3.6 Menjelaskan dan membuktikan teorema pythagoras dan tripel pythagoras[br]4.6 Menyelesaikan masalah yang berkaitan dengan teorema pythagoras dan tripel pythagoras

Dalam segitiga siku-siku, sisi-sisinya terdiri dari sisi siku-siku dan sisi[br]miring (hipotenusa).[br]Gambar di bawah adalah [math]\bigtriangleup[/math]ABC yang siku-siku di A. [br][img]data:image/png;base64,iVBORw0KGgoAAAANSUhEUgAAAUkAAADWCAMAAABrE4C4AAAAAXNSR0IArs4c6QAAAARnQU1BAACxjwv8YQUAAALuUExURf////z8/Pv7+/39/f7+/vT09O7u7vX19ezs7OLi4u3t7fHx8cvLy6CgoHt7e2xsbKenp+Pj4+Hh4dHR0dPT05GRkVxcXEBAQCoqKh0dHRUVFTQ0NKGhofLy8uvr69nZ2X5+fjs7Oz09PV9fX3Nzc3JyckhISC8vL4SEhNjY2FlZWXx8fLq6usnJyaampsbGxvPz86SkpFBQUIeHh93d3fn5+fr6+s7Oznl5eWpqaqqqqnR0dKOjo56enm5ubr6+vq2trVtbW3h4eNLS0vj4+Pf399XV1W9vby0tLWFhYampqc/Pz9ra2tvb28jIyKurq7Gxsenp6eXl5eDg4PDw8Lu7uzk5OUtLS1JSUkdHR1FRUY2NjeTk5IqKij4+Pjo6OkJCQt7e3tDQ0M3Nzefn5+/v79zc3Hd3d5+fn4WFhRQUFCEhIX19febm5gAAAA8PD09PT6WlpX9/fycnJzExMTY2NsXFxVhYWJubmz8/PyMjI0xMTJqammZmZry8vGtrayYmJiUlJYuLi4aGhq+vr8rKymlpaWJiYjU1NV5eXtTU1La2tvb29mBgYLW1tRkZGSgoKNfX19bW1nV1dRYWFpSUlN/f3ykpKUZGRlpaWmRkZKioqI6OjhgYGERERCsrK5KSkhwcHMDAwIODg4+Pj7m5ucfHx5OTk2hoaDIyMjAwMLCwsImJiVZWVujo6Hp6ejw8PDg4OGdnZ5eXl0lJSWVlZaKiolRUVFdXV1VVVcPDwy4uLg4ODurq6oKCgjc3N729vaysrE5OTh4eHsLCwpaWlsTExEVFRSIiIkNDQxsbGxISEp2dnbOzs5WVlRMTEzMzM2NjY8HBwUFBQbe3t5CQkHFxcXZ2dgICAhoaGpiYmCAgIBcXFywsLJmZmUpKSoyMjHBwcFNTU7+/v4iIiE1NTR8fHyQkJBEREYCAgIGBgbi4uK6urpycnLS0tF1dXW1tbczMzBAQELKysg0NDQkJCQsLCwcHBwYGBgAAABScui8AAAD6dFJOU////////////////////////////////////////////////////////////////////////////////////////////////////////////////////////////////////////////////////////////////////////////////////////////////////////////////////////////////////////////////////////////////////////////////////////////////////////////////////////////////////////////wDeYEUjAAAACXBIWXMAABcRAAAXEQHKJvM/AAAREElEQVR4Xu2dy5njKhCFZ0VErMiDGNh1BqRCHmSgpSJgxcJbMrjnFGq3u43fDyFf/vnGltSyJZeKogoK+DcYDAaDwWAweCpqeV8dpbu5lTsoyXln9LK3Lrr0cR/3UHIM0243my6UYcM6qfM8e+fClLerDF2gXcxWa1VM2bKBWh9lwtDFp1CcH4J8CsanUaifgnF2SPIpGFeWrcFjJG+XrcFjmOgW72cU8sfQfvam6FLSOiGOgiu7bG4d6+c5hBjiSm7ltlssfsGwG8Ic9vIJaJTuz9GMwWAwGAwGg8Fg8L/mg+LedVHWp9GR8wxU3k3fLZSDR9Du62sX+0i/2DYqTzFO8+gXexjtYlFmnsKwlg+iMzMHrJsm35e13FwZgSTZTatNnHpKa9Hby1IqXiRJkc5TTL10futuDbfclmrcnI1x0URlIxyiTn6Atp2a7WKs1sU2NE67RSdBcfNu7qWId6mSyoQJvk6IZjlwgD2QpFjLaTiXZ0i73Rymr7nREWt+93PrFKGWvVjL/rA52ZJCK5nK+D8qiCI+wsfTsK5RNjdK95EkUcQ9KvFW7TRYKK2k03QkSdrOMPtOBpV0hi6ot40Pedk/wPh8LF6VwjTHIcsjIJiIqnuOzRrHtQSG8HE3d+Ond4PK0xxCaHrdZu+Z/wZ+OkLx0UL0G1WSQfFuSsWEpk4CVPZTW/r/YxZptHps/viTv7B+txutbYdYUSxlUstOnhtFojPCxzScyz3V07GxlWza8oJ+UPTTR/i4x3qvmQXd0r5jz/w3GjH7ra0a2n6sA2W9S77dG3t5jBjV8oK4/6Cd+9hUaxu+AoxlQxznS7cAd/S2iseulf3/UlQpHHIcvuZkWmXuqnGLqMSnG8aS2fiJvpOJHCQy7752oSmMK3QS6Byur3h0uuLhbA9G0IEDbnycDtp096R43c9GhRWubLeEi/qJYWYxBsUbKJ0apVvlcKWqqXxtu2WeIHM5UX3W6JT9T2k2OeZwbVFUUEvYh8tnW+f8EmVeZzs+g3yD362TM+ZSJQ4PQWsIU04zH9ScJNPv2JxTghgaQrheJ0mBc7mU3BMs3asJNlnBonxQ03uC9VduN03ztIvHCqLcbdMEKfgCKLEnP6JSvUiCR6mbbtdmMVQhE33Ofm7U3bdKkiFPCKdrHhsCwxsIEWf6Uw12m0SGT7MKVco28hqUayjqebTx8aTrVOKM71OZQY44/frzQnDVnq/MtbokLgCH6KS1tPQlS3T4a6JK2uA/aEqnwpA7N1PRoJN3NDYgEj+Zu4qjMKYJupuhkirtJsjyU0SZM0wlYh38vL9Qknf8TFVyOFOJ22QhQ3pAJfuc3HZbOGEUly0hJUoM7vKxUt5hJys6+XiyC4j+D9wrbJmMB1XcZqfSUb9/IbQjoTAm11BKx9a2u2DC5enORw1FZO3EtA9VeGU83u1p5p9bTjFCQVRu9D7crZNASdrLCbWEccYXS/2DN2cQbBpbtu6oFz/By9Ox5U/m+yWJL3bz6VETOIxvF52EU6QM3FC39Y5K5lbBs2slWD2ikwCROKzlyW+wYReTSQ6FwUZvbG3Q2PYUQeyobRYtd22r2gng8UynMoh0hg/vQUIFRHlDOXExveV+X/2dl/8XhRpn2bwTVTyKeEM2qiD4Vtokg0svBjOhWCA0f/CSa6LDibunP7ls3o2MQDluPkPgyJiyVtmlhpfslyhx2rIkTzUmaN9OsLoN6cj9K54y734SCo1IUrsMaU5TFesmUflEraljaBf7G2lZy8NuS+sQESHggTeUI+q/zfZLKHtCkiWGJ+gkQPh4rpsHIY/PPkBJrdhKVEYb7TY7FV/o8BydxBWKOzeMlP6SZxtK4fXgluW4wexMaKQp2qbGnT9NJ4F24UyzjyqGnlihDVAxWG1cKy+77/4KxDgc2NTKsEKN88RCBofoQu4q3E8UbhuDKdJrVv60mp5oRe0FE+Zp5sIOy/4B6il19x42XKKIn5GlkRaAZFHYY1Zs5/glOy2Fv1tUKcUm6MGyf4A6HGz3DAquc7pZA6KyBZIseM/O0ueM0R1KHgZg2eqX0qosH4y7W1g2a5z9Ui0+mdZQYZegnA172TXUhiPg3T094Kg9uWeMhjLeywCCktliyr5xHuVL5+hirTW5rZOvWPYBMc93alATRPvsVVI1oaPQOdpG+xD7cFDnNC3is+1khWrZCMX3aMM4xyDkAfR7FBuD+wd1d/Sx6Z48vcb5xuZzziVkyaaMH8uixcp0PzMZ83pPBDnwgl4jSVxUMi7PiKa2WdZibZmLgAji3Pnd0HR6oRcvsJMVxNoXah4IsaZrKJkhBo4Ei3i/wlS10jatAQmIFl+kk4Dt6fOF6LpKzzLLoAZceODdilJLMmM6sEo/QCdfed/FoeZp5X7sqeP3M7NfcLZhS4frt4wnbzi6u2X/n9PSe4baK37uGlRB1DdcEw6mwDrfcYMbXIwY2nX0yyWJIs48mgsXScHnzD5clbJlxYPPLX/qBnajwHObp0b+BXisv/s64BBdtJY2+Zq3VFxSCoGkttDS+sc+0Im9pC7uvmKzAwKV5ot1EsAFny8NG5MIknX54qKjGPWVTFSCJEbPE2i2BVVb/2qKY5rgeSXjZB3s0K3PtpjQ19ByDldA0A2Sb9Xd2vm3lCEOQWn2ih/CTCz1z0gYXqCkF9T4zexjG/bm1a1DntW3eBnNySAu5HsoprYx6LHel9Se66RXSnheP84lrJvDuZAHoKohNrtcUmc9Zrw3xN0WNqjVNqNfGC0eoRAd5CuqZFSDUF5zQYHfjOQ0mTADZv4dUfx77OQC1yy7PPgRUaYzp3Id1kIxUrRxChF1dztafOsNo1IJl7PjNHyg6Q3u2S0oSfdjOq0xrZitxLfqJGD3Y75gLiHw5NuhRAf8yT1f0O4t/uQhKLsBsetFvXz3fV0BKhxWnM1ZPvR7PPNfKHjd0+WOuA6TMdiDpxDWtm6+NrG+Hfjp5zrFhcUj6gnODZ68czJA5g+aUwmtgM7eN0dJ/9A2R+uiuHSLUq5RZ0KS6xQi1CnXOESdAc8DJVs3akNV/Pvt5IKybnMjGs20y0rl1rjFFSVJA+43lo9aJL+Oo2KOgCSXrVVgK+Ql37IraLxVcypPvaZOAlSFUMstyRK0JLamnawojZqnr4bI+1hbJwFjnr46Gu5iZTtZKbCWm595dfXSLTC1bePTp69vJyucomDaVGfDER3YyYoy2/HT27lqPdjJChyiflbfOkZGpStrbZGxBkd0UrorKjNdtk+9pB1EtCiJA1OrP7YrSUrN02v4WLjUiAlT8KE5tKMvSTJ8ZBr3stMVYhyVNUXp0vLYOrKTFajl1PnaPG3705tOgoJKnPM1dYiMKNCSz31Eh5L8p0sO8cwcl+tRkv2n3dScaLJHSUKWKYZWG+DKwEpqZpk3Vyvozk5WlPVQy+6spS6a6XQ69+5PHiITM/bWqqHZsVhQwBuZqN1KsstWDU54nBUecm/9OBeQdKy+QnHrqZKtqf5YpS9bHQJrGePZGQzejZJ+nPYs7Z1lKf5BGY9KvAtZVq+MrydmF7cN49kRzBI8PTHjO9Gc58h4VDlwKxqlG5ras04C+JZzB4uKM43lHyfNDnFuTbEPZ6PbNMU9l2YweA/KQhEtB5K0Z2+oE+l2Doeg+LXDR7n8YixbJaSY/oKyBpz0u5e+ieZoHJac3u1khQP2VreWMvRc5fBrgqMFDsRaNntHpcuDzF6M4nTHJu5a06ohJNuGTpKaCLzi7WpvOAN3u8axrdnie6XIqPtlZwV0dibNCe+taPH9Yx8eQMNarpiOxZ6R4LVKjcepbOyyffIkGr7leiGPyhweZmNrjFgKW9JJYj0Hfq900+I0FplI5g8qcyWbTSEJl6tG4s15W+uo1a1Rso+9taerZopL/zB87CuHaKuSZJbgpfle3stWJYlKXHof+xEl7GSf2Q5XoFNAzbN6w+XCdnUSsLGtH7VsdpNtBjhEl2Yheheb1kmgiulkPrst28kKGy57SDDYuk4SWMuwfpZgs1lja2iZqHplUapmo+XWUCXHtWcG5AoWiMc5s/Sp2aU3gbKQ5ZpKofP0FVwmzrlsjLWFkxcegaMH/zjV5n5b123ZkDWt6l+5X4/LH+SVb9xa3pZ3gFvZv+KtPtLlue6PL3+QN9n7jfv6iuv56SXuvna7aVeZ+C9mN+9k0MkhgfOBVlCOjMlu2cMj8LKdE9wRg51kDWcP5T5xyeSIF65fiUcFEnbkPSdr6z4Ejg2rC4/XSaKUtpbStoYjdOQPpuD0wqcqezi+wMf3z0xfX62uqveA+4Q/VqmyidmkMM2y3qSPdRwPmMMPc4w+Ltsh7rcCzpE9fA47+Ogsn5KvqQfxrXyJnJyMh0HAXuD3z5GTv+FSO7koDuD51engsuaqrTwo/2WTW/h6XmHG/eIyEX9qppm8Dxa7HwqUASqx7MjDJ+ngH7QIenT4jy+Zx77fqbWZ7zyWcIxvsunkRV4TTArOrsrroLOH1GdJnIHG4tRl9wA+lPqAIgoHND53PFqve2AAli2yVuEeDAYfiowdGzwBK6t4vZZjD/oDgVv+QP6F+jU0F87TsvWDDOOVycnPI8LWz2sYq0HVsvMOtNt9PTDPX13p7xvTWPlfVD5fbqSR9TLs87oRCgJfl98XOCouDPqATpZ0IElljrO3lJUJ8y+t94CnwFYc87xmMTMz1ro85+qzQDyQuC757SDQ5duvErQcW6h74jNrjvM7j1R85XmDwUpCiJa4wPVb4DqL983Rq3OdzLTKziJI4478aYHzPn+fUOpynyhrIjC2N9STgE4S3C3ncZMtEQcn3IfmN5V3TT3NBXNynu+Yy1wnL6sW4cnjJxdEy+y/OBx/xgyoaHAJHpPTCkfpS4YXzMDPJYuTaRrETIgkeYqS3RPDsK6iyGN8k51UNtKYzHc0nZjgCuuIwpVCFCw7BXaY8sbUdQO51KXW2GAJLeYylYFW2c3fl1TFsqnkn/KcM4Z1d8kcOy1LptgHFmhPwZQHHsRtwHoZLp98R8JXmjLLIIum5gxY1Vwav68wKFU5Q2oc6UeVYUlFrHKWJE428uqca1HHXfBjCnUY9BdmB2foH4nfTJq9e9pK+RdACZULif9xI9bX+T7EAEJqUXLGZIG6BeuiDAMoHOgHr3WZL03LKRZiQ4mAYkNTUTXwkOiPdrWWV1YOmrsnB1fJG4unyYf0apRZVp6x96zlw0FGnD9ZZiih1ZyhpJxqYw8HbeKHyGr8/+z0VXOJZQQlHh4+ZaXPpSS2KeI8ER3ihDofOMwBX+/ulNEcFYe7u/fzN6CgJtVFSFNrmfkLoBh6fAyCkR8OBYO1tQeS5OxjEV6BiA5PzXvxuuHK449W5L+MslKWudl1JTv7nV1a1+u3d0/8Z3mxWm+9HBSuqvt52t16w6gnUL3ClKE+Loqri3I5VMjrR7uNxQ/B7jLPci5Frqe9h7r99K9zHX7F2dRhT2FxUdKt59rJMAq0mXeXbnHtvp/zi9G1PEEqYuNvQucZdtKgvphQqg0cIogK0tzt59BRfg5wb3hs8slP0FguroZ9fNK6/drXcB8cKm/89B2qh0Q/wgS8oLJhH890e2kRdJwTatN31d0PAKnQmsNAhsRs0DpTha0lWEg4g9JlYj27aqCisvIf55C1dr/KNWxE/YwR8xADXVBaN1P7cH7MxU2oHDwqwYf9+9fDlpZlAzeLnXrLB3cuPdl8/xVPAhnM+xPk6GVa8HrewUhfRkOHsdBtaJtvLmlb51U/9/6nMBgMBoPBYDAYDAaDwWAwGAwGg8FgMBgMBoPB4H/Bv3//AYVbm+Kz/ji9AAAAAElFTkSuQmCC[/img][br]Sisi yang membentuk sudut siku-siku disebut sisi siku-siku, yaitu AB dari AC. Sisi di hadapan sudut siku-siku disebut sisi miring atau hipotenusa, yaitu BC.[br]Selanjutnya untuk mendapatkan teorema Pythagoras, perhatikan gambar-gambar berikut ini.