An observer in a reference frame s notes that two events are separated in space by 220m and in time by 0.8μs. How fast must a reference frame s' be
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A: x' coordinate of the event is 382 m.Explanation:
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A: The x'- coordinate of the event is 382 m, measured by Jose in S' frame.Explanation:
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An observer in a reference frame s notes that two events are separated in
space by 220m and in time by 0.8μs. How fast must a reference frame s' be
moving relative to s in order for an observer in s' to detect the two events as
occurring at the same location in space
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- A muon is determined to live for 2.2E[-6]s in the muon's rest reference frame. If a muon is traveling near the speed of light relative to an observer, the observer will measure the duration of the muon's life to be ...Jose is at rest in System S' that has a velocity u = +0.46c relative to system S, where Cisco is at rest. The clocks of S and S' are synchronized at t = t' = 0 when the origins O and O' coincide. An event is observed in both systems. The event takes place at x = 574 m and at time t = 1.70 μs, as measured by Cisco in S. What is the x'-coordinate of the event in meters, measured by Jose in S'? Please give your answer with no decimal places.An observer measures a spacecraft’s length to be exactly half of its rest length. a) What is the speed of the ship relative to the observer’s frame of reference? b) By what factor do the spaceship’s clocks run slow relative to clocks in the observer’s frame?
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- At relativistic speeds near that of light, the half-life of an unstable particle moving at high speed is longer than when it is at rest. an object is longer when moving than when it is stationary. O light emitted by a moving source moves at the same speed with the same frequency. effects precede causes in some inertial frames. lengths and times only appear different and have no effect on other measurable quantities.You and vouur archenemy pass each other in rockets that are each traveling 0.2c relative to the other. You observe that your rocket (which you have measured to be 281 m Jong ten times as long as your archenemy's spaceship. How long is your rocket in your archenemy's frame? How long is your archenemy's rocket in their frame?A rocket measures 100 m long in its own frame (S') and is travelling at 0.995c relative to a frame S. At the tail of the rocket, a laser sends out a pulse of light which is reflected by a mirror at the nose of the rocket. (a) At what time after emission, measured in S', does the light pulse arrive back at the tail of the rocket? (b) At what time after emission, measured in S, does the light pulse arrive back at the tail of the rocket? (c) What is the spatial distance, measured in S, between the emis- sion of the pulse and its arrival back at the tail of the rocket? (d) At what time after emission, measured in S, does the light pulse hit the mirror? (e) What is the spatial distance, measured in S, between the emis- sion of the pulse and its hitting the mirror? (f) Can you conclude from your answers that the light pulse travelled at a different speed, as seen in S, on its way to the mirror than on the way back? If not, explain your results