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LOYOLA COLLEGE (AUTONOMOUS), CHENNAI – 600 034

M.Sc. DEGREE EXAMINATION – CHEMISTRY

FIRST SEMESTER – November 2008

CH 1808 – QUANTUM CHEMISTRY & GROUP THEORY

Date : 08-11-08 Dept. No. Max. : 100 Marks

Time : 1:00 – 4:00

PART-A

ANSWER ALL QUESTIONS (10 ´ 2 = 20 marks)

Show that the function y(x,y,z) = cosax cosby coscz (where a,b,c are constants) is an eigen function of the Laplacian Operator Ñ². What is its eigen value?
Define a ‘well-behaved function’ in quantum mechanics.
In the far infrared spectrum of ³⁹K³⁵Cl, an intense absorption line occurs at 378.0 cm^-1. Calculate the force constant.
What is the difference in the nature of the spectrum when an electron is bound to a system and when it is free? Justify your answer quantum mechanically.
Show that <x> for v=0 for a 1D-SHO. ψ₀ = (a/π)^1/4 exp(-ax²/2).
Explain with an example: (a) a boson (b) a hartree
What is a node? Sketch a rough graph of y² for quantum numbers n=3 for a particle in a

1D box model and indicate how many nodes are present in it.

Write the Hamiltonian operator for the H₂⁺molecule defining each term involved in it.
Identify the point groups for the following molecules:

(a) H₂ (b) CHCl₃ (c) CH₂Cl₂ d) [Co(NH₃)₆]³⁺

Give the meaning of the following letters with their subscripts, which represent the irreducible representations in the character table: (a) A_g (b) E_u

PART-B

ANSWER ANY EIGHT QUESTIONS (8 ´ 5 = 40 marks)

What is a hermitian operator? Show that the wave functions corresponding to two

different eigen values of a Hermitian operator are orthogonal.

The high temperature microwave spectrum of KCl vapor shows an absorption at

7687.94 MHz that can be identified with J=0 to J=1 transition of ³⁹K³⁵Cl molecules in

the lowest v=0 vibrational state. Calculate the bond length of KCl and the spacing between

adjacent rotational lines in the spectrum.

Explain briefly with a suitable example: (a) quantum mechanical tunneling

(b) Principle of Mutual Exclusion (3+2)

(a) Show that [x, d/dx] = -1

(b) What are the values of [y,p_y] and [L²,L_y]? What is their physical significance? (2+2+1)

What is Slater determinant? Taking He atom in its excited state (1s¹, 2s¹) write the

four Slater determinants.

y = (2a/p)^1/4exp(-ax²) is an eigen function of the hamiltonian operator

H = – (h²/8p²m) d²/dx² + (1/2) kx² for the 1-D Simple Harmonic Oscillator.

a) Find the eigenvalue E of HY = EY
b) Show that the above obtained eigen value in terms of the classical frequency

n = (1/2p)Ö(k/m) and the constant a = (p/h)(km)^1/2 is E = (1/2)hn. (4+1)

With a neat diagram explain Bohr’s Correspondence Principle.

Write the Schroedinger equation to be solved for H atom and solve it for its energy using a

simple solution, which assumes the wave function to depend only on the distance r and not

on the angles θ and φ.

(a) The point group of staggered confirmation of ethane is D_3d. What do these letters

D, 3 and d in this point group represent?

(b) Formulate the term symbols for the ground state configuration of F atom. (3+2)

Draw the radial probability distribution curves for 3s, 3p and 3d orbitals and discuss the

meaning and significance of the number of maxima and minima found there.

Discuss the Pauli Exclusion Principle applied to electrons taking He atom in its ground state as example.

The reducible representation obtained using the four Mn-O bonds in MnO₄ as bases

T_d E 8C₃3C₂6S₄6σ_d

4 1 0 0 2

Reduce this into irreducible representation using the T_d character table given below

and interpret the nature of the bonds in MnO₄ using group theory.

T_d E 8C₃ 3C₂ 6S₄ 6σ_d

A₁ 1 1 1 1 1 x²+y²+z²

A₂ 1 1 1 -1 -1

E 2 -1 2 0 0 (2z²-x²-y², x²-y²)

T₁ 3 0 -1 1 -1 (R_x,R_y,R_z)

T₂ 3 0 -1 -1 1 (x,y,z) (xy,xz,yz)

PART – C

ANSWER ANY FOUR QUESTIONS (4 ´ 10 = 40 marks)

a) Explain the use of Born-Oppenheimer approximation with a suitable example.
b) Derive the time-independent Schroedinger equation from the time-dependent and

prove that the property such as electron density is time independent although the wave

function describing an electron is time dependent. (6+4)

a) Derive the wave function and energy for a particle in 1-D box.
b) A cubic box of 12 Å on the side contains 10 electrons. Applying the simple

particle in a box model calculate the value of ΔE and the corresponding wave

length for the first excited state of this system. (7+3)

(a) State the Variation Theorem. Apply it to the problem of particle in a 1-D box of

length a, by using the trial function ψ = x(a-x). Compare your result with the true

value.

(b) Define and explain the overlap, coulomb and resonance integrals which are

found in solving H₂⁺ problem using the LCAO method? (6+4)

Discuss the Molecular Orbital treatment of H₂ molecule and explain how the

Valance Bond (Heitler-London) method overcomes some of the difficulties of MO

theory. (10)

a) What are the three important approximations that the Huckel MO method uses for the

treatment of π-orbitals in conjugated systems?

b) Write down the secular determinant obtained on applying Huckel’s method to

allyl anion. Obtain there from expressions for the energy levels and the wave

functions. (3+7)

Find the number, symmetry species of the infrared and Raman active vibrations of

Boron trichloride (BCl₃), which belongs to D_3h point group.

(You may, if you wish, use the table of f(R) given below for solving this).

Operation: E σ i C₂ C₃ C₄ C₅ C₆ S₃ S₄ S₅ S₆ S₈

f(R): 3 1 -3 -1 0 1 1.618 2 -2 -1 0.382 0 0.414

For any C_n, f(R) = 1 + 2cos(2π/n), For any S_n, f(R) = -1 + 2cos(2π/n)

D_3h E 2C₃ 3C₂ σ_h 2S₃ 3σ_v

A₁‘ 1 1 1 1 1 1 x² +y², z²

A₂‘ 1 1 -1 1 1 -1 R_z

E’ 2 -1 0 2 -1 0 (x,y) (x²-y²,xy)

A₁” 1 1 1 -1 -1 -1

A₂” 1 1 -1 -1 -1 1 z

E” 2 -1 0 -2 1 0 (R_x,R_y) (xz, yz)

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