tag:blogger.com,1999:blog-71478499338238042812024-03-07T22:07:31.718-08:00BELAJAR BERSAMA KIKI DAN NILAAnonymoushttp://www.blogger.com/profile/02733760319647747668noreply@blogger.comBlogger32125tag:blogger.com,1999:blog-7147849933823804281.post-62559199440518829492013-06-03T03:20:00.002-07:002013-06-17T11:36:45.271-07:00MEDAN LISTRIK<div class="separator" style="clear: both; text-align: center;"></div><div class="separator" style="clear: both; text-align: center;"></div><div class="separator" style="clear: both; text-align: center;"></div><div class="separator" style="clear: both; text-align: center;"></div><div class="separator" style="clear: both; text-align: center;"></div><div class="separator" style="clear: both; text-align: center;"></div><div class="separator" style="clear: both; text-align: center;"></div><div class="separator" style="clear: both; text-align: center;"></div><div class="separator" style="clear: both; text-align: center;"></div><div class="separator" style="clear: both; text-align: center;"></div><div class="separator" style="clear: both; text-align: center;"></div><div class="separator" style="clear: both; text-align: center;"></div><div class="separator" style="clear: both; text-align: center;"></div><div class="separator" style="clear: both; text-align: center;"></div><div class="separator" style="clear: both; text-align: center;"></div><a href="https://www.blogger.com/blogger.g?blogID=7147849933823804281" imageanchor="1" style="clear: left; float: left; margin-bottom: 1em; margin-right: 1em;"></a> MEDAN LISTRIK<br /><div class="separator" style="clear: both; text-align: center;"><a href="https://www.blogger.com/blogger.g?blogID=7147849933823804281" imageanchor="1" style="margin-left: 1em; margin-right: 1em;"></a></div>Gaya Coulomb di sekitar suatu muatan listrik akan membentuk medan listrik. Dalam membahas medan listrik, digunakan pengertian kuat medan. Untuk medan gaya Coulomb, kuat medan listrik adalah vektor gaya Coulomb yang bekerja pada satu satuan muatan yang kita letakkan pada suatu titik dalam medan gaya ini, dan dinyatakan dengan E( r ).<br /><br /><br />Muatan yang menghasilkan medan listrik disebut muatan sumber. Misalkan muatan sumber berupa muatan titik q. Kuat medan listrik yang dinyatakan dengan pada suatu vektor posisi terhadap muatan sumber tsb, adalah medan pada satu satuan muatan uji. Bila kita gunakan muatan uji sebesar q’ 0 pada vektor posisi relatif terhadap muatan sumber, kuat medan harus sama dengan <br /><br /><br /><img alt="" src="data:image/png;base64,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" />Anonymoushttp://www.blogger.com/profile/02733760319647747668noreply@blogger.com0tag:blogger.com,1999:blog-7147849933823804281.post-91294907317356974252013-06-03T03:20:00.001-07:002013-06-03T03:20:43.709-07:00MEDAN LISTRIK<div class="separator" style="clear: both; text-align: center;">
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Gaya Coulomb di sekitar suatu muatan listrik akan membentuk medan listrik. Dalam membahas medan listrik, digunakan pengertian kuat medan. Untuk medan gaya Coulomb, kuat medan listrik adalah vektor gaya Coulomb yang bekerja pada satu satuan muatan yang kita letakkan pada suatu titik dalam medan gaya ini, dan dinyatakan dengan E( r ).<br /><br /><br />Muatan yang menghasilkan medan listrik disebut muatan sumber. Misalkan muatan sumber berupa muatan titik q. Kuat medan listrik yang dinyatakan dengan pada suatu vektor posisi terhadap muatan sumber tsb, adalah medan pada satu satuan muatan uji. Bila kita gunakan muatan uji sebesar q’ 0 pada vektor posisi relatif terhadap muatan sumber, kuat medan harus sama dengan <br />
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<br /><img alt="" src="data:image/png;base64,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" />Anonymoushttp://www.blogger.com/profile/02733760319647747668noreply@blogger.com0tag:blogger.com,1999:blog-7147849933823804281.post-28328271041655845822013-06-03T03:18:00.001-07:002013-06-17T11:36:45.277-07:00MEDAN MAGNET DAN MUATAN BERGERAKMEDAN MAGNET DAN MUATAN BERGERAK<br /><div class="separator" style="clear: both; text-align: center;"><a href="https://www.blogger.com/blogger.g?blogID=7147849933823804281" imageanchor="1" style="margin-left: 1em; margin-right: 1em;"></a></div>Apabila seutas kawat menyalurkan arus dalam medan magnetik. Terdapat gaya pada kawat tersebut yang sama dengan penjumlahan gaya magnetik pada partikel bermuatan yang geraknya menghasilkan arus. Misalkan sepotong kawat yang berpenampang A dan panjang l yang menyalurkan arus, jika kawat ini berada dalam medan magnetik B, gaya magnetik pada setiap muatan adalah qvd x B, dengan vd merupakan kecepatan drift pembawa muatan. Jumlah muatan dakam potongan kawat ini merupakan jumlah n per satuan volume A.l.<br /><br /><img alt="" src="data:image/png;base64,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" /><br /><br />Arus i didalam sebuah kawat logam diangkut oleh elektron-elektron bebas (hantaran), n adalah banyaknya elektron per satuan volume kawat. Besarnya gaya rata-rata pada sebuah elektron karena θ =900, seperti pada persamaan.<br /><br /> <img alt="" src="data:image/png;base64,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" /><br /><br /><br /><br /><br />Anonymoushttp://www.blogger.com/profile/02733760319647747668noreply@blogger.com0tag:blogger.com,1999:blog-7147849933823804281.post-88519798214745275792013-06-03T03:18:00.000-07:002013-06-03T03:18:33.751-07:00MEDAN MAGNET DAN MUATAN BERGERAKMEDAN MAGNET DAN MUATAN BERGERAK<br />
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Apabila seutas kawat menyalurkan arus dalam medan magnetik. Terdapat gaya pada kawat tersebut yang sama dengan penjumlahan gaya magnetik pada partikel bermuatan yang geraknya menghasilkan arus. Misalkan sepotong kawat yang berpenampang A dan panjang l yang menyalurkan arus, jika kawat ini berada dalam medan magnetik B, gaya magnetik pada setiap muatan adalah qvd x B, dengan vd merupakan kecepatan drift pembawa muatan. Jumlah muatan dakam potongan kawat ini merupakan jumlah n per satuan volume A.l.<br /><br /><img alt="" 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" /><br />
