x/(lnx)^2=n,求x=?
我们知道符合哥猜的下界解:x/(lnx)^2,现在的问题是我要反着问,有6组哥猜解的偶数是多大?或者先正运算10^5/(ln10^5)^2=754,
现在反过来,我们不知道10^5,求754组解的偶数的参考值,先不考虑3k型偶数,把一般型所有偶数弄明白再说.
若用754*ln754≈4996,那么4996范围内的所有偶数的哥猜解小于200,达不到754组
若用754*(ln754)^2≈33098,33098范围内其他偶数的高峰值是达到了754,平均值在300上下,只有求出偶数10^5左右,平均值才会到754左右
搞不定,要加一个修正值,从2点几一直向上增长至3点几,4点几...,但这个增长很缓慢.逼近的公式可能错了 有些人讨厌哥猜,我想这个标题起名错了,事实上这个逆运算跟哥猜没有关系,6除以2等于3,反过来,3乘以2等于6。A除以(lnA)^2=n,那么n乘以什么等于A。这个是否可进行逆运算而已 $x = e^(-2 W(\pm sqrt(n)/(2n)))$ W是什么值,怎么操作 软件是可以直接算出来的,只是我一直不知道,用手机上的计算器不能实现此解方程的功能.
对于x/(lnx)^2=A,软件一般给出3个解,而x/lnx=n,只有2个解 本帖最后由 northwolves 于 2022-12-13 10:07 编辑
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kIFt6NtW/f3jR99eSzzz4r+EQ9uCFYmKb97rvvfEFFwfIFMzMJAQEKlgeNlI5gQawgWmYhE8H67LPPZMqUKWbJJ85RsBIoLL9ceuml4saOxZYZiSjun+iayQ6p6MbB64Hnn39eWeCP5Sd2nRJEjQgFy4MWTUewYAyBaUGzkIlgQYTsmqpTsMxa4eQ58MQaLL8CR1h+kQ5uPnjwxLITBGxnU6JECVuL1oNbI2clo2AVcrN6goGZerly5RLvmzDVVr58edm5c6eSAqzGYB2IeOkIltXOt2+//bZUq1ZN6tevbzkS0+sCWpdPVnWkYCUT/Oabb2T69OnJB0UEbrf+85//FDnu1QEKlldkw5Mu3kGjP6oBe7otWrRI/Rmb/ylYhU1t5wkGu8tiqwgE3MjOPfdc5eaF3/BUMXr0aOVcOoLVpEkT5Rov/sGNFfsxqcGqjhSsAlJwtwQ/gX/84x8Vs3SVn/r/5MmTffX9SMFSyfN/EMBDMvZhs/uePErUKFiFrWnnCeahhx5KvA9q06aN4DNz5kwlBdxU1A5kV7AwSjMyaXejk/Xo0SPJvN6qjhSsAuoff/yx/P7773LPPfcoo+UvvvgiqTleeOEFX30/UrCS8Mf6B+4Z2NAzDgv89RqagqVDxegJBmbfr7/+ujJ3/NprrwluXKNGjVLcKsG9khrsCtamTZukS5cu6mW6/+tt6qjNS/eiwoMYJRgFvTpSsJJpwWwdbfn4448nncBDhp0bBoTvpptuUka5bdu2Vd57OdnGhYKVhD+2P/AQ1bJlS5k1a1ZsGcRKsLA2asOGDUU+eImpBrMnGCwWfemllxQz8f379ytTgBAtiM7WrVvVJGy/w8KC3jfffDNxnZtfUE+jXXWN6kjBSm4BWAGed955goXgWovAypUr2/L9COOMv/zlLzJo0CAl4QoVKtg2gNGWhIKlpRHP75gdwYPS/PnzFQCYzYnDIv/U1o6VYG3cuFF69uxZ5LNq1SqFi9UTDN4HwQu76uYITzq4maS66LE7wsKNLDc3N7VNXPn98ssv67qHMqsjBaso+ieffFJ5AFGnfhHjwgsvFBiwWAW4xIJhDgIeEmCU4yRQsJxQi9Y1sBQ+88wzBQ89+MCZcseOHaNVSRu1iZVgmfGw8wQDS8CSJUvKunXrlKS+/vprOf300wXGDNqQKlhIe/DgwUWE7bHHHpM9e/ZoL3Xtu950oFUdKVhF8a9cuVIRrMaNGysn9+7dK7DQshNwLfbMQlizZo3UrVvXzmVF4lCwiiCJ9AGsy8S0/4ABA5SF/Oq78UhX2mblKFiFoOw8wWDLe2zMqIbdu3fLddddp/5M/J8qWNiVdtiwYVK8ePEkIwj1Jpi40KUv27dvF4ywUoNVHSlYqcQKfv/9739XHkwwdYwR8V133aUfMeUoHBarbrfgVBjvQJ0ECpYTauG75sCBA9KrVy+lf+Xk5CgVwAJ1PPgwFBCgYHnQE1IFC1lgdHP22WcrwqVmiX2SvAh4d+XEbRAFS7818O4SbTp27FjlnaMqQvqxTx7FGjhcg4D90W6++WZZsmTJyQg2v1GwbIIKeTT0M7yyUB+IsHyidu3aIa+Vu8WnYLnLU0lNT7Bw4uGHH1ZuWvgOAcM+WGYBNze89MeOxPXq1VMMPsziq+f0pgPVc2b/U7D06fz0009y6qmnyh133KFM0Vj5ftRPxflRCpZzdmG5En/rM2bMkDPOOEMRrX79+ilGFbhPMJwkQME6ycK1b0aChekknIM5+9q1awXrpMzCvn37pEqVKoq4LViwQDp06GAWXTmHdyxW6RolQsEyIiPKuyiIVtWqVR15HDFO2foMBcuaUdhjDB06VDCiKl26tOzatSvs1fGs/BQsD9AaCRaygg86CAq2Tn/rrbdMc4frFXUNECwKMa1kFWDJCA8XTgIFy5japEmTlIcNtK2V70fjVJydoWA54xamq+AlB++tSpUqJbAuRcDoysnUfpjqnW5ZKVjpErMR30ywsG4Lu9D27dtXvvzyS9PU8C5KffkKF052Oq/T6UAUhIJl3Byw1DrrrLMU02LjWN6coWB5wzVIqWI2Bes5MSWIqWe8y8JDEpahMJwkQME6ycK1b2aCtWXLFuVJ/frrrxdYBZkFbBKoOriEH0NY/h06dMjwEixUheg4DbjWyvOG07SDdB3aB1ab6YZWrVrpWoWmm0668SlY6RILb/wff/xRsQq0ujeEt4aZlZyClRk/3auxwA+eMIwCvK+XLVvW6LTj49j3KnVNWDqJYSFinz590rnEtbiYt//www8VV1euJWqQkFPBwsMD/Lj5HaIuWH62vd9tx/zcJUDBcpenkhrWTqjbjuglj/dMeHnvdoBXBnhUcBrg785vCzhtWbdt22Yrf0yNwkQcwtOiRYtEEhh9woM+rK3UgHcDF198sdx6662JKVWngoU0td7v1Ty8/t8rwcKI/V//+pfUqFFDsM0NpqWyFey2vVq+IJVdLRP/954ABcsDxthozex9ExagqsYUbmaPOe9MQtOmTWXq1KmZJJHRtenctFSLS60fSDgk/sMf/qA4KFYLghfY8EyhHfFmIljZeKeQjmDB+hReNawCFqiin6peFDAVfMMNN1hd5tn5dNo+aGX3DAoTLkLAU8HCk+7VV18tcBaq/qHDQu78888XeI2IasD6KiuPyj/88EPgqn/LLbfI+vXrbZULI8jZs2crXsthjqv1iYj3dPB0jik+rNLHJpQYmeit2Id7K/jpQ1oQS7sjvO+//14ZYakc4ZwWntGxsaLWmz28TaR6mMhEsGzBcTlSOoKFByEwNQsYif75z39OsjrF6Oq0004TOGS2Ctls+0zLrq0b1tcZPaBhah3Tv5i6R32xtRDWRGItZbrBLJ9004p7fE8FC3BxA4RLoqVLlyp/DPiDwsv9zZs