has a significance which is independent of the choice of the inertial system; but the invariance of the quantity does not at all follow from this. This quantity might be transformed with a factor. This depends upon the fact that the right-hand side of (29) might be multiplied by a factor , independent of . But the principle of relativity does not permit this factor to be different from 1, as we shall now show. Let us assume that we have a rigid circular cylinder moving in the direction of its axis. If its radius, measured at rest with a unit measuring rod is equal to , its radius in motion, might be different from since the theory of relativity does not make the assumption that the shape of bodies with respect to a space of reference is independent of their motion relatively to this space of reference. But all directions in space must be equivalent to each other. may therefore depend upon the magnitude of the velocity, but not upon its direction; must therefore be an even function of . If the cylinder is at rest relatively to the equation of its lateral surface is
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If we write the last two equations of (29) more generally
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then the lateral surface of the cylinder referred to satisfies the equation
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