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Arus i didalam sebuah kawat logam diangkut oleh elektron-elektron bebas (hantaran), n adalah banyaknya elektron per satuan volume kawat. Besarnya gaya rata-rata pada sebuah elektron karena θ =900, seperti pada persamaan.<br />
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<img alt="" src="data:image/png;base64,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" /><br />
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<br />Anonymoushttp://www.blogger.com/profile/02733760319647747668noreply@blogger.com0tag:blogger.com,1999:blog-7147849933823804281.post-79670973085173532452013-06-03T03:13:00.003-07:002013-06-17T11:36:45.286-07:00 GAYA LORENTZGAYA LORENTZ<br /><div class="separator" style="clear: both; text-align: center;"><a href="https://www.blogger.com/blogger.g?blogID=7147849933823804281" imageanchor="1" style="margin-left: 1em; margin-right: 1em;"></a></div>Percobaan-percobaan dengan berbagai macam muatan yang bergerak dengan kecepatan berbeda pada titik tersebut, yang memberikan hasil-hasil untuk gaya magnetik sebagai berikut:<br />1. gaya sebanding dengan muatan q, gaya pada muatan negatif memiliki arah yang berlawanan dengan arah gaya pada muatan positif yang bergerak dengan kecepatan yang sama,<br />2. Gaya tersebut sebanding dengan kecepatan v,<br />3. Gaya tersebut tegak lurus terhadap arah medan magnetik maupun kecepatannya.<br />Hasil percobaan ini dapat dirangkum sebagai berikut, jika suatu muatan q bergerak dengan kecepatan v dalam medan magnetik B gaya magnetik F pada muatan ialah:<br /><br /><img alt="" src="data:image/png;base64,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" />Jika sebuah muatan uji positif qo dengan kecepan v melalui sebuah titik p dan jika sebuah gaya f bekerja pada muatan yang bergerak, maka sebuah medan magnet B ada di titik p, dimana B adalah vektor yang memenuhi hubungan<br /><img alt="" src="data:image/png;base64,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" />Anonymoushttp://www.blogger.com/profile/02733760319647747668noreply@blogger.com0tag:blogger.com,1999:blog-7147849933823804281.post-47737750501382343432013-06-03T03:13:00.002-07:002013-06-03T03:13:50.010-07:00 GAYA LORENTZGAYA LORENTZ<br />
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Percobaan-percobaan dengan berbagai macam muatan yang bergerak dengan kecepatan berbeda pada titik tersebut, yang memberikan hasil-hasil untuk gaya magnetik sebagai berikut:<br />1. gaya sebanding dengan muatan q, gaya pada muatan negatif memiliki arah yang berlawanan dengan arah gaya pada muatan positif yang bergerak dengan kecepatan yang sama,<br />2. Gaya tersebut sebanding dengan kecepatan v,<br />3. Gaya tersebut tegak lurus terhadap arah medan magnetik maupun kecepatannya.<br />Hasil percobaan ini dapat dirangkum sebagai berikut, jika suatu muatan q bergerak dengan kecepatan v dalam medan magnetik B gaya magnetik F pada muatan ialah:<br />
<br /><img alt="" src="data:image/png;base64,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" />Jika sebuah muatan uji positif qo dengan kecepan v melalui sebuah titik p dan jika sebuah gaya f bekerja pada muatan yang bergerak, maka sebuah medan magnet B ada di titik p, dimana B adalah vektor yang memenuhi hubungan<br />
<img alt="" src="data:image/png;base64,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" />Anonymoushttp://www.blogger.com/profile/02733760319647747668noreply@blogger.com0tag:blogger.com,1999:blog-7147849933823804281.post-20202553491408139412013-06-03T03:11:00.002-07:002013-06-17T11:36:45.291-07:00FLUK MAGNETIKFLUK MAGNETIK<br />Fluks magnetik yang memotong suatu bidang adalah perkalian skala induksi magnetik dengan luas bidang yang tegak lurus pada induksi magnetik tersebut.<br /><br /><a href="https://www.blogger.com/blogger.g?blogID=7147849933823804281" imageanchor="1" style="clear: right; float: right; margin-bottom: 1em; margin-left: 1em;"></a><img alt="" src="data:image/png;base64,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" />Anonymoushttp://www.blogger.com/profile/02733760319647747668noreply@blogger.com0tag:blogger.com,1999:blog-7147849933823804281.post-91050622824619879962013-06-03T03:11:00.001-07:002013-06-03T03:11:34.398-07:00FLUK MAGNETIKFLUK MAGNETIK<br />
Fluks magnetik yang memotong suatu bidang adalah perkalian skala induksi magnetik dengan luas bidang yang tegak lurus pada induksi magnetik tersebut.<br />
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<a href="https://www.blogger.com/blogger.g?blogID=7147849933823804281" imageanchor="1" style="clear: right; float: right; margin-bottom: 1em; margin-left: 1em;"></a><img alt="" src="data:image/png;base64,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" />Anonymoushttp://www.blogger.com/profile/02733760319647747668noreply@blogger.com0tag:blogger.com,1999:blog-7147849933823804281.post-87733788404112989742013-06-03T03:07:00.002-07:002013-06-17T11:36:45.296-07:00HUKUM FARADAYHUKUM FARADAY<br /><a href="https://www.blogger.com/blogger.g?blogID=7147849933823804281" imageanchor="1" style="clear: right; float: right; margin-bottom: 1em; margin-left: 1em;"></a><img alt="" src="data:image/png;base64,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" />Anonymoushttp://www.blogger.com/profile/02733760319647747668noreply@blogger.com0tag:blogger.com,1999:blog-7147849933823804281.post-78690844703916407402013-06-03T03:07:00.001-07:002013-06-03T03:07:30.741-07:00HUKUM FARADAYHUKUM FARADAY<br />
