1
answer
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watching
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8 Jul 2020
Calculate for the enthalpy of formation of the salt. Use the diagram below.
![](data:image/png;base64,iVBORw0KGgoAAAANSUhEUgAABMYAAAG4CAMAAACZwxvoAAADAFBMVEX///+AAAAAgACAgAAAAICAAIAAgIDAwMDA3MCmyvD/8NT/4rH/1I7/xmv/uEj/qiX/qgDckgC5egCWYgBzSgBQMgD/49T/x7H/q47/j2v/c0j/VyX/VQDcSQC5PQCWMQBzJQBQGQD/1NT/sbH/jo7/a2v/SEj/JSX+AADcAAC5AACWAABzAABQAAD/1OP/scf/jqv/a4//SHP/JVf/AFXcAEm5AD2WADFzACVQABn/1PD/seL/jtT/a8b/SLj/Jar/AKrcAJK5AHqWAGJzAEpQADL/1P//sf//jv//a///SP//Jf/+AP7cANy5ALmWAJZzAHNQAFDw1P/isf/Ujv/Ga/+4SP+qJf+qAP+SANx6ALliAJZKAHMyAFDj1P/Hsf+rjv+Pa/9zSP9XJf9VAP9JANw9ALkxAJYlAHMZAFDU1P+xsf+Ojv9ra/9ISP8lJf8AAP4AANwAALkAAJYAAHMAAFDU4/+xx/+Oq/9rj/9Ic/8lV/8AVf8ASdwAPbkAMZYAJXMAGVDU8P+x4v+O1P9rxv9IuP8lqv8Aqv8AktwAerkAYpYASnMAMlDU//+x//+O//9r//9I//8l//8A/v4A3NwAubkAlpYAc3MAUFDU//Cx/+KO/9Rr/8ZI/7gl/6oA/6oA3JIAuXoAlmIAc0oAUDLU/+Ox/8eO/6tr/49I/3Ml/1cA/1UA3EkAuT0AljEAcyUAUBnU/9Sx/7GO/45r/2tI/0gl/yUA/gAA3AAAuQAAlgAAcwAAUADj/9TH/7Gr/46P/2tz/0hX/yVV/wBJ3AA9uQAxlgAlcwAZUADw/9Ti/7HU/47G/2u4/0iq/yWq/wCS3AB6uQBilgBKcwAyUAD//9T//7H//47//2v//0j//yX+/gDc3AC5uQCWlgBzcwBQUADy8vLm5uba2trOzs7CwsK2traqqqqenp6SkpKGhoZ6enpubm5iYmJWVlZKSko+Pj4yMjImJiYaGhoODg7/+/CgoKSAgID/AAAA/wD//wAAAP//AP8A//8AAABYWvgoAAAAAXRSTlMAQObYZgAAAAFiS0dEAIgFHUgAAAAJcEhZcwAADsQAAA7EAZUrDhsAACAASURBVHic7Z3beqO4EkZ9x/u/ooBhGhg0DLs/+k4bnUtCENtBxjj/uuhOMAZi4+VSqSTdbgAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAeoKyrsy8BAAC+Qyv42ZcAAADfARoDAFyBWghBfq2WX0Wjf15pjIs2eYxSiJc3P+V1W8ah2duPJR/oRZ/r2gAALyXUGLXYSmOtmNJGWB4ZNx7JBtXYwrThUSbEvPnItvwAABci0JizWFkv9GKU/1X+wWLjIGwSXe4LjYg0thUPDmLcOsIsRJnt8gAAr4NqzMdiLfGDDcnGnVRZ8/JmJbluVnfkMgMKIerNQ0xiyHFlAIAXQ3RQ+aCm4QvT4oYFE2c1e0ZYlJB2XL3hl4cuMHWEsDG8RFbJ0GrrshT7fxEA4Cp4HRRx0yzIjbF9HzUbLc67NVbXtAH79RGirokpqaR2X1TTdosTAHAdnA6aVYIp0FjzRUZcpJVwt8bCBuzXR4g0xpPCmsS0d855O9sHALgOVgfNursv0NhErFF242KtllF59OnAZ0djzbAcU9haCc5JA/aOI6yjMdWoXK7oVnF5dfpv8t2UzSDPVtPjld9u8QIA3gCjA2mxuGiCamzZzZVZNbZcixGNFSJZh7WpsWp0VV/7nQN3aayxOy1XpFJ8queU+4QZs6dr6PFGdFYC8AFoHaQsdmtIcNT7NqW12PKMkYRgYXREDp/UWPV1rcT+EajG6t5l+GUgpo5ZqmDLtimdxRbZkuO1m1VlAIDroHTQiJTGKJOLW0oV07BbqYsynMbS2akNCTH51HbRVyn7GHcT7Tsao1UhpbsKMdY3JnNejQ8QZUXGsJyuGIMM3Pf7UQEA5yN1YOKrncE5pY99fORTBRpbTBEMVRIRgS9ab00ZKKU7D3aPEGlsNLl6ToK73l1RaVqZ5vLdgVg6hAQAXAqjg14mwLe77UjYQvZrqcaWX4Jq0l0J0ZZkvRWOPaIxK2FOdvPx4exPwYIDiRNGgwIADqY2DlDNvM18d+s++zQnxajG4gbanoSqwFzTxujtLzXmfp5ln6eKvDiJCf3VcZID6+iB0i1hAMClqG0kI3/YTFK1rlE2UwuMocYSDbR09qmIDbXjkrt6KlUKX7qQkxaqcHqkZygijSHHD8DVUbkx9VPnE0grWhfktFvBzCMaa4/WmPszeLLvdDNq5GJj7iEAwHUgOpARzUZ67O01djOtSmgMgJ9HPDQ8XXVxcKOyeaDQ4U6NcVfxSjWGRiUAPwCqgznOo9/II4+m+L/Yenehw7eiMaT4AfgBBDrgYqORlS64aMROwcXqiRRBvFJuxoB7R7gjN5YsuJD9oii4AOCjCHTAtvJUpE60F3Yu6/3yV3f4lIR67w/Zybg3feHDPZWJKyq9NlH+CsDHEeqg2EqPTU47W4ORxkfaZ+og/bI/a6bnIiJ63WVD68bcVTTej24wEg8K0IoHcnQAgHclapxtTQfd+VagHxpONfZgYBNUjj2ztMeqil+3GqnGyCWRoeH0D+yQ4QfgA4g0pj7viY92RVp+zmM9kUazOyYzccDpWxZbaazXMWSQsx98nOc9RrtaJ0zUA8AHEPf4kQn5A+iIITVtomwThtMmPtg01NMm8vm5peECjfHW2ijQWEPredW0iePMwmkTsagIAD+H5CTWJFH/llmm1CTWc5AxQ7kFAD8Iu/6G8A0xMn3P/JZGsAudtKTF66fvub2legEA2bDLoQnfUht8YLO7ktp5mMtqvXsrH0FigTcAfhpmuV2ZYuoXETBVvGAqYV+/3O59mOV2pbumhi0/tMJXwmK5XQB+GrVXgu8f1A+xaXNujJPh2r09vWgj3BndlAD8OFqdMCelEq1/5Ln+xuww0zPR+foy3ymBmjEAfhyj9hZTtQuCdyTV/5ZNSklhCkUqVSQyDa67tX+szg0AAAB4S+oCAPAOvG00/P4E49QAAKfx52wZXBdoDID3ABp7mn9GAMA78OtsGQAAALgyrEANIgDg0vC3rZwEAIB7kDN0bqyNCMABsD9/sBQlyMsv9LKArFQiMekYAEfyryBrbwFwONAYyA37vWjsN5JjIBvQGMjN36p2D8kxkA1oDOTmH5Qgg7xAYyA3euoqJMdANqAxkBmzSheSYyAb0BjIjJ2TE8kxkAtoDGRmxPh8kBloDOSF2WlGkBwDuYDGQF7+thpDcgzkAhoDeRncrG9IjoFMQGMgL7+dxrBIDcgENAayUvs5eP87+1rApwKNgaz4JVDNWoIAHA40BrJClyT5++yLAR8KNAZywn4Tjf1z9tWADwUaAzn5m1gMyTGQCWgM5OSfYKE9JMdAFqAxkJMp0BiSYyAL0BjISBVYDMkxkAdoDGSkCzWG5BjIAjQGMjKGGkNyDGQBGgP5CMotkBwDuYDGQD5+KXf9lt2VHMkxkA1oDORD+uv3H3Zb/rv9hdUqQS6gMZAP1gteLv9Ljcl8/z/IjYEcQGMgJ6X6V2vsBomBPEBjID9GYwDkARoD+YHGQFagMZAfaAxkBRoD+YHGQFagMZAfaAxkBRoD+YHGQFagMZAfaAxkBRoD+YHGwLcom35qdx6HxkB+oDHwLQYuBDQGzgUaA9+EQ2PgZKAx8E2gMXA20Bj4JtAYOBtoDHwTaAycDTQGvgk0Bs4GGvt4yrY88nB1E22AxsDZQGMXom7buYx+r3Yel5S9EHV8FE19e5yCCx5tgsbA2UBjl6HSCyR30e+82nhcMchNscbUqlj8CY2V8hRSY606ldYXNAbOBhq7CpWYunbwnlr80Le9tEmVfFxT1FOssZs0zyqmuo9ihsbA+wGNXYVxlv/Kxd51u3Hq5czjbLSaiB+3rBqVN2WhPfXssRYgNAbOBhq7CHWh/2+MlZpB/85MtBU/7mihMfDpQGMXg5lGZG9jri7UlH3cAY2Bjwcauxil0UhhN9ShpspYM7k1toSDw87+0BjIDzR2MZoo9XUrhGB7jxuNNarGonHbIo0VyyOsMY8XbUsiuioo64g1xkmyPwU0BvIDjV2LaqyiLW0QDKUe1xqTK8NvaayZFjkV0kcju5UjFVMxTW07iclGdI/2cUJjID/Q2KVoBI9biCNtMyYeNxpjEy/pNqIx5S/eTN2iK9FXYlB1HJU5YC//WzYYA0Jj4P2Axq5D2U/r+tba/5583Gis0jry24jGylpqq2Oqf0AM0l+z2aG2LdbJeg0aA+8HNHYdylZ7qqAb+cR2H9caa8QcbQsalaWVU2+0xcwO3LZYG7sHNAbeD2jsnalXox9liotqYY7KK+LHtcYa0cTbwqS8lZPr1hTKX6Xbj9myWmgMvB/Q2Dujx/wEzgnL9CsRzzexKuNfjjEmasm+1JjcMPv9RvMINAbeD2jsnUloLBhcxMbYYuvBR1JZi0pYvC140obGyH4cGgNvCzT2zqwblapf0UZbbJzXzynW0Vi9RFVjtO1ejdlqDm4iOmgMvB/Q2NWovRb6fv9xhTLTEqJFPZVhP8CGxmrvIG5uFGgMvB/Q2NUoXCDlLVYmH9doM43C9FVWci7YNp4GY0NjNz/Lz2QOC42B9wMauwilHR80jCbN5S3WN6nHDXrouJwIQ+XRlFXayEVsS2OFfaC0BWTQGHg/oLGLMJh0Vu8sJkzirJtE6nHLqBuQlSnMF1JnfdRzWdjcGTetzdpuMK1RNppnyMKL6AT7QGMgP9DYRVAFYW07tloibBCebv24pVVDt5eGpHxcDG05y/2nwGKl6hAdmlujDtqVegNX0ZvsHVhMaabKlsOVlt8fuG5oDOQHGrsK1dy2s+uyLFtCuX7c4vZo7A9V24bpfXusxu3jNigKMsOFOdwjlw2NgexAYyAr0BjIDzQGsgKNgfxAYyAr0BjIDzQGsgKNgfxAYyAr0BjIDzQGsgKNgfxAYyAr0BjIDzQGsgKNgfxAYyAr0BjIDzQGsgKNgfxAYyAr0BjIDzQGsgKNgfxAYyAr0BjIDzQGsgKNgfxAYyAr0BjIDzQGsgKNgfxAYyAr0BjIDzQGsgKNgfxAYyAr0BjIDzQGsgKNgfxAYyAr0BjIDzQGsgKNgfxAYyAr0BjIDzQGsgKNgfxAYyAr0Bg4nGoeRLCyNDQGsgKNgaOpx1FAY+CFQGMgA9AYeCXQGMgANAZeCTQGMgCNgVcCjf0wiqE5+pBl28WboDHwSqCxt6fnVDxVFzij7jgf5nL9LDYPnHdFvHESog23NdzynN/qQQgeb4TGwCuBxt6dhoinlBoizmBc9EXdTGJloEZMc133gjOykQlJpLGynuXWqakTMvyaXj4ZGgOnAo29OYyIZ5546IxR+4uNsccKMSp/NeZ/Q8nW0ZjaW4hitfU+ytsMjYGTgcbenIFobAmXWuqM1v5cC0FtJd1nNMIja/UpjS1PD7XzEDU0Bk4GGnsn1umpQvBAPIEzJveICMOxxmmjjd7eNpvGWkGal9AYeCXQ2DuxUgybunZbY4JoLHhmSzQWCgQaAx8INPZOrBTTTWxXY6P+gUXRWOtyXd3LorEAaAy8EmjsnYgVUy822NHYJMSsfmii3Njy+8TMLuEhoTHwgUBj70SkGDYNsXjqMMWvdcHiigvZvdlLj81hT6U7WmVKxdxBI42xhlfL9p73ldqh56RqtpQlaW2VvCT7h0Bj4IVAY+/EKnRiuxpjo1CtyWFVN7aEY1JgVWwxezQmd+ib2h000E7ZyQ2Mq2xXcWOqNkx07hB9XS972JK0hMaqKOaDxkBWoLF3IvzwVyrBtaMx+e4t7co+UfQlzTMWYogs5o5W0YcijRVaX2NfF9KTbORN3bpdeu3MSlhFrjUm4jJbaAxkBRp7J0KNjYP8d09j2mMiVX7f0wDKY45Wi55sjDTGmDzsKFuNslx2VNrqzNFa+0x3JalGZfx3QWMgJ9DYG2AzVVxM3CetWp2239XYrRTWODFdYuCRPVoTCm6dGyOxl9nVnJj5en9uukehMXA20NgbwGqDzDpppKB0L+SuxspxlGX+Yu2xWSiP9dFmdbQmyqWtNcbtBnd2c+LZ94k2QgyJS0oBjYGsQGPvBBWW7Ubcz42N7DanPCYzWOW49pg8WmMESQ96r8a4F1Jp5ASNgbN5pca+U5z0MyDCmm3Ga0djpU6LqZR8mMvvlL7YsGpX6lr7qP+yXnlwU2NUSGdpjKlo1VMtv1fkwfSztrZvU3t2J/+oNh4un5szBDwONPZOEOcsbtBMQmbMbCswcAY3sVYVZ/Nrm/bvY8EtWurGOEarV5p5a41Fl9sE0eiwakcbeKLDYx9BGTbv3Srdx0LeBZCbwzXWhdPvyUn5bNd+rLGS87geQDPwVM76i7NahvaOOWcOPPWRBBoLsA9QZ1Qu3V5E7+JgRyndxvUwpVZaL2hWPqYx9ya+h8ZCi81xXOooH56MKHoLNvTI4oESnt69DSAvh2ssnJAhuMdijY1b34+zHUrzyFkJ05f364GnPhLy0rn2zBJQ9b5VQ51R+xd0CD3B3U5xIarSUhHlwh7QGCcGPCvFH1xuaLFSxHk/T7tpuA1k69t2IafLVyTd9h3DUiO/QAbyaiy8xyKN7dxWo/6APHTWgC/mYz7y1EeSuuu3c2NEY+2Wxm7R51ofbQ6TYWsRbWqsET7COKvggmqsCetN+M7dzLZEdKvTeTMq+0p2l6SaiPXezdaiWZkd9eZbjR32alONeYtRxZhbo9p5/+tH02hcuFqFWRV+7udkjzz1kTymMRYMEKLP6bymo5fCHK23af6WF6mP4qbG5HB08/oURhlnaqwJ+yt2nbItlY3LC2JWFrfEDXvilE/aaIqCYyj/VcNRtMbKf393B7WliMbIPZbQ2O77v/lgx5PJqyAGXGW87z76lw9mJtW1tT80XD+BTfqHmg/q1fGCm6NXwsz+KkdjyuNUyvj16k+eNjVWu/eUm11q8WUKKJfGutBiy2XvvXdsy7f3aEyeK/El0+xH/i26tfLy3/Im/W6Z0tiv/21nMB/FC2WO7rGwUVnsvv/1Vo6Dp++LMCPX7scHT576JNr4TyOpmF6M8tUoR9NEFPYPlykxPcNF+LbKwUWq0SyLvpavsVK98W1cduY7AUZ7xNYG1rJZuTiT9fZFdI9sk0ljfXSH1aFpdEax9InFfiMcu0tj9n1g6niVKfHgQXqi1K1T30gtEY7lRc9a8Ht5G37/p378+5jjOqHE91iksXH/zt56+C6NJZo5OhDk3zn1SRCNVbL6Qv4ZLsJqRjHxUfTm0zm4KKzsZcWGGQ95c8/XPSCdTvUsezQyYo4DXLPb8txuMvs3o3/9qkGmvidzTvvIrsjyaKzXKvYMRFP1YDp7yOtXbEjlLo0NpqdTulJP/lEr37sjsla9Wj2jxxuRHcvKX1FS/MFenE2sUNYWCzRW03afnMBqmJkcW2g3zhsR010aK0zIUcnij1oeuyQae/bUJ0GiCTdoiTiDBb/Rn6u6jt5T5p7OfFnnurbTP1jZ/Us3Rkqfxp/HPrJ7+2TRWB83IUrSum3sbd3QaHbbVxub/b3m+jakxrS69TXYXnE2mjOOjBxvfrPY/uP4HVrsv4MOy10OefXNR++KnjREOnMJFYmiyo2Ey10aG3wfWqvvZ/pJffbU4GlyaEzFYsH22X8/qYENMk5d3ktyawzp2rFtjc2234i7lnOtXaWracnXv7KYKs0YyfEq3Ex5GUKN/XPQYbVQUhajGqNfWL27Brri4UY0fofGSreM9XLHDT4K++6pwdNk0Fi/+noikmKmzXcrVevP3Rpt1Pdjok25cxBtuqsmkFkizZy7gaRkhtBMuCvonysOa+eAFL/Cd+mg1JgWirrH9rIlhf8mlW+7XOG6C4XTbfVvb2ls8oN3bMZE3XG8qGf6Ffz0qcHTHK8x8wUURDr+npu94YJhpXHSNC43DK8yeoyX7uxu/WN/LwlnyCo40MYNCw6ChW/SUV8ZUmP6Htsrh/e918x90akJGdxd1kRNhsaVU5vK6sCSURW/yW3V8Y3+3KnBdzleY0JnvWgqgYTZo/8iKulOVXQhX2osqOLXkqTj6P29VIgwxncHGVDJn5eRvn9HpcbsnbHOXMR7mQjJL+Kj7jhaoh7UALXxHRd8x8X3o7aTvONWuZDHTw2+Sw6NNfoODnqN7FkEaW4GadPoQjonqWCJFb+zO3rZ2i9mOobAH7slSZRgsFRyKSpwHH/o5/6o1JgRSqOC+e0OP3+HDCRd0Ycl6sEd96XGbBV/o6oEVBAm76dVSPj4qcF3yaAxeW+p/mdGNpOVntzebaSxRBNv4/LCnWdzUlrty0kx94Ysv6hhBN+lplI4KjWmNdboQsvt9Jj/upzIvdKEa8kGCVzTsT+63qPAT2FPpQwFZaNiPeT5qVOD73K8xvSd1URBdE6N3UzlMM2vQWNvAC25OKw3hds3XyWmtg4bxP/uXomWxE7dcXcVXMg7boyP9+1Tg6c5XmPmR5rAz60xE7BDY28GKbk4LDUWpgs2R2Jk1lirjw+NvQnZNEZjfp/SLOn5+kgwiTj7Po216+9G7hIn9CxlpDEMR8oKKbk4LDVGhSIzsBszf2XWmEmKQWNvQjaNqZ9NP00ZvLPuxpvIrbGR9bxPY3wdjXl5zdEIAves9IhycBxlhtQYFYo6/ubUKD4adz0BbeSS9OHv0FizH409d2rwNPk0psZhDO4sJonR+25yWua11Qd9l8bk3dzdwpvKl9OWJBPM6fH4ew1t+0T+Oz41FghFzXGxtZe5QzpSmDGSOyQu8Vk9cfOsN1e5k9TY06cGT5NRYyrm10Vi/p2t3TZVi0onwEtVAcWVFoZAY8zOm1gnexXkyUe//oG/vunL6T/AN3ElF8elxkKhDGJj5q/e1SdW/mbZ6HeKD/+1xiqTlUse4+lTg6fJqTElKmUK0n6TNx5v6kIXYrtbo39ofIbwYyoLNdCjM2dPleaoy+jqetaTkNg9ymP/dJDAzXJxXGosFIoaKZBKj80+8cnNNydTlWGJeD1gPW3D+qyNbcwmffT0qcHT5NSYHlImb4rKv4csqO12t8b0UCWNiBhtTbW/qQb/rdoE+978VmT4c2NLLo5Lja1n/kreOaVPUugMnR3vQTuBHljIhoyp5P7OTWrs6FODr8mqMRV6KVdMPjvC7LiOjs7X9liYHVmsdQN1/UEa8o1nPTbRpMSA3qL82JKLA8fgR1mqTqRvHTKLROVuFFJK/2AlfTwYSd9b6dbhwacGX3PsK1pFuSxmh9i2NJ1etcvWuaR1Y+1j6XZOaAv7GSEz06l7xfcZsKbnvC/on8swru0FmJKLA1NjscZUBjbR40ynkyt1BmOoiXaKxxp2gcbsxKQbGjv41OBrXvTF4Cbbp6kH0lW4P1X/U9jJ9unslaQ/9Iup+sEhmFkuDkyNyTsoaESWq2mc7JlpH6a+78iIoOGx8UAVWajeh5bhzKiZTg2+5lXxrV1jhaymKW9xcxPsr8HwHHbtI9rQbX1/6Ihg7BWMR6fG7qa1K1Qskb/d5ruasi7FcOKpfyiv0piVyiBoCZk1SZY1r4w5K9/okD/6maIQjL2AP0enxu7G3nFkqR/5xWly61nXKT3x1D+Ul2UbZ/3mqWx7t0TmapUP812VZwVSNrnuBVniUTcyTWFvK47KnZfw19GpsfsxupDzzQ16kUU/h/n2As9XPzXIi1n03c9O7mPrTOvBFzq2r8gZSSsWpa8v4X8Hp8YewHyNqXbtaKoefESUNUI88dQgK6UJufz0dDZvMOd6Yzuz7p0rVTOzXctADcMpX0N/Umrspr6/1MoMpFLRJBLK3IVbJ54a5KXhOvpS1Q+8a5y6hv2lNJ+HDVw3VlWJx9C60xQccf2LKE5KjUla02M4G5vYOokbz55kP/HUAICDWQLff087uSuOYHVQppGq0PicU1+K6g84ibPf+venKhx/t00BXsbVUr6FACdx9lv//gxfv4ggC1dbOQ4aO42z3/r3Bxo7i6tpDI3K0zj7rX9/uhGcA/quAAAAAADAq2lHDC0EAFyZ6rf439nXAMC9/Prz52oVBSA/clo71OOBqzBiKA9YIwetYnQhuAr/QWNgBZNLPmDGGnAVoDGwRpXQ/j77KgC4E2gM3Oo2irz05F9IjoGLAI39eNTEq+EmvQAtkmPgIkBjP55StiGDLWZeVCTHwEWAxoCc8z743UzEiuQYuAjQGFhpzK4hiuQYuAbQ2FtTxsn3AyiGuOA50pgqt0ByDFwHaOw4FufwYTUUkTUdjyeVL+dlzzlYlW7gGrqx7lfJ9xt3PHWNTC6gFkdZkcYaO0cRkmPgGkBjh9GJvi4GMQXKKhcT8bYIF09o1tGO3USXl+3Eug/xJk+x0D83d3eZbCxGGvvHagzJMXANoLGj6PVSTX2w0uFs19WkuGiHrK85mS00mCvl0xNTio7CLK/yBCX7Ohqb3PUhOQYuATR2ELNtgk1uBWrltPV8N0tE1Bd1waknatHUChbvmtAY/1Zzj3+lMbIMLZJj4BJAY8/TEJkw9zo2/tPfJ9eg7oxGGpJ92sp05dOYzq/pyws15te9PXEJLgAeABp7npZ8+BtnrEVoZh3RLhWLLeGaDYZaJ6l6q/mWT2O01RhqjKxo/BvLsYMrAI09D9XY4E3AzUtapJcjKd1G5iTFRT+vUmiSfBqjbdhAY67cQoJ7A1wBaOx5qMa4N0GvW5Uyl55SE/MbR/OkWpc3JCKyE3JjfxOLCSz2A64ANPY8kcYqt1lZZvmv/+IA1n22an69CJPRWKczWY17WqQxXSXbDLxT4dXyQ+9VVSzP7