Desarrole una regla que permite definir la hermana de una familia a partir de la siguiente base de conocimientos.[br][img]data:image/png;base64,iVBORw0KGgoAAAANSUhEUgAAAS4AAACeCAIAAAADn3DVAAANmklEQVR4nO2dPbKruhKFGZcGxDgYgorkDoD4ZBQDeKUhUCchdXLrDkIv4E+AWpaQwC1YX3DqbGyLNtvL3VvSoovP7Wit//33X89/AXgJxf1ShA4BOPIDKWpkRQAOeEmx75Vqm7qu6raPl+KlOhykKIqi7GKvS1cWRSHkEDvOlr9lUY2xpYozJd2fovjDKqJXEZIVVZNEivrirDhIkeQjLkViKQ7yH/OznirOdPwti0rI/34dxkv5gRSDdTh0pShGRGmqY5DzA6IUQsj5qCilXB7orM8XstN6Tn5lOaao8TzzS6QQsptfIcpuPnFXFmPGnB5cTkHGObL/oKeKkzovGadl/OWBf5AYf0UGWVGW5fqxHrqyXCUn5CSQoSsLQ4pFMSmnK9fUtslyQ1eOPw1SFEIOepDl+KqunD6zUhSFkMNyAlMtXVkUQpTdMGg9dONzqDjnl/wpin+2XySJ4nSc1xqndfzpx/+JuYQGN8M+Kw5z3lhZPipGNjCy1qbwWz5ph3JwemSQUzrtynHg5Ym7AtU+rPkwGef4+D7hpInTfV5rnNbxJ1Cj/gz+WbErhaSinxiGQW6y4g+k+C3Oq6ToPi+kmA/ss+JUvFlqJmmkQrN+pDRDFn6kFNcCdeikEM5sQ8c5P2wpUJPE6TqvLc5TBep/UlSF+F/iGWVg4CVF1VQb6jZGijp4BtWcl1j1J0VZGvMV3ZxU1iptnLhYFyWI6ZDx2fPyhVHxCdkZ0yrTx3B+iaUctMc5s0k4qeIcVWk7ryvO8GkbSPFysNvmPtjPT6I6/SXYbXMn6xI/R7DE/1OQFQFgAbIiACxAVgSABciKALAAWREAFiArAsACTymqpp6X9xsVKUX4FS8bfwsWJ7LCc7dN3aj+8/l8+r6tq0gxavgVU49PvGMs2edEeIGqmkgpwq+onePrznhb0tz3ajvvwZmxfcPM9/eAlUAp9qpVsTvCNfyK2j3+MBiy3+Q723k1mRXhP8yJECn2SqlIGX4+8CvOkOOvybsQYi9Fa1FLl+SoUbPBV4op0uGEhl9RO8bvymJJ9oeoIcXn4nfHN1OH0a5F+BXneGzjD1KIcjlY+mbF5QunFIVZJ8N/mA0+UjzaFaOkqOFXXBYzLOOvb0GU4+Nj+I7zGifenhX+w4zAbpv7uH0+E9VpTmC3zZ3c61fEEn9WICsCwAJkRQBYgKwIAAuQFQFgAbIiACxAVgSABZ5S7FU7ORbrJvYO4Ux1OEiRwOc4wuMmi1jMyAq/jW9tXbdq/L9q69t322QGG2sSlvhzIrhAjZfilX5F0n9ouvsX4984immp2G7QDu1bOGIKwNkXMciXOD6ymBulcRcA2ifJ5ksBfMdfin1bp7mhhr7Ur0j7D79ZK/YHQ/sWzg9tt33T8YT6Ete3O8yDfo0TfsV8CLUO921zb1YM9SvSToswKYb2LdTL67aJiI4nzJe4jLN7whefJGrUbAifQe3b+tZOUoF+xVRSDO1buMTiK8VAXyIlxS