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:
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 \(\operatorname{curl}_{z}(\mathbf{F})\) takes the value 4 at the center of the circle.
Fantastic news! We've Found the answer you've been seeking!
Step by Step Answer:
Related Book For
Question Posted: