We obtain volume of solid, G, by using triple intergrals in Cartesian Coordinate (x,y,z), as follow. [br] Volume, V = [math]\int\int\int[/math] dV =[math]\int\int\int[/math] dzdydx[br][br]Note that dz,dy,dx can be in any order
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Use triple integrals to find the volume of the solid which is bounded above by z=4-2x-y and below by region R in the xy-plane: 0<x<1, 0<y<2