First, let us find the height of one side of the cube, we have;
S= cube root of 64
S= 4.
Since the diameter is 4 cm, the radius will be 2 cm.
now, solve it by using the formula:
V= PI.r squared . h
V= 3.14. 2 cm squared. 4 cm
V= 3.14. 16
v=50.24 cubic centimeter
(4/27)*pi*R3*tan(x) R being the radius of the base of the cone.
Millimeter centimeter meter kilometer is the right order
kilometer
It is 2*r^2.
The answer depends on the cylinder.
volume of a regular right circular cylinder is V=pi(r2)h since the radius is (a) then the height of the circular cylinder would be (2a) so the volume of the largest possible right circular cylinder is... V=2(pi)(r2)(a) with (pi) being 3.14159 with (r) being the radius of the circle on the top and bottom of the cylinder with (a) being the radius of the sphere
(4/27)*pi*R3*tan(x) R being the radius of the base of the cone.
Find the dimensions of the rectangle of largest area that can be inscribed in a circle of radius a in C programming
Millimeter, centimeter, meter, kilometer.
Millimeter centimeter meter kilometer is the right order
kilometer
kilometer
Let the radius of the largest sphere that can be carved out of the cube be r cm.The largest sphere which can be carved out of a cube touches all the faces of the cube.∴ Diameter of the largest sphere = Edge of the cube⇒ 2r = 7 cm∴ Volume of the largest sphere
A host cell
It is 2*r^2.
up to a 30 centimeter(12)in.
The answer depends on the cylinder.