CATATAN

Puji dan Syukur saya panjatkan ke Hadirat Allah SWT, karena berkat Rahmat dan Karunia-Nya sehingga saya dapat membuat dan menyusun Blog ini dengan baik dan tepat pada waktunya. Dalam Blog ini saya membahas mengenai Materi-materi yang dipelajari ketika mengikuti mata kuliah Termodinamika.

Blog ini dibuat dengan berbagai pengumpulan data dan informasi dari berbagai buku dan link juga untuk menyelesaikan tantangan dan hambatan selama mengerjakan dan pembuatan Blog ini, dimana Blog ini sendiri dibangun untuk memenuhi salah satu proyek mata kuliah Termodinamika dengan dosen pengampu Bapak Apit Fathurohman, S. Pd., M. Si. Tak dapat dipungkiri bimbingan dari dosen pengampu saya sangatlah penting dan mengambil andil tersendiri dalam pembuatan Blog ini, Oleh karena itu, saya mengucapkan terima kasih yang sebesar-besarnya.

Saya menyadari bahwa masih banyak kekurangan yang mendasar pada isi maupun tampilan Blog ini. Oleh karena itu saya mengundang pembaca untuk memberikan saran serta kritik yang dapat membangun bagi Blog ini. Kritik konstruktif dari pembaca sangat kami harapkan untuk penyempurnaan Blog ini.

Akhir kata semoga Blog ini dapat memberikan manfaat bagi kita sekalian.

Palembang, Januari 2015

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Rabu, 22 April 2015

Sistem Hidrostatis

Sistem hidrostatis merupakan zat kimia yang tidak diperhatikan sifat kelistrikannya, kemagnetannya, elastisitasnya, dan sifat tegangan permukaannnya. Sistem hidrostatis ada dua, yaitu: zat murni dan zat tak murni. 


Contoh sistem hidrostatis adalah: gas, cairan, atau padatan. Sistem hidrostatis disebut zat murni apabila terdiri atas satu senyawa kimia saja dan berada dalam keadaan setimbang termodinamis. Misalnya: Es (H2O), Air (H2O), Uap Air (H2O), Karbondioksida (CO 2), Hidrogen (H2), Nitrogen (N2), atau Oksigen (O 2). 

Karbondioksida, hidrogen, nitrogen, dan oksigen dapat berada dalam wujud padatan, gas, maupun cairan. Sistem hidrostatis disebut zat tak murni apabila terdiri atas campuran zat murni yang berada dalam keadaan setimbang termodinamis. 

Misalnya: udara yang terdiri dari campuran oksigen, nitrogen, uap air, dan karbondioksida. Dalam udara masih ada beberapa jenis gas lagi, namunjumlahnya sedikit sekali, misalnya gas argon, helium, neon, dan gas kripton. Persamaan keadaan sistem hidrostatis dinyatakan dalam fungsi 

f (p, V, T) = 0 . . . . . (3.6) 
Sebagai teladan.

a. Gas Ideal, dengan persamaan keadaan:
 p V = n R T . . . . . (3.7.a)

b. Gas Clausius, dengan persamaan kedaan:
  p (v – b) = R T . . . . (3.7.b) 


