The ground state wave function of the hydrogen atom is given by 1 (r) = 7/a....
a. Define what is meant by a representation of a ket state [4) and of an operator A. (10 marks) b. What is meant by coordinate space representation and momentum space representation? Define all quantities in your answer. (10 marks) c. The ground state wave function of the hydrogen atom is given by 1 *(r) = e-r/a πα3 What is the ground state wave function of the hydrogen atom in momentum space? (20 marks) Hint: Choose the z-axis along the...
( 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.
(25 marks) The radial wave function for a hydrogen atom in the \(3 d\) state is given by \(R(r)=A r^{2} e^{-\alpha r}\), where \(A\) and \(\alpha\) are constants. (a) Determine the constant \(\alpha .[\) Hint \(:\) Consider the radial equation given in the lecture note Ch. 9 page 3\(]\) (b) Determine the largest and smallest possible values of the combination \(\sqrt{L_{x}^{2}+L_{y}^{2}}\) for the \(3 d\) state, where \(L_{x}\) and \(L_{y}\) are the \(x\) - and \(y\) -component of the orbital...
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
4. The wave function for an electron in the ground state of a hydrogen atom is How much more likely is the electron to be at a distance a from the nucleus than at a distance a-/2? Than at a distance 2a ?
The normalized wave function for a hydrogen atom in the 1s state is given by ψ(r) =( 1 /(\sqrt{\pi a_{0}}) )e^{-r/a_{0}} \) where α0 is the Bohr radius, which is equal to 5.29 × 10-11 m. What is the probability of finding the electron at a distance greater than 7.8 α0 from the proton?
[12%] The ground state wave function for hydrogen atom is (a) N exp(-r/u2) (c) Nr2 exp(-r2/a ) (d) Nexp㈠,21%) (e) N exp(-rlao), where N is the normalized factor and ao is the Bohr radius.
ANSWER ALL QUESTIONS 1. (a) The hydrogen atom wave functions are written as Unim. State the values of n, I, and m. State the relation between a physical quantity and each quantum number. At =0 the hydrogen atom is in the superposition state (7,0) = 4200 + A¥210 V3 where A is a real positive constant. Find A by normalization and determine the wave function at time t > 0. Find the average energy of the electron in eV given...
ANSWER ALL QUESTIONS 1. (a) The hydrogen atom wave functions are written as Unim. State the values of n, I, and m. State the relation between a physical quantity and each quantum number. At =0 the hydrogen atom is in the superposition state (7,0) = 4200 + A¥210 V3 where A is a real positive constant. Find A by normalization and determine the wave function at time t > 0. Find the average energy of the electron in eV given...
(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