3e8o+m/64cIPu3bu3p/VzO3E8UNx44422k4WX+RUrVijxf/75Z8WaUTuKWb58uUyYMEFpZ4xyYGoPMdIuhFy8eLEi7OrDTDpP2XgpDeFR96pCefD+Df1LnSaEg1qMIlLXtURZsPB+1MoxL/4WwQDrAbUBLqieeuop7SHd79ls+0zLjgphJwMYNNWsWTOxIWtqRbENDPoTLEPh8xOig2lIeKuxG+zkYzctxisg4LlgIZt7771XunbtqnQSM/C4sd12222WH3QgoxAEf1x5eXmC0UqYAp6s27dvb7vI8FeoChTem8H8Xrs+CYKlfZeEqTvEwcJmBFw7fPjwRBo4lo5gIX6JEiWU0Rlu0P/85z+VtHBTqVWrlpIHRnl4L5cazAQLSw6y8QELo2A0wgJ37d8L3kWdc845iWPdu3fXTRLGOWCQaomG6/G3ahWy2faZlB19EqMmuD7Cw5JVwDQpmKjvheEPsmLFilaXSbr5qAk67XdmfUdNOyr/+yJYWCCLUdbChQtNueHGo7dfVeox7d5TqQkGxR8Xns6WLVuWWrzA/sbuyaqY2C0kRi74w//0008tBQtTdhAs1Ts9pvRS9wJLV7AuuugiJQ0swlan/bC4+m9/+5tSBdxs1ClDbZ3MBEsbLyjfjQQL5dP+bWCNH1z6qMcwKtALmMIFA+37P8SrXr26LcFC3Gy1vZOyY7NNTBVjayB1pwU9LqnH4MdPK/qYalZH76lx8dtpPnpp8Zg+AV8EC9NjECw7L4P1i2nvaJD8ceEG/cwzzwhGW0EPMNbA7rh2A544582bJ3PmzEmMkKxGWKmChT3IMhUseMrHAwqmwVSrTIgnpm3QF2BEoheiJFja+mFxOUTfKqjTaqlibmdKMNttn27ZMd2M/evQV+CIGP3QboB16TvvvJOIjpG7uhln4mDhl0zySU2Lv40JeC5YeIqD12o0NqZrzAKmBLFnkNXHyFt20PxxYcSITSODHvBEnk7AlBCmIbR//OkKFgwzcI12WirdERY8AsCgR/siHO9lIEjYh2r16tW61YqKYEE8tH8rMKTQ/jZaU6caLmhdg6lGF1bGQtlue6dlR/2wWzje02KnXuw+bhYw24B+AqtLNWC6FQ9EZiHdfMzS4rmiBDwTLAyPYTmGPZ8whQexwvyv2QthnMPLeauPkck4/XEVbWAvjqhio04hon3TFSzcbDF9h/dMuAnhN1xV2bUSRL0wooBDWkwvqgEvy3GjwY3bKERFsFA/9W8FBi4YUaq/8X/qCErLAzdvmLGDF4Jds/YgtL3TsqOeMOPHgy2EC/vDqX1YywbfsRU9rCbVhzJ4oEC/sTulaDef1Hz525yAZ4IFayM8kagOW9HR8c6hQYMGlu+yzItsfBZPN/jDoz8uY0ZunIG4YDoQpuowrIAlKKZbID6//PKLcqNUTdkxykF83AAganiCV401MF06ffp0wYMG0sHLasSx660DC6X1jATKlCmTZGafWucoCZZaN0yN4l1eOgEjMCwcxrsrPFjamb4OSts7KbuWDabwMMI0cmXWv3//pJ2lcW8pV66cYlmonSbUpqn33SofvWt4zJiAZ4JlnKX3Z+iPy3vGYc4hioKF0RVuqgwkEGUCkRSsKDcY65Y5gSgKVuZUmAIJBJ8ABSv4bcQSukzATcHCAnhMS2LdHdbR/Pe//5Vvv/3W1RKbmbW7mhETCyQBTNWib8FrS9xDpARr1qpNwo87DKL8h+GmYOFGgvVPCPDigbU7FSpUSLysd4MjBcsNiuFMA5bT8MgBjxsULJFICVY4uyRL7TcBtwQLBghYA6Z1Ogy/iEjfyKTeSV0pWE6oReMatD2c/WIET8GiYEWjV7MWaRFwS7D0MoVVLDzG27G407te7xgFS49K9I9hKZC6+J2CVdDeHGFFv9+zhikEvBSsOnXqKHtLpWSZ0U8KVkb4Qnnxe++9p4yq1HVyFKyCZqRghbI7s9CZEPBKsOD9A34M3TYvp2Bl0trhuxbrEbEtk3aXAQpWQTtSsMLXn1niDAl4IVhw9wNXUW6LFapKwcqwwUN2ecuWLRUPLiVLlhT1gz4Lzxv4rTqQDlm1XCkuBcsVjEwkTATcFCwYXsBXJjyBw6ILAe5+4NnDrUDBcotkeNPhCKug7ShY4e3DLLlDAm4JFhyo1qtXT9ljCd7nYRmID3zVQcTcChQst0iGNx0KVkHbUbDC24dZcocE3BIsmBkjLb0PBcth4/AyXQIUrAIsFCzd7sGDUSbglmD5xYgjLL9IBzcfbGsCH6lxDxSsuPeAGNafghXDRmeVI0GAghWJZmQl0iFAwUqHFuOSQHAIULCC0xYsiU8EKFg+gWY2JOAyAQqWy0CZXPAJULCC30YsIQnoEaBg6VHhsUgToGBFunlZuQgToGBFuHFZNX0CFCx9LjxKAkEnQMEKeguxfK4ToGC5jpQJkoAvBChYvmBmJkEiQMEKUmuwLCRgnwAFyz4rxowIAQpWRBqS1YgdAQpW7JqcFaZgsQ+QQDgJULDC2W4sdQYEKFgZwOOlJJBFAhSsLMJn1tkhQMHKDnfmSgKZEqBgZUqQ14eOAAUrdE3GApOAQoCCxY4QOwIUrNg1OSscEQIUrIg0JKthnwAFyz4rxiSBIBGgYAWpNVgWXwhQsHzBzExIwHUCFCzXkTLBoBMoWbKkDB48OOjFTJSvefPmUrVq1cRvfiGBuBKgYMW15WNc7wsuuED69u0bGgL33HOP1K1bNzTlZUFJwCsCFCyvyDLdwBK49tprpUePHoEtX2rBateuLS1atEg9zN8kEDsCFKzYNTkrXK1aNencuXNoQNSoUUM6deoUmvKyoCTgFQEKlldkmW5gCTRq1EgaNmwY2PKlFqx8+fLSr1+/1MP8TQKxI0DBil2Ts8IjRoyQSpUqhQLEsWPHpFixYrJy5cpQlJeFJAEvCVCwvKTLtANJYPv27fKnP/1JDh8+HMjyaQu1YsUKufDCC7WH+J0EYkuAghXbpo93xf/xj3/IlClTAg8B79patmwZ+HKygCTgBwEKlh+UmUfgCEycOFHq1asXuHJpC3TixAm5/PLLZc2aNdrD/E4CsSVAweUMNzcAACAASURBVIpt07PiderUkVWrVgUWxIQJE6RLly6BLR8LRgJ+E6Bg+U2c+QWGwI4dO6R+/fqSl5cXmDKpBYGQNmvWTI4cOaIe4v8kEHsCFKzYd4F4Azhw4ICMHz8+cBBycnLk+PHjgSsXC0QC2SRAwcomfeZNAiRAAiRgmwAFyzYqRiQBEiABEsgmAQpWNukzbxIgARIgAdsEKFi2UTEiCZAACZBANglQsLJJn3mTAAmQAAnYJkDBso2KEUmABEiABLJJgIKVTfrMmwRIgARIwDYBCpZtVIxIAiRAAiSQTQIUrGzSZ94kQAIkQAK2CZwUrDU9RfghA/YB9gH2AfaBgPaBAsGyrW+MSAIkQAIkQALZIaAI1tGjR7OTO3MlARIgARIgAZsEFMHKz8+3GZ3RSIAESIAESCA7BChY2eHOXEmABEiABNIkQMFKExijkwAJkAAJZIcABSs73JkrCZAACZBAmgQoWGkCY3QSIAESIIHsEKBgZYc7cyUBEiABEkiTAAUrTWCMTgIkQAIkkB0CFKzscGeuESKwfPlyKVWqlFx55ZWOPn369IkQDVaFBLwjQMHyji1TjgmBiRMnSpcuXWJSW1aTBLJHgIKVPfbMOQAEtm3bJjk5ORmVpFu3bjJ27NiM0ki9uHfv3nLo0KHUw/xNArEmQMGKdfPHu/Lr16+XunXryuHDhzMC0bhxY8nNzc0ojdSLt2zZIrVr15Z9+/alnuJvEogtAQpWbJs+3hU/fvy4VK9eXSAMmYYbbrhB9u7dm2kyRa6fNWuWtGnTpshxHiCBuBKgYMW15WNe70GDBkmTJk1coXD55Ze7ko5eIn/9619l8eLFeqd4jARiR4CCFbsmZ4VB4IorrpCZM2dmDGPXrl1SuXLljNMxSqB79+6uCatRHjxOAmEhQMEKS0uxnK4R2Lhxo2KGfuzYsYzTXLRokTRt2jTjdIwSWLdunZQuXVowhclAAnEnQMGKew+IYf0xHejWqGjUqFHSs2dPzyhCqIoXLy5LlizxLA8mTAJhIUDBCktLsZyuEWjQoIHcd999rqT3v//9TyZNmuRKWkaJYEEyFxcb0eHxOBGgYMWptVlXhcCtt94qEBo3wt133y0rVqxwIynDNGrWrCkdOnQwPM8TJBAXAhSsuLQ065kgcM0117g2jXfttdfKwYMHE2l78aVOnTpy//33e5E00ySBUBGgYIWquVhYNwiULVtWXnnllYyTOnHihFx22WWm6YwZM0ZZnAzRcRoaNmyoLCJ2ej2vI4GoEKBgBaQlW7VqJc2bN0/7w6mi9BsQRgxDhgxJ/8KUKzZv3iyYXjQL8KYxb948ufPOO82imZ7D6KpKlSqmcXiSBOJAgIIVkFbmlI9/DXHKKafIsGHDMs5w7ty58uCDD1qms3DhwowEC3lUrFjRMh9GIIGoE6BgedjCn3/+uWDrCTsBo6tsBTh/PXLkSLay9z1ftwQLozQ71nsULN+bmBlGlAAFy6OG/eqrr+TFF1+0lXpeXp60a9fOVlwvIsFbw6OPPupF0oFM0y3BeuKJJ+Tdd9+1rCMFyxIRI5CALQIULFuY0ouEl/G33367bS/gS5cudeWdSnqlTI796quv2rr5Jl8Vzl9uCda///1vWb16tSUECpYlIkYgAVsEKFi2MKUXadmyZfLAAw/YvmjcuHEyZ84c2/G9iLhjxw6pVauWF0kHLk23BAv+CO1sTULBClwXYIFCSoCC5UHDwWEpdqG1G5577jmBxVm2Q6VKleTXX3/NdjE8z98NwTp69KjY8dI+bdo0adSokVxyySXKFDGuSzfQ6CJdYowfVQIULA9atkaNGoJRlt0AC0GvnZva8caAtUKwfIt6cEOwYK4ODxR+BAqWH5SZRxgIULA8aKWrrrpKsPW63dCsWTPdqHgah+EGNhp84403dOPYOYh0OnXqZBm1devWMn78eMt4YY/ghmC9//778sgjj5iigA/A1M/w4cNNr9E7ScHSo8JjcSRAwfKg1cuUKZPWDrRGggXjjd9++026deuWkWB99NFHtvZ+gqXiwIEDPSASrCTdECx4yujfv78vFaNg+YKZmYSAAAXLg0YqVqyY5Ofn20oZxg6dO3c2jZupYCF9CJ9VePrppxVxtIoX9vNuCBZGox988IEvKChYvmBmJiEgQMHyoJFwQ7RjPYasP/nkExkxYoRpKTIRLLwba9++vWn66slnn31W8Il6cEOwME373Xff+YKKguULZmYSAgIULA8aKR3BglhBtMxCJoL12WefyZQpU8yST5yjYCVQWH659NJLxY0diy0zElHcP9E1kx1S/sfBtP3zzz+vLLzHshC7zgL8L2k0cqRgedCO6QgWjCEwLWgWMhEsiJBdU3UKllkrnDwHnliD5VfgCMsv0unngwdCLAdBwDYzJUqUsLWYPP2ceAUIULAK+4HVkxLM1MuVK5d434SptvLly8vOnTuVFGA1ButAxEtHsKx2vn377belWrVqUr9+fcuRmF6X1rp8sqojBSuZ4DfffCPTp09PPigicLv1n//8p8hxrw5QsLwim3m6eDeMfqIG7LW2aNEi9Sf/d5kABasQqJ0nJewui60iEHAjO/fcc5WbF37DU8Xo0aOVc+kIVpMmTZRrvPgHN1bsx6QGqzpSsApIwd0S/AT+8Y9/VMzSVX7q/5MnT/bV9yMFSyUf7P/x8Ir90ey+vw52bYJZOgpWYbvYeVJ66KGHEu+D2rRpI/jMnDlTSQE3FbWj2hUsjNKMTNrd6C49evRIMq+3qiMFq4D6xx9/LL///rvcc889ymj5iy++SGqOF154wVffjxSsJPyB/IG/ZWy0GYeF99lsAAqWDn2jJyWYfb/++uvKHPVrr70muHGNGjVKcasE90pqsCtYmzZtki5duqiX6f6vt6mjNi/diwoPYpRgFPTqSMFKpgWzdbTl448/nnQCDxl2bkwQvptuukkZ5bZt21Z57+VkGxcKVhL+wP3Aw03Lli1l1qxZgStb1AoUK8HC2qgNGzYU+eBlqRrMnpSwWPSll15SzMT379+vTAFCtCA6W7duVZOw/Q4LC3rffPPNxHVufkE9jXbVNaojBSu5BWAFeN555wkWgmstAitXrmzL9yOMM/7yl7/IoEGDlIQrVKhg2wBGWxIKlpZGsL5j1gIPMPPnz1cKhlmWOCy+z1YrxEqwNm7cKD179izyWbVqlcLf6kkJ74PghV11c4QnKtxMUl302B1h4UaWm5vrSdu//PLLuu6hzOpIwSraFE8++aTyAKJO/SLGhRdeKDBgsQpwiQXDHAQ8JMAox0mgYDmh5s81sOA988wzBQ8j+MDJcceOHf3JPIa5xEqwzNrXzpMSLAFLliwp69atU5L6+uuv5fTTTxcYM2hDqmAh7cGDBxcRtscee0z27NmjvdS173rTgVZ1pGAVxb9y5UpFsBo3bqyc3Lt3r8ASzE7AtdgzC2HNmjVSt25dO5cViUPBKoIkKwewXhLT8QMGDFAW2KvvrLNSmJhmSsEqbHg7T0rY8h4bM6ph9+7dct1116k/E/+nChZ2pR02bJgUL148yQhCvQkmLnTpy/bt2wUjrNRgVUcKViqxgt9///vflQcTTB1jRHzXXXfpR0w5CofFqtstOBXGO1AngYLlhJp71xw4cEB69eqltHtOTo6SMBaO44GEwV8CFCwPeKcKFrLA6Obss89WhEvNEvskeRHw7sqJ2yAKln5r4N0l2nTs2LHKO0dVhPRjnzyKNXC4BgH7o918882yZMmSkxFsfqNg2QTlUTS0P14lqA8qWNZQu3Ztj3JjsmYEKFhmdBye0xMsJPXwww8rNy18h4BhHyyzgJsbXvpjR+J69eopBh9m8dVzetOB6jmz/ylY+nR++uknOfXUU+WOO+5QpoKsfD/qp+L8KAXLObtMr8Tf4IwZM+SMM85QRKtfv36KUQX+fhn8J0DB8oC5kWBhOgnnYM6+du1awTops7Bv3z6pUqWKIm4LFiyQDh06mEVXzuEdi1W6RolQsIzIiPIuCqJVtWpVRx