Lei de Faraday-Lenz
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Lei de Faraday-Lenz
A figura abaixo apresenta a variação temporal da intensidade B de um campo magnético uniforme que atravessa uma espira condutora. Na figura, a, b, c e d indicam intervalos de tempo nos quais a variação de B é constante.
![Lei de Faraday-Lenz 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88GABcXF81dIi1B3ZNLHOqeHFuykcWuezc3N2MBoe41iaHuNZlgiS4CqHtdZIReLlLd//HHH3K5HAAiIiKMRYy61yQWEBDg5OQEAB06dNDcK8YSXN2TyxrqnhxbspHFqPu0tLTJkyfTny4y/GqVKkTUvSoN5Xbv3r3pp9cqS0S9gbonlz7UPTm2ZCOLUfdRUVG064cOHZqSkmIsINS9VmKoe61YsFCTAOpek4k4SsSo+65du9K6P3TokAmUUfdaod2+fdvDw8PV1VUajzPE1b3WLLNSiLpnBSMPQcSo+zJlygCAn59fdna2CchQ97qgVa1alb5dmq4KIipH3ZNLFuqeHFuykUWn+8uXLzs6OlaoUGH79u2moUHd6+JG6/7zzz+Pjo7WVUcs5ah7cplC3ZNjSzay6HRPP2/v888/N5kL6l4Xurlz59JnybZu3aqrjljKUffkMoW6J8eWbGRx6X7r1q3lypUDANS9UYeFnlukqcZJTk5G3asCwW2tBFD3WrGIoFBEus/NzR0/fjx9M6/Y2FiT4eLqXhe65ORke3t7AFi3bl1+fr6uaqIox9U9uTSh7smxJRtZRLr//fff6bWnOUt7iqJQ93oOqX/++YeGfPv2bT3VhL8LdU8uR6h7cmzJRhaL7l+9ejV48GDaRK9evTIHCupeDz3UvR44uIsmgLoX65EgFt2HhobSrp8yZUpWVpY5uFH3eujFxsb269cPAHr37q2nmvB34eqeXI5Q9+TYko0sOt3/9ddfZhJB3esHuGzZMgCQy+X6qwl8L+qeXIJQ9+TYko0sFt3b2dm9vd3xokWLCgsLzSSCutcPkNa9TCZ79OiR/ppC3ou6J5cd1D05tmQji0L3x48ft7KyAoAlS5aYjwN1r5/hn3/+Wa1aNQBo2rSp/ppC3ou6J5cd1D05tmQji0L3LVq0oO1z/fp183Gg7g0yHDJkCOreICWLrYC6F2vqha/7pUuX0rdi/+abb1ihjLo3iBF1bxCRJVdA3Ys1+8LX/ciRIwHgo48+SktLY4Uy6t4gxrS0tLp161pZWU2YMMFgZWFWwJM55PKCuifHlmxkges+MjKyc+fOAPDf//6XLRCoeyYk6ce+Dx8+nEllAdZB3ZNLCuqeHFuykQWu+7Vr19KX2+fk5LAFAnXPhCSt+yZNmly7do1JfaHVQd2TywjqnhxbspGFrPvw8PDGjRuj7s0/AhjeIk21o9OnT9PkV61apVoulm3UPblMoe7JsSUbWbC6LywsVBrn4MGD5l9ur+SIq3slCj0b+fn5qHs9fCx5F+perNkXrO4zMzNp3dSsWfP+/fss8kXdM4GZn5/fpEkT+uFWJjwQmEkXROvg6p4cXtQ9ObZkIwtW95s2baJ1HxgYyC4C1D1Dnjdu3KBTcOHCBYZNhFMNdU8uF6h7cmzJRhas7mvXrg0A7dq1Cw8PZxcB6p4hT9Q9Q1CWVg11L9aMC1z3Y8aMYZ0s6p4hUqXua9asmZGRwbCVQKrh6p5cIlD35NiSjSxM3ffv3x8AfH19WfyEVskRda9EoX+jsLBww4YN9Pkctr7jpr9HFvei7lmEqRYKda8GRDRvBaj70NBQX19fAGjZsiUJjqh75lQ3btyIumeOy0Jqou7FmmgB6n7hwoUAYG1tvWvXLhJYUffMqYaGhrZu3RoAFAoF81ZCqImre3JZQN2TY0s2stB0/++//9J33y1VqhShmaPujQI7btw4AKhZs6ZRrXivjLonlwLUPTm2ZCMLTfenTp2izx5cvXqV0MxR90aB/eWXX+zs7KpUqZKQkGBUQ34ro+7J8Ufdk2NLNrKgdJ+dna1QKACgWbNm0dHRhGaOujcWLH0+p0+fPsY25LE+6p4cfNQ9ObZkIwtK9/Hx8fTSfufOneSmjbo3li3q3lhi0q6PuhdrfgWl+2+++QZ1T+JIMuEWaarDoHVfqVKlffv2qZYLeRtX9+Syg7onx5ZsZOHoPi0trWLFigAwatQoold54+re2EMqNjbW3t4eAObPn29sW77qo+7JkUfdk2NLNrJwdN+jRw8AcHNzM3MpapAX6t4gIs0KpUuXRt1rYrHMEtS9WPMuEN1funSpbt26ANCpUyfSKFH3JhCmHyHZo0ePp0+fmtCc+ya4uifHHHVPji3ZyALR/YwZMwDAycnp1KlTZCdMUah7Ewg/fPiQ/ljlxIkTJjTnvgnqnhxz1D05tmQjC0H3hYWF06dPB4By5cqRnW1xdNS9CZCVuj9+/DiJGxmZMCT9TVD3+vmYsxd1bw49PtsKQff79++nV45t2rThgAXq3gTIUVFRVapUodMUGxtrQgSOm6DuyQFH3ZNjSzYy77p/8+bN2LFjaY88f/6c7GyLo6PuTYO8Z88e1L1p6CTWCnUv1oTyrvvHjx/TEhk5cmRqaioHHFH3pkFG3ZvGTXqtUPdizSnvum/Xrh2t+6NHj3IDEXVvGuf4+PiBAwcCQPfu3U2LwGUrPJlDjjbqnhxbspF5172zszMAzJgxIzc3l+xU30dH3b8nYfTPadOmAYCHh4fRLTlvgLonhxx1T44t2cj86v78+fP29vaVKlXau3cv2XmqREfdq8AwbnPbtm3ly5d3dXW9ePGicS05r426J4ccdU+OLdnI/Or+P//5DwB8+eWXZCdZMjrqviQP49517doVALp27WpcM85ro+7JIUfdk2NLNjKPul+/fn2ZMmVQ92QTXBydxftSoO45yJfAu0DdCzxBOofHl+6zs7NHjRoFAF5eXhw/NwNX9zqPBgY74uPjy5UrV6pUqQULFjCozlsVXN2TQy9K3ScmJj5Vea1bt06hUKxfv16lTPqb9+7dW7duHffzXLRoEX1Bjq+vL8e9h4eHr1mzhuNO+e1u+fLlLA7A3d0dAMaMGcNiTNZDLV++/MmTJ1rDRkVFkVOhJUQWpe7DwsJOqrz8/f0VCsWyZctUyqS/efToUX9/f+7n+f3339O6379/P8e9Hzt2bMmSJRx3ym93CxcuZHEAbm5uANC3b18WY7IeauHChX/++afWsH///bclSJncHEWpezUcQUFBCoVi+/btauXSfsvLyZyoqKhWrVoBwE8//ZSTk8MxYTyZYybw9evXA0C9evXIPU/YzBFSFIUnc8xnqCsC6l4XGaGX86L7kJAQeml/7tw57gGh7s1kHhsbS6dvz549ZoYi1xx1T44t6p4cW7KRedG9TCYDAE9Pzxs3bpCdnrboqHttVIwoS0hIqF69OgAsWLAgKyvLiJYcVkXdk4ONuifHlmxk7nV/6NAhem24fPlysnPTER11rwOMEcUnTpygk/jw4UMjmnFYFXVPDjbqnhxbspG5132TJk0AwMfH59atW2TnpiM66l4HGCOKUfdGwJJcVdS9WFPKse7nz59PP/V06NChfCFD3ZtP/vXr1/TjDLl5RIEJA8bVvQnQGDZB3TMEJbhqHOt+2LBhAFC/fv3MzEy+WKDuWSE/f/58AChdujQr0VgPgrpnHakyIOpeiUJkG1zqPiIion379gAwefJkHjGh7lmBT+vezs7un3/+YSUgu0FQ9+zyVI2GulelIaZtLnW/cuVK+vO9goICHhmh7lmBf/HixXr16gFA69atWQnIbhDUPbs8VaOh7lVpiGmbM92HhYXRdgAA1D3HhwiLt0hTHXmfPn1Q96pALGQbdS/WRHOm++DgYHppf+LEicLCQh554eqeLfjDhw+Xy+U+Pj5paWlsxWQrDq7u2SKpGQd1r8lEHCXc6D4vL8/f3x8A6tSp8+jRI37RoO5Z5F+zZk0AGDduHIsxWQmFumcFo9YgqHutWERQyI3uU1NT6aX9pk2beIeCumcxBah7FmGKJRTqXiyZUh8nN7r/3//+BwCdOnWKiIhQHwHn71H3LCKndV+rVi2hXZ+Dq3sWs6wWCnWvBkQ0b7nRfY0aNQBg/PjxQuCCumcxC7du3aL/btu4cSOLYc0Phbo3n6GuCKh7XWSEXs6B7h8/fuzp6eno6Lho0SIh4EDds5iFtLQ01D2LPEURCnUvijRpGSQHuv/6668BQDjftkfdazkOTC3Kysrq2bMnAAwZMiQxMdHUMOy3w9U9+0zfR0Tdvychtp+kdX/y5Mnq1avb2toeOHBAIGxQ9+wm4sKFC/QCn5fbWeuaC+peFxnzy1H35jPkJwJp3c+bNw8AHB0d+Zmetl5R99qomF6GujednThbou7FmTeKIqr7kydP2tjYAMDt27eFAwh1z24url+/Xq5cOQAoVapUfn4+u8FNjoare5PRGWyIujeISKAVyOk+MzNz2rRpANCyZcvY2FjhzB91z3ouVq1aRZ/PQd2zzlaAAVH3AkwKoyGR031MTAytgL179zIaCleVUPesk0bds45UyAFR90LOjr6xoe710ZHKPkK3SFPiiYyM7NSpEwCMHTtWWcjvBp7MIccfdU+OLdnI5HRfv359+qtVPD7JRCs7XN1rxWJm4fDhwwGgYcOGZsZhqznqni2SmnFQ95pMxFFCSPchISGurq5ly5YVwk1y1DKBulcDwsrbJUuWODk5Va1aNTQ0lJWAZgZB3ZsJUE9z1L0eOILeRUj3Xbp0AYBu3boJcPKoe0JJadq0Kf19K0LxjQqLujcKl1GVUfdG4RJQZRK637lzZ8WKFV1dXc+ePSugqb4fCur+PQmWf6LuWQYq1HCoe6FmxtC4SOh+6tSpAFCxYkVDnfOzH3VPiLuPjw8AuLi4BAUFEeqCeVhc3TNnZWxN1L2xxIRSn3Xdv3r1avDgwQDw6aefCmWSJceBui/Jg813crn8rfGXLVvGZlCTYqHuTcLGqBHqnhEmAVZiXfe7d++mL7d/+fKlAOdLURTqnlxeUPfk2AonMupeOLkwbiTs6j4uLo6+/nrcuHEZGRnGDYWr2qh7cqSnT59OP6z84cOH5HphEhlX90womVYHdW8aN/5bsav78PBwemn/559/8j83HSNA3esAw0Lx7du36QOA94dboe5ZSKeOEKh7HWAEX8yu7t3c3ABg1qxZwrl3imYGUPeaTNgqUep+27Zt/B4DqHu2cqoZB3WvyUQcJezq3sHBAQAWLFgg5Mmj7sllJzIykr4+BwCSk5PJdWQwMureICKTK6DuTUbHc0MWdR8QEGBtbd2gQYPLly/zPCu93aPu9eIxd+fWrVvp8zmoe3NRCrU96l6omTE0LhZ136pVKwDo27evoT553o+6J5oA1D1RvEIIjroXQhZMGQNbup82bZqNjU21atWSkpJMGQeHbVD3RGFnZGR89913ANCiRQuiHekPjidz9PMxZy/q3hx6fLZlRffPnz+nn089dOhQPifDrG/UPTNOpteaOHEiAFStWtX0EGa3RN2bjVBnANS9TjQC38GK7jds2ECfrk1PTxf4fPFrVhwkiNa9m5sbj8+jR92TSzTqnhxbspHN1/3jx49btGjxVvczZ87My8sjO1w2ouPqng2K+mKEhITUqVMHAHr37q2vHsl9qHtydFH35NiSjWy+7q9fv04v7S9evEh2rCxFR92zBFJfmLZt26Lu9QES8z7UvVizZ6buCwsLN2/eDABVqlS5ffu2KCig7jlI05gxY6ysrNq2bfv8+XMOutPsAlf3mkzYKkHds0WS6zhm6j4vL49e2q9evZrroZvaH+reVHLGtXNxcQGA2bNnG9eMpdqoe5ZAagmDutcCRRRFZup+5syZANCqVSuBPLKOCXPUPRNK5tdB3ZvPUJgRUPfCzIvhUZmp+wYNGgDAiBEjDPckmBqoe25ScfjwYQDw9PQMDg7mpkfVXnB1r0qD3W3UPbs8uYtmju6HDRsmk8maNGmSm5vL3YjN7gl1bzZCRgGePHlCn+g7cuQIowasVkLds4qzRDDUfQkcInpjju7pp1Y1a9ZMRPPF6+45S5ZS935+ftx/IQN1Ty7RqHtybMlGNln3wcHB9erVk8lkW7ZsITtEtqPj6p5totrjJScnDxo0iF7gR0dHa69ErBR1Twwthbonx5ZsZJN17+/vDwBWVlZkx0cgOuqeAFTtIQ8cOIC6145GzKWoe7FmzzTdX7hwwdHREQDOnj0rupmj7jlL2bFjx+jjJCQkhLNO6Y5wdU8OOOqeHFuykU3QfW5u7oIFCwCgQYMGT58+JTs+AtFR9wSg6gz5888/A4C7u7vOGmR2oO7JcC2Kironx5ZsZBN0n5SURP+FHhQURHZwZKKj7slw1R4Vda+di5hLUfdizZ4Juh85ciQAdO/ePTIyUozTRt1zmbW7d+82bdrU1tZ2zpw5XPaLq3tytFH35NiSjWyC7qtUqQIAkyZNIjsyYtFR98TQag9MPwvh008/1b6bTCnqngzXoqioez6iNLsAACAASURBVHJsyUY2VvcPHjzw8PBwdnZevnw52ZERi466J4ZWe2A/Pz9bW9vmzZtz+ecg6l57MtgoRd2zQZGPGMbqvlevXgDQrl07PgbLTp+oe3Y4GhPF09MTAPz8/IxpZFZd1L1Z+PQ2Rt3rxSPgnUbp/ujRo97e3vb29rx8LZ4tiqh7tkgyj4O6Z85K+DVR98LPkfYRGqX7WbNmAYCrq6v2WCIpRd1znyjUPffMyfWIuifHlmxk5ro/cuSIXC4HgIcPH5IdE+HoqHvCgLWEj4mJeXvve7lcvmvXLi27CRThyRwCUN+FRN2TY0s2MnPd//HHH/Tl9mL8apUqRNS9Kg1uthMSEuiDZ8eOHdz0iLonxxl1T44t2cgMdZ+UlNS7d28AGDJkSHJyMtkxEY6OuicMWEv4jIyM7777DgB69OgRFxenpQbbRah7tol+iIe6/8BCXFsMdf/s2TN6dXbw4EFxTVBztKh7TSYclJw+fZo+hO7du8dBd6h7cpBR9+TYko3MUPc1atQAgO+//z47O5vsgMhHR92TZ6ylh/Pnzzs7OwPAP//8o2U320Woe7aJfoiHuv/AQlxbTHR/9epVJyen8uXL//777+KandbRou61YuGgcNGiRQBgZ2fHQV+oe3KQUffk2JKNzET3HTt2BIDPPvuM7FC4io6654q0ej+oe3Ui4nyPuhdn3ijKoO6DgoLKly9ftmzZCxcuiHWSJceNui/Jg7t3tO7lcvlPP/1Euldc3ZMjjLonx5ZsZIO6nzJlCgB4eXmRHQeH0VH3HMIu0VVSUhJ9uzRfX98SOwi8Qd0TgPouJOqeHFuykfXrPj4+vn///gDQs2dPsuPgMDrqnkPY6l0NGDAAAFD36lxE9R51L6p0qQxWv+63b99OXzyXmJio0kjcm6h7HvO3efNmNzc3b29v0tfn4OqeXJZR9+TYko2sR/cvXrxo164dAEyePDkrK4vsODiMjrrnELaWrurUqQMAo0eP1rKPvSLUPXss1SOh7tWJiOW9Ht2HhYXRS/szZ86IZTpMxom6Z0KJXB3UPTm23ERG3XPDmf1e9Oje3t4eAH777beCggL2O+YvIuqeP/ZFPdOf1spkssDAQHIjwdU9Obaoe3JsyUbWo3tbW1sAWLx4MdkRcB4ddc858hIdZmVl0X81rlu3rsQOVt+g7lnFWSIY6r4EDhG90aX75cuXy+XyJk2a/PvvvyKaDpOhou6ZUCJXB3VPji03kVH33HBmvxdduvfx8QGAgQMHst8l3xFR9/xmID8/f+XKlQBQu3bt+/fvExoMru4JgcVHk5MDSzyyVt1PnjzZ2tq6Vq1aqampxEfAeQeoe86Rq3d45coV+nzO1atX1fex9B51zxJILWFwda8FiiiKNHUfGRnZpUsXDi6V44sP6p4v8sp+lbpfsmRJfn6+spzFDdQ9izDVQqHu1YCI5q2m7gMCAuiVlwTudaw1Dah7rVi4LIyOju7WrRvRwwx1Ty6hqHtybMlGVtP9w4cPmzRp8vYutQsWLCC07CI7HwbRUfcMIBGvQnpVgbonl0LUPTm2ZCOr6V75Vza5k6pk58MgOuqeASTiVTZu3GhjYwMAr1+/JtEZ6p4EVTom6p4cW7KRVXVfUFBAr7lq1KjBzRPmyM5NR3TUvQ4wXBePGjUKAOrWrUuiY9Q9Cap0TNQ9ObZkI6vqnpsLosnOh0F01D0DSFxUQd1zQZlAH6h7AlA5Camq+2nTpr19lGjbtm0fPHjASef8dIK654e7Rq8XL16sWrWqq6sribsp4OpegzdrBah71lByHEhV99zcu4rjCWp2h7rXZMJXCblv86HuyeUUdU+OLdnISt0PHDgQAHx8fCR2QzRNfKh7TSZ8ldC679atW0JCArtjQN2zy1M1GupelYaYtpW65+wxQ7zTQd3zngLlABQKhVwuJ3EnPtS9EjLrG6h71pFyFJDW/dmzZz/66CMrK6sdO3Zw1DF/3aDu+WOvpWdCN15F3WthzVIR6p4lkJyHoXW/aNGit1+tsrOz47x/HjpE3fMAXXeXqHvdbAS6B3Uv0MQYHFZ6evq3335LP8nk8uXLButLoALqXlBJvHTpEgDY29uz+/RaXN2TyzLqnhxbspFTUlLatm0LAE2bNn327BnZzoQRHXUvjDy8GwWhZ2Si7sllGXVPji3ZyAkJCfSdqizhrD2NEnVP9pAyMrpS90OGDMnIyDCytc7qqHudaMzegbo3GyFPAVD3PIHntNuAgABO+zOmszdv3kycOJFecyQmJhrTVF9d1L0+OubtE6Xuc3Nzs1ReW7ZsUSgUQUFBKmUS3xw1alTNmjXt7OxGjhyZmJgo8dm+n15KSsqGDRvev7OIn2vWrBHyPIOCguyKXy9evGBrnGvWrMnMzNQaTap39jbP4Ua0FqXuL126tFnltWDBAoVC8dtvv6mUSXnz119/HVr8mjRpkpTnqTG3jRs3zp8/X6NYygVz584V+PR+/vnnoUOHjho1iq1x6pnyzp07jXAbVtUgIErdq80iKChIoVBs375drVySbyMiIjp37gwAgwcPHj9+vCTnqGtSeO5eFxkey6dMmQIAXl5ebI0BT+awRVIzDupek4lwS+Lj49u3b0+fLQ0PD3/7/5xwx0pgZKh7AlDNDYm6N5cgh+1R9xzCNrsr+kYlALB8+fKkpCTUvdlEhR5AyB/V0uxo3dvY2Pzvf/9jhSau7lnBqDUI6l4rFsEVvnjxolmzZgDQq1evwuKX8p45ghsrsQHh6p4YWtMDFxYWdujQAQA+++wz06OotETdq8BgeRN1zzJQQuHoK94cHR1XrFhBd4G6J4RaUGGFv7qnKKpjx46oe0EdNroGg7rXRUYo5S9evJg4cWLjxo0BYPXq1cphoe6VKCS8IQrd79+/38HBoWrVqidOnDA/F7i6N5+hrgioe11khFLeokUL+rPZZcuW5ebmKoeFuleikPCGKHRPUVTZsmUB4JdffjE/F6h78xnqioC610VGEOUxMTEymQwA5s+fr+p6iqJQ94LIEOFBiEX39evXB4AJEyakp6ebiQR1byZAPc1R93rg8LwrJCSkWrVqzs7OX3zxxZEjR9RGg7pXAyLJt2LR/bNnz+i/QQ8ePGhmIlD3ZgLU0xx1rwcOn7uuXr1Kn69v2LCh1nGg7rVikVgh6l5iCeV3Oqh7fvlr7/3evXsNGjSgl0tnzpzRWgl1rxWLxApFp3sfH5+4uDhzsoCre3Po6W+LutfPh4e9L1++rFChAgA4ODicOHGisLBQ6yBQ91qxSKxQLLrPy8vbsGEDvUB5+vSpOVlA3ZtDT39b1L1+PjzsrVmzJgBUrlz5+PHjerpH3euBI5ldYtE9RVF//PEH6l7gBx7qXkAJunbtmr+/v7u7e6VKlfbv369/ZKh7/XyksVdEug8NDW3ZsiUAzJkzxxz4uLo3h57+tqh7/Xw43Tt//vy311za2toy+boK6p7T3PDUmYh0T1HUrFmz3t7QydXV1RxaqHtz6Olvi7rXz4ejvW9vPBIcHOzh4QEAR48eZdIr6p4JJbHXEaPuXVxcdH3gxCQdqHsmlEyrg7o3jRvLrc6ePQsAFSpUOHXqFMPQqHuGoERdTVy6pyiqV69eANCuXTuTsaPuTUZnsCHq3iAi4hVOnTrl7OwMANOmTWPeGeqeOSvx1kTdizd3Ahw56p7npBw5csTb29vJyWn58uUXL15kPhrUPXNW4q0pOt0fPXq0TJkylStXPnDggGnYcXVvGjcmrVD3TCiRqvP33397eXkBgIeHh7F9oO6NJSbG+qLTPUVRVapUAYBJkyaZBhx1bxo3Jq1Q90woEakTERFhb29Pu/7JkyfG9oG6N5aYGOuj7sWYNcGOGXXPT2rOnTu3atUqAKhbt25ISIgJg0DdmwBNdE3EqPthw4YBQM+ePaOiokwAjqt7E6AxbIK6ZwiK5WqtW7cGgHr16l24cMG00Kh707iJq5UYdZ+UlER/vda0Zymj7skdoqh7cmx1Rg4ICHBzcwOAPn366KxkaAfq3hAhKexH3Ushi4KZA+qe01Tk5eVt3LjR0dERAO7fv5+YmGhy96h7k9GJqKEYdV9QULBr1y4AKFOmzP37942ljat7Y4kxr4+6Z87K3JqFhYVr166l/85t2rRpZmamORFR9+bQE0tbMeqeoij6a4MAcOfOHWNRo+6NJca8PuqeOStza27ZsoU+X//999+bcCmOWveoezUgknwrUt1HRES0bdsWAPz8/IzNC+reWGLM66PumbMyq+a6detcXV0BYPjw4WYFet8Ydf+ehJR/ilT3FEX5+/u/vTumlZWVselB3RtLjHl91D1zVibWLCwszM/PHzRoEL20f/78uYmBSjZD3ZfkIc13Yte9XC7Pz883Kjeoe6NwGVUZdW8ULqMr5+XlrVu3jj5fX69ePaPb626AutfNRjp7xKv77du3lylT5u0dXps1a2ZUPlD3RuEyqjLq3ihcRldOTk6mXf/JJ59ER0cb3V53A9S9bjbS2SNe3VMUNXjwYNS9oI5F1D3ZdEybNo3W/datW9ntCXXPLk9hRkPdCzMvIh0V6p5g4qZPn25nZ9e4cePg4OC4uDh2e0Lds8tTmNFErfvw8PBq1ao5OjouWLCAOV48mcOclbE1UffGEmNUPz09/YcffrCyspLL5QMGDGDUxshKqHsjgYmyuqh1T1FUgwYNAGDEiBHM6aPumbMytibq3lhihutnZGRMnTqVPofz5ZdfGm5gUg3UvUnYRNZIGrrv0KFDREQEQ/Soe4agTKiGujcBmoEmStcPGDAgKSnJQG1Td6PuTSUnpnZi131AQAC97lm9ejVD7qh7hqBMqIa6NwGagSbu7u4A0K9fv9jYWANVzdiNujcDnmiail33eXl5qHvhHG2oezZzMWfOnMqVK1tbW/fu3TslJYXN0BqxUPcaSCRYIAHd018m/+2333Jzc5lkCFf3TCiZVgd1bxo3La1iY2P79OkDAOTO16v2irpXpSHVbbHrnqKo69ev0wt8ho9iRt2TO5hR9+yw9ff3HzBgAAB8/fXXaWlp7ATVGwV1rxePRHai7iWSSGFMA3XPTh7s7OwAoH///kTP16uOFXWvSkOq21LSfefOnbOysgxmClf3BhGZXAF1bzK6dw3z8/P79esnK34tWbLE3HCM26PuGaMScUUJ6D4zM3PmzJn0+Zz09HSDyUDdG0RkcgXUvcnoihrGx8f37t0bAEqVKjVjxgyzYhnZGHVvJDBRVpeA7imK2rBhA+peCMcf6t70LMTHx9O3NQaA6dOnmx7IpJaoe5OwiayRNHQfHBxcp04dANi2bZvBBODq3iAikyug7k1GR129epVes0yZMiUvL8/0QCa1RN2bhE1kjaShe4qixo4dCwC1atUymADUvUFEJldA3ZuIbuDAgfT9QPz8/FJTU02MYkYz1L0Z8ETTFHUvmlSJYaCoe1OyFBsbW716dQAYNmwYwy+PmNKN3jaoe714JLJTMrrPzs729fWVyWSDBw/Wnxtc3evnY85e1L3R9MLDw1u3bi2Xy/v06RMYGGh0e5YaoO5ZAinoMJLRPUVRrVq1AoC+ffvqJ46618/HnL2oe+PoRUREdOjQAQAmT55sXEu2a6Pu2SYqxHioeyFmRbRjQt0bkbqUlBQfHx/649mwsDAjWhKoironAFVwIaWk+0uXLtnZ2Xl4eOzZs0cPaFzd64Fj5i7UPVOAycnJjRo1AoDRo0e/ePGCr1P2yuGi7pUoJLwhJd1TFOXg4AAA+h9uhbondzyj7hmxjYiI8PX1BYAyZcrweL5edayoe1UaUt2WmO7pE6HDhw9PTEzUlTLUvS4y5pej7g0zfPjwYceOHemvzgrE9RRFoe4NZ078NSSm+/DwcPpc6J9//qkrOah7XWTML0fdG2AYHx/fpk0b+hhdt26dgdoc7kbdcwibt65Q97yhl2LHqHsDWVWuR1avXs37+XrVsaLuVWlIdVt6ure2tgYALy+vhIQErVnD1b1WLKwUou71Ybx//76jo6Obm5uPj8/58+f1VeV8H+qec+Q8dCgx3VMUtXv3bvpv5ZcvX2oFirrXioWVQtS9ToyXLl2qVasWAPTq1UtnJf52oO75Y89dz6h77lhbQE+oe+1JvnLlCn1LnDJlyuj5WEl7Y05KUfecYOa5E+npPiIionPnzgAwYcIErXBxda8VCyuFqHstGCMiIuhb4gDAuXPntNQQQBHqXgBJID4E6emeoqipU6cCQMWKFbXiQ91rxcJKIepeC0b6yyDlypU7f/58YWGhlhoCKELdCyAJxIcgYd2XK1fu+fPnmgRR95pM2CpB3Zcgee3atd27d8tkMm9v72PHjpXYJ7A3qHuBJYTIcCSp+x07dnh4eABAt27dNKmh7jWZsFWCui9BcsSIEQBQoUKFI0eOlNghvDeoe+HlhP0RSVL3FEV16dIFdc/+4WIoIur+A6EjR454enoK+Xz9h7Hit2pVWUh3G3Uv3dzyMDPUfRH0jIwMDw8P5+LXX3/9Jdjz9aoHCK7uVWlIdVuqun/9+rW7u7utre28efPUcocnc9SAsPgWdV8E8/Tp0/RXPzZs2MAiXKKhUPdE8QokuFR1T1FUhQoVAOCnn35SQ426VwPC4lvUPXXo0CF3d3cAaNKkybVr11iESzQU6p4oXoEEl7zu27Vr9+DBA1XaqHtVGuxuW7ruDx8+7OXlBQC1atW6fv06u3CJRkPdE8UrkOAS1v3mzZvpP6n37t2rSht1r0qD3W2L1n1wcDC9rndxcYmKimKXLOloqHvShIUQX8K6j4mJQd1zfIxZru5v3Ljh7+8PADVr1hSd6/F+9xz/nvDVnYR1n5CQ8NFHHwHA3LlzMzMzlYRxda9EwfqG5eq+YsWKANC4cWNxncNRHgG4uleikPCGhHVPUdTx48fpBf6jR4+USUTdK1GwvmGhul+5ciV9p4SpU6eyzpSbgKh7bjjz2wvqnl/+EuvdEnW/Zs0aFxeXMmXKXLly5dmzZyLNKOpepIkzatjS1n1ycvKYMWMAoGXLlkosuLpXomB9w7J0n5OTs2LFCisrKwCIjIxknSaXAVH3XNLmqy9p656iqHnz5gGAo6OjkjDqXomC9Q3L0v3KlSsBoGHDhv37909KSmKdJpcBUfdc0uarL8nr/tChQ15eXnZ2dmfOnKEho+7JHWwWpPu1a9fa2NgAgOb3tsnxJRcZdU+OrXAiS173FEV9/fXXANCmTRsaO+qe3OFnKbpfvXq1q6srfVQ9efKEHFDOIqPuOUPNY0eoex7hS69r6es+Nzc3JiZm2LBhANCiRYvk5GRpZBF1L4086p+FJeh+5MiRVlZWPj4+KSkpb++lg6t7/YeEOXulr/uQkBD62l5fX9+MjAxzYAmqLepeUOkgNBhL0D1FUTVq1ACA8ePHo+4JHUh0WInrvrCwcNy4cbTug4ODiaLkODjqnmPgvHSHuucFu1Q7lbju/fz83j6upF27dnv27ElISJBSFlH3UsqmrrlYiO73798PADVq1Pj77785OJmTFXvv1NH9e/ce/PvKwze60EuxXLK6z83NnTJliq2trUwmGz16tPRyh7qXXk41Z2Qhuk9NTaX/BN+0aRMHuk97dC5g6RyFYt7GfVcSNaFLt0Sauk9JSZk4cSJ9AA0dOlSS6UPdSzKtapOyEN2np6fXr1+fftrJ4sWLST9ODnWvdpiJ6W1QUJBCodi+fTs96Ozs7EmTJtGu79u3r5hmYsxYUffG0BJrXQvRPUVRwcHB9O/sqFGjUPeEjlcJru5TUlKU6/rERMn+rYa6J/QrIaiwqHsS6cDVPQmqHMVUXd3/+OOPTZs2BYB+/fpJ7LNZNZqoezUgknxrgbovV65cQUEBk2zGxcUFBgbeu3ePSWW6Tvrr+JPbAwNWLpk7S6FQzJz3m/+aQOXr99PXHqcxjyXCmpJa3c+bN08mk8nl8kGDBuXl5YkwHUYMGXVvBCzRVrUc3RcUFNCPGwIAJrrPzc1dsWJFkbNnzgwNDWV4/ic1/sXOJQodr8W7/wqV9oU60tH9woUL6ZtvODs7i/a324iBo+6NgCXaqpaje4qi6DsYMtQ9RVGvXr