Explain the postulates of special relativity in simple terms. State them and give specific scenarious for each that can be observed on being a doctor or any medical-allied profession.
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Explain the postulates of
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- Suppose you are planning a trip in which a spacecraft is to travel at a constant velocity for exactly six months, as measured by a clock on board the spacecraft, and then return home at the same speed. Upon return, the people on earth will have advanced exactly 76 years into the future. According to special relativity, how fast must you travel? (Give your answer with six significant digits as a multiple of c.)Consider some inertial observers S, S' and S" in the standard configuration and such that observer S' has velocity v₁ with respect to S, whilst S" has velocity v₂ with respect to S'. Then, according to the Newtonian Framework (i.e., using Galilean transformations), the velocity of S" with respect to S is: Select one: O a. -V₁ + V₂ O b. V₁ + 2 V₂ OC. V₁ V₂ O d. V₁ + V₂Question 32 and 33 please
- Which of the following inertial reference frames are proper frames for the two events listed? Choose all that apply. O RED FRAME: A stationary particle decayed in 8 jus. Event A was when it came into being (when it was 'born') & event B was when it decayed (when it 'died'). QORANGE FRAME: Event C happened at (8 m, 6 m, -9 m) and event D happened at (8 m, 6 m, -8 m). O YELLOW FRAME: The distance between where event E occurred and where event F occurred was 0 m. O GREEN FRAME: A rocket was traveling at a constant velocity when it passed through a stationary tunnel. Event G was the front of the rocket entering the tunnel and event H was the tail of the rocket entering the tunnel. O BLUE FRAME: A stationary rocket was engulfed by a hollow cylinder that was moving at a constant velocity. Event J was the front of the rocket entering the cylinder and event K was the tail of the rocket entering the cylinder.One of the classic paradoxes of special relativity is the pole/barn paradox. The setup: a person carrying a 20.0 m pole runs at relativistic speeds at a 15.0 m long barn (with doors open on both ends). According to the observer on the ground frame of reference, which we'll call S (like the textbook does), if the person runs sufficiently fast enough, the pole will contract (in length, according to the Lorentzian transformations, so that it will be short enough to fit inside the barn. To give a contrast, the door opening width in the barn (measured perpendicular to the runner's motion) is 5.00 m. However, from the person carrying the pole frame of reference (which we will call S'), it is the barn that contracts in length, with the pole staying 20.0 m long, and the pole will never fit inside the barn. Which scenario is correct? How can the paradox be resolved? 1. Let the pole speed be 0.662c. Use the Lorentz transformation equations to calculate the following quantities (then fill in the…Please type instead of hand writting
- Paragraph Styles Voice Sensitivity Ed 2. Two objects are moving at the same speed of u = 2.25 x 10° ms-1 but in directions perpendicular to each other. Derive the relative speed between the two objects: a) based on the classical, Galilean, velocity transformation formulas; and b) based on the velocity transformation formulas of special relativity. ge 1 of 2 276 words A General\All Employees (unrestricted) EO * Accessibility: Good to go D Focus 15°C Light rain 09 Cop 13 f4 15 16 f8 to 110 112 2 米 insert prt sc 144 11 4AA 24 & 7 8. backs 3 4 LOA millonairess was told in 1995 that she had exactly 15 years to live. However if she travels awayfrom the Earth at 0.8c and then returns at the same speed, the last New Year's day the doctors expecther to celebrate is ___________ This is about special relativity : time dilation, please include step by step so i could learn from it.Please type instead of hand writting
- Please derive the Lorentz transformation equations for velocities. For an object, the velocity components seen in reference frame S are: ??, ??, ??. There is a reference frame S’ is moving relative to reference frame S in the direction of +?̂. Derive ?′?, ?′?, ?′?. Please show your derivation details.Please solve the following special relativity question. Please explain each step with details and concepts. This is review for an examPlease help. Thank you