11th Edition

ISBN: 8220102011618

Author: Davis

Publisher: YUZU

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Textbook Question

Chapter 15.5, Problem 17ES

In some cases it is possible to use Definition 15.5.1 along with symmetry considerations to evaluate a surface integral without reference to a parametrization of the surface. In these exercises, σ denotes the unit sphere centered at the origin.

(a) Explain why

∬ σ x 2 d S = ∬ σ y 2 d S = ∬ σ z 2 d S

(b) Conclude from part (a) that

∬ σ x 2 d S = 1 3 ∬ σ x 2 d S + ∬ σ y 2 d S + ∬ σ y 2 d S

∬ σ x 2 d S

without performing an integration.

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Chapter 15.5, Problem 16ES

Chapter 15.5, Problem 18ES

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Chapter 15 Solutions

EBK CALCULUS EARLY TRANSCENDENTALS SING

Ch. 15.1 - The function (x,y,z)=xy+yz+xz is a potential for...Ch. 15.1 - The vector field F(x,y,z)=, defined for...Ch. 15.1 - An inverse-square field is one that can be written...Ch. 15.1 - The vector field has divergence and curl Ch. 15.1 - Match the vector field F(x,y) with one of the...Ch. 15.1 - Match the vector field F(x,y) with one of the...Ch. 15.1 - Determine whether the statement about the vector...Ch. 15.1 - Determine whether the statement about the vector...Ch. 15.1 - Sketch the vector field by drawing some...Ch. 15.1 - Sketch the vector field by drawing some...

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