0KDAyk3X3r1i0mNzPPTHl96dj+3VvWLpgzU6GYtdB/3Y79ytexy6HR0vkeprZjXiK6nzp1au3atQFg8ODBy5cv1zZTqZWh7qWWUW3zsSjdh4SENG/eHACWLl2qDYaWstjY2PXr19PGX716NcO7muO5ey0oxVIUFBQ0Y8aM9u3bA8D+/fvFMmwzx4m6NxOgKJpblO4piqLvbdWoUSPm2UlISHj8+PHMmTMVCsWKFSuCgoKysrL0N0fd6+fD/97MzMw3Ol6bNm1SKBSBgYGPHz9OSEjQUUtqxS9fvty0aZPUZqV3PomJiYGBgXqrSG3n6tWrpTYlvfP57rvv5HJ5nTp14uLi9FZU3/n2A1t6ja9QKFavXq3/7lioe/6Frn8EBw4cUKYTN5AAEpAqAQ8PDwB4u8A3Z4Lr16/XcxE26l6/bPnfi7o35+jHtkhALARY0b1CoTh79qwubaHudZERSvnz58/DdLzWrFmjUCgCAgJ07JdmcUhIyJo1a6Q5Nx2zun379qpVq3TslGbxsmXLpDkx3bOaMGHC3r17T58+rbuKlj30uXv6v7S3F+mFhYXFx8frkhfqXhcZEZSrfs1KBMNlaYj4US1LIAUdxtI+qjX2fvf5+fk5OTk7d+6kRT979uw7d+4YfIQR6l7QB73+waHu9fORzN7s7Oy3H8tLZjpMJoK610MpOzv75MmTtOjnzJmzcePGu3fv6qmv3IW6V6IQ3wbqnmjOspJj/tm3qui18+KbwkKifekPjrrXz4etvdnpL/76vTjjf1xNzeL62+kMb4Ccn5+vdP2ePXvOnz/PfPqoe+asiNd88ez6Xv8ZfiOKXiNHz19/9HJMaqqeXlH3euCYv+v1o+AxrYpvOtfQLwp1bz5QYyLwsrpPiTk37KPijHdRRCdlGjNeFuoy1H1BQcGZM2cUCsWBAwfS09ON6jj32ZXA5fMVilmrgo4/1acWo6KKoLLQvlWb/Nf22U0a1qjgbGdD39ZSVrpMpSptvxp+9G5kjg6eqHsdYNgp5lH3efmFq46mj1mT8sfVoi/O4OqenYwaiiIK3VMUlZOTExMTY6zri2af8mD3msUKhWL23FXHgyMzcqn8/LzIR6HXQyPwFmmGjg6W9udnvfxjbl9vJxnI5PZl/q9mnfr169evW+P/nOyKxC+v8tnWG9Fau7JM3RcWFjK5k5RWYkYV8qj7s3ey4bNY+CzW/qtYiqI4m7JRfIhW5ibFalPgV/cFBQUM73emNmwj3hYWPr+y87c59Gn/me9feIs0IxCaWTX32YXNn9d2AQD7Ku1+DAp5Wfz/bFb0jVnftfIsXWT8al+s0vq0WcvUvZm4mTfnUfepGQWtf0ysNDRu4voU5gPGmmYS4Ff3Zg6ecfOEi39uX7ti4ezZ76S/cPH6o1cf4eqeMUAzKualx+yc3sW9yOoVBq25rAK94E30xV+/qOcAILeqsy1SSx9hYWGXLl26f/++ln1YZDYBHnVv9tgxgCkELEP3VF7um+iIO9euXbp06dLly1fuhD2NTcng+oNpU/JjehuhnLtPiwn7qYt9ke29B56LK3kX0vyU4MAJdZ2LfN99bZjpczW3ZWL0v1e2z5unGDCgd4d3r6+++mrmypVnHrzK5/OKFXMnpr+9uu7TE24fXf3L15916tChQ69e//Xf+G9sUr7+ENLYm/jgwIpJ3377LvWdx47dePp8VLLY55aW9OTQXMUUelYDBw6cd+Ry6LOzPH5UK3agQh6/UHT/4nZAO+si21v3XJCYnlsSWeHT00vb15ADyGq1mh/Kl1pura9bpYK9ra2tXC4rGmnRSyaT2ZYq5ejsNnDawVdpuj5LLjkbsb1T0f34Mzf3fdOpoXPpUjayYgYymZVdKafG3Tc9eC7ZZVFhftbLB8dWTGpaq7KDnbVc/i71YG1dytHRpabP8K0XEwzcgVGQKS8szHn98PCSPo2rOtjaFv/uAcjlctvSTs6uznb0NPm4MkeQsCQyKKHoPnzfhIrFv0fNp+x9k6Vu9LQ7+3v7Ft04qXLdPse0f15LPh83VnvX9KzZsEnr1p27du1Z/OretWPL+lXcbK0ASpf/bM6JZCkK/4Puq1SpUgVsS7vXb9qxe/eePXt0+6RpTedSRWlzajryXCzXV+yRT3lRD1lJYWtGtCtTfHDalPP+pFMnOvcd2vvWqOBoD9B28pZoET4DKT8ndo9fzwrF83LyqN+xIz2tzp+2aezp9v7/NNQ9NwcZV70IRfd3A/oWH3jQY8Hf6ot7iqKenv6mfQ0AKFerxe+hXLFR6+fF1WXbt565fvvZs/TsbHpfblby46tH535WtSyAdfW2o04+kaDyPugewLVu28lzt1y9m5SbS1H5OTF3jv80oJl7KZDbOPWaflqSj4E/H/hV1eJD071Gu1/XH3rx5p3aXyU+OrPd/5dBXb+ds0eMug8/MYm+tv7/fHrO23wlOZk+HZmeEn1rx9LhjcoWzxl1ryYBkb8Viu7PzvpP8fFV7tvAK5ma5wXiLvt1a2gL4Fyl0fILQrtII+WPCU2sZWD70acrz/L1pwfBw/CD7r0/33b1fkqJExd5ry4GtqvjDiCv5jvo1HOCw+ApdPj/qhV/A6Rc85+2Bmflqv3dmZ8e//jBk5cZamcfeRqrEd0m3fBrU6noN86r2S+7rquN30I+qjUCl1SqCkX3x6c1K9Z9lXHbbmicy6GopBszP29mD+D4fw1++0vnje64SkphQX5eTlZWZmZ6enpaauqbu+v728gByjebtvOm9Jb3H3Sv9Vu1OfeW9ChKjZVXsxmHIyT2ifWLPya6WcsAZE0Gzrn5Mlcys4s7PatW+aLf68GAfAAABylJREFUpxb9599MVF9eoe65MgnX/aDujSBeWJCfGBN69eqxQ5tW/dCvb6dO9evXr+jmVvz/FAC4N/1x+42SFxUZEVywVQ3onqKur+pR1gGgdI1vl/6dJNhpmDKwnLO/+ljLAaxrjVz212tTIgizTe6VlV96OAK4VB+66oLm/QdQ98JMm/mjQt0zZxj/z8FV3/Wp+8Hv7z3/7qel6v7+lkHujnKAyl//sD+GOU4R1IwM7F3fCgAq+f6y/66EPoaP2T2uo5s12FRu8NPhJ5p5QN1rMpFGCeqeYR7Tbu75sXmV4vs5FNm9fIsWvQb7+U1bsGD16tWLR39iJbPc1X3MYb8KLrZS1H3Ygpa1i3Rfve3Ck1q0yPDQEV61x4F9PnEGcKrabOlZLV9UR90LL2XsjEgour+x/IviNbKOc/fP/h7esZYMoGyNZptu8vC5WPKdvf0+rlTkdMdyzb/5+cDJf58+jU1ITU3LysrPz4/e/Z2tlcxiT+ag7tn5XeQuCuqeO9aC6kkoug/dOMi22PedZp9My1H/SCzv0Yn+/ym6HK78R5/s4uFeCSnBa8bUdgaQlWrWK+BJYdFLNYuWrfu8y0u7lbEHcKs9et1lzRPBqqDEtv3qwNiia67A8+NZh+6rf6AptsmojDdy86C2LjKACnXH7dTyNXVc3auwktSmUHT/9J85DYt1X3noumSNG1fEXdrYrYEjgKxKo4kXefhKy8s/fhngXWR75y8DtTwux6J1n/Uk8Fvf0lZg49185rGnkvrloKjbq7raFJ3NKd97+s7oEleginqiaWfnf1beAcC52tDl+FGtqFNp3OCFovvEx38Oql7s+4+nPk599y2m91PJCT048+PKADJ5w+F7+Pguzwfd992gZTV0Z033ogsxLfKj2vT7+/s185SD3LNpv4MPpXYZaurVRVWLUgsV2ow+Ef664P0RKfaf8SemV3G3A3D4eMC82xpXU+HqXuz51TV+oeg+Lyly7chGRb53aL0tvOQDZrJiD80ZUNkGZHLrycd4+Y5V9q3fpzSuULS8b95307MSLNNCds3pVs+56A4yFqj7zBcHZ33j6WANNo6f/HREgveQyIqb9WnxWUa7sl1mHtK4vUf2y0eHfv/7SrzozmGlnhterXzRb1vNLmvOPi1x0VHC/XmjWnoU364Q8Fu1JX7ZRf9GKLqnClOv7Zja2M4KQO79+cK7r1PpLzAW5KTdOb2iR1UbGUCpMoOu8HQCNT/iWL82VWUAVq7evWcsu37vXlRU5MPQg/5j2nnbO5R2KDaC5HVvZef1Zb/5h0JCQ6OioqLCzxz5YWhDBztrGVh71pl0mfOHmnLzy/f01MzmzsXHpa2Dd7fRJ65fL5p8VFTw+Z1+XzSr7WTf0W+rCG+ikBe6caiTDYDM2r52uwV7DkVGRkaFhZ1d+lP/6h72DrbW9D3TUPfcHGRc9SIY3VNURvTVX/s3Km0NYF2qVvfRa38/fPjw4d0rpjfzKj7JU9pzUMBlrrBo9vPm2pbxDSrTHycXj6f4HztHt0at+08f29lKbgFX5oCzs/OHub/fKuXdqP+e+6K/EbBmyt+VZL6+tdGvS+2Kpd7dNfL9vOmfdk6f/7o3VuX5DDrjCGxHXnb0yiHNKjqUnA6AU4WqHf7bvyV/z6oVGCdJDUdAuqeorMgrO0Z/1sT6ww2G3x2LjuW9v/gh8P5rfr+yGnM8yK9ftxouRU/cKnrVafAfv9+WX498+dRCLsSsPXSFv1/fjr7lHB2L5m9l5Vq3ca8RM/bfeJatdi8ZSf2OUFT2m3vnd/86bUTnFv9Xlr53GIC8UqU2vb7+78zVf958Js4/bArevLy7VTG6a/MG9jZF9wVycCjTttuXi7Yejoj6C+93L7FDmJ6OoHRf9PTpFxEhq5b90KtRJfrXSm790ScDJ64/dPzZ61TelVJYkBr75NLJkweLX4euXb//pvjemBnPbx4+dPDgsbOh0Uk8nW0ieHDmpCXeOlc846uP83OzYx7e+evEiaL3hw+fvBby7HWa9KaslWZm5uuI28FnztDZP3j4n3/Cnr14o3ZVgdaWAi7MyUh5fOv6sSNHDh48ePz46ftPnufk5+dmJoacLp7mxfsZObz/2gkYn9iGJjTdF/HLyU5//fJ59NPiV2RMfHJaTj4ec2I7snC8SAAJCIyAEHUvMEQ4HCSABJCAFAig7qWQRZwDEkACSMAgAdS9QURYAQkgASQgBQKoeylkEeeABJAAEjBIAHVvEBFWQAJIAAlIgQDqXgpZxDkgASSABAwSQN0bRIQVkAASQAJSIIC6l0IWcQ5IAAkgAYMEUPcGEWEFJIAEkIAUCKDupZBFnAMSQAJIwCAB1L1BRFgBCSABJCAFAqh7KWQR54AEkAASMEgAdW8QEVZAAkgACUiBAOpeClnEOSABJIAEDBJA3RtEhBWQABJAAlIg8P+u754z7n0hXwAAAABJRU5ErkJggg==)
Assinale a alternativa que ordena corretamente as regiões de acordo com o módulo da força eletromotriz induzida na espira, começando pelo menor.
(A) a, b, c, d.
(B) c, a, b, d.
(C) c, a, d, b.
(D) d, b, a, c.
(E) d, c, a, b.
Assinale a alternativa que ordena corretamente as regiões de acordo com o módulo da força eletromotriz induzida na espira, começando pelo menor.
(A) a, b, c, d.
(B) c, a, b, d.
(C) c, a, d, b.
(D) d, b, a, c.
(E) d, c, a, b.
- Gabarito:
- D
guuigo- Padawan
- Mensagens : 83
Data de inscrição : 20/08/2023
Re: Lei de Faraday-Lenz