<a href="https://www.blogger.com/blogger.g?blogID=7147849933823804281" imageanchor="1" style="clear: right; float: right; margin-bottom: 1em; margin-left: 1em;"></a><img alt="" src="data:image/png;base64,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" />Anonymoushttp://www.blogger.com/profile/02733760319647747668noreply@blogger.com0tag:blogger.com,1999:blog-7147849933823804281.post-14889646857016049732013-06-03T03:04:00.001-07:002013-06-17T11:36:45.301-07:00HUKUM BIOT-SAVARTHUKUM BIOT-SAVART<br />Medan magnet dB yang dihasilkan oleh elemen arus l dl dengan menggantikan qv dengan elemen arus l dl, diperoleh :<br /><br /><br /><a href="https://www.blogger.com/blogger.g?blogID=7147849933823804281" imageanchor="1" style="clear: right; float: right; margin-bottom: 1em; margin-left: 1em;"></a><img alt="" src="data:image/png;base64,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" /><br /> persamaan diatas dikenal dengan hukum Biot- savart<br /> dimana r adalah vektor pergeseran dari elemen ke p, θ adalah sudut diantara vektor ini dan dl, arah dB adalah arah vektor dl x r.<br /> Hukum biot-savart dapat dituliskan dalam bentuk vektor yaitu :<br /><img alt="" src="data:image/png;base64,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" />Anonymoushttp://www.blogger.com/profile/02733760319647747668noreply@blogger.com0tag:blogger.com,1999:blog-7147849933823804281.post-62881691600549470122013-06-03T03:04:00.000-07:002013-06-03T03:04:09.961-07:00HUKUM BIOT-SAVARTHUKUM BIOT-SAVART<br />
Medan magnet dB yang dihasilkan oleh elemen arus l dl dengan menggantikan qv dengan elemen arus l dl, diperoleh :<br />
<br />
<br />
<a href="https://www.blogger.com/blogger.g?blogID=7147849933823804281" imageanchor="1" style="clear: right; float: right; margin-bottom: 1em; margin-left: 1em;"></a><img alt="" src="data:image/png;base64,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" /><br />
persamaan diatas dikenal dengan hukum Biot- savart<br /> dimana r adalah vektor pergeseran dari elemen ke p, θ adalah sudut diantara vektor ini dan dl, arah dB adalah arah vektor dl x r.<br /> Hukum biot-savart dapat dituliskan dalam bentuk vektor yaitu :<br />
<img alt="" src="data:image/png;base64,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" />Anonymoushttp://www.blogger.com/profile/02733760319647747668noreply@blogger.com0tag:blogger.com,1999:blog-7147849933823804281.post-73503085321386052992013-06-03T03:00:00.002-07:002013-06-17T11:36:45.308-07:00HUKUM AMPEREHUKUM AMPERE<br />Persamaan yang analog untuk medan magnetik yang disebut hukum ampere menyatakan “yang menghubungkan komponen tangeninsial B yang dijumlah pada seluruh kurva tertutup Cdengan arus IC yang melintasi kurva tersebut”, dalam bentuk matematis, hukum ampere adalah :<br /><img alt="" src="data:image/png;base64,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" /><br />Hukum ampere berlaku untuk sebarang kurva C asalkan arusnya kontinu, yaitu arus itu tidak berawal atau berakhir di sebarang titik.<br />Penggunaan sederhana hukum ampere dalah untuk mencari medan magnetik dari kawat yang panjangnya tak terhingga, lurus yang menyalurkan arus.medan magnet akan menyinggung lingkaran dan memiliki besar B yang sama pada sebarang titik pada lingkaran, hukum ampere pada y demikian yaitu <br /><img alt="" src="data:image/png;base64,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" /><br />Arus lc merupakan arus l dalam kawatdengan demikian dapat diperoleh persamaaan<br /><img alt="" src="data:image/png;base64,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" /><br /><img alt="" 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" /><img alt="" 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/>Anonymoushttp://www.blogger.com/profile/02733760319647747668noreply@blogger.com0tag:blogger.com,1999:blog-7147849933823804281.post-56621096596922586312013-06-03T03:00:00.001-07:002013-06-03T03:00:20.589-07:00HUKUM AMPEREHUKUM AMPERE<br />
Persamaan yang analog untuk medan magnetik yang disebut hukum ampere menyatakan “yang menghubungkan komponen tangeninsial B yang dijumlah pada seluruh kurva tertutup Cdengan arus IC yang melintasi kurva tersebut”, dalam bentuk matematis, hukum ampere adalah :<br /><img alt="" src="data:image/png;base64,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" /><br />
Hukum ampere berlaku untuk sebarang kurva C asalkan arusnya kontinu, yaitu arus itu tidak berawal atau berakhir di sebarang titik.<br />Penggunaan sederhana hukum ampere dalah untuk mencari medan magnetik dari kawat yang panjangnya tak terhingga, lurus yang menyalurkan arus.medan magnet akan menyinggung lingkaran dan memiliki besar B yang sama pada sebarang titik pada lingkaran, hukum ampere pada y demikian yaitu <br /><img alt="" src="data:image/png;base64,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" /><br />
Arus lc merupakan arus l dalam kawatdengan demikian dapat diperoleh persamaaan<br />
<img alt="" src="data:image/png;base64,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" /><br />
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" 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/>Anonymoushttp://www.blogger.com/profile/02733760319647747668noreply@blogger.com0tag:blogger.com,1999:blog-7147849933823804281.post-36703302990877562622013-06-03T02:53:00.001-07:002013-06-17T11:36:45.318-07:00SUSUNAN HAMBATAN<a href="https://www.blogger.com/blogger.g?blogID=7147849933823804281" imageanchor="1" style="clear: left; float: left; margin-bottom: 1em; margin-right: 1em;"></a>SUSUNAN HAMBATAN<br />a. Susunan Seri<br /><br /><div class="separator" style="clear: both; text-align: center;"><a href="https://www.blogger.com/blogger.g?blogID=7147849933823804281" imageanchor="1" style="margin-left: 1em; margin-right: 1em;"></a></div><div class="separator" style="clear: both; text-align: center;"><a href="https://www.blogger.com/blogger.g?blogID=7147849933823804281" imageanchor="1" style="margin-left: 1em; margin-right: 1em;"></a></div><a href="https://www.blogger.com/blogger.g?blogID=7147849933823804281" imageanchor="1" style="clear: right; float: right; margin-bottom: 1em; margin-left: 1em;"></a><img