Volume of a Frustum

GCSE Geometry volume frustum

\( V=\tfrac{1}{3}\pi h\,(R^2+r^2+Rr) \)

Statement

The volume of a frustum of a cone is given by:

\[ V = \tfrac{1}{3}\pi h \left(R^2 + r^2 + Rr\right) \]

where \(R\) is the radius of the larger base, \(r\) is the radius of the smaller base, and \(h\) is the vertical height of the frustum.

Why it’s true

A frustum is a cone with its top cut off by a plane parallel to the base.
The formula comes from subtracting the volume of the smaller cone (removed from the top) from the larger cone.
After algebraic simplification, the result is \(\tfrac{1}{3}\pi h (R^2 + r^2 + Rr)\).

Recipe (how to use it)

Write down the radii of the two circular bases: \(R\) and \(r\).
Square each radius: \(R^2\) and \(r^2\).
Multiply the two radii: \(Rr\).
Add them together: \(R^2 + r^2 + Rr\).
Multiply by height \(h\) and \(\pi\).
Finally, divide by 3.

Spotting it

Look for cone-like shapes with the top sliced off parallel to the base — typical in GCSE “real-life” volume problems (buckets, vases, lampshades).

Common pairings

Often appears with similar triangles when height of the missing cone is involved.
Sometimes combined with surface area questions.

Mini examples

Given: \(R=6\), \(r=4\), \(h=10\). Find: Volume. Answer: \(\tfrac{1}{3}\pi \cdot 10 \cdot (36+16+24) = \tfrac{760}{3}\pi\).
Given: \(R=5\), \(r=2\), \(h=12\). Find: Volume. Answer: \(\tfrac{1}{3}\pi \cdot 12 \cdot (25+4+10) = 468\pi\).

Pitfalls

Forgetting to use perpendicular height (not slant height).
Forgetting the cross-term \(Rr\).
Using diameter instead of radius.

Exam strategy

Write the formula clearly before substitution.
Always check which radius is larger and which is smaller.
Leave answers in terms of \(\pi\) unless decimals are asked.

Summary

The volume of a frustum is one third of π times the height times the sum of the squares of the two radii plus their product. It’s derived from subtracting one cone’s volume from another.