(a)(yz dx + (z + x) dy + (x + y) dz, where C is the curve of intersection of the cylinder xy= 2y and the plane y = z, traversed counterclockwise when viewed from above. Answer:0. (b) dx xy dy + xz dz,...

Use Stokes’ theorem to evaluate the line integral

(a)(yz dx + (z + x) dy + (x + y) dz, where C is the curve of intersection of the cylinder<br>xy= 2y and the plane y = z, traversed counterclockwise when viewed from above.<br>Answer:0.<br>(b)<br>dx<br>xy dy + xz dz, with C as above<br>Answer: 0<br>

Extracted text: (a)(yz dx + (z + x) dy + (x + y) dz, where C is the curve of intersection of the cylinder xy= 2y and the plane y = z, traversed counterclockwise when viewed from above. Answer:0. (b) dx xy dy + xz dz, with C as above Answer: 0

Jun 05, 2022

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(a)(yz dx + (z + x) dy + (x + y) dz, where C is the curve of intersection of the cylinder xy= 2y and the plane y = z, traversed counterclockwise when viewed from above. Answer:0. (b) dx xy dy + xz dz,...

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