Verify the conclusion of Green's Theorem by evaluating both sides of each of the two forms of Green's Theorem for the field F= -2yi+2xj. Take the domains of integration in each case to be the disk R: x² + y² sa² and its bounding circle C: r= (a cost)i + (a sin t)j. 0 ≤t≤ 2x. i Click the icon to view the two forms of Green's Theorem. The flux is 0. (Type an exact answer, using x as needed.) The circulation is 14x² (Type an exact answer, using x as needed.)
Verify the conclusion of Green's Theorem by evaluating both sides of each of the two forms of Green's Theorem for the field F= -2yi+2xj. Take the domains of integration in each case to be the disk R: x² + y² sa² and its bounding circle C: r= (a cost)i + (a sin t)j. 0 ≤t≤ 2x. i Click the icon to view the two forms of Green's Theorem. The flux is 0. (Type an exact answer, using x as needed.) The circulation is 14x² (Type an exact answer, using x as needed.)
College Physics
11th Edition
ISBN:9781305952300
Author:Raymond A. Serway, Chris Vuille
Publisher:Raymond A. Serway, Chris Vuille
Chapter1: Units, Trigonometry. And Vectors
Section: Chapter Questions
Problem 1CQ: Estimate the order of magnitude of the length, in meters, of each of the following; (a) a mouse, (b)...
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