[br][img]data:image/png;base64,iVBORw0KGgoAAAANSUhEUgAAAQAAAAEWCAMAAAC+I7nSAAAAAXNSR0IArs4c6QAAAARnQU1BAACxjwv8YQUAAAHLUExURf////n5+ff39/r6+u3t7cDAwLq6usTExMzMzMrKysbGxs7OzsjIyLy8vMPDw6qqqre3t8nJycvLy9PT09HR0c/Pz9DQ0MLCwtfX19zc3NXV1dTU1NLS0tjY2OLi4tnZ2d3d3dvb29/f39bW1uTk5Ozs7Orq6unp6eXl5dra2t7e3vX19ebm5vT09Pv7+/Hx8fDw8O/v7+Hh4evr6+fn5/b29ujo6OPj4/39/fj4+Pz8/PPz8/Ly8v7+/u7u7q6ursfHx6+vr8HBwaSkpKurq7Gxsc3Nzb+/v7Ozs7u7u+Dg4MXFxbi4uL6+vr29vbKysqioqJ+fn7m5uaamprS0tLa2trW1tampqbCwsJOTk4yMjIqKip2dnZubm6KioqGhoaOjo6WlpaysrJaWlp6enpiYmJmZmVlZWXx8fJWVlaenp5qampeXl5KSkomJiZSUlJGRkY+Pj62trYODg4eHh3BwcJycnG1tbY2NjYuLi4WFhW9vb6CgoIiIiIKCgoSEhF5eXnh4eHd3d5CQkI6OjnFxcVRUVGtra39/f2pqaoCAgHR0dH5+fmFhYVZWVnV1dWZmZnl5eYaGhnZ2dnp6en19fYGBgWxsbAAAAJm+3noAAACZdFJOU///////////////////////////////////////////////////////////////////////////////////////////////////////////////////////////////////////////////////////////////////////////////////////////////////////////APNecBsAAAAJcEhZcwAAFxEAABcRAcom8z8AADqfSURBVHhe7X1NYuO6zmyGnnkLXknm3oh3kUkP7riX/KoKqKJEWEn3OWf2PcQWQPwRhCiCkp3k4//D/3n4vD2fz1vDE417tR46Ah4EHIsAQFT4U/B48A0A/fH5UBtugR5sf0BaaoCSQyQB2lCkjJZEYoilA/0UAQsQeZeIR/2wq0D5XKr4AaFXtQl1FNzuGCTHzIEzFfc7EQmN//ZIfu6MXQylAARHw9woIx/ANbzb7UN8xMUsPaSIvEEATusj9Y8PGNCkBoAD2aJozXCF7Igj6KHKqKzkAQf54o/g8/FkL3ozLBlK8IHwyIAFE/Bk1glqEe8MdiywIIwImrBAZ1JE47jcFYKHoBmaJSLMuNJcYe4aHsh7gce7uGbsdmAVCiMmPbP2BOx4hmA8Ujc0uz1zOJPajOXCxFvTZ858oYenBCZdE40Tw+pqw+lhtxghRGDchPEat4k9+2O852EBRpjpPZo6dMtcXDVFrJmzO7iMIeG36ehxt/x8Fv7Z5UjVmKAxtWBmefNZp3heAna49zDO5/CcATsBLZi+E0LhFdPuMgl4boxawQD2Gc1EE59mWDOmOtTi+alllkAaysqPru1k0mCHKwHGLcgwhuKuYLxnZk6/MIzDuDKdjMbnVD3vKBMs7ahtrH7cCrAMsiiihgBDTYWLpUlFhZR+VBfBuVcbDtBisYEx+XrTuSgIqSNeBA3VZggiqKHiWy7ZeJEPqvoqkDcqEBgWZWJSl6Wvql0oYrwoI+gCPF0CPOMcMCcBpqdmBGcQmw/03RwD5wjhqSPy1LNHmMC51TWdRL8gb4XeTFWVF8X5KEIvHNxEHyKfzZYp6fhSZzhiAGwiHS1X19gXkE3oXokx5iz6Xo8Go+cY/HwUK9eE8WlKATL5CtBVU5nptvTs9GlYs7Px0Bx9TEbj1Wtj+zqHs6pe4aw2YciO6UACJHOX4woeseyKu0L6kAdInYC5OmYRNLbPJHV00nj07uWjq8Bun9EkBjB0Evm6N0Owm+4pXjEZ7xbHPghr4M3IOD0f34YnvHdiuPRZSc0aMGJxlxwWuyXmFTXGuTwbt6+RiGTb+DK2uDbjKgFDM9luRZg03jspQWIyN5fAcpS9EYB3EnZtzbQ30x2v5Jrh2PYolkU0W8MuEEfBnvXVSXzaZGjyMJafsQbEg+2tuSdi4SaiYIsZW+E1ijAaR9PR2OUybbw6s68wGlvjnFSW/Xrjfvf1fOL1vHMrAEDVxft5R8FjhdGBt5muQCxNcKsihv4olUAKJaiKx7cEIgqrkAkDujKrQknAPYi2aCx79HGXom5yya6C2W7IlxKBwxLGOB0Fkc6jiCVgFmxHTEe9sUBDewltP9gRJGJjyM8vngBqtFVviFR5iRm9QqqNSbmgQC3xC76+anfEXZh0+8itlPr/7IcQn48X92b3x/31ut1e6PH+xAH0/fb6fIL+BIOetKOTMV5NyrEOUpCm2poGPR+Qk4Jcjj3pfEkcp1LPLkv2ObbjKJxnOiaQ70UtyMSOpQWvwpsLErtpXNhHrp5dUwLvA+LwvAbcH+qBwjjEJJJsjq+xexg9JnpgTk0QrKur0zUsY7tIAox3jayK3Y5Glo/0fhKMRTAzgFsfTD4NQ0JrkKGIW/MkOOEWbAkol0gtz0H1604Tmy3i4m6NTXMmwIxEcZkAMS6rAM/yjednH47Gi2s/gpUAY1vslhlnz33GhjuMbxKQ0bxiesa+HLfiBmg+nDeOZsLRIY4KHy6B3n7G0Sko3kpZki6bkWF01/McYFUUAQFWujcJiIUZvgSiufv8eQbs56MEu3ryBU6RFiRFxcBiLgw4C5bmOo+NHb3XPvXAse0JGDldCTCOz8YxTRSN14kzPpmy/hOeqPcoKygRr6cqzdMPvauCEfFVLRXOqo84QJNYt6oUZqOgdllKIgt0KQ7fqo9VHQldWRuTocpF+i7NKrHEFFCRxjiiU98w64DEgY/LlOdRiAMvBiYPiT7BigkSOeSTe6YCA/+8/e+FLitC9aFDYfXy8UKUavfWARgNSIilrmH0MJlLtm61pSHZPJRwk72TAMGEEZPNQf5SEwkoLH2o0DkOtsdRTGFyhEskFWwAHjwB2h5UAjzHPC+yCH7da9pZkMmGsQPQjyeZsTUt8NVnjM6YY9o2ozH2MUWMiyaufDPkS/Y8jwFZFBxNwotgNxX2tXRzD47l9vp4KQMjRRUD57uaS5BYmjEWZpwFubRCMuQ13itZUpYlKmtAM8YiuHzaxHjcSJ40x0bokICP1xcaMwF4cwNzfbo2iyjesYkmZFgeBTsjJLa4tubVPiCaOYNmJIrLVAl7eKkivgQU0wsRW7AcgUdno4dodg97kNizFzET0NPJ5zUCmyYBe7wrqq2z1cn3V082Qna01gAe719rSlkDWEqrK9DE1kzXrVCWXIWscApB+Kkwr0fhS8CMlMHg3cQaK5nuvRkl4LnkDzIKOYuE7avL55cdJygsyk0UCo5CM44ZwonQnWq17cAK6Fz9DkFc1T3D6mPkcPp0WNFobJ8leN75UcBdn3mjkN3rYQB3B9gNsCa+foF/r5JC6DtJFAHXcz67V7GpW9e6l21dHTjBX6xfKUhVqfSWLl9f5IvZDKoVjcPvsv30ZxBVYsUTUJMtcgW9K2FkhXHg/kBxE0GgBCAf5KMCMzcYq6zhG9sA2dx/sxCTQz0QdyIIWLTFEsZLjimAkjS1IZIpwgMN32I8GROIhIxtTu1oOKy2FKGNARlfeJPofQAFZNNYfdEnFcwrTWWKt/81AsFnbfGYCCbAM36tAY2rYAE+sS0UrimEjoXXVDrNdMIuYFgi0pldxJIMHCxYLs3IJdCM6zXAA5nhbYxaA7LmWe1UBQgPrIdSlQbWxCuH6XIXpMJ8swYQeP5FvHHpaMY6GhfdSUwdxUqRscM7JSBBpuBmBoBmBuSZ02ZkcvRwEvCSU3NZZhW1RQ2LE5+YSzExIK48Ay4TMKNozQjGlJAvOwx3zADCJzPwgBKFcdh4dWlsn8CYMbi8qx3BiK0VsiMcri5nQHzPjcHwZWzT0xqQjVR66F1bjROrOBycTZLRMT73wFsyCK24LK2QmFqQD+oiMGNshCxI507A7jO9B1sgC54g7gOwThW8WQMEuGXrzofndGlshUctqSMBB4WCCh6913r7ZhQ/7gPmGtA4RKJoRiUANR+AzcDX/f56fj2fX7fX/QX69vv1+vr19XX/egEg/d9XVV3d7bJmPe+oa3xYjascpZ/PqVFx7igvL94i30lX7WGFArDS6ajqrhJFFiu4vowAUJWDOi3Aqdt/qr5wZKW/ty9uPqo4q1nFTaJmSCrW6p2EGDgQMwFMMc8QOMgd2OqRSsgMd0XcJ9W3J1nmCVQloBRjVlC1xoEruFoKjsxf/AiCPtuKexMyVN0ZQ8fGxDEiCLjLAFapbk3p/KK2NIshDZKloH2AOpEWD8oQc6tOyO2EcSBqanpmEfQE8SWQi8uCy5ke2Ofa51dfuWE0seNlCYboI0N43weMmZ6