3. (20) Let S be the drinking cup which is 4 units tall, whose sides are the cylinder x² +2=9 (i.e., the radius is 3, ce

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3 20 Let S Be The Drinking Cup Which Is 4 Units Tall Whose Sides Are The Cylinder X 2 9 I E The Radius Is 3 Ce 1 (46.72 KiB) Viewed 56 times

3. (20) Let S be the drinking cup which is 4 units tall, whose sides are the cylinder x² +2=9 (i.e., the radius is 3, centered around z-axis), with bottom at z = 0, and which has no top (or how would you drink?). (Be clear with this picture! Bottom and sides, cylinder, no top.) boundary S Surface loreak r(t) = dr(t) = F(F) = TO top "sides kattom Let F(x, y, z) =<-y, x,x+z>. We are going to verify Stokes' for this object, in this and the next problem. Do stuff in the order asked. Compute the circulation of F around the boundary, C, of S. Parameterize C. This is just the circle (not disk) at the top (rim) of the cup. Be sure your circle is at the top, not the bottom. Then compute what's asked for. (include the limits)