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Physics 3313 - Lecture 2. Monday January 26, 2009 Dr. Andrew Brandt. Special Relativity Galilean Transformations Time Dilation and Length Contraction. CH. 1 Relativity (Motion). What do we mean by motion? Throw a ball, fly in an airplane…
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Physics 3313 - Lecture 2 Monday January 26, 2009 Dr. Andrew Brandt • Special Relativity • Galilean Transformations • Time Dilation and Length Contraction 3313 Andrew Brandt
CH. 1 Relativity (Motion) • What do we mean by motion? • Throw a ball, fly in an airplane… • If you are watching the ground while you fly, you see • motion, but if you are watching the seat in front of you • you don’t. • Motion: Change of position relative to something else • Frame of reference is a part of description of motion • 1905 Einstein Special Relativity (2005 World Year of Physics to celebrate) treats inertial frames of reference where Newton’s First law holds • (remember that ? ) • Body at rest stays at rest, body in motion stays in motion with constant velocity if no external force) • What about if there is a force? 3313 Andrew Brandt
Inertia/Relativity • Any frame moving with constant velocity relative to an inertial frame is • itself an inertial frame • This implies that there is no universal frame of motion—everything is relative • (especially in West Virginia) • Person in car moving at constant velocity relative to person on ground equivalent to person on ground moving at same speed next to car • (although he might get tired running 40 mph –backwards) • General Relativity 10 years later (still Einstein) deals with accelerated reference frames and gravity (harder math—graduate class) 3313 Andrew Brandt
Special Relativity • Postulates : • Laws of physics are the same in all inertial frames • The speed of light in free space is a constant in all inertial frames • Sounds fast! Is something misssing? • What if it was mirons/millenium. Need units in physics!!! • m/sec in this case; 186,000 miles/second 3313 Andrew Brandt
Galilean Coordinate Transformation(A1) • Suppose an observer is in an inertial reference frame S, when an event occurs • What are its time and place in a frame S’ moving at constant velocity with respect to frame S? • Is S’ an inertial frame? • To get this relationship, suppose clocks started when origins of two frames coincide, then as S’ moves along x axis, measurements in S will be greater than S’ by vt (velocity x time) • Can also consider the case where the event is fixed at the origin of the S’ frame (S’ frame represents the moving ojbect). After some time the value of the origin of the S’ frame is still zero, but the distance to the origin in the S frame is x=vt • Generalized to any point x = x’+ vtor can rewrite: 3313 Andrew Brandt
Galilean Coordinate Transformation • Suppose two events are separated by x and t • Can divide two equations to obtain • Take limit • But this does not work according to special relativity: shine a flashlight in a car moving with velocity v; in S’ frame vx’=c so in S frame vx=v+c (Einstein says not Allowed!) • SPACE and TIME not absolute: Depend on Relative motion velocity addition 3313 Andrew Brandt
Time Dilation • Time Dilation: = moving clocks run slow • Measurements of time intervals affected by relative motion • Person on a spaceship measures time interval between two events as • On ground measure • Proper time is the time interval between two events at the same place in an observers frame • If that frame is moving with respect to an observer on ground , the observer will see the events occurring at different places, so the duration appears longer (hence time dilation) 3313 Andrew Brandt
Light Clock At Rest: Moving with velocity v: 3313 Andrew Brandt
Light Clock Math • Pythagorean Theorem (an oldie, but a goodie) : simplify: solve for t take sqrt Is >, < or =1 for v<c? often use effect is reciprocal (spaceship guy sees zig-zag pattern of ground clock while his ticks normally )—who is observer!! 3313 Andrew Brandt
Lorentz Transform • General relationship between P=x,y,z,t in frame S and P’=x’,y’,z’,t’ in frame S’ (derived in Appendix); these assume measurements made in S frame and want to transfer to S’ frame • or • and • note for time dilation derivation we did special case of x=0 so we got t’=t and no extra term • Suppose v<<c then =1 and Lorentz transform reduces to Galilean one • Inverse transformation 3313 Andrew Brandt
Time Dilation Example • Muons are essentially heavy electrons (~200 times heavier) • Muonsare typically generated in collisions of cosmic rays in upper atmosphere and, unlike electrons, decay ( sec) • For a muon incident on Earth with v=0.998c, an observer on Earth would see what lifetime of the muon? • 2.2 sec? • t=35 sec • Moving clocks run slow so when an outside observer measures, they see a longer time than the muon itself sees. 3313 Andrew Brandt
Length Contraction • Proper length (length of object in its own frame: • Length of object in observer’s frame: >1 so the length is shorter in the direction of motion 3313 Andrew Brandt
More about Muons • 1/cm2/minute at Earth’s surface (so for a person with 600 cm2 that would be 600/60=10 muons/sec passing through!) • They are typically produced in atmosphere about 6 km above surface of Earth and frequently have velocities that are a substantial fraction of speed of light, v=.998 c for example • How do they reach the Earth? • We see the muon moving so t=35 sec not 2.2 sec , so they can travel 16 time further, or about 10 km, so they easily reach the ground • But riding on a muon, the trip takes only 2.2 sec, so how do they reach the ground??? • Muon-rider sees the ground moving, so the length contracts and is only • At 1000 km/sec, it would take 5 seconds to cross U.S. , pretty fast, but does it give length contraction? (for v=0.9c, the length is reduced by 44%) 3313 Andrew Brandt
Twin Paradox • Famous relativistic example: Carla and Darla 20 years old • Darla travels to a planet 20 light-years away at 0.8c • To Carla, Darla’s life (clock) is slower by • Darla’s heart beats 3 times for every 5 of Carla • Round trip takes 50 years (according to Carla) • So she knows she is 70 and thinks Darla should have aged only 30 years and should be 50 years old • But … according to SR, it looks to Darla like Carla is the moving one! • So who is 70, and who is 50, or what? • Darla changed inertial frames in accelerating from 0 to 0.8c, decelerating to stop, etc., so time dilation only applies to Carla’s observations since she stayed in inertial frame (so shes right—and old) • Verified by airline trip around world (not the 20 years part!) 3313 Andrew Brandt
Velocity Addition (Appendix) • ~Worth reading 1.6 on connection of electricity and magnetism; electric charge Q is relativistically invariant (same in all frames). • Galilean Velocity addition where and • From inverse Lorentz transform and • So • Thus ; Note this relativistic velocity addition for gives Observer in S frame measures c too! Strange but true! 3313 Andrew Brandt
Velocity Addition Example • Lance is riding his bike at 0.8c relative to observer. He throws a ball at 0.7c in the direction of his motion. What speed does the observer see? • What if he threw it just a bit harder? • Doesn’t help—asymptotically approach c, can’t exceed (it’s not just a postulate it’s the law) 3313 Andrew Brandt