We refer to the integrand that occurs in Green 's Theorem and that appears as operatorname curl z ( mathbf F ) frac partial F 2 partial x frac partial F 1 partial y Estimate the circulation of a vector field ( mathbf F ) around a circle of radius (R 0 1 ), assuming that ( operatorname curl z ( math...

We estimate the circulation by intC mathbfF cdot d mathbfr approx ...

We refer to the integrand that occurs in Green's Theorem and that appears as [ operatorname{curl}_{z}(mathbf{F})=frac{partial F_{2}}{partial

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We refer to the integrand that occurs in Green's Theorem and that appears as

\[
\operatorname{curl}_{z}(\mathbf{F})=\frac{\partial F_{2}}{\partial x}-\frac{\partial F_{1}}{\partial y}
\]

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Estimate the circulation of a vector field $\mathbf{F}$ around a circle of radius $R=0.1$, assuming that $\operatorname{curl}_{z}(\mathbf{F})$ takes the value 4 at the center of the circle.

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ISBN: 9781319055844

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Authors: Jon Rogawski, Colin Adams, Robert Franzosa

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Question Posted: Jan 28, 2024 12:00 AM

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We refer to the integrand that occurs in Green's Theorem and that appears as [ operatorname{curl}_{z}(mathbf{F})=frac{partial F_{2}}{partial

Question:

THEOREM 1 Green's Theorem Let D be a domain whose boundary 3D is a simple closed curve, oriented counterclockwise. If F and F2 have continuous partial deriva- tives in an open region containing D, then aD F aF - 11. (af_art) x y F dx + F dy = d A 2

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