PHY3063
Spring 2015
HOMEWORK F
Instructor: Yoonseok Lee
HW 1: Tipler 6-5
HW 2: Tipler 6-7.
HW 3: The relativistic energy of a free particle (under no potential energy) with the
rest mass m is given by E 2 = p2 c2 + m2 c4 . Using the similar argument used in deriving
the Schödinger equation, extract the relativistic quantum mechanical wave equation
(Klein-Gordon) equation. Read the paper ”Shrödinger” posted on the class calendar.
HW 4: Tipler 6-10.
HW 5: Tipler 6-14.
HW 6: Tipler 6-54.
HW 7: Tipler 6-56.
HW 8: Tipler 6-58.
HW 9: Tipler 6-27.
HW 10: Use the simulation package Quantum Bound States to find the energy levels, wave
functions, and the probability densities of an electron trapped in a square potential with a
10 eV height and a 1 nm width. How many bound states do you find?
The simulation can be found at https://phet.colorado.edu/en/simulation/bound-states.
HW 11: Tipler 6-33.
HW 12: Tipler 6-39.
HW 13: Tipler 6-46.
HW 14: Tipler 6-48.
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