NzG66pn7j+JTFvqquKjAKj5dJx5AVq9u5HO2L1xbxuKJzFe6dUkC3a2mzZp4YFFqL4B7V6Gz23rh8jQRkSiSGxjPndmScHlrjccfSCXwZwuhUDJzLOQqPc8Zr3MSKuzVHvDY9z4B0ea4COLsWjFx7BqwZ3tgKuMg+eTOZKWKDhLBbiMHAhmC/BCJIEPYZhjXsy3gVTHIuM1r5gc7oKngX2NQCfp/kwYdK3R6dTctirL1jRrF/MDL3AbvPhJcRNc5QhbmAshtwuUJDXX2CwZyDXBnNDDA+OTpgR61l9omZlK6Nm2HFlfViICjhg+beeUzDuIpiMIIlqH0Aivm9q96LRY+FmYwX6ztqURVtvHmoeqpb82KwQRYKD+sLP64GH2WQT8BRCliqWhe29MDqxDYVKbJLcFmpkDVZcHPBNux/37kdwYYEb+5Y7l/crYAASXjyi4SIlQUVVnAMilUUGxJIWLAb0R3jQg9KALeByMlxBqha315WY2xggCCQJQESIEogHUQvCQMmob2JnoVIXNmhQC+TbWlMU5yHEmrTRdHzf79velTDL3DwFN2xZ9NXOcQFfHHoSgA/qUECsHXiWJkMjL1OIxLAE46O6FQJ8LWU+Zxraky676+lA/Yc01UEtJ6qNc7EHh5IcJty7gPL7e1V3UczGo1zM2OBo1gM4yb6Eji1ALkd7vGucVvDjsYwssY1dkxcBgRRbOKtJWbWEpCBU8Vj3SZYc7rozk6mhMVoHE2NbF+YY9en7+AoU+IihtF1JtFX+cLEE14KiakxTg4uLBAWgMakBcHHMmQO07i4SsC+wm4zYCTAQWdYu/0K7uQIEGyfSdlXUXtnsbSAywfJw+VWA2P2+d2kOQOsmU+c9yiiEWxCmunadtmVZgYYZziNxywMtou2wEKI2yIqWmBsi+y+9L2Ro8uOT9OPH9PY1J1nWPXBwtG0NUdYK3dkcJlGnlkTVA3WNI1d41z7wYOx4aQM57H2lWoBD81Cuf+woEsVCGFsrB3NcJGM7Hh21pJKFQoIakSXfW4KWN1ZMW5fKDBf2B+8UGnB5u6gAAoAFBvVEoDLIRRU0Jpdz5+pDeb9q2mCNgEAdM3eaInE165AUHesrIft7KZPDR5fjK76OkQDRhVldcA3GcSIReWbhJsMSxaV1Drh2gfgiGyxBEGo6BQbPzIBhc0S2ARoBKunSkDd7hOrJ/zUEwQSYH4hG/BDBtsVY6dQFuhPXL5piUrevouW7Dd4gvINiRTwqi8ZFIOq9SyFMicx+W2NmqC+MMaFHIZnTohMpcFonHbWAB6wiEdhWlY4RwEGeWD0pXDzk8pxhbsKxKfxDKsZmgHIXbVyyY81oLs+OGj84yJ4rkzcWqq5FNIHJrdYFsCibn/C8PDqOwvLNJ1fLoJhdHslVQI7SiypAj3wZW8i4e89OFUWbKX53kv8wYMZuGkQXsPCDCeRPrw84lISHtlPAhyFz2Q0un1RBlcCGjsBc5zGiWEoNMMJsO/eDw2XuIDNiKB7j2bC8o7QnbtT7wPGPBxxJ8uyGNEncbvDzJxga5qRHpqRGWDFmudLoTu9ux1NfXuSENMVTe8I01njbbotQRj2tU4tD+nBMaTr3dFcA3aG2+lpS8C6KWjQKFBdlmsRLBpqLtMkAG3tKcb5vZwBI7zzJwio/CrLLHb6IJm/Na9iUUVNNYs3kA1kNokSxQBJwrkoNWBVSiy4bLBd8LpLg+7Io0CbP/uXS17/LAvFwkBAsiTKglFhIUSw5JJTb22SqK8GXpUAkhivxp6cGSsRKp0IRKNmMviFCWJ9VEESwd2xy5ACsiEO++c9N0fHoCR58PkHtzYsydR6gcGdlT4noNHj8UufJNQfaSB+3LHDUdbVK3dl6kyW6BltCPD6RQs4/2IEv2AHE6oUF75euPFn59TvJy2IGe0ej7As7i/tufzImgdiE5kwDxQEflAWRlQb74sgUyzSjBSSZVnLQBi+1rPw8PQT752GUeeV28pqx1WqADiKQ5gkZtP60RwpVD49L7KopAzqjOEytgbMC06xABLDLtjXJSpqGWgFbudEHDuV7nm8gPXxeB1ficqaf74GnNdPq4Wbk6Fpgo5jHwdNeAbMHqywL4JUfIHZCl3RAAm+x7kS0EQS0KnSrTEhq6M7W74aL1+Nz4ugg41aEsBL+3lMQIjGMd1dWLBXAcw6HFDFxHi8VmYqJN5MiJiusg9weP2EDBqNr58HjLjNkMVQO1yOdy4cY5yDsbpsbMGYAcKPLzL4WHLrlPcxu8swMl4z9IQBYE2vASsKYzNset40W+2cFgBWMJDQnY4az0XQuBmZa91GxSBCdYQOo1gJwJvbwQxvd7VmeuPPW+2qlosMyyaNR1jncFg1OUYloBgUUlw49itXjdPDFc6WaxNg61Pz7NiHPmgbQV8yUKNqV2XBeYd/wOnErrZ7AZZ7FEhuhPhAhF+c5J6IhARYClgNVOJxWZDJBss/gUVaWwf+xgXNACjv/FLB7f715KcXT76krA8xgP4nf3LPei+C36Ske725zeleWa5AsuwzLHJFPh8v/UIDaWrpm5gNfmRBB7DGgRhHnvVisK0EiIu8osU1CvsmmZKBuUCpqyZsqKeX3g5HWw8g7T7IY/hiMCMA7kQE3eYXD8ujOqOvO799CVLuFbToHgkYqHv8wcZEgNP4+fHFLaPUwMDui3Jli7aY0xQyEFoSQ0wpT7lAM2HM+HWRNWHBmlPGZ1MmsiCCMBrHw9kSC8JmMde8LHHNINZHz/b5T/cBI9hUgWTCOA4a78MYXQ/fFwq4moRBGY8+9oxoFLhDiM991zWiWHE3UTjS2DV2l5xeTRk3McYZ02bsMcXTKrU8Yk++Ww7GGlbj4j/9JOUwA3YXK+7G2cCJ4R6SAAc3MjI8X6b4MjPvBHoYMhTM6DZOx25aWCW1qcKzs/jaXShlVhsJyAzY7Ue0jnJ0bZ9L0DiXPBdD9uOzl6Dj2ox3awCAN9gFowzGxd77eQu/p2XZR21obIxhOhROPQIOp7Meho3zmyjM8PBGqnw/kXuBPYrByE2qcBURFY0CVSZ0rLNDgB0ZbOnI1OpwGic56aEYwiTdlisq8ByQxPQvkQT46WYnAES5wA9SpK65W6Yaw6UClwFp8hIgRy4I6hWwktnYgspMl0Q+76gazb2Nyrk4KeFUYREVVl3lVxOJdNsICvsBlFnuZHBPQ1F/NEFnqsNUKY4sud9hdWdflBWiTrW7eIOGPR+EqPnVQkXJfvmFVZD+AwoFodARrRW0oZ6bADQDnLCVuMZj3p5Ti3edAhyoQVqaYCX3xu1i9UUCb0QnQyhI1JOMguK3CXCiaHw4v/VU5TgDdKw5QlMiAE3M07svAR4pKbwuR3dpHKIvoZjENBbNyCIY38bpozUsOAyrCTN2jaOmbo1nGTSx49zECe/B5hsi7jJdj4zsCVgK9rkJonCw/GERjIWjSDQHTe6HUgYDMQ1hbEKCPUj2II3cykUjdk1czpUkoBlWSDE/dFpex7BG5zvjJOCD8pTBFkRjhWV88plWuCa26Bcjjq80LXACZihWAFb5+nG8ax9gbIEY9/s2sUmcNEg0zmOKtwnYPAN2h4MxB27BnyhobRqC0cc+eTZN/iq/iENnjef0alwau8OlnpPQeCwmwSasaca4BKxwvuSxL9wto2nXY1hZswrzflrEQePK1zksFlqWURxUiVn5RevjDhbjVVPxroLOkoIqwpt2lhdknz+N2S6gYom6zY6arJcUyiNxMSRBLooref1BJZrr9zpJK2gIhR8fj//xb0zU/oM/NJOcDpnhYgKRh2TQNxPAIUqkQfMQYC84qA++KRYNDzCrb8AAbo2TMv25C9KVP5jIP7cgZc4GX2whjc/6FE7MknBEwtpLMRj9Ii/oFxXglwL2UnKQrxcDeUGAZL34B0Hun/xLU3yixT2afucGEn23BEa0VgI8UTxBcrGNS8CE8ZivuyCbbvs2jmIT+Xg8szOaTeSC3F3ZBVJYxApz+SpR++KEKEIK7sHq607NXabrFlwu2WvVsGDzvUaxKXz4U+Ms5RbElavAaTHEoecxdpTW9EByas0ItkDhOLgk4Cym/ZWjMYzdReqNBU5ARhGLpvbO1yjCaCxNvOkbi87ydZ2Abq9OJBjDu+wy4wy25k8C+