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sour_kremlin
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Homework Statement
Two powerless rockets are on a collision course. The rockets are moving with speed v = 0.800c (rocket 1) and v = -.600c (rocket 2) and are initially 2.52 * 10^12m apart as measured by Liz, an Earth observer. Both rockets are 50m long as measured by Liz.
a) What are their respective proper lengths?
b) What is the length of each rocket as measured by an observer in the other rocket?
c) According to Liz, how long before the rockets collide?
d) According to rocket 1, how long before they collide?
e) According to rocket 2, how long before they collide?
f) If both rocket crews are capable of total evacuation within 90 minutes will there be any casualties?
Homework Equations
t = \gamma t_0
L \gamma = L_0
\Delta x' = \gamma ( \Delta x - v \Delta t )
\Delta t' = \gamma ( \Delta t - v \Delta x )
u'_x = \frac{ u_x - v }{1 - u_x v }
The Attempt at a Solution
I think parts a) through c) are correct.
a) Rocket 1's proper length is given by L \gamma = \frac{50m}{\sqrt{1 - .8^2}} = 83.33m
Similarly for Rocket 2, L_0 = \frac{50m}{\sqrt{1 - .6^2}} = 62.5m.
b) Approach: find the speed of rocket 2 relative to rocket 1, then use length contraction.
Let S be the reference frame of rocket 1, S' be the reference frame of the Earth, and the subscript 2 represent rocket 2. Then the velocity of rocket 2 wrt rocket 1 is \frac{v_{S'2} + v_{S'S}}{1 + v_{S'2} v_{S'S}} = -.946c
The length of rocket 1 measured by rocket 2 would then be \frac{L_0}{\gamma} = 83.33m \sqrt{1 - .946^2} = 27.01m
The length of rocket 2 measured by rocket 1 would be 62.5m \sqrt{1 - .946^2} = 20.26m.
c) I get t = 6020s = 100.3 min.
d) This is where things get messed up. The time interval that Liz measures is not proper because the defining events: the initial position of the rocket 1 and the collision do not occur at the same point in space. The initial position and the collision in rocket 1's reference frame is at the same point in space in rocket 1's frame, so that time is proper.
And the link between proper time and some other time should be given by the time dilation formula. The time before the collision in rocket 1's frame is then t_0 = 6020s \sqrt{1 - .8^2} = 3612s = 60.2 minutes.
I've been told that this is wrong though, and that the method for getting the correct answer involves using length contraction on the distance that Liz measures and the velocity of rocket 2 wrt rocket 1 found in part b). This makes sense to me. What doesn't make sense is why my other approach doesn't work. To do this, I assume that Liz measures the distance between the rockets simulatenously (the length she measures is proper). When I do it this way, I get rocket 1 has 84 minutes and rocket 2 has 112 minutes. Completely different than what I was get using my other line of reasoning!
After my initial approach failed, I tried to use the Lorentz transforms to solve this and ran into even more problems. Let \Delta t' = \gamma ( \Delta t - v \Delta x ) where S' is rocket 1's frame and S is Liz's frame. Liz measures a different position and time for each event: in her frame the rocket moves from (x_1, t_1) to (x_2, t_2). In rocket 1's frame, though, the two events happen at the same point in space. It moves from (x'_1, t'_1) to (x'_1, t'_2). So \Delta x' = 0, while \Delta x, \Delta t, and \Delta t' \neq 0.
If I use the Lorentz transform for \Delta t' = \gamma ( \Delta t - v \Delta x ), then my earlier application of time dilation seems incorrect. The Lorentz transform doesn't reduce to the time dilation equation. I tried to plug in numbers here: the time Liz measures before the collision occurs is \Delta t = 6020s, the distance rocket 1 travels in Liz's frame before the collision occurs is \Delta x = 1.44 * 10^{12} m, and the speed connecting the frames is .800c. This calculation gives me \Delta t' = 6019s, which is way too close to the time Liz measures to make sense.
But, if I use the Lorentz transform for \Delta t = \gamma ( \Delta t' - v \Delta x' ), then the \Delta x' goes away and I get time dilation. But how can this be? I seem to be getting completely different relationships between Liz's time and rocket 1's time. So my attempt to use the Lorentz transform just left me more confused. I'm obviously doing something gravely wrong.
Sorry for the long post. Any help is much appreciated.
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