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Science Chemistry PHYSICAL CHEMISTRY-STUDENT SOLN.MAN.

The wave function product Ψ 3 ∗ Ψ 4 over all space for the 1-D particle-in-a-box is to be integrated numerically. The two wave functions for the 1-D particle-in-a-box are orthogonal to each other are to be shown. Concept introduction: For the orthogonality of two different wave functions, the product of the wave functions is integrated over the entire limits. It is expressed by the equation as given below. ∫ 0 ∞ Ψ m Ψ n = 0 Where, Ψ m and Ψ n are two different wave functions. The essential condition for two wave functions to be orthogonal to each other is m ≠ n .

The wave function product Ψ 3 ∗ Ψ 4 over all space for the 1-D particle-in-a-box is to be integrated numerically. The two wave functions for the 1-D particle-in-a-box are orthogonal to each other are to be shown. Concept introduction: For the orthogonality of two different wave functions, the product of the wave functions is integrated over the entire limits. It is expressed by the equation as given below. ∫ 0 ∞ Ψ m Ψ n = 0 Where, Ψ m and Ψ n are two different wave functions. The essential condition for two wave functions to be orthogonal to each other is m ≠ n .

Solution Summary: The author explains how the wave function product Psi '_3' is integrated numerically, and the two wave functions are orthogonal to each other.

PHYSICAL CHEMISTRY-STUDENT SOLN.MAN.

PHYSICAL CHEMISTRY-STUDENT SOLN.MAN.

2nd Edition

ISBN: 9781285074788

Author: Ball

Publisher: CENGAGE L

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Techniques and applications of quantum theory

Quantum theory, often known as quantum physics, is the foundation of modern physics and encompasses the nature and behavior of matter and energy at the atomic and molecular levels. As the exact nature and behavior of atomic and subatomic particles are im…

Question

Chapter 10, Problem 10.95E

Interpretation Introduction

Interpretation:

The wave function product Ψ3∗Ψ4 over all space for the 1-D particle-in-a-box is to be integrated numerically. The two wave functions for the 1-D particle-in-a-box are orthogonal to each other are to be shown.

Concept introduction:

For the orthogonality of two different wave functions, the product of the wave functions is integrated over the entire limits. It is expressed by the equation as given below.

∫0∞Ψm Ψn=0

Where, Ψm and Ψn are two different wave functions. The essential condition for two wave functions to be orthogonal to each other is m≠n.

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Chapter 10, Problem 10.93E

Chapter 11, Problem 11.1E

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