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 ...
Calculate the expectation value for the kinetic energy of the hydrogen atom with the electron in the 2s orbital. The wavefunction and operator are given below 3. Calculate the expectation value for the kinetic energy of the hydrogen atom with the electron in the 2s orbital. The wavefunction and operator are given below, 1 1a -h2 1 a sin 0 дө = дr 2m 2m,r2 ar 3/2 1 -r/2 a e W200 32a
Calculate the expectation value for the potential energy of the H atom with the electron in the 1s orbital Compare your result with the total energy. Use the standard integral 2 e -a2 a+1 2x Epotestial) πε0 dr dr 2r/a re Epotential)- Ame0a0 4.36x 10-18 -2.18 x 10-18 Calculate the expectation value for the potential energy of the H atom with the electron in the 1s orbital Compare your result with the total energy. Use the standard integral 2 e...
6. a) Calculate the expectation value of x as a function of time for an electron in a state that is a (normalized) equal mixture of the ground state and 1st excited state of a 1D HO b) Graph x vs time for the case k = 1 eV/nm2. What is its value at t=0? What is the period of the oscillation in femtoseconds? For the one-dimensional (1D) harmonic oscillator (HO) the potential energy function has the form V(a) k2/2,...
It can be shown that for a linear harmonic oscillator the expectation value of the potential energy is equal to the expectation value of the kinetic energy, and the expectation values for r and p are clearly both zeros (0) Show that in the lowest energy state Ain agreement with the uncertainty principle (b) Confirm that for the higher states (Ax)(Ap) > h/2 . Problemi 4. ( 8 pts) It can be shown that for a linear harmonic oscillator the...
The question consist of three parts. (a) Verify that the total energy is -0.5 hartree (b) Find the expectation value for potential energy (c) using the viral theorem, deduce expectation value of KE. Homil torien ard wauefuncten of ground state df hyehngen atom H(Is) are Uong radial posten f Lop legetin d r ) Verify the total energ y is o s Harfree i) Fndepectation vale of patertial erergy KV 消) Apply Virial theorem and find expectation value of k-E(T...
Calculate the expectation value <r> of an electron in the state of n=1 and 1-0 of the hydrogen atom. r is the position from the nucleus. Use the wave functions appropriately in Table 6-1 of the textbook. You can use the integration of x" exp(-ax) dx= a (n>-1, a>0). an+1 Calculate the expectation value of an electron in the state of n=1 and 1-0 of the hydrogen atom. r is the position from the nucleus. Use the wave functions appropriately...
Calculate the expectation value of the kinetic energy for the particle of mass m on a line of length a in a state with quantum number n. Compare your result to the expression for the energy level of the particle and explain any similarities or differences.
1. Consider the wavefunction of the 2s orbital of the hydrogen atom: -Dexp (-) where do is the Bohr's radius (0.52918 nm). (25) = 42 (a) (15pt) Determine the expectation value of the potential < > of the 2s orbital in ev. (b) (10pt) Determine the expectation value of the kinetic energy of the 2s orbital in eV. (c) (5pt) Determine the location of the radial node (if there is any) in nm. (d) (5pt) Determine the location of the...
Please include detailed solutions and an explanation. Thank you in advance. 6.2 Compute the expectation value of the electron kinetic and potential en- ergies in the n = 1 (ground) state of the hydrogen atom. Compare to the kinetic and potential energies of the classical electron on the circular orbit of the radius equal to the Bohr radius. (10 points)
Expectation values. Calculate the expectation value of the distance of an electron in a hydrogen atom from its nucleus when the electron is in its ground state. Let the wave function of the electron be: 1/2 rao) exp(-r/a.) where: ao is a constant 0.529 A, and r is the separation of the point of observation from the point nucleus. Hint: to solve this problem, remember that the "expectation integral" is done over the volume of all space! So you must...