Boa noite. A força eletromotriz gerada depende da intensidade da variação do campo magnético na espira, ou seja, quanto mais o campo magnético variar com o tempo, maior será a fem gerada.
No gráfico, isto é representado pela inclinação das retas, quanto mais inclinada, maior é a variação com o tempo. Por exemplo, no percurso d o campo variou 3 quadradinhos de B em 1 de tempo, já no percurso b o campo variou 2 quadradinhos de B em 1 de tempo, ou seja, d > b.
Seguindo esta lógica, o módulo da fem gerada será maior em d, depois b, a e c. O enunciado pede para começar a sequência com o menor valor, então ficaria c, a, b, d. Sabe se o gabarito é esse mesmo? Ou se o enunciado realmente pediu a sequência começando pelo menor.
No gráfico, isto é representado pela inclinação das retas, quanto mais inclinada, maior é a variação com o tempo. Por exemplo, no percurso d o campo variou 3 quadradinhos de B em 1 de tempo, já no percurso b o campo variou 2 quadradinhos de B em 1 de tempo, ou seja, d > b.
Seguindo esta lógica, o módulo da fem gerada será maior em d, depois b, a e c. O enunciado pede para começar a sequência com o menor valor, então ficaria c, a, b, d. Sabe se o gabarito é esse mesmo? Ou se o enunciado realmente pediu a sequência começando pelo menor.
Leonardo Mariano- Monitor
- Mensagens : 596
Data de inscrição : 11/11/2018
Idade : 22
Localização : Criciúma/SC
guuigo gosta desta mensagem
Re: Lei de Faraday-Lenz
Em C não há f.e.m pois o fluxo é constante, né?Leonardo Mariano escreveu:Boa noite. A força eletromotriz gerada depende da intensidade da variação do campo magnético na espira, ou seja, quanto mais o campo magnético variar com o tempo, maior será a fem gerada.
No gráfico, isto é representado pela inclinação das retas, quanto mais inclinada, maior é a variação com o tempo. Por exemplo, no percurso d o campo variou 3 quadradinhos de B em 1 de tempo, já no percurso b o campo variou 2 quadradinhos de B em 1 de tempo, ou seja, d > b.
Seguindo esta lógica, o módulo da fem gerada será maior em d, depois b, a e c. O enunciado pede para começar a sequência com o menor valor, então ficaria c, a, b, d. Sabe se o gabarito é esse mesmo? Ou se o enunciado realmente pediu a sequência começando pelo menor.
Também estranhei esse gabarito...
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Re: Lei de Faraday-Lenz
∆B(a)/∆t = (1-0)/(1-0) = 1
∆B(b)/∆t = (3-1)/(2-1) = 2
∆B(c)/∆t = (3-3)/(3-2) = 0
∆B(d)/∆t = (0-3)/(4-3) = -3
Em módulo ---> c < a < b < d ---> alternativa (B)
∆B(b)/∆t = (3-1)/(2-1) = 2
∆B(c)/∆t = (3-3)/(3-2) = 0
∆B(d)/∆t = (0-3)/(4-3) = -3
Em módulo ---> c < a < b < d ---> alternativa (B)
Elcioschin- Grande Mestre
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» Faraday-Lenz
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» Sobre Lei de Faraday e Lei de lenz.
» Lei de Faraday-Lenz
» Lei de Lenz e Lei de Faraday
» Eletromagnetismo - Indutância, Lei de Lenz, de Faraday
» Sobre Lei de Faraday e Lei de lenz.
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