alt="" src="data:image/png;base64,iVBORw0KGgoAAAANSUhEUgAAAPQAAABGCAIAAAB0Ty7XAAAQ5UlEQVR4nO2de1ATV9/HT2vHFiiIiFSUDoraGqsO1qnjZRAtRfDWKDhOFYG2QhCEhqDJgI0QlZtWlMGCKOKt1YgGpdCxdLCUAgYUVAiQgCRykZsKBAgQskk47x/7PnnyhCTkgiSm+/kru/vb5bu733P23AEQA8NEAYYWgIHxpsDMjWFqjI6Ooj8wc2OYGpi5MUwWzNwYJgtmbgyTBTM3hsmCmRvDZMHMjWGyYObGMFkwc2OYLJi5MUwWzNz/paura+vWrTt37uRwOIbWgjEBYOb+LwKBgEAgAAD+/vtvQ2v5lzI0NOTt7b19+/YHDx7ofzXM3P9Dfn4+AKC0tNTQQv6lIAgSExMDAPj111/1vxpm7v+BwWAAACorKw0tRHeioqJcXV09PDwmJPObfKqrqwEAt27d0v9SE2nuU6dOrVmzxsXFJS8vT/+rGYTs7GwAwGeffbZ27dpffvnF0HK05ty5c5aWlqGhoQCA69evG1qOLlRWVhqduRkMxnvvvXfx4kUKhfLxxx/X1dXprc0AoDl3cnLyiRMnPvroIyaTaWhF2hEUFAQA6OrqKiwsfPXqlaHlaMe1a9dWr16Nw+EAALdv39b/ghNm7ubm5pKSEghhQUEBAAD9/daBmrupqamxsREAkJ2dbWhF2hEeHg4A6O/vN7QQrWEymXZ2didPnkxNTTW6nBtCmJqaunLlynnz5gEA3ro8DwU1N4vFevLkCQAgNzfX0Iq0g0gkAgB6e3sNLURrcnJyAABsNru5udnozM1gMCwsLOh0+vHjxwEAZWVlemszAKi5a2pqqqqqAAC//faboRVpB1rahhBevHjxzp07hpajBb///jsA4NGjR7W1tUZn7qSkJADA8PBwYWEhAKC8vFxvbQbg9u3b8ubOyckxtCLtaGlpWbZs2fLly8PCwtra2gwtRwvy8vLQdio2mw0AYDAY+l9zwsz96tUrT09PHA7n6OgIAPjiiy8GBwf1ljfZXLx4MSQkJCgoaMGCBf7+/n19fYZWpDU8Hq+oqOjFixeGFqIdqLkfPXpUV1dndDk3hLCjo+PBgwdlZWVVVVUVFRUSiUT/a04y3d3dfX199fX1TCazp6fH0HL+RfT39+/bt2/+/PkLFiwAAMydO1f/Lw/WiYNhLPT29j569Ojhw4c1NTWVlZUjIyN6XvAtM7dMriqkUunkKNFZwLgB497jm0a9AON/BTIm2NxSqVSf0silS5dSUlJUHR0dHY2MjCwqKlIVIBKJCATC69evdRYgkUj08ZZUKiUQCO3t7aoCGhoagoOD1bx+BoMRHx+vswAIIYIg+pyel5d37NgxNQHx8fFqantSqTQkJKSxsVFnAVKpdKKSxwSbm8ViEYlE3cSVl5cTicSDBw/ev39faUBGRkZUVNSBAwc6OzvHHpVKpVQqNSYmhkQi6ZzAbt68efLkSd3OHR0djYmJodFo4eHhSgUgCBIWFhYdHZ2QkKD0Cmw2OzQ0lEwm3717VzcNEMKQkJDnz5/rdi6Xyw0LC6NQKDdv3lQacOfOHTKZHBoaymazlQYkJCRER0eHhobqnMbu378fFRU1IZ+vCTa3WCw+c+bM6dOntT2Rz+f7+Pi0tbX19PTs3r17bGWitLT0+++/7+/vLy0tJRAIYrFYISAtLY1GowkEgp9//jk2Nla3pyMQCMLDw//44w8dzs3MzPzxxx8HBwcvXLhAo9EUBEilUtQ0AoGARCJlZWUpnD4yMuLn58fhcNBHUV9fr4MGCOHjx48JBIIO+QuCIH5+ftXV1Xw+38/Pj8ViKQTU19f7+Pjw+XwOh+Pn5ze2TJyVlUUikQQCAZ1Op1AouuVxQqHwyJEjhhwVKBQK+5QxMDDQ0dHh7++fk5OjNEAVoaGhMkuVlpYGBATIJ/3u7m4fH5/W1lZ0My0t7dixY/LuKS4uDggIGBgYgBAODw8TiUSFnnMNZQwODj5//tzLy4vD4Wilv7S09LvvvkP7vYVCYUREhMK4pfT0dCqVit4Un8/39fWVH34jkUgiIiJkjq+urvbz8xOJRLIAkUikoZKBgYGUlJRDhw5ppb+vry8qKko2VozD4fj6+g4PD8sLQK2PbmZlZR08eFD+A1VXV+fr68vn8yGECIJQqdT09HT5J9Df36+JDIFA0NraumvXLiaTqTRAKBSOb1AIoc7mTkxM/EQFS5YssbKysrOzUxWglMzMTHmzpqenHzlyBH12IpEoKCiooKBAdnRkZIREIsk+nV1dXXv27Ono6JAF9PX1yWd+T58+XbhwoYZKli1bNnXqVEdHR630u7i4yA9U6u/vl7dCaWnpvn37BAKBLAC1guw9paamHj16VP5zRKfTyWQyukcsFpPJZA2VfPrpp46Oju+//75W+j/55JMTJ07IZyjZ2dlEIlFeAJ1Olx0Vi8UxMTGpqanoplAoVEiuAoFg3759spHxzc3NS5cu1VDJ0qVLzczM5syZo0qnhi7V0dy9vb3NymhpaWlsbNy9e/eVK1eUBqhCPpeCEIpEokOHDt24cQNBkPj4+OTkZIWv/MDAgK+vL5vNRiuRY+fOsFgsPz8/oVDY1dW1d+/eZ8+eaSKjtbWVw+F4enqWlZVppV8+aaGgH3GhUNjb24uWuBQCbt26RSKRRCJRcXFxYGDg0NCQ/FGxWHzkyJH09HQEQVJSUuLi4jRU0tLScvr06cDAQK30Nzc3y+fTEEKJRBIbG5uSkoIgCJrXKBQFh4aGAgMDi4uLRSIRiUQa2+3S1tbm4+PT29uLWr+yslITGa2trQ0NDV9//fW9e/eUBmg+cmbimwIzMzMTEhL0rxAMDg4eOHDg9OnTZDJZaZMnm83+4YcfYmNjZfmHAnQ6PTo6mkwmFxcXa/hHpVLp4cOHJ2pUxt27d6lUKoVCkf/syJBIJHFxcYmJicHBwUqryENDQ2FhYUlJSUQiUcF5amhsbAwMDNQ8Xg3Dw8Ph4eFnzpwJCwtTSHsonZ2dwcHBiYmJcXFxSuvQBQUFFAqFSqVq9UhPnjyZkZGhu+7/MPGtJUFBQRPyZCGEjY2Ne/fuVdONn52dTSKRVFXMJRIJjUY7f/685n+RTqfTaLSJ6luVSqXx8fFnz55VldSFQiGBQFCT9jo6Onx8fLRq3CQQCLW1tVprVUF3d/eePXuUpj2U4uJiAoGgqhw8Ojp69uzZ+Ph4zSuXBQUF4eHhCl9y3ZhgcyMIIl+y1B+0jqgKiUSiNEeRIRQKtWqTGh4e1r9jTJ6RkRH172ncETjqn8BYJnww97gC1N+CSCTS6pGOjIyof6ea85b1UGJgaA5mbgyTBTM3hsmCmRvDZDFec/f09PB4PIWGi/b29pqaGh6Px+FwWCwWi8XicDhju+KNis7OzqamJoWdTU1NtbW1PB6PzWajN9LQ0GAIdeODIAiPx0O7HuXp7u5msVhcLvfZs2foLdTV1U1sc4KeGK+5yWQyukqB/M6jR48uXLhwypQpdnZ2OBwOh8PZ2NgkJycbSqQmbN682cLCQqE1MCAgYO7cuVOmTHFwcEBvxNzc3Dgn23O5XADA2MFe169fx+FwU6dOtbKyQm9hzpw5wcHBxjNJxXjNnZ6e7uzsrDAdRiKRNDc3AwAOHz6MIAjaeWZhYWHMq/sdOnRo3bp1CuYWi8UlJSUAgKtXr6I3QiaTzc3NdR4v9ebo7u52dna+evWqwn6pVIogiLW1taenJ3oLhYWFNjY2Fy5cMJJvqZGam8/nP3nyRGmRo6urCwBw9OhR2Z5NmzZZWlpOrkBN6erqqqqqUjq+uaKiAgAgP7jUyclp+fLlk6hOI1gsVm1tbXd3t9Kjtra227Ztk22iK/2p6fSZTIzU3CUlJTNnzrSwsHj58qXCofb2dgBAXFwcujkwMLBixYpVq1ZNukaNoNPpVlZWTk5OYzspy8vLAQCyfumXL1/a2tru2bNn0jWOg6en5zvvvKNqGPOMGTO2b9+O/pZIJN9++62Dg4OqlDDJGKm5IYSRkZEAAKXmfvfdd/39/YuKih4/frx//34HBweForlRsW3btmnTpqkyN5VK/eeffx4/fuzm5obD4fScR/Mm4PF4AABVczjs7e1Xr15dVFRUUVGRnJxsbW1tPKt6GK+5Dx8+PLZCCSFsb2//4IMP7O3tnZ2dAQCzZs0y8hWHt2/fbmNjo8rcTk5OixcvBgDMnz+fx+MZRKF6mpqaAAA//fST0qPz58+fNm0a+i7Mzc2NavVQ4zV3VFQUAIDP57e2thYXF1dVVaH70WIJOtEQh8N5e3vLcrva2toHDx4YW50Mj8dPnz4dQtjR0cFkMp89e4buR82dm5s7ODjo5OREoVBkpzQ0NDCZzLHDaA0CmnOj5h4eHs7Pz5dfHNnW1haPx0MId+zYsWTJElkDwMuXL/Pz82VvzSAYu7kRBMnOzjYzM3NwcED3o+am0WgQwrKyMvnKZXx8PADAzc3NYKKVgcfj7ezsXr9+7enpCQBwdnZuaWmB/zE3OgPg2rVrAIBr165BCFtbW52cnAAAXl5e+kx2nihQcyclJSEIkpaWtmLFCktLy3v37qFHZRXKnp4eAMDu3bulUmlfXx+VSl2xYsWcOXNUzbacBIzX3DQaDQCAjjjbsmWLra0tul8gEMiaXdlstoODg/yKlY6Oji4uLobSrJSdO3cuWrTo8uXLdnZ2rq6uAICIiAgIIbooHrpi2/37962trc3MzLhcLpVKXbhw4cqVK9GGQkPL///mqfPnzw8NDUVGRkII169fb2VlhR6dOXPmjh07IIQDAwOff/45ACAtLY3D4Zw6dQpCaG1tbcDXYaTm7uzs3LRpk6wxYcuWLXZ2dhDCp0+fpqenAwC2bduWk5MjFotzc3PNzc2nTp1aUVEBIXR0dHR1dTWseHm4XO7ixYstLCzIZDLq4w8//DAzM7OkpARdMTQkJCQ/Px9CiC7du3TpUgqFUlNTw+Vyp0+fXlhYaOg7gFeuXAEA7Nq1Cy1ysNnsRYsW7d+/v6mpCV03dNGiRQwGo7e3l8Vi2dvby5Z+ZjKZM2bMSExMNJRyIzV3WVnZhg0bPDw8CAQChHDr1q2ouZOSktauXevh4bF+/Xp3d/e+vj4IYUJCwldffYU2DhqbuRkMhpubm7u7e2xsLIQwKysrOjoaQhgREeHi4uLh4bFu3bpvvvkGDSYSiRs2bEBnFp86dercuXMGVC7Dx8cHfeA1NTUQwoyMDEtLy4cPH+bl5a1Zs2bjxo1ubm5r1qxBJ1BmZWW5u7sHBARACCMjI21tbQ34r+GM1NwKbN68GTX3uBibueWprq4mkUiaRP75559opcI4Wbdu3axZszSJtLGx2bhx45vWo4q3w9x4PF7Dpzlv3jxjq1DKIBAIx48fz8vLG7c9x9PT89KlS7m5uWoWr5p8+vv70Rlxrq6uM2fOVBPZ1tb25MkTCOH06dO//PLLSdI3hrfA3LW1tXPnzgUAqFlIDaWkpGTKlCn29vaGbYFSCpfLXbVqFQAAAEAkEtVEVlZWzp49G428fPnyZAkcnxcvXgQEBGRkZMyePdvf319NZHl5eWBgYEZGhpmZmarltSaBt8Dc2dnZeDzey8tr3KrJmTNnvLy88Hj8jRs3Jkeb5vz1119bt2719vb29vYeu9yUPJcvX8bj8Wiksf33lfr6ejc3t127do3bk5qfn+/m5qY+Gb9p3gJzY2DoBmZuDJMFMzeGyYKZG8NkwcyNYbJg5sYwWTBzY5gsmLkxTBbM3BgmC2ZuDJMFMzeGyYKZG8NkwcyNYfpg5sYwWf4PB179gntZ7JkAAAAASUVORK5CYII=" /><br /><br /><br /><br /><br /><br /><br /><img alt="" src="data:image/png;base64,iVBORw0KGgoAAAANSUhEUgAAAHgAAAATCAIAAADUNV4cAAAA/ElEQVRYhe2X2w3DIAxFPZcHYo6OwDQswzDpB6FE4VFSri2h+n5EKB8Hc2JZhI57giNiH6v381knSAOFmKOQ2k5/HhOtlFq0jQ6RTIuOnqmRVq3TZ5hlwoHfmA84s7GOVoqO6OjZBQywNBuwyOAgzFEURKdTYERHzycpel4q81JkcHkVPUuplp7RqZeDa4pemtEtKaszOivfdkZ3RP8OXG++OzO53Xp0HHjRZYLgmJkr5HpD0QDLFTPnKfv6ZcbrSjRJ/Csuir4EY7mHPJf0KhJg68bOyTXSOEz05x6GvYwVbC4zOQI+OzZF+nqzYPvahCrFRCvFRCvFRCvlDTrrbS1hcv9FAAAAAElFTkSuQmCC" /><br /><img alt="" src="data:image/png;base64,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" /><br />b. Susunan Paralel<br /><br /> <img alt="" src="data:image/png;base64,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" /><br /><img