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The reason as to why the given wavefunction for the 1-D particle-in-a-box cannot be assumed to give zero value on integration is to be explained. Concept introduction: For the orthogonality of the two different wavefunctions, the product of the wavefunctions 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 wavefunctions. The essential condition for two wavefunctions to be orthogonal to each other is m ≠ n .

The reason as to why the given wavefunction for the 1-D particle-in-a-box cannot be assumed to give zero value on integration is to be explained. Concept introduction: For the orthogonality of the two different wavefunctions, the product of the wavefunctions 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 wavefunctions. The essential condition for two wavefunctions to be orthogonal to each other is m ≠ n .

Solution Summary: The author explains why the given wavefunction for the 1-D particle-in-a-box cannot be assumed to give zero value on integration.

Physical Chemistry

Physical Chemistry

2nd Edition

ISBN: 9781133958437

Author: Ball, David W. (david Warren), BAER, Tomas

Publisher: Wadsworth Cengage Learning,

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Techniques and applications of quantum theory

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Chapter 10, Problem 10.86E

Interpretation Introduction

Interpretation:

The reason as to why the given wavefunction for the 1-D particle-in-a-box cannot be assumed to give zero value on integration is to be explained.

Concept introduction:

For the orthogonality of the two different wavefunctions, the product of the wavefunctions 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 wavefunctions. The essential condition for two wavefunctions to be orthogonal to each other is m≠n.

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Chapter 10, Problem 10.85E

Chapter 10, Problem 10.87E

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