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Classical Relativity Galilean Transformations

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Presentation on theme: "Classical Relativity Galilean Transformations"— Presentation transcript:

1 Classical Relativity Galilean Transformations

2 x = x’ + vt x’ = x - vt u = u’ + v u’ = u - v u’ x y x’ y’ P v
Divide equations by t u = u’ + v u’ = u - v

3 Example: A train travels through a station at a constant speed of 8.0ms-1 . One observer sits on the train and another sits on the platform. as they pass each other, they start their stopwatches and take measurements of a dog on the train who is running in the same direction the train is moving. The train observer measures the velocity of the dog to be 2.0ms-1 . What is the velocity relative to the platform observer? After 5s how far has the dog moved according to the observer on the train? After 5s how far has the dog moved according to the observer on the platform? 8.0ms-1

4 Calculate the time for each boat to make a round trip 50 meters out and back along the path shown.
5.0ms-1 5.0ms-1

5 3.0 ms-1 Calculate the time for each boat to make a round trip 50 meters out and back along the path shown. 50m 50m 5.0ms-1 5.0ms-1

6 Michelson-Morley Experiment An experiment using an interferometer to detect the motion of the Earth through the ether.

7 Ether Wind When the entire apparatus is rotated a shift in the interference pattern should occur.

8 Michelson-Morley Experiment There was no shift in the interference pattern showing the ether did not exist, that light could travel through a vacuum, and its speed is independent of the source motion.

9 Special Relativity

10 Inertial Reference Frame
Reference frames in which Newton’s law are valid. Reference frames with constant velocity. Special Relativity only deals with events in inertial reference frames. General relativity deals with non-inertial reference frames.

11 Maxwell’s electromagnetic equations
Unified electricity and magnetism. Predicted the existence of electromagnetic waves. Gave the speed of electromagnetic waves as a constant regardless of reference frame. μo = Vacuum permeability εo = Vacuum permittivity

12 Einstein Postulates of Special Relativity
The laws of Physics have the same form in all inertial reference frames. Light propagates through empty space with a definite speed c independent of the speed of the source or the observer.

13 Classical Relativity 1,000,000 ms-1 1,000,000 ms-1
How fast is Spaceship A approaching Spaceship B? Both Spaceships see the other approaching at 2,000,000 ms-1. This is Classical Relativity. VT = V1 + V2 Mention the Ether

14 Einstein’s Special Relativity
0 ms-1 300,000,000 ms-1 Moving with respect to the Ether 1,000,000 ms-1 Both spacemen measure the speed of the approaching ray of light. How fast do they measure the speed of light to be?

15 Special Relativity Stationary man Man travelling at 1,000,000 ms-1
Wrong! The Speed of Light is the same for all observers Mention the Michelson Morley experiment Albert Michelson & Edward Morley Lead Einstein to propose his Theory of Special Relativity

16 Time Travel! Time between ‘ticks’ = distance / speed of light
Light in the moving clock covers more distance… …but the speed of light is constant… …so the clock ticks slower! Moving clocks run more slowly! Consider a clock that uses a light pulse to tick . . . V

17 The Lorentz factor 𝛾= 1 1− 𝑣 2 𝑐 2

18 Time dilation Δ𝑡=𝛾Δ 𝑡 𝑜 Δto = Proper time – The time measured by a clock at rest relative to the event. An observer sets up an experiment to measure the time of oscillation of a mass suspended from a vertical spring. He measures the time period as 2.0s. To another observer this time period is measured as 2.66s. Calculate the relative velocity between the two observers.

19 L= 𝐿 𝑜 𝛾 Length Contraction
The length measured by an observer who is at rest relative to the object. Mary is traveling in a space ship, which is not accelerating. To her the space ship has a length of 100m. To Paul who is traveling in another space ship, which is also not accelerating. Mary’s space ship has a length of 98m. Calculate the relative velocity of Paul and Mary.

20 A spaceship is traveling away from the Earth with a speed of 0
A spaceship is traveling away from the Earth with a speed of 0.6c as measured by an observer on the Earth. The spaceship sends a light pulse back to Earth every 10 minutes as measured by a clock on the space ship. Calculate the distance that the spaceship travels between light pulses as measured by i. the observer on Earth. ii. somebody on the space ship. (b) If the Earth observer measures the length of the spaceship as 60m, determine the proper length of the spaceship.

21 Muon Decay Half life of 3.1E-6s as measured in a reference frame at which they are at rest. Muons are created in the upper atmosphere (10km) of the Earth from cosmic ray bombardment. These muons have very high velocities (0.98c)

22 Special Relativity 𝑢 𝑥 ′ = 𝑢 𝑥 −𝑣 𝑢′ 𝑥 =−.08𝑐−0.7𝑐 𝑢′ 𝑥 =−1.5𝑐
How fast is Spaceship A approaching Spaceship B? 𝑢 𝑥 ′ = 𝑢 𝑥 −𝑣 𝑢′ 𝑥 =−.08𝑐−0.7𝑐 𝑢′ 𝑥 =−1.5𝑐 impossible v = 0.7c ux = -0.8c 𝑢 𝑥 ′ = 𝑢 𝑥 −𝑣 1− 𝑢 𝑥 𝑣 𝑐 2 VT = V1 + V2 Mention the Ether 𝑢 𝑥 ′ = −.8𝑐−.7𝑐 1− −.8𝑐 .7𝑐 𝑐 2 𝑢 𝑥 ′ =0.96𝑐

23 Relativistic Mass, Energy, and Momentum

24 Relativistic Mass The mass of a moving object is greater than than the rest mass. m = relativistic mass - the mass measured moving relative to the object. mo = rest mass – the mass measured at rest relative to the object = the Lorentz factor

25 Classical Energy In classical physics if a constant force is applied to an object it experiences a constant acceleration. The work done by the force is transferred to kinetic energy. v t c

26 Relativistic Energy According to special relativity no object can exceed the speed of light (c). So the acceleration of the object must decrease, but where does the work done by the force transfer to…….MASS EK = total energy – rest energy v c t

27 Let’s look at the relativistic kinetic energy equation at low velocities.

28 Example: An electron is accelerated through a potential difference of 1.0MV. Calculate its velocity
Classical Calculation: IMPOSSIBLE

29 Example: An electron is accelerated through a potential difference of 1.0MV. Calculate its velocity
Relativistic Calculation

30

31 Lets work the same example using different units and working in terms of c

32

33 Example: Calculate the pd necessary to accelerate an electron to a velocity of 0.8c

34 The classical relation between energy and momentum

35 The relativistic relation between energy and momentum:

36 Example: What is the momentum of an electron with a kinetic energy of 1.0MeV?
Total energy = rest energy + kinetic energy

37 Example: What is the speed of an electron with a momentum of 2.0MeVc-1?


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