5. A particle with a ‘proper’ lifetime (i. e. in its own rest frame) of 885. s is traveling towards earth with a speed of v=0.5 c. a. In its own rest frame, how far this particle travel, in m, during one lifetime (885 s)? b. In the earth’s rest frame, how far does the particle travel in 885 s?
5. A particle with a ‘proper’ lifetime (i. e. in its own rest frame) of 885....
A subatomic particle has a 410 ns lifetime in its own rest frame. If it moves through the lab at 0.980 c, how far does it travel before decaying, as measured in the lab?
The average lifetime of a pimeson in its own frame of reference (l.e., the proper lifetime) is 2.6 x 10s. (a) If the meson moves with a speed of 0.99c, what is its mean lifetime as measured by an observer on Earth? (b) What is the average distance it travels before decaying, as measured by an observer on Earth? (c) What distance would it travel if time dilation did not occur? m Need Help? Read Master it
A pion is an unstable particle that has a mean lifetime of 2.55 x 10^-8 s. Thi si the time interval between its creation in a nuclear process and its extinction into decay products, as measured in a frame of reference at rest with respect to the pion. An average pion is traveling at 0.230 c relative to Earth. How far does it travel in its lifetime, relative to Earth?
A barn of length 10m in its own rest frame sits on the earth. A 10m proper length rocket attempts to fly through the barn at a speed of 0.8c, but the doors on both ends of the barn close simultaneously trapping it inside. a) What is the length of the rocket measured in the barn reference frame? What is the length of the barn measured in the rocket reference frame? b) How far out of syncronization are the door...
Number 2 please! Thanks! problem 2 i mean. (c) What is the total energy of the muon in its own rest-frame? What is the total energy of the muon in the scientist's rest-frame? (d) What is the kinetic energy of the muon in its own rest-frame? (e) What is the kinetic energy of the muon in the scientist's rest frame? (1) Problem-2 What is the percent difference between the Newtonian and relativistic kinetic energies of the muon? Problem-1 Suppose that...
The Σ− Particle The Σ− is an exotic particle that has a lifetime (when at rest) of 0.15 ns. Part A How fast would it have to travel in order for its lifetime, as measured by laboratory clocks, to be 0.28 ns ? Express your answer using two significant figures. v = c
can someone help me with this ? thanks Tutorial Exercise The average lifetime of a pi meson in its own frame of reference (i.e., the proper lifetime) is 2.6 x 108 s. (a) If the meson moves with a s on Earth? of 0.85c, what is its mean lifetime as measured by an observer (b) What is the average distance it travels before decaying, as measured by an observer on Earth? (c) What distance would it travel if time dilation...
plz help´д` The lifetime of a particular meson at rest is 10-8 second and its mass is 10-25 gram. If its velocity in the laboratory is 2*108 meters per second, how far will it travel in one lifetime, if both distance and lifetime are measured in the laboratory frame?
An unstable particle of mass m decays in time t = 10^-10 s in its own rest frame. If its energy is E = 1000 mc^2 in the lab, how far (in meters) will it move before decaying? (Answer: 30 m)
An unstable high-energy particle is created in the laboratory, and it moves at a speed of 0.994c. Relative to a stationary reference frame fixed to the laboratory, the particle travels a distance of 1.84 × 10-3 m before disintegrating. What is (a) the proper distance and (b) the distance measured by a hypothetical person traveling with the particle? Determine the particle's (c) proper lifetime and (d) its dilated lifetime. Numerical answer is not important...a) I do not understand why 1.84...