5HjFO2PkPBsmbkVYyhQ4cKRlSlS5eWXbt2eZUN07VJgIJlE1Q60YwEC2nABx0EBVunv/XWW6bJwsWLugYIFoWYVrIKsGSEhwsngYJlTG3SpEnKwwba1sr3o3Eqzs5QsJxxc+MqeK/Be6tSpUoJrD4RMLpyMuXuRnningYFy4MeYCZYWLeFXWj79u0rX375pWnueBelvuSFCyc7fyROpwNREAqWcXPAIuyss85STJiNY3lzhoLlDVc7qWKWA+ssMSWIKWG8y8LDC5aHMPhPgILlAXMzwdqyZYvypH799dcLrI/MAjYJVB1pwo8hLP8OHTpkeAkWqkJ0nAZca+V5w2naQboO7QOrzXRDq1atdK1C000n3fgUrHSJuR//xx9/VKwCrf5m3c+ZKWoJULC0NFz6joWE8IRhFOB9vWzZskanHR/Hvlepa8LSSQwLHvv06ZPOJa7FxfuBDz/8UHF15VqiBgk5FSw8PMBfnN8h6oLlZ9v73XbMz10CFCx3eSqpYY2Guu2IXvJ4z4SX924HeGWARwWnAf7u/LaA05Z127ZttvLH1ChMxCE8LVq0SCSB0Sc86MOqSw14B3HxxRfLrbfemphSdSpYSFPr/V7Nw+v/vRIsjNj/9a9/SY0aNQTb3GD6K1vBbttnq3zMNxgEKFgetAM2dDN734QFqKoxhZvZY249k9C0aVOZOnVqJklkdG06Ny3V4lLrBxIOif/whz8oDorVguBFOTxTaEe8mQhWNt5dpCNYsD6FVw2rgIWw6KeqtwZMBd9www1Wl3l2Pp2296wQTDjwBDwVLDzpXn311QJnoeofOizkzj//fIHXiKgGrK+y8tz8ww8/BK76t9xyi6xfv95WuTCCnD17tuK1HGa/Wp+IeE8HT+eY4oM3AGxCiZGJnmcAuLeCnz6kBbG0O8L7/vvvlRGWyhHOaeEZHRsrar3Zw9tEqoeJTATLFhyXI6UjWHgQAlOzgJHon//85ySrU4yuTjvtNIFDZquQzbbHlDemZTGljnJgyx+sVcQaR72AGQf0qWyOHvXKxWPOCHgqWCgSboBwSbR06VLljwF/UHi5v3nzZmcltnlVNv1+4Qbdu3dvmyUNRjQ8UNx44422CwMv8ytWrFDi//zzz4o1o3YUs3z5cpkwYYLSzhjlwNQeNw7tgsvFixcrwq4+zKTzlI2X3xAeda8qlAfv39C/1GlCOKjFKCJ1/UyUBQvvR60c8+JvEQywHlAb4ILqqaee0h7S/Z7Ntsf2LGhnWGzCFycWdWNqE15kjAIW3sOPI4TuvffeS+qDRtfweDAJeC5YqPa9994rXbt2FVi9mQXc2G677TbLDzqqUQiC36+8vDzBaCVMAU/W7du3t11k+CtUBQpPsTC/165PgmBp3yVh6g5xsLAZAdcOHz48kQaOpSNYiF+iRAlldIYb9D//+U8lLdy8atWqpeSBUR7ey6UGM8HCkoNsfMDCKBiNsMBd+/eCd1HnnHNO4lj37t11k4RxDhikWrzhevytWoVstz2mL1FW9X0t/DRWrFjRqtjKiKx///6KeTo2X7VroOS0P5i1qWVhGUGXgC+ChQWyGGUtXLhQtxDqQdx49ParSj2m3XtKvVb9Pyh+v/AUuGzZMrVYgf8ff8CqmNgtLEYuGCV9+umnloKFKTsIluqdHlN6qXuBpStYF110kZIGFmGr035YXP23v/1NqQJuauqUobZOZoKljReU70aChfJp/zawxg+ug9RjGH3oBUzhgoH2/R/iVa9e3ZZgIW422x5+/LRijClgdVStV9/UY9hmCH48L7jgAoHYMYSHgC+ChekxCJadl8GZoAuS3y/coJ955hnBaCvoAcYa2B3XbsCT7bx582TOnDmJEZLVCCtVsLAHWaaCBU/5eEDBNJhqlQnxxPQQ+gKMSPRClARLWz8sLofoWwV1SjBVzO1MCQah7WH1+c477ySqiRG1uklm4mDKF/wdoo/eeeedyoaL6LvqCC0lKn8GmIDngoWnOHitRqfCdI1ZwJQg5pqtPkbesoPm9wsjRjzNBT3giTydgCkhTHdAhNSQrmDBMAPXaKel0h1hwfMADHq0L9zxXgaChH2oVq9erRYv6f+oCBZuuNq/FRhSaH8bralTjS60rsFUowsrY6Fstz1mAdB+sIZUA6ZB8aCiF/A3iGlOcMFoCruOM4SXgGeCNXfuXMVyDHs+YQoPYoV5ZnQgo4BzeDlv9TEyGaffLyOy7h5XxUadQkT7pitYuNli+g7vmXADxW+4qrJrJYgaYUQBh7SYXlQDXsrjhoYblFGIimChfurfCgxcMKJUf+P/1BGUlsdLL72kmLGDF4Jds/Zstz22ooc1o/qwBA8UaE91U1VtHfEd9xR19J16jr/DR8AzwYK1EZ58VIet6Oh459CgQQPLd1lOMeIpEX949PvllKC96yAumFKBqToMK2AJin2fID6//PKLcqNUTdkxykF83GgganiCV401ME0zffp0wYMG0oGhBuLYfRmOhdJ6RgJlypRJMrNPrVWUBEutG6ZG8S4vnYARGBYO490VHiztTF9nu+1hNKHd8Rl/8+XKlZOaNWsmTROqHGCBiuUORh9wYwgPAc8EK5sI6Pcrm/SDn3cUBQujK641Cn7fYwkzIxBJwcoMCa+OOoEoClbU24z1IwEQoGCxH8SOgJuChQXwmJbEujus1/nvf/8r3377ratMzczaXc2IiaVFAFOoaHN4U2HwhwAFyx/OzCVABNwULNywsP4JAV48sEaoQoUKCaMAN6pNwXKDortpwKIZ783gcYOC5S5bs9QoWGZ0eC6SBNwSLBggYA2Y1ukw/CIifSOTeidAKVhOqHl7DdoEDoQxsqZgectamzoFS0uD32NBwC3B0oMFq1h4jLdjcad3vd4xCpYelewdwxIddVE6BcvfdqBg+cubuQWAgJeCVadOHWVvKTerScFyk2ZmacF5LkRKXb9GwcqMZ7pXU7DSJcb4oSfglWDB+wf8GLptXk7BCkaXwzpBbJek9f5PwfK3bShY/vJmbgEg4IVgDRw4UPEC7rZYARcFKwCdRkRatmypeFYpWbKkqB/0JXjewG/VsXMwShvNUlCwotmurJUJATcFC4YX8JX5wAMPCCzHEOCyCp493AoULLdIup8OR1juMzVLkYJlRofnIknALcGCI9V69eopGwPC+zwsA/GBE2aImFuBguUWSffToWC5z9QsRQqWGR2eiyQBtwQL5sxIS+9DwYpk1ylSKQpWESSeHqBgeYqXiQeRgFuC5VfdOMLyi3T6+WBbE/guZfCHAAXLH87MJUAEKFgBagwWhQTSIEDBSgMWo0aDAAUrGu3IWsSPAAUrfm0e+xpTsGLfBQggpAQoWCFtOBbbOQEKlnN2vJIEskmAgpVN+sw7KwQoWFnBzkxJIGMCFKyMETKBsBGgYIWtxVheEiggQMFiT4gdAQpW7JqcFY4IAQpWRBqS1bBPgIJlnxVjkkCQCFCwgtQaLIsvBChYvmBmJiTgOgEKlutImWDQCVCwgt5CLB8J6BOgYOlz4dEIE6BgRbhxWbVIE6BgRbp5WTk