16hbAJ0VlQ8WDDCeyPAakxiaG6MDOisOfIUuz0Bjm5dQ7tptyPISbHAivl1q3SK7qg0NEcfjtdhglNXx0jV8BXcRGm6ZbzUeuDfOHSXG56CtkhOdwWmTmvPcBVGTI1bMB4onzTIO3Yi2BOgIoiawCPLFQ6ERcCDfqQPL+4hwZFB2oJ3CZAHjoJEoo8F3vp1uRZsrmDzlCEnCsOpWEnlgXI6Pfgsd2bYtzUKozryMx0WSb5v/P0SPwURgyWTyRBmzSWpfBUJlr6jCQ43KeQAq6Dr2QrqMav5S79mi9p85++iUspnFbRmCDJAfVZ/CIj7HnbPLQIlj2d9VfZxq98DqTdVuSOhroRN1NdZSkFv6JRAjRaieyXAiXN+wvAlQAl5SJhI4vrhGQAwPUUU5uaqoHFNJuxtuFU8AZv0LFxfxhC3LNqVfNcM4CMxHACcPHyipqgI8iGiDzwZapwE5Js4JSCz8fDEtsC4On6HfxJEIS7fCxijiNV5XLxZA/RIZ2k2seJ+38nOGFuPuRGyZOArwd71ZWz7yrseauya09TbR4e5d7aNE+D2WXPEsicgiYjde0ckGu8JsO81isbOvhneDizNVOmcjsZ6CgSIwJ1e5y4KJ8FMQBPLc+MMPCZ2dHJI4ijAew58twBDY/dvTIxh7Qx+ka6IdNrE6qxNxwDO4aQHc93TcLgy2NjtZCYK9kmM9+y5GccYRXPVYjuaMY1mEeu7tEPzihEXZ4FjWD00nuNsfD1w491nYhouTWQ4vgiG5skF1m8LluZVZyO881BRo7vso6g2zfLtIspjVY0qNKyfXVAoIFXVDS/WLjKEoUWaoN81kZ3UyRIN363Hfsikd/Qql2LQFBSmPDVgoGcNLP8VnFzIJ/VF+C0zkhIcCAqkowRoQMUFgSMZJS4BjvJDijrSo2olgG/HoAcjoJ50UUAF7Dqo2CAOf/gSbYwj9ycvNvr7Lnx6QZESwD6wk/p48gvHTIBsmKoC6HCbU22dH46TOlQVUN8miIsJyMzxvBgX1/VUMr5iIAIBh4j8od9qr073PoS519kFi9F73/iOhk4dt6fNWL0XTnhn06G2e2b+mzjjNQyb7i6WpdKOHW21l0IYxhTgkD6Wi8KYsUXNzvnsi+/95mAlsXEEOtejRjuDCW4tUCaMmwi2RaI25qelfO8Kq49mFOanrGoeXHUU6+GZBdbU1YLzPz4mn76aUXgPNrEsu8ZWqEsHYMZlZpJcjBwLLE5Qtd8kwFgMXrdqLs1m8HNoEfPEYQbc+DuO+YRoH+8aSAuKcRmL7WLv8a3xDobxJuDpR2lBCqo9U5dOmzEuFkWBOZRRrEu9Ma8zLtTDdPVmfPQ5M5kZsGdyOjL+ScA1EIjxF5QAi3Q6bZzT4SiSAGrod0vMMLYLlimi+Ezc0WgcnxJ0cegjlhgWIDpDDAV64Aob+heq22H2KD/liIzuaS2bxHgnyRgF9RQCZSXY1zy+68/vaLz6gSmf/NKFgoqLc2ciGg/BqROAE8ArrsaOF6YqVhKWU5bk4jAXQOTgSG1+54KTmp9CQBdzm3WZf0IM5g/9XzBqyoQuuDypsnOPJS+lASgn+gRELajoW7vE4PM3Y/TpxteN34XFZc61lDz54U6pCB15YC88qCqKBmIhLnaFSqLXZKdjzJx1VhqPFJNBugQ8TS3qNl2JRZcivYOlS1KHGSCVpYntjmRywZemBBmFWhNvR0GGjNu+TCmkQLgYnMJFuAeBWqRzOYZoLOkRxzSMxmacfBOPS90WwQcLWZmRJwV7p/a9OhGG1Jor3sZnU8eg8VLins4OSdgujjdGNPcgj8MqwoJYGFuTqwUjKQZ3kcSAsTrGtIkZhRl2kXh1PoZdevDpMl4OGqeHMIztwgpDUCiCGbROB1piPLD5t4ajOWkSzJjJtCADN5am1XIy9gSk691+JGT0lBDaRRTSqRXGsGSBdZ/RPGEXjeCT5oFYvhrPeE+m6dLi8UGD8eWAE0NwC4Id21DYLbdhcSWv6R/TnJ/Ga0rsvgK7IEMWo8r94l47HOO1hRlJ2bC4Eow+zrFpuHVC0umOVzSb6ThPF+HUb3HgYtvnVi6BZCR2MKQTM3oD3w5BwAWvXtVfXMh81VslWYyiqlQTiItZQCXS9SUM1Ox76RCrtnfNL8eExoisDwsYLX60gZOslTpuRM5Xj2aluhkUniCaURBhhwCYyq1i4oFx6t0hN48zXImCRMPhNrS2oNUkhlv+YCEgEEtSbyhrkwaq8iFBidsFD5STKKEEzL1Orcfp4WTcngkZZzJxhU1smQHuzCRDERRCr8abxWTM+dg4vQ5TC4JPmrt0XZYnNeJmmP/nPQXbwgrpYx/WTJUZuUJ3gQNfDDs3fu8zdsPhbm+N6bDx0JzRN7Yg2bblTICxTX9M1TovjYevs6lbwVbfg30zrM3UPa1QdsEefS4zd7pbLMZuOjRXWIXj3AO/0Eyr0Ox6Jm4XxMUu2INcvo1NXE7skaLrGWAc540vp0ThfVjT3pDxNazxhthxE9N3M4zHdIumFa5No7mb7iMLEYE0qzAU4G78wcLbdQL1SFKVHx5g2gR+tE9vzAKDOoTSAmu2YCnboqvFA40Bxtro8X2aAXgzNsYLM2AqdBlcvzmq3iHsjRxnE9FK5j55pHUkOgEqpCq+Gi2bRQUUeVVOgjSUC7iiSN/j4NdA+CdBoIbNCn8BGVssErcXDne2nnfuYgT1zQ+Y0BxbGm73GRkTQBKXPGgKuRGCAh+ysGd4Y1MHZaL+gBlssGOo9HkGIAFgU6MZHng9NtUAAM2MNPbG0RgQ08YDIrDvXMDNUcQiGsdiZySsMHYijDi90rCvals92D2Z8U3XjXz7FI0rF+MLTe7sL4ZnmHEOk+HU+CTYV9U8Vh/r73A8OmhGFHYX849U2tSdzj7MSCdNXJ+o9LqbDOdqn/3gurhMQHoqtIjR424xTrQFsRwJiKudEc0R1pXGtaYE++2/ZgDpn3sy7NEnAXtm/J9SsDAVMS+B3UU63RnGMRk+4mtoHgW5gOOYfvS2+pXj68xY4ARknE5VFCwwwx5WjLvvoRHTwTAxNBpXu4sJik1jsPWDYUGBBHX1I2KB6cseT0klxiIolgXIkChWPTEc48iIXRwYVj2ZsHFikLBNwzlO1GPeVLN8q8DyAzw1WP8XsF2Mqs9qKF3czpB6fKhmM39WUcEG3TuI3mH1vqh8hpCoQOaFwS6yviiBl74bKYkQPwukBklhKoUQRrrrR00i7nmorgmZWdlp8qyc5zWp7ukAJ0If/A1o/VCTStVWLyKQnKLqRCMk+WGnFIPUxoC0WnhJH681icQoTf7UlMBYuBMkR2MSYSCDrAAY5Ck7atNFrtNCa67tUwy+Gw+G8RXDPlMGIxgWxjsxfNMnhoDz15uLoRHT/Rz7lNYJs9Tq1/uAkRELxnPk3cIJuF4EbZmgd0ZSFd8gqmLhbJKxem9iMRrHeXzwkAQYhzDeGYYIRgIGbmLNgMaJNSFdmcb3Gk2fqkd/ijh7t+kyKZzzIWypu7Z0+dntLZiZteTK55hu82TtLtweGnd+fZyAo4Sj99gOX4kvhwNei2Drx7FxwIz9XmCcTydg3gtcWYzxbueFVUOETOV3xGnGPIMHUxz7gJ5wxKGkvVIfYe9h9Biw6T6+3JhaIS7CMB4aBrZ92QuoSa0RzrVzYwn0JJ7fS+Dvd+gLDCB5ILDYVvFk6RCokhbo91ABvJkH4uQhwkwnF7TNXHdYgO3AB7mXGgUs+zalQjmAXFsKkvUEAVOgTFoDlVi4IgGgAYZYJeChNA5YaVDIKriyRghiNkhepIHmyCrti4FhIZtoi8BLGyKwtIshvwn+9zlCJw4SShmnGFQqkvW9dJIbfsGEvJv+AwdYynLrl+0i2RBDqA4EYeRPMaPBBBjcOHMJ+8wJmHGYjwURNM6EHrg1hwJy0ISxCf957k2DT8pEHEyMR28nbKnL/twJxpHxzsiOYRfsPWYRDOPKYvTe52X9DeptVYSiJYYwrip9XwKi1yjsOHkLYYi9TQ3WnD3bwgy7vN5spXdjEtr+V3skIMmd4zRjPx/SHF1fz4ABFmQjtJvuPeZhiwVjvGa8c8G/c3wQNLFGY4khknEejGVhP3G8af0BWHNMnswqY58lhzRmwDdTop9cjPhM5DvCERh/y1ibM2MTDmGCNQzR3AUj9dY0w6NZ57XxDNpfkg5jaCQ1hRaxj+Rkuu7V+6hKXD8CRl0WaoWGNX7EQc/VQE9sR0oXbACLUR/y06ow50zRheNKHqKJ5p3VWW31QRynjbkfwYGybksTGM7DETRWW08z6EwPJFiyq0IWU850lL5a6lBeDSjR4suUEQHTGM7oiSCP3BiI5g/dqKEdTvFbgBetzeY/kMEOrVzqCxIk6Vs/dQZbnxIh+xDdJvUmWcPQJcuMCoK3NE2IwESWtuGrcSUQ7XW9FWd0Zs3FoBLM3gkKpxOvxkOjucJ644B3BTES4GVoRd94giXBg2HcxGW2hyCAc6bFbfgOHBln4W4SaRPl042cxpP0O8iwsnTvePcVn0luNAvP3l04xuyKRjAI1vAlaOIbRg6AS8cTdo3rmIxbY+wDRkgW2DTzMRqGCNx7YDg1Tq9Hkx9D+ANYUTY2XGemiRhY82SBqYWl6sA4QtonAVNsxrXpzhC468vRXMKbc2DchPFhEWy8KZwEWOkPjOtOjjiOCEOjidGbCDVwyAz45zA62Gf8DGWfARRlc/8WbLmIghX/lcYKRwfeXFe1JKFtAKsvlSq8BFtklRO8sT4XX7rFKYQeSt7VWBO5iELq8Pjq4qw4IIYWF7/SZPPxoT0GY3BgjJft7rI7bXl3I4a0pVJ6IsjmobE01JANVSw+gnj0ULRVWrc5RBULYyIFGi0GpqDxKh5eyrphkdDhgSo1JbhnYkssNoEtIUvHtuEzYvtim6gOCIYU3jQQ+d/AmrcbXApGz2ZEMK/5PwWkagMzlvPG/xWM6A07Yy2Cu8TtBO9z/0/gyvnOF2Mw/x4ymp+nVDSNm8j5PvhysgqG68EIXGZ3gATXjv4YzqEewL4dUmaAIZ1HszFB9NAwJHe7AKzq5o2k4MT/83RNGKZmGOe8NjF2gr5eY3mc97UjsaY1Au9MCtrbW6eEMeZ/CdfrlTtKh6eQ0BihxBUFR+muGGGUjtqnmTY1jqY4oBwgv09+W5G/m8kN6O1Tf6KKv1xZB1YQFmsqV3EmA55oXx+h6MDKz48BQPBVbFAwwYGfnFTfspS1PJQ/0uKIuTalUGCWS6I2Xgg54j6kXadEPkQ0dnbdLkLe4Y+/3s+xd6xPzlf+kyVQ3BvBmskgA0qgIdYnQ0C/vvQP8Pmf8W9P/m98EPevlzD/W/7rF/9RPuD3s6LCgUlW4nlUnxDAm1Jcb5IVJbA+KRHNF+RoSqyLg21pSwROPXoqbVxn0NWmjG1akJCcpkJvqucfQx7XXUMp8A/hV3/dd3on4yAwHCrBWQCI6VvYTzbwQb9JoWj8mwQ0EYjTxgX6N7LM/huFs+aCxd814mIQgsMJPWb5DGRYupXdv4L+o1YLRk8E/U8cAKesIb0XWmfO8NbTCc7jDhzZV05Opj/3dAn1D4K/A/XkX/+eozxARHaZu/MdEv2FApaqloxxvrUce5Q/h5mAd+3D/1utFe8Ebp+CJVwnwPhK4X2aL9X/BfRHNt8A5P2fpRs8GS4TseDKd/hXCtcb1ECZ8qgyo+zgLfQ3qUoVaBxL+wDO/0cs6CVHCYg6IL0Gr83AGUZ8e5t/cKpgSE4gR04A9xecnzhelIXqt1y2Y14CShhNhMqVajeqLyvx/U5tdlIaAGwreJ2S5M5DbzApVAwVCms4HYPsmBSf9lmMk2T1Rr8H+Lj95j/npWkNjV1RR3Sr0p3G8K9gXQK7s7RvtUyoRxF4KRoGxLazHYsFzEXBWfhG9cB8fP36Jf9+ksSX+xcC93iO/5ON0I4N9c+ywY8CCe0rqx3Y2wIx30oIFkSBxPPr6e/moxNOtm6c4NLnX0IPL+Nb42zc/zB+CdogpWfNgDcutF4Mn0PzAPzTNB+3teziQuFHi91aaT+a5tP1P4e4caoTyzacVQG3nnUZFFVo1i4qSMkalxAF/mYZUP7sSveh/yMtMp0eff6TnaD95KP73XFhbwFBhWiMm0WREfjkLBckEJvbIbZOAE3ce1uiP7opf9bQOnsc5zHdK4Q2SAerh4ZdkEVwxCT8iQvACt3JMRH6/0hJ/0iANNFwO8T7VGHi9+no//EtkofGmHT5QplQ3g4B3Bbr+B20xpgByawwLoAIDGYQ8xb4bEEwUZr88EJNMIxNxIS+nuv/Ma+d52bKb1LURCAD2WBFZhisk7zRr4qMVLH0HsxJF6NJlFg1kAC0VJWFZag3ONwCdqlmt1RQ/ZcGMS8DKJRNCdLZhOq9GwD4bgr07aUviZD8vHfeSdfBRx5g9VzfByPwD/pS/3AghABY0i+NQKi//1ldKQuVQ21WXlyQWYcA/AVgUEqvMsysY8xctIuPcyMXlTIOjpaIVhagVtfFkA/mDSYv5Fp8SnApUM5ggEu1zMig3if/C/oCDe/voE3yPADdNbEwtoCrPTqJRa2FUyEQTUPatnyexpPSBBimNjkK1uq4q19C/HgNQGILjB9Yk4StORUa+DSO+Hzpk2h8mq6EbRS3r+xHpZkZDbDp7lxfvoifqw6+AZs6AekxuCvgFuwECDDJQYwcBsdHoZU7Epr9DaVYNx+C9LozaszdONVHQsx+hOsqgAVAeA5rs1AodHMaFmFpNMcuDrPq8/7FfiwR5l4oqo0DJThvfeZOMGb2cwXjmWBmkxYAQEIL0fh8bWBhvtTMDDAsjWf+8WwBBZ+49DaDxYjgpLGnae/wGtYlYOg2/wtggRUuFN07K7SIBQfL8xx1fLdXdx9LEv4r9SewRp8glARhIFTissBE05N50Twstw2HNshSPHVGVknqHrDbePOniDqdIohBSBNYv4MJpt6lXcD26RyxluH4qj8zf1DTO398Hq3mSaUOOrZEQMKNli7GIgSr5YDOM4B0bdxe3GCBqvGxuxqnWFJETQbB4qxrWPWaWyEOTwrrQM01PcgA53HHIiMm1UngLXvkXs7V1ikFshI3GTjyk50F/+BusLoG2qebellPpKI4IQITCLrWJjOCSUQdALoq/5EpAKN+QdESY4+320hgEYLz/PoreF8G+RAobROGITjimg8NJwVNGAOGX9rVXACGLuh3ggMc7i8IrjKB6fgKxk6QWP8R2y7ia/eZc2KBGEhAojm7iB4vfuqgPXwAawmIruGgAIDdUWPsA6b9Fcx9ALD/MLLgKDhjEx5FR7F+/8UnvTS9H8StTmny2hZx8vn5S42TKQljEuE2/INLIP72NQCSLipq/QHEVaLwCYmkiIr9ftz2v+mkboW/HxE8nXKwcv7XsGZAIYD/B05DerrCcx6zIhCfgkQTecHGB8zwTSxT7wIieYfd6BbvKoF0J8m+icCFsGpWQ0z1bgG/0qkFj6pFYAE4tAsDVH+KQyYmSuM+pHQ1jZBYFiQmR539ru2F2lIj9g9fD30Kw2bzSoPCItTJaUEFV59ZUIkW0rPCSVFADt70IZKrMSPkrb2AdyKs7khj5VJcWRTZwpLpUQzv6vHSNkxM+H7o74hT347h4v7rC+sfTRhnWckNGXVA/knSSM3SYdWDhTQ1APA5mn8PYw3IPvSyAwscAs+1wLjhcJNuTQR+u3993f1vBN6Mou7BV+/prTEToFlwNM2ikxCO0m9hPRRtpKfSBOND9GeIIBbWiGAzrTgxJ/Q9HA1DfGkUyQkorCPwPjT54jtjBWQRXP5MGZZkwznhxVhL9EhAGI3zIMgCn/F0jskrHBcWgHpiJnzxcVozyi2ugPKyfDSOImcRMQXDsfHcGhkOfgpnBuAy+zw8ijin/A1eDA/84KqJrv09E/rBEaAYj+cdE2ElgeBP4sMbCQCjnLLRXP/tlJz4hBDYGR4fq0ARPKW39Wzmbc9FNE7brsYMAK7n5s2IwAxwnk9cD7rzEvgufCmYWFjKpyGGPjJ/gFblP38q4MrKIrXajZtY0TceDCfg5ALrtsebUcZCBNYEfimvZoK/i/Nu4IUzrdhwoXCl4SBoKlzaMrV1U+Q0S7/bQIIHlWAK2eZVyR90FAVxLJCm3/jhAKkkVRHVYnAiCvHQjDWrMBORhF93fxSdFFmzfQmLlICFkxlGcVQxdUII1S2TTpTkg0khORzZAwmgA7CeH3dMPxT1Kt/8piiA3xuFW3ijhUB98muksNR/JcEZ0V6AnyTwXBBJl9+PpAE/GEC/fHosPr+eSqw+ZKWoPm+/fv3mx+4IEsyKS7DGpbFyTEqA4XLJu4YkZFWBuvz6pOjMN9UYnYo4CXCoax9EygKZjd0mwjBElFS4TpCG00p8ssaMqgkueyuHlYDaCMliQRJwZF6AVRof7gb1dHYoLHzF6JStNWBpiuCMUnNBNPbAyxdOPz8aKo6OC3MiNXUQLlbBYAR2Qf4+VHYAcdrYMDsxNuHRnE0hLo1DGmLaeEE4SAX2izzn3TY2h8j0v3oe0ES+CJGejJvY8exjJEAY4y4THE4CQhhNrJ0C3rwAcEHEuqBVEgbh1PgeotrYM+BWjyEAjYfPS0ZwToM1IalrmI3jg0tPhvg8WGwEF2Bc4geBKYBJb4T+Btq21wAvAKB8HtOjsQkrRNHEcREsAm8KNV5yLYjpFjgu/qZOGINGIWnW0QQCgrGKBUyKI9s2AlL72CzoGeCPgQAlXOo8+C1kUQRmZFjG2l0XoTR1UJ0RwobdXL6WBoslHRx74YAJ+s1MVVjosISoLDOdZNBKIFRWFQsO/H6APgeu9IGnXQCAHVanpU3XRCrv8FtdYHaqmpe4gQR3J7ePJ79UQAWcQ5w8dsas0BJIWhohrThI9sCGhBwjj+LIOTwyd6VLu0uQ1+/ACpoB9ZUcEnybPvAUiloHUBjCOnJylk4dAQ7SmpFobMQR9GiFyZFALIlLRIYSQBZ9SwjIPuDvQVWgb0F/APdm2Ntr2gaOKkOdcGa+VWn4TvYmAd+qH4H3Au8/WLKL4coMngtCnSTgrKPG9kuGmYI0TtxjBk0OzfRGHGbjgLWmZAfMgJ8ewzax4xWjiTBKg1d4ARjn9T6+TyZUi/MmzFiCvTdCNkLWirrxgPh7PuohWEwMw0UTw/fsrIg1L6Eh1tKMaoPax4kchZgYN3FyMbT/HD7v/SfuhqkZ6bHQHMWYAaWqdbwA+LCBB0RwIo4qkRjsPHwROBCr2LGiIIcgcVD3cAKGsH7oNK9ifXz+7gu1emwZqVObuAVnBUIR5U+UUO+weDhgAsIydRQzkVF7Z3cCmWrM0NGfbOSvjqLs3vtwQ4XHDThoVk/dmT9JgPpA3eZ/09DfecQCAFe1lwCCQyWMZV51Hs75wySLZILxohBHFnhuBggUFOJtf73Liv2xE+0K6J0ce6Gj7la0+HxyQB61CopghIoSB2ZBuXgH1xICgwnq5cmrDlimiuRBHKPmqiVhCVrcBK9ntUt0onHopkfBETGCeMJ41dBQySSpY+Y0ZxG1CWr8U5C7A8TphgMRNBHzQxTFW5q+hdNx4ZOvMAmnxhHSaw6ES/UBwwT4lL8xrBANUbDVYe4EhyfA9BWOq3QYRp3htAPpLZKjyl79/jHwdnJ34vaOF6OJN8OqwCLghC6i0MwZYA2REItd86zVeEhPWn8AXHeaHLa7wGc+MyCJWIyi1pDa+xtNE91PGNYIxFeDNHfmzMiAFdQZ1kqQ4Iyb2PFSaJyzlmRGYx/OmAG9qB0ZjZuYOTvC4E2td2Zn6E9sL8e5P+5IxobFmk0N68FjgzUPnZjaYWmcsYD1sv7jN+s0/7S27s1JqqQy1eiDC0z1QKqIqiZ4s+DKF5+6kAczHPn5SxVhl2IgOa0X7XksVvVEAgftDehAv0xBHuKrnuutu/0KTWICtvOQlRSvJSAwYCK9mhKXgEbmB7CkJBuJvzD5hWDSnjjpEaQHx4yQUyHgzINQH2oDmpCACSAG9OaFvHKrJKnnmzZm/CBFna4EwEgMbpuoS7At2fKPZlnxhJNHFQg0kAIKBWGaMeBSIKDrJuOLuGKotl0sTROyQAWwxOdFCvzdlPzG01EgQN4bCy3JZDRexAGG9jVcOc5NS6JHwvW2RSwzihODraHR+MHfr+FIzVi9x0nDEph4h93YYH3iu2CPZe8wkKcYhmw2YtqIWSmqEXF95agYM0UEfuBRn+8CIhjxGTexXBw1bLXDqUPB4IQR3ATORbkdgkKHqWEcSSvFIqMKJfjkn1nXF0ptuVQNB58F8WUcCeDUEPzMMMRhY4Aebq7ojZsYCTgIavokHGOueRsgz/prRy3wkvZGz4RxE9Pln8HsYcOEXpEK3ikQViIs4aJPmEE3DrQplnJ+ZE4qF9qOB6OxiKoRKAl6Uk9gfQCP1YKQ1Us0KTYIHTUV4UqapVpVhh/+B8SWjyIFOuGC2lIQXBCrpy5YsMQlX/aUN2av1IERQpYFJYX00o9ckNJRBI/1Fle86rgGr3CKQY3WBUtj8lRrgk9J6FrBE33070fyixEsw2pUUjkgYfRQHNLKuggyWzEVm4ALwzuE2hlBoFQRMxIw9Qvy0o+x6Gbx0NTCGkCD0nHEO0OzhT2dzL6DoRlXJg4KYo368Q3IOzNZzYHfQcmi+VZ1SJHPBiQWW9Mw3poLYtopcHtgd8Jz17jgTfo3wK4bkwEZu9ZonHh3n+8tB3edJc4Z3jJ08xpWD7U+7aleyW3cjPWVdWusoDcX1OVl4S8WDl8gjJsYvoTDbPwdwABqhygbB3YGtZl/8y8NKiSMJ6NoHBgMhKGPpIbzNc7Gw3ZoCnata/hLTa1eak5Lz87CtdIL5igG8MZz1b4D7KZxMQQkIv17uAxyF2TXakhCrKgEcCxjBpgIw1AMHHeNaIbRxLk3gBiqD4AqDQTOWlYJIShZvRySVYimpHEaKABWu374qg5IY7lqBlugWWepB9/6kYBK8qm3DFFLi6igy7oY4sunGEvQ/OIQzgM4YhJ4s3uOE28Wbq7dJHpLUkFGnXK0ebGWGMCFjlgpE3H0yfezv3/RB/ZASuu42nDCFUBbGsbg/dANN2Xk1z6AzLqi+OSgu2NnoDhOtoqr81cUiWYS4SBQuxJwhjCGZAdneGh6G3xQ4KOipZi1DkEbixeLwHLRYKJNYaijTZWF5ogBkA57oIQDZzbUlrDAXSc2M5Yfw26yGI3HlayxqSAWpLMoWDp6310FLAj8aDriPc2AxDT8BHZGTIaPMIxJMPPVTCdrJvh8vrUUYWxixLl8NfGjjwgIw8817P5GLCuJrVT8moJFnXH2FolihBNTC0b9G6ZxsZueND0xVyyNF8P6hpO9CGMT8dHYLnDDIrwSYMFuYVcjitXHP2DsmIS3ddEyDgzGgHTQhH2NnrFUq78Mq09jvmE0g0+wlgxBE3kAMUZynQgSWg4JVZrrVRjQDHLqEGK9cNBx4TEDFq7aw+jJa4O+NvhmidWrJMUUNmEYwxqag2E4maqsIgJVS+5YVG+1D0AtJpP1uVPFAbDFA16UkCEfoFCrya5HITTW8wAdqvLi9fG8d5OeYXB78lsX9esP+VAGLrQPwQaibe8VUQdGjTqgd+yHFSdlegfcEXC9KuJqkWQCmApA0qWxFl2gPB05zAM5EhQuFc4ikhwnuNybDIDisx5dUMOp076HjMIS0hPyI0dw1b6MaUoRGeXLgiJwKIaUCnR+8C4Zs4BoMh3YIBgHDvW7YG9PsA9rpt2MfDNbEaDhKGbvFoxOd59LczAaj7Ck6VAiTQgjlgHxvEGSuYdgzFlZBE4QyZEAM6arXfOaMUx2hmZAyqDxzliEIarRaBzYBY5tCfr7XxBoj5zxxsKMy2FF0PibjBibEQGJUTwsDRGGIV3G84YDETQRjMVCKVDpIbam4aBZMKKYOWschiGMaDZRa0DR1dPRNF3v/gIR/KgxNIG5fCOUOgFjNCNo4xAOj0Dtn02ngMR6praDBZdn5xqGReOAXGDsWJRXW4RxE0MQ+BeME8Yd9+t+f+IHRx1eT/4DcgD/DbmqK2jVDSxdKqYoTaonKmKAxl2qNKp+NwU+ektbngh3/RdtiKSwAP5rX8aOKOBpUJPcwmVSQjI4JTQiNUipRTBhnMkjLew5uOvQgBsBuKHgc2fGSrpGXGETMa7aVqChKg4OtvrKBtX1wptwQHgrpcVBP1TjQyglsbY3fkPAxyTVevI7qWAVA3o8O+yZaiVhQBUhxiivJJRDDRRUDZovxjYK/H8Bb3z+Z90sR5cuIzhoFFkTxi2dnNvHx8f/A9EUnpbIA40eAAAAAElFTkSuQmCC[/img][br]Berdasarkan gambar di atas hitunglah luas persegi-persegi pada setiap sisi segitiga, kemudian isilah tabel berikut ini:[br][img]data:image/png;base64,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[/img][br]Dan tabel di atas ternyata luas persegi pada hipotenusa sama dengan[br]jumlah luas persegi pada sisi siku-sikunya (kedua sisi lainnya).