alt="" src="data:image/png;base64,iVBORw0KGgoAAAANSUhEUgAAAYkAAAC2CAIAAACj5OYmAAAGX0lEQVR4nO3d0XHaQBiFUdVFQaojJVCNmqEY8gAYyQgQ1mq5LOc8ZGzi6Dee2Y+VwKE7Tgx913X9ML3xsN/d3rhSY4Oq3R34Ft2vz2cW2TZLrLFB1e4OfInfbbpdUa8tscN+183Y7Q8lBy2fUm3Qyp8bMHXTpt9r6rDf3VnzazU2qNrdga9w26bpIhv6e9uR9RYMOux3BbYeDwddt0Yr7+fjuzP0ZabAl5hp03iRbZmmp4NOy7nEadH9QYf97vwX6zc6D+7O0F8+Pex36gTPzbXpusiG/ncbhr7r+/MWYK4aL10JejTotGMa+gJTHg8af83NAYrdnR/XSgEPzLbpsrhmltj1puuOY427g37+utDl5CeDCm1oHk45hU6ZYIk7bfq5PPJ7iY1jUSQc9wYVHLFgUJnQPptymSRP8NS9Nt272DP014VVJhwPryoVbNP9QcXC9HDKJtOgWdM2dd2zj4fj6Jxu8jWbKNmmeVVSMRoiTbDITVxOubn/Z9/1x67ruu7YdcPxuHGeNm/Tz1P7Wz+/fx2kTLDAXFke7Z4usdh8xwR8tVcTs/1JFsDrbQKoQZuARNoEJNImIJE2AYm0CUikTUAibQISaROQSJuARNoEJNImIJE2AYm0CUikTUAibQISaROQSJuARNoEJPrVpqFf+2Yj64+w9QE3OiZQkn0TkEibgEQJ53RD/+gNJYsfcPkxnx4H2MqyNh32u27G3PLWJqAA+6Y1xwG2UqFNh/1uboEv3YuND3j9NwU3d0M//coXjgNsZes2nRb+483H0n3TYb87f91hv3v0bb6ybxr6UZN+HdO+Cd5m0+tNpx3T0Bdq0/QbKtSmyY3aBCkqnNNt0KbHaXq9Taf2zp5OahO8RUKbXjzg9dSu3DEvx3VRCUJ8WpsKhOnmmBevHnscsyUfA8tN29Rt8TLxlW0aKROme4c8f9j9u/4QtvgYWOJmzZzyVDJSxdr082R/2ef0r4e9fJunlGzxJ7DQ3ILZZPf0YeyY4L2sHCCRNgGJtAlIpE1AIm0CEmkTkEibgETaBCTSJiCRNgGJtAlIpE1AIm0CEmkTkEibgETaBCTSJiCRNgGJtIlQt+9l2vD0tsf9jTaR5/I+0u9ZP5Wntz1uBW0iy+Ud/da/VeIHTG973EraRKb3rp/K09se90faRCZtambcH2kTmbSpmXF/pE1k0qZmxv2RNpFJm5oZ90faRCZtambcH2kTYS4vwLnqh2antz1uHW0CEmkTkEiboJjDflfzOk7b47QJimk7FtoEn6rtWGgTvOr2+aeRiuup7VhoE3yqtmPxdNzQj1+VMPTjB4bpZ0toE292f8PzyBunTw/w2pZt9Z2NHqdN8ItzugbHaRMU03YstAk+Vdux0Cb4VG3HQpvgU7UdC23i2wz9zfXrir8eX3l62+NK0iYCHPa7u08+Nze97XHlaBMBpuvn9Gm9BVR5etvjytEmAsytn3qnHpWntz2uHG0iwGTBVH9krzy97XHlaBMBJq/rrr50Kk9ve1w52kSA0WP7aSlVPemoPL3tceVoEwFuzztqrqAl04e+2Lf0dNzP8/5FdjlPxo1eZBC2qdImAsxdr61XpyfTT0+773abtOlm3PUFjoVy+PTeXcdlxUmbeLvrQ/f0ZTjnG86raX++blJ6AT2ZfnbYF2rTsnHnkesnLh5XZFpR2kS+0bNLxRrxh2+h9kWwWvPOscraNWkTn2AchjedetRtU+XfXDsej0WvqJWhTeQbheEL9k3jK06bj7wOe9dP9i5tIt/kJTr118/492U3385M/wvPCnd25opUBm0iX9xDOhVoE/HOj+zq9F20CUikTUAibQISaROQSJuARNoEJNImIJE2AYm0CUikTUAibQISaROQSJuARNoEJNImIJE2AYm0CUikTUAibQISaROQSJuARNoEJNImIJE2AYm0CUikTUAibQISaROQSJuARNoEJNImIJE2AYm0CUikTUAibQISaROQSJuARNoEJNImIJE2AYm0CUikTUAibQISaROQSJuARNoEJNImIJE2AYm0CUikTUAibQISaROQSJuARNoEJNImIJE2AYm0CUikTUAibQISaROQSJuARNoEJNImIJE2AYm0CUikTUAibQISaROQSJuARNoEJNImIJE2AYm0CUikTUAibQISaROQSJuARP8BVIIbcWL2S3QAAAAASUVORK5CYII=" />Anonymoushttp://www.blogger.com/profile/02733760319647747668noreply@blogger.com0tag:blogger.com,1999:blog-7147849933823804281.post-30900733537118305972013-06-03T02:53:00.000-07:002013-06-03T02:53:50.967-07:00SUSUNAN HAMBATAN<a href="https://www.blogger.com/blogger.g?blogID=7147849933823804281" imageanchor="1" style="clear: left; float: left; margin-bottom: 1em; margin-right: 1em;"></a>SUSUNAN HAMBATAN<br />
a. Susunan Seri<br />
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<img alt="" src="data:image/png;base64,iVBORw0KGgoAAAANSUhEUgAAAHgAAAATCAIAAADUNV4cAAAA/ElEQVRYhe2X2w3DIAxFPZcHYo6OwDQswzDpB6FE4VFSri2h+n5EKB8Hc2JZhI57giNiH6v381knSAOFmKOQ2k5/HhOtlFq0jQ6RTIuOnqmRVq3TZ5hlwoHfmA84s7GOVoqO6OjZBQywNBuwyOAgzFEURKdTYERHzycpel4q81JkcHkVPUuplp7RqZeDa4pemtEtKaszOivfdkZ3RP8OXG++OzO53Xp0HHjRZYLgmJkr5HpD0QDLFTPnKfv6ZcbrSjRJ/Csuir4EY7mHPJf0KhJg68bOyTXSOEz05x6GvYwVbC4zOQI+OzZF+nqzYPvahCrFRCvFRCvFRCvlDTrrbS1hcv9FAAAAAElFTkSuQmCC" /><br />
<img alt="" src="data:image/png;base64,iVBORw0KGgoAAAANSUhEUgAAALAAAAAvCAIAAADM5defAAADZElEQVR4nO2b25XrIAxFVRcFUcctgWpoxsX4fmACmKdAwk5G5yPLkxBvgQ6yk1HgFIkiQfyH1QCgbT7qMApAmYOKug30Eu6zaJQSQ9SiPowqT2Za20Av4T6Lxig1RDlqjpi3gV7CfRaN0M0Qpah5YmYDWd08yVNcBnSfOKG7IfIQETEfRkFB5QvkCqil3jI9xaVH7zHEPcjDKKZbHiZQd5me4pKjNxkijdpqvltgJMjqxvQxxanJbVLWuD10D+TGIolYFQwRR83pByxoMFW40p1xkYZAcTvo3hvvg3dViCjqHBn8WQgFbd4GKJzMv91q0FpX4V6o0p0PLlGsHtiGg+lpTbkA8qugtH7QEJ5V9MMnP5Yili4oEKMdZXU9N2PLVOMWKAHWwo6np4W+gQ6jrkGl242dhvh4texh6i8ti3v+XoziYj5d2LvcjLKOGkTnoPgyUbhksKhmiCvq8lK4VBHFVwZ99kbYJLSGqE1wgyEqaGpDxEWldpyraoie1tYJoHNstTt2l9wTIBRzgGAScu5pT2/1wyjPVeY4l7jDaJcoj/ZAh3ZR/AvvpTpOwkRNKr5rXN02biHqjxrgBFDGZwhAgz4BAOAEsGe6rJTcjGLDM8c0dwBdAB3m84xSxo10uaR6vMc4OTcS9TfN2PG3cOnQHLXherXxmugPSgwhSiSGECUSQ4gSiSFEicQQokRiCFGicsdUJoauv22gH2YxqN9Cx9Uovg30wywGjRiCp09mG+iHWQwaMwRH4zUZaKa79a0slhYHlKgrxHjTFNlOmk3SG1nfYYjqr9CWRAaaS9I7WW81xMAGX9Yo6DCqtET434A0h4YRtWJGx8paJ5kbqVHqVAir2QIbArX6tuIxqF2bs9q9i7SsqHUy74J6a4WIYnLuzX5uBJVEzd9DFEHa9luzJsp4zopfojREk5U37X6BIbIZUTVed0GXOAxRT1OndZGMVWlL/QpD3GdE1HjdB31wy0s0yFrqmUSy/NNv+3Zi7GNnfi1fb7weBLEZ4s4iccMgKx6LYc41UqO08s8thgb1pyhUbsChrkPuRmqU0KegbLwe0g5DfD4H7vm4F3B+ZqyN1CjJv7/fosdrw3UqqhOJfkNiCFEiMYQokRhClEgMIUokhhAlEkOIEokhRInEEKJE/wHD67cJqS279AAAAABJRU5ErkJggg==" /><br />
b. Susunan Paralel<br />
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<img alt="" 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/>Anonymoushttp://www.blogger.com/profile/02733760319647747668noreply@blogger.com0tag:blogger.com,1999:blog-7147849933823804281.post-35154616155025931362013-06-03T02:28:00.001-07:002013-06-17T11:36:45.325-07:00HUKUM KIRCHOFF IIHUKUM KIRCHOFF II<br />“ Dalam rangkaian tertutup jumlah aljabar ggl (ε) dalam sumber tegangan dan jumlah penurunan potensial (IR) sama dengan nol (0)”<br /><br /><img alt="" src="data:image/png;base64,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" /><br /><br />Anonymoushttp://www.blogger.com/profile/02733760319647747668noreply@blogger.com0tag:blogger.com,1999:blog-7147849933823804281.post-88445759693674151932013-06-03T02:28:00.000-07:002013-06-03T02:28:26.263-07:00HUKUM KIRCHOFF IIHUKUM KIRCHOFF II<br />
“ Dalam rangkaian tertutup jumlah aljabar ggl (ε) dalam sumber tegangan dan jumlah penurunan potensial (IR) sama dengan nol (0)”<br />
<br />
<img alt="" src="data:image/png;base64,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" /><br />
<br />Anonymoushttp://www.blogger.com/profile/02733760319647747668noreply@blogger.com0tag:blogger.com,1999:blog-7147849933823804281.post-34260068483085726152013-06-03T02:21:00.002-07:002013-06-17T11:36:45.331-07:00HUKUM KIRCHHOFF IHUKUM KIRCHHOFF<br />Hukum kirchoff 1<br /><br /><img alt="" 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" /><br />“ pada setiap titik cabang, maka jumlah dari arus-arus haruslah sama dengan nol (0).”<br /><img alt="" src="data:image/png;base64,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" />Anonymoushttp://www.blogger.com/profile/02733760319647747668noreply@blogger.com0tag:blogger.com,1999:blog-7147849933823804281.post-797241621560327342013-06-03T02:21:00.001-07:002013-06-03T02:21:42.542-07:00HUKUM KIRCHHOFF IHUKUM KIRCHHOFF<br />
