Relativistic snapshot (Posted on 2006-05-26)

	Submitted by Tristan
Rating: 3.3333 (3 votes)
Solution:	(Hide)
This problem requires distinction between what is observed and what is calculated from these observations. If you were to film the tunnel as it passes by, you would be able to calculate that the tunnel is 100 km, exactly as given, and as predicted by the Theory of Special Relativity. The calculations that lead to this require the knowledge that light is not instantaneous. If light originates 100 km away, it takes about a third of a thousandth of a second to reach you. During this time, the light source may have moved. The tunnel travels .5 c (where c is the speed of light), so the velocity of light relative to the velocity of the tunnel from my frame of reference should be .5 c if I'm looking forwards, and 1.5 c if I'm looking backwards. If I'm looking backwards, the time required for light to reach from one end to the other is 100 km / (1.5 c). During this time, the closer end will have traveled 100/3 km away from me. Therefore, the tunnel would look about 66.7 km if I were looking out the back window. If I'm looking forwards, the time required for light to reach from one end to the other is 100 km / (.5 c), during which the closer end would have traveled 100 km towards me. Therefore, the tunnel would look twice as long, 200 km, if I were looking out the front window. 200 km, front window

	Subject	Author	Date
	Puzzle Thoughts	K Sengupta	2023-05-06 00:02:05
	re: false!	Tristan	2007-02-28 03:06:35
	false!	matt	2006-08-06 12:39:31
	dfntly nt th sltn	Leming	2006-06-12 16:53:23
	re(5): Solution	Eric	2006-06-07 00:21:52
	re(4): Solution	Ken Haley	2006-06-06 01:56:59
	re(3): Solution	Tristan	2006-06-04 09:29:42
	re(2): Solution	Ken Haley	2006-05-30 02:05:05
	re: Solution	tomarken	2006-05-29 07:41:03
	Solution	Ken Haley	2006-05-29 01:41:32
	re: A Question	Tristan	2006-05-26 16:41:19
	A Question	tomarken	2006-05-26 16:19:54