl34vcn/W+fbqCRgAAAAwMzZrUwcDtUXMcl2alflpgkOBhKAP8dm2neSRM28SA2ousX9ZpntCoT8Kw8r3Isu7df9g7WHRbec+0XLr0/LlHy7n8wrmZrZkAAABOy8DQDFrdBexkcJCKeZmmmTU+zCFJ0NHX/WuabN+0rJq1LU+rbpFzdvJouoQ4pxkjKMFPwr9MJdTpCpQ6nzuqB7LO5e2vj9cj3QurabyNjBEEAABQEwLBFp0/mi9g6VKPo5RWOusNzRKsZLDqhC/lNrrCmIRS6Rp2mnUq3eMS4LTl/e/+w99UgU/uZ8r9G2+8XIVI5epzRe4nFFp3WAYAALAPdAdjLeow4MnuYGmxkZYv7Up5Xstzub36Sn359KIrbDgkadGTcX7KNqmDlrPjxw+rx1ercGP8esd2i2yfdA1bd7enBDsJrdJ6KbIuCaJWuU4JgNrLLP/+WVYdSD1eZuZrfj8yplK7Bdqmtg8AADBc+5JnCIFYm1TQm11xyvgsCRNuflpX1JsV+EgAEAmLIsFH/mYT499sU9km2R4lAGsGHLmfeXLlq67uTZkvLWKa4dkmlFY7XRJmvfvai0/8G0+TZbU/X/4+weA840T1hUD5PmXwaWMEAQAA6yAEWoIQaNjSIqaEQG0JOIYyWPQ0XSFHsa0gqCu4KbJOi7TC6VtWljNPGDht+0TVfWz8PRIEAQAAq7QveYYxgdgZ0waETnepTQyEvM+ybepxgrpb5qxLgpmENF2yTlmfeccISnevrmWVllD5DkwzaxDrBETTQisAAIBDJgRiZ0yrwD8OOG5PnhmmdGmapoQlmw6Cbvzo5ZUEQaW1T18QVMLAPs9NuhFOU75LswIlAACAQyMEolMqymktkSn3l5W/TwAwT+uLtAJJV6a+MCHSkiNdfk6zTocu22bTQVD+zXLVrnS36pJ1ypW75vl3SxCUMYC6VMv5qP5edsmYP9O+P0WWM63lGQAAwCESAvGEOkC4/Si8yf15Ku9tWU5aXJQwqdzvU1qBZFybWUFQljVE8wQckX+vbP9ZwduqTWuplHVZ9rvUlL+vW4U9GXLlOzTr+1Nk0PEsY54WSgAAAIdACMQTcpWq5uC6ub9MmJDlNCv8uV9d6nxGCJDXZ81TWrrMmu/QJOToa23TVrb3Jrs9ZfDuaSFM1ZLrnQzePD14yd9PC3Ly2cp3oK3621a3sGyz9nbLMqpw0lhTAADAQAiBeMLn99dXIa5bX9w+dQuVUoFPoDAkCThy2fVZ3eaKhC7Tuk+tQ4KgWV3DZrXAyecrVzrLcro+awmC2iFXup01Q8zI9y7brSugyryzQikAAIBDIATiCZdale7cz1gri+oan6WuuNfdufpaqMw7rksxtDGCsm1Kt7nczmoZlG0zqyveqiRMyftkuvHGyzODoGn/bgmA8vmynGmDRWdsn+Zy7n31cHLvpHv3H1YBVbuVUJa7yPcNAABgX/3ZtbHJ/a372c9+Nvrxj388ecS2vPTdb4/Onf3z0dHZv6juXx1Xxh88/NPop//yv0c//ed/G1e6H1Svz7ocd15/6bvfGp0Z//fr3/1x8mwty0uLo9+Mn//BX//l5NnizBNj/iQQyHumRUdTlpPn3v/X34/+/m//avLsMNT/Tn9RbZc/jLfD5ReOOrdRZDtlW+f1/N2yErb8+nf/Wb1H+98/wc//fP9/VS1x8l6Z/r//4/+s/m3y/m15Lq/l3z/rNU31b/zb/+hcTl77zXidIp8t38+u71u60pXPnnUry8r7D+27AwAArNa+5Blnvhmb3N+64+Pj0Z07dyaP2BV1q43bJ7rYlFYa80qrj66WKGmBkStBpYVGkRZCzRCozJP3vPCTX06efVLmm3ap8kOTf5dmC5+0ukkg0mwV05ZtUwbgXlRa+VTj50xCpva/W/vfuPy7Jezr+rcvMl/doql/UOl8pnT9m/XZyudqtzJqv0c+S8asyvP5XgEAAJzGvuQZuoMxU1VhbgRAkedmdedpyuXfU+Fuy99nzJosq2iPSfR4ntuTZ7plviGNEZRgpRmu5N8o26BrOxd5vXTZWlQZayfLKP8mWVbR7oaVeebphlYta7zsafKZEijlNlNXN7Pqs336oAp6EgYm3Cnz52+bIVPuJ8ASAAEAAEMiBNoTpcLfrHRvUirSTalwZ30SuswTKKTSnZYY7eVEVXmfhErxXGvMlqjnORlEdcl801oLHbqEGs2wo0u2UcKZRa8a1hXyZCqmXR6+hDFd//6Rf/9Z3+2ENgl38j3KIM/TxkLK+9Tzfa/6m2aLJQAAgKESAu2oVK5L6JNwpD1tUtWioiOYiRIozBsEpUVGlyynfNa832laaGRZm95G29AOVXI/g3rPI9uoPaDyLO0xgNrvn6Alg1X3yb99Xp81kPU0eb98j3L75vj9msvK/fb3pswLAACAgaF3UsKQDLD7/r/+x+in//y/Twxym8FsH3z9p1MP8LuoVK7TTas94G5knTKI9JMDPD/p+kdfdi4jymdLpT2BQhVStLqGzWsb22jT8tnyGbPtc/t3f/tX1b/Tr//9j9XgyDOdGU2uxDZ9gO/ipe98e/SH8XbNtn3pO9+q3q/9b57BqaP9/lm/DL6c+RPMVAM5j9//NIMzZ73zXTl/dLb63H//t/9F4AMAAGyFgaGXYGDoWlqxzGpZk0pvurpsUt3C5uQA0UUq31mfaV2RSkufWa1PymfL/Ffe/tXk2cVlGVnW0GT7zhpEOeb5N+tSljstcMll+5vfk67va77jWVaWM8R/JwAA4HAYGJq1ao/PsgmprOdy8V3SXSwtMqaZ9XpRPlvCia5wIN1+pgUQkXkWDTcORbZNxsFJ16tsv9IFK8+X7lPVv2VrsOR55W9nbf8bb5x8/0xtec3gzAAAAJujJdAOal8ivUsq1dsa7LbvEu7zrE/+NleVKi1A2q1V2stKa6BcOSrBULr/ZMybhAZpUZTXynKijFuU+XI1sqGGQF2a2znbLdvM9gEAAFiNfckzhEA7KBX2dJXJmDiR1jd5rjzOVZi2FQAVJYCJRQOFdjeg8jhjDpWQp63M39Reh7Q0as8DAAAA6yYEWoIQ6KSu4AMAAADYLfuSZxgTaIcJgAAAAIBVEQIBAAAADIAQCAAAAGAAhEAAAAAAAyAEAgAAABgAIRAAAADAAAiBAAAAAAZACAQAAAAwAEIgAAAAgAEQAgEAAAAMgBAIAAAAYACEQAAAAAADIAQCAAAAGAAhEAAAAMAACIEAAAAABkAIBAAAADAAQiAAAACAARACAQAAAAyAEAgAAABgAIRAAAAAAAMgBAIAAAAYACEQAAAAwAAIgQAAAAAGQAgEAAAAMABCIAAAAIABEAIBAAAADIAQCAAAAGAAhEAAAAAAAyAEAgAAABgAIRAAAADAAAiBAAAAAAZACAQAAAAwAEIgAAAAgAEQAgEAAAAMgBAIAAAAYACEQAAAAAADIAQCAAAAGAAhEAAAAMAACIEAAAAABkAIBAAAADAAQiAAAACAARACAQAAAAyAEAgAAABgAIRAAAAAAAMgBAIAAAAYACEQAAAAwACc+WZscn/rjo+PJ/dmu3PnzuQeAAAAwGotklHEPuQUOxcCCXcAAACAfbIveYbuYAAAAAADIAQCAAAAGAAhEAAAAMAACIEAAAAABkAIBAAAADAAQiAAAACAARACAQAAAAyAEAgAAABgAIRAAAAAAAMgBAIAAAAYACEQAAAAwAAIgQAAAAAGQAgEAAAAMABCIAAAAIABEAIBAOyBm5/dH/38wy+qCQBgGUIgAIAdl+Dn9fc+qaa3fnF3dO2Du5NXAADmJwQCANhx1z/8YnTvq6+r+7m9/tEXVcsgAIBFCIEAAHZYCX/a+p4HAOgjBNpxpf//lbc/ribNvwFgWM4//dR4Ojt59FieBwBYxJlvxib3t+74+Hh0586dyaPhypm9BD9p6t11lu+HF58dvfva9yaPAIBDlxNBNz97MHlUSwh0+fmj0dWLz1S3AMD27EueoSXQDsqAj5n6m38/1AQcAAaunDR664P+MgMAQJMQaMekEDdroMecCTQYJAAMw6yA5979r8fTw8kjAIB+QqAddP5oeh//emwA4wAAwBDkmH9Jdy8AYAWEQDumFPRKyNN1m37/+v4DwHBkPMBMpTxw+flz1W0eX33lWeUCAGAuBobeUenuVZp/p9BXHpcQCAAYntId/PzR2eq+cgEA7IZ9yTOEQAAAAACn4OpgAAAAAOwMIRAAAADAAAiBAAAAAAZACAQAAAAwAEIgAAAAgAEQAgEAAAAMgBAIAAAAYACEQAAAAAADIAQCAAAAGAAhEAAAAMAACIEAAAAABkAIBACwB+599fXo5x9+Mbr2wd3Rzc/uT54FAJifEAgAYMclAHrrF3dHr7/3SXX7liAIAFiCEAgAYMcl8EkroOLmZw9G1z/8cvIIAGA+QiAAgB2XlkAAAKclBAIA2HGXXzg3uvz8ucmj0ej800+NLjUeAwDM48w3Y5P7W3d8fDy6c+fO5BEAAEW6hJUuYAmAfnjx2eo+ALB9+5JnCIEAAAAATmFf8gzdwQAAAAAGQAgEAAAAMABCIE7I1UdyCdqMOwAA7JYcozO5WhgAsAwhEI+kUPn6e7fH0yfVdO2Du5NXAIBtSuiTY/Nbv7g7OU7fdsIGAFiYEIhHbn32YFygfFDdT2Hz+kdaBAHALsjxuNkCKMfrcqUwAIB5CYGopFB576uHk0e1+jnNzQFg2xyPAYBVEAJROf/0U+Pp7ORR7fLz58bT0eQRALAtl184Vx2rm547OvkYAGAWIRCPvPn9C6MfXny2Cn9ye3U8lQJnPV5QPVaQLmIAsFl9J2W0EAIAFnHmm7HJ/a07Pj4e3blzZ/KIbUmBsnm2MQFQBqIsBc289u5r39NKCAA2JBdryLG4LSdtckwGALZrX/IMLYF4Qru5eQaMbp5pzP0MRqlFEABsxuf3u1v85FjseAwAzEsIxBMS8jQLlV1jDjS7hwEA62X8HwBgFYRAA5WAp9m6p8jzr793+1HAk+bnGYwy4wS1lbDIOEEAsF45FvfpOp4DAHQRAg1MCW3q6XYV8jTV3bzq7l+ZMv7AW+N53nz1QjVwdFvmKa2CAID1uPnpg8m9k3IcTrdtAIB5CIEGJiFPQpsUGhP2XP/oi5mteO7drwOha6/WVw/rUsIgAGD1+sYEihzHtcgFAOYhBBqYe189nNyrJbzJVHSNOVBer+c9+fdNzeUAAJvjGAwAzEMINDDnnz47uVfLlcCaVwNLS5/21cHKPPV08u+LvDZtvAIAYHmXOsbmK84fjY/Bzx9NHgEA9Dvzzdjk/tbty3X191mai2eMn3TxSqHx0rjQmG5eTZmnXAI+81y9+OyjbmA505hxgkqLoLKc5jwAwOqV43OOwc2TMlcvPiMEAoAt25c8Qwg0UHXAc7ZqwdOnNC3vmiev5flyCwAAAEO1L3mG7mADlTOGs8KbvN43T3leAAQAAAD7QQgEALBHDAINACxLCAQAsAd+/uEXoytvfzy68s7Ho9ff+6R6fO2Du1UXbwCAeRgTiJXJmckUSG9lvKGnz1ZXMjFYNACcXo6xr793e3TzsweTZx67PD7evvnqBYNDA8AWGROIwUkAlCuHpYCa+9fHkybrAHB69+4/rK7I2SXH3Vw1DABgFiEQK5MWQE0plGqiDgCnV13R88jFGACA0xECsTLpAtY07epiAMD8cjy92tPFOq+lCzYAwCxCIFYmBdCMSxBVYfWVZ0+MT5BWQekmVm4zAQCn8+b3LxiDDwCYi4GhWamMAZSQJyFQMwAq4wXl9bxWbjPPu699bzIXANAnVwZrDwxdBoWuuouNj6sAwHYYGJpBSgE0ZyMT7iToKVNzkOjmbQKjXOa2PAcAzC+DRec4Wl85zDh8AMB0QiDW4toHd6sCaaaqBVDPFU0S/qSV0JV3Pp48AwB0udRxCfgcR+uTKq4QBgDMJgRi5RLqXP8oY//k6mD1FcJmtfTJ62nmDgB0+7znhEpx76uHM4+3AMCwCYEGIoXCunXOJ9XtOguJtz57cGL5875XAiODRQPAk3JCZVZ3r7S6vXf/4eQRAMCThEADkS5ZmcoAzZl2UQIkAOCknFBZ5wkcAGAYhEAD0HX2cJ4uWstKc3QAYHVywYVcCWya80cnr8wJANAmBBqAXDa2LQXFdTn/9JPvN6/nJus1T7N3ABiKXH1z1vH16sVnJ/cAALoJgQYgBcerrzxb3ZbHucJIebxqCXK6lp3nMpUzmeVxuZ9Ly+e2vtTt40kYBACj0Zvfv/DouNmU59597XvVcRQAYJoz34xN7m/d8fHx6M6dO5NHrFrGA0oXsBK4rFrCmrcy6HTj6iUpsBZpop737uqKVgq1CX3aryU0uvHGy5NHADBcOU62L6KQY3pCIABge/YlzxACsTLtgmk5Mznv+ARdBdvIcrKMvjOgADAUXcfatPa99urjky4AwObtS56hOxgr0x4QOi160jKoK9jp0jegdJaTZbz+3u3JMwAwTO0u0jlGXv8ox8juEykAAE1CIFama8DKm589qC5Hf+2D6ZekT8E1806TbmazlgMAh6pvjLxysiTH23aXagCAJiHQDkiBLeFGpl0ZBLluefPJQut09eIznWMNNc9SnkZzOQq5AAxNjn3Tjn95LUEQAEAfIdCWlQJbmXahOXc5m1huq8Ge5whdMm5P39VJ8vcJk/o+W/62XDVsmiynrBcADMk8x8oca8tJnHmO3QDAsAiBtqwdjKTAdmtGt6h1y/s3C47pptUX3nRJi6CuAZyzzBIutWX+N1+df+DnUsgFgKGY5xjZPFly5Z2PBUEAwAlCIOby+f26Jc88SougaUFQ19g+9RnO+a4kluWUIEgBF4AhWPR4l/kXOYkDABw+IdCWtZt2Jzi5NHm8rXAj798McLJ+uXJXApcrb388V4Eyn6vvku75XBnbpysI6pJldDV/L4XbXDVs3oAKAPZVjnVdF1HIcbJMbTnebqs8AQDsnjPfjE3ub92+XFd/1apC3acPqtY2CWASoKS1TLlk+tWLz3aOs7NOCVfSLey5o6eeKECmkJmWPvO02snf1SFNT6F1vPwbb7xcPe5r2ZP5EijV26S7IJvtk3UCgEM1rQVsjpU5LrdP1JTnczzP/U2XJwBgKPYlzxAC7aC0kEngUZQQZBsFt2nBzLxBUAqkfQFOlnP1lWdH1169MGnV8+Q4P5mn6AuBMk/WJeMRzbNOALCPcpxsBz2z5BiZ42fzmAsArNa+5Bm6g+2gW5+d7NqUgltClK6AZN3y3l3BS56btyCa8CqFzmaYU2Q5aWmUbmZ5vW+evvUo8lrW5fqHX06eAYDDU5+AmX01zaZy/Myt7mEAMGxCoB10/umzk3uPpcBWWuVsUl8wE1mnhFPzBEE563jjRy93FlyznHv3x8v64G7VPew0qq51rRANAA7FPMe4cuzuO34DAMMlBFqzBBwJSTL1nXnLawl30g1sWuFuG0FQ1cWqpxVPLBIEZRkZ36hrWSUISgCWlkMKrgDwpIwh2DXOXlNOqKTFUKZ2V/Ic1x1jAWC4jAm0Ru2AJK1g3n3txROFr7zWN15On/z9vOPxrErW78o7H/euZ9dn6zNtWWU5Me39+qSwm20DAIeoPW5gl2Y5IcfRlDVy8YkMDu1ECwCshzGBqApdzRYyOXPXfBy5AteiQUfmz5nAXZLPtopuWGkNFKUAu2hBNQVcADhUl184N/PYmJZA54/qruWZN12yc0zNrQAIAIZNCLRhORO3j1JoTLewPosUKjNv39g/zWbqud8XBDWfq5Y3nnJ20xVPADhkOTZ2HY/LsTAtavu6XgMA6A62Ru2uXimQtS/1ntYzV97+1eTRfLKcDLK8jQJePlM+T8KsrHv5bIt2w8pyrmdZGQfo6KnqNgXbbJ/258p7ZDuW90sB99J43si8Zf78PQAMQY6jaU0cl8bHxRwD791/WLUA2kb5AACGbl/yDCHQmpVC2r2vHlZn5poBUNGcJ+FGWrOkz3/pv99sPbRL/fnLei+7Tgl0SoE1Zv193i9S0FXABQAAYFcIgZZwiCEQAAAAcNj2Jc8wJhAAAADAAAiBAAAAAAZACAQAAAAwAEIgAAAAgAEQAgEAAAAMgBAIAAAAYACEQAAAAAADIAQCAAAAGAAhEAAAAMAACIEAAAAABkAIBACwR25+dn9076uvJ48AAOYnBIIOKVwrYAOwSxL+vP7eJ5Pp9ujaB3dHP//wC8crAGBuZ74Zm9zfuuPj49GdO3cmj2A7Uqi+NS5ox6Xnj0bXXr1Q3QeAbUr4k9Cn7fzTT43OHz01uvHGy5NnAIBN25c8Q0sgaEjh+vpHX4xufvagmt76RX2WFQC27d5XDyf3TkpLoByzchIDAGAaIRA0dHUDuzUuWAPAtp1/+uzkXrfP7+sWBgBMJwSCGZ47empyDwC259Lz5yb3ujleAQCzCIGg4YcXn62manyF8VQeA8C25Xj05vdPjlPneAUALMLA0NAhV2CJy88fVbcAsAsy7k/GqysS/Fy9+IzjFQBsmYGhYY+lMK1ADcAuyZh15eqVRU5adI1nBwDQRQgEALAn7nUM/pyWQa+/d9vVwQCAmYRAcArOvgKwKRn7p91KtRyHcon46x998ag7MwBAFyEQg/PzD78Yvf7eJ9WU+8vI2db8/ZV3Pq6m3FfwBmDdMjD05Z6rhDkxAQDMIgRiUBL6pNl8bpv3F5GwJ2My5O9KgTv3r3/45WQOAFiPtAbqU64UBgDQRwjEoLTPkub+rc8eTB7NJ3+TZvdt9756eGLZALAO558+O7l30vmjJ7uLAQA0CYEYvOfGheZFdZ1pTTDUvGwvAKxDLgnfdRy6evHZyT0AgG5CIAblh+MCcnMshdy//EL32AptdQug+3Vz+57gKK+fZqwhAFhGjmc5xkWOQdW4dW9/XI1hp5UqAFCc+WZscn/rjo+PR3fu3Jk8gvUoYU6k2fw84yfUY/588ejSvFdfebb6u7T86Stcp0B+442XJ48AYDW6TjbkmHTjRy+Pj1MPq9ebx6aEQxlQep7jHQCwnH3JM7QEYnBSCE6BONO8BeKMG5TuXilUZ8pleGPa2AsJjFIQB4B1y7Hp9fduj25+Wh+rmhIYuYIlABBCIBhLgTlN5tN0vkzlLGsd/Dys7hd5roz/0xckZZ4sI8sFgHUzNh0AMIsQCMYS1qTgnAJ0mfI4AU5Cnq4rsZSQJ7fTpNVQCZQA4LQuNca2m4duYABAIQTioKX5e4KcaYM1J8Qp3buayvNpFZSxFBbpPtaWQKk9RgMALGPRMX5y7Em3ZgAAIRAHK4Xetz64WwUwpaVPVxCU5/vCmTyfsX0SJr372veqAaEXVS1jPOW9tQgCYBWuvXphwSDoZLdmAGCYhEAcrAQ36dZVJIhpnwnNc7MGy2z+XRlQelmfT64uBgCnleNRrgiWq1HOcmnKhQwAgOEQAsECcsY1LYJOEwQBwKrkuHTjje4gKK+VrmNpOQQAIATiYOXy7c1CcQrD7cE081y6eOW2aN6Pap6Lz0we1dpjBOV98ji35X4peGeeTHncXg4ALKt0N44EQTlJkWNQOebkcSYBEABQnPlmbHJ/646Pj0d37tyZPILTS+G4jMNz+YUENN3N4TNP5k3BOfOki1gpWM/6u8jrJRAqyylKd7O+ZQDAInKcyXh2Ob6cP8qJisddlfPavfsPHXMAYMP2Jc8QAgEA7JH2FS9z4qFuBST4AYBt2Zc8Q3cw2JIU4FOQn3b5egBoSkuf9jGjav0zngAAZhECwRakAF8uWd+8DwDT5HjRlpZAzW7IAAB9hECwYRnD4fqH9RhERe6nYJ9WQc7mAtClbvHzcPLosTx//cMvH7UuvfL2x6NrH9x1PAEAniAEgg1KoTwF9JufPZg881gK66VlEAC0TWvtU44fmXKM0cIUAOgiBIINSchzq3HVsT6ZBwC65Epg83b9cjwBANqEQLBj7t3/WjN+ADrlUvBXX6kvBw8AsCghEGxIPXDn2cmjfgl/rn/0xejKO/WYDgDQdO3VC5N70+WkgrHmAICmM9+MTe5v3b5cV5/DksJxxk1Is/mENFcvPjO6/PzR5NXVKu/1+bhgHs8dPVXdz2DRXYX0Kjgaz3PjjZcnzwAwdDmOJNxpe/P7F6pjWXPcuXIcuTQ+rl1+4dzajm8AMHT7kmcIgRi8FKSbg2defv7c6N3XXqwKzuvSDIMujd8vj7su+1ukYD/vmV8ADlv7uBUl7Enrn66TCpF5EgK9+9r3Js+sV9ZjncdSANgl+5Jn6A7GoKWA2r7cbgrQCWTSOmcd8p6vv3f70ZVbUphP969p8rpxggCItCJtq45nUwKgyGs5tq27i1iWXV8N83Z1ufp2YAUAbI8QiEHrOkOZwmsKrG+NC7DrKLhWXb/GBfWmWYXxvJ7QKOMErSucAmA/ZHDovuPXLOUYl4BmXceT6hhanUx5UE25b4w7ANgNQiAGoxR8M6UwWlrW9A3WXAquqw6C5imk98nfdo0DAcBwJABKl67TdLXKMe76h19OHq1WGfeuyLErYxWd5vgHAKyGEIhBqJu/364ClAQ7Zbrwk19ODXlSYL0+fn1VBde8V7p2nWZ5+dtVB1MA7JeM7ZPx4k4jx8ZNtS6tuqrdP9n9GgDYPCEQg5CzneVqKYsGMHVz9tUUkm+Nl7WKQCnLAWDY0i3sxhv/7VQtglZ1kqMpV9lsr1MGrT5/1N3yFgDYHCEQg9Ae/HmfpWCdz2