hvXPPxKY8FSgk/3iALwQqCx54k0RlJeUipLMFaU88B5m2wuSqzo6qLV8lh5z2isWg4/tnXpzhVoTFfJVrpOoryVI20PVuPU1A33abqExgqbzbvdaLkFkmPgIkBjz0M11vtYSmtMli0s8VM9i3Si/6bKKbzhWJOKx2yjcqDvUqQxXSVbTW0tDzFUspxjsP0MlRiZuT4fy4Uaq1QwaAca1CIANwe4ANDY80Q9lbYAf1Cp/db2A7JNGbRh9MVGscqmaY2xPijciDSmq2QHaavK+cisscDcEZ29VhpjQcVaF2oMyTFwAaCxxzGZKj4JO7yxUd6Y9cOjSvFzF1o1grbZPCzeLD0WNSuVxtgYDnBa5cYq1xMw2bez1f0Mrctu1daziUYlZQw1huQYuADQ2ONUOnype2F+kEmr0jQea67DMO6rYKd0s7JdvfJlOKbypjXGxjHU3TrFTyo3jKOMxkgzdTKdEPsaY6HFkBwDVwAae542KIZYWn5i4lNvxkESjXXJPssq0THZxfUVMpAbp0gl92usJuOJTB3IFxr7O9IY7g5wAaCx52kj5zAVlvVaWkRjTarOi02J2th4/kJTax/FcnxVV7ulsZZorL1LY6rH9Pc/yyX/79f/kBwD1wAae55YYwpm8vREY3VKY3xMNNdYQmMytRaOzOSrMdvHaeyPUHNyVLJ5y5Zffv/a3heANwEae56kxmzbrQs0tmpU9imLLRqLUurST7KxGux8v8ZmItD7NHb7i/91u2mNyV82a94AeB+gsedJaay2nXuFN0jtOjEdfZzvupknRTsqP41RNHe/xmrhw7v2rhS/oVp1NgDwvkBjz5PQWOlLvyZXT9GsCi58HVhdhNujHXXBxRSGc2sRbfZUTv7tbe8ruNBAY+BKQGPPs9aYrPyygvLzjvVxnySxWFDv2qzeC+2nyqb5q6FnUkSxYjY1RnoXRtNTAI2BjwMae54y1kE1CZLyGqLxQKzj2mu9mFwBrWyBVnxQR5pXJRh29tfGDAkYVFjG467LclNjNzeYsrY+4/e849AYuBLQ2GFUfZizWkKzsfQWU0OGpGN6WpYlc2Fy3NLQ8USR7Gx7KXtdwSX/K9mqw8DtJn2mL4GbfgFmRhcsFtNXIXtSU9OgRX8LNAYuBDR2DHIOiamL+vXkIPFRtCZAq3XeLBy0KJ/BKah7GwAAHJBJREFU9EQ98bNvnZ5sglfmOROXe05jlN9vRrubPs7Y2Geq4E6u6MbH0Q8Ml0daV96GQGPgSkBjx1DGq4Fo6rqi+6jh2zVFP8KC/Sx2T+Z+UudJnNrs5oZGmf2r9bXVwSObQGPgSkBjIMHRGuvcnI+KhnM+OLUOqXlvFwr+VdC4RRkt0dLz1RpPjV+3mLfNvSNHlwOnd215atgseBHQGEhwtMbCUjc1tZoLCLutaTTYtKq3u/909NcykXYk6z8JsSrE22JMDIRVVMlFsMCLgMZAgqwaCy1WbxeAFE+6oRehxtaFeyuNfTnhuH3SVtzWiXRFM3gF0BhIkFNjocWWkGvbIPyptVNUVzDdMCTivcVIo0kUNqpH5I5GYbWzF8PixCcCjYEEGTUmLUaq69r0+lGaessbDd/MRZl+X7opZZiWjvCSZSl3TBC5rjsOD4gBqGcBjYEE+TQ2hxYr95tzfKOp1m7GPo1pJJJNybZpoLFg8OkmxW7Ixu6pxwN5gMZAgmwa60OLyYq4vfRXsR5Vr9jSWCmbh1MVSmk1GaU5Am2w3qOxcX+fL/4UkBFoDCTIpbHYYow25ljT6+XwuK+X2LiOLY3JqKpjkZSS2bdQY24Bd867WykvY22kmi5cJZfuG2Z2q7irCqnu7CcAxwONgQSZNNbHXYINibZsc7ChFurT9+e2xtTCUIHGUuUWscZme11yNIS5ipg+KBLRVHRKzGm7HxPkBRoDCfJobGWxWzgjiPUYsVCRDnE2G5U6yx5obE7ahWqMyeoLZp456oFcq6ewUK4GOjFld1d3J8gANAYSZNFYH1RaSIgaVAzU1fU8BRl6JpIJqe0UvyJ40pCs2pDmMkX8ckzqWLlnCrnM+jojV/gUvuymmOa61jEZT+wBXgs0BhLk0JgOYYKeRzJFrhz0rlTCwrKvKTRfZWc4spMdJeOfQGPpXoKo/HVm7pkbdRN+VnKpVj0mqRypxsq0ckF+oDGQIIPGVKm8CAOW1mXNSxKoTVQH0fxFdVR8nw7K6AE2hgLEVfxmRWMhtoYb+XnaGi/jkmrstqlAkBloDCTIo7FGrR9HrDTQcjLXZUlzY3RpFsnjGus3+zptFX/Rji4IE5ufB+EGTQ1EdT3V2HjPxLogA9AYSJBFY41eVoAERz7UolNOBo2zNszxM7tgu+jdgu1rwlZpsgwi7KlsbJgYZ++CY/pVFmryRH+Y1MyX4BVAYyBBDo2pj76MpnzhmF8XIBg7HmkskaG/P8Vf0Ru89rO1RcftTedkmN6i88D5RwTRWB1pDOMqTwEaAwnyDUaSOamebM6tMV9uofsOZHVs4ri1cRM9daViyGmOjwmNvR3QGEiQcWj4SNJPL9AYt30Kavi37OLUwWB8XHNVYRwnOBe+MBYae1ugMZAgo8ZKUtMQBGkuRqsjjSXUcLfGmCu36LV8CvPMSGPlOhqb1Iowso+hNsf0ynUpsDbSGFL8pwCNgQQ55xtTc1zoH72NCuKPjmps+J7GCqdMe6O3+rFIY43J7Qtaj8vMtQ/mT6jd9bmqkTEquIDGTgEaAwmyzv46uOKsxgvB106oen76zIQa7taYK7dw0/PXKY3JHtQpfKZbCaDVO/Yurqu8rpq4bmznokA+oDGQIKvGZBW8vuvIaVqbfddjK93OIjkistyotPBPcj/F1awpjdWjrWdLmMhobPbNXpkwk0pTYzH9Yeq75l4EGYDGQIK8S4rULj02+bp3VYLKTbm/ILs+oQZ3gGp9e/f6gGRMpT4nD5/pmbQJS/+SlIJeq9NYuzkCAGQGGgMJ8mpMZb+4+cFmy9loC/PpiiDdxryJ+7gDtCsr2fn048FInIXPdMzWtKNXbiXItTqNjZg38SygMZAgs8ZU6NXq87hsOWvV5BZjMN/Y+NQcXu4AYzznBJuMdkKNDXX8TEtFx0s5o5a9eRopuGBoU54GNAYSHK2xKspllXbFdB5oSqe8yGCkJ2dUddX6cQqtdFq0a61HA5rqaFX2bU1Vai12MhhpxlCk04DGQIKjNbZJbUKcinPnKzJ9T3/snBGVm8niThrX2rypAE49ueHchWVk5Pr0opcMrIHGQIKXacwumlYLn1jiLlXOjp3evgkXAviaLji/vZrWT9TD/JCEzcXoQH6gMZDgdRozn37pg1G158rBG+3YtR9lldpDFuujjJ65HFmqO6jrUoUa5kGOzNh5QGMgASuKv150KlOgqiaEntS8rjQYO3CMYvNoaNev4isz6Y/qUx1NwYUPxlDBfxrQGDgXNvm13wy2+qo/MsCpHy3daNdiqvQmXxviRTehZuxEoDFwMrVpORZDVPxQH1qHNbnZXuu7Wpalm5mRdF62RqyzEVlf+gewuNt5QGPgbCpX8VCTaQplTcSBibGCVInd1frryBP8VudAFhZqVPe5EeQBGgM/goZ77orxOvKE3BcHvgk09nn8T4Bz+HX2W/9TgcY+D2jsLKCxk4DGPo/p7E/zjwUaOwloDABwcaAxAMDFgcYAABcHGgMpqmk8cmoJAHICjYEU6QWJAHhLoDGQ4ndylVsA3hJoDCT4SwjxG8NrwEWAxkCCP7IKCjcGuAjQGEjwn9QYkmPgIkBjYI1ZiPHsywDgPqAxsOaX0tjvsy8DgPuAxsAasx42ZmUG1wAaAyvYb60xJMfANYDGwAo7UyqSY+AaQGNghV3dA8kxcA2gMbDCTViG5Bi4BNAYiKncNIBIjoFLAI2BmNZp7N+zLwWAe4DGQMy/TmMYVgkuATQGImy5BYZVgqsAjYGIhqyR8efsiwHgDqAxEPEP0dh49sUAcAfQ2I+EFV239ViwPhySY+ACQGM/kX6nRL+iFsPNAa4ANPYTKW/dpsbaQGNIjoELAI39TNpNjY2BxpAcAxcAGvuZbGqMllugcgxcA2js7Wiaww9ZrkYVbWrsbxHy9+EXA8DRQGOvomzatimjDavXvmxXyfeytTzpt4YLEW/b1NgQaax/7pwAvBBo7DWwXoxty8XA/Ia+HcQUvvpqipyVxvTEOfw5jRWqgCLeuqkxU27hmpZIjoH3Bxp7CWwUykGNGJndUKnfReCmoh5TpRDVN8Kispgf0Fit3DVUSwD3q/uNyjFwCaCxl9BZC/XmB2701caTes3Jii7xrUlzHtAY+1eIfys1G/+vG1v+/QcaA28PNJaLluiJOVnVOrxpxOQemYKn1dk0VnGFubrNgotfv+S/SmPLL5g4EVwAaCwX1Ds11Zj8aXQW6aNmZT6N6faiicu2NaYxGgPgCkBjuYg0NrufKrWcrX20iLSVT2OsVuhN0Bj4IKCxXFDvVC5V3qk2ZO2tVEWJq3waC4DGwAcBjeUi8M4kxCD/Z/rlrknHo1DxmcNqzJSKlW6nWGOqSrZqW/3kKqhBUyVpPjcPjYHPBhrLReAdufKjLLUwHZQ05BJhX6V9qFOFD1sa01WylVrdu7upLkVhazluJRddOyymtCJLaKz7oiAMGgMXAhrLReidTmmmN+l82pLc0NhttOk0sxM9nK6SrUTfSn8VlRjbTgtNHVz5rPJeW2lM1vWLaS8eg8bAexP0oUNjuYhagco8ox2M5GfyKjc01gdNzUhjqkp24qU+Lh/lAawaS5uGq1wJ/kpjJc32J4HGwPtSttH4OmjsYNwISMHtT/oBNY+XDbD8yMk6meI3Rf6OVW6stY6qXG5t1D7sXdqtt09KNCq/4liNVa5eTcGG5XdXZlLw5ACFgVepzXfQ8rCEhfMy3oV7+vbu87R8Tm4v+YAi4VfSyJwJ3QCNHcyWxhif6Ehrbn6UYVWQpVIaY+MYfi5WGvPZNecorjRW+jq0ypbWnq6x0NVspGOryo07cBbTc26oo9eqjwqMJeHw9zuFWQix8qFm0B044GXU0NhrCD9LMmFVkY8v64RMaI3DaFNaBumnlcUe0NhM2qg2UHsvjYUWW860kaMbn3NDFb9Wk1gvOxBN4yHu8RjbLnophUjHaSAT0NiLCO75SiWsVIei/UyVc9vWjMWfoeX9mSbxvMYGojFufn4rjUUWmzdDnDoebnoXaimB6KVf3+Gyfa/zg7VsnyTitTXDzl4thtC/FmjsRQSfpdH81sfWauJq1+X9GUcRByIi/khvaoy/ucaUxXzuiu1M3cG3vNHxzWagXmSTvvRz6o8PXs9G3PMhqKNRYwF7f8YPo+EP32xfUXarLzRo7EXQz1LjQg4etiFXwZjyU7kKvh7SmGvfvKHGytBishBlIxijQ7jWF5eO00oz6WP4DZJom4avJ79njMS4G7K19zVMrwVrhkm/ccFyWe61Kvr4fSjbaX2z+Wc+dRUFX9390NjLoJ+M1gcjYfTVrT5Ayk91HB/cr7GWxAXcNHXeR2Pq40AsxlZxJ2XcuO4tjanO4K4NXlOWdGH4erZ3aKzYT3/t/yHXRHanz/pl6qjGTO1jN6310vGUrdgcve2PUE4jNHYeaY2FGe1Vk9L6qYmiNBHnXjY1RtNQ3Hy03kZjscXkC+Nuv3IeOB9o+cO8ce9vaWzZPtWRlJpkuBd+MDqjqEqWgdQDH+b1Uzh9B4qlWdvVQet22AkrL0k1yhfTEPSH6NdhUknF1ftQJG82vr0u6h2M0NhpRJ8le7tz8qVOCu0dxk+9MPUGpZq3bHUXbGpM/mc/+/bdfxeNVatOwcmHqb39lPi8V7kxh/a2xuRrHmosVW4RaYxNRkGyVEMn11ZGKkm0VZmJvnt6IY1IdIhemEr2mNtfCtHZN2UmUeeUeB9YBo2Zl7lSXTL6rYHGXkQwbeJk33xGvtQLMuzxRjaqN9zWk+lbZXW/FJsaq6wAl0/WEO1yPzk0trZY4eVAl8d0+4zpEGdLY3pjqLG0XajGZOleay9TJ9fWH7nOtyl9nqgnF7Ka//LaVMGLMPigeCQBcvJ9yKcxTjJz0NgZVOZTQKrzyz6ZbemMvuS3mpSc+lCVq36wjlbx64/6ZN7iRthBlSbUK+NM2x1k0Jj6+IcJJC8HGQT1TV0XPd2pSyekNlP8ikBjVXrX5SSjqeInSWs1sSQv6nn9ao1OrjJ2E31RN/pTVa/3+ACYCIqP/TdBSdvWL9ZYp94vbVFo7BQqLqau7W2Lqe2Xu75fRxoq3yB4a9LVU9fIz3c3RhFF05vddM/Q1JY3NUhc9PLtrpdt/XIu/eHUu4jusRqs4zVmgphASz7pwQOX2MebyHuNM4+RUEocgcbadCAa5HoE91Pzbkz8QZpKrftSmAONpb+VLsrmFwVtU75aYxRo7CSCdSrbdk73tbnxS25pynJuVxnnxu5mhz6Vdn991GpuXZu2DB65l+M1JnRB3EbPBakTqeua+ecFLbVWRKT+qEBjG0MB4uN07jLTn4ba+23yV9rTK2g/qHQsnpLYQ9uU0Bh4c3JobGSVCDo1yHxFg2qpxZnCOF/8sMbKjb5O4av45955rBZbxfh+vaqK7BPMTrL90b8e05YVgjblrsZ0k9u+E2uNqSpZmVhR07PIHyb3rrFZPtsn5KAx8BwZNCb9JdthPd080T2WXyOViTDHbyYYGp2EUtKhGkuXW8Q9lTZIjGcbCY7ZuyP6DyTtqosjxwuj8q1aJVGrPWhT7kdjPU1kRBozVbKN/S4qAudV06I21vhvvNV5WC1nbyHvPjQGUhyvMd0pKz8bDdnsbu7GRVgDuWXTAdf9Kf6B5LpK21m/Om5pwrFoHYTKa9Ifs6X78FBjh4/COQlZ7Do1TC04HwazQZtyV2NsHMtgz6DqW8VqDa/VqI6xkCeb7VeW7Zry5Uir81RxZhQaAylyDUaSzUSXHgu0UbvCMRKvfVdjvtyiUB0dY508rvmUBdejG7BDGR3zJ2jMjemN5/QM25R7GqvCSVpWjcrCBl/yhtAFaoNx5mSN5Dp49t9vCTQGUmQbGq5WJfCbg5u76Ez1mPvK/6bGaqdMGexxHwpGxzWTUNLrkcka7rokfpbG/KvThi3lOezF2NZYJcKJJFcaK92r5XqrzWvc+JdxMq8+NAaeI99EPX7RgNQnn6nCMbreSvri7tNY50ak60YtI6NM6RH6VTTW6P7IajLrVNHZev0HW4Qa+5QUv/+zoqkLxlAWmxqr4k7bdYrfvbM80phfiVq+fd3meQKgMZAi43xjky9rcJtLMss1SaLHi3j6i7tPY6P9OM0mArQDxSONmfX3iIkGX4NRBY/QD3ZBDzNfW2OuE7gNXh06YYr8Mgies6WxetXZcb/G6NwJtvMXGgPPkXH2V1UH6wYeGCWQliTR2EaEc6/GfLmFm55fD7uMNDabs1ONcXdh9Y22gWQKxxotmHrhnmky3pgNjQVTsERtyk2NidUIML4qqtvSGH3La2gMfIucc/G3Lj02OM/IpuTs9m39nqkRkVW60sI/yTx/XpeBJTTG5PVM5tQra/op20r/t6g1SupR0MPwa3+SNjQW1RKHf+GWxioR93CuZ3Tb0ZjrXIbGwPfIqbGbm8u78WsTqI+QGeLohvM9pQb/yRtWQ4vs+iXCj6nUvQq1ucxYY40xYe8/mGrurZGbaS7oXDafMo81edmDmZTiFv5mbiyeZ+oBjZG4Vw3V3zxPADQGUmTVWGk//2RaCDK/6GQ/AelJX77Ca2zdzBv8WlEBbrxxpDE2Gc8WpFXkKkNGMhFW8UHzJs4+CG5J/XDcptzpqezDoeVhis3vFhzEvG8+c+rmDYfGwHNk1Ziu2pa3+eC/tVmn45uppTMZPTGHl9NYsZpzwi0bFThstGdca2xwIRb9C5rRXCgPkkgf80Ei3y506bq4TblXN8bDQfZ89VZsaoyMTS3Mqw+Ngec4VmMsXqLczn9XB6Ji0fCi52ZUddX6Zbwu+uyn0SAE5w8+bHIqR5IkKlZ7ksFInzMU6ab+WB2fMqKfVZtyT2OyP1rZqFDB9XoVv02NMZ+GtJO0QGPgOY7V2O55Nh8rD54zon8wuJM9kS5T7Sbb59zNikoavc3Tc82/Jdy0CXvyV7WrdyOlF1sjU5k+G11qweMdq6TG1NtTCDcaaXS7fPHiQmMgxfAije0tm9YeOr09+/rDEFJNQUvIXo3waZ7Wt5w2F6O7JsuLNdZy3gnyik2xKWRqIJ4zr3RdzvKHrlQ9oHUVv/LM7SYPoir+S7dCiRwUXqjJi/X3hZoGbv9OgMZAildpbOfzzw6d3V6GVg/d6XJkMm1i2qUo3Qp1qlDDGK3+uI+RzP9NVFLVuvY16qslG2v3001OZjFEsVjrdnNVHmZ/1fYsO3VyP/7VPbIFNAZSVEXxmoV+tmYEO3glbvboHNPr5V7MpD96UhlTqOGDsStX8F8faAycS6JGVVEeemfyr5olESyx3MugXeWnFHJrB21NawZeBDQGToan2478yPx+42d7vS8m65fPhXmCExQzn5XKFI6NjX/gk/L7FwQaAyfD4roITXrrk5Dl4+5q/TFSVuZLaEvnwCoq1PicNZGuCTT2cfxVgJjRM9yz/0ye0N19lk8ZjHQ9oLGP438CnAM+SWcBjX0c09mf5h8LPklnAY19HHwE53BkNg88AjQGALg40BgA4OJAYwCAiwONAXAAVVGgeOw0oDEADuCPEH/OvoafCzQGwAFAY2cCjQFwANDYmUBjABwANHYm0BgABwCNnQk0BsABQGNnAo0BcADQ2JlAYwAcADR2JtAYAAcAjZ0JNAbAAUBjZwKNAXAA0NiZQGMAHAA0dibQGAAHAI2dCTQGwAFAY2cCjQFwANDYmUBjABwANHYm0BgABwCNnQk0BsABQGNnAo0BcADQ2JlAYwAcADR2JtAYAAcAjZ0JNAbAAUBjZwKNAbBNqylvtfp/e0do7EygMQC2aSexMCwa40JM3faO0NiZQGMA7NEvGmPL/7UY2c5u0NiZQGMA7MFGIfrlf75rMWjsVKAxAHaphPyMzKLa3QsaOxNoDIB9ZiGm4quPCTR2JtAYAF/Al3hsJ7uvgMbOBBoD4AtK8fWnBBo7E2gMgK+wvZU7QGNnAo0B8AWFGITg+/tAY2cCjQGwTylmNgkx7+4EjZ0JNAbAPuMgi1/FfsUFNHYm0BgAu/Sq7rUTYtzbCxo7E2gMgD0aE4WN+0UX0NiZQGMA7FDb3H6zNCub1B6dHKpkNdYmdwGZgcYA2EaWWvTlzU11Ucc7lEuUNv1lNMb+FeLfLyoz7qHhnEZ+FV+o1GZH22yfp+Q89WDLP8+xf01cvjtaY/V/3QEvPgCfhpltzE08ttKYHHEpBC8WjfXdb/F1gdldZw3qO9QpGr2Zsjn72Zhu/lZf9FJcEBki/26Z0hiTL/909hUBcEXG0C3ivwOOGWjMWSzWmJp4I/3stEo7MX1YtFKr1+F/3RIq99NRrz4AP47YLf8cc0ynMW8xuXmsNY385KZzddXG9tuN7URwF+V/GV59AH4cVfRB+vuAYxKNqcNXq816HrRkCQjfblktBygPuLw3Ysjw6gPw85jCD9IRzTbvq5pYLEqZyYcSzy02gzEVjg0HXN4b8bc4/tUH4Ofxz+GpMe+rhlos0tgtrbExudXQfVqWn/0+/tUH4OfRHJ+csb4KLRZpjFmNdZzfWMt5J0unalKly5pelmaQiqpqs1/gqozHv/oA/DzCgOCQ5IzxlbQYXQEg1NhslcSXtpT6NMtf+6ANqpm8yKZPa3eFPSxIjQHwHP8enpzRvootFmiMte5ki8Z0prsmIZpqQDpctqzbyZxdkrCH5bMUDcDroAHBMckZ5SvVopyjzcIU8cvoazRhl5xjW7R1IRuThUviyylr+VzXtdKZPUTxcUn+6fBXH4AfCA0IjknOSI2ZlFsVbqbMJvaQGrPNxs6VhvnQjelATVGKvR6AK/LP4a8+AD8REhAck5wxvpJNxYmtNjsm7ThOCsi4M1rr466qrl25mPi00jHaw4LUGADPQmowj0nOaF/1MotPexZJFX/RqqS+MhInnZM+8JLP5c1KWaOPzD4D0sPyG6kxAJ7F12AelJxphfGXFGRDN5OeShmGqHiLkxSaD7aYuaQhVBn/tBw/6WHZndcSALCHDwgOSs5IjSkzsSA9FpW/2vWaOAmwSOrLp+xGIi7+ceMqfVMb81YC8DyuBvOg5Ew4GMkVXUQaq00LckNjt9KXXPi6jc/TmNc1Zk4E4HmcLw5KzhBfyUN3680K88nd0thC1XIhbAtV8Xkacz0sSI0B8A3qY1Njga9GQTsfqcbKdDQWZ/DDwjH+aSl+X3KB1BgA32E6NDW2nm+sXG2+6Ry/zJtRM/mfBzXvtYIWiyU8d3UKpMYAOIB/Dk2Nhb6aXaARDQ2fzJzNVGO967UcfEsy0thBF/k22B4WpMYA+A5/H5oai3zFbXos2FyPthiDasyNF1exml5hQ656Yp9Xf2LbiyM1BsD30QHBYUP61jPyqFCDjKnUn1y9E9VY6VfVULuMnE+0aKPdX23zmvxCagyAAxiPTI3FSbDCRHrxYCTuZrjw6a7R17+Sqbga8vBnzZsoqZAaA+AA2iNTY6vKik5HXqHG3JqZgcZmUtI/G5H1ro6ffWbQ8h9SYwB8n/LI1NitrOsgZmJyGCWTmx1khFElH3O7hqIK95SS+7ChSIo/SI0BcADju8x21e41G6fPXI+2QGoMgAP48y6z3LOdC6k/Mxi73X4jNQbA92H//vsmufOdxSj5p8YsgxB/nX0NAIDjmLbCsfrzKvgN5R/MmAjAJ1Ft2Wr6wJoxAMBH0qbbjm24zhIA4HP4IwDIBKrZwGuAxkA2oDHwGqAxkA1oDAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAACA5/k/WYSQcmDRhqsAAAAASUVORK5CYII=)
Calculate for the enthalpy of formation of the salt. Use the diagram below.
24 Jul 2020
Calculate for the enthalpy of formation of the salt. Use the diagram below.