The relative velocity, denoted
vB\mid
vBA
vBA}
vB\mid=\|vB\mid\|
We begin with relative motion in the classical, (or non-relativistic, or the Newtonian approximation) that all speeds are much less than the speed of light. This limit is associated with the Galilean transformation. The figure shows a man on top of a train, at the back edge. At 1:00 pm he begins to walk forward at a walking speed of 10 km/h (kilometers per hour). The train is moving at 40 km/h. The figure depicts the man and train at two different times: first, when the journey began, and also one hour later at 2:00 pm. The figure suggests that the man is 50 km from the starting point after having traveled (by walking and by train) for one hour. This, by definition, is 50 km/h, which suggests that the prescription for calculating relative velocity in this fashion is to add the two velocities.
The diagram displays clocks and rulers to remind the reader that while the logic behind this calculation seem flawless, it makes false assumptions about how clocks and rulers behave. (See The train-and-platform thought experiment.) To recognize that this classical model of relative motion violates special relativity, we generalize the example into an equation:
\underbrace{vM\mid
vM\mid
vM\mid
vT\mid
Fully legitimate expressions for "the velocity of A relative to B" include "the velocity of A with respect to B" and "the velocity of A in the coordinate system where B is always at rest". The violation of special relativity occurs because this equation for relative velocity falsely predicts that different observers will measure different speeds when observing the motion of light. [1]
The figure shows two objects A and B moving at constant velocity. The equations of motion are:
rA=rAi+vAt,
rB=rBi+vBt,
where the subscript i refers to the initial displacement (at time t equal to zero). The difference between the two displacement vectors,
rB-rA
rB-rA=\underbrace{rBi-rAi
Hence:
vB\mid=vB-vA.
After making the substitutions
vA|C=vA
vB|C=vB
vB\mid=vB\mid-vA\mid ⇒
vB\mid=vB\mid+vA\mid.
To construct a theory of relative motion consistent with the theory of special relativity, we must adopt a different convention. Continuing to work in the (non-relativistic) Newtonian limit we begin with a Galilean transformation in one dimension:[2]
x'=x-vt
t'=t
dx'=dx-vdt
dt'=dt
| dx' | = | |
| dt' |
| dx | |
| dt |
-v
dx/dt=vA\mid
dx'/dt=vA\mid
O
O'
v=vO'\mid
vA\mid=vA\mid-vO'\mid ⇒ vA\mid=vA\mid+vO'\mid,
where the latter form has the desired (easily learned) symmetry.
As in classical mechanics, in special relativity the relative velocity
vB|A
vB|A=-vA|B
This peculiar lack of symmetry is related to Thomas precession and the fact that two successive Lorentz transformations rotate the coordinate system. This rotation has no effect on the magnitude of a vector, and hence relative speed is symmetrical.
\|vB|A\|=\|vA|B\|=vB|A=vA|B
In the case where two objects are traveling in parallel directions, the relativistic formula for relative velocity is similar in form to the formula for addition of relativistic velocities.
| v | |||||||
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The relative speed is given by the formula:
| v | |||||||
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In the case where two objects are traveling in perpendicular directions, the relativistic relative velocity
vB|A
| v | ||||
|
where
| \gamma | |||||||||
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The relative speed is given by the formula
vB|A=
| |||||||||||||||||||
The general formula for the relative velocity
vB|A
vB|A=
| 1 | |||||||||
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\left[vB-vA+vA(\gammaA-1)\left(
| vA ⋅ vB | ||||||
|
-1\right)\right]
where
\gammaA=
| 1 | ||||
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The relative speed is given by the formula
| v | ||||||||||||||||||||||||||||||||||
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r'=r-vt