N8BYBhS4CTFkGLXPa9Gc7k79MqdtXdjEsrpVxtM++X26s94xgBAJvlEvEMQgKTFHS7pHBaWgl1yZnWFGZXUXhNN655Ctuz1qnIOl195dneQUIBODwJb3I8yTg7cen5o2ocntJqNa1uErpkvsxTjic5VkRXl+Ic5669erruZV2yTmkB5BgFwKHblzxDCMQglLOd7RZBKTinUFwKzpkvBekyX3k94xjc/PTBo8Eu09R9kTOvTRmHKO9TJPApBfhc9rf5fpGCc7sg35Z57v7D30weAXDI2ic2cgxI8PPmqxeeCFxyfCvHnBxf+k6K5LUMNg0ALEcItAQhEOuWgvCiZyPzN/WldB8HMAlu3n3txYWX1VVwz9nXFL6n6VqHtnWdxQVgt6RFabs1T44naRk66zjQ1yI1f3/jRy8vfFwDAGr7kmcYE4hBWaZwm7Oo7fAlj+tQZrEBo7sum5tQaJ7l5Moq0+SqYynYlzO+AAxH9v3lODBNjoN9x0JX7wKAwycEgiXVQdCTZ2OnSXevtioI+mB6EJQC+6zuZ1lOfYb39uQZAA5R19W3IseBHEuuvP3x5JknZZ5MbelOtmw3ZwBgfwiBdkBfgYzVy3ZOl6yEN7mdV+9Z0/Hy0pJn3iDo8gvnqq5kbQmUchn7aea9wlmWtUgwBcB+SViT8Xv6gqC0HO0LgvK3XX9XTmws2sIVANgvQqAtqwOJ26Mr73xcFb5Yr2zrEtrkNoM0z3JrXDCeFtKVIGjaPEVdcH9x5hhAXXKll3ldFwIBHLQcT/pa7pQgqOtkRwKgjB3UdUIix8b2CYl5jm0AwP4QAm1RVdj66Ivq7FsKWXm8SOsUFpOzm+1xdcp271MVpOdogZP5EgTNoyqAt5ry537eJ2du+87EJjia91L15SzwtM8GwH6rr1T5ZJgTOS6ljNHVIiiDR+dKYl2qY+X4b3Ob41FOUjmeAMDhEAJtUR0wnAwl2gMHs37tf4NllQLzPAXlnL0tVwXLlLEYEgaWrlxZTlcgmHnnWd+6AF837U/hfVWfEYDdUVqX9p0gyL6/r2tYLiXfFSDleJRlpUVQjkfleJIWpo4lALD/hEBb1FVg6xo4mNVIgTeF27YEb1VBuaNwm9Y9KfwW+Tfr68qVv0+BuXQ3myXLyZgOKby3ZVk5g9sOguZZblvWP2dyATg8OS6lZc+sMYJyUqAp83Z1M85z+Zt2i9Qsw9XDAGD/CYG2KCFAOXtXwoVMqein8p9pmUo/3UqBt33mMwXdekym2ydCl65CcOTfLFOW01fgnjcIiq5lRAmCmmdwp7UU6zsTXGgRBHC4SgvTLuV41g6Cuo4JeS7HkvZJk6qF0NHZySMAYF8JgbYsZ+9u/Ojl6gxepgQHKaQlRMiU++1CG8tLyNY+85kCb11AflBt82bo0lUIjurf7Y2Xq3+7rub0Wd5iQVB3wbpat/uPB/fsaymWAnsCommDhNbdw1w+HmCI6uPAycvHd51YyMmHzFtOmuT4kts8nnaiAQDYD0KgLUuBLM2rU3lPoetWR8uTzJMQIK+zfmX8hBR2L43/XUqht/k44U6m3J8W4CwSBPXJckqLoIRYfaFTWadpymfzXQI4PPUxqT+oyb4/x4FyrJjWBT3Hm4w3VJ+kWu6qlgDA7hECbUkKYqWVT7O1TwpnbZm3aqHyzsdVIMTpJHDrClKKbO+61cwnj8ZZKFMKwXk+/x6Zyr9bn/JvNyucuTQ529qnFNyzrBTGp807zePPdru6D8DhmKe7Vvb9ZZDnHNPax5McI8tzuW0+BgD235lvxib3t+74+Hh0586dyaPDkMp/ClopQDXPoqVlTyr0TeX1aYFBlpMwoq/bD/PJv0m2c1peJRTpUgq/2d5F17/bPLKsjNUw7UxqAr6bnz6omudXLcQ6Qpry75+CfoKcvnWfR9YnIRcAhyHHjXmODc2yRDke5tiTlkFdwRAAMNu+5BlCoA7NgCBdfa5efGap0CWBQelbnwJVxpPJODKRFiTTwp5psqyMRaOQthoJXPLv0RW6RLbz3X/4m+r+af7d0vpo3lY808Km0iIp65vWYX3rPUuW0Qy4ANh/zbJHlGNO81iR41EpjwAAq7EvIZDuYB1S+c6UM2mp8L81LlAtWtHO/M1CWG7n7Yc/S5a1bBDBkxLwzQrVyvae1W1rmnyf5u3OlxY6fVf7Kt+pvHaaMPA030EAdlM5fiToz225+EQeJ/ypntcKFAAGSwjU4d5XDyf3aotU3osM9tyWyvutSRPtUkhb1rRLhbO4BClVN6spoUuk8Hz1leWayi/6N/mOtN8r9y+/8Hg8ozzuu0JZ+bvclinz5TafIxMAhyf79xzTchyp9/111+Yy0PMyrZsBgMOgO1iHdpefFKCWKTR1dR1qj8PS9V7RDB66tJfDauTfIq3Amtu/qxtX13xd8jdlnlIoX1Teq4SHfV0T8x5167U6rMw8mbe8d9ajOWBo87MAsH+yf2/u8+3XAWC7jAm0hF3ZaKl058oZaQGUQlVaYywTuHRVzBPetAtq6b/fHJCxrvTn0vFfV+MIta8Y1rccVif/JmVMqHQB62o1U+aJXDq+/NuVf8v8+2TKYM+53UQhvfldm0epRJT1A2D3Zb+druplAOicrEgXL/vxettc//DL8fHt4fjYtvy4jgCwKCHQEnZpo62ycrxoxTzy/ulS1my9UR6vO0hgGFYVdgKwWV0XD8h+XFevJ1tYL9sKFwAWtS8hkDGBeqQwlYLDKgpTWcaiyynhU27LVB7DKpQAKBI6loHMMwGwu7rGBcy+OwHIkPfhOelWTrwVeey4BgCPCYFggKqwp1WJyHM5s5zLzl95++MTZ1IB2B19V6rMfjz78KHuv6vW0q0rX7YfA8DQCYFggErLsrZUHFKJSAuhBEJDP6sMsIumtVQugf4Qg6Ac2zJGXwnIcnt1vK26AjMAGCpjAjEoKRynYNwciHuohcNsh4Q8s2T75DL0CtEAu6U9/k1T15Uth6J0ActnX7Q7PgAsy5hAsINydrScIS33h6pcdn6WEpwBsFv6uoVFadE5RAl+VjWuIwAcmp1rCTQvLYZYVM4Mtrs3DbWVS9e2mCZnlG+88fLkEQC7IlcKKwP7t+XYljFxXD4eAJazSEYR+5BT6A7GYKSAnAEzmwXloTaX79oW02T7pAKRs845uwrA7si+PK1++q6ENdQTHgCwSbqDwY5J4ffqK4/HAMptBpCMoV1CdtHPm3lLF7q0IMrfA7Abcjx797XvVce4LtmHD/mqYQDAY1oCMTgpBKdAXMKg63l8f/z4qL6KyKG3dMlnf/2926OMF9EnlYkEPn1B0ZAHHAXYZdMGiy5hka5hALB6WgLBjkrIc20yPkICoIQhCTtym8eH7t79h1Xo1SeVhGyPaZWEbKucVQZgt6Tbbp/6JEB/SHSo8nnzuctUPn+2R+5n6jvpAQCHRksgBiuDabavnJIAJC2Czj999qDHv7ny9sdTWwKVFj6zCsU5o2yMIIDdMU/Ik338m9+/MIj9dwmAmvL503Xu1mf3Hx0Lsy2uXnymun/+6Oyj4yAAzEtLIHZSKQwlABnyWa989hT+2vJ8CoTZTgmIZhWk91VCrmmyHeb5ftQtqYwPBLAr7n31cHKvX/bvh3yMa7rVccKjfP7myZBSPqqn21U5CQAOkRDowKQQk4JLV8EurT/KGcIUftKdZ6gV+Gpg5CldouKQC8nPHa3mDGcK0PlO5bs1T2gEwHrNCvmL7LOrMfHsux/JtsiUY1suu+8kBwCHSAh0QEr3pkzlbFaR+80zXlEXAL+cPBqWeZt5ZxvVZwsPqyCYz7+qpu6lwHyIYRnAvlmkm9cQ9t3p4pWLGTTl+JdtNO04WB3bPu3vNg0A+0oIdCBSWEn3ptwWCS6aU5dprx2yDHrcvFz8NIdYEEzhNxWFVXLWFGD7clxbZLy27LubJ40OTY73b756oTrmlSnbJ1PuJyDKtmoHRQBwqIRADFauEDZvEDTPPPumGRguom9bZHmlaxgA25WAo4Qb0wKO7LvTGuiQ990JgnLML1O5+mW2z403Xq4CoautIKjabi8IhgA4PK4OdkDaV7tK4SYFm0jlvKvJd3OeFAQPMeyYpW/bRLZHdRZxXJiOXF79EK4akhY7+dxdQVD7s1Wtpi4+86jrYMYTyvcmA2e2uxgWWcbdf/ibySMAti3HuTJIct8xL8FHwpDs44eoah09afmbAKiERQAwj33JM4RAByZB0Of3v35UUS8V+nKmL6/l0ucpCJZ5UujJ41xRJANKJvDY95BjUdk2JQRrBiN5nG2U16sBNMfbr1xCvoRn+yifp6/5f/lc5TvQVwjOMhI6dgVJkcpEzrACsFtmnfzIcUAAAgCLEQItQQi0eanAt1t0JPTY54Bj1bq20b4Xkrs+U5Hw5t3XXnwUAk2T7gPTWgNl+/guAeyWafvuyP67dCcDAOazL3mGMYEGrmr63CoIlq5CPNa+nHxClLd6LsW/D1LAT5P/rqAn34cr73w8c3yIfPZplYhso2ndzgDYvOyX28e0tuoY94v9PcYBAP2EQAOXEKAdBKTwl4JfQgCV98ctWtoSgOxzITlnePtaMuXfPZWEaUHQPN+N8l1KqyPfJYD9kX12jnEJjQCAwyEEGriEALlCVpfSIkTlfVSNo9SlFJIzFtM+yrhQffLZEgT1hVxdrYj65LvkjDLA9uW433cCoC3HgbTmFAQBwOEQAlENFt0nBUBBUL0d+uS1adtwV2W9b80o2GeeDIjdFeAsEgLF9Y+6lwPAevQdu/pObHTJMva5+zMAcJIQaOBydm/WGb4UAIdc+JsnLMk2nHa1lX1Wur21x4nKmeRFgqCqIjFejm6GAOuV1qnZ16YrbldL1XKp+Hnte/dnAOAxIdDApTI+T4U8rTgM8Nsv2yWF433qGpYA59ICXQJK0FUsUxmol6ObIcC6ZN+cY3b2tSW8aR6X5jn50yX77LQMte8GgP0mBBq4eQtzmS8FyyEO8LtoWLJP3Z6uvXphlEvClxY901r25LO1g6Bp34VZy0rFBIDVyv61vW9udlk+f3R2cu9JOR68+9r3ei8Nn1Ap5YBlQiQAYDcIgQ5cqbRnagcTeS2BRVsKf5m6KvHlrOLQC4ApKL/5/TpAaSsBRzMs2WU33nj50Wc5f5QroZ2r73f8++ez5d8+Z5Xz+rSgJ7q2T1GWA8DqdO2XmxcByOt9F4TIxQDSVWzamEF1EHSY3Z8BYAiEQAcslewymGOmdpPwrrOFKRymsJgzgZm6CpNZVgqA7b89VPmc7bAsBeWcWc1tlxKW7EshufoujD9LCvfV43y2nn/fsj2uf/jlaNYVZsryumQ5+xSWAeyD5omcTOVxU1qBJvxvy365lBe6jv9FdRwYz9d3nAAAdpcQ6IClcNashFeFtmqcgMeteNqFvDJPwqKbnz7oLeDl+Yzr0lzWobp3/+Hk3mP5/LMCnszTDt52Uf4N829e/q3znen7dy/yev5u2r//rGUUWca88wIwWzmRM+2EToKgvla/2SfP2i/nWJFjnP03AOwXIdDApLCWlheZqsJfo4l4kXlSsGu3fmkryzrUIKgUbDN+Qtd2ilmF37xeQrVdlXWc9Tm6LPt3AKxfWmrOaq1ZQqKurrvNVkR9XXvrlsHGCAKAfSIE6pCK7b62Tsh6p1CW2xT+2k3Ao3y+XD62jAfTdyZwlsxzaEFQPksdlN2ubtMS6GrP2dJ5ZBslCNrVrmF1RaF//Id1y/svu20BOJ3sg7sufpBjV8YGSkiUskJXeSLSIigthwGA/fBn18Ym97fuZz/72ejHP/7x5NF2lL7w1z/6cnRrEmy89N1vV7e7Lq1NqnX/MOv+oKpY5zN0jVvz4OGfRqMz9W2ahJ87++ej93/7H5NXF5NlnBn/94O//svJM/srhd7/+f7/Gv3TeFtku/36d3+sPlvZRr8ZP6623YLyN38YT32F6G3K54plP9ssCZguv3BUvU/CtJvjykS+m0dn/2L0d3/7V9W2LbL9sw5lnQBYv+yjqzLPpFwQpRVQ2R+XY/x4lifKFXkuYZJ9NwBDtgt5xjzOfDM2ub91x8fHozt37kwebUdaxzTH0UkF9t3XXtz5lgql9Uoq0Ytofr78/bKtVbKcnCncd13bMdvmxo/q4KJuQfWrySuLaS5nl+Szls+2zHco8vf12eRcWeyo+h5l4OwMMp5KxDyfOSFmCV7PP322t4UaAOuRfXdOIk3bd7ePFc15sv+/evGZ6hYAhmYX8ox5CIEaUqDJYMftAKDuL7/bBZplK/D5fM1gYtkgKIXFbKd9l+1Xj29wMghsBlylxdWiso3L2EJpEZNttk35zqTV2L2vHo7X7WxVcE+T/tJ6LOua9cwVYJrbI7JNynP5HKcNbLq+d+3vJgC7oYRFOX60ryaZfXaOCds+xgHApu1LCKQ7WEOaMb//29+faOb80ne+NS7IfGcPmjifeVR5b0phbFoXnzTvbhbUXvrOt0e/+d1/LrScvJawYF+6zU2Tf+cUZtOKJZ83YUf7s6XZfJR5osx34emzo/8x3qZ5Ld+dtJHPMstyq8LyeCpdr8qytuGtX9yrCvJZn3R7+3y8ftde/T+q78TlF85V3/usX/l+pLl/+bfOfC9991uPvj95flnZLgnV2t+vPM53MctOSAXAbsgxMfv/7L/bXcnrffcfq+PeLpQLcuImXfx//e9/rI4lu1+eA2Bf6Q62hF1IzkrriNyWlhD7cjar3bIjZ+Lqs3WPu9hEXo8yT1cFPoWmBBmRFiKRViJ5Ll1+mmf9EhiUllJVqDB+Lcvc57OA2Zb5HPlcfQFH5imDYXYFIfn7cnn5/Lt0tXTJ8rfRgirr1tXqbRvf+WyXtATqk/XSIghg90zbf2efve0WQe2Wu1mXQ2i1DMBu0h1sCbu00UqQcQhKRX/dn6fZpSfvdfWVtBh5POjvkPV1s9vWdsp3ot3trcg6bbIL5KwQKNLSah/G5gIYkpwMmTZOXmklu40gqOs4t+njW5F1ybaKbYZiAKzXvoRALhHf45Aqm/ks6/48VauYSQEnUuBJC6Tmc0NWWl+1ZTvl8vE5W7lJ+T6kYN71vagLzssPEr4OKcS3Wy4BsF3TWstG9t1pibNLZYG3xsfbHHM3dTzJZ08YleNqtsWskx4AsG5CINamKvyNC1q7FCZsS+mK16UEQZsuGJZm8X1BUAaE3qXQJeuSgjQAu2NWq5r6ePLl5NHm5Nh2qRVSZV1KMJUTC5sIp+ohBurWSHn/lImUiwDYJiEQK9EXFpTC1ibPuu2ijKM0TV0wra/wtknVWdzJFcva8m9XN6VffyF52pnkpqyTwjPA7uhr6boL0tW6jEvUPs7kuJtj7jbKJkMuDwGwfUIgTq2EF32FmjxfzroNteCTAmjGRpgm2ybbctMhRy5/n0JylyrEW3NXtUXHR8h3SRAEsBumtXRtSjkhJ4Q2cWKhKceYcoGLtlI+WafnWidaEkblghoAsC1CIE6lKkDNGRJk3iFW3vO564Lvk4Mwt2XedMPadCE5Z0v7QqpcQv7K2x+v9d8ug2PPqxTaL/zkl9V9ALan7yRCkdCjnODIvjth0KbLAmn12necKSey1nXcbR9fc9xy7AJgm4RAnEougZ6QYF5lEOQhFYBKwXdedTesT6ppk3L1rb4m81WLoDW1wMnyM4j4Ikohet1ncAGYruu4ULV2ef5cFRCly3HzmF/23ZsOgvpOdmR9quP0mlq9Nj97sWtj7gEwLEIgTuX80dneMWW6lMLfpgZk3AWLBhyR7VTOTm5KCu0ZKLoqtLeCoCj/dmsJgqYEiVmXrvWJrEtaKSlMA2xe9r1dx7iUC8qJhS7leLLpcsC07s85DuWYu47jSfsYl8c5iQYA2yAE4lRSOe+71HjOuPV2MRoXstbZ/HqX9I2XULZPX8CRbbTpICjq8Yu6r/ZSCu6bPoPbF0xF3XLKVcMANq33+HW/Pn7l9Vyhq0uOJ7ly1jpCl2nSIignPNqyHjm2rfr4lm3QPqaWk2d5ryGUgwDYLUIgTq0adLGjr33Cj77CX6TAta6zbrskVwZrF5TzOGdJc1byxo9enhqWpYCYLnSbNO1qZlmnVZ7BzbaY1Zrs1ozxlMoZXIVpgM3qO86X4177+NeUEGRTV6Fsqk92dB/nPm+12lmFDExd3jO3KR/lmFWmTZ9YAWDYhEADUgKFVctyM9ZPW96r6/mm/O2hdw0rIVlp9ZMpj+vC7ydVoDJN2b6Zd1OyzjlTOi2cyvqs6t9t2tVl8l6lgJwWQV3rVObJWWUANicta+pg43HYk5Yvmarj14yAI605t7HvzkmYrHdb+2peq5BtkWNqTv4kEMqxM9sm5tlGALBKQqCBKGfbUnFf9ZWe+vq1p2BTCjnTZJ5VBgq7qG5+/mJVCEzLnyjdqjLNunJYtlG2z+aDoBcnj55U/t3m+TeeJYXiEpJNk9ffHG/LPve+eriS9QFgfmU8ueZUtMfD6ZJ99zaU9S4naHLc6wqGVmXaMc6xC4BNEQIdsHQhSuCTS2nX3XceVIWMVV/pKWe4FhkcuksJFA45CErhr9pW49t9GSx61nck6zSrJdM86rOkL1aF8Rtv/LfOgnLeK5PWPgC7J+FJTnhkKvvwctxra+/jp3UdX7esb07O1C11vtd5/FmlrgtqpDXsut8XAIoz34xN7m/d8fHx6M6dO5NH+y8V6DKWScZYWefZpSgV8nJGrbr6xPi5PqVwlkLPaSVsmtWaZR5165PTr8+uS5CzbAiXf7dso66C9arNs55Zn4Q3q/h+5/ua5ZWwq/n9zfPpRpeucX3f6/LdKctZ928OgOmyPy5lk4QdafmZ50oXqDyXY0haFd/8tC5HXH4hF07YXjBU5FhUjjerPJ5kufWg2PU2Ka2RANhv+5JnCIHWJBXnutBTFx5ycF93xX2ZYCFdcNIC4zSFj3zGjOtTPutpZD2yjQ69QJR/p9O06Mm/W67Ktu6QI63JZrX0Kf9O+Xc7TdiZ9yotpHJWOMvJe6ewnLOmeS5nbLsCx2yPvJ6/b4afq/h+A7Ae2Vdn/9xVZlrVyYVlZZ0SVOV4U44haTHkeAJAn33JM/7s2tjk/tb97Gc/G/34xz+ePNpvP/2X/32iovrg4Z+qJsCXX1hPCJSCUwpQeZ+FnBlXlF/IWCz9A/POkvcsle/TyrJ+/bs/jt7/19+PXvrut061Xrvspe9+uypI/mb8Wfv+zfJ632vZ1vnbTD/467+cPLt62f5/+PpPowfj6dzZPx/93X//q9GF8XN5XNYtt+XfLeuT+fL5FlHCpirAGU+5OkumBKf5fNX0/3z8Of+Q9x5/d1/6zreqMYL+/m//S/We7//299V6FPV2+s8qoMp6AbA7yn65q8yU/fw2991Zp3/67X9U98txLsfDdR5zAdhv+5JnGBNog9Z99mjZcXkSTp1GPldapSyra7sk1Gp3Bzo0OcOZAm778+f5hB/NKS1a2rJt1j1GUNatuR71ANfT1ylhzqIt0tqX5G1+tqxDcxvV26ceZDu3eZzX05WgK4hMxWIblyAGYD5dA0Nn373osWSVutbptK14AWAXaAm0Jjlz9fm4IlsqpamoZlrXGa2y3NKyJJXiPJep+TgtJ9KCojxXQoiff/hlVeDKa8u0vkkrjHZroGqA36OzWWT1HqX7UrMVR547OvsXJ1pvFFnHQ28RlDOK+XfJNshttsc//uC/TloKna1uM+XfKS1a2iFHtlFa5WyiRVDz36Dcf39ylrQp67ToGdxf//sfH42fVUz7bFlu1uHk8s/0tkjLc/k95vsHwG7J/r+rHJDjyLpaUM+SkxHt41JkPVOmybEZAJr2Jc8wJtAaldYM0dXiYx3yfnnfEvC0HzfnafZ1z+NYdqyZLPOtD+orkEV5v7TWKMsunz+P02qjukLG+LlZ485knW68UV9WfcimDb7d3N6bkn/HaWNB5d8tXbXK926aacta5LNN+y6V5RiAE2C39I31Nu8xZB1yPCpjFbXleOSkAgBt+5Jn6A62RqloppCQaVOVzhSW8n6l0NR+HOV+KXA1K955rlyxYxG5okezAJdlJhjq6s6T+1mHebdJllsXEIfbnacrHGlqbu9Nyb9frtbVJ/9uCQZnrXtkWSlUd30nymc77b9/lpMC/Ta7FwDwpPYl4qvjS6vssmlZh3SBbpfhEk51HasAYF8IgQZqWsU8XWcSJixSWZ5WeU+AM03+dlaBKoFC1mmoQVDfeDdNZXtvMggqBeQ++Xeb998shf1pQdA838lydbFp2uMPAbBdOZaUq4Fl2qWWNlmXnPAo67bN1kkAsApCoC1LpTaV20VDl9OaFryUFhNpAp3uNfPoa9mTZSW8mBYEpVA1z6DWJQgYahA0jxIEbeq7lPea9e+RdZrXrCBo1qDT5xvjFvV5bskB1AFYn5MXHtitkGWX1w0AFiUE2oJm8FPCnxK6zGo1sypVODOjcp7Xr38035UwUmm/8aOXlw6C2k3B+1RBwJzB1CFJoXNa16um6t9t/H3ahbCsNJtPmJhp1ncu8lnzXeo6C1x9l6Ys49L4/dry/mXKMlOYz+9tkXUCAAA4BEKgDUulsxn8NFUV3Pt1K5xdkXWat2VJKtk5S9alfLZ8/i6XX5i/j32Wk224CyHHJiW8SKgyj9J9bp4A7zQS2PSdFa2Dl7NVIJWAM1Mu1b7Id6krCJqmHehkOelikFApU5aZ72BZnzIBAAAMgRBog1JBnTVmSebZRCuOVK7nrWCXdeoLcJoSCPSFOdVyPvqis0VQ9XdzdtPJchIkDDEIylXSmoNS1kFLd9e+bKdsn3UHQX1X28q/Z7peJZAqqsGifzG9S1dTGSMi8h7Tvrfl+9VWvpOZMk91GfnxbZFtNLTvEQAAMExCoB1UWnHME7osKxXiRVpaZJ1SwZ6n8t7XMiRS+e7qGpbl5vlFZFlDDYISjpTp7j/8zWScgidbCWUbrTsIynep/W+e53Jll65BmLNOCYLm+XfLcvIZ8/nKbZ7rksGzAQAA6CcEWoNmK4OmVF4z9k1fJbYpy0joss4gKFKxbprW3ahU3met09WLzzxaTtdnzXLaQVD1XM92S1DVW/Ef/00Cjr6/PVTZJukeVkK8hDC5Yknf9k7gMm/rm0Vlue1AJ+uTdcsYPX3rNO/YTvn7LKt81j55z3YYlcfN98/99vhTXX8HAABwiP7s2tjk/tb97Gc/G/34xz+ePNo/qQz/z/f/1+in//Jvo9/87o+jc2f/fFzpPHm1ossvHFXPv/Sdbz+qfJbpVqPbTDx4+KeqJcX7v/39zArwsv7xn/+teo+8V+XMaPR3//2vqvU58fxEWafqM3z325NnT8pnzt+/9N1vVet9Zvzfr8fbo6la7vi9sp1+8Nd/WYVC7//2PyavnvTg6z9Vy2svo8iyfvO7/6zmyXoNVdmG7X+zqLdR/Z3s+3db1j+N37P9b5f3yL9rbvO+nf92k3//rt/JsvK7yvIujJf3P8bv/48/+K+TVx7LbzBh0NHZv6jm+fu//atBf28AAIDT25c848w3Y5P7W3d8fDy6c+fO5NF+qVuk3B41xz9JAJLuK33SeiJ/lwrp9Q+/7G2pkdcTcExb1rLSGqe5zpH1Tguh9udpWmSd8hmvvPNxdduW5WTsmHRxuvCTX3bOM68sq+8KZUPQ9R1sy7bJv+0qQ8V8b9NCrPlvl/dIS6WiDMbcZdbvBAAAYNftS56hO9iKZDyS9pg2ZSyWrrFPUinOa5nSLWZaV51UrrOMaZdY37SyTvN0VyvBQ5csJ9st2yFj25wmwMmy+sKmIci2yzg8ZeDovjGCMsj3KiXEyeXry/vmcTtkSiCUoKdrnUoYCgAAwHoJgXpU4cQCFdPzR2efuLpV/j7hTgKOZsiTSm/G+ynLn9Zyo6jWZxKWrFJCg7Zc0SmV+VlddLJOqxi3KMspIdcqgqC+FidDULeqebEKXHLbty3Ld29V6pDnxUeXYe9637Ju7SBo3qvCAQAAcDpCoJaENXUrndvVNG/AkUpvaYXRVoKJEgTl8TKV8PzNvK1v5lVXzOsWGpmarTjufTX7aktZpwRBWa9p2uMdtVXb5H4dmp02CMq6zFqfQ5Ztl656ue0KZOYdnHxRWeas5eb1dmulPF7H+gAAAHDSGWMCPdZusVOUoGQeCTP6xmVJRbeqlB+d7Z1nHqk4T2vlsYwSSjWXmbBp3lY17TFg2vq2bVu2TwmhusYrasp8Cara85TtnCCEScuzD7+s7qeVV7bbtkOXOvR7WLeg2/K6AAAAnJYxgfbMtNYji7QsSYW2q4tVpOJ789MH1TynaY2RFjOpQK9S1qW9PouEBbli2DTtS4V3vV/7uQwW3Z6nDsDS1el7VfCUedrrmfBHAPRYGcA7U4K69jbdhqxDaa0EAADAZgiB1iChRN9AyEUq4xlMdxkZQyUtKNYtFfSM8dIMWUo3nqY8TsgzTdkmuc2UQKK57KpbUDW48MnwJvOVv8nfpwVUeVzWowRC9et12AEAAACcpDvYxLRuXAkclgkW0gUqLYhKV6sEHW++euFE0NGepxmw5Ll24JK/vXrxmSfCknUrXblK642sc+lilAAo22hZXZ8dAAAA9sW+dAcTAjU0g42MnZIuTqcdQyXhSRkUuS+8yfumm1iU9yrBUO6n1U/p/rXp8AcAAACYTgi0hH3ZaAAAAADFvuQZxgQCAAAAGAAhEAAAAMAACIEAAPZQNabgeCr3Mw5heQwA0MWYQAAAeyQXjnjrF3efCHzKBSXe/P6FU121EwBYnDGBAABYubT4yZTQpzlFbq9PXgMAaBMCAQAckHv3vx69/t7t0ZW3Px5d++Du5FkAACEQAMBeSZevTH3SCujmZw+q6fpHdashAIAQAgGsSMbnyFn319/7RKULWJuM93P1lWdHl58/V01lDKDcb4dDCYRuffZg8ggAGDoDQwOsQCpa6X6RM++RilgqaddevVA9Blin7IOy30kQnUGjm/K8waIBYL0MDA0wIGkFVAKgSIVMNwxg3eoA+pMqhM5tdLUGygQAIAQCWEIqVHXwc/ISzU2lcnbhJ7+cPAOwWmn1k7A5IXRuEz53BT6f33989TCBEAAMl+5gAAtK8PPWB3erK/BEun2lm0WpjHWpxu149cL49mjyDMDp1EHz426os2Q/de+rh9X980+fHV0a75d0EQOA1diXPEMIBLCgXHa5XelKRSrh0LQz7OmiceNHLz/RVQNgWV37o3llX/Tua98TTgPAChgTCGBA0gJoVheLvD6t+xjAoq5efHbpYLnaJ326XIAEAOwnIRDAAqrWPpNuYMuYFRQBLCKtELUwBADmJQQCWMD5o7PjabnKVippKmrAqmW/0hcEzdrnZMBoLRQBYDiMCQSwoOoKPOn+Na48JRAqA6yW54ryWhmINd02MvZG/j4Vr+fGr+csvmAIWEb2Jbcm4wFlH5R9yfUPv6z2Odn3XL34TNX6MPNkf3P5hXPV43Ip+SJ/lwHur716YfIMALAoA0MvQQgE7ItUpO7dH1e00jJoEuJ0PRd5Po9ztj2VrzwuEgJlYFaARSQAyhUJy/4k+5g3v39h5tW+Mn/XFcXm/XsAoJuBoQEOWCpMadXTDHu6novyOAOwNgOg6AqGAGZJ657mfiP3EwolHJomQXXXuGb5+7RmzN/rHgYAh0sIBLBFqXil0nXlnVzmWcULWF72J6V7WJ9p45olHEoonenaB3cnzwIAh0QIBLCkVLgS3OT2tLKMVLwEQcA8Mt5Pu9VhlDHI+uRv+i4rX/Zlub3+0Rcr2bcBALtFCASwgBLWXPjJL8e3t6v7acUzz1nzDAY9TVm2ihcwS7qeZjyxdphzafz8LBn3JwNBz5KuYwDAYRECASygjLmRoCYDq+Y2U86aTxuLo55/diufzJdwKbcA05QgKKHO5efPLTSwc8KjrtZATek6BgAcFiEQwJzqwKf7zHj92mqCm4RLxggC5lGCoBtvvFxd4r0EO2mdeOXtj6vWhX0B9bR9VsYNmhUSAQD7RwgEMKdZFaJ090rFqyu8aV7KeR6Z1xhBwDKyH8o+J4FyAqCuq4blSmB9qlZFr16YPAIADokQCGBOCWTOP332URiU22YwlNdT2Up4k6nI811hTvn75jKaBEHAMtrjj2VfUvZN5XHXZeIj3cnSqigtjACAwyMEAphDzqynAlXGA0pFKV0wmoOr5vlym+Bm2hhBRf4+y8lYHl2qytv4vcuyAZqyb8j+KVPZ93QFx+W1zJfgWcgDAMMkBAKYIRWn9uWSMzbQtEpU5i1dMDJf37y3UmH79EFva6AwRhDQJfuEDCSffU2m7CeuvP2rE/uqpjyffVkC7UvPn5u634nMn9CojC2U98s+Lc/NE3IDALvnzDdjk/tbd3x8PLpz587kEcBuSGWndKMoypn0546eqipffTJfBlh997UXqwpaX+VsHllWWg05gw9Ewphp+58+2ZekFeLlF85V+7ayX8rzzSuMldaPXcoyMhg1ALA/eYaWQAAdmme/U0HKQKlNeS6Vo1kVsMyXsTdytv7Gj17u7fY1jyyrnI0HWFb2JWkRFGW/VKYSAFX7rp6rIUZeT0tGAGC/CIHGyln+csarPE4FMBXBFHSA4SjhTrmyTipLGRC6HQS15fWcHW+rKlOTIChnzUslaxlV5e3DLyePgCHL/qa5z2nvf/I4+5u+/VLpipr9Unvf1PU3bdmvCaUBYL8MPgRK4SWVvWb4U8KgVADz2jJNrYH9dWv8229KZSndvq5OCW9SYcollfu6apUgKPucqxefOVUQlGVkecCwZT9SWu+U+9/83//Xo8Hmc1vuzxPqtGWfV/6u6+9LkAQA7A8h0LjwMqsypcIFRKlodSmVoQQ8syQoSqVsVsuiPhljqATXwLBln1TCnrJ/ym1a9pRQuszT3Ofkft/+rGguu7n8pmXCJQBge3QHA2hJq58+pTLUVfHJc+eP+ruNJbzJ69X98bzNs+xFqZjltq9ylRZFaaFYuq0CzFKFz68+bh2Uwer79jFN+bt6n3RUhdzN/Vt5vijhtBNnALC7Bn91sBRUMk5Hun5FCjepYEVeqypqrn4Bg1J1E/2gHhMosl9oV5hS0bk+nso8qQyVLhcJZzKgatmXRAKgS+PKUntfkv1MlvX5eN6ET1lOeZ+8lrAny8qYRHm9uqR8q7ta1m9aVzSAVcl+KfvIKPucsg8rLaftkwAYon25OtjgQ6AoBZqq4PLCuarQUs5kpTKWShkwLO2KTjMAKprztPcTee3e/YcnWv4sq+yL8l5X3v7V5NmT8nqu8nOa9wFYRPZJdej9ZMuf7BPT4ggAhkIItIR92WgA21AGre/T1WIJGI4SGG/KtH2SEAiGo5wQy4kvZRCGbF/yDGMCAeyBqmXRVw8nj7qlm1i6t3adlQcOV4KYBDL5/fe1zFmHvn1SKoGXnl9u4Htgv9T7njJliI06EAJ2lxAIYA+kUpVxgWYpQZBCGAxDAp+MT5YgKL//3F555+O1B0HTll9eq9bl7Y+r6doHd6vngMNR73fqITUyZR90/cMvJ68Cu0oIBNAhhZpUWjK1Kzsp9PS9tk7znlmvg6BPqs8AHLaMPdYchD6yX8p+at3a79tUWgZkf5Qpg9wLguCwlPAH2C9CIICWVJ5SeUmlpb4U++MuVqnElOfLtEnz9rXP+uYKZ8Aw5Wpd65R90aJX/7r+Ud1qADgMuaBOu1ySK5kCu00IBNBy67MHJ85s1Wey6+bOuUT7yddyyfbHU/O1VUuFa5HlaxEEhy/7hauvPHkV04zXk25Y2Qesa7+06Lg/WY+sjxZBcBiy/3nz+xeqC1NkyoDwrqoMu08IBHBK6f+eik09rXc8nhSyFlFaNQmC4HCVildz/1C6YdX7gNuTZ1crgfmiEgSlBWUCKmD/Zd9z442Xq6uT5oqA87ZYBrZHCATQkrPbzUJMfYbrqHruUkf3h9ICKFNpfbOO8TjK+y9awCpn3wVBcJiyT0jlK5WwrqA4Y/esep9U7++m71OyXn37q+wrtQiCw7Fo2QTYHiEQQEtXU+ZSuLn26oWqspV50gQ6UypDTXmcM93rCILy/nnP9jpm/VL56yuElSCova7A4cvvfplWO9PU+5z+MYHK69lf9ckYQYIgANgsIRBASzu8KV0qigQwCYISyERX8FKCoHW0vukKqYrzUwZkzDrl0tFaBMFhyr6oq7Xiuly9+Exny6PI/ib7mmnhU+YRBAHAZgmBAFpSMcnUVCoyeT4VlrSqyW3XvEWeX1fXsAz62pT3KmOATFPWSRAEh6m0VmyG07m/jiv2VC19JmF4l+xvZu3/Mk97wH0AYH2EQGuUSlYqiSkAKdzA/uhq2VMqUOWy8Pldl/vT5Ldf5l+l05ztzzrpGgaHq7RWzG2mdMkqLRdXbRX7kYxZBABshhDoFFLwScWuWbnL/QQ/paVAKn+51QUD9kdXCJQuC/nNt1vgRF93iCJ/l33BKvcBqdh1ree8yjoBhymtdOrBouswaF1WEQKlG+tp9mcAwPyEQEtKZS6XXG0GPWXK40zNglHu5zLSwO7L77WrQtLVmmfeisuq9wF53xs/evlUFad6P/bJ5BEwFNmXlTJLTlqdRvZBi+6H6isu1gPZ5/bqJKTKfjLr5qQZAKyPEGhJqcyVsTdKoaWrgtiUQo2CDey+jP+T33VTedy8RHtdgTl6VIGZJa2IVrkPyPu3x/5YRD5T1ufK21oqwlDkt359UmbJlFaOs8ovfbIP6dpf9ind1HIp+3qq7+f5OpSqT66tIpwCNie/15QlMi27PwE2RwgEMKeELeUS7WVKJSZB0DxBTMa9eGvSXXQVUvE6f3S2WofTBUEPqkqXIAgO381PTw4gn31AQqFlfv/5m64KX/ZHaeFTuq1mKvvL5nNl35nl1NPjk2ullTWw21Kmye81v99M9X3lCdhlQqAlLXOVjRR2MgG7LZc9TsWkqVRoIrcJg8rjzJuuWaVy0+zq0FQCl5x5P03rmywnlaOMNZYz56nUNd8/8v6pdOW5MuW19joVZZkKbnDYuvYBCajz+8+UfcEqnH+6DqgzZf80bWDq7MO63jf7I60KYLd93hrYvSrrjH/TwO46883Y5P7WHR8fj+7cuTN5tPuSfOeypinoXJpU+NJNLF0+ypV7yo4xr5cAKAWa8nwqaX2VMmB7UvkoY/gk9L38wrkTj/sqNCn8lN90fuvpKpFldVVwMl8JahZRzroVWU72L6lslQpTOcPeVBXMxuvSHrOsKX9z2rGGgN2V3372AX3hShUgj/dv85y0yrKqIHrSgqcp+5Crr9SB+Sx1KN5dacxyltlPApuR8Li9Pymt/mBo9iXPEAJtWHtHmR1kdpTAbkol5979h1U3rmYlJZWSeSo30Q5tmpap4HRVmOZdTkKgWWf7s6zsl7RchMOU33/2BQmpu8KgeYOgLCctEvv2J9mXlIB6mq5KZFOWM2+gBGxWdXJpUkYqv/mUR3IfhmZf8gzdwTaoqky2Li+dHee0gg+wPQlvcpb7ytu/qgo3TWkFOI/87ttNpZvy+rSz8l3S+rCtLCeVqWlSOMvlmKfJsmYFRcD+SuUsgXFpxdyW/V3dsnn2PmDa/iR/n3LPafcl+fvsc5WXYPfUQW890HvCn9wKgGC3CYG2LAWbcpUOYHc0BzrskjE00iIn800zT9Cb/cAiQVDXmEWR5ZSWPtN0hUhtWVbdzcMYQXCoEgT1hTjZH836/Wc/1LxiYpfsQ1exH8lysp+ctc8FNi/7gOxPFmnVDGyPEOiUUrBJZWkepbDUVgo2qbipcMH25Tc9q6VPHbjUv92EQaeV5c0bBOWsW9+4PfV61Zd9P618Pi2C4LDlDP60EGfW7z9dtHLmv7QCaC8rj6ctP9otkroG1o+sSwbWV1YCgOX92bWxyf2t+9nPfjb68Y9/PHm021IAeesX90Y//Zd/qwokDx7+aXT5hTkGUbz/9ej93/7H5NFj+ftf/+6PVf/8H/z1X47Onf3zySvApuX3mN92bueR33V07QPOnf2L0R++rn/fs+T9fjOeL7//l7777cmz3ep5vlXtM9rrWT0+U+Z5cjl5vuvvutTr9J+TitzsFkTAfsn+IL/z7BOaEsT84ev/X9VaOa+99J1vV/N2yb4h+5rsAzPPHxr7oITW2a/99J//7dF+p71fyn4yIXiR5SScyt+nO21zX5XnUk6yPwJg1+xLnqEl0JLSVz5n7HNWapEzUylMTZNlzdslBNgdfeP+JDzJ2fFUqOaRfcAiLYL6+t7PWk5en1dpEeTsOxym0pqndOcoXTqy/8jvP7fTBoBuyt+W8UHSYjGay8l+qb0vae+n8noG5M96ZT/XlkFodQsDgOUIgZbUHuA5BaNZhaNqnp6KYlMCJWB7UvmYpit0Kbr2A5k/laJ5+8pnGavqGpbltMcIKpe6X0SWpWsYHK46vKm7daV7VkKbprI/mUf2RyW8aQc+WU57H9QO0av3+qDeByZEbwbpeS3rlrLSPPtIAOAkIdCS2mP7pMAzrWIYzULRNCngXPjJL515hy3JbzBTl/yOE7qkwlR+86mcPHf0VDUOTwZTzhnq9t9n3lRk5pW/nzcIKsvuam2U5WQ/0hwjqB1iF9Vne+O/dS4nsqx5WwMAh6dv39En+5RZVyPsk6CntBpKi6B296/sh+yLAGBxQqAlpQJYKoGpMF195dnRzU8fVJW/aZW2dqhTFZDGU1sKNlmOM++wHV2/yyKvlTPmmd4cV1DqLqG5Cs5ksOiOsKQr1J3WVSx/XypBs9Rn8V/sDYLSCrF0n+gaoL7p6nhZfco62S/B4coJq6594DLj8GR/0lxW7qelUVOueJh9WFv2M+UKqgna26btpwGAbkKgJZVKYFoEpOKVpsypGJWpq696CjHtilMKWgmQ+mT+tCxQ4YLNmdViL61qEsxkvlRc8vts/0bLb7epPfBqzHMVsoTBc7cIqs6YP1kxynISVGXdS4DdZ9brWRctguBwlTJOc1+QgLkd3swjyyjLypTgO7dN2ZeWedpKsB55PeuTqSwPAFjMmW/GJve37vj4eHTnzp3Jo/2RymC7xU7VOmhSOCmFlARDpSBTlMLVrMpU5usb9wNYvVnBS37jN954POhpfttdv+PmfPOGOV3y2++qPHXJevSFNFlOgucspz1Pnst7ZJ+W59v7q7bmZwMOU9kf9LUOWqW8T8LzBD9tZX9TWkbOCusBYNP2Jc/QEqhDCiGl0DOPrvlSgEmFL5WoMhZHCk/tAlT+dp73yTypsJXCD7Bes854p3tVCXQSnvSNe5F9QdkHLHMWvcg+IPuTefYBJTDqqrBlOWVA1QTLJVjKbbpkpAKW98mUStc0+WzLhlrAfigtHtcdAEXeowyi3/d+WR8BEAAsb7AhUF/wkuAmlaDm7SwprPQVSPI+pRKY+U4jy8r69K07sDqzfmd5vdm9K2eo+yot2QekJWAJW5atTOU9572yV95r2lXDEgSVSzCnG0Zus+ysa/nsuV/WeVYgBLAK2WfV+5zH5ao8N2ssMwBgPoMLgXIWvRnwNM+q53HOapdKUG7L/LOkwJKpT1oNJAgqVxVaVtZrVhcN4PRS6ZgV1rQHKp22D8jYP/n9JmyZNg7YLItcnedxZerJACfrUsKeomvZab1UB0VPDjqdx7O2EcCiyr4rUwmisx8CAE5vcCHQW5OrdyXgyW0eR8Kerm4WdUXp4ROVpbYUWFJA6Qt4quXcr7uZ5az7tMriLIteohVYXH7L0y5tnADk8gsnQ5H8zbRLrBfZVzQDlNzmb6v3nBGqLHp1niyzL8Bpt2Bsn2nPujTXMa2dSqiU5WbcM90ygHXIPqcOoLsHjO6T8lZaXubEW/tkHwAwsIGhS6ueZqCTQkYKGHmur8VPmWeeyk69nO5BDaNZmEkBpW++aepK3fcmj4B16fs9JwRJsFICki4XfvLLR/uazJfWP+0z2dknZZ68XvYvpUViU3mfzJMQZtr79sl71d297lfhVgKcdsUq65KWhiVo7pqnLX+T9c0VEtMyytl6YJua+97I/jpXTRRYw3qUskwsEtjCIdqXgaEHFQJlB9Wu0JXKXMbGaAdExTwVvqYsIxWpropcO0xaNAjqWgawXjmrnDF0IgHKvBWK7AOyP8jvdt6CUdl/lLAmrXPK3y4T/rSV9ZlmnnmKdmiV/WVZ51WsL/Ck/EZL+JoumypetWyT9gm9sh/qCuKB0ynlo1Ju8Dtj6IRAS9jERksB4XoqZuOCU/tseLuiV+ZJhWbRHVopoGUckKJvOXnfzJduHinMlR1pppufPnh0hj2PU/EsBRpg/fJ7bLfY2cRvMO8Xu/x7z3a58vavJo9OynoLrGH1sm9on9AyZk4t5alp4yYmpE63VuD0uvZFOfb3XZQChkAItIRNbbTstNLy5/zR2Sd2Us3X+uZZVJZpZwj7J7/dZqs+3QpOmqfCtUgrSmC27I/yu8v+qchvLPulqxefGfT+qaslUFPZTrrUw+llH3TlnY+f2Bc5AcSQ7UsINMhLxJdCQFfFpPla3zyLWsUygM1LhaIEQJGzXWVcnWYf+KFqtnTsku2VAmK2FbAaXWWK7IuqcOiDk+EQJ2Xb1C0YP548Ayyr1JXa0oshv7FMOVkE7J5BhkAAyypnmuvp9omQaGjmuVJZKl3ZViqmsBqpdHVVvCLB65BD13nGRsq+KN39BUFweuWKoUV+X/W4htkXPaiG2RhyOQl2lRAIoEcuAd931j1T3TKoHhBxiNL1ZB7ZPu0m48DyUvHqu1JgKmAJXocYBmUfM0/r68yXIEjlFNYrv7Vb47ISsFuEQAckO9o0u0zhL7cqXLC8/H7S9WvW7ygViaGeeV9kH5N5BUGwGgk6MhB0rsTTlt/YULuGZV8872fOfEMO8WFTcnEbYLcIgQ5Izv5lqgp/k/vAcspvaZZUIDJvwtehnVWuu6U8bgY+S7ZVfSURYwTBKiQM6mv5MsSAetr26JLWnNknGbcEljPt95bX0kVznm6awGYJgQ5EKlftwt4iZ8SAx/K7uffVw8mj2TJ/CV8TBg1FXeGaPS5QU13pGmZXFVi1VK7SLSy3XZWxRQKRQ1Bd0XXBVgdl3BLlJVhcyj75DXVJS8VcKWxo+yHYB0KgA9Iu+CxaEAJqyxZYShg7pLPKlxZoCVRkOwmCYDUSAKWi1RwjKLepgJWr9Azp95YWUH3ScrGvVYJWirC4vvF+sj9Kl1VgNwmBDkQKfJcal7TPbc7Q37s/f2sG4LGrPRWF+rc1pQvGV19XZ5V1L3i8rboIgmC1ShhUpkjrxJylr1oqDmCMoGqfM+UEWPbrGdC+vV+qA/y6laJ9N8yva7yf/L5yYQ1gdwmBDkgS92bhL5WrFGgyAYvrCzCaFa2uMXEEQbVUxsr+qIsgCFYr43QlDMrtrdbvKiHHEH5r01oCJRSbNuB/2XcrN8F86v3NyXJQPV7g0eQRsIuEQAcmO90UYppTzgAObcBaWKdyRj2/t74xcfJ6KhND+O31tvYZV8ZmVaaynQRBsFoJoNvjdPT9Tg/JrP1IKRNNU+bRIghmy37lxhsvVyd8EgilG1gmYLcJgQ7Q5x1nwVKoAebXG2yMf0upXNWDQN+eWqHIvEMYLLpv/5Ln59n3ZJ5so3nmBabLPikBdFtC677xcA7FvPuceXSVpYBupTtqeiUMIXCGfScEOjBdZ8GyM05hJgWjnNlKZcuZd5guV5mZJr+n9pn2LvV8hztYdN3s+/R9/7Odrrzz8coqcDBUGai1/TvKb3Ra18xDkfKOCigATCcEOhCpZJZwp90yoVRCL/zkl1WrhLyeyZl32Iz8zg51nIlVVriynaa1rAJm6xqoNReOGIKqi+7485f9Um7LJfQXlSsfpuyUfZKTZjCd+gTsFyHQgchAhymo9O2Eu55X4YJ+qTykQrEq+b3d++ph7290X63685SwTKULlpPAI1P2YZnK47b8xkrIcUj7pXdfe/HEFcKyDcp4JW1pIZWQ6MYb/+3ENstz2Sbl5FqmXGofOCn7kPo3cru6Pc2xOy2m8zvLctRPYL3OfDM2ub91x8fHozt37kweMa+yA16mEJdCzxCaiMMyUgjJb2tVUrm4+sqz1aVTVxkwbUtdSbo93gfN7ha3qFJxO4TtBNtQKmNdv6FmZS2/44QhGeT+EMoD7Qpk9iXZBgl2Smvo5nO5X5Rtku7A7X1b5ku4lEFwgVpCm+bvpApWX73Qud+ZJgFQfp+FMgD7al/yDC2BBq6r2ThQa1YOltH++1S2ykDRhzBGUCpTfQFQVWFqfP7cT+hcumbMGkeonIU/zVlFGLJUnroqUPndZspvLFPkd5zf2r7vl/IZ2vuM+nM+rO5n/5OKZblt76PLNrt3/+ETl5rPcrKdVnliAPZZfmtP/E7Gj5cp47QHYm/un4DVEwIdgK6CXgo2qWTVZ/eerMiWClmmsLOFJ6WbZZfy+ym/r9ymQtGsXHzzf/9f1f2usCO/tUMdI6iozpj/qL5sbLZD2S65cki9rV589FrZD7VlOwmCYLX6jvV5/taB/tZKyNUu+yyjK2iCIUqLuWbXy8h+pJRxmi3ygN2iO9gBKWf2ohR0qp3x/foMWNkx57W4nvnvjx+Pd+AlyU+YlIoZ8GS3giK/obv/8DePfl9VQWjyu2prN3Fuyt+ke1iCkX2UbdMXZC3y2fq2c5FlJVDq28bA/PJbyz6plBea8htLOeDqxWeq233UtT/J50pZJ13eMuDzrBAo22ZaV9dF9m9wyPJbS32i67eS+sS8gWuC1bfG5aUsp+yH1EfYR/uSZ/zZtbHJ/a372c9+Nvrxj388ecSiXvrut0eXXziqptyPc2f/vCr0ZCqv5/Z/vv+/qh3tg4d/qgKg3Gb69e/+WJ0JrApM47+BIfv1v+f38GTBJr+VqpAy/j3ld5LfWZ/8vt7/7X9MHp2U5aQJ9G/Gv7sf/PVfTp7dH+fO/sXo/X/9ffU52hb5bH3buciy8j4vffdb9ktwSikDlN9n+7ebxykHfD45YbSPv7eyvzkz+V8+U6bsi/PZsk/K4+y/+2Sfnn1S5u+Sv8/r2UalvAVDVNUtnj8a/eHret9R5LeRAGjefUjmy3JynM+tgJV9tS95hu5gA5S0vbT86ZJwSBcMeLKPelN95mv2b6TrbHtTXs9y+lrU7LLSyrBP+WyzxgaYtp2L+sy8sThgFVLBSmvGVNK6uqymHFCfld/PckA+X+ly2v582Zekq8qsz5bWUKnITjMtvIahyO+kdO3O7y1T3R1+sdaEJTiat/UQsDwh0ADNqpRGqXDNMy8cqnQb6FPC0mndmGLegGOesGTXZL1n7SPy+qrGBsiyBEGwOglJEpYcYhCUCmW66naZZ99VuqPUrRnSKurJQMjFNaCW30fZn+QKeoIc2G1CoD1VKoypWJWCTJ5LBSnTtMpkzlzNKvxE5ukbywSGoKvQ31R+I9MCjmlBUlOWtW8DKfZVjNqqz9bYV7XNu40i+7l92kaw6/IbvjoJOtoSBN38dH9bu+QzXeppjZD9UbMM1Sf7p7RqyLhkzUCotFgo+6R9Dctglbr2I8DuMSbQHkpBI2fnrn/0ZTXWSPrhpv96nvun8eN6XJ+60NbV5z1/09fPva0eU2g/xwWA00oFqG88nyJjQ/xhPPX9TtJfPuNsTeuCWWRZGa8iv7t9GGcin/f93/5+rs+WsTkScnWNxZHPmhZT8+yXylgdZTvZN8Hp5TeYsTjy28pvtClBxz7sj/pkH1HKSdlXZV+d+9mH5AqQv/ndf1afuz12WRnUv56n3jf94w/+a7WdXvrOt6suZ/803v9ljMXMU7bdtLGGADhs+5JnCIH20Fu/uFeFPUUqThnEMRXWpgyK2FUxTeEn889Tccs8Kdikopem0flbGIoH44pDV6WoLb+T/KYyb1cwkUpUCUBmyTzzDFy6K/LZ5gm58nkyJezJ52tXuMrjbMNpynJK2J2/s1+C08t+q4Qj+Y1Fuon9/d/+l8lv7j+f2Lftg3ym7Ceag85m31FaAGXflX195ithV1776b/826NgOp8/Zap6GQnM6vkSADXnyf7NAPYAw2VgaDYqhZh2E8w819U1LIWYN1/NgG3zd1Opxz+5PXkGhiG/lVxWeB75jaRLQH5zXd0CugYo7ZPfXEKjfRkjqN3/P/uifNauz1vvT54cCDvPd42fVAfZ9dSWv8l+KbfA6eV3nH1Vuj9lyvge9e/1dvWbvfL2x3vbHTP7kLKfau8z8jhdVosMet8OtvO4ORi+/Q4A+0oItIfSP71ZIUpFq65gnmw1kAJKVbAZVyZTcGvKvIsO3JZK7oWf/LKzgguHatEzuvnNpbLUriiV31w7zEhFq0v57bbDkl3UVRnKGCOpQPaFN+0gKJWrrn1Ltd1+9PIT+7eihG/AauS3lq5O5RLN9ZUQ65YzuW2GJfuqc7+UkGeyL8s2aO9z2s9lGe3jQ04a9A1GDQC7YvAhUM60JyDpqrTtqgQ3zdYJpXBWzty1Czel4NYOgqJrQNYso6/FQpaVbVUKSnDI6t9OVzBxbmqAmr/LWBLt30l7H5Pf6uUXulvMRHn/XW8RlHVsfrasd+nW1deSat7PVpY97So8pdVUe3sDp9PbImaPf2vtMlSRgKdZfsol4jNv2d/ncVspd5V50sq6K2ACgF0y6BAoFYtUHsqZ5FlX+dkVXYWvrHtVoRoXQK6+0l057QqCusbfmDW+R95fFwyGLL+P/N6mKb+T5nzNcSiinueTmb+3fWkR1DarMlQ+WwKcrjPvkXmyf0tXsb7grcyTCVidtGppByZVa5c9DzrSKrNc/r0v5Mn+KPOUebv2T9kOKXdNmwcAds2gQ6CuClmaOadCMquCt01ZtwQ6TWXdE2IlxOnTDoLuffW4f3uReZrbpUu1nHc+rtYFDlUK+F2han4fs34jkd9Jwptpv5N5lpXXs4xdDanrAOdxa6Zst9LKMN3CpslnSxCU21TC+ltFPawqWXf/4W86WzxG5pm1LYH5VfvASVCS+7md9ZveFwl+sk9Jt1UBDgBDMugQqKt7QSptOZu8y93DUhDrqgCVdc/tNFWAMwmCLp2i0JPK1qwKLuy7nOXtCybm0fydJOTo+u0W094ny+lqubcL8pnSDSKVqkwJaXIb7YCoT7qdZN5UyMrfdsl75d+kLwiatn2BxdVhSR2ULDqW4D6wzwBgaA4uBCpny6edDW6eUe+rnOTvSxi0a1JRSuuEroLLtM/dVIKgFOZOW8G9/uGXk0dwmFIBWkUQFKlI9VU6ZgW4u6wOcHJWve5isYiqe8lkMNVsmzLGRpHn2oF13qO5H8ztobRQgF2T39e+tZSZtzwEAEPzZ9fGJve37rTX1U83rgQ3CSV+87v/rJ576bvfrm6L5jwZY+Lc2T/vHY/jwcM/jR58PZ7Gt5df2K3CT9bnpe9+a3Rm/N+vf/fHybOLyefO5//5/+fFqjtGPucysoxDOzMITeU73vc7SQXppe98q2oN84fx6137lPxdgo4sJ/cXbdVTQo7s0+rWd2eq9dp11T52XBnr+rz5TD/4678c/Y/x1NzH5m/yWrbXhafPVp/77//2ryavPlb2g6mcZrtmWXmvf/znfxv/W305+vW//3G8nLN7sZ1gH5XfW8pV+Y3Xv93tXh0rJ/n+5/v/a/T+b3+/M+sUWa9/+u1/VMeHdtkUgMNw2jxjU858Mza5v3XHx8ejO3fuTB4tJpWinGlvnvlJpSBnpYu8Vg/UuljlK2ek+y51vG3LfqYiny3Nu7u237za2xkOTX4X+f3nNmNhNX8neb5uufL4yjL5LXV1J23+VvJ6s6VhHXo89cRvOX+Trqu5ili8latgjSsRmTfhSF7ftnyWVLbKena1GMhnzX6mbLvsexKarbJ1Qd+/T7b5vrVigH1QTqwV2y4v5bffLhPtwjo190tZj7RiLJfgB+BwnCbP2KSDaQmUA367W1LO/jQrSL/+3X9WZ4cXbvFypq6I7eLZ5KxTKjfv/+vvl2rJkzPpOXues2Q5o/75uJDS1zKqSwpXf/e3f1X9PRyaFNpzRjmDrmcqv7fS2qcU5tNKpbl/yG8qLQ2brfSqecf7kXIGOLd57ujsX1T389o//uD/rF4b73Iezf+PP/iv1e80v7E6SHlQ/dbz/r8ZLz9T3m9bEgClEpj1ShCUfUi2UXt/mXXMc/m8afnzw/93uqKuNpj5p9/+/onjQGl1lf2b/RSsVn77zTJDvV/6z2r/tY3fW/YBP/2X/z15VMs6/eHrP41e+s63n9gvbUJaSr3/2/+YPKr3STk+bHvfDYcq5ZJSdks5rtnSGNZNS6AlnCY56zr70zzrXmQcnOY88+hazq7pOtOUClZ1tZxJAa28VmSe5gCuRfOMfVlO5Lm0PsjYHHm+SAUr75PnS2uFVVfuYBvaZ7nL7yG/m+r30Ph9dCktZCJXy2r/1vqU315T+zdelHXY1j6qq9XTOlr5zKP979WU7aRFEKxWX5kqv7eu8sW6TWvVnN//ptcnuvaRsa1tBIesax+Q35mWd2zKvrQEOpgQKHKQTeobOQOVH327IpWdQ84UJ7TIPLlaz81Pcwa7vsJVzrxHqbile0MO0O3l7ILyWaK66tDR2UcFjaxv1rvsBHPlnTJvKqN5vq/bRjSXU+apKr3j9yjbIstoB2/ltfxN1/aHfdJVwcl3OmFoulFu0qyAI7+5bQRB0yo4mw5dsh5Znz7b7hYChya/uao1UEfokt/ZNkKOvmAqv/+crNp0ma5vHxlZl20F+HCIuspK+Z2l7pO63S7X6zgMQqAlrGqjpTBy6D/udtKdz7trFS6FG/bdLhXep61LZB+wjXEmplUCN90iaNY+Kbaxr4RDlvJIxirraxG0jf1S9gNZr2YZqXn/xo9erm43YVqAr4UCrFZfOaC5D3BCiHXalxBo5y4Rnw03zzTNEH7Uab3UrHTlflr6pNCzKdnO07Z1dsQXfvLLE+sJ+6RqYdfzHc/3O2ecd0W1D/hodgiyagnD+lr9pVI4K7xatVn7/2ynVFiB1UigWlpRt+X3lpbWmy4HJOgtrZCyT2i+f+5vcp9Ut7quu8pH2UfludKFHliN/ObL7z7Kb6+5D0jZZJP1JfZfVxbRN+2Lg2wJNAR9Z5ay09vkWbd5KnhZJ2fe2VcpOHSNxVOkgLGJrmH5nc0T8OT3lt/aplvhTVu/TZ11W2QbbaNLHxyy/PaarW+asg/Yxjhh0dU9bNMtcLJN2pXObIt17xNhqMq+KL+z1JfadZWUkRIWwartS56xcy2B9kk5qG8jTe47e5R1SmuAWcHMKuS9MrbSLJlvnrAIdlEK6dO6DqRysYkWQVVwMUeFoeyXNv17K2ffumRw+k3sJ7N9ylm/aept9KAK04HVKK1vuuT3tq0WeO1WSs19afYFm5D3K/vIMnXtz+ty1WbWCQ5Zwp/yO8t4QM3fW57fRiANu+RgLhG/aanQVJcf/OjL6tKfueTnJi9BmAJV85KjTVmXXMI6O7h1Xg6161KsfbJOuTS0y6Gyj/I7Kpca73RmtPbL/WYg+6nr0JD5sj653eR+KZ+/fWn82NTvP9so26f9/n2yrlm3/Pvlb4HTeem7365/V1//qf5tNU32k9mfbvL3lnVKBbAqF433hyUUShnup//yb9U6bevy8U0JpbM+74/LVgmCXNYaViP7gPy+8ztP3ejv//avqn0CrMO+5BlaAi2pHn+nHpcnU1rfbLJF0KyKYNZt3euz6NmqrM88XTVgF/WduY38Fjbx/V6k+0LZL236N7fNJtb1/nh268Qi86eZeLbRovszoFv2AZnarfLyG0sLxXoQ6c22oM4+Kd0/s17Zj+d3X8pw1Tr1DNy8KWUd6rLbg87uK8Dysg9IGSqTAAiEQEtJoaFdgMlzm6xEzKroZAeXy+Wvs7tDuqQtsiMtha26f/5mC4BwWvmup1tYX3ej8v1eZ+iS5S/6m9tG+FoGZC2yzTLIdtk+2S+tYx+Q5acC1aV0VenaftlO08Z9AhaTs+1pcdMVCJfwZVvy3u33XyQ8XoeuE3vztPoEgGUIgZaQSkQGFW2qnhtPXYWLdbg0oy9r1qGcTVrXWe5l+9NmvbJOgiD2TX7jGeB4WkuXfK/XNUZQKgVdv+WuYKOo9wWbDYKyPglcSvCSAWGzHuXsdm7TGmAd+6U+ea+cAewbs6SsH7Aa2U/m9zbPOF2bVMprTdvuDvpcq0wZXc8BwCoYE+gU0r88fdxf+s63qv6m6VeeSkS5HOo6+3OnwJL+reO3r96n6ss+WZcMwtqU8THe/9ff1/1hx+u5KqnMpVL6RL//iRT++s5k5W/y2kvf/dbWC1+wiPyOMrZNWsJ1ff/zOL/BjIux6jFwMg5Y13g3Wae/++9/Ve0P2r//yDqVMTo2Nc5E2d/k/fIbz/hhzVY6Wc8/jNdplWNxZJl9Y6Vl20TC6+wP2/9useltBIeu/LZTXir7poRDmVb1u19U9kf5nWcfXe2nxuWmv6vGCNleWSTvnf1h9kFZpxw7Mm7JtrYRAMvZlzzjjEvELy9Bz737dRPidmubnGXa5KXay3tnffpa/pSz89NaMSwi75MgqE/O/qVgM22erNO0Ky/Brmn+7jM2WN/3O9/pBA5pDbMqdSujX00enVTOtvd1h4p1rNO8+vYXWe9VXTo6/zaltVGXfP7sl7MPfP29273bKq9vYxvBocq+6+anDx7tg3bhmF9aI58/OrsT6xNlnVaxPwRg8/Ylz9AS6BRyhqYOOeorhDWVs0ybOqucdSnrkxZJXa0Fsi55LdMqWij8+t//2NvSJ3LWb9ZVerJOOSuvRRD7IOFCQoZcFfCn//y/u6+AM5Hn8/1Py8BVBa/5jaSykt9w+32rs+xn6vftk9e21dol79m33mfG/61in5R9YFoWZX/S9V55nP1yWnFde/X/6L2KUTkbv8qWkzBk2Xdln1Ou0rML6v1p3ap6V5R1AmA/uTrYAFQtAsZTKnld8tq2rs7T1wc/65QzTasYMDoV21VUbrNOs1oVwS7IYOtpPZLvbJTbaRJyrHIfkN9cWvR1nbmea33G82S/tM5B47uU9e7aN61yUNZsl7xXWhhmXzjtDH9e79qW82xHAADYR0KgJaSCkEpdriZTXVEmZ+B7ZN66C8d6Bortk8Fr+5RKYGl2vKxUnFKJynTaMCjrNK1VEWzbssFA2QesMuTM760r7M1vclroUdS/t3rssk2qgqCOy7Ou48x33iPv1+5WkUH90/2jyDzpItaU7ao7BgAAh0h3sDmlApeBTX/6z/82ev+3vx/902//o+pCUKZpqtcn3TQ21QXjH8frOS1UybqsqgtGmndnOelaMav71zS6YLDL8t3Mb2qZ73h+b0dn/6JaxioCj4Q35XdSlpvLMf/T6/+v6r3KgKf5XWa+zm5r431S6bK6yd9c6X5RBtbPOtaXj/+y6maXrrWr2k5RBp6+MF5ePmcGgG1/3rJfbs6TbfbWL+5V+/xs77LeAItKy8v6wiH1xQQ2uc8FYHMMDL2EXR1IKWfxcznjaQOuzqO0nNnEGeZ5uleV1gSrkG2UQR9Pc4nl0jog2+fS8+eq9YNdku95BoMu3ZcSvCQgmPW9z3c786WFScKEZX93zffPchKedO1PMl+U1/I4+4Sulj9Zt8y3qn3BvMq65P1LBanY5L6yS9atPXD0ttcJ2E+7tn8DYH32ZWBoIdAcEqasakyPVAJTcVx3wNEudHQpXUlSmVw2dCkV4FLpTFeLvrAsBZ/oqoi2ZV5XDWNX5Tvc/G5mH5HxgtI1NL+BS+PCfVrZ5HfR/r7n7zLPjTdenjwzn9MGEyVA6gqHs5xtBEFFusu29xurDKkX1ReabXOdgP3UdVIu+xEnugAOz76EQMYEmtOqwohUdBKarCpU6pPCxax1zrpkSuEk67TMQLH520ypLGVqV+SKZiXzxhv/7dGl6vvW8XGF93TjFsE6tL+3dTjw4uT7/fLo2qsXqvv5nreV38mi44TlsvTt8cfq38l8g6qX31//OtXBx6blvfdFV6gHAAD7RAg0h1TwUoEqFb/ctu9nnnLlmzxu3pYWN8UmKlx577v/8DePgpasQ+7XldW0HHhynZa5kllaO/Qp2yRT3rN+36NqKpXkrnUpUlHO+giC2Af17+xki5w8l6nLolcNy2DGaUHUVv125wiBir51KvulZcLg0+jbPs91fNZl5bMlKLMvATat7rZbWl7X5cVMALAtuoMtoJwFLhW9PC4VmHblL/PlzH0qbrm98vavJq88lr/N3yUIWaesSzQrW6l8drUeyDy5Uk5CmnlM63ZWAqdZurqCNGWdSoAE+yT7iPzWym+wbdF9QN/vrSxnnm6dWZcLP/nl5NGTFl2nVejaB+T9V1FRyn6uXNp/3v1b379bAu15940ARfYlJYQWAAEcLt3BDlAqRjl4pyIRuZ/nMrWVilRuMw5Hl1IoWKQ1wDKyDmWdizKwbVvWaZEWQc3t0ZbPNqvLS7uS1SXzZH1KAQr2RbUPmNKiJd/thBTz/t4SQHS1nCvLqcYlmvGbqsLpnt9s5O83sV9qyhhKTfmMXfvVZZQAKPLZ5rk0fnu/nu2VdRIAAcvIPiTlJQEQALtACLSgUjm68s7HVcDR1ZqmrS9wiW1UuGZZZJ1SsMkZ+65KZb2c6WOf5O/OPz37UtBZVl+YBrvszVcvdP4+mhbZB2TsoWldKLOsafJbyjRNPc/DmfOtSsKVtLIplaR5ttk8qs/RHkdp/DhB2CylK2u1PuPbRQfyBgCAXSQEWlC5uk4qF6lw1WeZT9dCpV7W7FYzqzQreCnrNE/FNGfMp13JK9tpFeOMbLJSCquS30fp2pTwpi8wzX5lnlA5f58g6DRnlOcJWOYNS1YlQVC2U6ZVtQLK52wvKy2z0k13lvxtWafTbGsAANglgwuBUtlKIJFwY9FgogQjTQk43hovp6/ylvnbZ6K7ZNmZb1NB0LTWSUX5vPNsp1SYpgVB6YLRt5wMmjhPpTSyPiWEg31RgqC0Jslt3/c94/3MHwTVg6o3lzVPN6oEGu0uatVzrXXKPAm9s6+cZ502IetR9t3tfXGf7F9KAJfbVbUyAgCAfXRmaANDtys0iw70mZAmwU9bKhg5O9+uXJRKy7zy94sMzLysVKL6BnRuyzqVSuwsqZjl83aFNFlOKpZd3SqynbI+08Kd/H15Pds7lblVtRiATcr3uC/wWeT3FllG+V10hTlt7d9o5i/vldAnr+d32tzPLbpO69DeR/Ttc/vk7+adFwAAFmVg6B2Uyk377PE8g4QWma+vVU8qTK///9s7m5DLjvPO30YSpI00o9dBYEvIkpLGIUIZ2sLOwhCplVl4MQzSMjvFm4AMjZTl4AHLCy/D2NDYuwk9K+/GWno2bY8HZyHhqEERJNFgGRtFINvdikRaQxoy93fOffqtt7rOx/0+H79fc/p+vOfWrVP1nLrn+Z+nnvr+23eVvy58B4mZ9x0RhLPI1gfqFI5jFziKTRFB0X6lY6MuOJilz8V7aT9FBFb6nshYwKax95JoE+db30hFykA0ZkvLohyEk1Qkgh+9c/PM6+r7lu+FyMP5mydqjjqlnzs0P16e82eOY/l6nfG2NLaIiIiIiMwNcwKtST6NIiWEifTu/jpiS4Cjs++pYakT2odwAvsIQZSNI0mUVU5dTnOy6NzJ5G4/kVE85lTt3RE9JDJkOAc5T0pCEGLwprbN5xClOV/r7e3eZTWJJXx+HdFFRERERESGx6xEIO50swU4O49/+nwl2uAocee9zVFif+6QNzlJEMJEKgQ91iIctTlch8gRhBMaYhCP//ZXf1oUXCCcwPTYmuC4iExoEplKQhDRCDm0d9vUOOpCe4uMFc6RdFzaBZwXnGMBz+O8vXShkEdo+V5Kvg/wetf1XIdnl/W8q95HrI+IiIiIyBi559Ulq+dH58qVK4vLly+vXu2HF556qHIkLj78wOK1t369ePO9j6tpBvH42t99UO3z4Pl7V584y6ULJ4uLj9xfOR8n5++rPpdz89btxfXl+5Rx8ZEHKgeMsku8/CePLs4tH0vTzCiHP1IWddoX1JHyeQSc0mqaXEOd0mPrgv049upYcpbH9tpbH9wRiq6+8f5d7Uk70+YIUE1tePOT0zoh6omMjWo8Wo496XnCOdkkonZRGnPiXOIcYQxjhSze+/M/vluEYh/q8gSPy/Pr4sP3L15+5tHq88eC8Sat96tf+b0zopCIiIiIyDE5hJ6xC2aXGDog8qcpooU7zH0SjraVAXHnnNVp2LcUZcQ+eRLWnCiHSJ1DwXFR5yaoE9NY+jipHHedL6l8jLQ3yaL5znR6F9/BMYeDSqQW4lRTOdTlkG0kskuwe86BX9z4pIoexJ45BzahdC71PV9ziP5DeNm0LiIiIiIic2AsiaFnIwLhFHFnnKXRmWLUJiYADk/bkueQO1ol+DwiBt/b9n1dRDmHEjki/0/Xse1KCKKcKrntSuiBF5fllsqm3a8ut7ysEJNE5HTMA6ZSbSIAiYiIiIhIPxSBNmBfjYagQcLmdUUYRIXSMuTpHXseu0iFpDZRpQvKOcTy8UEIMjEtrFR36pRG67TB55/73s+K5eCgriNwlUSqdcsQERERERER2QVjEYEmlRgaYQDhIp+mhVCwSRQOnylFwxD9wxbfUScorbcS8XkEnG3uxlNORMkcAsQmpsVVEVENya2rti0kdC4RkUMl2pJnl0B0ilXDKJdHpt2JiIiIiIiISJnJiECIEUT7hDiTijTbUIkcifDCa6Z2pRApQ8QQU5HahCAihxAq0sigoUNd2Zia1XRs6xxPROvwGGXzfBNxLEQqyqvb/nhJa0VE2uA3gN+kXfwuiYjsAsYjbp6m17kiIjJ9JiMC8QOWRvtwwU3eGNhUZAgoqy9tq1MhHtUiUv/yUkKMOQa0H4ILkTypGMT764ovdVn10vRslLmOkJTC5xR/RGTI1NNX364iS2Pb9HdARGQXPPfdn1VjETdNY1wSEZF5MKlIoDYQG5oiWdqIaJUghJh4r3pdTUuqhQgSsKb7p5CQmr/lf+c1daOOCCTp33nOewglbDw/FtQljb7ZVsChzdg2/byIyBjIc9Jx9538aN59l23AfrAlBUVZlzr65+yN01qsVggSEZkDk0kMzY9XeqGNsJAnUeZHLk1MzD48R4BJfwzjfR4RKRA7cvi+KCcXZrgoi1V5IFYki7qkCZcpP1+5J72oy0UhETk8nI/v3rhV5b+KccHzUvoQjlWM6SnYUH2DwmhG6Q82xVh09Y36WoFrGKKQS9cqIjnYTNMiHYxJ5IB0pVURkc1wdbAN2LbR4sKI3DtNSyLzo4fIAvzYsU98Di5dePDOD2M4e/uA78Cp9OJfZLg0rZDH2FAlTF8+irTB703b3XVtSdaBMYiphemNq4DrGYUg6QIbahKBAm1JRGQzFIE2YCyNJiLTBwGIXAlNcPfdu6XSBQJQ3HhoAlticQFvCkgXbaJi3LjaZpq2zAPyAZWExCBsSSFIRGQ9xqJnTGqJeJEmuOOFU8/FM48iXRBR2AbRQU3TfETWAWcMWyIqVWRTGItqkejt1TsiZdoWMYGwJa+XRESmiSKQzAIiOti4qOHxiW/9VOddWnnspP1Oelwkm+BX2uiyowB7UgiSLtJ8g02EqCiyLUyHFhGR6aEIJJOn5FjhcOm8SxvkRCjlFcvReZc2sKG+U3PClngU2QbGI8ckaYK8mX3RlkREpocikEwaQpmJ1ig5VTpc0gaOO7k1yNfSBTbE6oQiOdgRq+30pR6XSPyr0yV3s47zfvX196vfP5EcxOl6VbnusYnrJDanhomITAdFIJksOFEsodtG5by3JP8ViZXBumA/km0qKkoK41BfGwrMESRN4LwjTufkzjzjUEx/9maHlPjrP3ty9exuwp4Yi7CduFbiN05ERMaPIpBMlrhw6QJHS4dLSqwTxYGtccHsNEPZBdiT45KUePUrT1SrNsWUVZ7//OtfLq4Khh1F7rI+v4cyH5qipKvVChuiYBG0jS4TERk/ikAyWVjetO9UHi5qvFsqJV5cOlnrgA3pvEvAOPTiF5ttqBIaM8c9wJacZiglQvwJMQgQh7C3EvE7JxI0rYDJb17YVA525HWSiMj4UQSSyYJjlTvwrXe4lhc23C31Qllycicd++Eiuc15VwiSoMlOgEizNpHIaYbSB8YabOTFL32m0d6YHs24JNLG1eU1ENdBpWXksS1WDMOOzBEkIjJeFIFk0uTL6XJRw93S0sUNcBHNvHeddwmwidwB75Pjhc8oBEmMKU1gS23LMPP5mGaY26EI4wvjDFs1FfWdm53RQApBAgiGpRtijDeMWY+d/M6dmx2xxd+xI/ZRCBIRGSeKQDJZuDjOHXBec9Hy7m9vrd65m3DejQgSKN1VD2eqyykPW+raT6YLY05b//O3/qLi26tXIrVNMF0wxiI2on3aft+g9Nso8wOxkOTQpalf2BLTxZhueO2lp6uNKGreT2kTsEVEZLgoAsmsqC6aq0ifsxFCObGfQpBwgdyUH6EP2JJRHPOlT7/3tQ3GLaM4JKjFnLO/ZdjSs0k+vCYR2/FIAPtA3GFrIqKAYhMRkfEzORHIO1zzhr5HuGF7/OR875WdSnCRrBAkwAXyNhe/2JJ2NE8uXXhwp45TjG8iJbA1bI4ID6I4GLtyERuBiCgQxSABbAYbSaeG8d6z2VQxbCadasg+6y6cINNlV2OJ45LIYTj3b0tWz4/OH/zBHyz+/u//fvVqPRgw6giPWgAi0Sa5X2Q+0PeExsedUS5QdvFDwoURF9SUJ/OFaYT1VIvNbKq6YF6OS1xsa0vzgsTOXdGH66AtCTAWMUUw/c2rp/j8YfU6hfErVoMiFwy5g2IqD5FDXi8J9hQCM0JiKviksA/7xj7YlrY0X7AHkokzrbla6GD5u7RJ9DQ2pR8nU2AbPeOQTEYE4keIwSPgYqh0B0ymy77y+ITD5Y/RPOHC5N0bt6rIMi5OSDbOI+9vAvaEk9Z0gS3ToyQC8dtUsiPsgwtpktfzG9YWjagtCTaEoIPAQ+RGn2se7Am7Sm0PWyLvC48ifcGW8imq3Di79rWnV69k6uS/b5veONWPk6kwFhFoMtPB4g5XUDluGzppIjmxJGrcoZDpw/jBxQ132un7yOvT5HSXLnhK71GGtjQfKqEn+30Ku8Dp5gI3XtcXz39YOVA88j6PXAinUzWCsCV/6+YJ/c6GDWEnfZ2l+FwKr008LuuSr8AKCAL8dsr0Kf2+0f+bXN/ox4kclsmIQCxlmcLFc8kBk+mSz1/vAzbChXPqiOXwI8SPWtzx2ke0kQwP+rm+mLl552KE6WBc3MTdqRhneM57seGQhfNesivKUgiaB2E7Kbym73G6w05qm3myKDAShfiN5dZkSyYenx+MT/R7CNTr/C41/dYx1nE3XqQv+bV3oC3Ng1LuzbguWhf9OJHDcs+rS1bPj86VK1cWly9fXr1aD0LnP/zk9uLmcrv48P2L5596aPHKM4+u/ipz4OIjD1SP51b/3bx1u/oBefD8vZVNXLpwUj3nkX3ZcKywkxcSe3liaUvYD3clKCOF19ff+7guc/V9Mk2q6RLZnSn6/xdLZxt7Qfi5+Mj9d2wHe8C2Uvt6c2krV19/f/Xps0RZOP3Yk0wTbOC1t369enVKNbasxqmwnzY7wKlqs6Xr731U2aRMHwQ/xidsC+j/D5db37HkB0t7LEVwQPzuMY6JdLIcw5rGJa6l+H2U6RLjDeNPlRNoec3NOLSJ/5X6cZRLGoZNyhE5NtvoGYdkMjmBgrgbqno8X7CBPFnmujl96rv0zdMsKJM796W79jINmqK+6HvufPVJgJnbYgmm+SBGakvTBBtoi9QJe+rKoYEtYpNtUJZ5XaZP6fdpnd+kPPdGCQRFyhNpA1t87rt/u3p1Fm1oPmAHMR5tezMiyvF3TMaKOYGORHVB7cAxa2IaT8APCnc3+ZGq/7b9FBzKbBIJZBqwgk5THpYqKuON7qW6+4xFlNUmOMq4SS+OS/A37qD2mTrRZU/1uGRel6mD0JOLPaX3tgG73cVvpUybpiggfjv5DZV5wNiD+LOLaFT9OJHDMDkRSOYNznTpDmfcRU+3bcHh4ru8UJ4mXNREgl4ubPKLkuj/NiGozflPCeddW5oeTdNuUuj/PqJiH3tCVCQpa1/bk3GCg824hLPNow63DAVssim/mYiIDIPZiUBcGLPpbE0PHKg+Dnn0/y5Wr6AsBKUu503GCw4WQhBTCnPo/zYhqL6jdX71qh0jgqbJu7+9tXrWDv1+dWlHTf1fR3r0S36PLTkmTRvsgXEJZ5vHdRzuSxcePCNql+661/ZWl+mYJE2wIEdqP4xRTUnsRURkOEwmMXQXMQf+tbc+WHznJ7+sEnXyfB0nTYZNW7LLHBJfRtLfcgLMc9Wy8Hli4BLrJuWUcRJJCyMZa0D/X3y4Tgpdgr+XEgOXqGypSm7fniRYxgMOdDou8ZtD39LXd3HuNDFvnniez/Abln6OVcVIhF8apygnktj7GzddNhknsAc+d3L+vsrOXvzSZxfffv7z1XuxMAIJWX+wvEb6y9f+sbpWwo5NFi05kdA+bOnlpd2sI0iKiEwNE0NvwL4SKXFHlIvn0t2suMsv44d+XneaFw4ZFywlG2izmxL1HPjdzImW4VKK/KLvSRSNPeX9T8QZkRnrQDnr3t2XYVIal7ARIoSa7IL+R+BJbYnoxTxSjH1ITt5mY9qSbEKbvYmIiEgZE0MPCC5imhx5LsT7OvkybDbpRz6Dk1aaGoYDxqo9fcEJa5saJNMgdc5xsNmi79lSW8KRKkVp8BmEo6bpPdglDpjTVsdPKTrxseW4EtN4ctEQ6P/8c7yXj3FE+wC5q7BL7CqHzzQlbxVp4kfv3Gy0NxERERk3sxCBShfGKTjtTBfLL3hkXIRDvgk48bkQ1OTAt4ENKQRNG2wMhzuiK9Jxg+fYTJd4w36IADjvJREA2AfnPS1fpgN2RN83CUHrQoQGZZXGQG92yLps+lsqIiIiw2fyIlB+4cuFTXpxg8N25w7+936m8z5icoc8B0erzdnKhSDKaiqPcpoukvkM9mQUx3Sh77EBkmLmpHbz+Mn5YjQZn3/3Ru2Y12JSOSKI8QhbkvHCqk1p//I8H4dKdpS/F+NXjDuUQ9mMM9hJJVontieyDam9sYW9iYiIyPiZdE4gLoq/+UOc8TqsnguZCJlP30/hQoe78zI+cITy3Bsp0f84SW2ONRe+OObhgOdOVX1BfHLH6Woivo/yZJrQ//XS7qdjSTrOQNhbaiuMMxFlFiJRaTyCsLe0TBkX6VhBX5b6kWhUktED+aWacq/EjYoYg8K2UntL4X3HIdmUsN0muxUREZFTxpITaNIiEIJAXDAHcTFM1E9+sQxc5HCxU9+9NZHmmIgV4Nqgf3G6mxzuIMTAtoSrfdABmz44SfW0rXopcBz4dGU5lpan/8OZIq9GPi71ATsyKeu0id+kvs52aXzis2k52J92IyIiIrJ/TAw9UK6+QbTI20UBCHg/Iko2cdRk2NC/fUQd9sHBQghCENoUvg9hCgFApgliMZFjkeMHkQf7oe/ZGHOY+oUQhDNOUuAcnPUuodCkrNMHO+grAGFbOSH6IBjGpgAkIiIiIimTEoFwtBFuQrwhp0J+Qd1XBAjnXSFoPFy6sLlYUyIVgraJ5KmEAFfnmTwx1kREUED/pw57ycknOg0h6drXvlA57rnwyGdKeWNkvmATj3/6/OpVDXYUYiPbNuOWiIiIiEyTSUwHQ6i5uhJrcNzDyfr517+8k+k8deJWp4YNHRztpml+TeBs40i1iX30P87UE9/66Vplp8T0Mpk+eRRhaQzBlgB74u8IP7nD3pQjJqLKHJPGRYwd8fu0CygTW8NOGMfWmcbM58L++Mwu6yX7I6aVwhD6LWyQSEWiHI08k03BtuOGmbYkImPFnEAbsEmjcfGRJ10NcKy4QGr6e18MqR8P64p+ON44TjjuTTbCPjjxsKmoGI4WFzaUp8M1XbCjmAJIZMaLy/7OBR4IoShsowRlpbaCnaYiUIxxMmzoa25UkCeKfiOqq2QThwKBsZqmuBrzsCFvdgwfzv10UQtuLnxjeW1yzH4rid7cgBNZB8aifJEFr71FZIyYE+hA8MMRF7I53JmqnPwvbnexbS6O8UDERIkmRxlRpmkZ7yDN4RJTw6I8HutoorOfT99nw0ZDsCRaKb1olmFDX+HopAJMG/Q3DvW1l55unUrI+2xtDlxqVzju1CXGPJ5jS33qJMeD/qltp84TFePAsfqNOlSJy5ePAc/72rccD6IkUieZ54hCaV8eEuwltxnqws0SkXWobensDbaIhBURkd0zi8TQ3EngzhRO+SakIoAMmxBdchB5yLeS2gDPySPE/txNTT8X5bBP7sTj4HOHisfK2V86+jyGU3/6tyerx1xg4iIZJ1AhaPiEw84jW37Xu42SHW5DSYzWeR8+P3rn7sjB6LdjjAEkKY+V61KiTjzKeMBxHtr5T52wJRERERkm97y6ZPX86Fy5cmVx+fLl1at+kAfh+nsf3XVRe+rY14kzHzx/7x1nHmeK1xcfvn9x6cJJ9XxxblG95jH+RhlM5TAcdTxcfOSBxc1bt6s+5jGoHfJzy778veU+9y9eeOqhxSvPfK7av/77+ep9ooKIzHjlmUeXNvBAtU/JmedzbGFfPFImGzbFa+yIi+Hv/ORX1T4p1O36ex/XtraqgwwP+i69O0m/nZy/r+rnQxLCYWrTAe/9eFnHyn5X9ijD4eob7y/eXJ7rOfTbh8uN8ab6DToQ/Fa+9tavG23pw09uH9y+pR/0D78bed/RX8f4HWG8oT5F+17akb9v0hfshOu2sCWuu17mOkz7EZGRsYmecQwmkRgaBym/E8aFdcl5h9i3mga03CfufPI8/nbMOfayOfRf091sonoOnZw5okeawOaIFtLehkkpWoM+I7rrkLk4sOc8X0IO9WIKGo8yHNryiNFX2NAhcwRhS20J9KNO6ySZlsPBmMTvXPQfv2tEnR7rvG8am6I+2BC/cSJdYEth20RpO/6IyBgxMfQGjKXRZLiUnPaAi9K2RL37oK0+AfViCtmh6iT9aRPx6LdDCnh9kpIfuk7STZ8x4NCOfJ86MR7pvA8T+o7oP6aqD8VZbrMp7MjfNxERmQMmhp4oJGfFGWPjuQwH7h69+9tbq1d3U99lunnQfDx98klRL3MEDRMcF7aSc06/xXK2Q4E64YzxKOOBKVrk6jkE9TjYnUOmbSyV4xICHVPVhyL4Up+m1Qodj0RERIaFIlBPuIiJZXUREth4jhjkBc4w4OKzT04U+gvR5RAiHndp+xB1UggaHm3OzSHpm+8nbEmGwdAWFqjGyR51Mr+UrAuiVL4aa/27PKxzQEREZO4oAnUQOWaY845jlQo+PEcMIr+CDANya/SBvkPEo2/3Td8L4KpOryMyDmulF6nvvCMEpdCvfe1tF5Cjpb8t3apEznS8kuPQFEkW8LdwnOkzhOB99xtTYpmCFpTqh3hFXQ5VJxkn2AU2EnaCEMRYiX2xYducAyIiIjIczAnUQghAXRe/XECb02UYtOUlKMFF6j4T/GI7bUlYS2hPwwXbIhcH4CQfeuVAvn8d4RIbMsHv8eH8LyXPjfEHvrl0ouPvlfO87Lt9jgH8vsXy9UQsMrUxBOiwF17H2EVdzBEkOelvbgiajIthNyWBUUREZKqYE2gCcIHcx3lnHyM4hsG6Uy9wunC+1hGO1mETm8CeiDrTnoZHOMKRjyOFfkud5n0QAlSJkrO1rmgk+4G+IfFzKurUtvRkJbjUAsxp31bj0p6nh/K92DAbz8OuYyOaLLVlbNsxSVJym8Befrx6jc0rAImIiAwTRaAdwUU7zhYh0TIuwuHah7OM076JKMBn0jusMmxqseXtqs/icde0OeEx7YLHHGxJOzo+OMRE+IXIwvM2J5l+O7QYjBjE1jRmbTKWiYiIiMiwUARqgRD5de5kcYEceWYOeeEup8RdyBLceW/qT/qOPtuH894G9WmrU56HSoZHLfxwzteCX/1466BjwLOrqI4mtKFhwLnOOJSPReSWKo0D1RhwhBsL9bh0NjE0yaQRiESCEA0D7IaxSERERIaNIlADXHwTop87T3GhHokPc9g/pmAoBA2Pay89XXS2gL6jz3YZzdWVzJfvzFdTSeHv5BTSloYJ53qpbxCCIt/KrsgdrhTEZ+y25IBhf31XqZPjgCjU1LcsH3+M3xN+4yI3GRu5i9rGMpknqZ3w2CZGi4iIyDAwMXQDOFREYTTBBQ+0TbPggpmw/6aLe9k9Xf1WOcTL/ujqt0huuQtw4LadjkOd4kJbhkObvXHu76O/nvsuomBZYMJG4Bc3PlkQjUQ0B1Em2s04aLMnbjpc+9rTq1ciIiIiMjRMDD1ycKLa4K5s151Zojh2IQBIf+okp+1RD139Qb9FZMUu2MUy4tTJqWHDA3GOLQfRZV/iL0IAYk/pexm3OAcQoNhvX0KU7Ifou2KU6bJvjQgUERERkW2ZjAiEc4zTznaIC2W+r49DHs67F++HgXbGWWqir4jCfghBuxDwEAN24YhTJ5IO9z0G2T/0ayRkRpThNQJNk0izKxALIuonZd3V8WR4YEP1qmFnhSBy8jx+cjZPj4iIiIjIupwb83QwHP7Iu4HDHs4xzte203koi1wsu3K4qZNTw/YPNkH01a76rXbI/nD1anMQk6jXtuzCtmX3pGNPE+yzC2Eo/a40VwwiAXlb+o4xIXDuQqCUdugz+ok+W6d/ri43RG369sVlP9FX0W+Uswt72pZKeF/ZpLYkIiIic2Ys08FGKwJxIdw2PYaL421Fl7bcG5tgTofDsM4UPOwEB6upn8Np2zavCvXpIwJhIzh72HUpN0g4fbuokxwGnOQ6yfx2OXrCJioxYWmzsSLYqQh0/o59tJGWA9jSviOX5gztzApfjDG08ToiLn317o2l3awigKLfeD/GimOOAemxAXXZhWguIiIiMkbGIgLd8+qS1fOjc+XKlcXly5dXr9r5zk9+defCs8TNW7erC+dLF7aLvLn+3sdVWTvh3GLx4Pl7l9t91aPsHpyjuHvehxeeemjx/HJr6mfee3P5N/7Oxv6bcPOT24tfVA7daRRH/n04UP/zq/9hcfGRByq7ZUWnc8t/fDb25TGtE3bE/jJMsMe/fO0fFz9469dV32/Tb9/+379cjnu/rPqfssj/w3PsBnGp75iSlhO29OHSxja1bWnnm//r3ar/gfam3y4+cn/VZ13Qp9G3P3jrg0oEogzABrClvmXtg/TYAFtibHNMEhERkTmyjp5xTEabE4i76vsm7mrmuRm2gYt48rrEXXjZLUTctImDabRDfSf9M1U/EwnBI++VIiJw5umzTad01VM3Th01yvu3v/rTyr7i+/McL3yGv/N+yQYpA3vqG/Ukhwebye2Rfvtxi402kSerr8tZfxwpJb0P26ZM2S35bxVtvEk7lz7De0SZiYiIiIj0ZbQiEFMh2sCRLznz65I77ylRfv5dOOw49mzp+3Hxj1O4zpQl6U/JwQ1Ssad6nuRP4TWCS6yoVLKduu82E4Jqceqsw850w/hepoeUvhPYp8neqZNC0PhAGKDv1qGU9HmTCJBSOdQFG9KOdk/eR01C86Yc4oZIE9hS/tu3y2MTERERkd0z2ulgMc3rieUFNqHn+ZbmVWF6EBvwt3XAKSLpdITgB4gJrzzzaCUi4KS/8iefq0L2q9d/vHy9/NvFhx+o7tSXpiZR3ofLjf37TuOQbmjX15LpCSlMq6r6atk3TH1pcqDpL8rI+xx4j3Los3VsiSkTeb1iSk+faThX33i/mmpRgjode1qIlGHq5/X3Prp7DDi3qMYGIoJiyk8X7PPa331wxy5xthnn1h3TKIfpXyV7Yjx1Wthu4XeA9q77ue6zTdq4qd8ob9tpz5vC92KP8Tv88uo3UURERGSOjGU62KhXB2uDpeIRgFK4ACfqYp2L1FI5wB3PPkme2yJ+4o5pRKfI9iD8ta3qRr/1WUGpK1KLvqMM7KkPlNUUQdTHlprsMIU6aUvDo5oS9s7NM1O30ili9D9Lgsd40AZ2TXk8kjNqG4cbm8Sm0nMF+3Hluf1AO/fp4zai/+OmBsIQfbZtuSIiIiKyPWNJDD3a6WBdEL2TwwU0K5m0Ofc5XFyXLrBx4pjOkzpQ68JnqzotHbF8qpBsBn1VC33lPE4xFa+rvbumWIQzhjjTB5z1JkeNKJF1bLIJbWmY0PcIK/VUwydX756CTfbtM2wIkY/ythGAgHJYqYpzJcpVQNwfTef/OkQ/hS01TV0VEREREWlikiIQjnmTOIPDhaPc13nngrurrDZK+TdyKL8r8kT6g3OMk9QkBEV7N/Vr0/s57IfY2BThk4Kjdu2lcp36fl8fKAuhc5dlyu7ADojeSDmmE4+YhJiAbSoojAv7SkREREQ2YXIiUDjmbcQ+fUQX9mm72ObvT3zrp41Od98765XzbhTHTukSgpoEPPq7K/F4QDlEDfWxJcrF4c7rxPtsdVnNdpR+judNdok4qaA4XJ5d9l30JX2IaEn/cu6zNdnAvgj7ExERERGR6TPaxNBN/OCtD3otmRvJdHlsS6r5nZ/8qnKq26AMEnaWkn2++d5HVfLXSObaBvucW/4jkajJoncDDnXTctwkeMYGSol5ec37acLTpoTTTOeKcrqS9LIPTn+aKDbKRpSqEokv65zbZHwuHkk+/u3nP1/vnycdXkLC6aZjk+OCjYT4w0Y0TuR8wg4id9C6CZ9FREREROR4mBh6A7ZNpITz/NXvv90p2qTgjLUl0+07TSucujxRMJ/tM10opatO0p8+7U9713mE7hYDq+iMd07tCQe9yb6abKCJiPigjnlUEpEiXcmiA46vKYIEG+pbHzkO9B19mPaf/SYiIiIiMi5MDH0E3r1xqxgV0QaOFw54k1DA1A2c+y4oB2eeZNEpTVEobUSd+ohP0g6iTJeYRnvnTjjgnJNfh75gQwBiOWYEunxKF/B5PtO337ArNqJ2crDj3JaaQCxorlN7gms5PthNbnv0W/6eiIiIiIjItkxKBMLhf7xHIuaccN5LyaLjjjxOdjjabaIQUSJtOYL6wucRHqiXbA59Rf9d+9oXqv5r6jvaO19angigNOqH5/w9kuk2CUEs35yW00UpeTif5/v6CkrYKQJVjlPBhg/jVm5L9FvbOCMiIiIiIrIJoxaBcJCJ4EhXA/vG0kHHIS6JNbwuOe5QOe8NKz3hpFV5O1bOP2ICokITlMW0NGhbHYz6UNc2YaIUoSLrE33IKkht7Z0KQaUInaAt6gzxpp6W2E/Aa7OBdSLCKCfKYsPWX/zSZ1Z/laFCXyHg0V9s9CFjjIiIiIiIyK4ZbU6gSKQa4DilOTRCiEkjOSpn64uf7czrwj4IBm3g4HcJNJSF6NCWp4h9oK0cHEPELYQM2Y6SXeTQ3oh99DE2Fn1DX2Fj9EOfctL9u+gqD1GgyyYD6k15fG/Yl4wD+s0+ExEREREZH+YE2jOxgk6A45tGBPE6d6j5Wz3FqtlxZ5+miKAUHOwu556yiCxpmjoE7BN1boL6Uh9zBG0PDnbXFCnaG/uJiIyIsOF5H0EnoF/TpNJt1ILRk9X3lEQA7L3LTgLq2FSODBv7TERERERE9slkcgLhICPwILrgwMOmDlXlvK9EpTaYatP1HZRFhAcrPTUJQX2I44tjk81BzKkFnXr6TRuIKUTzsPF8n2BLfA91UwwQERERERGRXTMqEQghhA2ebYjIqEWXOopnnaiNHMohIqhNdKH8EAcQE5ocdyJLWOkJIWgbIaGq0+vvr17JptBPVX6gZX+UxDn+3iXC1PucjSjivbSs6vWF9YW/2p5ObZdysPeuOomIjJ34jRfZBuxIW5JdoC31wzYSGRejyQlEVE41JeZGnesEcaZtwMFhRqBBNNlmGhVRGX1zsUSi6iZCMEIQKk1JCyef42OJ6NI+fJ5yZHdgSywFj22xuhxJevuIddgffU4CaRKA8xkSRscUMASgTYVIyg4bxy761GcTonyRTeEc+PFyrIpzQHu6m2gjePb36+TfchbaiJUVAYGdSNtNx0+ZN3G9CNqSbENqS9yM6+sPzIkYu8M/83yTuTOWnECjEIEYYNIEvX0JAWebfDoh3PQlBIWSgBP14TjyJMA4TiSkToUDfnw47pR1RClZD/ru8ZN5LM2di6o6pmWwCUQ9hD7b6G4QtLGhGJs5dxgzvQA8Jf/9oo1oH8X8UzjP+J1Of+O1JdmE0vUi47bnm6xLaezmGtzrgFNom9yf8XyTuWNi6B3CIJP+oPcllviuLyTXn5bDgL/uYF9f3D9ZfTaF1/Eej0xD4seEerHFimTpBS+vqTt1YB8FoH5gK4gcOBW5Y9EGbZ/32xShTbiw4UebtokLnU2F0qkSgm60jW10FtonFYCA59gXf5MaIoDyNgrRQ2pok7SNgNdVhGb2vkgbJVvifHNMknUpjd0R0Sk1RL9zHZBSXRs4bosMnlGIQKmA0hf25859UBJmSrAPggvCC8u7bwJl/PzrX75L5MkFpVrkebLamsSdUNQRjfJ9Shc7sqic9XDY2UgWrvNeU9vMrdWrU3hfkeMsRACld7doIy8AT2kaf3hPIegUpsnl0Ea0j+dbO5x/jEsiIoemNHaX3pszVfR81ia8XtdnE5HDc8+rS1bPj86VK1cWly9fXr065eIjDyxu3rpdRfY8eP7exQtPPVS9x/PFueXfH75/cenCSfWagYft+eU+rzzz6KqExZ3P8fjEp89Xf0dUqaNsThYn5+9bvLzcn9d//qWHq8eq/C2gTpTN977wRw+t3j0L37Hu99TOw/uL7/zkl9V2/b2Pq/ahTeYOzhVOA+0R8Jw2eu2tD6p+nTNvvvfR4uob759pnyDa6eIj9y/PofZl9OcADmgu+sS5evOT27NvI9qA9mmypV8sz0XGv23H0dGz/I0qtROvP1xu9W/WvG3pzWp8/vXq1VmwM9qK31ORLkrjNteIXNfNfiyStWBc/pDxZ7lhO1zL41doR6dEW/BbFv4YeTX1R2TONOkZQ2M0iaGhuvN841blWKSvI48Lr2HKCjR3jkvTCKrpYl85O51sjmAD+fzkALugfeY8VxkBEfuJc6UE7eS897qt8vxenGe81paax6IUx6WatvPO862fLdE+cz7fpB+cY9wI4pzjeRWJvbSduf+eyeZgSzD337E2ONdSf0xkzpgTaA+E4xXE6xhweJz64BOrp+TgmHIRPffpBbUNlO+q8yPFjznJbOcK5wtTE9uIi+jZ29LyYubuue61IKQt9SPGJdprznDeIfSUfp9om6ZxfS7QPqmTXmonzre5j0nSDbaDWMj5xiPT7RWAZBsYn9ikGc472qg0dovIMBmVCCTt6Lx3Qxvh2M/Veef4Y7nTNrSlOjqBdmgibCnuEs6Nvhd8tJNj0mkkC5EJchbsCKc9IqJKglnbuSiSgx2x6ZSKiIjcjSLQyOjKHaHzvli8+KXPtDpa4bx3TT+YO2FLcxU5+lDZ0kydU5yrPCFkE7FS49xBOCMyIR+fnvUuc2VP9WIJ9YqYecQibebdeBEREZHtGU1OIJb8jggGLpibVtOaKjjieX6SNrigru86z/Oiuc/UONqodsrmlWeCcwlxpy+0Eyvl8TgnsB/aqU3kCRsCViPEeZ0Tfc+zEIsQsZumRc0JxvOrr79fPWe1mbn9npXAjkjoy+qF8RvPWBUCYi3uKwKJiIjIcBlLTqBRiEC5M4YDEWHjc4Djbkp23AbtNFchiOlefdorHFSW4J8LnE/rRkF5ztXTC3DYcUpx4rGb9O+20SlxXgFRd6mQxt/mKCpKM5xPee4oziXFMRERERkTJobeIfXdwdOLQ57nS4BOGTLu5wlq+1A7afNLFs3x9hXMaKO5TQ3b5NyhneY0NaxkQ0QoxHQVRIx8Ck+00VzOt6ZxKcQwhFVWBsuhneY2Jkk7P3rn7G88OIVQREREZD+MQgTi7ntO6b2pwipFmzI3xzTuKOe0RR3QRnxuDsmiOc42IQfnna0E7TRHUTElHFXsqeSkzu18K0EEUFf0oQ6+pBgVJiIiInI4RiECMb0inWIRF4xziUrgeLuW9W5jTo5p5NnIqSMTvrB0TssJo2kjohrmvuQ3zjnnWls7zWE560sXSEJ7tg3IZ0P0C+cR7UAOoBKzaaPf7142l7/nYxfjWVPbyTyJ3/j4befcIweQiIiIiOyee15dsnp+dK5cubK4fPny6tUpD56/d3Hx4QcWFx+5f3Fy/r4F0zSY0sJW/e2RB1Z7Tpc45ja4iL75ye3FzVu3V++cwnvX3/t40u0VYld+/LQL03hiZTXaoamNFucWi9fe+qD6zDQ5Vwk9by7boATvYyO0VaO9LduINuScZN8pErbCeMMxXrpwUkUfYl8Ijdff+6g6j1546qHFh0u7yadF4cxO14ZO4fhJ2B/Hz3E/v3zvhT96qHoNtB0szebO31955tHqPZEAW+Jc4/GVZz43i991ERERmRZNesbQGM3qYICT/9z3flY9BtwxJO8EU6biLuLUKB13CY6/zz5ExUzRQeXYS4lqY8lhaNonZY5tlNLHjoA2mkPi1miL0thD3hveSyPtaD+iX+aU1Daiozj2OYhfIiIiIiI5JobeA0zFyOEONEun49iynGwf53Wq9Dn23GGdEpXzvXRAeYzXIeZw3NhHlwAC7LtJ8uQx0CfJeN9zaC55XbCjprGHtgo7C1ubiziWwnFzzApAIiIiIiLDZlQiEMSywwFOGE4929U3/qm6W4+zPyVKDug20GZTFYJwQon8iS2ccY6VY+4SgAJWgpoiVcRcIal6Uw6gNuaWnD1vN/LdpIIjtpZGnYmIiIiIiAyNUYhAseITET9tTjziBlslBk0owW+T474NVTutpnBMjZgayGOwTtQKn2X5b+wO8WhKCcg5tjxaioTZ6XslEIkQN3iM52y0D6Lr1KPwaBumnUYb8Ng3cS32U0ehzXtltS5oG9po6rYkIiIiInJMRpETaBPnqXLaVtMzxg4OUZ9pTOtCGyEu4dx2rfIzFrCTSty68Ul1bIgb2EAfG6I9aAdWLqpEsjdO85xQFvlfpgCiRAiqHFvkr0E4zW0MwQNBrF4t6+SOc87naE+iq9L3pnLOtRE20Qf2Tc/dqdnSrkD4wZYCbIioKhERERGRsWBOoB2BE7VJJAafC+d07FSO42q1ol1St+3NjUS2IcLxIABxTHFssVQ3URsIGnVb1slr2cKZ5xEBA8cTsaNa8WhlPzwiKk0luozVrUKUqNrsjX+q+h9hgjaINqK9EAgRiEIkjL8BeZOijYDn9ZS76UROlYjj7wNtEW0NYUtTON92BW3C+ZZSt9u07UhERERE5BiMYjrYJlOhUmd1ChCdsi7p8YcAUiKc97E7pqWkx5G8FxHjr//syTtCT2lLI1juKmflvCOYjZ0831H0fzWt6ytp+zx5R/zpC2XRRjxKGdomxElZT1QTEREREZHtGLwIhIPAdJTUUeB5bPE64HkleJzUf0fYiG3MtDnVHCcCBgIHx15FcCyfX3vp6cqZ5zkRHT//+per5yVCCBhzO/VJ3ks7pcIGz/P3oCQ80kZEJ4xdCCpFlUX/c2y0RdpuTTQlz46ypLYvzkdpJx/jwwZFRERERGS3jCInECBO4FziKLDhIOCQx3s8puCEpu9VnxtxLo62KVvRHgg+XVBGm4hBWQhFaVTMmOD40pxAiF/YQSz5Xk8La3cu+7RR3/YeGrRFW34pji1yBHVRyiEURBv1ae+pE8JhjEfrtPGcSMf4sY4/IiIiIjJfxpITaDQi0Do0Oac4FzjuY3RK20QgCKe7S5jAIX3uu3+7elWGssYsBEE4k7RZKgj2sYH8MyUoZ6yiYpctAf3fJVLkyXxLYENjFMt2DbZEm7NKHVM7FTlERERERKaFiaGPBM5Wns8l4G/1qkjjSzjaNPUmCCezT/JiBIw2qnZaOvddQsGQiWMsJS8mMXIbfDb9TAn+jp2NsY3SJNlNU5ViZbQ2EDLYYgpiqawuu50LtHXkW1IAEhERERGRYzE9EejGrWI+l4AIISIhiGIYE+TM6APH98S3frp6tTkIAAhBYxTMtqXKLdQhlAFtFNPMxgRRUEQwIUiQ/HlTUYI2ijKqlcW+Uq8sllLKPyQiIiIiIiLHYfAiECJEtWrRciPKBQGnSZiohIsq0qfdMWc/Ih2msuR3Dse3i2Or2un196vHsZKvqoZI0bXSGvuQsyUEjVzYyCEaaGxiGfWlXxFNmfqVHyNCUZx7XdFO8Vk+Q7ulUUZEHaXn8JhtSUREREREZOwMOicQzieiTw7OJdEHuePatH8TfH4sCVpxpDm2vk507YSf3OXg8/l1I4VqZ76e+jNGsIuI2EnzsYS4QTvltgT8nfbib3w+9g/iM7HPWHIEIcbEdC/qzTlAm3B85Kx5bBVJl+/T9zzhM4hLISSlwmzTuSsiIiIiIjJmzAm0A5qm2uBQ4lxuC84qju46wtExob59YV+c+ue+dzYiaJN2o73HPDUMgaOetnSaj4U+55h4rFfLuvvY2BfhAzEDYSQVLqKc6JNa+KiXkB8y1PPHyzqm9eY1pDlr8n365AgKaCfaDIgkSyPzeJ6LaSIiIiIiInIYRpkTCCeTLXdKcTyJNFgHysApHboQ1OaAt0VV8Lk08qernKay+BxtNFYhKIX+5jiiLRAmmpJF17bx9h0RJAQlpjnl8Pe29h0KeeL0UiL18nsmeRYRERERERkzgxaB2nK3MMWEKBdy30RkAQIGyWk3AVFgzDmCIjKlBMJEHFuX0BM5XUrw966VtcZCLtY0rWJ1tRKMTlcYY79q+tjJ3QmP29p2KFC/iNIJquNJ6t20T/5eHziH07KxrUsX1hNqRUREREREZDfc8+qS1fOjc+XKlcXly5dXrxaLi488UDmQJ+fvq54//9RDi3PL929+cnvx5nsfL27eul1FLFxfPmd7Yfl3HPbX3vp1XUAGQsmD5+8tRjlQFoVHOUPjwWUbXH/vo2LdOSZWYWo6NuB9pvh8+4XPL9vng8b9yAlDOzdNxaPtaaP4zjHCMfzit/X0rYCcR5cunBU5EH6+85Nf1rYRLG0EEQN75H3ai8cQTl555tHVjsPl4sMPLD5ctgF9yDGTN4rnKezDe08s+xh74LjyffpAO/G5OIdfXpaziZgkIiIiIiIyZHI9Y6gMOjF0DtE6TEnKozgAJ5xpOkRo1Dle7hYx2Kf02ZRw5ilraFB3op+ajr/r2ID9fv71L1ftuE1ulrEn+OXYEbqI7GH5/aakx3k75ccd08rCbkRERERERGR+jCUx9KhEIFY1IplvE6kjvo3AQTlDXemJ49omf1G0ESJXV3u2QTmUMXXhA5GnTm58o7KJMa+SJiIiIiIiIvtBEWgDmhoNB/xH79yspjOVInxSECeqx6XD3rVvG5QzxOXjiTppinRah0hwvKkQRPtce+npO+09dSLaR0RERERERCRnLCLQYBNDI/wQ9VKJFCuhoo/wkU6JItfJplAOK0JRjyGBEEHy63VXQcvhuDhGRK6uduK72CdEEB4RyOYkimx7rLR1aptDIGxgKFRi78DqNDRoH8ZFHqUM9kMbsWlLIiIiIiJnGWQkEBfviD7bXMDjtBPpQhnbTJ+ijCFN/+F4YqluxLEuYQwBh5w3ebQP7ZNG8tBG4YDzHtO8YnU2nvNe/ndApCM5MrBs+hCmh6VCwrH7jrqk08na8g8dCuqC7ZAYeyhT3ML+wGl3ZdJxkXOQdhrilNVjQtvQRrQVYEOpgC0iIiIisi+cDrYBNNoP/+b6TqY7QQg4m055qiJgVg47CaeP7Ujg2LBkeTjvgKhAxFKIHhDCD3D81DtPcMz7tE8Kfw8Hs48Dnrcrn8Ph6vPZfRFthP1Ef5EI+1jk7U6dju28P/fdn505v6gTtnAsAY/2CXEjOHadhgZtk4+LttHdlMZ6xqShTesVERERkenhdLAtaFq+fB1CAICY8pS+1wT7IKLU4sn5KmICR55VuXg8Jjg3OIE4hNXjsp2IwiGiJ8QXHhEYOGa2OGacRbYQf9hy+Buf6SvikKMphXpRx1T0ODSs+BWOMvVhQ/Q4Fqw+llLVadlnx6pTfH8K7+Vi1SGJfkrhNRFUckqp3/J2mzsRlZhSek9EREREZK4MTgSqRZjN7myH4BFlpGIG4kaIICHyXPvaF+68x8ZzBBVEFKY2MT0lRBc2Xh/LecdBzx2+qBPCSxwfj03EMfK4LVV9Cs4VdTqmEJSLLkAfEiFwaPL+CniftjtGG3FuRBRZCnWqoswa6rxP4rzNKfXlXCmNi1VfNrTdXGEKa9omPI9prSIiIiIiMtCcQCEk4AQSjROPwWNLJ5a7u1zcE/kRF/lc8PNZHredItEWGYGIdOjpPG314XgPvZIZdWmLjKJOx5ga1jT1L+qDXfD8UHT12zHaKHICRcRUCrZ9jHw8+RQ1oG0OadNDBzuqI93q/FLmTSrDGBBRikPIwSUiIiIi88CcQBswlEZrEhICnPdD53Xpmq5DnQ4pBHWJQHAskaMkKATU6ZBL2w+t3wKEBOpWivyhTkSMbSukrgvtFDmv+G5s51D9NCaiz2wbEREREZHhYE6gHYGziijT5kjvmjzXTQ5OGCLDIaeG5dMccqgTCaK7hJldQV26nFDqdIypYYhzCE+l+kWdDkXXVBTq02Vv+wCRpRZ67q5fZd/vlEW0fUKf/fWfPVmJdNRNkaNMn3NPRERERESkxKBFoIg2wWnn8VCiSzr1rI1DCkE4yF1RNZXzvhLN9g3fxdYF+9B/1OuQICI0RZJQl0PXZ4jUQtCTB4/UakOBQ0REREREZH8MVgRCPMgT1TJNBNGlj/hwKA4tBHVB2xBZsu82WsdZr/vycCs98X1stFfTlKbYZ990tRN/I7cLIEwdok4p9fd/5kxEUCROFxERERERkWkxyJxARP20OcQ4rvvM68L3rzuFCaeZ6JN988S3ftopFNAuiB9MRdqnM4/41ZR7JyfqVAsO+8s1kyeF5fi/+v23z9QztRvqsu/cM1GnyHVTrTy3mm4V7ZJGSx0rRxB1ivrssz1ERERERESmhomhN4BG++HfXL/LaS+B4LIvgWMdcSPAad53suh1xalw6PchTiFEIUitC3XaV7Jo2gYxJRXJwk74GysrsdIcYky6D/XZt+gS31cSV/J+3WcbiYiIiIiIyO4xMfSGvHujdtK7YKrYutE6fembEygFJ3+fU8M41vx4a5GnThhdEgzqOtWrQO2aiFppo6lO+8oRRNkhtgQIP0BdEISIDsr3+UUPe9sW+qgkAJXI6yciIiIiIiKyCwYnAj1+cr6KqOkCwSUSRu/aaX6sx/c3sS8hqHSMdZTPk5W4QeRI40pP//fGzgWztjZH7Lj2tS9U055Kwgef/eYPz0bs7Iu8L0tizDb9vQv61FFERERERERkWwaZGDqNBCKCA3GjSeBA3Hjue4dNFo2DXqpPgBC06+ibkjBAzh8Enjh2olxKVKLLjqNvLl1oX7K+yi9zcr7Kb1OCPt51NBC2whZtFa9TeE2d2vY5NFEH6oNdUT8EPhEREREREZFdMricQF/+5g/ORK3gHCN2QJuwgvNMVAyO9Lbw/W3fFd/RJjxVIsPJbnME5UmPmcYUbcXxM42tLeKHOu0y1wzfxbS8pvxJ8T2lOlEXIpj2IXaEuNRWNn3H1MMhiS1hT7uwYRERERERETkcJobegEe//J8X9/6n/3KXuIJT3Ca4BLsSFrpEoHVACKFOu4S2oI5E96SEeNDWVvuoD+LU1TfOLuffBvU8xgpYIiIiIiIiIvvAxNA7pK+4wH6IN9tOM0KkCEFlW6jLPqaGlUD8itxAsR0CxBy+t0+bsQ/7KgCJiIiIiIiIHJZBiUCf+s0/bB3FE0JQX+GoxC6nCFEPhKC2aVqbUBKqSDBMpA9T0OqE0U+eEYLYf19JkPneyLUTlIQo9olpYmNgGzsSERERERERGRKDzwm0KdtGmzDFKZ9utQ2IIS9+aTsBhHZBlEBooZw8R1DpeBGgrr7+fvWc3Erp58ghFO/tCurIsuyITVXy6JM6TxH5i5q+K+r47m9vVXViVbFj5+qhzuQ7AurUN9JJRERERERE5oc5gTbgs//xzxe/86d/sZPoCxz2iDrZxHmnDk9866erV+1EtAtCDMIHy583JUtm302SRad5dzieTZNOI26k09OinTYVzFKRCeFnk3KoD/UKaKNdJfnehJjCl9qhU9hERERERESkCXMCbcC/furTOxGAgHKI5GH5eJz6dekbBYTIhBjDhkhABAsCRpP4hDj03Hd/tnrVD46FyJ1oGx43XYaeKJ0UykJcQmRal6qNl59DwGGjzdYtpz6Ws/3DsW3SZ7uCOrGlRMSViIiIiIiIyFgZlAh037/8dvWsm75RIjjziCXriArsm0am5PDdRKsQHVJaaYu/8z4RNiXevfHJ2kJQCeq5C7GENkIIajvmEvX3nxWVpiCW0H+5fTElTERERERERGTMDEoE+ne/+pvVs7OEU47wkoov6WNbXpt1haAfvVOeyhXEVKyu6UG5kBBUkSY36jr1oT7+/YoQlRD0+j+tJSpFv2xD3a9n8//U/Xy8nEB8dyS5rutHPqfPrP4qIiIiIiIiMk7ueXXJ6vnR+a8/+efF//v3j65enfLCUw9VU6x4fOWZRxeXLpwsnfPz1ePFRx6oHh88f2811enmrdurT52F9/n7xUfurz7bxtU33l+8+d7Hq1cFzi0W15d/pz5t/OCtX981/SqgPjc/ub147a0PWgWs4OLDDyy/86NKPAqiPdaB7/1wuaXlBLxHfWlL2rUL2pF24DgoF8Hk5WV9+nw2hWP7cFkG30tf/rfnP1+VdUxq27q/qtsrz3xu7WMSERERERGR+XDlypXF5cuXV6+Gy2ASQzMV6S/++/9Z/Ounfnf1zikRLVKaehUQwZIn8y1BWZTTFmlCXbqidCinKwIp8uS01alPOSnk3GGlrVgOfhOxpJrG9c7NO4mmc4h8WSfpdEwji34SERERERERmRMmht6AkgAECBUh8mwLZXVNDesSkoB9EHi68uh0lcXf+3xfwBQ0RCweNxGAAKGGz1976elG8WmdOlEGmwKQiIiIiIiIyHAZjAjURyxBuGlKqPz4Sf+cOZTFsubrCB0l6nLK0TSASNNHqNlUzNkWvpcoJCJ/Upjmdaw6iYiIiIiIiMh+GIwIxBSnLhBb2hIqk7C5L21TtS5deLC3CEJ9miKCiIwpRcdE2TwiwPDIMbFtslR7wLHw+SirLdop4Lu/8ZV6Ohp14RFhSERERERERESmxWByAiFeIKb0AeGC1Zvy1bmIEsqXLO8C4QMRJBVrEHRyoQlx5N3f3mosv6lOQHlEDAFRNs8mkTd871e///aZchFhSuV0QZ1TMYpjI6E2dZPDMpb5oCJdaMsyJbRnmQraskwFbVmmxFjseRCRQESw/LhH1ErA/iQ1zqeGPbtBThrEl2/+8OdnomZKK3rxd8Sia1/7QiWu5ESdStE3CEgkWkaQIZ8Pr2Nj/1xYWqctAr4fkSqFKKV3b5x9T0RERERERETmyWCmg60bwVOJHjc+OSMEtYknCC5NETF8N1E0lAm5mAL8DbEIEHOahCBW3WpinxE5RvuIiIiIiIiISBuDEIFK+XT6kApB8bwNonCaxBI+H/VoiihCLELkoYwXv9RvSfcu6rxBp4ISZW8S0QTUKY6Px6acRCIiIiIiIiIyPwYTCdQGgkaIGzkh/pBXpw2mXUUkTxNM5yIiiKgh8vI0fSfEPqmAw3OSSq8D3xGJmaPMTfIBAZ9H6KIMNp6LiIiIiIiIiMAgEkOXEjEfkxBiqFe6glgl2Cz/htgSVDl9VlPAEICMvBEwyZ1MBW1ZpoT2LFNBW5apoC3LlBiLPQ8mMfShIFqnLcIHYrn6iMxJo3RSAQgQfRCM2BSARERERERERGSoDEIE2mQ1rE0h3861l56uBJ1q+lZBFHrs5PQ1og/TqmJVLxERERERERGRMXJ0EahPQudNQdwJgYfHiOjhOZE7LNvO9uIXP3tHDIp9RERERERERESmxNFzAu0jHxCCDhE/5Oh5/OR8lbcH2sSdNO+PyLY4v1mmgrYsU0J7lqmgLctU0JZlSozFno8uAr36w59XyZfX4b5/+c3iXz/1u9Xjvbd+Uz3e+t3PV++d/80/LD5z/X9U74mIiIiIiIiIHAJFoB70FYGI0CHxMvl6iPAhcifeAyKKgNdG84iIiIiIiIiInOXoIhBTtZgOlk/Hevzkd6opXdXzldijuCMiIiIiIiIishlHF4EAIehH79ysniv4iIiIiIiIiIjsnkGIQCIiIiIiIiIisl+OvkS8iIiIiIiIiIjsH0UgEREREREREZEZoAgkIiIiIiIiIjIDFIFERERERERERGaAIpCIiIiIiIiIyAxQBBIRERERERERmQGKQCIiIiIiIiIiM0ARSERERERERERkBigCiYiIiIiIiIjMAEUgEREREREREZEZoAgkIiIiIiIiIjIDFIFERERERERERGaAIpCIiIiIiIiIyAxQBBIRERERERERmQGKQCIiIiIiIiIiM0ARSERERERERERkBigCiYiIiIiIiIjMAEUgEREREREREZEZoAgkIiIiIiIiIjIDFIFERERERERERGaAIpCIiIiIiIiIyAxQBBIRERERERERmQGKQCIiIiIiIiIik2ex+P+RJ7jCSH7BogAAAABJRU5ErkJggg==\" data-image-state=\"image-loaded\" width=\"346\" height=\"339\"\u003e\u003c/div\u003e\u003c/div\u003e\u003c/div\u003e","function_template":"function