Page:Eddington A. Space Time and Gravitation. 1920.djvu/219

Suppose a particle moves from ${\displaystyle (x_{1},y_{1},z_{1},t_{1})}$ to ${\displaystyle (x_{2},y_{2},z_{2},t_{2})}$, its velocity ${\displaystyle u}$ is given by ${\displaystyle u^{2}={\frac {(x_{2}-x_{1})^{2}+(y_{2}-y_{1})^{2}+(z_{2}-z_{1})^{2}}{(t_{2}-t_{1})^{2}}}}$ Hence from the formula for ${\displaystyle s^{2}}$${\displaystyle s^{2}=(t_{2}-t_{1}){\sqrt {(1-u^{2})}}}$. (We omit a ${\displaystyle {\sqrt {-1}}}$, as the sign of ${\displaystyle s^{2}}$ is changed later in the chapter.)

If we take ${\displaystyle t_{1}}$ and ${\displaystyle t_{2}}$ to be the start and finish of the aviator's cigar (Chapter i), then as judged by a terrestrial observer, ${\displaystyle t_{2}-t_{1}={\text{60 minutes,}}\quad {\sqrt {(1-u^{2})}}={\text{FitzGerald contraction}}={\tfrac {1}{2}}}$.

As judged by the aviator, ${\displaystyle t_{2}-t_{1}={\text{30 minutes,}}\quad {\sqrt {(1-u^{2})}}=1}$.

Thus for both observers ${\displaystyle s}$ = 30 minutes, verifying that it is an absolute quantity independent of the observer.

The formulae of transformation to axes with a different orientation are ${\displaystyle x=x^{\prime }\cos \theta -\tau ^{\prime }\sin \theta {\text{,}}\quad y=y^{\prime }{\text{,}}\quad z=z^{\prime }{\text{,}}\quad \tau =x^{\prime }\sin \theta +\tau ^{\prime }\cos \theta {\text{,}}}$ where ${\displaystyle \theta }$ is the angle turned through in the plane ${\displaystyle x\tau }$.

Let ${\displaystyle u=i\tan \theta }$, so that ${\displaystyle \cos \theta =(1-u^{2})^{-{\tfrac {1}{2}}}=\beta }$, say. The formulae become ${\displaystyle x=\beta \,(x^{\prime }-iu\tau ^{\prime }){\text{,}}\quad y=y^{\prime }{\text{,}}\quad z=z^{\prime }{\text{,}}\quad \tau =\beta \,(\tau ^{\prime }-iux^{\prime }){\text{,}}}$ or, reverting to real time by setting ${\displaystyle i\tau =t}$, ${\displaystyle x=\beta \,(x^{\prime }-ut^{\prime }){\text{,}}\quad y=y^{\prime }{\text{,}}\quad z=z^{\prime }{\text{,}}\quad t=\beta \,(t^{\prime }-ux^{\prime }){\text{,}}}$ which gives the relation between the estimates of space and time by two different observers.

The factor ${\displaystyle \beta }$ gives in the first equation the FitzGerald contraction, and in the fourth equation the retardation of time. The terms ${\displaystyle ut^{\prime }}$ and ${\displaystyle ux^{\prime }}$ correspond to the changed conventions as to rest and simultaneity.

A point at rest, ${\displaystyle x}$ = const., for the first observer corresponds to a point moving with velocity ${\displaystyle u}$, ${\displaystyle x^{\prime }-ut^{\prime }}$ = const., for the second observer. Hence their relative velocity is ${\displaystyle u}$.