The ground state wave function of Na10+ is π−1/2(Z/a0)3/2e−Zr/a0 where Z is the nuclear charge and a0=0.529×10−10m. Calculate the expectation value of the potential energy for Na10+.
The ground state wave function of Na10+ is π−1/2(Z/a0)3/2e−Zr/a0 where Z is the nuclear charge an...
1. Variational method In this problem, you will approximate the ground state wave function of a quantum system using the variational theory. Use the trial wave function below 2 cos/T) , 1x1 trial a/2 to approximate the ground state of a harmonic oscillator given by 2.2 2 using a as an adjustable parameter. (a) Calculate the expectation value for the kinetic energy, (?) trial 4 points (b) Calculate the expectation value for the potential energy, Virial. Sketch ??tria, (V)trial, and...
( 25 marks) The wave function for a hydrogen atom in the ground state is given by \(\psi(r)=A e^{-r / a_{s}}\), where \(A\) is a constant and \(a_{B}\) is the Bohr radius. (a) Find the constant \(A\). (b) Determine the expectation value of the potential energy for the ground state of hydrogen.
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...
(1) The ground-state wave function for the electron in a hydrogen is given by ls 0 Where r is the radial coordinate of the electron and a0 is the Bohr radius (a) Show that the wave function as given is normalized (b) Find the probability of locating the electron between rF a0/2 and r2-3ao/2. Note that the following integral may be useful n! 0 dr =-e re /a roa r a Ta
The ground-state wave function of a hydrogen atom is: where r is the distance from the nucleus and a0 is the Bohr radius (53 pm). Following the Born approximation, calculate the probability, i.e., |ψ|^2dr, that the electron will be found somewhere within a small sphere of radius, r0, 1.0 pm centred on the nucleus. ρν/α, Ψ1, () =- Μπαρ
1) Wave function for the ground state of an harmonic oscillator is given by. (x) = A1/2 (a/T)1/4 e-ax /2 Evaluate the expectation value <x<> for this wave state (ove (Hint: Joo.co u² e-a u du = 2;. ue-au du = (1/2a) (Tc/a)2) pace)
2. Find the expectation value for <p2 > for the ground-state wave function of the infinite 1-d square well. Here p = -i(hbar) d/dx is the (linear) momentum operator
1. In the ground state of the H-atom the nuclear charge can be treated in first approxi- mation as a point charge centered at the origin and an electron density of A(r) =-교exp (-5) πα3 Here a is the Bohr radius, r-|ศ, and e is the elelnentary charge. (a) Determine the electric field strength E and the potential as a function of r. (b) Discuss the two limiting cases r < a and a Hint: you may find the following...
Question blow and I need a, b and c, please help me. (a) Evaluate an expression for the expectation value of the potential energy for the n 3, 1-1, m = 1 wavefunction of the hydrogen atom. You need to compute the integral, where e2 [4 marks] 0 wave- 6 marks] [2 marks] Write the answer in terms of h. e and me (b) Calculate the expectation value of the kinetic energy for the n-1,- function of the hydrogen atom....
##### show all steps thoroughly (sorry for my bad grammar) Assume that electron in area electric field of proton and in the state wave function r + 2p2 1,0.0 1) Find expectation value of energy 2) Find expectation value of angular momentum squared (L2) 3) Find expectation value of angular momentum in component axis -Z L) 4) How much angular momentum in component axis-Z will probability of found particle? And why? Assume that electron in area electric field of proton...