Answer to Question #246099 in Calculus for Anuj

"V=V_1+V_2=\\int_0^{2\\pi}\\int_0^1\\int_1^{\\sqrt{4-x^2-y^2}}rdzdrd\\phi+ \\int_0^{2\\pi}\\int_1^{\\sqrt{2}}\\int_r^{\\sqrt{4-x^2-y^2}}rdzdrd\\phi"

Bounds of intergal explanation^

1) Intersection of cone "z=\\sqrt{x^2+y^2}" and plane z=1 is "1=\\sqrt{x^2+y^2}"

or "x^2+y^2=1" This is the circle with radius 1 and it is upper bound by r in V1 and lower boubd with respect to r in V2.

2) Intersection of the cone "z^2=x^2+y^2" and sphere "x^2+y^2+z^2=4" is line "x^2+y^2=2,\\space z=\\sqrt{2}" . This is circle on height "\\sqrt{2}" with radius "r=\\sqrt{2}" and "\\sqrt{2}" is upper bond by r in V2.

3) For V2 z changes from plane z=1 to sphere "z=\\sqrt{4-x^2+y^2}"

4) For V1 z chandes from cone "z=\\sqrt{x^2+y^2}=r" to upper bound in spere "z=\\sqrt{4-x^2-y^2}" .

5) All regions possess circular symmetry that is why "\\phi" changes from 0 to "2\\cdot \\pi"