<
evanesce...@gmail.com> wrote in message
news:8b327177-fac3-4216...@googlegroups.com...
Yes, it's to do with Galilean transformations, but these are simple to
understand, e.g. if I'm riding a bike at 10mph and throw a ball forwards at
5mph (relative to me on the bike), the ball's speed relative to the ground
is 15mph ( = 10mph + 5mph ). Relative velocities in Galilean
transformations just add and subtract like we would intuitively expect...
Lets write V for the speed of sound in metres per second.
Speed of sound relative to stationary frame (air not moving) is V.
Speed of train relative to stationary frame (air not moving) is (1/12)V.
Speed of sound (travelling forwards) in train frame = V - (1/12)V =
(11/12)V.
Distance sound travels forwards in train frame =
distance from gun to guard's van = V (metres). [Given in problem]
So time taken for sound wave (travelling forwards) in train frame =
distance/speed = V / [(11/12)V] = 12/11 (seconds).
The calculation for the echo travelling backwards is similar:
Speed of sound (travelling backwards) in train frame = V + (1/12)V =
(13/12)V.
Distance sound travels forwards in train frame =
distance from gun to guard's van = V (metres). [Given in problem]
So time taken for sound wave (travelling backwards) in train frame =
distance/speed = V / [(13/12)V] = 12/13 (seconds).
Total time = 12/11 + 12/13 = (156 + 132)/(11*13)
= 288 / 143
= 2 + 2/143
Regards,
Mike.
> Thanks for your time.