Chewy0087
Feb5-09, 08:08 AM
1. The problem statement, all variables and given/known data
Show the derivation for legnth contraction, given that from the example given;
The example shows a moving light clock - two walls which are moving in a direction at speed u and a beam of light from wall A to wall B then back to A and so forth.
From Ao (starting point) to B1 (distance moved after the beam has got there)
=t1 = "Moving" legnth / c - u
And from B1 - A2
t1 (2) = "Moving" Length / c + u
2. Relevant equations
t subscript 1 = 2L / c * sqroot (1 - u²/c²)
Basically the time dilation equation is given (and i managed to work out in an earlier question)
3. The attempt at a solution
Well I added up t1 and t1 (2), to get the time taken by the light to do one back and forth getting;
t1 + t1(2) = gamma*time = 2 * Moving Length / c*(1- u²/c²)
Making Moving length the subject;
Moving Length = (c*(gamma*time))*(1-u²/c²)
Put gamma into the equation;
Moving Length = (c/2)*(1-u²/c²)*2L/(c*sqrt(1-u²/c²))
And from here i'm totally stuck, I do know that the final answer is "Normal" length / gamma but really stuck taking the final steps... :/
Any help would be appreciated
Show the derivation for legnth contraction, given that from the example given;
The example shows a moving light clock - two walls which are moving in a direction at speed u and a beam of light from wall A to wall B then back to A and so forth.
From Ao (starting point) to B1 (distance moved after the beam has got there)
=t1 = "Moving" legnth / c - u
And from B1 - A2
t1 (2) = "Moving" Length / c + u
2. Relevant equations
t subscript 1 = 2L / c * sqroot (1 - u²/c²)
Basically the time dilation equation is given (and i managed to work out in an earlier question)
3. The attempt at a solution
Well I added up t1 and t1 (2), to get the time taken by the light to do one back and forth getting;
t1 + t1(2) = gamma*time = 2 * Moving Length / c*(1- u²/c²)
Making Moving length the subject;
Moving Length = (c*(gamma*time))*(1-u²/c²)
Put gamma into the equation;
Moving Length = (c/2)*(1-u²/c²)*2L/(c*sqrt(1-u²/c²))
And from here i'm totally stuck, I do know that the final answer is "Normal" length / gamma but really stuck taking the final steps... :/
Any help would be appreciated