Hukum kirchoff 1<br />
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<img alt="" 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" /><br />“ pada setiap titik cabang, maka jumlah dari arus-arus haruslah sama dengan nol (0).”<br /><img alt="" src="data:image/png;base64,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" />Anonymoushttp://www.blogger.com/profile/02733760319647747668noreply@blogger.com0tag:blogger.com,1999:blog-7147849933823804281.post-88764561845248704502013-06-03T02:18:00.002-07:002013-06-17T11:36:45.404-07:00HUKUM OHMHUKUM OHM<br />Georg Simon Ohm (1787-1854)lahir di Eriangen, Bavaria (Jerman Barat) pada tanggal 26 Maret 1787.Ia merupakan ahli fisika Jerman yang berasal dari keluarga miskin. Ayahnya yang hanya seorang mandor montir mengharapkanOhm menjadi seorang ilmuwan, namun Ohm sendiri ingin menjadi guru besar di universitas. Setelah lulus dari universitas, ia bekerja sebagai guru SMA. Untuk dapat mengajar di universitas sebagai guru besar, ia harus melakukan riset dan membuat karya ilmiah. Beliau kemudian menyelidiki arus listrik yang ditemukan Volta.Ia menggunakan hasil penyelidikan Fourier, seorang ahli <br />matematika Prancis untuk mengetahui sifat-sifat arus listrik. Akhirnya pada tahun 1827, saat Ohm berumur 40 tahun, ia berhasil membuat teori dari hasilpenelitiannya. Teorinya mengatakan bahwa arus listrik yang melalui suatu penghantar berbanding terbalik dengan hambatannya.Teorinya kemudian dikenal dengan Hukum Ohm.Penemuannya dipaparkan secara jelas dalam sebuah buku yang berjudul “SirkuitGalvanik” yang diselidiki secara matematik pada tahun 1827.Penemuannya ternyata mendapat kecaman dan kritik. Karenasangat kecewa, ia kemudian berhenti menjadi guru. Namun, 14 tahun kemudian penemuannya diterima dan diakui, ia kemudian diangkat menjadi guru besar di Universitas Munich, dan ia diakui sebagai ilmuwan bertaraf internasional. Ia meninggal di Munich pada tanggal 7 Juli 1854 dalam usia 67 tahun.<br />Bunyi hukum ohm”arus listrik sebanding dengan beda potensial. Semakin besar beda potensial listrik yang diberikan, semakin besar arus listrik yang dihasilkan. Demikian juga sebaliknya, semakin kecil beda potensial yang diberikan, semakin kecil arus listrik yang dihasilkan”.<br /><img alt="" src="data:image/png;base64,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" /><br /><img alt="" src="data:image/png;base64,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" /><br /><br /><br /><br />Anonymoushttp://www.blogger.com/profile/02733760319647747668noreply@blogger.com0tag:blogger.com,1999:blog-7147849933823804281.post-66737469713543328682013-06-03T02:18:00.001-07:002013-06-03T02:18:18.991-07:00HUKUM OHMHUKUM OHM<br />
Georg Simon Ohm (1787-1854)lahir di Eriangen, Bavaria (Jerman Barat) pada tanggal 26 Maret 1787.Ia merupakan ahli fisika Jerman yang berasal dari keluarga miskin. Ayahnya yang hanya seorang mandor montir mengharapkanOhm menjadi seorang ilmuwan, namun Ohm sendiri ingin menjadi guru besar di universitas. Setelah lulus dari universitas, ia bekerja sebagai guru SMA. Untuk dapat mengajar di universitas sebagai guru besar, ia harus melakukan riset dan membuat karya ilmiah. Beliau kemudian menyelidiki arus listrik yang ditemukan Volta.Ia menggunakan hasil penyelidikan Fourier, seorang ahli <br />
matematika Prancis untuk mengetahui sifat-sifat arus listrik. Akhirnya pada tahun 1827, saat Ohm berumur 40 tahun, ia berhasil membuat teori dari hasilpenelitiannya. Teorinya mengatakan bahwa arus listrik yang melalui suatu penghantar berbanding terbalik dengan hambatannya.Teorinya kemudian dikenal dengan Hukum Ohm.Penemuannya dipaparkan secara jelas dalam sebuah buku yang berjudul “SirkuitGalvanik” yang diselidiki secara matematik pada tahun 1827.Penemuannya ternyata mendapat kecaman dan kritik. Karenasangat kecewa, ia kemudian berhenti menjadi guru. Namun, 14 tahun kemudian penemuannya diterima dan diakui, ia kemudian diangkat menjadi guru besar di Universitas Munich, dan ia diakui sebagai ilmuwan bertaraf internasional. Ia meninggal di Munich pada tanggal 7 Juli 1854 dalam usia 67 tahun.<br />
Bunyi hukum ohm”arus listrik sebanding dengan beda potensial. Semakin besar beda potensial listrik yang diberikan, semakin besar arus listrik yang dihasilkan. Demikian juga sebaliknya, semakin kecil beda potensial yang diberikan, semakin kecil arus listrik yang dihasilkan”.<br />
<img alt="" src="data:image/png;base64,iVBORw0KGgoAAAANSUhEUgAAAPUAAABbCAIAAAAkxVSsAAAEvklEQVR4nO2dy3mrMBBGVUyqoIM0om1a0TaNsLrbVEExugsw1tO2JCTNDP9Z5EswETP4WAwCYWUBkIuaHQAAHYHfQDLi/F618tGr/+JitnnRgcGI89vazSyn1JtZnn5vZtFaQ/A7IdlvT25rV72Yza4Q/E4I9TsuTjaz7F6v2q9ZgGSE+h3130FZDsFvgmS/7am4uwhnmXeCit+bWa7pVRPjJ4+CZW/+sQIMvwPi/AbAgYrfAPSAht9HzZDsv93hkAgUGeAlNPy2GLYDXZDmd76rT3BB2IA2ZN7jrN+oT0A99P0GoB74DSRDw++zBkG9AS6Fht8A9AF+A8nAbyAZ6X4/RxdR2t8R2X4/74vdzALDb4hsv1d9jjliXtotuYvf/gwHcBfE++3Mc5gdDRiPeL+h9a2B30Aysv0Gdwd+A8nAbyAZ+A0kA7+BZOA3kAz8/pBp1/dn31jAO3H4/QmTx9EzNxesejH/zNLz2izNxAtg7vfLb2u4Cuc5tOftto8H1NZstKaR/eHlqUUd76whmngJ7J8Ekv22hiu3EH7Hyfl3rVzFjZyPL4+i6uc3zcTLkON3H7ltfIx26sL6nV/cSBDFM9t+fpNMvBARfve9RTDawWcflNj1/klR4tlEj1eTjXjllv/e+9sKKof7JF7KO783o2nPCujff8cNH9uMS8PNaK0/7NmSjTiyRkI767n/NKw+ycW8vzAm8WJe+83gmw7619+Z93lZoo1tRpvtY99SjXgT6tw979ng/THm/PJFzHZc4uUw93vI+EliJyenc5YOaCQacY7rQe/mtBj23v3yJpZ4BUebriduoZRfpLz+JFE00f5glPLB/GTvs1b5riQO0+Gu7FaH5SOikXgVSin1/WufDa3aCdLbRPRHerXMEjJknkfbGq17WK1/lmK2DHXXaFCIceJ17Hpb7+jn99fRee/r1eJXH+G/2aGsn4N8BN9y8cPal8MIRKGe+NFkEG9e3A9X85eEnwVMGgODUHuB4tRPOtsxe7PR86uFS4KvRrvmm9LyXX34ie23CZrITrw8l6+fP2szJ4vO75tZsueU7/0Oh/4TfrfUJyWDpJ3K0AIah3QbNjsu8TPH0JvB7OX3rzeenhQ3KL9zqyVeTfjNorQE1zD1EuHRf4e3iTn3Nrj9d2a1oKg+6hivPnkx1tLM5C6iEF7R1uHmOHg8M0Appb5+/s6jlV53PV2rDzuDOz3c1aIBkrg+Mdr536uZdMSvhFe0dTxzbLwA2Uhl2V7CgIKElzG8oq3Drb9njpbB7/HwiraOR46T9bZKWfv02xX9qt8H+L0X/FwG1XlFW8eZo3v9ZwbK2oeO/X4CMImePTfkBrOBgkAyvP1OXuucHVQWXtG2QCdTmfsXgB34DSQjw+/ZzzArg1e0LczPVILfJZO358Mr2hYoZCrA77LJ27PhFW0LJDLl73f/x/BdCa9oW6CRKXu/r5i8PQ5e0bZAJFPmfl8zeXsUvKJtgUymrP2+aPL2IHhF2wKhTFn7DcAb4DeQDPwGkoHfQDLwG0gGfgPJwG8gGfgNJAO/gWTgN5AM/AaSgd9AMvAbSAZ+A8nAbyAZ+A0kA7+BZOA3kAz8BpKB30Ay8BtIBn4DyfwHCNAMQzUblJ8AAAAASUVORK5CYII=" /><br />