/XB1LMBi8ptvV8m6lPr5oq8j5T1/oVnVKcLIqG9WjDVgChfQvnhw4FKtUtONCXuPottwWqK074FfPBLyv2/byWUS2iPI2+0K/o7EM4ENMeC3sBhPYtHDlM2xDxhPsSN/HvfNDH66PhV8wK7LZZGRLdDvGGecvOK1RUpzmB3TZrFrLdMfEcVy3xS2LRwg6W+LMCWREAFiArAsACZEUAWICsCAALkBUBYAGyIgAsCJKiaqrYrTYftlnxOr/i/s7IG7oyus0iFi0eQZAzo25Ve78zIzusS/yp9g/YwFL+E/CVomrqRn0+fQIpvsmvaMZ6kCKZLe19Iyl/o4Yv8RF4u/hHBaaQon6VX3EZgMiKx+NU30iXvxG+xPzxbACesn3Nu/yK63FfKVJ9I13+RtSo+RNqHb4/K2buV1yP+0vR9r7c/kZIMX9+IMV3+RVn/KVIvy/a3whfYv4ESHEpUxn3V+TmV7Q8fzt5ZBnJ2jdSk30Xx4fgS8we7LZZycivuAXV6RPAbpuc/Ip2sMT/CJAVAWABsiIALEBWBIAFyIoAsABZEQAWICsCwALPWxK39boFNXa7DVMdZt5fMcD3iMUPlnhLMXq/24J+elZkb1nClgCO/ECKb/IrnumvSPZRpI5Tvkf0XcyK8AI1ummGfpVfMby/ItlHkThuXI3ttnL0XcyKU03d7uwklbtfMbS/oqOPor2pm3meTcWAvot5cWIGVTXor3hdf8VUUkTfxdzw7a9Yt2oSYlujv+Kl/RWpPorUceM8myPou5gXnlnR7K8Y51Z8l1/xRH9FTfdRtB4nfY/ou5gX2G2zwtCvSPVR9OuvSIHqlCPYbcPRr0j1UQzrr0iBJX6WICsCwAJkRQBYgKwIAAuQFQFgAbIiACxAVgSABQFS7FVb1wnuScxUh3z8is5+jCHjYNEiJ3yl2LdN06o+cqPN5/N5QVZMssSfYr8BlvJzwtck1cCvOB8O769I9Euk/YR6L8Vzvkf4EnPCT4qqqZt5Fyr8ijqsvyLVL9E1vt30FOZ71Bq+xJzwbXVq/IXYt+2Nfyvm7ld0xOkY3yrFIN/jBGrUbPCWouFRVE3UvI1+lV+RivPb+/KWIvouPgRvk1RdTYVpH6nEl/kVqTjd4/tLEX0Xn4L3YkavfvW3Ys5+RSrOgPHXN0O8L/RdfAbYbbPC0K8YB6rTnMBuG45+xTRgiT8rkBUBYAGyIgAsQFYEgAXIigCwAFkRABYgKwLAAs+7g1cmcZttuGZFPn7FULBo8Qg8pbhapPq2jpSifnpWjF/i3+8k/QKW8p9AcIEa32nxVX5FKYqiENJ0FK4D2XyGB8fG2tbGCHD5aX4Rk/094DyBUkzR81S/zK8oRSFKOT/HjIL0Gdqz4ia8rQcDvsT8CZNiku7Db/MrHi0WX32GRIFqvIN9AKhRsydIimn6gOuX+RUJKbp8huTfitN5D7ZESDF/QqSYRokv9CvaClSnz3BR7yBLUZQ7IUt5ODt8ifkTcvPFNEp8oV9RyM449aEEtvgMu3VCp9vJqCuP54Qv8QFgt83KRX7FRKPOWBIyqtMngN021/oV18mfr3/xfsNIx1sxYon/ESArAsACZEUAWICsCAALkBUBYAGyIgAsQFYEgAW+dwefb0hcxS/zX6pD04FhpSuJvoVn/IpbX6KzLyJ53mfx9fr/gEwWe3x7ZjSzRzF+z