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13 Nov 2019
The region is a cone, z- Vx2 +y2, topped by a sphere of radius 2. Find the limits of integration on the triple integral for the volume of the snowcone using Cartesian, cylindrical, and spherical coordinates and the function to be integrated. For your answers θ-theta, Ï = phi, and Ï = rho. Cartesian p(x,y,z dz dy dx A JC JE where A0 , B = 2pi D-sqrt2 'F=|sqrt(u-rho^2) | and p(x,y,z) Cylindrical p(r, 0,z)dz dr do A JCJE where A0 ,D=2p. and p(r, θ, z) = | rhongsin(phi) Spherical JA JC JE where A-0 ,B=2
The region is a cone, z- Vx2 +y2, topped by a sphere of radius 2. Find the limits of integration on the triple integral for the volume of the snowcone using Cartesian, cylindrical, and spherical coordinates and the function to be integrated. For your answers θ-theta, Ï = phi, and Ï = rho. Cartesian p(x,y,z dz dy dx A JC JE where A0 , B = 2pi D-sqrt2 'F=|sqrt(u-rho^2) | and p(x,y,z) Cylindrical p(r, 0,z)dz dr do A JCJE where A0 ,D=2p. and p(r, θ, z) = | rhongsin(phi) Spherical JA JC JE where A-0 ,B=2
Lelia LubowitzLv2
4 Jan 2019