<img alt="" src="data:image/png;base64,iVBORw0KGgoAAAANSUhEUgAAAXoAAABXCAIAAACFhxmbAAAH9klEQVR4nO2dL5PiPhiA8xFOnuE77AyGQSErkSsqUJ1VzH4DcCcPdxK58hwrT67kAyCQK5HIniiUpA3Q0jdpWp5nmN/wW7j0T5qH902TVKUhsVuNk03+VimllEo22v+dP61eXu1CNsl4tXtw/wHgBqrtHdDRbJOmabpJNDXsVuO6snmskN1qjG8AXBCUbjaJKYNNos4t/3EJ1C6kuBcAIEPQurmEJhYFaBpJtbTpwvlTayGbxPLNK3sBACI01M0mKTbWJhSSqTTPfsr9KbtVkiQVAx5rIVpeZfqFZArAEUFFN1d8Mx4X/5ruVslqV7k7x1bI5R8X/EJXMYAjwtKNpbHvVuNy/HT6Vj3flMu15FJl4QGAEEElU2maXvFLeas5D9rBkkw5OBgAuOBGN5aO23KX7KPoyY9xm7tuKfa+GwBwRHjRzR1OJmsy+C9Nb96ZAgA3dE43ANBVAtKNLf1qE5GDAoCcDvbdVGK3GhN3AYRFQNGNMLtVEuaOATwrvdUNA2gAQqO3umFwMEBo9LVDlOAGIDh6qhtsAxAezXQT7N1ifTAgAIRBY19kxgnWOwAQDBKawDUAUIHum+IypJBbUQBB03XdGKtkZcJhRgJAmHS9HWqLR5iLFwNAaPRHN48+GQYAPNED3eQUZEO0AxAWPdCNPaSp86gGAPBBX3VT71ENAOCBruvmCnUf1QAA7umnbiQe1QAAwvRRNzKPagAAYfqnG6FHNQCANP3TDQAECroBAE+gGwDwBLp5IpZL1fqr7XMAbRJO9bc25yCQyQ7v7+/f399ON9G6a9DNkxNI9V+di+CHEIYDKqVGo9F+v3e3idZdg26enCCqX1vIPF8sq8mN7EcKaf1BMUqp/X4/Go22262jTTSXxTxSSik1UPOlWsancZQxuukvm0Ry4boQqr/w2ARjZN6jcUftQvSxga2QrQH2/f09mUz+/fvnYhMi4Uk0UNHc8h7d9BTJH+IQqr+YSWmdKY9LoHYhLedzab7k4OFwiKLo79+/4puQ0s0wVsulWsZqEJFM9R3RdhFC9ZcOKA9NLIdqduxeFirOOX9qLcSYTGU66Mpp3e/3Cy/oK5wej8fpdLperxucVQsiuomHJ90Ms5RKew3VJdiJh9qZ1r4pe0TgGtkntoXw0N7yEZ2yn3IYV2cVG2shWl5l+uVaCHQ4HF5eXiaTiWvdlOUym80Wi0WFI61KZoQHQpKybuJhMY2Kh2p4NtFyqZZzNThbRs+5BA/HB60/ldryg+pzVo5wH0MQ1W/3zXhc8mq9VWxshRhLqesn8kaGmsUaHx8fVY5FlsVi8f7+LlWaSHQzj9RgUHJWrNRQzSNNN7FSw0vUk3cnSx2LJ8LQjXm571ZjbzuVNYvNRkhvgVR/qbHnz1WwfKueb8rlWnKpeyHj8Xh8fX398+dPha0K8/v379lsdjwemxcloptlbCRHy3P8EmcmOmvodA+rdOuq+VF4JUTd+NyrrPdBLJgKIZlK0/SKX8obaxpOWpKp6sfw9vYmm91UZL1eT6fT5sYRSaas8c6ll+ZceN6jPI8uYU4ndKNdZsnGvDj0K1C7ZLJuQiPtEWugVt1Y/9gF3OjGnnA2E5PMKjZX+24qslgsZrPZI1tuxufn52g0OhwOTQq5qpu5Gtjqq5KY5mqQxy+2BCoeGuVInRBHbBLNFSe7nC4741q3fc8YeCEVfdSKbly0O1GCiW7uILSKzY07U9XYbrcvLy+uZxuUORwOo9Go4XgcF9FNNFBKnQKZ7H00v3pbKnTdlNq2Nsit8BOnX/mGe/K/yEQfFt2UN9ekbK9K6opuguDr62symfh3TTb27+vrq2E5jpKpWi+RE+KKsiVuhu+6bkqjKgQ7GdyEK7eF6Yb2dWOL/trk2n5+fn5OJpOG6cwDCM5saK4bd6c3BK5EEkabPJEkiUfdmOPGRAouHGvx0B1VX3f6blplvV5HUSRye6gWWe4mNW/TSd/Nk0Q3xf6Yoof86ObctK4EIjXaXeHWjKfO5/ajm/D59etXW93DsvEUydQdSo3uIpmCiQz7+NTNHeHUKregGw8NGd3cYbvd1kgVGvDjxw99ux8fH9PpVDZ3Qzd3MVq3fmfK+KBws8KvbmSEY5bhqx2jm1BQWmK8Xq9fX1/Fczd0UwUtIzHG3eiZSrIp3rTyqRuJ0XdZOLNKtCPyQAeq/0nIdeNuaE+LlumQbp4DT9lTgY5XvzGOptuBVqYbpwOXHXokNurhxiI4jg4NalJVN7L5S7PqD+C+pjlMuMPCUUo5n5alHIYt+bTvwqyFLulGv56l3gdKNd3sVuMkEVzLu/F5yc5se+e3oJsuTiTJ+Pnzp+tJ58ulyowj7x1zuYnLvPBu6SY1r2ep/3aW03xwOd9InI5Wz6nRsdfifjTGw6CeU4N3EePElTKpDugmfaoY5yb5LEW53/GOnxEtuvE1DrvDuMuk8nmYt0ObbugG0jQt9YuKNK3OV7+xXhbCuYk73eTLhsbDWx036KYzmItKSXWLdrz6zwbWhdPd3mLXuAttlDpbJlZKdbnvBtK0OI7x3Mqatyyq/4lwF91Uf7V9DqBNqH4A8AS6AQBPoBsA8AS6AQBPoBsA8AS6AQBPoBsA8AS6AQBPoBsA8AS6AQBPoBsA8AS6AQBPoBsA8AS6AQBPoBsA8AS6AQBPoBsA8AS6AQBPoBsA8AS6AQBPoBsA8AS6AQBPoBsA8AS6AQBP/AfAevsppC/52wAAAABJRU5ErkJggg==" /><br />
<br /><br /><br />Anonymoushttp://www.blogger.com/profile/02733760319647747668noreply@blogger.com0tag:blogger.com,1999:blog-7147849933823804281.post-10763884519857135162013-06-03T02:14:00.003-07:002013-06-17T11:36:45.476-07:00PERBEDAAN POTENSIAL ANTARA DUA PLAT PARALELPERBEDAAN POTENSIAL ANTARA DUA PLAT PARALEL<br />gambar disamping menunjukkan dua plat paraler a dan b yang terpisah pada jarak d. perbedaan potensial antara plat a dan b adalah :<br /><br /><br /><br /><br /><br /><img alt="" src="data:image/png;base64,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" /><br /><br /><br /><img alt="" src="data:image/png;base64,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" /><img alt="" src="data:image/png;base64,iVBORw0KGgoAAAANSUhEUgAAAAEAAAABCAIAAACQd1PeAAAADElEQVQImWNgYGAAAAAEAAGjChXjAAAAAElFTkSuQmCC" /><img alt="" src="data:image/png;base64,iVBORw0KGgoAAAANSUhEUgAAAAEAAAABCAIAAACQd1PeAAAADElEQVQImWNgYGAAAAAEAAGjChXjAAAAAElFTkSuQmCC" /><br /><br /><br /><br /><img alt="" src="data:image/png;base64,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" /><img alt="" src="data:image/png;base64,iVBORw0KGgoAAAANSUhEUgAAAAEAAAABCAIAAACQd1PeAAAADElEQVQImWNgYGAAAAAEAAGjChXjAAAAAElFTkSuQmCC" />Anonymoushttp://www.blogger.com/profile/02733760319647747668noreply@blogger.com0tag:blogger.com,1999:blog-7147849933823804281.post-71791226029118539382013-06-03T02:14:00.002-07:002013-06-03T02:14:42.743-07:00PERBEDAAN POTENSIAL ANTARA DUA PLAT PARALELPERBEDAAN POTENSIAL ANTARA DUA PLAT PARALEL<br />
gambar disamping menunjukkan dua plat paraler a dan b yang terpisah pada jarak d. perbedaan potensial antara plat a dan b adalah :<br />
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<img alt="" src="data:image/png;base64,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" /><br />
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<img alt="" src="data:image/png;base64,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" /><img alt="" src="data:image/png;base64,iVBORw0KGgoAAAANSUhEUgAAAAEAAAABCAIAAACQd1PeAAAADElEQVQImWNgYGAAAAAEAAGjChXjAAAAAElFTkSuQmCC" /><img alt="" src="data:image/png;base64,iVBORw0KGgoAAAANSUhEUgAAAAEAAAABCAIAAACQd1PeAAAADElEQVQImWNgYGAAAAAEAAGjChXjAAAAAElFTkSuQmCC" /><br />
