Answer:
The area of base of cylinder(a) is equal to the base of pyramid(b)
The area of base of cylinder(a) is equal to the base of pyramid(b)The height of cylinder(h) is twice the height of pyramid(p)
The area of base of cylinder(a) is equal to the base of pyramid(b)The height of cylinder(h) is twice the height of pyramid(p)Given a=b and h=2p
The area of base of cylinder(a) is equal to the base of pyramid(b)The height of cylinder(h) is twice the height of pyramid(p)Given a=b and h=2pThe volume of pyramid is
The area of base of cylinder(a) is equal to the base of pyramid(b)The height of cylinder(h) is twice the height of pyramid(p)Given a=b and h=2pThe volume of pyramid is 3
The area of base of cylinder(a) is equal to the base of pyramid(b)The height of cylinder(h) is twice the height of pyramid(p)Given a=b and h=2pThe volume of pyramid is 31
The area of base of cylinder(a) is equal to the base of pyramid(b)The height of cylinder(h) is twice the height of pyramid(p)Given a=b and h=2pThe volume of pyramid is 31
The area of base of cylinder(a) is equal to the base of pyramid(b)The height of cylinder(h) is twice the height of pyramid(p)Given a=b and h=2pThe volume of pyramid is 31 ah
The area of base of cylinder(a) is equal to the base of pyramid(b)The height of cylinder(h) is twice the height of pyramid(p)Given a=b and h=2pThe volume of pyramid is 31 ahThe volume of cylinder is bp=2ah
The area of base of cylinder(a) is equal to the base of pyramid(b)The height of cylinder(h) is twice the height of pyramid(p)Given a=b and h=2pThe volume of pyramid is 31 ahThe volume of cylinder is bp=2ahSo the ratio of volumes is
The area of base of cylinder(a) is equal to the base of pyramid(b)The height of cylinder(h) is twice the height of pyramid(p)Given a=b and h=2pThe volume of pyramid is 31 ahThe volume of cylinder is bp=2ahSo the ratio of volumes is 6
The area of base of cylinder(a) is equal to the base of pyramid(b)The height of cylinder(h) is twice the height of pyramid(p)Given a=b and h=2pThe volume of pyramid is 31 ahThe volume of cylinder is bp=2ahSo the ratio of volumes is 61
The area of base of cylinder(a) is equal to the base of pyramid(b)The height of cylinder(h) is twice the height of pyramid(p)Given a=b and h=2pThe volume of pyramid is 31 ahThe volume of cylinder is bp=2ahSo the ratio of volumes is 61
The area of base of cylinder(a) is equal to the base of pyramid(b)The height of cylinder(h) is twice the height of pyramid(p)Given a=b and h=2pThe volume of pyramid is 31 ahThe volume of cylinder is bp=2ahSo the ratio of volumes is 61
The area of base of cylinder(a) is equal to the base of pyramid(b)The height of cylinder(h) is twice the height of pyramid(p)Given a=b and h=2pThe volume of pyramid is 31 ahThe volume of cylinder is bp=2ahSo the ratio of volumes is 61 Therefore the correct option is B