42+OCseN2hehHWPS6p9Avly2/X3Jo8tEN5SVOv/73bxB/gVx6OilOumMtNOYc1apF/RHN+yG9X+C7ZIkcyWRN9Ful/igTN9F2m/JbEx0NkH8gh5/S3X0xl/sF+U/H1l4ef0LFBVU9d1XdV10zRxQrzarzjVSMuG0b0wXFlr51c0nzgc9psdtn27xz8ep+J39Uu0jnui76LNb7mGM8yDjtfB2QfSHpHt+tuvJx1/qF/U9fvKwc/p3XVYrf+N1OK1fsVvZihfKR7KrN1I1BetvxSp+J39Eu3jjoMF9F08bmRdxtk94VsfSGtElutPXU9HhyzHea3xu35fGdSoXlLctHGL7el2sV8xJyla43f3S7SPO73Ov++ivxR9rv8hogRSDPWLvkSKfbt2cjOncM5xrV8xlRSvL1BpvyXdL/H4FXCu76LNb7kGuC1Qv/WB3H8lUdefLFCJrB7qFz1VoDIykXm3Ok23mKEv9CuudU3Z7eZLrH0Ltxz8iiHTNtT45HmpvosOH6PWuiurovy7P2lA30WH33IzbbP7XB+vvy0ex/W3Xk+nvzTYL3pi2iY/KaaE7fp+6DrEL+bl/pa2VJyczvdS3BRPHBlUpxq7beL8irf3Uez+CCMFJUfaFg9+GE8anrTEnxZOOgSAC8iKALAAWREAFiArAsACZEUAWICsCAALfKVo+hUjt4M/0q/Y2W5x/ELgVzyNnxRVU9VtP0qwV0pFSVE/1K+Y0KjIzvEXAvyK5wj2K477wWOk+FS/ohRCLhZBc3tYkG+Q6q9oB37Ft/kV16zYq7auqqh9qPqhfsVpm+cSkEcfRapPY0BegV/xXX7Fz6dvl78V2yZuS/hT/Yon+ihSHanCpAi/omP8iQxq1BMzqLEFqn6oX/FEH8UrpQi/4kOlOM+a9qqpWxWjxMf6Fc0Cdeik8OijSEtx+QDv+ivCr+gRvz78vp7jV1RTeVrHL2U81K84LWZ0xnTFF/+hq0+jo78i/IrwKyaD7fo+/IoL8CveD3bbwK+4Ar/iD0FWBIAFyIoAsABZEQAWICsCwAJkRQBYgKwIAAs2Uux7pdqmrqvjrfj7tqnrqqpi20h9HupXvI2H9WmEv3HBlhWPXTHMI6pBf8X5RBlYb/gDf+OIlxQ3B6J7nT7Rr3jGN0j6A6njVJ/GAD8h/I18/Y2npHirMyMTv2K4b5D0BxLHqfjD/ITwN3L1N/5Ais/0K4b6Bh3+QLtZiYg/1E8If6PlrMen/KBG9ZSi4duPLlD1I/2Kob7BVFIM9RPC32g56/EpXKVothpWkR7+p/oVw32DlD+QOk7FH+YnhL/xGL8+/H5/4W/cSFE11QajEO3bZj4Wu5ihH+hXPOEb1LQ/0HrcEb+/nxD+Rr7+Ruy2WfmhX5HyB3r7BingbzwBn8WMi9G8dtv80q9I+QODfYMU8DeegNES/8Vw0iEAXPg/uRUK5KzUiAoAAAAASUVORK5CYIIA[/img][br]
