Question

Set up the triple integral of an arbitrary continuous function f(x, y, z) in cylindrical or spherical coordinates over each solid shown & described below. i.e., Fill in the six limits of integration and the blank at the end. There is nothing to evaluate. (a) The solid is between the top hemisphere of the ball of radius 2 centered at the origin and the inside of the upper half cone z = Vx2 + y2. r?+ y2 + = 4 JJ f(x,y,z) Vx+y (b) The solid is of height 6 (bounded by the planes z =-3 and = 3), centered at the origin, between two cylinders, one of radius 2, and the other of radius 4 (as depicted below). JJ f(x,y,z)

Answer 1

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