Question: Use the stokes' theorem to evaluate the line integral & F.ar where $C$ is oriented count - clockwise as viewed from above, $$ F=x y
Use the stokes' theorem to evaluate the line integral & F.ar where $C$ is oriented count - clockwise as viewed from above, $$ F=x y i+y z j+z \times k \text {, } $$ and $C$ is the boundary of the part of the paraboloid $z=1-x^{2}-y^{2} $ in the first octant. CS.VS. 1729
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