Exploring the Volume Relationship Between Cones and Spheres

Four cones

One cube

Three cylinders

Two cones

Radius squared times height

Area of base times height

Diameter times height

Circumference times height

Base area times height

Cylinder volume divided by 3

Radius squared times height

Cylinder volume times 3

Two

Four

Three

One

No relationship

Radius of the sphere equals twice the height of the cone

Height of cone equals the radius of the sphere

Height of cone equals twice the radius of the sphere

Density measurement

Volume relationships

Surface area comparison

Weight comparison

Sum of volumes of two cones

Volume of a cylinder times 2

Volume of a cylinder divided by 3

Volume of a cube with the same radius

Dividing by the height

Subtracting the base area

Multiplying by the radius

Adding fractions

pi r squared times height

4 pi r squared

2/3 pi r squared

4/3 pi r cubed

No specific reason

To increase the volume

Because the cone is taller than the sphere

To simplify the formula