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Math Calculus Calculus

To prove: Green’s second identity using the divergence theorem, that is ∭ D ( f ∇ 2 g − g ∇ 2 f ) d V = ∬ S ( f ∂ g ∂ n − g ∂ f ∂ n ) d S ; where f and g are scalar functionssuch that F → = f ∇ g is continuously differentiable in the region D , which is bounded by the closed surface S .

To prove: Green’s second identity using the divergence theorem, that is ∭ D ( f ∇ 2 g − g ∇ 2 f ) d V = ∬ S ( f ∂ g ∂ n − g ∂ f ∂ n ) d S ; where f and g are scalar functionssuch that F → = f ∇ g is continuously differentiable in the region D , which is bounded by the closed surface S .

Solution Summary: The author demonstrates Green's second identity using the divergence theorem.

Calculus

6th Edition

ISBN: 9781465208880

Author: SMITH KARL J, STRAUSS MONTY J, TODA MAGDALENA DANIELE

Publisher: Kendall Hunt Publishing

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Chapter 13.7, Problem 49PS

To determine

To prove: Green’s second identity using the divergence theorem, that is ∭D(f ∇ 2g−g ∇ 2f)dV=∬S(f ∂g ∂n−g ∂f ∂n)dS ; where f and g are scalar functionssuch that F→=f∇g is continuously differentiable in the region D , which is bounded by the closed surface S .

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Chapter 13.7, Problem 48PS

Chapter 13.7, Problem 50PS

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Chapter 13 Solutions

Calculus

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