y = tetris(n)\r\n  y = dec2bin(n);\r\nend","test_suite":"%%\r\nn = 5;\r\ny_correct = 8;\r\nassert(isequal(tetris(n),y_correct))\r\n\r\n%%\r\nn = 15;\r\ny_correct = 32;\r\nassert(isequal(tetris(n),y_correct))\r\n\r\n%%\r\nn = 51;\r\ny_correct = 29;\r\nassert(isequal(tetris(n),y_correct))\r\n\r\n%%\r\nn = 155;\r\ny_correct = 167;\r\nassert(isequal(tetris(n),y_correct))\r\n\r\n%%\r\nn = 515;\r\ny_correct = 480;\r\nassert(isequal(tetris(n),y_correct))\r\n\r\n%%\r\nn = 1155;\r\ny_correct = 872;\r\nassert(isequal(tetris(n),y_correct))\r\n\r\n%%\r\nn = 1511;\r\ny_correct = 3084;\r\nassert(isequal(tetris(n),y_correct))\r\n\r\n%%\r\nn = 5151;\r\ny_correct = 9480;\r\nassert(isequal(tetris(n),y_correct))\r\n\r\n%%\r\nn = 15151;\r\ny_correct = 7095;\r\nassert(isequal(tetris(n),y_correct))\r\n\r\n%%\r\nassert(isequal(tetris(tetris(10020)),18284))\r\n\r\n%%\r\nfiletext = fileread('tetris.m');\r\nillegal = contains(filetext, 'assignin') || contains(filetext, 'regexp') || contains(filetext, 'oeis') || contains(filetext, 'persistent') ||  contains(filetext, 'switch'); \r\nassert(~illegal)","published":true,"deleted":false,"likes_count":1,"comments_count":5,"created_by":46909,"edited_by":46909,"edited_at":"2023-01-05T14:35:12.000Z","deleted_by":null,"deleted_at":null,"solvers_count":7,"test_suite_updated_at":"2023-01-05T14:35:12.000Z","rescore_all_solutions":false,"group_id":1,"created_at":"2023-01-02T15:12:40.000Z","updated_at":"2026-02-05T10:56:07.000Z","published_at":"2023-01-02T15:22:44.000Z","restored_at":null,"restored_by":null,"spam":null,"simulink":false,"admin_reviewed":false,"description_opc":"{\"parts\":[{\"partUri\":\"/matlab/document.xml\",\"contentType\":\"application/vnd.mathworks.matlab.code.document+xml\",\"content\":\"\u003c?xml version=\\\"1.0\\\" encoding=\\\"UTF-8\\\"?\u003e\u003cw:document xmlns:w=\\\"http://schemas.openxmlformats.org/wordprocessingml/2006/main\\\"\u003e\u003cw:body\u003e\u003cw:p\u003e\u003cw:pPr\u003e\u003cw:pStyle w:val=\\\"text\\\"/\u003e\u003cw:jc w:val=\\\"left\\\"/\u003e\u003c/w:pPr\u003e\u003cw:r\u003e\u003cw:t\u003eIn the Tetris sequence, which starts with a 1, the next term is the smallest positive integer not already in the sequence that has no common 1-bits with the previous term. The first five terms are 1, 2, 4, 3, and 8 because the binary expansions 0001, 0010, 0100, 0011, and 1000 have no common ones among consecutive terms, and they are the smallest numbers with that property not already in the sequence. \u003c/w:t\u003e\u003c/w:r\u003e\u003c/w:p\u003e\u003cw:p\u003e\u003cw:pPr\u003e\u003cw:pStyle w:val=\\\"text\\\"/\u003e\u003cw:jc w:val=\\\"left\\\"/\u003e\u003c/w:pPr\u003e\u003cw:r\u003e\u003cw:t\u003eThe discussion of this sequence involves odd gaps in the plot of the terms \u003c/w:t\u003e\u003c/w:r\u003e\u003cw:customXml w:element=\\\"equation\\\"\u003e\u003cw:customXmlPr\u003e\u003cw:attr w:name=\\\"displayStyle\\\" w:val=\\\"false\\\"/\u003e\u003cw:attr w:name=\\\"altTextString\\\" w:val=\\\"a(n)\\\"/\u003e\u003c/w:customXmlPr\u003e\u003cw:r\u003e\u003cw:t\u003ea(n)\u003c/w:t\u003e\u003c/w:r\u003e\u003c/w:customXml\u003e\u003cw:r\u003e\u003cw:t\u003e (say) as a function of their position \u003c/w:t\u003e\u003c/w:r\u003e\u003cw:customXml w:element=\\\"equation\\\"\u003e\u003cw:customXmlPr\u003e\u003cw:attr w:name=\\\"displayStyle\\\" w:val=\\\"false\\\"/\u003e\u003cw:attr w:name=\\\"altTextString\\\" w:val=\\\"n\\\"/\u003e\u003c/w:customXmlPr\u003e\u003cw:r\u003e\u003cw:t\u003en\u003c/w:t\u003e\u003c/w:r\u003e\u003c/w:customXml\u003e\u003cw:r\u003e\u003cw:t\u003e in the sequence. A plot of \u003c/w:t\u003e\u003c/w:r\u003e\u003cw:customXml w:element=\\\"equation\\\"\u003e\u003cw:customXmlPr\u003e\u003cw:attr w:name=\\\"displayStyle\\\" w:val=\\\"false\\\"/\u003e\u003cw:attr w:name=\\\"altTextString\\\" w:val=\\\"a(n+1)\\\"/\u003e\u003c/w:customXmlPr\u003e\u003cw:r\u003e\u003cw:t\u003ea(n+1)\u003c/w:t\u003e\u003c/w:r\u003e\u003c/w:customXml\u003e\u003cw:r\u003e\u003cw:t\u003e vs. \u003c/w:t\u003e\u003c/w:r\u003e\u003cw:customXml w:element=\\\"equation\\\"\u003e\u003cw:customXmlPr\u003e\u003cw:attr w:name=\\\"displayStyle\\\" w:val=\\\"false\\\"/\u003e\u003cw:attr w:name=\\\"altTextString\\\" w:val=\\\"a(n)\\\"/\u003e\u003c/w:customXmlPr\u003e\u003cw:r\u003e\u003cw:t\u003ea(n)\u003c/w:t\u003e\u003c/w:r\u003e\u003c/w:customXml\u003e\u003cw:r\u003e\u003cw:t\u003e (below) makes one think of the Sierpinski gasket. Neil J.A. Sloane uses this resemblance to propose \u003c/w:t\u003e\u003c/w:r\u003e\u003cw:hyperlink w:docLocation=\\\"https://sites.math.rutgers.edu/~zeilberg/EM22/C27.pdf\\\"\u003e\u003cw:r\u003e\u003cw:rPr\u003e\u003cw:u/\u003e\u003c/w:rPr\u003e\u003cw:t\u003eusing “facial recognition”\u003c/w:t\u003e\u003c/w:r\u003e\u003c/w:hyperlink\u003e\u003cw:r\u003e\u003cw:t\u003e to connect sequences. \u003c/w:t\u003e\u003c/w:r\u003e\u003cw:r\u003e\u003cw:t\u003e \u003c/w:t\u003e\u003c/w:r\u003e\u003c/w:p\u003e\u003cw:p\u003e\u003cw:pPr\u003e\u003cw:pStyle w:val=\\\"text\\\"/\u003e\u003cw:jc w:val=\\\"left\\\"/\u003e\u003c/w:pPr\u003e\u003cw:r\u003e\u003cw:t\u003eWrite a function to compute the \u003c/w:t\u003e\u003c/w:r\u003e\u003cw:customXml w:element=\\\"equation\\\"\u003e\u003cw:customXmlPr\u003e\u003cw:attr w:name=\\\"displayStyle\\\" w:val=\\\"false\\\"/\u003e\u003cw:attr w:name=\\\"altTextString\\\" 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the Tetris sequence","description":"In the Tetris sequence, which starts with a 1, the next term is the smallest positive integer not already in the sequence that has no common 1-bits with the previous term. The first five terms are 1, 2, 4, 3, and 8 because the binary expansions 0001, 0010, 0100, 0011, and 1000 have no common ones among consecutive terms, and they are the smallest numbers with that property not already in the sequence. \r\nThe discussion of this sequence involves odd gaps in the plot of the terms  (say) as a function of their position  in the sequence. A plot of  vs.  (below) makes one think of the Sierpinski gasket. Neil J.A. Sloane uses this resemblance to propose using “facial recognition” to connect sequences.  \r\nWrite a function to compute the th term of the Tetris sequence.\r\n","description_html":"\u003cdiv style = \"text-align: start; line-height: 20.4333px; min-height: 0px; white-space: normal; color: rgb(0, 0, 0); font-family: Menlo, Monaco, Consolas, monospace; font-style: normal; font-size: 14px; font-weight: 400; text-decoration: rgb(0, 0, 0); white-space: normal; \"\u003e\u003cdiv style=\"block-size: 539.7px; display: block; min-width: 0px; padding-block-start: 0px; padding-top: 0px; perspective-origin: 407px 269.85px; transform-origin: 407px 269.85px; vertical-align: baseline; \"\u003e\u003cdiv style=\"block-size: 84px; font-family: Helvetica, Arial, sans-serif; line-height: 21px; margin-block-end: 9px; margin-block-start: 2px; margin-bottom: 9px; margin-inline-end: 10px; margin-inline-start: 4px; margin-left: 4px; margin-right: 10px; margin-top: 2px; perspective-origin: 384px 42px; text-align: left; transform-origin: 384px 42px; white-space: pre-wrap; margin-left: 4px; margin-top: 2px; margin-bottom: 9px; margin-right: 10px; \"\u003e\u003cspan style=\"block-size: auto; display: inline; margin-block-end: 0px; margin-block-start: 0px; margin-bottom: 0px; margin-inline-end: 0px; margin-inline-start: 0px; margin-left: 0px; margin-right: 0px; margin-top: 0px; perspective-origin: 378.833px 8px; transform-origin: 378.833px 8px; unicode-bidi: normal; \"\u003e\u003cspan style=\"\"\u003eIn the Tetris sequence, which starts with a 1, the next term is the smallest positive integer not already in the sequence that has no common 1-bits with the previous term. The first five terms are 1, 2, 4, 3, and 8 because the binary expansions 0001, 0010, 0100, 0011, and 1000 have no common ones among consecutive terms, and they are the smallest numbers with that property not already in the sequence. \u003c/span\u003e\u003c/span\u003e\u003c/div\u003e\u003cdiv style=\"block-size: 63px; font-family: Helvetica, Arial, sans-serif; line-height: 21px; margin-block-end: 9px; margin-block-start: 2px; margin-bottom: 9px; margin-inline-end: 10px; margin-inline-start: 4px; margin-left: 4px; margin-right: 10px; margin-top: 2px; perspective-origin: 384px 31.5px; text-align: left; transform-origin: 384px 31.5px; white-space: pre-wrap; margin-left: 4px; margin-top: 2px; margin-bottom: 9px; margin-right: 10px; \"\u003e\u003cspan style=\"block-size: auto; display: inline; margin-block-end: 0px; margin-block-start: 0px; margin-bottom: 0px; margin-inline-end: 0px; margin-inline-start: 0px; margin-left: 0px; margin-right: 0px; margin-top: 0px; perspective-origin: 230.658px 8px; transform-origin: 230.658px 8px; unicode-bidi: normal; \"\u003e\u003cspan style=\"\"\u003eThe discussion of this sequence involves odd gaps in the plot of the terms \u003c/span\u003e\u003c/span\u003e\u003cspan style=\"vertical-align:-5px\"\u003e\u003cimg src=\"data:image/png;base64,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\" alt=\"a(n)\" style=\"width: 29.5px; height: 18.5px;\" width=\"29.5\" height=\"18.5\"\u003e\u003c/span\u003e\u003cspan style=\"block-size: auto; display: inline; margin-block-end: 0px; margin-block-start: 0px; margin-bottom: 0px; margin-inline-end: 0px; margin-inline-start: 0px; margin-left: 0px; margin-right: 0px; margin-top: 0px; perspective-origin: 110.458px 8px; transform-origin: 110.458px 8px; unicode-bidi: normal; \"\u003e\u003cspan style=\"\"\u003e (say) as a function of their