Update 2022-02-17 08:44
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@@ -1,7 +1,7 @@
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<!DOCTYPE html>
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<html lang="en">
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<head>
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<!-- 2022-02-15 Tue 10:14 -->
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<!-- 2022-02-17 Thu 08:42 -->
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<meta charset="utf-8">
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<meta name="viewport" content="width=device-width, initial-scale=1">
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<title>Pre-Quantum Electrodynamics</title>
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@@ -1603,14 +1603,14 @@ calculated from Coulomb's law using the superposition principle. Since each inf
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volume element \(d\tau' = dx' dy' dz'\) contains a charge \(dq' = \rho({\bf r}') d\tau'\), we have
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</p>
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<div class="eqlabel" id="orgaacbc4c">
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<div class="eqlabel" id="org80f5d5c">
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<p>
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<a id="E_vcd"></a><a href="./ems_es_ef_ccd.html#E_vcd"><svg xmlns="http://www.w3.org/2000/svg" width="16" height="16" fill="currentColor" class="bi bi-link" viewBox="0 0 16 16">
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<path d="M6.354 5.5H4a3 3 0 0 0 0 6h3a3 3 0 0 0 2.83-4H9c-.086 0-.17.01-.25.031A2 2 0 0 1 7 10.5H4a2 2 0 1 1 0-4h1.535c.218-.376.495-.714.82-1z"/>
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<path d="M9 5.5a3 3 0 0 0-2.83 4h1.098A2 2 0 0 1 9 6.5h3a2 2 0 1 1 0 4h-1.535a4.02 4.02 0 0 1-.82 1H12a3 3 0 1 0 0-6H9z"/>
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</svg></a>
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</p>
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<div class="alteqlabels" id="orga63a42a">
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<div class="alteqlabels" id="org8cafb4e">
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<ul class="org-ul">
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<li>Gr4 (2.8)</li>
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</ul>
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@@ -1618,7 +1618,7 @@ volume element \(d\tau' = dx' dy' dz'\) contains a charge \(dq' = \rho({\bf r}')
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</div>
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</div>
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<div class="main div" id="orgec825d8">
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<div class="main div" id="orga4c6014">
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<p>
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</p>
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@@ -1638,14 +1638,14 @@ Similarly, if the charge is spread out over a two-dimensional surface \({\cal S}
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\(\sigma({\bf r})\), we have over an infinitesimal area \(da'\) a charge \(dq' = \sigma({\bf r}') da'\), so
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</p>
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<div class="eqlabel" id="org888b2d4">
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<div class="eqlabel" id="org05c97b1">
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<p>
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<a id="E_scd"></a><a href="./ems_es_ef_ccd.html#E_scd"><svg xmlns="http://www.w3.org/2000/svg" width="16" height="16" fill="currentColor" class="bi bi-link" viewBox="0 0 16 16">
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<path d="M6.354 5.5H4a3 3 0 0 0 0 6h3a3 3 0 0 0 2.83-4H9c-.086 0-.17.01-.25.031A2 2 0 0 1 7 10.5H4a2 2 0 1 1 0-4h1.535c.218-.376.495-.714.82-1z"/>
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<path d="M9 5.5a3 3 0 0 0-2.83 4h1.098A2 2 0 0 1 9 6.5h3a2 2 0 1 1 0 4h-1.535a4.02 4.02 0 0 1-.82 1H12a3 3 0 1 0 0-6H9z"/>
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</svg></a>
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</p>
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<div class="alteqlabels" id="org1c64c89">
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<div class="alteqlabels" id="orga2459a8">
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<ul class="org-ul">
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<li>Gr4(2.7)</li>
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</ul>
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@@ -1653,7 +1653,7 @@ Similarly, if the charge is spread out over a two-dimensional surface \({\cal S}
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</div>
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</div>
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<div class="main div" id="orgc7dd9f4">
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<div class="main div" id="org42d7b4e">
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<p>
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</p>
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@@ -1670,14 +1670,14 @@ Similarly, if the charge is spread out over a two-dimensional surface \({\cal S}
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Finally, for a line path \({\cal P}\) with linear charge density \(\lambda({\bf r}')\),
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</p>
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<div class="eqlabel" id="orgd061e06">
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<div class="eqlabel" id="org06a8f83">
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<p>
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<a id="E_lcd"></a><a href="./ems_es_ef_ccd.html#E_lcd"><svg xmlns="http://www.w3.org/2000/svg" width="16" height="16" fill="currentColor" class="bi bi-link" viewBox="0 0 16 16">
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<path d="M6.354 5.5H4a3 3 0 0 0 0 6h3a3 3 0 0 0 2.83-4H9c-.086 0-.17.01-.25.031A2 2 0 0 1 7 10.5H4a2 2 0 1 1 0-4h1.535c.218-.376.495-.714.82-1z"/>
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<path d="M9 5.5a3 3 0 0 0-2.83 4h1.098A2 2 0 0 1 9 6.5h3a2 2 0 1 1 0 4h-1.535a4.02 4.02 0 0 1-.82 1H12a3 3 0 1 0 0-6H9z"/>
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</svg></a>
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</p>
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<div class="alteqlabels" id="org10e4939">
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<div class="alteqlabels" id="orgad30056">
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<ul class="org-ul">
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<li>Gr (2.6)</li>
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</ul>
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@@ -1685,7 +1685,7 @@ Finally, for a line path \({\cal P}\) with linear charge density \(\lambda({\bf
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</div>
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</div>
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<div class="main div" id="orgc75b9df">
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<div class="main div" id="org012e6b5">
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<p>
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</p>
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@@ -1699,7 +1699,7 @@ Finally, for a line path \({\cal P}\) with linear charge density \(\lambda({\bf
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</div>
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<div class="example div" id="org3ece200">
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<div class="example div" id="org5a39a97">
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<p>
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<b>Example</b>
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</p>
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@@ -1733,7 +1733,7 @@ most easily by observing that \(\frac{d}{dx} \left( \frac{x}{\sqrt{z^2 + x^2}} \
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= \frac{1}{\sqrt{z^2 + x^2}} - \frac{x^2}{(z^2 + x^2)^{3/2}} = \frac{z^2}{(z^2 + x^2)^{3/2}}\),
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leading to
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</p>
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<aside id="org1e05cd8">
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<aside id="orgfa08493">
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<p>
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You could alternately proceed by using changes of variables \(y = zx\) followed by \(y = \tanh \alpha\):
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\(\int_{-L}^L \frac{dx}{(z^2 + x^2)^{3/2}} = \frac{1}{z^2}
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@@ -1790,7 +1790,7 @@ target="_blank">Creative Commons Attribution 4.0 International License</a>.
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</div>
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<div id="postamble" class="status">
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<p class="author">Author: Jean-Sébastien Caux</p>
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<p class="date">Created: 2022-02-15 Tue 10:14</p>
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<p class="date">Created: 2022-02-17 Thu 08:42</p>
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<p class="validation"></p>
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</div>
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