9AhQsPSo8RgLBJ0DBCn4bsYQuE6BguQyUyZGATwQoWD6BZjbBIUDBCk5bsCQkkA4BClY6tBg3EgQoWJFoRlYihgQoWDFs9LhXmYIV9x7A+oeVAAUrrC3HcjsmULJkSRk8eLDj6/2+sHnz5lK1alW/s2V+JBA4AhSswDUJC+Q1gQsuuED69u3rdTaupX/PPfdI3bp1XUuPCZFAWAlQsMLaciy3YwLXXnut9OjRw/H1fl9Yu3ZtadGihd/ZMj8SCBwBClbgmoQF8ppAtWrVpHPnzl5n41r6NWrUkE6dOrmWHhMigbASoGCFteVYbscEGjVqJA0bNnR8vd8Xli9fXvr16+d3tsyPBAJHgIIVuCZhgbwmMGLECKlUqZLX2biS/rFjx6RYsWKycuVKV9JjIiQQZgIUrDC3HsvuiMD27dvlT3/6kxw+fNjR9X5etGLFCrnwwgv9zJJ5kUBgCVCwAts0LJiXBP7xj3/IlClTvMzClbTxrq1ly5aupMVESCDsBChYYW9Blt8RgYkTJ0q9evUcXevXRSdOnJDLL79c1qxZ41eWzIcEAk2AghXo5mHhvCRQp04dWbVqlZdZZJT2hAkTpEuXLhmlwYtJIEoEKFhRak3WJS0CO3bskPr160teXl5a1/kRGULarFkzOXLkiB/ZMQ8SCAUBClYomomF9IrAgQMHZPz48V4l7zjdnJwcOX78uOPreSEJRJEABSuKrco6kQAJkEAECVCwItiorBIJkAAJRJEABSuKrco6kQAJkEAECVCwItiorBIJkAAJRJEABSuKrco6kQAJkEAECVCwItiorBIJkAAJRJEABSuKrco6kQAJkEAECVCwItiorBIJkAAJRJEABSuKrco6kQAJkEAECSiCdfTo0QhWjVUiARIgARKIEgFFsNyu0O7du4UfMmAfYB9gH2AfcLMPcITltlozPRIgARIgAU8I8B2WJ1iZKAmQAAmQgNsEKFhuE2V6JEACJEACnhCgYHmClYmSAAmQAAm4TYCC5TZRpkcCJEACJOAJAQqWJ1iZKAmQAAmQgNsEKFhuE2V6JEACJEACnhCgYHmClYmSAAmQAAm4TYCC5TZRpkcCDgksX75cSpUqJVdeeaWjT58+fRzmzMtIIBwEKFjhaCeWMgYEJk6cKF26dIlBTVlFEnBGgILljBuvigGBbdu2SU5Ojm817datm4wdO9bV/Hr37i2HDh1yNU0mRgLZIkDByhZ55htoAuvXr5e6devK4cOHfStn48aNJTc319X8tmzZIrVr15Z9+/a5mi4TI4FsEKBgZYM68ww0gePHj0v16tUFN3s/ww033CB79+51PctZs2ZJmzZtXE+XCZKA3wQoWH4TZ36BJzBo0CBp0qSJ7+W8/PLLPcvzr3/9qyxevNiz9JkwCfhBgILlB2XmESoCV1xxhcycOdPXMu/atUsqV67sWZ7du3fPigh7ViEmHEsCFKxYNjsrbURg48aNimn5sWPHjKJ4cnzRokXStGlTT9JGouvWrZPSpUsLpjsZSCCsBChYYW05ltsTApgO9HKkY1ToUaNGSc+ePY1OZ3wcQlW8eHFZsmRJxmkxARLIFgEKVrbIM99AEmjQoIHcd999vpftf//7n0yaNMnTfLEgmYuLPUXMxD0mQMHyGDCTDxeBW2+9VSAefoe7775bVqxY4Wm2NWvWlA4dOniaBxMnAS8JULC8pMu0Q0fgmmuu8XRqzgjItddeKwcPHjQ67crxOnXqyP333+9KWkyEBLJBgIKVDerMM7AEypYtK6+88oqv5Ttx4oRcdtllpnmOGTNGWcgM0XEaGjZsqCwidno9ryOBbBOgYGW7BWzk36pVK2nevHnaH07/2ICbEgWGCUOGDEk56u3PzZs3C6YizQI8b8ybN0/uvPNOs2im5zC6qlKlimkcniSBIBOgYAW5dQrLxmkc/xrplFNOkWHDhvmXoYjMnTtXHnzwQcs8Fy5cmJFgIY+KFSta5sMIJBBUAhQsD1vm888/F2wZkWnA6CpbAc5fjxw5kq3sfc83G4KFEZ0d6z0Klu/dgRkGjAAFy6MG+eqrr+TFF1/MOPW8vDxp165dxuk4TQAeGB599FGnl4fuumwI1hNPPCHvvvuuJSsKliUiRog4AQqWBw2Ml+i33367K56+ly5d6vs7lVQkr776qq0baup1YfydDcH697//LatXr7bERcGyRMQIESdAwfKggZctWyYPPPCAKymPGzdO5syZ40paThPZsWOH1KpVy+nlobouG4IF34V2tjGhYIWqK7GwHhCgYHkAFY5GsXusG+G5554TWJFlO1SqVEl+/fXXbBfD8/z9FqyjR4+KHS/t06ZNk0aNGskll1yiTDXjunQDjS7SJcb4QSNAwfKgRWrUqCEYZbkRYCHotcNSOx4WsP4H1mxRD34LFszV4YHCj0DB8oMy8/CSAAXLA7pXXXWVYHt1N0KzZs10k8ETNow6sNHgG2+8oRvHzkGk06lTJ8uorVu3lvHjx1vGC3sEvwXr/fffl0ceecQUG3wApn6GDx9ueo3eSQqWHhUeCxMBCpYHrVWmTBnXdo41EiwYdvz222/SrVu3jATro48+srX3EywVBw4c6AGtYCXpt2DBq0b//v19gUDB8gUzM/GQAAXLA7jFihWT/Pz8jFOGsUPnzp1N08lUsJA+hM8qPP3004o4WsUL+3m/BQsj1w8++MAXbBQsXzAzEw8JULA8gIubnh2rL6usP/nkExkxYoRptEwEC+/G2rdvb5q+evLZZ58VfKIe/BYsTOl+9913vmClYPmCmZl4SICC5QFctwQLYgXRMguZCNZnn30mU6ZMMUs+cY6ClUDh6pdLL71U/NrdmILlatO5mhim+J9//nllkT6WkLjhdMDVAgYkMQqWBw3hlmDBGALTgmYhE8GCCNk1VadgmbWCs3NgjzVYfgUKll+k088HD49YOoKAbWZKlChhazF5+jmF+woKVmH7WT3hwEy9XLlyiXdKmE4rX7687Ny5U0kB1l6wDkQ8twTLaufbt99+W6pVqyb169e3HInpdVOtyyer+lOw9AjaO/bNN9/I9OnTi0SG+67//Oc/RY57dYCC5RXZzNPFe2T0EzVgX7ZFixapP/l/IQEKViEIO0842BUWWzwg4AZ07rnnCm46CPBGMXr0aOW7W4LVpEkTJT0v/kG5sceSGqzqT8FSSdn/H+6W4Cfwj3/8o2KWnnrl5MmTffUTScFKbYFg/sZDMPZHc+M9eDBr6LxUFKxCdnaecB566KHEO582bdoIPjNnzlRSwM1A7WBuCBZGcEYm7c6b++SVPXr0SDK9t6o/BeskO7vfPv74Y/n999/lnnvuUUbdX3zxOPaMIAAAH1ZJREFURdKlL7zwgq9+IilYSfgD+QN/99hoMw6L9J00AAVLh5rREw5Mu19//XVlbvm1114T3HBGjRqluE6CCyU1uCFYmzZtki5duqhJ6v6vt6mjthy6FxUexJO/UdCrPwXLiJb1cZito088/vjjSZHxQGLnxgThu+mmm5QRcdu2bZX3Xk62fKFgJeEP3A883LRs2VJmzZoVuLIFpUCxEiysjdqwYUORD15yqsHsCQeLPF966SXFFHz//v3KFCBEC8KydetWNYki77Ds5Ju4uPALFvS++eabqYdd+Q0GRrvqGtWfguUcPawAzzvvPMGCcq1FYOXKlW35iYRxxl/+8hcZNGiQUogKFSrYNpbRlpqCpaURrO+Y4cADzPz585WCYbYmDgv1022FWAnWxo0bpWfPnkU+q1atUrhZPeHgnQ+8sKuujPAkhJtAqmud1BGWVb56jYabU25urt6pjI+9/PLLuq6jzOpPwcoM+5NPPqk8yKhTyEjtwgsvFBi7WAW4z4KBDwIeKGDc4yRQsJxQ8+caWPueeeaZgocRfODkuGPHjv5kHqJcYiVYZu1i5wkHloAlS5aUdevWKUl9/fXXcvrppwsMFrQhVbC051K/I9/BgwcXEb3HHntM9uzZkxrdld9604FW9adgZYZ+5cqVimA1btxYSWjv3r0CSzA7AddizyyENWvWSN26de1cViQOBasIkqwcwNpKTN0PGDBAWYyvvvvOSmFClikFq7DB7DzhYMt7bMyoht27d8t1112n/kz8n45gYafZYcOGSfHixZOMINQbWyJRl75s375dMMJKDVb1p2ClEkv/99///nflAQdT0Bg933XXXbYSgXNj1UUXHBDjXaqTQMFyQs29aw4cOCC9evVS2j0nJ0dJGAvH8UDCYI8ABcsep7RipSNYSBijm7PPPlsRLjUj7H3kRcC7KyeugChYmbcG3oGib4wdO1Z5P6mKkFXKWC+HaxCwz9rNN98sS5YssbqsyHkKVhEkvh5A++OVhPqggmUNtWvX9rUMYc+MguVBC6YrWCjCww8/rNyI8B0Chn2wzAJuWHiRjx2J69WrpxiDmMVXz+lNB6rnzP6nYJnRsXfup59+klNPPVXuuOMOZSrIyk+kvVTtx6Jg2Wfldkz8vc6YMUPOOOMMRbT69eunGFXgb53BPgEKln1WtmM6ESxMEeE6mLOvXbtWsE7KLOzbt0+qVKmiiNuCBQukQ4cOZtGVc3hvYpWuUSIULCMy6R3HuyiIVtWqVR15J0kvt+TYFKxkHn7+Gjp0qGBEVbp0adm1a5efWUcqLwqWB83pRLBQDPiVg6BgO/S33nrLtGRw26Ku64FFIaaKrAKsHFXPHFZxU89TsFKJOPs9adIk5cEEfcTKT6SzHIyvomAZs/H6DLzg4L1VqVKlBFafCBhdOZme97qsQU6fguVB6zgVLKzpws6yffv2lS+//NK0ZHgXpb64hQsnOx3f6XQgCkLBMm0O2ydhEXbWWWcpJsy2L3IpIgXLJZAOksGMCNZrYkoQU8J4l4WHFywlYbBPgIJln5XtmE4Fa8uWLcrT9/XXXy+wKDIL2PhPdY4JH4ew/Dt06JDhJVh8CtFxGnCtlecNp2kH6Tq0Haw2vQytWrXStS71Mk+kTcHymrB1+j/++KNiFWj1922dUjxjULA8aHcsAIQnDCcB3tfLli3r5FLTa7DvVep6MdMLUk5iEWOfPn1SjvrzE3P+H374oeIGy+sc/RAsPGjAX5zfIeqC5Wc/8bvtmF8BAQqWBz0BayvUbUfSTR7vmfBC3u0ATwvwkuA0wIed31Zt2rJu27bNVv6YGoXZN4SnRYsWiSQw+oR3fVhqqQHvFS6++GK59dZbE1OqfggW8td6ylfL4/X/XgkWRvf/+te/pEaNGoItcTD9la1gt59kq3zMNzMCFKzM+OlejY3Y7LxT0rsYi0pVYwq9806PYb48k9C0aVOZOnVqJklkdG06NyLV4lLrIxLOiv/whz8ozovVguDlN7xNaEfDfglWNt5dpCNYsFSFVw2rgIWw6O+qtwZMG99www1Wl3l2Pp1+4lkhmLBnBDwVLDzNXn311QInn+ofKKzgzj//fIHXiKgGrKHKxOPyDz/8EDg0t9xyi6xfv95WuTC6nD17tuKJHKa8Wp+IeE8H7+WY4sMKf2xCidGG3mp/uL6C7z2kBbG0O8L7/vvvlRGWyhEOZ+HtHJslar3Zw4NEqtcIvwTLFkiXI6UjWHhoAn+zgFHrn//85yQLVYyuTjvtNIHzZquQzX6C6XFMy2L6HeXA1kFY14j1kHoBsxPof9kcPeqVK27HPBUswMRNDm6Hli5dqnRi/CHgBf7mzZs9ZZ1Nf124Cffu3dvT+vmZOB42brzxRttZwsv8ihUrlPg///yzYs2oHcUsX75cJkyYoPQBjHJgao+bgXYR5eLFixXRVx900nlyxgttCI+6/xTKg/dv6HvqNCGczmJkkLomhoJV0Mx4l2rlmBd/0+CFtYPaABdUTz31lPaQ7vds9hNsz4I+AYtN+O3Eom5MbcLjjFHAIn34cYTQvffee0n91egaHneXgOeCheLee++90rVrV4Flm1nAzeu2226z/KCDGYUg+OvKy8sTjEiiEvC03L59e9vVgb9CVaDwZArze+2aIwiW9l0Spu4QBwubEXDt8OHDE2ngWDqChfglSpRQRme46f7zn/9U0sINqVatWkoeGOXhvVxqcEuwsDwhGx9wMwpGIyy0kfbvDu+izjnnnMSx7t276yYJQx7wSrV4w/X4m7cK2e4nmL5EWdV3u/DTWLFiRatiKyOy/v37K+bp2MTVrjGT0/5g1qaWhY1YBF8EC4tgMcpauHChKT7cXPT2q0o9pt17KjXBoPjrwtPbsmXLUosXyt/4o1TFxG4FMHLBKOnTTz+1FCxM2UGwVO/0mNJL3QssXcG66KKLlDSwCFud9sPi6r/97W9KFXCjUqcMtXXSEyz0S0zxGn2cLsbW5uvHdyPBQt7avzGsB4TrIPUYRh96AdO94KV9V4h41atXtyVYiJvNfgI/floxxnSxOgLXq2/qMWwbBJ+fF1xwgUDsGLwn4ItgYXoMgmXnJW4mVQ6Svy7chJ955hnBaCvMAcYa2PHWbsDT6rx582TOnDmJEZLVCCtVsLA/WaaCBS/6eHjB1JZqsQnxxJQP+gmMSPSCnmChTlh0bfTJhsWfXtmtjpkJlvZaLETHA4JVUKcEU4XfzpRgEPoJLETfeeedRDUx+lY3yUwcTPmCv2f05zvvvFPZcBH9XB2hpUTlTw8IeC5YePqCt2l0BkzJmAVMCWKO2Opj5OU6aP668GSOp7AwBzxlpxMwzYMpDIiQGtIVLBhm4BrtVFO6Iyx4E4Cxj/YlOt61QJDgz2/16tVq8ZL+1xOspAgh/mEkWLjhav/mYEih/W20/k41utC6EVONLqyMjrLdTzBjgLaGNaQaMA2Khxq9gL9lTHOCC0ZT2EWcwX8CngnW3LlzFesw7OuEKTyIFeaH0fBGAecwvWL1MTIZp78uI7L+HVfFRp1CRNunK1i4gWL6Du+ZcFPEb7iqsmsliNpilAAns5heVANetOMmhZuOUYijYIGF+jcHYxiMPtXf+D91BKVl99JLLylm7GCLYNesPdv9BFvRw5pRfbCCBwq0vbo5q7aO+I57kzpSTz3H3/4R8EywYCWEJxbVKSs6KN4rNGjQwPJdltPq4+kOfzD01+WUYObXQVwwTYJpMhhWwEoUezlBfH755Rfl5qeasmOUg/i4eUDU8FSuGmtg6mX69OmChxCkA0MNxLH7ghsLpfVe/JcpUybJzD61xnEVLJUDplHx3i+dgBEYFg7j3RUeUO1Mg2e7n8BoQrvjM+4d5cqVk5o1ayZNE6ocYK2KpRFGH3Bj8J6AZ4LlfdGNc6C/LmM2PGNOIO6ChdEV1xqZ9xGezR6BSApW9nAy57ATiLtghb39WP5oE6BgRbt9Wbs0CWRLsLCQHlOYWL+H9Tr//e9/5dtvv02z9ObRjYwuzK/iWa8JYAoVbQ7PKwzmBChY5nx4NmYEsiVYuGFh/RMCPH5gjVCFChUSRgFuNAMFyw2K7qYBy2i8N4PHDQqWNVsKljUjxogRgWwIFgwQsF5M66AYPhRRFiPzeydNQsFyQs3ba9AmcCCMkTUFy5o1BcuaEWPEiEA2BEsPL6xr4V3ejsWd3vV6xyhYelSydwxLfdQF7BQse+1AwbLHibFiQiAoglWnTh1lbyk3sVOw3KSZWVpwnguRUtevUbDs8aRg2ePEWDEhEATBgqcQ+Dx027ycghWMTow1hdh2SbtTAAXLXttQsOxxYqyYEMi2YA0cOFDxAu62WKH5KFjB6MQtW7ZUvLCULFlS1A/6HTxv4LfqBDoYpQ1WKShYwWoPlibLBLIlWDC8gM/NBx54QGA5hgD3VvAC4lagYLlF0v10OMKyx5SCZY8TY8WEQDYEC45U69Wrp2wMCE/1sAzEB86cIWJuBQqWWyTdT4eCZY8pBcseJ8aKCYFsCBbMmZGv3oeCFY+OR8Gy184ULHucGCsmBLIhWH6h5QjLL9Lp54NtTeADlcGcAAXLnA/PxowABStmDc7qhooABStUzcXCek2AguU1YaZPAs4JULCcs+OVESRAwYpgo7JKkSFAwYpMU7IibhCgYLlBkWmQgDcEKFjecGWqISVAwQppw7HYsSBAwYpFM7OSdglQsOySYjwS8J8ABct/5swxwAQoWAFuHBYt9gQoWLHvAgSgJUDB0tLgdxIIFgEKVrDag6XJMgEKVpYbgNmTgAkBCpYJHJ6KHwEKVvzanDUODwEKVnjaiiX1gQAFywfIzIIEHBKgYDkEx8uiSYCCFc12Za2iQYCCFY12ZC1cIkDBcgkkkyEBDwhQsDyAyiTDS4CCFd62Y8mjT4CCFf02Zg3TIEDBSgMWo5KAzwQoWD4DZ3bBJkDBCnb7sHTxJkDBinf7s/YpBEqWLCmDBw9OORqNn82bN5eqVatGozKsRSwJULBi2eystBGBCy64QPr27Wt0OtTH77nnHqlbt26o68DCx5sABSve7c/apxC49tprpUePHilHo/Gzdu3a0qJFi2hUhrWIJQEKViybnZU2IlCtWjXp3Lmz0elQH69Ro4Z06tQp1HVg4eNNgIIV7/Zn7VMINGrUSBo2bJhyNBo/y5cvL/369YtGZViLWBKgYMWy2VlpIwIjRoyQSpUqGZ0O7fFjx45JsWLFZOXKlaGtAwtOAhQs9gES0BDYvn27/OlPf5LDhw9rjob/64oVK+TCCy8Mf0VYg1gToGDFuvlZeT0C//jHP2TKlCl6p0J7DO/lWrZsGdrys+AkAAIULPYDEkghMHHiRKlXr17K0fD+PHHihFx++eWyZs2a8FaCJScBChb7AAnoE6hTp46sWrVK/2TIjk6YMEG6dOkSslKzuCRQlABHWEWZ8AgJyI4dO6R+/fqSl5cXahoQ3WbNmsmRI0dCXQ8WngRAgILFfkACBgQOHDgg48ePNzgbjsM5OTly/PjxcBSWpSQBCwIULAtAPE0CJEACJBAMAhSsYLQDS0ECJEACJGBBgIJlAYinSYAESIAEgkGAghWMdmApSIAESIAELAhQsCwA8TQJkAAJkEAwCFCwgtEOLAUJkAAJkIAFAQqWBSCeJgESIAESCAYBClYw2oGlIAESIAESsCBAwbIAxNMkQAIkQALBIKAI1tGjR4NRGpaCBEiABEiABAwIKIJlcM7x4d27dws/ZMA+wD7APsA+4GYf4AjLsSzzQhIgARIgAT8J8B2Wn7SZFwmQAAmQgGMCFCzH6HghCZAACZCAnwQoWH7SZl4kQAIkQAKOCVCwHKPjhSRAAiRAAn4SoGD5SZt5kQAJkAAJOCZAwXKMjheSAAmQAAn4SYCC5Sdt5kUCJEACJOCYAAXLMTpeSAIkQAIk4CcBCpaftH3Mq1WrVtK8efO0Px06dPCxlMyKBEiABOwToGDZZxWqmPfff3+oysvCkgAJkIAVAQqWFSGfz3/++eeyfPnyjHPF6CpbIScnR44cOZKt7JkvCZBARAlQsALUsF999ZW8+OKLGZcoLy9P2rVrl3E6ThPYtWuXPProo04v53UkQAIkoEuAgqWLxf+DJ06ckNtvv10OHz6cceZLly6VIUOGZJxOJgm8+uqr8u6772aSBK8lARIggSQCFKwkHNn7sWzZMnnggQdcKcC4ceNkzpw5rqTlNJEdO3ZIrVq1nF7O60iABEigCAEKVhEk2TnQvXt3mThxoiuZP/fcc7J582ZX0sokkUqVKsmvv/6aSRK8lgRIgAQSBChYCRTZ/VKjRg354osvXCkELASPHz/uSlpGiaxYscLoVOJ4nTp1ZO7cuYnf/EICJEACmRCgYGVCz8Vrr7rqKtm6dasrKTZr1kw3naNHjypGHdWrV5c33nhDN46dg0inU6dOllFbt24t48ePt4zHCCRAAiRghwAFyw4lH+KUKVNG9u7d60pORoIFw47ffvtNunXrlpFgffTRRzJz5kzLssJSceDAgZbxGIEESIAE7BCgYNmh5EOcYsWKSX5+fsY5wdihc+fOpulkKlhIH8JnFZ5++mlFHK3i8TwJkAAJ2CFAwbJDyYc4p5xyiism7Z988omMGDHCtMSZCBbejbVv3940ffXks88+K/gwkAAJkIAbBChYblB0IQ23BAtiBdEyC5kI1meffSZTpkwxSz5xjoKVQJHWF0zdPv/888riaywNcGMxeVoFYGQSCCgBClZAGsYtwYIxBKYFzUImggURsmuqTsEyawXjc3gowJIAhIMHD0qJEiVk9erVxhfwDAnEhAAFq7ChrZ5qsbC3XLlyifdDmBorX7687Ny5U0nh/fffF1j6IZ6T4JZg3XfffabZv/3221KtWjWpX7++5UhMLyGtyycrZhQsPYLWx/B+8JtvvklEvOaaa2TRokWJ3/xCAnElQMEqbHk7T7V33323zJs3T7li+vTpcu655wr8/yHAs8To0aMLU0v/P7cEq0mTJulnbvMK1HXMmDGJ2FbMKFgJVI6/4IHosssuc+X9puNC8EISCAgBClZhQ9h5qn3ooYcS72/atGkj+Kjm3Q8++GBGNxU3BAujPiOTdjf6W48ePZJM762YUbAyo472bNiwIRdfZ4aRV0eIAAVLpzGNnmphpv36668r7xNee+01eeGFF2TUqFGKGyS4QzILVot23RCsTZs2SZcuXcyKobuho1XZ1QSfeOIJ9WuR//WYUbCKYLJ94Pfff5eWLVvKrFmzbF/DiCQQdQKxEiysc9qwYUORD15sq8HsqfaVV16Rl156STHr3r9/vzIFCNGCSFh5qbBatJsqWHbKqpZZ/R8Let988031p6v/g5uRB3gjZhQsZ02AkStGyvPnz1cSgAd/LsB2xpJXRYtArARr48aN0rNnzyKfVatWKa1q9VSL9zfwqK66JcLTL6YCH3nkEdu9wshCL1WwrMqql+GgQYMkNzdX71TGx15++WXZtm1bkXTMmFGwiuCydQB95Mwzz5QKFSoon0suuUQ6duxo61pGIoEoE4iVYJk1pJ2nWlgClixZUtatW6ck9fXXX8vpp58uMD6wG+wKlll6KOvgwYOLCOVjjz0me/bsMbvU8Tm96UArZhQsa9xYM4cp2QEDBiiLrN3YD806V8YggXASoGAVtpudp1psX49NFtWwe/duue6669Sfyv/wYo6bu/bTv3//RBw3BAsbIw4bNkyKFy+eZATRuHHjRD5uftm+fbtghJUarJhRsFKJnfx94MAB6dWrl9x1112Sk5OjnLj00ktl5cqVJyPxGwmQQBIBClYSDu9/uCFYKCVGN2effbYiXGqpGzVqpH519X+8u/ruu+/STpOCZYwM70MxPQ3BQpg8ebLUrl3b+AKeIQESEAqWj53AbNFu6jssO8V6+OGH5eabb1aiQsCwD5ZZWLJkiZx33nmCHYnr1aunGJCYxVfP6U0HqufM/qdg6dNBO8yYMUPOOOMMRbT69eunGFWgDRlIgASMCVCwjNn4esaJYMHAAtfBnH3t2rWCdVJmYd++fVKlShVldLZgwQLp0KGDWXTlHLY8sUrXKBEKlj6ZoUOHKiOq0qVLy65du/Qj8SgJkEARAhSsIkiyc8CJYKGkV1xxhSIo06ZNk7feesu08HDv8/jjjytxYFE4ceJE0/g4CctI1ZuHZeSUCBSsFCCFP+ERBe+tSpUqJVifh4DRlZNpV/0ceJQEokmAghWQdnUqWFgHduWVV0rfvn3lyy+/NK0N3kWpL/jhwsnODdLpdCAKQsHSbw6MdLF2D1OCd9xxhzItOGnSJMESAQYSIAFjAhQsYza+nnEqWFu2bFGmBa+//nqB5ZlZwJb1qhNV+EWE5d+hQ4cML4FXdoiO04BrrTxvOE07Ctf9+OOPilWgVbtFoa6sAwm4QYCC5QZFF9LAQlF4z3AS4H29bNmyTi41vQb7XqWzxiw1MSx27dOnT+phX37j3dCHH36ouM7yJUNmQgIk4DkBCpbniO1lgDU46lYl9q44GQvvmapWrXrygEvfnnzySYHbJaehbdu2lrsfO03bznXwzGG1+7KddBiHBEggGAQoWMFoB2XDPjvvlPSKC1+IqjGF3nmnx/BeJZPQtGlTmTp1aiZJZHQtBSsjfLyYBAJHwFPBwlqTq6++WipXrpx4oQwT6fPPP1/gNYLhJAGsocrEM/cPP/xwMrGAfLvllltk/fr1tkqD0eXs2bOVrTSwiFbrExHv6T744ANlig+eILCeDaNKPa8QcJeFLV+QFsTSzggL057YxgPTqigHtpHBejWsc9MLGHUiXRhPMJAACfhHwFPBQjVww4ILoaVLlwq8iWMkgJfxmzdv9rSWYfPRhptw7969PWXiZ+KweLvxxhttZwkv83BrhfDzzz8r1ozad3rLly+XCRMmKP0GpuAwtYdoaBfbLl68WBF91drO7gjryJEjyru2s846S+CP8aefflIMUuBJxChg8XXdunUVoXvvvfeSymF0DY+TAAlkRsBzwULx7r33XunatavASs0s4EZ02223WX5wUzEKYfXRlpeXJxiRRCXg4aR9+/a2qwN/hapAYQQD8/sdO3YkrodgYcSuBkyDIg4WNiPg2uHDhyfSwDG7goW4sGasUaNG4p3d+PHjpWLFikraZv9gRAZfkTBPx4aedoxUsAzByQf1YyCBOBPwRbCwoBWjrIULF5qyxp5RevtVpR4z23sqzD7aYFG3bNkyU0ZhOYmbtyomdssMyz6Mkj799FNLwTp27JgSR/VO//333xfZCywdwYIfv+7duyeKCg/qLVq0SPy2+oLtYODL8YILLhCIHQMJkID7BHwRLEx1QbDWrFnjfg00KYbdRxtuws8884xgtBXmAGONjz/+2HYVMKKaN2+ezJkzJzFCshphpQoW9jRL3bwyHcG6+OKL5Z133kmUuVatWgJvIGYB7YRy3nnnncqGiyh/JlaVZnnxHAmQgHjv/BZTN+3atRPcAPS2qNA2AqYE8V7A6tO5c2ftZYnvUfDRhlEmntbDHDAiTidgOhDTXRAhNaQrWDDMwDXaRbh2BQsjQSzchj9GNZxzzjnKSE/9rf0fbYRpbvRTjKawOzQDCZCA9wQ8G2HNnTtXsfTCHk2YwoNY4Z0A/tiNAs7hZbrVx8j8mz7ajMgG+7gqNuoUIvpLuoKFkQ18I8KaEN478BuuquxYCWIr+tNOOy0hmPBAAQFTN+pMpYd+6nTNXGpa/E0CJGCfgGeC9dRTTwmeUlUHq7gpXXTRRdKgQQPLd1n2i58ckz7aknmE5RfEBdNpMFWHYQUsS8eOHauIzy+//CIw2VdN2VevXq2IEUQGooalAKqxBqbopk+fLnhwQTow1EAcK0MIGE1cc801CVzoR+XKlZOaNWsmTROqEWCFeNNNNxl+8B6VgQRIwH0CngmW+0W1nyJ9tNlnxZgkQAIkEBYCkRSssMBnOUmABEiABOwToGDZZ8WYJOA5AUxrYo3WG2+84XlezIAEwkaAghW2FmN5I0sAVrJ4bwaPGxSsyDYzK5YBAQpWBvB4KQm4SeDBBx+UXr16KR5PKFhukmVaUSFAwYpKS7IeoSaAZR/wbo8AF10UrFA3JwvvEQEKlkdgmSwJ2CUA57kQKTjhRaBg2SXHeHEjQMGKW4uzvoEigLVi2IIHfhTVQMFSSfB/EkgmQMFK5sFfJOArgZYtW8qpp54qJUuWTHzgZQOeN3BMde7ra6GYGQkElAAFK6ANw2LFlwBHWPFte9bcnAAFy5wPz5KA7wQoWL4jZ4YhIUDBCklDsZjxIUDBik9bs6bpEaBgpceLsUnAcwLYwBL+MBlIgASSCVCwknnwFwmQAAmQQEAJULAC2jAsFgmQAAmQQDIBClYyD/4iARIgARIIKAEKVkAbhsUiARIgARJIJkDBSubBXyRAAiRAAgElQMEKaMOwWCRAAiRAAskEKFjJPPiLBEiABEggoAQoWAFtGBaLBEiABEggmYAiWNjplIEESIAESIAEgkwgMcLKz88XfsiAfYB9gH2AfSCofYCCRaHmgwr7APsA+0Ao+gAFix01FB01qE98LBdHI+wD/vUBChYFi4LFPsA+wD4Qij5AwWJHDUVH5VOsf0+xZE3WQe0DFCwKFgWLfYB9gH0gFH2AgsWOGoqOGtQnPpaLoxH2Af/6AAWLgkXBYh9gH2AfCEUf+D9RaG3ULXGsPQAAAABJRU5ErkJggg==
我们知道符合哥猜的下界解:x/(lnx)^2
这句话是错误的。你可以去看看维基百科英文版,
还与n的质因数有关系,不是你想的那么简单的,
这个方程的最好的解决办法就是牛顿迭代法!
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