8) Suppose (x) - Ce, and (x) - Deare cach solution to the particle in the...
8) Suppose (x) - Ce, and (x) - Deare cach solution to the particle in the box problem with the Hamiltonian, H- (-/8"ma)d/dx.Show that the linear combination (x) -C +De is also a solution. Determine the cigenvalue? (Hint: Hy-Ev).
8) Suppose (x) - Ce, and (x) - Deare cach solution to the particle in the box problem with the Hamiltonian, H- (-/8"ma)d/dx.Show that the linear combination (x) -C +De is also a solution. Determine the cigenvalue? (Hint: Hy-Ev).
(8) Suppose y(y) = A Sin By, and y(y) = B Cos By are each solution to the particle in the box problem with the Hamiltonian, H = -(h?/8rt? ma)d?/dy. Show that the linear combination y(y) - A Sin By - B Cos By is also a solution and then determine the eigenvalue. (Hint: Hy = Ey).
HNTV 8) Suppose v(y) = A Sin By, and y(y)=B Cos By are each solution to the particle in the box problem with the Hamiltonian, H = -(h/8x ma?)d/dy. Show that the linear combination (y) - A Sin By - B Cos By is also a solution and then determine the eigenvalue. (Hint: Hv=Ev). The Synthesis of 1,3,5,7,9,11,13-tetradecaheptaene conjugated compound with the formula H-[CH=CH]7-H produced a trace amount as reported by (Alexander Mebane, JACS 74 (20), page 5227-5229 (1952). The...
solu 4. The principle of superposition (in quantum mechanics) states that if two or more Solutions are each solution to the Schrodinger cquation, then their linear combinations are also solution to the Schrodinger equation. Each of y(x) = A sin ax, V(x) = B cos ax, V(X) Celax, and y(x) =D elox is a solution to the particle in the box problem. Show that linear combinations v(x) = A sin ax + B cos ax and y(x) = Celax +...
5 Suppose that a particle in a 1-dimensional box is in the state (x) = NxL-x) OSxSL = 0 everywhere else a) Show that this wavefunction is not an eigenvalue of the Hamiltonian operator. b) Sketch the wavefunction (x) c) Determine the value of the normalization constant N ! What this means is that the state is not stationary. so it evolves in time according to the full time-dependent Schrodinger equation. The expression given for (x) represents one instant in...
us equation, L (y(x))-0. Prove that o a solution eneous equation, C(y(z))g(z). Is a hy or why not? 1. Let C be the linear operator defined as follows. (a) Let v,.. ,n be the solutions of the homogeneous equation, D an arbitrary linear combination, ciyi+..nn is also a solution. , c(y(z)) 0, Prove that (b) Let vi,. n be the solutions of the non-homogeneous equation, Cl) ga). Is a linear combination, ciy nyn also a solution? Why or why not?...
us equation, L (y(x))-0. Prove that o a solution eneous equation, C(y(z))g(z). Is a hy or why not? 1. Let C be the linear operator defined as follows. (a) Let v,.. ,n be the solutions of the homogeneous equation, D an arbitrary linear combination, ciyi+..nn is also a solution. , c(y(z)) 0, Prove that (b) Let vi,. n be the solutions of the non-homogeneous equation, Cl) ga). Is a linear combination, ciy nyn also a solution? Why or why not?
problems 7 & 8
Problem 7: A particle confined in a rigid one-dimensional box of length 1 x 10-14m has an energy level ER = 32 MeV and an adjacent energy level En+1 = 50 MeV. 1 MeV = 1 x 106 eV (a) Determine the values of n and n + 1. Answer: n = 4 and n+1 = 5. (b) What is the wavelength of a photon emitted in the n+1 to n transition? Answer: X = 6.9...
Suppose a particle starts out in a linear combination ofjust two stationary states at t = 0: Ψ(x, 0) = c (x) + 2cψ2(x), where the eigen-energies for ψ1 and ψ2 are E1 and E2, respectively. a) Determine c b) What is the expectation value of the energy for the particle? c) What is the wave function Ψ(x, t) at subsequent times?