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13 Nov 2019
Consider the following region R and the vector field F. a. Compute the two-dimensional curl of the vector field b. Evaluate both integrals in the circulation form of Green's Theorem and check for consistency. c. State whether the vector field is conservative. F = ã3x39; R = {(xy): x2 + y2 s4} a. The two-dimensional curl is 0 . (Type an exact answer, using Ï as needed.) b. Set up the integral over the region R. Write the integral using polar coordinates, with r as the radius and as the angle. Ordrd0(Type exact answers, using Ï as needed.) 0
Consider the following region R and the vector field F. a. Compute the two-dimensional curl of the vector field b. Evaluate both integrals in the circulation form of Green's Theorem and check for consistency. c. State whether the vector field is conservative. F = ã3x39; R = {(xy): x2 + y2 s4} a. The two-dimensional curl is 0 . (Type an exact answer, using Ï as needed.) b. Set up the integral over the region R. Write the integral using polar coordinates, with r as the radius and as the angle. Ordrd0(Type exact answers, using Ï as needed.) 0
Jarrod RobelLv2
21 Mar 2019