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c1l1dX5yf6bVm/MWMQ8FUBO0QusQFgKGPTNnEMH4DetGuHUM0YhzDeVV5VVZoZt2fjGp+iETpurLKsvK4s++iOjUaRlcAc2LdjTy0RANAHtuzKG1hoG0eZ39wiIKambU7gAAAM5geIHzuZmJySEOqtpHSva4rU19ZUXdMU7qi+fs/ZGQLmxJ4dqOZZAIi1vyV52xbY1PqK8qaWqnvnxCTvmAOwG2qq6hqa7bTP7ziiAgBGNw6rO6QDgJXKUXmjpff/BXS0gY7mwKsn2Jhjx/dsck5pAwD9iwflzSPnBtflJjo5u9ga3T8sedrWxc3J2aW+bxoA6HR6bm5uampq+uuhUKjW1kW9fOQ+a2vLQGfD9YLn5z459ljZnu2i/QyYbi8KTy7iAwDw8hNCrK1t7Ozs7OzsbG1tbOzcusbmqss3VDh21x4FAB3RptuPXJtrYw2X+61at70NDwBAJ860NTe2tD7T2Ng0NPrCGemWZPvd4nKpYXY//rKje9FZoNGq8I2bD/T9Rc4L8Walt640CVk49poY6gxy1PvnP74NLR1+eWTWtOad27Xji3Zx1tjp/fszuwkA0NfRjMFSAIDSmbX+h9V5PX9G5+hnFu4+j+RELhk8e8Fl05kvx3uEycUv/rVrjP38Nb5b8McfQ8vH2YQRG5PH2SU1Nlpn5fWDAaCzNPGwwMZf9xyvH1m8orla54Rv6TmEh0cTWcDEYxzNjFIKKt0fXzmn4QXAuyAh5JfTD8C+ckLQLrZxfjLVQ1suG8cCALUt88BByUk687q0gGPK/MkTfnWMo7CUwhIbLXXo0Jafdx2+XD9OGyn0+uHrH24+ssezAAAY+FEn08fJRVVuOtcvPnABoPs7mgYnF6F8dMTOaQNApq3yIQVDAGBTxqw15b77+psnvhmvzGD64MYVFknNANCU4iF+UhWDrt27Tbz/+Q/QeRxeZaTtQelbANCW5iEoKssCaExykbmmXlSSf0/lbt0gcWa48YmBUUldk8bZw0ZhZcDoF9ktVD4FwOgT3S6Y3YObnxnKRfnQNXMAAPqg+M4dYel5x4UOFg8/nxmXF/HkmpSq09wr7GCd0qn9X/24BVUz3F+dYmTp0thYdvyAYNYwTJd57z50hQZA6UjcISSFZgJMl+8VONgwwR9tyTF8Yl3b0HhRfE9gxRRprNnEwLi0runu6UNmMdVA7Rbeva8aC0DpEtkhmL8o3KMt7+wUFNm5bU9y/TgAtERZCR69Or+lcBjElCBXe7+kmmwvoSMKo4M1v61akd1DBoBoh9vSyi7AxD41N0osKPcxvHNGzQaAGexi4RdfkB5kKHxSAwAMFI7cd04HADMVyZtPYl79qF/wmnAfKA48eFSeCgBMtMTendFVz65TxPS1l5WV5cb7Xb2hnldWVlZWPjpLAQA6nV5QUJCRkZH1kuzsnJyc7OysrKys1NTU9vb2hXmQ+yysrJOD7DbtPDk1d2BDHjojIppa25IclzBDnWvr8Ac6msoWK6+aITEBgEfqPXFQpBjDAgB/g+s3HgfMldqT77bmt4MYJgAAdrg9NOQF+VUvdJHZq5y88jgcgHVCYLNf4eD88Mgn1/ZffPSWVfen4c1IbfnZOLj0pcEPLx/Rcsl5aeBodZzSfcsX2lbUXoE162Lqnx2UUMlUAKD15G74cXVO55/R7f6ZhXtntuff//ZVYE5DT1OpR0AUnkovzs0ZxS3cKYMx2yO24RsZLddnV5rMtqz/29/CanGtkfordshQqGS9y/uOK1o31RZlV6MB2Of3b9L1fuEUf2+u1//8f//rm9cNAE1RT77fKE6gUmyUJQTP6pEoM1JCm90zegE4Zw5uMo+om58q1PDiV+sk0GTGdGXE6tVbmrHUAN2z324QL2/pqcyKSShpqk9y2XzgzJLnzxwVRb/67SwDAFiY3V//P3nLZ78erIsz+m6DBIFKsb5xVPS6SW9l7IoVmzoJlET7G+sEL+LIjBTzG4IXHgFwUeFxAFDup7ft4OUp3HhKShqWPn84wn54etemYyoUJrskyGjNTqlpwuyZHd8fUbLu6e6KCvBqGCbWR1lsEZUFgBaU40YBGTZAWYyHlq5pXFJqS/8YAIQ+Pv2bpBaFTJQT2njdMpI80bhz/ZaiCQBG9841m9K6FsI9xUVpr4wWAOBbUg4dOT9BpN6T3Lj1pHp7T3dqZEBJ+1jck8vCV80BgDLUlpiUDwAOitJyWqY3JfequGaQphu3rlrhVzrRn+m8Yc8pKgC5JWbNZpEhBsBUyaYNO7sIfKPzgqd0/CjEUeF1PzklN/vrndp1SpdCJl4Q3HDHPo40Wrt9/dbyGQBy+461m7P6FsLdR0vmrLZ/VZzdD78K1AwSGWNVa/71v/edY7u72gP9Qrpbynet/CGyCd+b47hinXD7QI/09u/PaPswORwPbWlhOdPmXLfv1wjjqFQXlZP7ZB/116Ws/Glt/Swly0N19a4zOCJF67yQsnUSABgoHJDTDweA7rqSyubX9DDQ0YYP77/aLRNkcO2WeQQARFqrX9N2eelAjDfZ/NDQ8UMP6Ul9T0ytW6pQu7aL9c6FDBd7+eDai3ou6Km3n+FtSbLfK3mTC4Afqrkhf6d54tkpgKpgg93Hbs01XPGY7vjYmLjnYmJiyhp65kvgU4eFNvzsmjMAAG4aUvsuGjzrO+MSpLaueOCV90ELN9mXW1BOX9T1OdBaWdrQtfCaz64uye0cWbgolkOZzsvNn1ni4jS2mvSuZ90yHMZg/wCdB8CYeXhXKbtlCnjMsoLcvudn/oIsNB2inrXxZ4ba80vq+MDUOP7bxmPKPX19KRE+qeWdADBZFbNpo1AXAemWWQLT30x53ebth0/Ll/ZMArVPev++xNoXfoVBHG3XunPtvr5lcGiIo5nebVX9YRybMlR5Sny/upGDraGazFXNrMz469dVQyNi7B1dOsZf3KCZY4YPdLtwPAAgjzRcPLL/jq6Vk+n942dv5RZkyZ+RsgzKGu5tVjh9XM8tjvF8e2CTRtUuHj0lr2z/RO+I+OH4ygEWaULtrNjG33acva03SmSkehkeO3mxeKkTnp2F0a4haXP/B7tZZjVPzP1PwtSfOyKs+MjG2UTr6NlbTR2t969Iyio98nJ+InH0bHFLj7/53VNyWsNTWEfN2yYuASHebomFbZi6+DWrVtjGlM+XT0DXnj+y97rqAxNddfEjFxowlLHmdJGdG3bs3K3vFs3hc2IctY+fudXeP5zqa3L81JXuCUqKu+62XQdOHJc8LCGh+NitrjzlyMFDhg7eRmpXL6kYF6SGn5SSjihs66lLkz5+3Dt1oTs1y0v9xw0HYuLj7M2MEku7AGC2r0zq4I6tO3aqPvGmMHBO2vIycuq9k1QOrl/9ipxncLiHo1NlFzo/2FL06GlPP//r5yT1nCMS/a2lZOTq+tBVKM/jJ87kNPa1F0dLHZdOqumvSfY+IHbc0ctf9bL0XYugxtJECREJIydfQ5UrcndN81PCpKVOxpZ2dFcnSx8/4Z9RP1cxBmHMXFX2grL5NH5a49xBWVXzYQK7Ms5129q1OwVEvZIqeXyWrcZF6Qu3/P1cJQ9JRBZ3D9eniwvsuatrqq18TvrGo/a2WgUZ8Zva5m5mOkdk5Bva2x5dl7pwU9vHzeLosdNJuYU610+rmvqih/v1bp6+rutEYcFTjfM39H2W3pCpQw/vKb18dM6n3pTcfe2Ra2JcqK2zH/aV23vRJzo9faPe/tANHrs+L173wb3A1KolUgTfo6v9YJI8e/WoCKoNCwDAJdoZaKY3vtOvmQYq0wwMTdPT0kIDAxoGpuaHBxjeumMS9Pbp2ZScMHsxcfGnCaU8gMnGlCNHZOKLW/lcRkmS9xERMVOPuFnq7792uSPbc/+xC5hFqy7A+NpZTfuF1zzc7VMHrGKr5geQ+gtERURLhpc4rs7zfXTsujEAAHVU7ZLkDQ09NzfX9NJWAADm+AWJgx4ZHQAAbJylvl7T+LO5loWai59UZAAQ0dUyYrsEBPdpWfoSWHwAyPXXl7r55M+5D+hnF+4AABQClvbscJrHYNC5S30L4qdGe3t7R6cXXZPIY9OYXHh+lRiHQRkZGWG99RuUz6Ey2ABzN+DgAwDwudy5rm3+yz+xmBwfp9JZi69Cw81i59oQXB4fADic9/xYn8+d/6xQPpW2sNnODeJyeQD8mXHMFI4CAMBhpkd4R2fXv1gQe3x8gsFetKq4dCz+WbTMLQaHM1dHoEx2GOg+QVMBAEjTQ6aPHjZOsIHLZM7Xnc8HAB6XM7c4fO7CQqU+VRO/bDwzNTH387HnOLPYuQ/i2fkNztyceOwxzAiR/mxyJp06X725fzgc7tyYXA6Hw+UBAJfLBQA281kra240HosxVzf+fN04L9eNz3u27M8WkjdXHrBpJAJ5IS1pFOritcZnkccnZ9kLC8il0lmw8HEAlUpfVJG5GXKerSM+cNhMJvs1nzi2W/GKZP2L7QrqYOHhQ6dbx7Gzs+92Le1r8Dm0/sHRsZbcW3cMyK9u4RMtty9LjwIkOWnre2QAzH8s74zHnJiYYi8ewidp37mW3YF73RSLxuSz2XMfzcJhCYvFBuCzWGwAAB7nQ351yOdx6PQXzm1x2Cwm84VDICaDweYuXmQenc5YchXwKKM6ynfK+vEwlxjDw0TawnIzGfT5LZlEXriIicdl0xnz2z97Fvu8E4aFM9JUzmmf/J3L9p4+y3BHvAF+bKC0oo75AW0D6kSL9H4BBQ1dR2dXV1fXhOxq9pLfn6/gsuju909uErtFYf3Bz4xbBoj9WspX2xe13DlMeqjR1a3HlZZurby/0daSxKylWu6znRrKCoMc4M72GDwy7MN+hMfvdRbHWrpH/yV+TvqxzQw0ePtHjOM/9AJUHptamh6bVvq23698PEi4Lzcf5VYLbPJUZmJkQEhEddvAu0/FIE4VZ6ejUrOGJv6kn2l8xugjJgaPhhb1udMJ03lpyalZBaOzH+FH6rOj3WmZuRNYIvPVm1hQ+o0M9EfpAACY1tLIpLxXrkt4P5TZ4ZjI2OdnYpchBml2hkB9+3hvxGZSxqff4cjm40HCHYH4FNjjTwx0+4gfpbHLp1PJZAoDANh0Cp5EBT412NHYwNjM2TuS+Gq/EL7b4JHh5PPeBTaD9oGHCmwm43WdT4hPCAl3BOKToFoZG9RgPkKXCPAYqd7GEtI3CXyYqI07I3sXx+Xz+cDncZe87xZ1qEZHx+ZDexkQf3lIuCMQn0aw7eOkysG3j/cOeDPN+3ftyBniAaHL2sad9MbfmPaVRevavsNlLYjPHBLuCMSnUYvytPBJ/kiF4S4dPxRe0FuTm1TbN/XmUZPcn3glVb15HMQygIQ7AvFpMKfb72k8mvo4t6Pm3jt97IqyXnFD51tGZM/oa2q1Tb96IwzEcoOEOwLxycQ/NbYPf9d7oL8R30rl8kPnuLdesFIW62LmmfQx5oj4q0PCHYH4ZHiUcXPdBzmNwx9cEh+Hxb31mhd0U66OnsXEn3JLQsQnh4Q7AvEpUaf6PJydK1oG/uCrxLkDLWWOjm69U3+ROy4i/nBIuCMQnxqLNDiE+WOvFOdzMUP9RKSn/T8JEu4IBAKxDCHhjkAgEMsQEu4IBAKxDCHhjkAgEMsQEu4IBAKxDCHhjkAgEMsQEu4IBAKxDCHhjkAgEMsQEu4IBAKxDCHhvgQWBVual56UmBAdE5eESs4tLMfRl74dB6at1MTIpGPqvZ98wGNT08OfWrsnfpTbfFBwaGczo9SKrlffGu+uMjEwbcOQXnmH422uG5rz5z3R8WPisyrTQ41sA973yW58Ni07yt3SK+7ze3AQj1WZHmLs4E9+h0WmYkdS4qMTUrLHsMTB9qro2Pisggoikwdcek1RZmxS1izlTXd857GoKUGuTr5vu78Yn12XE21s4Ul84+3j3wuXSYr3dXQNygCA/FCHN9/jjMMgxXk7PA3JBICxpqz7jyxx738PBzadGONh6xme/iwUuU4AACAASURBVHurDACQEWRr7ZvyISX8EZBwXwKfTU/3vP9f/1rhjcrNy8k01ZLftkM4sXro1TEHK6N/+mZlVh/x1bfejMciu9w9vkFc472m4tJx/ejpV4eTpvtENn2v65X76lujDfErvl2R3Dj7amEpYT45dUss1GeAx0TZKv7w20nse383snw0ZTYcvv35hTvw0hxUf9p+YvYdFplNxRpd3vvfvx6eZHCnh2o2f/X/pNXd2HwA4MU66CjqP6Ww3lQKl0myuiO+/bjWW2eU73f/u3WHJt//rsVcKmFoaHzJN0wUhPeeewwAjTmxocllAMCl4IaHJ14dl0Mn6MkJ7rtoDACz/bUefuHv8s33EhYVp312r/iVx+895SLVmVGRaRUfUsIfAQn3pQ0U+3+/QWj4+S7wVOP4//y8r4/IAQAafmpo5Pl2Se4V3y2Y3UsAAOAzhwcHKcxn2xePywXgY6en5p5ViZ2eZLy45ZWHGRy8YMhlUmfxCw9EZhBnhtCj8y95fOAwqLMECgBwGCRXA2Udp3gcHkei0PgAfC6TQCLPPUpN45zoY9884POoJMIsjrDwVExmr/i+vSkNc18J7OGhQRLjlWTjcQGAjJ+lsl7eOfh8AB5ndnbhwb58JnlwaHh+d+bxeEw6hcbiAcDk6MjULIHL482vDfLztcHncQGAiJ2msWHuH/JCNbgjQ4N4Knt+FuPooWn88+cR87gAQMLP0tgv5BE633uXqCyWD2wWAzszQ2WwAYBBmh1CY+bHeeGTAgA+C43GFHrqiV1Qm2trEqZGR8Zn5t/HT42OTCx8C/L48NKnM49OmsWMLXomxosLy6YR0COjFNrCnVyYNDKZSqPTqDwAFoNGIBC4AAAc9NAgkcZZvIpIuFn6Eg1hHgY90pzotv/IhWk+AACdOP3CdsLjMWgUGnNhHc42xv34/dqyEQYABOie+e2YGg8AgBvm7lA1+Owwbgw9NENceM7f6KKX2f73Rc4/mvt/AjMyjSW8+pzVUTS6o8h7l8jZCRYAAGH6hZUJAGwGBUtceK709Bh6bIYIAFwmxcNQTcc6lEhhvFAih4oeGY10VDyqYL5QCJPiqqes7xCFxeFJZCofgMdlEYnPNvt4pzuLR56rIwk7iRmbYr74XFcekzIyMkKkMuaeIM9nkuY340hLlQvKNiw6CbdobczXdg6LisdgJhatAw56aJBA+3jHLH8AJNyX1p3n/f2GvR3P92v+WMW3//2FY3pPfU7gPQNLNyvdG/dtKHzgEzpEdu4tHGHRRho176r5+HjIySrUDMz0FEccOnzUJShc9dJRyUt3k5Pj7lw8JiKjiCYs7H5l4Y+37Tv1+IHSpvUb9N1RADDcWhEUEupmcf+KihFmesZVV176qqaXk4nADoGA3HbaeNPe1V+LXn5YXldtqnFFxyGRS8fZaF5WNYsCANVTwlbRDazphqty8gmFjQtfJOR2EcE9me0U5mSbtpqat6/XNVm5oh4sEdN68biYW1obbrjl0nFRLQtHA+VLeyUudU7OdzExs0OsJaWuWproCWxee/auJR2AjOkIDQrycbc9J3unoXvI30RJ+urNW3KnVR97ZKfERyehzLRUI/JbGVPtmmoaPr6eVy9dqxzCjnWXyIiLWT71M1ST2y8pG5uU8kjxkoDIyToMjUsafKRx19PX58Yl2ZR6NHBINvoa9l6+6jcu+2e2zA41Xjgmqm3l/EjxvOCRyz3TC1nQm+m269A1APAzU9U09xyZoQy31QQHhz211r54+9Esk1OZ4KGpZ+1m8fD2A2sqAGem18bksX9wqPyhzXsu6gJAkpfpI0sXq0fK961DAXjx7qZ6Fq6WD5Uf2kewWGRnneun5FS93Ez37Njtnly3eNtoyIkwt/eK8He4KKtg54fC9Dc+VFf38fG8InulbIBIHuvw8vSLjwjQUNedeN5AxqKbzosLqluEcwAGyxJ0jJ0nJ/sNNO56+3oryMnmdExO91WdPSr60NZV5+bpfcflB7GLGsOUcVdLY++AEM3zB9aKXqEBDLdWBAeHuZprXVY1wUzNuOhcO6WgKH/uhIpp2MJUfPKpHT8rOaYBQOBjuS++WFE9xQNSj7mFC4UHPOq4uY6Gk7eP6jW5oJx2PhtnoX3XxdtXVf5SQFYLAKR6qoteMgA+Jy3cLyYpyUhbOaCgfaFw5rSHzRNP/2AdBYlVu8/TgJ/qa65r4WKlp3LfJpxFwzloXzuvpKWvrrBuzXqrsBIAto+FjoWzt77qNdvwQvpUu9Da7w+eVi1rWThwxKObTI2Mg0KCTgiuOaHsyqFO6904pWwTQ55s2736WwnZ+6XVdWbqV3ScY9l0gpXGFQ3zAACIsr1x7KYNADfO6cHh80oUgK7KDN+gqEBn08fW3vNZTBrv9vH2TooLVVLWQ5OAPNo5txmfuXize5qOcrkvLH76oYb8+vWb7WMrgM/xsXho5uStp6Jg4Z8OAF3lSU+sXKND3GUvXDFzjRod7nisqe7l631d7lJGywSXPHb/ykl1i/B3DZc/CxLuS3sp3IHR/9u3X+o8zYiwN4wuHyJ1p//y85YWEgClS2Tn3tIJLro0WvPxUwDmhT0b9IJL6TMNm1auDK4aZVB6d6/6t1lcHYOBk9y+1ilnoVu8NERv/d5z6GlCU4rLP79aV9Y1oHf7ik9KZUsNauVXf3PL78+0u732gNwMmRZnel3w/AMAMLh0UMe3CAD8Dc8dum4LAPHWCgfkrABA4/whbSu/6FC//Lq+F5aE3C4iuCe3mzHRmKj6yBWAfU18o4pDFodJvbxvw8OgKg6DemrXmpvW0TQa+azgb6YR5c+n5PXkPP3m+/XZrRhMS/o3f/t7UGGbj8ldA9eEtpZ60Q3/vO2UlO2j98suqY7+gf6uiqP7hOMaJrgzA+39Y8OV0Wom7gCsq/vXaviWsmiTIptXmgQVM5jUMwK/3DAJpzMYSscFHnjk0wYLlbTNAPg60tsvm8cDefCushYJwFPjlOhVEzaDenLHamXHRBqNdEpgs1VM9fxi9Wa5Cx6STUtJ8Q1NwDMBuFjN62c8kspb6tLX/N/f3VJrwxx1wytGya1Jq9ds76dz3R/I3nNAAUCqnaLAaU0+gJm6UtkIszPF4detx0h8lsUDpeIRXk+i1eqdx2h8bryt/BqBc9NkWpLdjV3SizoouDgpgfXu5VMABIFffnTM6Bqujr9r4AXAvCi8/nFYbQPK/sBJDQZAW0Xx9KKWXbC+rNC5hwBQlxGeXDk405Wl9MAegKsoufWmRQqbTj66ZZW6ezqNjpfcsdEpuWl+wlBzJbkHHgDQFG22WeQylUbUunHWN72quTLpl//9u29Rb5Kd8tr957v6evte7OiIs5D/VfgGgTD11MZYfOcGbd+igaokz5giAKCjq5TUdagAboqHJFRd2PgOJRU9NoCd8qFDN2wBIN1TXfzyE+BgpQV2pnRg2TPdlZ0LQRxvf++8uh0A9GQ4bNh9mszjWGuqlAzTu9JdVv8mQeFyQnXO/Sp8YWQKm/FU43++396OGdJVvzdAheynipvFFQFAT+HwA5eMRZVlPLoqaRpaBgC+uucOXbPkc9nOt48eVnYEgPuXxfU88wDA5+GVYzfMACDS7PbhS/oAEG174+h1SwB+VYzN+p0nOADWd07dNosF4NaUlc+3pNrT7XYdu0ziQHttHY5Cc3x429Atoa2l/uC6L9Xc09M8dfccvj6JJxf4Pfznit1dQ8N6Wmo9dMhzVPztyG0AUBDbbILqBOBLbPrZILRypjNb+YEdAE9Vats14zg+l2V6W1xKxWXpKPl0kHBf2sst98mq7/72hW1yN9BmYkMCvJyfbNu2v5HwLNxz+skA/OqcpNDwIGmhHUbhZcBCHxIULJkEANzZgzsjWvAAcOvITgvUwk5bEKBz4LwhAADgT+7bbe3yVPq0dHJJY01NbVNr+yyZled+7/D1JwBQ5at34Kw6AOhfEJ4L94AnclLKLgCQ6HDn8A0HANC7Lrniu6/PaDq9vCTkdhHBPamNWACoK0gJDw04fWjXfecMALh/WuhRcCUAKEoesE1pBoC7J8X0/XPmJ52qj9hx4PQ0DwDg7vE9aoaON66ecI4uqa2paWxuGZslF/kbH5J9Fnyp7nqrfvpRTs1knMwBgOq8xJCQ4LPCWx/4lQIwzovtCy0eBgAVaVGbqAoAMFaQUrWIBIC28ozg0LDrxwQUzKMAYKi1LCgs9J7cCSlFcwC4fXSfc1YHACifEDEOLpiv21BhwIZVK3/6VbBilAsA7OEqyf1CcWVNNTW1zS2tUwQqizQRExroa2+4U/Bw2yD6+I6NgSXjAFATYChyTo0HQBrvCw0MdDBS37lfZgaAPNEXEhTsoq+4XeQcFaAgQOewrAEAVEUbCEqpLRyP88i3jwvd98wj4wfE9+xJbBgHgOpcVHiov5TITkO/Ug4VfUXst583CPmlLnwVAQBzvGbXph3FnYNRgX5jVD4ANBanh4UGnT8qcNcmGQDkJfZ5FPYDwM0jByyj579iKef3bjSOaAKAoWxvYekbwz2NUiIHkqrmlrQNS2Wmuzw4dsPw1W2Y3Je7cc0GAwu7tIquHE/N3w6ccnByaRx5tk33NxYFhoZrXhCVUnMAgIHG4qCQUBVZ8dMqTgCQ7qkuetEAAJJctVb++OO1exbT5PkvKvpVsc0GfkUAMF4XtEP4DJYHlMmB0MBAB+N7O/adJAFkWN+WUrMCACB2bvnl55hWIhHTERgQ+kTrwr6TGgCge03igcvCOUz+TN2OtetzuogAkOimcljeHACiDa9Iq7sAgKas2Fy4++nfPK1iAwDRVmoyCibwLNwtAKCvMGTPgVMEgJHa1J3rVu4+KlfaPTlfPpc6qnJa8KdVWx0iiwFmzp444BxdOrcZj8+SQs2UzivbAACwBwTXrUlux+IxnYHBYRaq5/ed0QAAPVmxGxaxZNK09H6BwMI+AGguSQ8LDbokuUfJPBYAfB5fOqv+9NWP4NNCwn1pgyUBP2wUGnzea+eve/ZfayWmWcxHV084JbUBvfvAbuFWCgCjT2z3vjocVESaSV3RBwD9ixJGERXAxRwSFCyeAAD8WeGdEc04ALh9dLdd5sKxbZ6vltBZAwAADuaEiAiqsEBs+/rwqkkAAOrEwDSlyOuBhIIJAFT76YlcegAA2qeFDEJqAMDH8PzJux4AEGt1/chNFwC4f1lS19Reev82i8hyWIzeLbZPsBTNb0ywOyKrzQcwvXNMyzkLAB6c2WcQXgsASpIHbFCNAHBXRtwkdOGpbxO1odv3ycx18t47JWwbkakotUvbay5hab2jE4WB5ofk7gMAj0nCkxjT3eXSu9ecvu9VHO8qJf8QAEyviD3wrwBgXRDbF1I0BAAqJ0VtIisAwPi6tL5XVn9ppMSpmywAP81TdxzSKUMFhw6dnuFCjpv2idtmAHDn6D6njDYAUJYStYgsm6/bUL63qJSCg4HKTgn5WS4AtU9o3c8BpeMAAHTccH+b5uUTDmkdQGwRET7cNTYlufYbveBqAGgIeSwm+xBYWLlj4sltBEpH6j6xC7PU6WvHxZO6KYymOAHRM0yAoqCHEpf0AaAq2mD/6RdOLdanB943sMvKTM2vbgeAwkDjY9f0AUBfQcLAO59KpTCYbJS/ybdfr0quf+E0oK3qya3CUlHZ9QBQG+9w6Jw6D8DurrSqTQoAKEjsc8/vBYCbx4TtE2ufT0S7tGPF5SdxADBe4LfvxE3CzNC+9avCa2YAAMgTmBlilvsjyZtLng9k3T268W+/7B+gA2e88uf//uKohuvctxS6KkH86DkcD7Ls7px96DfbliV+5AKRB0mOd2SUnQAgy1fz0GVj4LGpZOpEW/HRLatk1B3ni70puuq0biAAYJvCdoldJlEnFaQkkprx1K6MvftP0gBSLW6eULEEACC0HdwjklNWfEHyeAOW15djd+CkBgDclxXV8yqA573kfFzrpu//zzWnDwBSnqoevW4FADGPr57ScgcAtXPCRoHlAOD18NoZdScAiDS7ffKmGQDEO94+fssGAAaKQvcePIcHmMGR2YxpG3Wp7zZLjlCffSmT8FM0Njs3xu3n736MLq2/I7lD27twbvcYGB31N75zTskGAABbJ7z/SFFV+TnJY/V43lCK3YFTKgDQVxp7T8csMzs9q7QBAOoTHA+dVeMCOGmeVDSPAwAfI9kLml5LfQSfEhLuS+AwyMmu6l/8/fvgnOrq6mInI/W9wkez2ycBKKeFVp9SMYv1s/n2//5lFVsx3ZP/y3c/RDeMZ7qrfr9ePCw2UXLrSpFrBs0VqDU//RRcNYabatq24huLxCbCLEZ03XcqLqmc543AugTLtdsOVzQ2JXqb3zP25gEE6sv+/d8/KyreUVLX7ZnBB2rLrNl3dRZPiDSUW7lDBkdjOygf2X7oSk3/ZHGk5eqNBwIiE1VP71wpKNs72H9q10oVp7TeIr//+q9/PU0qozKffS/hevNWf/9tUOlIic/979fuC42JkxZcLXDy3vDoyJkdK6+YxuKxU+Lrf7zjiCLgpqW2/SJrFDR/VnW6MeaXVWsTq3o7KhPl5JTGGfyqSPO///1LuVtKdxTVSrtGos1v/LTt6AiOyqMO3pJXqukdTfczumsenOal99M6kbCYeOmdKwQv6vcPNAqt/cEouISIm5bcsvKWRRSRgFUQ3XThkW9FvNMPP20JiIiTF9+w7YRGSbrPyhW/ugZG6sge+nHLkaqGevFNK9WephNwU8d+W3XNNOxZ3XjsXM/7360RHcNOy+39XvDCA/QMMeTJ9f/958+3lRQV7xq0D/TJCa0/o24W72P23T+/dkmqjrRX/Xrl1vCEDJvbkt+sP9zWXbd/0wo1Uy8/y3tff7s2MDF+/7pf7lp6B5gr//PrlfHlrX4GF9bsvTCDI0RbXPlpy/FJ4nx3P9fytsyRs9d0Hxk4uHg2DWOzXdR+2CASFht/bPfKwwoGYb72DyyCJ6dGFM6fSakbW7xdjVWGr1i1tWmGCwBFPtrf/rI7OCru7MF1OyRVe3rbDq5foeWbj8dOiq1fcccujv38UygIefzPb1b5RCX5P77x5b83Vg/jA4yu/eOrVYqKikrq+gNTeF/tM6v2nh4nUOEVme6aopd0+QAAzNuS+56EV84N7873//7fq9yDou+fF/r1gGy8v82qn9d4BUfdPb9vxdbjXaO4AP0za/ZfnRkf1FS41TA0hnJ+dEfPbb7Yiljbf331k1tYQqit4j++3ZhdnCeyZaXqE09/K80v//ljXF1/hqPGBsHTPQMDiR6PVc2C8UPVG3/4t5F7kM2D8//8cXt174Sz5pmtIueKGvqfLyXXVfPMD+uEY1OyHsju/WHnafQMwUb+4G+S9yhsvpWi5PZDl6p7ZsojLH7dtD8oMu6OzN6VAmdGsCQntcMbxW4SyPSS4Mf/XrlziEBxM9JyT6iZaM+QOnUD/fzqmeYM19t69uNTk1ryMlG1o40JNn//25dyt5Vu31Gp6BnP89Pftv90Q1NzsM1DEy8UfrR+3TffGnsGO9w7+6+ftlf0jPnrXReTvqSjq2/n9LSqe7Iq5PH3v+wMioq7ILr+t0M3R2bwRlcFd568v8SlCp8UEu5LYFNxFQVZKBQKhUpOTk5KyykiPD+/NdZV5enhUd/WnY2Kre7ETA+1o5JR1W1DbDo+0s8rMa+qpaogKbO4r7MpOTm5vmNoYrgLhUquaOiaGu1PRSUXlDcuXITGpZWmx7g+9UBllz1PDkZ6uLvBY5PyjjEAVkVBJio1BzM5VV+Wh0JlTJCYxLHO4KCQISwDeNRITyfvqIz66oKkrKIR9EBWMiq7rJFMwmUlxSVkFM+fx58YaEehUBUt/RwGMTbAOy67vLW2OCGtcGYKk5mcnF/eODk2nJGMKqhsnhpHZ6Wgsorr5q/WmG6M3rxlr19kckxMXP/Es0ssarKjDfUNk4rbAHi1xZlJScn94wQAdn5aQnBYOCqjAM8EYOIj/bwTciubqwsSM4vH0H1pyaiS+o7pCXRmMiq3vGF6aiwvDZVWUEMhE1PDfcNTCjuayqOTsqgsVnFymE9Eand7Y1x8Sm9vV0ZKcmFVy9T4cGYyKruk/tnuw2M0VhSgkpIHJ3FD7ZXRUVHtQ9MAvKxIT33DJ8WtaAAY66j09PBs6OjKQsVUdowBQEaEh62zd2ZKSnxSBp7O6a3N9fD0b+/uQsVG9Yzj+uvyPDwC2rs7UXGxrf2Y+pIcVFo2ZmKqoSwPhUobmXn2dDoekxTiZmPv4mpva2Wkd++KkuE4gRjr752YW9lcXYjKKh1Bd4cHBUdEx1a3Dby8YbGIDfUtc2uXzyTGB3lHZ5S21ZXGp+aPofvTkpOLqtsmxwYzklG5ZY3MRRculaWEWNm7pKemxcUmYfAsAHZa6FODx08quscBmBX56UlJqYNThFe3ZPL0SEf/s8uHBjtbxnDPrwbhM3PjgvyiM7rb66JjU3BkckFisH90RldbXXRsygyJXF+cjUrNGpucKU2NCwmPSMkqwtNfuJKqKjPS0tYpLTMlKj5pDEftq8/38PRr7+5Kjo3qHidlONzdffQiKiUlLjmHyAYAqM2N9/SL7upqj42KGSGwKBPdwUHBvROLriHmUeL9HB2eBqRnJCRklmAJ2LK8dFRaHp7JJ452BAcFD84ygEeJ9HTyjUqvrSxJTCvCk0lV+Rmo9NwpHLm7vgSFSh6ewvU0lwcGBMfEJ/eNYefLpk71RoYFRERGl9Z3Pt+Mowz1DRMLmwEAmITshDA3d++M4rq5hazNiffwi+7ubouNjsXM4JICnG2cXB3srE0MdS5evz8wQ0oN841KK25vKI9F5eJJhNLsFFRmwSxl4XKJvwIk3BGvNVkdtGbbkVevkP9PNlgUcuCgVMc4gcNmD3dU+QRGYJFn170iSl9W7Kbpp67Fx4FrSTsgKFYzNMvlsEf7mnz9gseXuDj2rwgJd8RrsKm54fZHj53Nrv88f+j0x2CRxp+aaV+6dEnhtqqdR9gonvH2af7D0PCTjg9vnbmhMzD13j/u+wti02cD7AxkL126dkPR0tlvcHqJ7q+/JiTcEa/B41KpdB6XQ6XS3z7yfxg+h8Vk/aV/wPIJcdlMGoPFYTMW/6jqs8djMz63xUHCHYFAIJYhJNyXwKThc1MS6nswbx8VAPh0VERQXf8MkzqbmpTYgV7ivBYCgUD8yZBwX8LsSMu+X7/V9815+6gAwCeZP1BJrh2ZHS7b8N03Lum9bx4dhydwXrlNBwKBQHxcSLgvTfOMuFlI8UsD+dw3d7MSL4vvdk3rmXvB4yzcaun5P/zRpgxtEzcmH0l3BALxx0LCfUk87UvHbt0zuHf9jLScas8sDQB6G4v9vd3uqakmV/YSpgaN72s6OTnKX70cnJhmrKWZWT8KfMolsV1+JVNMTOU9zft5lfV5MZ5axs4ULq8a5XfPyGGaRNC7IPDdBpGYrLL3v0kqAoFAvAck3JfEv39eRPqWUX1txdWDq/fLW84ONSrfUW3u6gs3u/b/fhAamhg5ufOH0ypWyclJlTUFBzb+7IjqAqDLHRbySK5PDXYJSStjA4wVBa7bJIQGIDclrt+8q4/Lz3NWOXBWk0RjIE13BALxh0LCfUncu6fELEJLAGCkzH+rwFF/TzsZmTs52ZnpqUkRMWk0LuvuOVHLiLk7Q1EvS+51RnUCMBVP7l29epOB57M7Ik1VxAoKHR4BYHRmCQqJDAFU+twXv6z/6ZYLgUD8p0DCfUlcNRlR8+ACAMBUBR84di3a13KvxI259/gMCotJVD4jah0+9+wVgtwxQbfUbgDWLRnR67dVBHYJlw2QAGCqLHLPvqOzAPz+PMH9YmMAZe7qh64ZfbLFQiAQ/zGQcF8ST/3kXjldLxwO66Jzw9g/j4Xt3v7jP44qPPTxeWps54cn4c7s+eWOVRyXD2zGyMFNPxgGVdKpU8Jrf3LN6EmwuvbPNQfr+2dog4W/rVkbklOS5mn45Zc/Zg/M1IXrr95yqKipf7yv7omp5Qj5r3WnIQQCsWwg4b60oaaix3qPrOxdI1MK5y6RGajLunzu5Nmrqo1oInmyz97U2N43jswBLLrV6olxUHLxQFeDpYlxWHoVbqzdUPuBV0weE7hxHiZ3VB4kJyeZ6huWdU2xCYPG9zWjCtpwgxV3lO72EZBwRyAQfwgk3N8EuWQRgUB8ppBwRyAQiGUICXcEAoFYhpBwRyAQiGUICXcEAoFYhpBwRyAQiGUICXcEAoFYhpBwRyAQiGUICXcEAoFYhpBwRyAQiGUICXcEAoFYhpBwRyAQiGUICXcEAoFYhpBwRyAQiGUICXcEAoFYhpBwRyAQiGUICXcEAoFYhpBwRyAQiGUICXcEAoFYhpBwRyAQiGUICXcEAoFYhpBwRyAQiGUICXcEAoFYhpBwRyAQiGUICXcEAoFYhpBwRyAQiGUICfcPxqZ1dXSQmPxPXY8/CodO7OjoYvA+dT0QCMT7QML9w/C4HVXZGtfPyd+3pi3L+OOya/MTbl6UVjf353zquiAQiHeHhPuH4fMYLA7MNKuoaEwvy/DjcZgcPqk7V0nTkPGp64JAIN4dEu4fQWVmbGZFx3tNwsBhGtp6uEu/ye2oybGzfzqIY75vTThUfF1VaVFBQW5eQc/I7EvvTg+0paWmFBSXlBYXZmdlZuUWjoyNDWMwb+tR4uTGh5W2oN+3Mn80wuSgn4s9qrT9w4rh1hZnp2QVk9mfT8caj9ZQ10hmAw2HDvXziE0ve/WgcRbdmYJKyi6sekN/GnkGXdP4ftst4jOChPuHGuttrmzoeq8uGcJIq6eXX9fYy+H7HL83x3PNlv2DlNcVwOtsbpwis5d4g0EyuCKyZt+FxPgIyQNCTvGVC+9xydbaimYu/mZKp9bskoyPi5E/K4Oq7ilMSeibeVOjrnwSMgAAIABJREFUfKCtpq59aMm3Rnra+8ewb5j2D8VjTR4X2GAeVfcBZXD9Le5bB6YVJ3k9tPlM+p34tFAPx+yaXioB42H3RE9PZ9MP32o4JSweBdOar6qiU9vYkuRtoWXswXpNSRwWOS3Y1Su28E+oNeLPh4T7B2nLj1BSuWvh4Nk1RnrHSVi4nnt37pT3vikT0z115e65vP59rr+jdfUIbcn3Hl4SVXfNAQA3lf2/HFNdNF9MVUMbAFjdOnLVOBIAOlpqcQx+JcrLL6XqdXMqinVTUtO0dw/C4OmvvpsV7hFb9IaG80dsC/Nf+gsAjLHaE0eku177Ffh23Xk+AmLniQAwUSxy6BJm6TX611IcZq2o/xQAaMSp0RkyAKTZqx6Ufbh4nHQPrT3SOgDA6Eg/LH7+pU2NQsDR5xsG7GkV2QtZ7VN/Qs0RfzIk3JfEbStJeWxilVNUbGOg5RqeMx8pM0Ntpvq6Rd0zABxvO9OQpNz6+vq65nb6a3pYXsExVzyp7oACYGVGepjb+5QUpGvf00ir7ls890dyEgq6Ng6PH5i4hFOXSEheyFOnOswSacsjtB/Yui1ngEmf7BT97Rd976z5t/g8PgAAdeDgbxtCK8fmh5fGWt009J4fq6MiRc/AeoIJfHy3ualVcU1TfX19Y3vPEocJAHkxfkmlnUsuZ1tlTlhUbHyAl4tfxPyVRCPtJfp6xu2TbODiHMxN60bIr11Pi/Q3l4VGRCWFB9m7+hAWta7r4633SlwIDXRX09BtGcG/OiEO3eLp6ujq9nSOs6NDcGLOooMUjqbMnhsWsQAwWRu2deeRYeq7VOeTYmMvigt6ZvUuDKDOuJob5bdMLB4LN1C2d/UPGpaeAW62YZkLRzZ8LjnEycze1f2B6u3Q3Ja5gaFPrsncdfpzqo/4MyHhviR+a5rrP/7+fUJ1X1dB8K9rd7Xgn+UTnYRTk9l9xTgGANwNFP2y36/Dd7I+dv16gXYCAPD8tE//e/ORrqHRaFP5bceU51OLh2vbv3m9c0LlYFfJ9nXrIspH5icf7a51tLFycbaXO31Ky8jG3tY6LKlocfh3ZTzdtG2/hYWB9MmzPnG5r1ZgIN97/XaJ0UUJh3JSPqlsP/8SP9ZyYONqv/Ix4GHVr99omlriu4WBG/RxtXdycVGSv3j9rq6zg51rQMziEwQNab6KWhYTBMoTOcGjKk7zRVDwIzK7N5mElgPwDNVuxteOv3WNDVYm3FLWGZwmBurI7Dqltfg71FrpuMRV/aERtL6c2ElV+1enZdGIg/29/f0Dc/r6etFjU/MlcLAt23/9JbJuCgAKvXU27Jel/OV73cl9+evXbc5HP1/XHHqS5+PvvvpKwyH+pbo3oRz/54sv1h9VXvz9yZltvnT++jRA2OOze8/pzw2sjLb8dafU7Lu2ThCfDSTclxZrqSilaA4AhLakzVtF+ha1n9M9HskoPOGyKAkxcdOUl/tpiaMdFvp6evrP6Ok9svdNmO/0DH4kKyw7t1OxNM6LGASWAkC28939ZxdiqznZ6aCUEhcAACcjtiesdHS+cA6LgcNhcbgZDxvz/NZRLBZLIv//7d13XBNbuy/we8/nnHs/59y37ne/bndRd7P3Ati3XbF3bNhFsXewYAWVJkUiXZrSe5eOdAidEBJKKElISIWE9OS5f4CAylZR3Gj28/3LmVmzZmWMv5lZa2V8pSvB9sTaHabeVSmEX6eu6ufGHsD5/OaFu2/0XWOyZc6umz5911w2XGLintfJrgmKTJH3l3calULA53F5vFA3W++YHB6Xyxd2qF6WVAtqNi5fmlIvAoBj634jJJL77ut+fvPuu36KdmZAcHTXGGYnm2xx/XLPKbt8+ZI5wa87kuTsfeuW+uY0A8BNQ/3rT9J6K5K2rJmjE1HVDgA+Nw+tN+on3Hm00kcO9i9v3B3sHeyfhCT0XNfYxKe/jtOrEQIAmG7TXXuW0N8J+7y05HkN/3FcAfvlEI9GLZVK80Ksvvp6NJHd27XeRsm9ZHKnpCRv2aRvftt/p+9vMOiU4qdPn542XLrY4FrXmqq4R8NG6HadB6RNMNz7o+k4sH6JZ3ozADw6u3n7Jee+G0sCrZdt2BkWG19Y08+Np1ImptX13CzW1dZSmxhtPR3G57YtOWcXAwBSRt7SBSupUgAQ71yiaxte3FOD9bENx23CAaA599mKDftY/QyHaVytLPL76ZYRbtCb7JLRDMBZNHnMk6yWNwp0bpkz/k4QsXdFB3XW6J+8+zwcAIDtWcN9J+/GxMW2CH5vKK5bvO+jwLTXp1vkPbVYuuUUANQ8dxo3bWltu7rvBSL60YnlhqZx0VHVLYKuNWp5Z2NDXZ8zVttIb+261NWne89bagAAbaWREyboZDdKeqpqzPCYs3y3GACg4+DG5d6Z9W82T6NWyV+jUPbUwMh9MmP5jg4AEFbpTZwcW9H29g/7OeBWRP4wanQG/dVOMg1j829L8xm9j06+5nvWnHQFAEVD0piJk/Nauy8Ggpr0das3kdo6M70vLt1p1rWyNOLhd2MWNg14Zhb63GG496Oz8YXO5FlZDezCBB8Dw1M0wSuPrA3PXX4eOzG6uHngFavOH9piH0ECgKKAO9OX7WGxmQF2JsbXHHpDVM7etGgWIY7Eaqq+fflsdGG/01RUWUkJ9dxX/jmqldLCkPv/9Z/D4iq4AGB9ZPG45UZ0bu8wr0reWRpj/3//9/88y67vuctOdbs4Z73xa+OIXlcPTJu3pY7z7h7oyvz0ohr6aytT3M1+Hrc4Jinz/K5FoyYuz69t7nv6MvxMR0xYXtzwXklameA8auS0sNjUB2e2DBs5K7GE0pPNz+4cWb3/FpfDjnlifcvu6Qf8gEzGLj9y+FQdu83f8vxF62cD21ktvH3uoG9q73iDqKngyGGjclZvh1dJnKvR5Xt9z+2T+2fvPukdBQEJ46Lx/gF9kTRi2m9TJ3hnMwGgtTrLypZQTibH+dnfdXim0AC7IunIobOtUqhMcFm+4RCF0dpIjDlyxoQl1cS5mV99FMXIDx721fAn4bHXDy761y8LiuvbACDm0Snddaf7HVNBXzQM937k+N6etWhDSEREYFA4o/31zkgerSIps+jDava1ven9vBoArE5tWr33amR4aGhs2iu3x2pleX5qSFh4TGxcZQP7/WtWdvLig72dCK7Z5XUAwKWVPnrkVFDde0sua2cnhPo6EVxScktlagAAOadm7/bt6TW816oi5WcUkN68639fCmGLzS2zJxEvyCUpNg7uTOErn6+pOj+9sOZ965LyXCxv2vvE11fn2Tx0qmf1diBzmskRoaHhEVGpOcUf3FXeXF0cExUVl5Iz4EmQGtEji6sRebU9KzqZFdeumdVweq+4pIyg65YufR+vQl3vPQ7N6F2WsR/cNE0ltQ7oyO5XD556EAgA3PqiS6dO3rxnHZmU0xXN3Jrsa1fNmRIAgMLUiCd+fiFhUTS2GABSAwiWHrEAmjB36zt2TwpyUu3sCHVtnQCaG4c22oYT33JE9IXCcO/HBYOlZl457y43cE0lKYFx+aBuW6mrl0Ibyp98ykVcP4J1bO575yz6PCi41GuXTEpo/cwO+gC1BTFm9x5r55sz/vQw3F9HK01eOV/PJiSn37HEj6UUEQuLEv1tZ8/TT6tgvrv8J6JRluamE8kffnuOhlA7vSYqLr1d9rETXDp5zQnxiVwJRrt2wnB/nZDbxuULeDye8hNNjFPJ2SyWQMDnCd73d0+DT6NWqD77eX/obTQq1ceGskqJPe3aDMMdIYS0EIY7QghpIQx3hBDSQhjuCCGkhTDcEUJIC2G4I4SQFsJwRwghLYThjhBCWgjDHSGEtBCGO0IIaSEMd4QQ0kIY7gghpIUw3BFCSAthuCOEkBbCcEcIIS2E4Y4QQloIwx0hhLQQhjtCCGkhDHeEENJCGO4IIaSFMNwRQkgLYbgjhJAWwnBHCCEthOGOEEJaCMMdIYS0EIY7QghpIQx39MXTKKSiTvlQtwKhzwuGO/qyKSXCcG9H44MHQl+QhrotCH1GMNy1HIfRVFVZRSwqKK2iqF6uZDaSs15klVWSKsqIuTnZZZWUuurSpz6+5Q28IWyqkN1cXlZGLMgrLK6QqrtXNlEqM9IzS8srSoiFWS9elFbWNNMoAd6e2aSWrgJyMZfdLi5LcD95133Imo7Q5wfDXcsxKhMmjPjG6OYjqytHVm4/0SJSazpbThluuWfvsmvF9NlrD7m7PtTfsDctI1nnl18jKocy3PktJfN+Gr7l5D3CvQuLV++qblNoxA1Hdm174Oi65bdpC7cau7tYr9lwoKaBtGDiL4RESt99s+ND82uYQ9VyhD5DGO5aTtaYOXXCtHIxANB+/q//IKTQpFxKRnEDABjMnWARXgUA+Tmllel+yzYcUQ5tW0WUeRMnxtWrAeRTh/3lki9RyqrNK28C0GzQG++QSAOA/NwCBvnFyhWbmJqXe6kVpS8SwuPTGWyuSvP7lSP0J4PhruVSXC/qrDkBAMUh978dMS2vsQNADQDCqugxY2YUsxVdxXxvH1llcNqbcP+GjadA9l41S7hNoQH+sTGxHq5uVO4gjGeSom0nz9+iBKC98P7+u1+iy1u71reVBI4eq1vd3p3caZ5X5q058MzDzvS2HbNdoRQ22dy6cu+BpU9kBoY7Qj0w3LWb5qrBwkXbjl8/c2T7XqOYfGrPhpiHx6evNOqOdpDtWzJ551W3qrK8ZZN/vP40t2utUqGQ9SWXqzXd8SnjUM4ZHUoqpub7mX3761y6bBBi1enC5pkrdt0xPbl1+76gpOKe9UF39+tsOPuyE15jun3+qsO3SVWl2+dNNLof9PHHRUgrYbhrM007Zf60KdFFNUdXTDR2eN5ni+q4/rQjVuFdC511SXqzl1A6AACubplzxjkJAAAUIS5W589fuNjlwoULJrerWkQAAKB2uLj7pFUoACTYnd580nIw2srfNGeKW2rFXcMFGy959Nmg2L908plHid3t5pOX6emlNioAwMZ4854rHv3VhRDCcNdqdSnOk3XXywEKvEymLN7b26XOr5gxdlxkeffwaaKzib7hNQDQCEirFy3PbhACAIBG2inueIVIqdIAgLytctnseaUiAAl9lc4kh5hBmIPYToqZMn1hswqa0whjp69se/kkoGYXThs9IYna0bVIirWbv9ZIBQCqNgP9JSGFjI8/NEJaCcN9aGg0n7x7WCoSXNgw+ZdVp+QKlYJFHP3vf9nHlMpVGqVMHGl77P98NaaCJ9UAAKhMty84bhfVIeR4WV2x8k58Z80iWtb47372jM+McL32z7//4BqdI1ao37nXW8glIvvjK7+bvLZDroTOBt1RX112TZIq1AqpOMjc8L+Gz6wVSLtK2p/esv28k7hdGOlqccM+APvYB0gjlSneXkIhEYll/fxtymW9wyoKmRTP/OcPw31oqKVcL1uzw0anbW2tza2cGvmvDEhmhRFOnTd9YHHD+PhJK6sHp0+ciMqp67Ndo1a/O0xbyEX3bpvdc/Rq5kkAIOKJzT0HP65EKWytdbMzv3XXMqucqgYA0FRkJ/k+9Q+PjEzJLX/P1vs+NDt7zb6KVGRx83pqccNbWqNWq995IeM0kuwtbppbOlHoAgBIC3S+Y0mg82UCBtXF5s4tC9v8ivqukrVlWd7eT0NCI+LT8gZ2PdFo1Oo/dyJJOJHBwVSWsKEkzXjfjhX668Nzya+WUOcmBjk+dnN1so9M7R3zkLWzruxdc/gaoWeNgEHx9fFndKgAfcYw3IfM4xP6YxYfZrMYJ1ZPm7vzdk/waOSCR/fNs8rqAm7t+lFvK4vFcrUwC+sT7ur2pqfPQsVfRlIpogKfkpniwa30Az46m1IYEJUyuM34oshdzU3808mg7Aj19X6RW2h3Uv/fE9fw+sx+5ZQnrNXfylSCkk3UX7ksj9F9j69Wyh4c1V9heKtvdVWpT09defiFfAn/pDDc+6WRittbWZxOUXt1RYWwzzOoUt7ZymyVqTQAGhaT2Sl/9fZRrWQ01tdQKNRuFEptfYe03+njMqM1ejefFQGAo/GyUQuO9lSkkgoYvA4AOLVO56hVBADw27gSWZ+7pM4GGxvnL+VdKk8cbcoZQ99YdmW6g2fYULdiyFBT3JduPCYBAE33F0lYGr7nqGlHn+8vpyLul+9GxtcIFczc9Zu2k3m9XznvW0e2HrpJzEoMik59OVFWdW77cvvosj/sI6CBwnDvlyonxGHKZJ3HgTEWZ/es3HGW/7KjspVavG7+NMvwMgDF5b3rHaOIr+ynFCWG+Dg9dnF3d3d3d3dzdXF296lr6+e+VcEqmvrzT26JxcmhrgvmLAwvqH29BfyKmaNHh5Zx+65kNVIKComF6eHnzl15QSwpLChsYgkG8WMPIjGXQSwsKC3Ju3Hp3NOYF8Siwuq65qG4z1PU11QUEUvi/Z0v3rAsLi0tJJZw2t9vJr8WubNvybbLLj2LDEr+9tUrCNGlr5ZS+1sa/c8/f9hy4Fxx3Su/VX56z3jS9EU3rp2fNOrrNSesu06fv8W+udtNPmqwBX1KGO79K4u0/GH0nFqBCpg5v44cl8/pzaXHl7evNbIHgHB328Tixld2U8upVaXEV5TyxP3ctxYF3p26cKOj+Zkfx82r5vczxlUZafXrdH3uq72aFdnxzs6u7o4W27fvIXh4Oju75lTR+m0/kUiMjIyM+6NERkbW1NT0bQC7tsTT1fmJp8v+ndtuWBLcXJwjkvP67aMlkUiD2NTIyEgqldqnemlqTKCLq7v1zQs79ht7enq6ePjU0Nv7PWnaS7RV56ezjvEvF9VVeQkHNyz428iZxFd7zGry4/ZvW/P1X4ZZ+Wf2Xe91Y/+S7aYAwC/x/9c/v89oEAHAC58b303Sb8OO988Vhnv/zA+vO2UbAQClYfcmzzfg9/kGp7nfXGdo0kKrDopMef2LrezMiAsNeEVYI7fzzfpv71+67244yGqnj5+a2Sh5s4D10ZWrjtr03zglw8npydvbX1JSEhMTk/hHiYmJeTVSez1zdarhvK2p1dXV0dHRCe8pMTEx8W3bo6Oj+22JgJrr8iz27SdNewk2TPrh4uOkV1d2rtP75X5EVc8yqypp4/o9QgBiyL2//fOXVErvQ6HH9f2bDlsAACjrZ48bE1zcCgAFARbDf13SMvRdbqh/GO796WzatGxRRrMGVIKDaxfbhb/S91IT5Thllo5zSDJH/KE3LYqW+eN/9ilgAcDJ1VP3moe8UYKzaPwIu3jKm7sCgJpfY21N6PgyxrJkHvbWRFrHUDcDWkqS7TyCf2+rWtHZ2NjcdwagRMhporP7nuN2Tiud9bEvVuOz6EyOsHdZo2I0NQo7ex/dVDJRY2Nz36EcuVjQ2Mzo2/shaGMw2APqjlMeXTn54F1/ANCoVQplV2XCU/u3JVRzQaNobmyUqKAynqC3YFfXRzZctdQzpV4tETS2tAKA86XtKw3vAEBHRfjsBevqBCoAeO5yecy8HYM8Vo4GD4Z7P1oLA8aOmRqSnOb58JaVR9RrW5uy/Ndu3VfH/8C3bKml7ZGPTX/84WfP52UAkOdvMWb60qSS3j53hZgX7X5r1A8jbIIzxP1OSlZK6C3ML+RpWM2i00XSwWmsUsYP9nh4y8qNJRrwyZeJBAzW7z5BcCuiZsyak0vv7YtPdD6nt+6wqE8Z1yt7lu83H+hxX3P38Nrtl9x6lyVNq2fPdIztvX2mF4ZMmb64lNX7AUvCbGfN3dja5wbZ8dTmTcZWAzpulM3xJXvNAEDOKt+5ZvnVew6uj2z9orMBQNVWunDWlOBStlrWdufsUVvviOcxgfceugsUmuKg+7oLDToBSmMeL/xN3/2Jj/m1y8Fp3fNlHc5tNDTz+YCTgP4YGO798L97bKvxncrKqtpm9ptb5ZIOyUf8ZkejUrCYDB6Px+F1/xCUy25lcXt7gdVKWSuTwePx2W1cJQ5X9cGn15WWFltfPGQb+GJwa1bJ2slkikTZe6fewWXUvDoCzGU21jW1fuSBWE11NEafQXKNsp5C5nT0XlSUEiGZTO17NZS2s8mU+r7vROPQG+pb+vlmvoWMW31gx55SlhRAVVdFTElJr2152QyVlEomCyRdlxNFVSmxrIratdApYNVQaV1t4TFqU9MyG9u6r3eaDprRnr1FzaLXj4Q+Gxjur5OLmPo6o+8E4xyvz1RSkEd6efNQt+LLU1uQ8ND5GUc0CH3kCokw9qlr5IuKj68KfToY7q+jFKWa37oVllogwbvmzw+zrjybSP6T/9T0g7GbqI