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13 Nov 2019
Please exercise 7, show all work, thank you In Exercises 5-10, calculate curl(F) and then apply Stokes' Theorem to compute the fux of curl(F) through the given surface using a line integral. 5° F=(e-2-y, ez3+x, cos(xz), the upper hemisphere 2+y2+221, 2 0 with outward-pointing normal 6. F = (x + y, z2-4, xVY2+1), surface of the wedge-shaped box in Figure 15 (bottom included, top excluded) with outward-pointing normal x+y=1 FIGURE 15 7° F (3z, 5x,-2y), that part of the paraboloid z = x2 + y2 that lies below the plane z = 4 with upward-pointing unit normal vector
Please exercise 7, show all work, thank you
In Exercises 5-10, calculate curl(F) and then apply Stokes' Theorem to compute the fux of curl(F) through the given surface using a line integral. 5° F=(e-2-y, ez3+x, cos(xz), the upper hemisphere 2+y2+221, 2 0 with outward-pointing normal 6. F = (x + y, z2-4, xVY2+1), surface of the wedge-shaped box in Figure 15 (bottom included, top excluded) with outward-pointing normal x+y=1 FIGURE 15 7° F (3z, 5x,-2y), that part of the paraboloid z = x2 + y2 that lies below the plane z = 4 with upward-pointing unit normal vector
Elin HesselLv2
7 Sep 2019