position \u003c/span\u003e\u003c/span\u003e\u003cspan style=\"font-family: \u0026quot;STIXGeneral\u0026quot;, \u0026quot;STIXGeneral-webfont\u0026quot;, serif; font-style: italic; font-weight: 400; color: rgb(0, 0, 0);\"\u003en\u003c/span\u003e\u003cspan style=\"block-size: auto; display: inline; margin-block-end: 0px; margin-block-start: 0px; margin-bottom: 0px; margin-inline-end: 0px; margin-inline-start: 0px; margin-left: 0px; margin-right: 0px; margin-top: 0px; perspective-origin: 21px 8px; transform-origin: 21px 8px; unicode-bidi: normal; \"\u003e\u003cspan style=\"\"\u003e in the sequence. A plot of \u003c/span\u003e\u003c/span\u003e\u003cspan style=\"vertical-align:-5px\"\u003e\u003cimg src=\"data:image/png;base64,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\" alt=\"a(n+1)\" style=\"width: 54px; height: 18.5px;\" width=\"54\" height=\"18.5\"\u003e\u003c/span\u003e\u003cspan style=\"block-size: auto; display: inline; margin-block-end: 0px; margin-block-start: 0px; margin-bottom: 0px; margin-inline-end: 0px; margin-inline-start: 0px; margin-left: 0px; margin-right: 0px; margin-top: 0px; perspective-origin: 12.825px 8px; transform-origin: 12.825px 8px; unicode-bidi: normal; \"\u003e\u003cspan style=\"\"\u003e vs. \u003c/span\u003e\u003c/span\u003e\u003cspan style=\"vertical-align:-5px\"\u003e\u003cimg src=\"data:image/png;base64,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\" alt=\"a(n)\" style=\"width: 29.5px; height: 18.5px;\" width=\"29.5\" height=\"18.5\"\u003e\u003c/span\u003e\u003cspan style=\"block-size: auto; display: inline; margin-block-end: 0px; margin-block-start: 0px; margin-bottom: 0px; margin-inline-end: 0px; margin-inline-start: 0px; margin-left: 0px; margin-right: 0px; margin-top: 0px; perspective-origin: 237.267px 8px; transform-origin: 237.267px 8px; unicode-bidi: normal; \"\u003e\u003cspan style=\"\"\u003e (below) makes one think of the Sierpinski gasket. Neil J.A. Sloane uses this resemblance to propose \u003c/span\u003e\u003c/span\u003e\u003ca target='_blank' href = \"https://sites.math.rutgers.edu/~zeilberg/EM22/C27.pdf\"\u003e\u003cspan style=\"\"\u003e\u003cspan style=\"text-decoration-line: underline; \"\u003eusing “facial recognition”\u003c/span\u003e\u003c/span\u003e\u003c/a\u003e\u003cspan style=\"block-size: auto; display: inline; margin-block-end: 0px; margin-block-start: 0px; margin-bottom: 0px; margin-inline-end: 0px; margin-inline-start: 0px; margin-left: 0px; margin-right: 0px; margin-top: 0px; perspective-origin: 73.9px 8px; transform-origin: 73.9px 8px; unicode-bidi: normal; \"\u003e\u003cspan style=\"\"\u003e to connect sequences. \u003c/span\u003e\u003c/span\u003e\u003cspan style=\"block-size: auto; display: inline; margin-block-end: 0px; margin-block-start: 0px; margin-bottom: 0px; margin-inline-end: 0px; margin-inline-start: 0px; margin-left: 0px; margin-right: 0px; margin-top: 0px; perspective-origin: 1.94167px 8px; transform-origin: 1.94167px 8px; unicode-bidi: normal; \"\u003e\u003cspan style=\"\"\u003e \u003c/span\u003e\u003c/span\u003e\u003c/div\u003e\u003cdiv style=\"block-size: 21px; font-family: Helvetica, Arial, sans-serif; line-height: 21px; margin-block-end: 9px; margin-block-start: 2px; margin-bottom: 9px; margin-inline-end: 10px; margin-inline-start: 4px; margin-left: 4px; margin-right: 10px; margin-top: 2px; perspective-origin: 384px 10.5px; text-align: left; transform-origin: 384px 10.5px; white-space: pre-wrap; margin-left: 4px; margin-top: 2px; margin-bottom: 9px; margin-right: 10px; \"\u003e\u003cspan style=\"block-size: auto; display: inline; margin-block-end: 0px; margin-block-start: 0px; margin-bottom: 0px; margin-inline-end: 0px; margin-inline-start: 0px; margin-left: 0px; margin-right: 0px; margin-top: 0px; perspective-origin: 98.6583px 8px; transform-origin: 98.6583px 8px; unicode-bidi: normal; \"\u003e\u003cspan style=\"\"\u003eWrite a function to compute the \u003c/span\u003e\u003c/span\u003e\u003cspan style=\"font-family: \u0026quot;STIXGeneral\u0026quot;, \u0026quot;STIXGeneral-webfont\u0026quot;, serif; font-style: italic; font-weight: 400; color: rgb(0, 0, 0);\"\u003en\u003c/span\u003e\u003cspan style=\"block-size: auto; display: inline; margin-block-end: 0px; margin-block-start: 0px; margin-bottom: 0px; margin-inline-end: 0px; margin-inline-start: 0px; margin-left: 0px; margin-right: 0px; margin-top: 0px; perspective-origin: 94.1167px 8px; transform-origin: 94.1167px 8px; unicode-bidi: normal; \"\u003e\u003cspan style=\"\"\u003eth term of the Tetris sequence.\u003c/span\u003e\u003c/span\u003e\u003c/div\u003e\u003cdiv style=\"block-size: 344.7px; font-family: Helvetica, Arial, sans-serif; line-height: 21px; margin-block-end: 9px; margin-block-start: 2px; margin-bottom: 9px; margin-inline-end: 10px; margin-inline-start: 4px; margin-left: 4px; margin-right: 10px; margin-top: 2px; perspective-origin: 384px 172.35px; text-align: left; transform-origin: 384px 172.35px; white-space: pre-wrap; margin-left: 4px; margin-top: 2px; margin-bottom: 9px; margin-right: 10px; \"\u003e\u003cimg class=\"imageNode\" style=\"vertical-align: baseline;width: 346px;height: 339px\" 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\" data-image-state=\"image-loaded\" width=\"346\" height=\"339\"\u003e\u003c/div\u003e\u003c/div\u003e\u003c/div\u003e","function_template":"function y = tetris(n)\r\n  y = dec2bin(n);\r\nend","test_suite":"%%\r\nn = 5;\r\ny_correct = 8;\r\nassert(isequal(tetris(n),y_correct))\r\n\r\n%%\r\nn = 15;\r\ny_correct = 32;\r\nassert(isequal(tetris(n),y_correct))\r\n\r\n%%\r\nn = 51;\r\ny_correct = 29;\r\nassert(isequal(tetris(n),y_correct))\r\n\r\n%%\r\nn = 155;\r\ny_correct = 167;\r\nassert(isequal(tetris(n),y_correct))\r\n\r\n%%\r\nn = 515;\r\ny_correct = 480;\r\nassert(isequal(tetris(n),y_correct))\r\n\r\n%%\r\nn = 1155;\r\ny_correct = 872;\r\nassert(isequal(tetris(n),y_correct))\r\n\r\n%%\r\nn = 1511;\r\ny_correct = 3084;\r\nassert(isequal(tetris(n),y_correct))\r\n\r\n%%\r\nn = 5151;\r\ny_correct = 9480;\r\nassert(isequal(tetris(n),y_correct))\r\n\r\n%%\r\nn = 15151;\r\ny_correct = 7095;\r\nassert(isequal(tetris(n),y_correct))\r\n\r\n%%\r\nassert(isequal(tetris(tetris(10020)),18284))\r\n\r\n%%\r\nfiletext = fileread('tetris.m');\r\nillegal = contains(filetext, 'assignin') || contains(filetext, 'regexp') || contains(filetext, 'oeis') || contains(filetext, 'persistent') ||  contains(filetext, 'switch'); \r\nassert(~illegal)","published":true,"deleted":false,"likes_count":1,"comments_count":5,"created_by":46909,"edited_by":46909,"edited_at":"2023-01-05T14:35:12.000Z","deleted_by":null,"deleted_at":null,"solvers_count":7,"test_suite_updated_at":"2023-01-05T14:35:12.000Z","rescore_all_solutions":false,"group_id":1,"created_at":"2023-01-02T15:12:40.000Z","updated_at":"2026-02-05T10:56:07.000Z","published_at":"2023-01-02T15:22:44.000Z","restored_at":null,"restored_by":null,"spam":null,"simulink":false,"admin_reviewed":false,"description_opc":"{\"parts\":[{\"partUri\":\"/matlab/document.xml\",\"contentType\":\"application/vnd.mathworks.matlab.code.document+xml\",\"content\":\"\u003c?xml version=\\\"1.0\\\" encoding=\\\"UTF-8\\\"?\u003e\u003cw:document xmlns:w=\\\"http://schemas.openxmlformats.org/wordprocessingml/2006/main\\\"\u003e\u003cw:body\u003e\u003cw:p\u003e\u003cw:pPr\u003e\u003cw:pStyle w:val=\\\"text\\\"/\u003e\u003cw:jc w:val=\\\"left\\\"/\u003e\u003c/w:pPr\u003e\u003cw:r\u003e\u003cw:t\u003eIn the Tetris sequence, which starts with a 1, the next term is the smallest positive integer not already in the sequence that has no common 1-bits with the previous term. The first five terms are 1, 2, 4, 3, and 8 because the binary expansions 0001, 0010, 0100, 0011, and 1000 have no common ones among consecutive terms, and they are the smallest numbers with that property not already in the sequence. \u003c/w:t\u003e\u003c/w:r\u003e\u003c/w:p\u003e\u003cw:p\u003e\u003cw:pPr\u003e\u003cw:pStyle w:val=\\\"text\\\"/\u003e\u003cw:jc w:val=\\\"left\\\"/\u003e\u003c/w:pPr\u003e\u003cw:r\u003e\u003cw:t\u003eThe discussion of this sequence involves odd gaps in the plot of the terms \u003c/w:t\u003e\u003c/w:r\u003e\u003cw:customXml w:element=\\\"equation\\\"\u003e\u003cw:customXmlPr\u003e\u003cw:attr w:name=\\\"displayStyle\\\" w:val=\\\"false\\\"/\u003e\u003cw:attr w:name=\\\"altTextString\\\" w:val=\\\"a(n)\\\"/\u003e\u003c/w:customXmlPr\u003e\u003cw:r\u003e\u003cw:t\u003ea(n)\u003c/w:t\u003e\u003c/w:r\u003e\u003c/w:customXml\u003e\u003cw:r\u003e\u003cw:t\u003e (say) as a function of their position \u003c/w:t\u003e\u003c/w:r\u003e\u003cw:customXml w:element=\\\"equation\\\"\u003e\u003cw:customXmlPr\u003e\u003cw:attr w:name=\\\"displayStyle\\\" w:val=\\\"false\\\"/\u003e\u003cw:attr w:name=\\\"altTextString\\\" w:val=\\\"n\\\"/\u003e\u003c/w:customXmlPr\u003e\u003cw:r\u003e\u003cw:t\u003en\u003c/w:t\u003e\u003c/w:r\u003e\u003c/w:customXml\u003e\u003cw:r\u003e\u003cw:t\u003e in the sequence. A plot of \u003c/w:t\u003e\u003c/w:r\u003e\u003cw:customXml w:element=\\\"equation\\\"\u003e\u003cw:customXmlPr\u003e\u003cw:attr w:name=\\\"displayStyle\\\" w:val=\\\"false\\\"/\u003e\u003cw:attr w:name=\\\"altTextString\\\" w:val=\\\"a(n+1)\\\"/\u003e\u003c/w:customXmlPr\u003e\u003cw:r\u003e\u003cw:t\u003ea(n+1)\u003c/w:t\u003e\u003c/w:r\u003e\u003c/w:customXml\u003e\u003cw:r\u003e\u003cw:t\u003e vs. \u003c/w:t\u003e\u003c/w:r\u003e\u003cw:customXml w:element=\\\"equation\\\"\u003e\u003cw:customXmlPr\u003e\u003cw:attr w:name=\\\"displayStyle\\\" w:val=\\\"false\\\"/\u003e\u003cw:attr w:name=\\\"altTextString\\\" w:val=\\\"a(n)\\\"/\u003e\u003c/w:customXmlPr\u003e\u003cw:r\u003e\u003cw:t\u003ea(n)\u003c/w:t\u003e\u003c/w:r\u003e\u003c/w:customXml\u003e\u003cw:r\u003e\u003cw:t\u003e (below) makes one think of the Sierpinski gasket. Neil J.A. Sloane uses this resemblance to propose \u003c/w:t\u003e\u003c/w:r\u003e\u003cw:hyperlink w:docLocation=\\\"https://sites.math.rutgers.edu/~zeilberg/EM22/C27.pdf\\\"\u003e\u003cw:r\u003e\u003cw:rPr\u003e\u003cw:u/\u003e\u003c/w:rPr\u003e\u003cw:t\u003eusing “facial recognition”\u003c/w:t\u003e\u003c/w:r\u003e\u003c/w:hyperlink\u003e\u003cw:r\u003e\u003cw:t\u003e to connect sequences. \u003c/w:t\u003e\u003c/w:r\u003e\u003cw:r\u003e\u003cw:t\u003e \u003c/w:t\u003e\u003c/w:r\u003e\u003c/w:p\u003e\u003cw:p\u003e\u003cw:pPr\u003e\u003cw:pStyle w:val=\\\"text\\\"/\u003e\u003cw:jc w:val=\\\"left\\\"/\u003e\u003c/w:pPr\u003e\u003cw:r\u003e\u003cw:t\u003eWrite a function to compute the \u003c/w:t\u003e\u003c/w:r\u003e\u003cw:customXml w:element=\\\"equation\\\"\u003e\u003cw:customXmlPr\u003e\u003cw:attr w:name=\\\"displayStyle\\\" w:val=\\\"false\\\"/\u003e\u003cw:attr w:name=\\\"altTextString\\\" 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