0s4bvLvYuIS6fQ8L9G+dxhuCMAANAoaTXlxRV1ANDBqi8sJX+G+cmtLzp7/IT5gwdRme/3mgSE/sQw3BEAAKhlie43xk9dSlcApyR0ub4he4j/WyYQMqgXDxo4ROQDgPPtM47BLxQSEZPJbGlpFklw/h1C74Dhjl6S1S/Smx5To1SyK9x8wqRD3SulVso9rxvM3noNABI8zO2epQ5xgxD6omC4ox6CnSuXekTmJoQH1fb3yoQ/XlWi68Jl+0SdwrCAIPbApz8i9GeG4Y56qE/qz9PfdbqsgTXULenWVhjx2/z5TgGRpVQcvkNoYDDcUQ+1863LT+KI7y74RxGTk3WnTgrKpw11QxD68mC4ox6f/n+HGiC5sLWyuu7d5RBCb8BwRwghLYThjhBCWgjDHSGEtBCGO0IIaSEMd4QQ0kIY7gghpIUw3BFCSAthuCOEkBbCcEcIIS2E4Y4QQloIwx0hhLQQhjtCCGkhDHeEENJCGO4IIaSFMNwRQkgLYbgjhJAWwnBHCCEthOGOEEJaCMMdIYS0EIY7QghpIQx3hBDSQhjuCCGkhTDcEUJIC2G4I4SQFsJwRwghLYThjhBCWgjDHSGEtBCGO0IIaaEvNdzpVS/OnzxVQBO8tl4lEWYmhnt5eXl6ej71D65p4Q9J836Hpioz9MT5K3Xt6gHup8iJ9Dh7xYKr+jTt+ngqSYLfw/N3nSXvVVpTnh5y5oxps2iA56EPJZ9y4rBRfpOou0ZFZ6S75bV7zsr32z3d3+a8xROVQuz70Ow2IeKDm4HQZ+tLDXd+bepPXw8PKma+vkGtyA+x+I///jshOs3v4fkR348Nyakbigb2S1Me6/T1d2MLOAPeM93L7Nuf57R8vuEuDbixe6TOZtF7ldaUxNh9+83YKuGHH1Ddyfb39aPx5d01KiUuJtvGzTbQvN/ulILnIfG5KmXnrR16M7fceHvhlgYK4+WBEPpSfJHhzqTVNtYTl83QDS15I9wBOOXh34waQxQBAGyb+t9ju//pKmvJpJa29q4yUqlU0tnOauMDAK+1iVrX2CGW9hSjt3WnjkImVarUgjY6kysCACGb3sLufVagUcmNTO7LJU0DhUxj8roW5FKJSq3mMJu5HbK+betsyNKdMaeIC0qZmElv4bV3AgAoRGRSNUfUHR9SAZtEqunsvQVV1lEo+bFPdHRXN6sAANjNdTV1zT2bhaxmUk3dy+IqiVShlIoam+hvxpysg0utreutWSEmk0ht7dLuRbW0jkqlt3KU6t5dNUq5TC7jc9jCTiUAcFrqyVRaz9bWplpKA73rz9UhljrLdnW8ckBNUz2V1sKSKVQvTxGJxuQDgLQ5Y86MxZVtokZaU88Fq5PPJFVTJKo+uzfU0tt6T7igtamaUt/33lyj6W1qTuD9RauPikT8xhZWz0oxl0EiU7rOrEopl8nkfA67Q6rs2hkAIu4fXLzXHAA6BFwGo5Xb1sYTdmgAZCIBhy/UAPAaCresXeOfQZEoPttLK0L9+OLCXR3mYmnu4OZmefHrf42IJfVzD8wkBn0zcnQuB1Tiplnf/K91V31BKQrx8Qh46r173apHYZnEWLfZ8+YfP3FwxYbDkdGRHr4hzwgWJubOUjHzotE+pydeB7dv9EysFLWSty2de/iitf3Nk9Omz7b1fGp95diUSTN8M2pB1WF2ar+1m9epvVse+L0AZbvZyUM2rl5n9mx5GJzTRitZvUDXyMTyqvG2ybNXl9J7E09YkzprxrwGgETCtf2nbtU0tXWya308PP28XdeuWB1T3FLzInC/8YUnLtbrth5pEGpAzra+Yerq9fTSnhWjpq0WgSbI1uT8bUdr02OHTBw0AKm+lkaX7rraXNl2xKxdIQu2PTNr4QZHB/tFMycdM/ft2+tRkx1lanY/PNh3s/6qi+bOpOKsk0aHn3h5bN2wOa6UAUqeh5NDdFzMZaODscT6rl06OU0Xd6/U37V/66qlZs7x5XkpPv4BVhcOGBjflshl3vcumN4jPLh44OhNVw1ARYDFrGW7ez+qqjPUyykwOvbOxZOPQ4pBLY186hng73Nws76Fb6q8rWjOhMnnTC7Mmzpm9sbjPBWUJ3ocOH7Vg3Bv0w7jRjGAss321hWf4PDbZ/cZ7D+ekFed5GdjfOWe84NL24/elGigPMFNZ+bcF7TeR4XsIKupU+aZXDo+/qdRB295aADqS9M9vJ65PzRds+N4OZV6Zf9qfYOjO1YvvmLvfe/0ji3G1gAQcsdwuZE9gOj0/m0O/knkytyNSxf65rQIGTVbly94kkUti7D86h//umj7tFnwfn1OCH0evrBwr0/3mrtsuxAAZDU6Y8aElbHeLNNaGjZs2PBbLr7WV47tMLrCEqlzg203GF4sJBabH1kyaoFhPTlnzPcjA/PrW5mMawfWbz3rogGorqxiNxZfunhbCZobBgv0ja3VSvnR5RO2mvio1JqbO2frGtxWqDSuF9YtPuQAUvrlMyY8AJezm+Zsv6IWNV26ZMoF8DyzRsfgmkoh267z48EHUSq1YvfcsSZ+uT1tE1LS5+rOcQ4McfP054hUAOBjcXS/iV1xMXH/wjHLj1gk+js7BWXKBeSJ34+IpXbE2Z3ceMoGAKhJhHHTVwo0qodVMfgcAAAVGUlEQVTXz6TTZNSIBz9M+I2vBr/7V4Jz6vnVsSO/G1cu0dRFWX3/iw6FL62Pf/TrtCXM3rtcldGKaWccnwPA3oU/HbKKpRfHX73rDJrOHXpjTxOSoKNq+nidF/U8UTOZ0tj9PKRWKWyN10xdc4zOZDRXpm3bsCU0Iz830uGrr76JJpLtbl0talGVBF//YaK+FKA66N4r4S5rWjF3/OMUilrcWkVhVyS5r9l+Ir+o+NHFjcOnradQ83XGTIitYou5lBnf/+WaV0aa3wOn6GIJmzhu5MjYBmClO/44ZS0A1EY8+Hb0wjapwvOuSURhE6c0ZMQPEyvFIGPmTvxp3PO69p4DZgVYjJu6kiGUNub4fvX34YnE6msHttoFphHzY3/9+p9W4aU+lzdMW3+eTqezOfwnNw1mb74CAOH3Di7afj7EzyssuQAAABS7Zo+5FVoBAIeXTLwaVgYdlfNm6WW3DNZXGKE/yBcW7u6Xt+ntMAEAkDetmDGr324ZJjFo+KjRCdUcvlDctcb20sZNZx0rykrKK0lNrZz2upy5s+YRBQAArZVp8yb+PFpnZXRhAwBUZcV5+voc2bB46zk7ADDZufAcIQ0A7M6tNzB5CgBBD/b/ttsCAOqK09y8vC8Yrlu2xwQAaktSXb38ruxduXj/HQAwWq1rEVIJAOfX6Z5zS+9pW0d9zvwJ3//9259cnlMBAEB9fp3eRUJoWUlxJYnMaOOpJbxwX3cvDyedidMTq+uPrph61iMFAGi5QbNmrWIBtNOr3d08CDdPTJqzhq4ClaDZz93F1dF88gTdUjGw011mLjaQAHBznk7XW07r7RNSPzyzea3xfQ6HtXvFLKuQYgDIjg309vPeOG/GeUIMAPjcMfpu2L93nXnAkfT2dXia7Nl4xgYA2ojeU39bn1dRWVJaRq1vFMnU3MYqNxdPu1uHJ83ZKnkz3AFSn97/+fthK3ecpAvlAdb7Vxw2rywrLauoamS0tdUkzZ62kCICALA+tmqN8UPQiEJ83bydH86cPCWGouwgx86cOju/kZ3hfm3BhuMiACmnwdfNxcXu1uRJc8o6AETkeVNmPq/tDfd039sLVxkBAIBk89ypN+wfrfttTUR2eXFxaQ21vl0s87pqsPGsc1fh0IdGiwyuA0Cc/alvh383XndDW/eHFu9bOPl+VBUAGOvPvBVVAfzSOTN0MmnvOVKL0OfiCwv3QPO9/5q4RgEA0LZs2vTwCvabZXiVEd+MHFPYZ5qM353dYxcd7PpzZUU5g5q/QGdusQAA1M1MLoDE/cau4RNXR4W4LV62Qw7w9NreTWfsAODKroVnCekA4HB+g4HJMwAItjyw+rhLR2PabL0VXIA0wqXVh++0UjLnzl3OBsgmnFq09xYAHFutYx5cCQAX1uuZ+OT0tKSzIWvRb8sJLtbjxs3KaxIBgNl2nWVGtl1ba6uI149uNL4XDqDU15mVRKWfXT1x6fFHAMAuCpk1e0ObmL3tN92Q6k5NVfj0eeuFKsmpTQuswqpAUas3RbdcCpwXbjMXbZcA8HOfzZyrz+jTS9xMjD9z4Wp0QmJyVikAJHuYLt5yAQCuGyw9R4hVyTo4QllLefrsMd/uNnvWs5f31X0bz9oCQDs1fuS3PybVSQBAwKitKs7Y+Nu8uDqFqMJ3ypxNcgBqqKXuyr0v++9BI+GzBO0SZpXh/DErTtg897nx08zNXf0aNVUVNSWxOpPmNSgBAEz2LDNzj7c5s+0sIRGgfYXOtPDKTlB12N24QPANjYmJY4oBQLB31VyHWCqIK3WmzKkQA3RS5k+ZldbY2dPUlCdmc5cfBgDQ0FfNnx+RnrNi8s9WMSQAUAmaqU18/1u7N55z7Soc6Wi8ZNctAIi2NFp3+NbNw2sWGd5UAgBId80db51AA4B9iybdjSUDv1hnqk5B69u/mAh9dr6wcBfR8nVGfbX1rGVYiMvwv/7tuk96fX7I8nX7m7rv0UEtF6d4Xftf//n/HseXy1TdN2MdjQW6o/46Ya7+7l27nYIz6vJChn/9rWdmHYDG2vS4uUcSrTxu18FLceGE77//xcbZ22i17siZa8pqanbo/bL+rCtfwDm1ZrLethtcPu/+oUUTV52tLY0a9e33t+3dLu9Z8cPkpQHPnH/9btRtB/crhouHjV2UkZ+3YvwPB++Hc9uY6yZ9v9XUU9odsprKBJdh34zKbOLaHlz49fgV+dTmpoLQkX/57wVrtu3acyDhReFdo6UTl+71feY29t9/P2LpnxNB+O7rYeaPvVzuHv/bP0dHZ2Ysn/ij4SVLd4sT//hq5LOEDMMVk5cbXnrqcn/43/9xxz8t2c10+KgZpFZOkf/dYd+OzW7g9Zw67zvGM+asPH7i1BWzO9HZVYkeF4f9qPvY23/tjJ9nbjpTVZ6xe/fxcmqDk9