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Display information for equation id:math.2174.36 on revision:2174

* Page found: Transformationsverhalten der Ströme und Felder (eq math.2174.36)

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TeX (original user input):

\begin{align}
& B{{\acute{\ }}^{1}}=\frac{1}{c}F{{\acute{\ }}^{32}}=\frac{1}{c}{{U}^{3}}_{\lambda }{{U}^{2}}_{\kappa }{{F}^{\lambda \kappa }}=\frac{1}{c}{{F}^{32}}={{B}^{1}} \\
& B{{\acute{\ }}^{2}}=\frac{1}{c}F{{\acute{\ }}^{13}}=\frac{1}{c}{{U}^{1}}_{\lambda }{{U}^{3}}_{\kappa }{{F}^{\lambda \kappa }}=\frac{1}{c}{{U}^{1}}_{\kappa }{{F}^{\kappa 3}}=-\frac{\beta \gamma }{c}{{F}^{03}}+\frac{\gamma }{c}{{F}^{13}}=\gamma \left( {{B}^{2}}+\frac{v}{{{c}^{2}}}{{E}^{3}} \right) \\
\end{align}

TeX (checked):

{\begin{aligned}&B{{\acute {\ }}^{1}}={\frac {1}{c}}F{{\acute {\ }}^{32}}={\frac {1}{c}}{{U}^{3}}_{\lambda }{{U}^{2}}_{\kappa }{{F}^{\lambda \kappa }}={\frac {1}{c}}{{F}^{32}}={{B}^{1}}\\&B{{\acute {\ }}^{2}}={\frac {1}{c}}F{{\acute {\ }}^{13}}={\frac {1}{c}}{{U}^{1}}_{\lambda }{{U}^{3}}_{\kappa }{{F}^{\lambda \kappa }}={\frac {1}{c}}{{U}^{1}}_{\kappa }{{F}^{\kappa 3}}=-{\frac {\beta \gamma }{c}}{{F}^{03}}+{\frac {\gamma }{c}}{{F}^{13}}=\gamma \left({{B}^{2}}+{\frac {v}{{c}^{2}}}{{E}^{3}}\right)\\\end{aligned}}

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B ´1=1cF ´32=1cU3λU2κFλκ=1cF32=B1B ´2=1cF ´13=1cU1λU3κFλκ=1cU1κFκ3=βγcF03+γcF13=γ(B2+vc2E3)
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  • Uλ
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  • c
  • F
  • B
  • B
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  • F
  •  ´
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  • Uλ
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  • c
  • Uκ
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  • γ
  • B
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