Volume Relationships of Spheres and Cubes

Pi is the square of the radius.

Pi is the number of squares needed to fill a circle.

Pi is the circumference of the circle.

Pi is the diameter of the circle.

By adding the volume of a cone.

By considering a hemisphere as two-thirds of a cylinder.

By subtracting the volume of a hemisphere.

By doubling the volume of the cylinder.

2/3 pi r cubed

3/4 pi r cubed

4/3 pi r cubed

pi r squared

Divide by pi.

Multiply by the volume of a cube.

Take the square root of the volume.

Multiply by the multiplicative inverse of the coefficient.

To simplify the expression.

To convert the expression to a fraction.

To make the equation more complex.

To eliminate the pi from the equation.

By using their circumferences.

By comparing their diameters.

By equating their surface areas.

By setting their volume formulas equal.

The radius is equal to the side of the cube.

The radius is the cube root of three over four pi times the side of the cube.

The radius is twice the side of the cube.

The radius is half the side of the cube.

0.620

3.1415

1.2387

0.2387

10 inches

12.5 inches

16.12 inches

20 inches

Addition and subtraction

Multiplication and division

Logarithms and exponents

Radical and rational exponent expressions