[img]data:image/png;base64,iVBORw0KGgoAAAANSUhEUgAAAf0AAACyCAIAAADH14HSAAAUI0lEQVR4nO2dPa6rOheGPSgq5kLLOKKMANGcAURKtzvEAK4oMoDoNLS72J/OIPwVBDDgZTA/2Un8PLLuPZsQ2yzgzcLgF/X9FLTW//vf/xb+FwAAjkM9R/cRfQCAF+FJuq/J9wEAXgNR9+/3qioueX7Ki/t23T9U9OssVkql5dZYlKlSKs7qrfUM+ZuqU9O3vfq5J+WXUl8v1SMAOJq5fL+67KL7+uB8v87iXfQ0i3fW/Tr7YwrrXv3cj7+pOsXZv9/uBgA8jyfpvrfo12Uaq4Y4NaW4ztoP4jSO46xdGqdZ1n1QWtePs1LrNq1P0yb5btppv5LFcVa234jTsm24TFVzLfD4sGtC7GfDWFX36qfUrthPS/3dB39I+QGC4kXz/SxNew2tyzTt9T3OHmpcl6kydF+ph0yXaZ+0D/L3ukybv+osVnFW6zpLm2+V6UMgs1ipOKu7BkxpLlOl4jgt61rrumzWkfrZfuVLqT/DX62d+ulo19pPa/2PP/+L25EoAAiBl8z36zYj7ul0ychzjXx8MH7SydpkVOXxSZ09LhTKtKm4W3E0zmOv1vxY7Gfz+TiV3qef7nat/bTW/4ChHoCweM18v0zjTOrxg7qus0G+/wu6P9fPo3Tf3S66DwBOXjLff4yBWIYeMiPJN4dhJIEWx09E3e/Heeoyi2NnHi33s/3YMs6zSz9d7dr6uWqc518Wn1T8387PNwHAbyPqfnU5DciLLbqvvZ/nMW9c9mKfxWlq3NAs23S5H+xo7mz2z2MK90ubtdsnN42BkzgrjfuuD81rv2IZVbH3s2WQSu/Vz+YnwNauq5/+93XRfYDPhPm6x/LyT8swyAMQHMzXPZp+3tYrwrwtgPAg3wcACAvyfQCAsCDfBwAIC/J9AICwIN8HAAgL8n0AgLBw6H51yds5W5dqo+7jv39Y/UN4LhMA5nDM180v1f37+/v7fi/y00bl1/jv712/sMXMwwKAGZaN81SXjbqP/7521q9LY7My0xPI1u7Ej3O4wS8+QxgAfpkFun+vimqrNZvGf1+7669r4zdmkMnb2tVivo+fPgDMMKf796qqNmr+9zf++y1i/f1liYrjse5bx4bkkS2GegDAhUv390j0H2j897Wj/jJV3WXMpNfoPgDsiqj7A9Hf7MKP/37bH1v9dRbHabcwXZrvd79uaazM4Sb89AHAhaT7U/v9Tbqv8d/vnuO01N9vQpw2nzfdd7RrNDxsFT99AHDDfN1jefrTNQzyAMAMzNc9muf67zNvCwDmIN8HAAgL8n0AgLAg3wcACAvyfQCAsCDfBwAIC/J9AICwcOj+vSoeDvz5ZdusrZfN9+ss3sG3v+G5z2tK8BwnAMwh+zQUeV5Uzb+rIn/6fN0342Xcj5m3BQAzLBrn2a77R/rvi3765nu4OiP7phbTSHPolGZvV/Tff2Cqrcvf389nv/mkM+vPjPd1yb7/L/MLBAAvilv370W+z3sW9aH++7Kf/pyh5nihy09f8MHXeuK/JvfH12e/39y6rXS2n/jvA4CTJe9duReX5+b7vv77sr+mn+67/fQFX0w9TbHl/vj57Hf1jFaY8f1nqAcAXCx7nude5HmxRff1of77e+m+u90ddN/TZ1/S/Zn4oPsA4ELU/SJv36v+fa8up40vVj/Wf9+p+w/LfcPdeMBQbV1++rLuW8Z5rP3x99nv3x8wHOdx9RP/fQBwIuf793v7GOep+wVYjT7Qf1/0009Lo5rRfdGOsdpa23X54GutLfd1hf74++wP+j96icw0Phr/fQCYI/T5uvXozYfr6zn8KZpyUVcZ5AGAGcKcr9vn16OHIDdw1LytTHhe0w7ztgBgjtDzfQCA0Agz3wcACBfyfQCAsCDfBwAIC/J9AICwIN8HAAiLWd2vLqetk3W/XzbfP85/v31S1PrEfZnal3vA85oAsJZZP868qIrn+3G+HdZ5W3tNCrPB/CwAWIlL96tLfqm+v+876H5I/vtmXye6L14HTLerWd/u16/x2QeAtTjft9XI/R66r4Py3+8qEPL96XL7dmnt8uvHZx8AViHqfnU5meC/7+HD3C9fqvv27dJOv36GegBgFUveu/L8fP/N/ff75ct137Zdbr9+dB8AVvEk3Q/Lf79lue7L2yX79eOzDwCrmNH9brRn4ziPDsh/37L+8O6ypSbbdmltjDwN/fqbj/DZB4A1hD5f943894cwyAMAKwlzvu47+e/bYd4WAKwl9HwfACA0wsz3AQDChXwfACAsyPcBAMKCfB8AICzI9wEAwkLW/XuR9/Y8WyfsvqjoH+e//xQ8fPx57hMAWpy6v9meoUN/er7/8q7IzPMCgAdP0v2Q/PfF/mjt8NOX/CSE5ZKPvxi31/9lAoAnsWycJ79Um+x5AvPfl/sj+en3m1W3X3YuN6Ix9Hdz9B+/fgDQWi+9r7s59w/Lf1/uj91Pv1t/1JC0fNDO4FrI1X+GegBAa734eZ7qkhdbdF8H5b8v9kfw099L92fihu4DgNYO3S/yPC+qh+oX+cYnesLy35f6I/vp9wI+HeexLTfaGSxx9R+/fgDQWjvz/Xtxydvh/W3u+2H577v6I/vpD/o5vASZLhd9/KW4afz6AaAl9Pm6L+i/XwpdkpYvg0EeAHgQ5nzdV/Tfz4TnL6XlfjBvCwBaQs/3AQBCI8x8HwAgXMj3AQDCgnwfACAsyPcBAMKCfB8AICxmdP9eFXkzeSvfNHXrRUX/dfz3JX9N73p4XhMAZnDp/r24XIrqvnGq7vf3dwD5/i7ztvaYRMb8LACYweXDfMF/v13s478v9dO9Xc134njUprePPz77ADCDrPvVJb+0Dj3472sf/32pn+767b7Kfj7+WuOzDwAziLrfvHalHdW/F8UTx/ff3X/f0U9H/Vbd9/Lxf8BQDwC4cOq+4blfXTbd2NVB+e9L/ZzbrsW6L/j4P0D3AcCF04c5Pz3Gd+4bZT8w/32pn+76l+u+7OOvNT77ADCD8znOe/Vb4/vv7L8v9dOj/n5jhO2Sffzx2QeAGUKfr/uC/vvbYJAHAGYIc77uK/rv7wPztgBgjtDzfQCA0Agz3wcACBfyfQCAsCDfBwAIC/J9AICwIN8HAAgLUfeLZsZWy7bpuq+a77+O/74vPK8JAGtx6H7vwnwv8o26rz89398+b2vssjMD87MAYCWLxnnM34B1BOW/n8VKqTgzHfL7imy++ROfzs50MzY62P3VfulFZggDwJuxQPfv22U/OP/9LFZxmrXrmL0QffPt+f6ge0PnTXz2AWAV87q/h+wH578/Ndac9c0XxnmMLRh3gKEeAFjDrO7vIvvB+e8Luu/yzRfH9x/tTmz20X0AWMWc7u8j+wH679vGeZy++d1PRZ2lsUpHvxpZNmkdn30AWMWM7u8k+wH678dZaTQ9GUmy+OaX/R3fcqTZZTptE599AFhH6PN1D/Lf36nWFsulBoM8ALCSMOfrHuu/398dnr1LMYdxoTFUfuZtAcBaQs/3AQBCI8x8HwAgXMj3AQDCgnwfACAsyPcBAMKCfB8AICwcun+vLg8P/u1ztw4VfdN300qZ2mbq6nX++0Of/fZBS2v9YrufxWz8fwGecwWQEXX/XuSX1nN/+6xdfXC+PzWvOQjrLNm9Jn+9L0+L/2KY1wYg4tT9qv/3s9+35eG/3yyN06z3QDBNNK35uOi/b9Zvceqxq4lF98XrAHv/7b78dsT3DTjqkd8fIPhYiPG3I8bfEk9n/73ffyDuL95PACDhGOepLnme56c8v1wu21T/aP/9x1BDZ6YzVmFXPj7y3zdXrCf2CBP/NXf90+VS/x2+/Bbk9w246rG9P6DvTt1W2sTB8R4CqUe2+NvjKfff9/0Hrv3F+wkABGTdvxdGvr9V+I/135/zW16q+5PRilFNUgq5XPel/jt8+S3I/qOueqYmP109oxXc7yEQemSJvxRPqf++7z+Y2V8M9QDYEXW/uhhDO4M/1qAP9d9/J9239t/ly2/7rqT7znqW6/6S+E96tIPu+77/AN0HWIV7fN+4r/vc8X0///29dP/4cR75/QGiL7+e/t448mVHPbb3B/QdHI7zuN5DYPv9k+IvjvMI1yu+7z9YNc6DTzWEjus5zmK/5zj1gf77/fBAWo5uqI598y3jFRP/fZ/7ulL9YrvW/pubMPXl11qX6Umlf8eN2t43INTjeH/A4L7uSESn8bf1xxF/azyd70vwfv/Bivu66D6ETujzdX0fwfyNp0T+praLjN0pl4biSf3ZBoM8ACJhztfd4r8/nLf1BMqv2EiudyezPTf5i/3ZB+ZtAciEnu8DAIRGmPk+AEC4kO8DAIQF+T4AQFiQ7wMAhAX5PgBAWLh03/Tf3+jL9pH++6XhXxky+O8DvBey7leXU17cG72/V1W1Sff1h/rv72i8/3IO9j7gvw/wRizy32+M2bbo/qf672dxnHWW96abgZcP/sSH0qmh+O/jvw+wiSX5/r0q8tNpk0eP/lD//YcFTtchQ4+8fPC1V76P/z7++wAbcI3v34tufL+4bPNm+1T//VHFK33wH1X56D7++476HzDUA2Bn4fM8W8d59If67wu67+mD/6hqu+7jv4/uA8zjzPfb/1eXvKi2yP7H+u+b4zx1mcXdeL2nD77ZdJ2lsUrNNfDfn++/nuwv/PcBBBzj+49Rnnz7U5wf6r//eI6zNO5nzvjpO3zkjQ0eud3jv4//PsCuhD5fF//9Dvz3AQIhzPm6+O/34L8PEBqh5/sAAKERZr4PABAu5PsAAGFBvg8AEBbk+wAAYUG+DwAQFup+r6rikuenvBjPzroXlzw/nU759CNfPtJ//2mI/X9P8OsH+F3afL+6jMXdXFJdNrmyfa7/PqwDv36AX0TU/cGCoRn/Cj7Rf3+ND77ody8tF/rv44+PXz9+/QADFuv+U/0438R/398HX/S7F5ZL/ffzx8evH79+AIMn6f5n+u/7+uA7/O7tfshC/3398fHrt7Q6XYWhHggFh+4bb9jaPM6jP9J/39cHfy/d9/XHx6/f0up0FXQfQkG+r3svLu2SauPbtj7Vf9/fB1/yu5eWS/3388fHr3/afz3Zv/j1QzCo6nIaYIzn3ItLu2zrc5z6A/33V/jga9nv3rrc0f/l/vj49ePXDzAg9Pm6v+i/L/ndL/bBl8CvfwUM8kBAhDlf9zf99yW/e28ffAn8+lfAvC0IidDzfQCA0Agz3wcACJdXzPdPSv/8UCgUCuWQ8or5PrpPoVAoxxXyfQqFQgmrkO9TKBRKWEX033f48q/g0Hz/do6VUsn196PpU/4m6tT0+RwppZSKsp8f/XN9PGLq2Jxme5WKzzfj60n586N/rl9KfV2fuy2z8b8mKjrXlo9uWaRSz972cXPFwVLqc9Sv3Ie6Cbu13LKo2xej/XJknH8rnp7H4dvEc31ZE8/5OL/C+Sv7NLiXe3J0vn87x++l+7fzH2MH1+eoP5OvyYJtuab9mX9No17s/ibqFJ3/PX1znhT/YdwccbCVWxYp1a1zTeIomjmrB9t1TdWz4vxL8fQ8Dt8nnr9eFh+3T4rDk3TfO9+/lUn0mB8UJdmt73F9TuJ2eRy1ycXtHCfnRzahzINPqOeaKKVUdK6v5zR6fKVMlFJRmkRKqfR67ZY3+yZr64mTc9k1qpSKktTSrm19o0z3bpkolVz17RzbU7lJaU/LMhmebOMjrC//ztFJRf/dFlS+W/zbtG60Uee28slHRv1RNtkKy1khxcG2UVmUZOdmtVsWJeV5vU454vzW8fQ5Dt8jnuJ5bV5XdYIwE08PPVl53PrFYW150Xz/nKT9vryVSdKfD9G5bD66XVNlnCdKpdfbI6D9/hPqaU+hOErK203/3Jr/ZpGKzzd9O6dNbUbKU99u/T7ujt3bOVaRpV1p/bbpL6X+9BfI3VlkZE8LSplEaRLFk3r+i9orymHx0P294m98SxARM/H50Wdzc25lEpmntBA3KQ7TcsuipGxabPbsEp1SSpIAKc5vHs/lx+G7xFM+r0e/Q5aojuLppSfuOHufv3uWF833IzWiO56M39tWcMX9144n2uqx7eZbFnWDm0k5qPaWGe0OdN9+3Ajrt9+y/aTfsiiKldd44jBjasvyS8V/5+iklFm+rjNx84l/v73LdKrREePTazI4K8RUyB6HSXnUXyeRana0b3463IrFcX6veC4/Dt8lnvJ57af7vnrijvPP9vN3fXnRfD9x3B167IP6dh7kR7b9V7rq8dD9MlHx+VpP2xLbFdaXj4PH5d7tHKtRUuYoRx03zrh5xL+P0ivpfr/kSTr1TvH0OQ7fJZ576b6vnrjirM3+DMsH6b5vvn9N4sgyLK7PUZx0emrcD5H2n1SPfT9Jx8cti6K0uXC7XbNkNt+X12/XHF331eb1+DUZP5Tid9zsMc6zV/y7T48c5xF1fxy3OZ2axtm1XfL1+LSeN4mn53H4LvF06n7Th9s1iyZ3Taad9NOTdcftHufvbBH99x2+/Cvwf56nvrb3Z1QUR8ljzO4cpUm//HEd1w0ams+HtfvAWk+ZDK/W2qS++aNsKonOdXfnp2siSrLrOVaP4UKxXev6RtwHP+ntTaR0MMZiHBDX5KSSv8ODY3DJaR4l+9zX3Sf+4zhbRg/GZ4vnfUg5DuO49WvG55v5Z9+lUZydx5Xr/ptlf71DPP2Ow7eJp+u87u/TRun1nKqp9E/iuVhPVh63O52/M4X5ur9TfO7a/02syYK48js9D7f8+aWD47ZjnH3bJZ6fE8/NcX7yc5wHw3xd6w5edNf++hWNkx3Xyq84/2Vc+vxo+BDe78Vtxzj7tks8Pyqe2+L87HlbB0O+T6FQKC9SyPcpFAolrPKK+T4AABzHK+b7AABwHOT7AABh8X+PlZoofUa0zgAAAABJRU5ErkJgggA=[/img]