For H2. the MO wave function has the form: ψspace-N(ψ1s(a) ± ψ1s(b)) where a and b...
Consider the function y(φ)-e",-ie h2 d where I is a constant? If so, what is the a) Is it an eigenfunctions of the operator O-- eigenvalue? (answer: no) b) Normalize the function on the domain 0 φś2π (in this case, normalization implies | | ψ(0) 12 dφ= 1 ). Euler's identity, etimp-cos(mo) ± isin(mo), where m is a constant, will be useful (φ)-F(e"-ie")) to evaluate the normalization constant. (answer: ya normalized Consider the function y(φ)-e",-ie h2 d where I is...
A particle is described by the wave function where A0. Find the normalization constant A. A particle is described by the wave function where A0. Find the normalization constant A.
h2 4. In a region of the x-axis, a particle has a wave function given by y(x) = Ae-*4722° and energy where L is some length. (a) Find the potential energy as a function of x, and sketch V (x) versus x. (b) What is the classical potential (or corresponding force function) that has this dependence? (c) Find the kinetic energy as a function of x. (d) Show that x = L is the classical turning point (i.e. the place...
A. Normalize the wave function Ψ=Ae^(-ax^2) where A is the normalization constant and a is an integer. A= ? B. What is the expected value of the momentum? <p> = ?
A linear combination of 2 wave functions for the same system is also valid wave function .find the normalization constant B for the combination of wave functions for n=1 and n=2 of a particle in a box L wide. V = B(sinc/L + Sin2/L)
Consider a particle confined to one dimension and positive r with the wave function 0, z<0 where N is a real normalization constant and o is a real positive constant with units of (length)-1. For the following, express your answers in terms of a: a) Calculate the momentum space wave function. b) Verify that the momentum space wave function is normalized such that (2.4) c) Use the momentum space wave function to calculate the expectation value (p) via (2.5)
Consider a particle confined to one dimension and positive with the wave function Nxear, x20 x<0 0 where N is a real normalization constant and α is a real positive constant with units of (length)-1. For the following, express your answers in terms of α: a) Find the normalization constant N. What are the units of your result and do they make sense? b) What is the most probable location to find the particle, or more precisely, at what z...
Q5. The probability density function (pdf) for a particular distribution has the form P(4) = AA", where n is a parameter and has a range 0 1 31. Determine the normalization constant A for this power-law function and calculate (A) and (12)
4.4 The ground-state wave-function of a lepton of mass m in a Coulomb potential-7e2/Απε0r) is where a= (4x%)h2/me, and the corresponding binding energy E is The finite size of the nucleus modifies the Coulomb energy for rsR, the nuclear radius, by adding a term of the approximate form (a) Show that the volume integral of this potential is (b) Show that the first-order correction to the binding energy due to this (Note that the lepton wave-function can be taken to...
Problem 1. Wave function An electron is described by a wave function: for x < 0 *(z) = { ce Ce-s/1(1 – e-3/4) for x > 0 : where I is a constant length, and C is the normalization constant. 1. Find C. 2. Where an electron is most likely to be found; that is, for what value of x is the prob: bility for finding electron largest? 3. What is the average coordinate 7 of the electron? 4. What...