15.23: Algunos resultados matemáticos

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Antes de continuar con la siguiente sección, solo quiero establecer pocos resultados matemáticos, para que no nos empantanemos en álgebra pesada más adelante cuando deberíamos estar concentrándonos en entender la física.

Primero, si

\[ \gamma=\left(1-\frac{u^{2}}{c^{2}}\right), \label{15.23.1} \]

Entonces, por diferenciación trivial,

\[ \frac{d\gamma}{du}=\frac{\gamma^{3}u}{c^{2}}. \label{15.23.2} \]

\[ \dot{\gamma}=\frac{\gamma^{3}u\dot{u}}{c^{2}}. \label{15.23.3} \]

A partir de esto, rápidamente encontramos que

\[ \frac{\gamma u\dot{u}}{\dot{\gamma}}=c^{2}-u^{2}. \label{15.23.4} \]

Ahora para un pequeño resultado relativo a un producto escalar (punto).

Que A sea un vector tal que A * A =\( A^{2}\).

Entonces

\( \frac{d}{dt}(A^{2})=2A\dot{A}\) and \( \frac{d}{dt}(\bf{A\cdot A})=2A\cdot\dot{A}\)

\[ A\cdot\dot{A}=A\dot{A} \label{15.23.6} \]

Ahora podemos pasar con seguridad a la siguiente sección.

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