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The change in entropy of the system in the given isothermal expansion and compressionis to be calculated. Concept introduction: Entropy is the direct measurement of randomness or disorderness. Entropy is an extensive property. It is a state function. Entropy of a system is a measure of how spread out or how dispersed the system’s energy is. Change in entropy of a system is the difference between the entropy of the final state and the entropy of the initial state. Mathematically, the change in entropy of a system is represented as Δ S s y s t e m = Δ S f i n a l − Δ S i n i t i a l The above expression is reduced to: Δ S s y s t e m = n R ln ( V f i n a l ) ( V i n i t i a l ) Here, n is the number of moles, R is the universal gas constant, V f i n a l is the final volume, and V i n i t i a l is the initial volume of the system. The entropy of the system and the entropy of the surroundings make up the entropy of the universe.

The change in entropy of the system in the given isothermal expansion and compressionis to be calculated. Concept introduction: Entropy is the direct measurement of randomness or disorderness. Entropy is an extensive property. It is a state function. Entropy of a system is a measure of how spread out or how dispersed the system’s energy is. Change in entropy of a system is the difference between the entropy of the final state and the entropy of the initial state. Mathematically, the change in entropy of a system is represented as Δ S s y s t e m = Δ S f i n a l − Δ S i n i t i a l The above expression is reduced to: Δ S s y s t e m = n R ln ( V f i n a l ) ( V i n i t i a l ) Here, n is the number of moles, R is the universal gas constant, V f i n a l is the final volume, and V i n i t i a l is the initial volume of the system. The entropy of the system and the entropy of the surroundings make up the entropy of the universe.

Solution Summary: The author explains that the change in entropy of a system in an isothermal expansion and compression is to be calculated.

Chemistry

3rd Edition

ISBN: 9780073402734

Author: Julia Burdge

Publisher: MCGRAW-HILL HIGHER EDUCATION

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Chapter 18, Problem 13QP

Interpretation Introduction

Interpretation:

The change in entropy of the system in the given isothermal expansion and compressionis to be calculated.

Concept introduction:

Entropy is the direct measurement of randomness or disorderness. Entropy is an extensive property. It is a state function.

Entropy of a system is a measure of how spread out or how dispersed the system’s energy is. Change in entropy of a system is the difference between the entropy of the final state and the entropy of the initial state.

Mathematically, the change in entropy of a system is represented as ΔSsystem=ΔSfinal−ΔSinitial

The above expression is reduced to:

ΔSsystem=nRln(Vfinal)(Vinitial)

Here, n is the number of moles, R is the universal gas constant, Vfinal is the final volume, and Vinitial is the initial volume of the system.

The entropy of the system and the entropy of the surroundings make up the entropy of the universe.

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Chapter 18, Problem 12QP

Chapter 18, Problem 14QP

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