Inertia and Volume of Spheres

Finding the volume of the sphere

Calculating the mass of the sphere

Determining the density of the sphere

Breaking the sphere into cross-sections

Through the density of the sphere

By measuring the circumference

By calculating the surface area

Using the Pythagorean theorem

It varies with the radius

It is constant throughout the sphere

It is zero at the center

It changes with temperature

Mass is the derivative of volume

Volume is the derivative of mass

Mass is density times differential volume

Volume is density times differential mass

Inertia of a cube

Inertia of a sphere

Inertia of a solid cylinder

Inertia of a hollow cylinder

To simplify the algebra

To account for the entire sphere

To avoid complex numbers

To reduce the number of variables

2/5 times the mass times the radius squared

3/5 times the mass times the radius squared

1/2 times the mass times the radius squared

4/5 times the mass times the radius squared

Volume minus density

Density plus the volume

Density times the volume

Volume divided by density

1/2 π R^3

2/3 π R^3

4/3 π R^3

3/4 π R^3

It reduces the number of variables

It eliminates the need for density

It makes the formula more complex

It simplifies the calculation