Use Green’s Theorem in the form of Equation 13 to prove Green’s first identity : where D and C satisfy the hypotheses of Green’s Theorem and the appropriate partial derivatives of ƒ and g exist and...

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Use Green’s Theorem in the form of Equation 13 to prove Green’s first identity:

where D and C satisfy the hypotheses of Green’s Theorem and the appropriate partial derivatives of ƒ and g exist and are continuous. (The quantity ∇g . n = D_n g occurs in the line integral. This is the directional derivative in the direction of the normal vector n and is called the normal derivative of g.)

Answered Same Day Dec 24, 2021

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Robert answered on Dec 24 2021

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Use Green’s Theorem in the form of Equation 13 to prove Green’s first identity : where D and C satisfy the hypotheses of Green’s Theorem and the appropriate partial derivatives of ƒ and g exist and...

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