Full solution: Using Green's theorem, evaluate f F(r)-drcounterclockwise c around the
Chapter 10, Problem 10.1.69(choose chapter or problem)
Using Green's theorem, evaluate \(int_{C} \mathbf{F}(\mathbf{r}) \cdot d \mathbf{r}\) counterclockwise around the boundary curve C of the region R, where
\(\mathbf{F}\) = grad \(\left(x^{3} \cos ^{2}(x y)\right)\), R the region in Prob. 7.
Text Transcription:
int_C F(r) cdot dr
F = grad (x^3 cos^2(xy))
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