If `h , c ,V` are respectively the height, the curved surface and the volume of a cone, prove that `3piV h^3-C^2h^2+9V^2=0.`

If h,c,V are respectively the height,the curved surface and the volume of a cone, prove that 3 pi Vh^(3)-C^(2)h^(2)+9V^(2)=0

If h,C,V are respectively the height, the curved surface and volume of the cone, prove that: 3piVh^3-C^2h^2+9V^2=0

If h, C and V are respectively the height, curved surface area and volume of a cone, then what is 3piVh^3 -C^2h^2 + 9V^2 equal to ?

If h,C,V represent height, curved surface area, and volume of cone, prove that 3piVh^(3)-C^(2)h^(2)+9V^(2)=0 .

If h ,\ S\ a n d\ V denote respectively the height, curved surface area and volume of a right circular cone, then 3piV h^3-\ S^2h^2+9V^2 is equal to (a) 8 (b)0(c) 4pi (d) 32pi^2

If h, c, v are respectively the height curved surface area and volume of a right circular cone, then the value of 3pi v h^(3) - c^(2)h^(2) + 9v^(2) is

If h, c, v are respectively the height, curved surface area and volume of a right circular cone, then the value of (3Pivh^3 - c^2h^2+9v^2) is___

If h,G,V,T are respectively the height,curved surface area,volume and total surface area of a cylinder,then prove that: V(pi h^(2)+C)+(V^(2))/(h)=h(T^(2))/(4)