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<img alt="" src="data:image/png;base64,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" /><img alt="" src="data:image/png;base64,iVBORw0KGgoAAAANSUhEUgAAAAEAAAABCAIAAACQd1PeAAAADElEQVQImWNgYGAAAAAEAAGjChXjAAAAAElFTkSuQmCC" />Anonymoushttp://www.blogger.com/profile/02733760319647747668noreply@blogger.com0tag:blogger.com,1999:blog-7147849933823804281.post-12928116073687417652013-06-03T02:09:00.002-07:002013-06-17T11:36:45.552-07:00ENERGI POTENSIAL DAN POTENSIAL LISTRIKENERGI POTENSIAL DAN POTENSIAL LISTRIK<br />Energi potensial listrik adalah kerja yang diperlukan untuk memindahkan muatan untuk di tes didalam medan listrik dari potensial lebih rendah ke potensial lebih tinggi<br /><br /><br /><br /><br /><br /><img alt="" 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" 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" /></a><br /><br /><br /><br /><br /><br /><br /><br /><br /><br /><br /> Energi potensial sebuah muatan q1 pada titik yang berjarak r dari muatan q adalah<br /><img alt="" src="data:image/png;base64,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" /><br />jika terdapat tiga muatan atau lebih (seperti gambar), maka energi potensial sebuah muatan q1 yang berada pada jarak r1 dari muatan q1, pada jarak r2 dari muatan q2 dan pada jarak r3 dari muatan -q3adalah : <br /><br /><br /><br /><br /><br /><br /><br /><br /><br /><img alt="" src="data:image/png;base64,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" /><br /><br /><br /><br /><br /><br /><br /><br /><img alt="" src="data:image/png;base64,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" /><br /><img alt="" 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" /><br /><br /><br /><br /><br /><br /><br /><br /><br /><br /><br /><img alt="" src="data:image/png;base64,iVBORw0KGgoAAAANSUhEUgAAASEAAACjCAIAAABKcD8rAAANEklEQVR4nO2dr4+zSBzG5w840eQ15M4gyauQpOJSWVm5ed/kgmqQK3Hc5QRy6yorK+taWUlypnlVxQokEjlyTrDLtnSYQsvAzPB8RLNbKKUDz/dhfn4JAwDIhDDGCCFDnwYAxgJ1ASAX+BgAcoG6AJALfAwAuUBdAMjlcR8rPtX8FYBx0tPdD5mB0fKsjwEAxMDHAJALfAwAucDHAJDLcz72vpqSguV+vyTT1XvX5weA7vDVdTqdDodDFEW73S5JkroPr6afsirEVq8x+BgYLVUfi+PYtm3Xdf/4448oihaLhed5lmWFYUgpvfokIVOy3H/++/4lOADAF1/qyrJsPp+HYZimKbsWXpZlcRy7rlvxNFKnsZvnRvgYGC0fPnY4HBzHORwOXxtuVHE+nz3P22w25Q58H3tfTZer1RKeBgBjhcbSNHVdN8/zqw01zuN5XulmS1JXH3uvaAw+BkYLYYxNJpPj8VjdUKOK8/nsui6l9KpdcbraX9XHqhoDYLSQt7e319dXzoZ654njOAzDypvvQo3Bx8BoIbZtF40c1Q31qqCUTiaTyg5fGtsvSdlp1vXpAqAdxHXd4q/ZbEaEzGaz8mOLxWK3210eSNx2Dx8Do4W8vLzwNwhVEYYhZANAE4jv+/wNwumVURRFUYRpmgDc5Vkfg8AAEEM8z+NvEMrj5eVlu922+BrIDIwVYllWlmWcDcJ2RcuyIBsAmkCKmhVnQ72PbbfbuifM2q+BIMFYIZTSb9++nU6nygbbtrkfyLLMdd0syyAbAJpAGGOn08nzvMrUlY/NN0JqWxOrOw4AI+HjgfDt7c3zvPP5LNg1y7IfP378/Pnz45OQDQAN+NJJkiSu68ZxfGlopZDW67XjOP/8809dG8mdr4EgwVi5atiglIZhOJlMXl5eyrYQ3/cnk0kQBMXkl2JyNINsAGgGRyeU0u12W47k2Gw2l1PLKKWe563X63ZfA0GCsfLIOIw0TQ+HA2QDQBPu6KQrIUGQYLQ8tb6iYFk4AEDB4z6WpqllWbed122PA4DZPOVj2+3WcRxu5zUAoODZ+pjv+9zlQAAABc/O76KUPtAlDcB46KldEdzSMKkA0J1u5inneX67Ghyoo3lSAWAA3fgYpdR13baDP0bIA0kFgO50tt7G+XyeTCbcpRpBwQNJBYABdFkfq1tyGLAnkgpUwFJF2oGL0ROz2eyBpAIN9wcqg3bFPugqqUArcO0UoXsfy/O8buWC0fJwUoHb3KWdnxuQjRQf832/bvnhEXI6nbpKKtAKCFIRpNTH8jy3bfuBpXWMRLBUnrhxIgzDOI5v9wd6Ias+djweK/fHaNlsNuKkAnXwl74s8yqS5f4m73bzg4PeQLuidLr1sa8UVNX8wEBRpLcrVnqERkiSJOKkAnVwl7Lk57lvf3DQG3J9LM9zDP5gjImTCnDLv0gqcNtnTbga+8xdCldTEOk+tl6v0ZQvTirApe4JU+hj++XFv/AxReijPrZYLLh32HgoFsyrSypwW/5lUoHK+4SQJamvj72vpkjBrR59hLosyy4Hwo4TQVKBW0RJBcp2xelqf+VjVybG4GPKgHbF/iiSCvz333+VCmplhovv+0EQcI9QuVIXz4r7JYGFKUqv6npm1IIZJEny22+/LRYLrqEVSQWaT2wpNfbVZ3ahNIRORejPx4rBHyOXWRRFf/75ZyWpACGkklSgjnofA+rSa6g7Ho+PpX0xg8uff5lUgDFWSSrQCfAxRei7PhZFUds8t8ZwPp+5My+blz8maOpI31cCa8U9CWSmHbgYfXA8HgWPgm19DOiFlGt2N75SSsvXu/vrTrGakDgPsAzMKD0DGOxWLlrV7u6m+41SrIonbo6Hj5mNRB8Tk2WZZVnGryUYx/FQU8IhSEUY8pFsu93evf90v1EopXfHT8HHzGYwHwOywVVQBNWbFlQ+NzFBEDTspYCPmY0sH1tNi2HhVyPouBTzPgzrNIui6HKFqUGAIBVBlo+tpvfVVSK4I3W8UZIksW27edSAj5mNPB9rN9diNpu9vb3JOJn+CcNQhaHPEKQiSPSxK40JVyljjKVpytWYjjdK2+FOzbvgdSwN0IuPva+my9Vqaf4sDKXGzkOQitCXj7H3hhqrVGM0ulFOp5NlWeUAseagPmY2vdXHGmmMUmrbto6DPyilraYwNwQ+ZgC99Y819bHdbmfbdjk2QpcbJQiCxWJR/C3Px4CO9DLO43OFzYat+UEQaJf2ZbfbyVgRGfIzABXHeVBKy8dF1c6tCa264JmevxE0B+MVn4XbFdaqC17AqErSVGT5WCe9Q+v1WvGbLI7j+XxeebNtF7zivxE8yTDzoJu/qpzETDBm6kpjTyR8gPwMQMX6WEmapoSQ/mfpN8R1Xe4a4zU+Vl0rG4wE1etjm82mbBNXDUFDIkdjDyV8UDb8geYo7WOMMUKIdlkCeT4GExsvqvuYgqRp+vr62uYTjyd8MLskR4IGPlb84fu+CoZWzChdr9eCfSrlyU34AMaDNj4WBIEKi3i/vr72WT9UOfyBhmjjY5IG3baCUrpYLO7aqcrlCfpHGx9jjCVJomwbYwV50zSBdqh+IdU5t+a1QQgMXKKTjw3IUCmdzCvJEaJ6vOSem+M4fQ7+SJJkMplUkjgLULk8Qf9o6WObzcZ13btrXHfCsCl2IVcD0NLHGGMvLy8tO4IfhFLaVmAqlyfoHy19jDGW57kx6zEKgFwNQHUfG5C69M13QXmCSz40pu9tcTqdZBxWhS5vBrkawccl1Pda2ra93W47P6zv+w+v26NvYQIZaO9jSZJYltVt2pfj8WjbtgpDkPW9LqBEex9jchIRPSMwrQsTdI72PlYgqVY2OLpfF8DM8LEOieP4+e5mFCa4xBAfY4xRSuM4fmbwx/F47Lxq9yQGXBdglI/5vh+G4WOfzfPcsqzj8fj8aZhRmKArzPEx9pxOjsfjGAaOgP4xyscYY4fDwfO8oc8CgC+M8rGC2ypZlmVRFDmO87l2DbFt+/X1tZiuokI/GDAY03zsls1m4zhOFEXn87kculGkn3Yc599//3Uch7vcLxgKcUzUDgN9jH0ubvPr16/5fH65aFzlZ1JK//rrr99//13Ti2cklzGxfLOMiSrnP6jDWB9br9ffv3+vdHZxf2aSJK7r4olxcPI8r8TECpTSMAw9z9MrJprpY4yxKIqiKKq8WfczN5uNdpk7zcPzvCYDAOpiorKLFJnpY6fTyfO828YPwc+cz+eolQ0INybWcRsTu7qBZQjBTB+bzWbcXjLBz0zT1LZtiecE6qmLiQI0iokG+liWZZZlcTeJHwk8z3ts4jN4krqYKKASE1X3McM4HA5l/tjZbEaEXE6KCYJAnCwCyEAQE8XoEhMNXM9D0IAh9rFWVQLQFZ3ERPhYr9zVWB3Q2CA83Kh753p95aRa7vfLR7Jxd4SBPnYZFyuIfQzPioNwV2NNnjtu9nlfTT9lVYitmcbgY40oRt9zG6nEJdjzEt+gQBATxYhi4vtVtuALwQ2AgT7G6ht2BT52Op1c1y3+jqKorACUkRJvyntzMpkIGu6514tdx0TyxXLPGNsvCVdj+2WxU53i6r7rGTRTF2nWW5+mKdfKBCX4QPOxsjQspYavPfBAZ9dlTORwx8f2yx7TBpvpY4yx9XodBEHlzaJH5fb3cncGrK97I01Tx3HqrIx7DpWYeLPPfkm49bHCyGofHOFj7YpgNps1Wej3cDgILrCO6Bg0W4W5RjuX7YrT1f7Wx0h/RmasjzHG8jz3fX8+n1eWwSl/b90OoKTPe6MuJlbOgRsTxed586z4vpryNQYfe6QIikvi+/5utyuHBRwOhyAIVFjRXgaaBs27Ie/hmFhq7MLb+mtlNNnHSvI832w2i8XC87yiiOfzOSEE9nWX/u+N25hICLkbE1v6WC3wMUYIUaf/XlkIIatpUQshpMeKR1dUYiJjbD6fr9drcUxUth1VPx97rP/+kp4bpgdhNe1GXSqUUpNzULm7YvgSbAUhRJ3+e2UhhFx1D4FB0S+i8/vv2x1Bv1/dliuN3RvcIECFUmruY/18V+tjdn5EqcDHmlDjY70ObgAl+kX0mv77FozOx+4NbhCgQinBx3rlql2R038PGBP4GOpoQ6B3REd9rA21gxsEqFBK8LFeuSwC8jdBfYxL5UYZZHADKNEvopO/yeUrma6Kv1scYaQ+9ggqlBJ8rFc+5PH3lZsNdzqKooIwQIl+EV3lHn11MKmU4GO9YtKtIw+UklKMsShxAzVHhVKCj/WKCpdcfVBKSjHGiA4fa44KpQQf6xUVLrn6oJSUYowRHT7WHBVKSYVzeAbNzl734u4HlJJSjDGiw8eao0IpqXAOz6DZ2ete3P2AUlKKMUZ0+FhzVCglFc7hGfQ+ewDUBxEdALlAXQDIBT4GgFygLgDkAh8DQC5QFwBygY8BIBeoCwC5wMcAkAvUBYBc/gc+locAQgdt5AAAAABJRU5ErkJggg==" /><br /><br /><br /><br /><br /><br /><br /><br /><br /><br /><br /><br /><br /><br /><br /><br /><br /><br /><br /><br /><br /><br /><br /><br /><br /><br /><br /><br /><br /><br /><br /><br /><br /><br /><br /><br /><br /><br /><br /><br /><br /><br /><br /><br /><br /><br /><br /><br /><br /><br /><br /><br /><br /><br /><br /><br /><br /><br /><br /><br /><br /><br /><br /><br /><br /><br />Anonymoushttp://www.blogger.com/profile/02733760319647747668noreply@blogger.com0