[br]Cara lain untuk mendapatkan teorema Pythagoras, ditunjukkan berikut ini:[br][img]data:image/png;base64,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[/img][br]Gambar (i) dan (ii) merupakan persegi yang mempunyai panjang sisi sama yaitu (b + c). Karena panjang sisinya sama, maka luasnya juga sama. Perhatikan luas daerah yang diarsir pada Gambar (i) dan (ii). Ternyata luasnya sama. Hal ini berarti luas yang tidak diarsir dari kedua persegi tersebut juga sama. Jadi, [math]a^2=b^2+c^2[/math][br]Pada Gambar (iii) [math]a^2[/math] adalah luas persegi pada hipotenusa dan [math]b^2+c^2[/math] adalah jumlah luas persegi pada sisi siku-siku[br][br]Dari kedua cara di atas dapat disimpulkan bahwa:[br][br][b]Untuk setiap segitiga siku-siku berlaku:[br]Luas persegi pada hipotenusa sama dengan jumlahj luas persegi pada sisi yang lain (sisi siku-sikunya)[br][br][/b]Teori tersebut di atas disebut teorema Pythagoras, karena teori ini pertarna kali ditemukan oleh Pythagoras yaitu seorang ahli matematika bangsa Yunani yang hidup dalam abad keenam Masehi.

Pembuktian teorema Pythagoras dilakukan dengan cara mempelajari luas.[br]Namun demikian teorema ini dapat digunakan untuk menghitung panjang suatu sisi, sehingga dari teorema Pythagoras dapat diturunkan hal berikut ini.[br]Bila [math]\bigtriangleup[/math]ABC siku-siku di titik A,[br][img]data:image/png;base64,iVBORw0KGgoAAAANSUhEUgAAAIYAAABeCAMAAADRypzhAAAAAXNSR0IArs4c6QAAAARnQU1BAACxjwv8YQUAAAI6UExURf////b29unp6fPz87e3t56enpmZmW1tbd3d3b6+vpCQkOvr68zMzPf394qKitnZ2e/v7+zs7Pj4+IWFhc7Ozvz8/P39/fX19Zubm9vb27y8vGpqaqSkpJeXl6amplhYWEhISKmpqdra2qysrObm5uLi4qCgoMbGxnR0dHV1dcPDw+Dg4KKiorq6uk5OTnp6eurq6t/f35+fn/n5+YSEhGRkZLW1tdzc3Jqamvr6+tDQ0F9fX2tra9bW1pWVlfv7+6enp42NjfLy8tLS0ouLi3t7e2VlZcTExNfX15OTk8HBwWdnZ35+fuPj45SUlF1dXba2tpaWltHR0XBwcOHh4WlpaaOjo2xsbMvLy/T09LS0tFxcXImJiW5ubru7u3JycoKCgpGRkaioqGhoaJiYmNXV1eTk5Li4uHNzc4CAgJKSkqWlpe7u7o+Pj9PT03x8fG9vb8jIyOXl5YGBgWNjY+jo6Kurq7GxscrKyq2trYeHh8LCwtjY2IyMjF5eXv7+/vDw8FdXV4iIiN7e3nl5eVlZWcXFxfHx8WBgYLKyskdHR729vX19fVJSUk9PT0BAQKqqqp2dnUZGRmJiYqGhoUlJSURERI6OjsDAwFNTU0xMTLOzs3h4eE1NTefn566urnZ2dq+vr9TU1H9/f4aGhmFhYYODg2ZmZsnJyc3NzVBQUFZWVnd3d1FRUZycnA0NDS4uLltbWyoqKj09PUpKSjExMTU1NXFxcbCwsLm5ue3t7c/Pz1paWgAAAIr6/QEAAAC+dFJOU////////////////////////////////////////////////////////////////////////////////////////////////////////////////////////////////////////////////////////////////////////////////////////////////////////////////////////////////////////////////////////////wCTsNOGAAAACXBIWXMAABcRAAAXEQHKJvM/AAADOklEQVRoQ+2aTY7rIAyAs7JYcEZO4FNwAla5AgssPWmk3u+ZhGaSpkkMIWEW+aSZAJ0B13+A2+7h4eHh4eFiMD2bYsB6ldrtMBY73V4ftr0mGGRl/AVIpwY0VYvxAMBPDL0bR9qgnIl2UaA9mXGoIYp1YXpq7SkqWqYj31ghoxidDm1zmbKp4fp3qwV6WhwptLPMpA2GY6aVqybfGEEIjZLIXBuMJmriqgttRJz/HLkDdJ/uoMi/95uBW9xlpQ3GBJivfYccvwE7A+3dWRUXb3ziblf9qo0Iu+otXjHyEbAzbrXMNxd9Y+6zzKZRBly46cy6L0a0zCq94wWSqVX6+oCz2dJFlLtgA8Tj1G38wkUMLpJsHdbJ/At2tvHyGfqCXXgvUn5Rdjq9azhwpyJkYvDq4b3hYc1N5u3uWigGX++uCF6XllfyuRUFscxStBvLChli8D/52qdm52lw+O095SvQ161IgDGDy2kaumKQal69EdRYUcjUBqN8RUH8a5xLGrBzoA+1LKPSRKrkcIO2sotwMk+NPNgyVQ9nWQE7R/c1fTU3Uma4vl4xQrTDbsEuUsky+75xtAjn9zppdV8b+lDrnI1rnIJiCW4bicqr7LxFeeOD+eGskI3LYx6Kzlqm0onO+HNptWRP+Qaes8ypvLFA+2V5Jov8jX4bDt7S91S8p3wjXjXLpqvlG4nSmKksRrRMiX73s2gJReWZmL4qeseAXt69JWAIlojWVYxTQG6NF61WSiuofD3O/Tgi+Ub9D0RNyLFMihS8oILDlhFPmrKoKj+SboMgdrl0CBTUnkpQQRi8SIZvs9oFAHD8M2GBAyjCgeSt9eS9D33f+577nruEyvJrNnb6wAYAHotdy/gQKBCB//cj85Dw8+LJXy+eIk7Dc05PTxYsxVnB2SgYAMXfzjkW2SEaExvcB2NNp7kTB5zjcR4yzsQoTOscgAqZU2eWBxkZBeUras8JN5UPj/EZeXy/QLx6FbSRJgJj5SmD74p7qls5utVO6Pv6RfIEalWWAZXV0msDOe2lc3OqzRLDGDZLau9jPScw8VmD8r734oIVTs0Cd9K/ZS0P38ORc1wQeHh4+It03X8uihvouWwNagAAAABJRU5ErkJggg==[/img] maka berlaku:[br][math]\text{BC^2 = AC^2 + AB^2}[/math][br]atau[br][math]\text{a[br]^2 = b^2 + c^2[br]}[/math][br]atau[br][math]\text{b[br]^2 = a^2[br]– c^[br]2}[/math][br]atau[br][math]\text{c[br]^2 = a^2[br]– b^[br]2}[/math][br][br][br]