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Logarythmic
Jan21-07, 06:25 AM
How can I show that

1+z=\sqrt{\frac{1+v/c}{1-v/c}}

becomes z \simeq v/c for small velocities? Please give me a hint.
cristo
Jan21-07, 06:36 AM
Try writing the right hand side as (1+v/c)^{1/2}(1-v/c)^{-1/2}. Can you expand this?
Logarythmic
Jan21-07, 07:14 AM
So

1+z=\frac{\sqrt{1+\beta}}{\sqrt{1-\beta}}\simeq \left( 1+\frac{1}{2}\beta-\frac{1}{8}\beta^2+... \right) \left( 1+\frac{1}{2}\beta+\frac{3}{8}\beta^2+... \right) = 1+\beta+\frac{5}{8}\beta^2+...=1+\frac{v}{c}

Correct?
cristo
Jan21-07, 07:23 AM
Yup, that's correct.
sara_87
Jan21-07, 07:45 AM
cristo scroll up, lol
Gib Z
Jan21-07, 08:28 PM
I would think there was an easier way...v is approaching zero, sub v=0 into the right hand side and its easy to see z is also approaching zero...

PS: Cristo has 666 posts...ooh