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13 Nov 2019
HW10: Problem 5 Previous Problem List Next The region is a right circular cylinder of radius 4, with the bottom at-7 and top at 7. Find the limits of integration on the triple integral for the volume of the cylinder using Cartesian, cylindrical, and spherical coordinates and the function to be integrated. For your answers θ = theta, Ï phi, and Ï-rho. Cartesian A JC JE where A = , D and p(x, y, z) = Cylindrical A JC JE where A = and p(r, θ, z) = Spherical (which is twice the top half) Hint: Here you must write the volume as the sum of two integrals 0 Ï arctan(4/7) and arctan(4/7) Ï Ï/2 V=2 where Al = and p(p,9,4) = and where A2 = and p(p, e, ø)
HW10: Problem 5 Previous Problem List Next The region is a right circular cylinder of radius 4, with the bottom at-7 and top at 7. Find the limits of integration on the triple integral for the volume of the cylinder using Cartesian, cylindrical, and spherical coordinates and the function to be integrated. For your answers θ = theta, Ï phi, and Ï-rho. Cartesian A JC JE where A = , D and p(x, y, z) = Cylindrical A JC JE where A = and p(r, θ, z) = Spherical (which is twice the top half) Hint: Here you must write the volume as the sum of two integrals 0 Ï arctan(4/7) and arctan(4/7) Ï Ï/2 V=2 where Al = and p(p,9,4) = and where A2 = and p(p, e, ø)
Jean KeelingLv2
9 Nov 2019