I had some doubt solving the following problem regarding :
There is a rocket travelling away in space, and an asteroid approaching it with a speed 0.24c relative to the rocket. The distance is 14.4 light minutes as measured from the rocket. How much time does the rocket have to escape the trajectory ?
This part is extremely easy, and the answer is 60 min which i got correct.
The next part of the question is, how much time passed on a clock on the asteroid.
Case 1 : Considering the Rocket in rest S and asteroid S':
At first I considered the rocket to be at rest and asteroid moving right to left. So velocity was negative and so was delta x ( because of change in direction ).Thus I got the time on asteroid to be 58.25 min.
Case 2 : Considering the Asteroid in rest S and Rocket S' :
This is what I did. Assuming, here the asteroid was at rest, and rocket moving from right to left. In this case the time was known i.e. 58.25 min. I wanted to get back the time on the rocket. I got 56 min instead of my original 60 min.
Correction: in the list line I wrote speed instead of time.
The time spent in the rocket is not matching in case 1 and case 2, and I'm inclined to believe, this is because of the relativity of simultaneity. But shouldn't lorentz transformation, automatically take care of that ? Based on this problem, I think there is a large fallacy in my understanding of lorentz transformations. Some people have pointed out that case 2 is nothing but the inverse lorentz transformation of case 1. However, I'm failing to understand the fallacy here. Why can I not do Case 1 and Case 2 separately and get the same result independently ?
Thanking you.
EDIT : Is it my definition of Events and their locations in Case 2, that is causing the problem ? If I put del x = 0, then the problem gets resolved again.