lRU8eYrl1UEuGV7bPHLtrLEkoA5Ob7F//tm593GOw4cdWWVluxaMywA6a2TneO/PUfI0JySLEPT3z7y5zql2PRIKIe3LctsYSS6Hbt8E03Mb95+fhhP89cunPnrgdPEoRtVfMmjrMKSM5MeHb42GW2qNN085yZaw4983n067//etQqktuYu0hvquHho+cuXrZ55MXtYBssHKN/wNTX6c6wv/7DIjCLWRk/4uthzsnVPR+wLN553Hjd+KycEMLt87ed1QDhNkf/z1/+vW2Hwb5jF2sYzDs7Z49fcqStQw5qqeWxpT/P2dXa1ma5f+G45Wd4rZRJ//oPg4uPWO2ye0eWzdA/5Bvoozfin+svuEjbG5ZOGrHzvD2LwzQ9sPZBcG8nG0Kfsy8s3AGA11j2yM4uLC45Niae3NQmaKn08gttV3RvVctEZflZKSkp+cUkqbK3e0FIJz2ysXQNSFQAMKhlycnJxKo6AKCRivyf+odGxDVyRQCQGRsYEJtJo1bEJ6a3shhZqSlZBWVcHjsvIyUtq6CNyyFmpyenZ/HF0pL0KJ/QxMaGmtjYRIFYWpIW5Rv6nNZQE5+QXE+ry0xJySuuamO1ZKSkZOWXvZwBomkgEZOTk2saW3mM+oS4GCKJBgD0qmybB/cDnxcAgJTb+MzXO7+itiQ7OZNIBYCq7Bh7B0JCanpMTDK7XUIn5Xl7P6PSaCnxMXXsjnZGta+PdwW1IScloYRMo1QRU5JTGuis2ipiSnJybUv3gLNGJYn0Jti5eHm4Pn5oZWGw+2BBAzs59FlsZnFtZUFCWr5UJkqLjwwICkrJLumZ9KfsFOS/SElOymDyOwEA1J1Rvs6Wto9qWSIAqCvN8PYOrKXRkuLi6hicmoqClOSUhtaeyS2ygszYZwGBsclZ7VI1AHRy6pztrJy8IkQqAIBmSpG7i3NgeAJbrAYAEavuqY9PEamu8EVSbmVjS03ug/tWXl5ejg52Zw/ttHCPETKpvj7eVbW0rOS48noWu5GckpJSWt3Y56uhLM1KeOziFpOW//IjaLLjnt1/YFNUywa1ODcjJTklnSWUg1pCzE5Pyciht7KIORnJaVmcdhGZmBkTncAUSmX8RrfHTsl5pYXpSbllVA0ApSgtIiFLqVYkhvq+qGwGhL4EX164ow8gbsrWnawblktubxc2kEs83Z40CT7ridv3j61cf+ohW9Au4DHjQ32j0kqHukUIfWEw3P8UNEpJrI/dvt07dhkevGvrQmF2vHufIdVcmX3J+JCBwY7Tl69HZxA//JesCP1ZYbj/uajf8xecnweNGlMdoQ+E4Y4QQloIwx0hhLQQhjtCCGkhDHeEENJCGO4IIaSFMNwRQkgLYbgjhJAWwnBHCCEthOGOEEJaCMMdIYS0EIY7QghpIQx3hBDSQhjuCCGkhTDcEUJIC2G4I4SQFsJwRwghLYThjhBCWgjDHSGEtBCGO0IIaSEMd4QQ0kIY7gghpIUw3BFCSAthuCOEkBbCcEcIIS2E4Y4QQloIwx0hhLQQhrsWEnJZTU2N1JpqSn3zJz6UmlpZnJ6eUUlt5HK4Ion8Ex8OIfS+MNy1EJuWv2TG2P2mtm4Pb20zPEFmij/JUWqyz544av3YOzk11c/+it6SLWSu8lMcCCH0ATDctZCaU6o7eXIGHQDU80f9l5FjwqAfgkd9MXvC6Idhud3LYpr5XRuuetCPgxD6QBjuWqgwyHzKAgMxQHNx+IRfx4YWNg7yATQS42Vjfjv4oHeFWtnOb9cM8mEQQh8Ow10LWRmtnr5s9+2Lh8aMnRqS1zDo9fNIUX/7n7/5F7YNes0IocGC4a51pM0rZk1yT6O1tdbvWDRp5xWvQT9CWeCdv3w9qkww6BUjhAYNhru2oef6Tpm5kgUAAA8Ozvu3zuFB7y1pzHT777/8+wWjd41YyOuUqwb7OAihD4fhrlUUMsn9/YtnbDzH53OTAxx/+vZ7uyjiJzgM78CyiXqbz9S3CkQdHVWFGcGRSUIZhvtbaVSqd11mVaruc6hS4rwj9LEw3D8LlTmpeWUtH18Pk1pyx+T8DXNrZ2dns+s3YrKrP77Ofinbm++bHD926tzd+7b+4Ql8Mc5wfxteCykiNq1DqsyKcDc02Lz//H1Gx2vXws7YQK+H1pb3HX2EKhAwKQGBYVzp0LQWaQcM96EnainQmTTxWV7rW8q0VOVGPs99S4GPlxQZUkVvH9AuarlUrhzw/McOekVwZMpA9/pyyTg11y5fIbPE/PoiV3fv5KTYWaP+sffms75lwu0uHblG4PF4tw/q77nqDqApivO4ZOEiG6pGoy8fhnv/VApZe4dYIZc2NdBkfeJLrVK0t7d3PV8LBULFm10RakUbi0Gn0xkMBoPBoNPpdCZLpvz9B3KF0PHSnr99MzaL+bYn8fq8KEfv6A/+OO/Dx9EqjzawcP8wHQ3Zlo5+f8CBPhMupvtOWwUDgFzWfSvud+/4ZYe+f5v89bPGOkSXA0BzttcPv+jUigBAZrxllXsy+Y9vMNIOGO79UuWFEebMWewaHHP71O7Nh806XgYvk0LcsnSOYxwJQGF6cItzXOnru0q5ob7Odg6PCAQCgUB45OjwyM23Wfh7vRaatMgATzebeXrLSf3mqkbR3EAl11AS/AnXHzyuoVBIZGqHdDA7ZKUiHplEolLID8xM/J/n1VST6ptbP82vkTStTfWk6pr8RL/LZlZkCoVEIvNEWt71oO5oWDBlvG8us3tZoyqM99m0ZV9tR99SglVThh22jQOAjur44d+MzmlUAsDTazsW7bnxhzcZaQkM9/5VRNsMHzmtgi1TNWf+PHJsPqf31tvuzIZ1xo8AIMT5flRe3et7KqV15MqKispuFRWVpBqRrP+0rEwLuOcUQnxOmKy7ht1vYqvaowLc7R2czM4bbTU8SiA42T32rGV39lsbiURKTk5Of0NycnJ19e92vnNoJQT7hwSCk+G2TeduWjra2fpFpSv6KymXy7OystLS0t48RN9jkcm/d7OpzIj0s7VztLxxdtO2vU4EwkN7QmkD+/caph24lZEjRo7OpHdf3ZUSQZDzvQkj/rnqmFXfk5zgbPrjrzO8AyIIV3f/4yfdhk4NAGR4Xxw5fRV/KJqNtACGe/+sjm00uhcIAKRY24mzN3H6JG+Km9laQ1MWoy4gLFH+ZneLlBcT7OPVl18wvb2ftOxkUa6dP23r4nN179KJiw+/vXe1peS5e2DS29tcVFQUFBQU8YagoCAi8d1zZoLcHpUw3nYfLZVKY2Njw8LC3jxEj+Dg4OLi4rcfSEYvcnQLeWd7tAOj0Hf4qNF5ra9cuuk5niN+mU979RpdmhkXkZhyYNnkFUbWXWvyAm8Mn7igBV/qgD4Ihnt/JPStKxYl1SsBJMYbF5s/zeq7sTrSYebc+S7Biczf7Wx5D5oOP5dHJQ18AEi0MdbbeuHtxWuywu09Iz78cO/hib1lFpXzSQ/RhUvJeGDv87ubNWqpVKruc9VUq5RS2SunWimXyfsZ7ng7FY/L7Tv4oVZIuDxB3+SUioX89ldestbO54qkfS7MaiWXy1UMJG3FtMxff/wlrvaVavlV0Rv3nBMoQSkTc/nCnja15AfNmatfzJB0Laa4nRkzd1v/j2kIvQuGez/aSkPHjZ4anpHt43Dnpr3/aynSmOG7RH8Lif3hExlkwtaH5/ZuPnpLDSBqazi+TnfMfANKC+8tu4j4LFoL64OP+D5aaPUfNKNR01yVY2NtnVFGe88dFGJeHY3+e1ulTQUb9TfkN/U+Q5SG26/bdaFvOjqb7Dv1IHhArVRzSStmTA/I6X3NDuW52yxdfZqot4z3tb2r993ss1PH4eV6NzxSe5bF9Vnzp+qkkAfSU6IS7lw862FkFQDkhxPWbtnr6eVnc/9+1+nKfmYxY8levho6OC3Pw3xOnzz3gtTbT+V0etNOU/cBfUyEemC49yPU8uS6AyaFRcSKmn5euSXt4PE/bhhQKe2oIZHqmxkqAJmIV1tb11BXzxF+mbdoKjGxIPt5mNv2w+faBmOgVy1rLy0ube8zSiFqayqtoPS9XW6prSLTBnipU3YWF+SzhL2XZAmfkV9Y2nc0pLW+qoRU32cfVXVJQT2j9zULaqmwML+A3zmwh4bcQJsDF2wAQCJgJsVHxySmMfndf9ftLFpBcZUKgFFfnVtQ3N732trZcnj3nuw64YCOhVAPDPfXqaXcDXPG3wkuH+qGfCE0GgBQcUgOLn6d+FrI/skCnG3DM8rf/5qglHYkBLgGPS/8hI1C2g7D/TUaSmGSyflz/s/zJTiQ9Z7UsvzMDJZQ3hX0qB8aaXlJeft7z2HtYLdUkgf/dZ7oTwXDXdsoZWIKqYotEANAYy2ZwRW9c5cBUCtb6il1za0AIGQ3URqYAKpgwt0LV28RPP3Z4n6nUCKEhgCGu7YRtzWe3DB7x3UvACCY7DlnHTSYtctF/hZHpi3bI9YAJdlVf+sxMaiZLbRaKrW2iYFvDkPo84HhroUKQyxmLT0CALnRPlFZpEGunVOgM3lOKQ86afkErzB8eyFCnycMdy3UnBu8bOl2Ui05MCROOujd4MrWrQvmh+VXxQUH0vC9hQh9rjDctZC4OlVvwk9m7pGs/n4Z+9Ekh5dNXHv6blX9215jiRAaWhjuWkjWXHT04KEy5ieaOC+9f/6ge2LFp6kcITQ4MNy1kFo5oF/ID5BGrVDi0ClCnzsMd4QQ0kIY7gghpIUw3BFCSAthuCOEkBbCcEcIIS2E4Y4QQloIwx0hhLQQhjtCCGmh/w+NuFELORqrUgAAAABJRU5ErkJggg==


A, B, C, dan seterusnya disebut sebagai koefisien virial yang merupakan fungsitemperatur. Karena persamaan 3.8.b sama dengan persamaan 3.9, maka diperoleh:
A = R T, B = R T b, C = R T b2,

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