Consider F = r. Let S be the outwardly oriented surface, which consists of S_1 a

Question

Consider F = r. Let S be the outwardly oriented surface, which consists of S_1 and S_2, where S_1 is defined by z = -Squareroot 4 - x^2 - y^2 and S_2 by x^2 + y^2 = 4 with 0 lessthanorequalto z lessthanorequalto 1. [Note that S is not closed.] (A) Sketch the surface S. Include its orientations. (solution) (B) Find the flux of F through S_1. (solution) (C) Start filling out the blank in the following equation to find the flux of F through S_2, and finish the computation to find the value. (solution) Phi_S_2 = integral_S_2 F middot dA = doubleintegral (D) Use the Divergence Theorem to calculate the flux of F through the entire S. Your idea must be shown clearly. (solution)

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Time remaining to Time remaining to complete Time remaining to complete the answer : 118:40

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in Advanced Math answer : 118:40

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in Advanced Math the answer : 118:40

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in Advanced Math

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