Question

Consider one electron in a 1D box of side L. Its wavefunction is given by V3 /3 A. where φ1(x),P2(x), and φ3(x) are the first 3 eigenfunctions of the Hamiltonian, H, of a particle in a 1D box, h2 d2 2mdx2 Az- a) ls (x) normalized? If it is not normalized it, normalize it! b) is Ψ(x) an eigenfunction of H? If it is an eigenfunction, what is the eigenvalue?

Please finish this question with step-by-step details, thx!

Answer 1

Psi (x) = squareroot 3/4 phi_1 (x) + squareroot 3/2 squareroot 2 phi_2 (x) + 2 + squareroot 3 i/4 phi_3 (x) (a) To check the normality, we check sigma_i Vertical-bar c_i Vertical-bar ^2 = 1 Now, (squareroot 3/4)^2 + (squareroot 3/2 squareroot 2)^2 + (2 + squareroot 3i/4)^2 = 3/16 + 3/8 + Vertical-bar 4 -3 + 4 squareroot 3 i Vertical-bar /16 = 3/16 + 3/8 + Vertical-bar 1 + 4 squareroot 3 i/16 Vertical-bar = 3/16 + 3/8 + 7/16 = 3 + 6 + 7/16 = 16 1/16 = 1 Yes, the wave function Psi (x) is normalized wave fx^n. \r\n (b) Every normalized wave function is eigen function of H. We know, H^^Psi = E Psi So, If H^^is the eigen fx^4 then energy is its eigen value. Energy of this system is given by < E > = k_i Vertical-bar ^2 lambda_i lambda_i = n^2 pi^2 h^2/2m L^2 = Vertical-bar (squareroot 3/4)^2 Vertical-bar times pi^2 h^2/2 m L^2 + Vertical-bar (squareroot 3/2 squareroot 2) Vertical-bar ^2