EastMath
Home/ Curriculum/ Geometry/ The Pythagorean theorem

The Pythagorean theorem

Stage 5 · Geometry Free lesson ≈ 8 min read Beginner-friendly

There is one fact about right-angled triangles so useful that builders, sailors and astronomers have leaned on it for thousands of years. Once you see why it’s true, you’ll never forget it.

The big idea

A right triangle is any triangle with one square corner — a 90° angle. The two short sides that form that corner are called the legs, and the long side opposite it is the hypotenuse.

b a c
Legs a and b meet at the right angle; c is the hypotenuse.

The Pythagorean theorem says these three lengths are locked together by one simple rule:

\[ a^2 + b^2 = c^2 \]

In words The square built on the hypotenuse has exactly the same area as the two squares built on the legs, added together.

Seeing why it’s true

Don’t just trust the formula — look at it. Draw an actual square on each side of the triangle. The area of the big square (on side c) really does equal the two smaller squares (on sides a and b) combined.

The amber and rose squares, together, fill exactly the same area as the violet square.

Worked example 1 — finding the hypotenuse

Example A triangle has legs of 3 and 4. How long is the hypotenuse?
  1. Start from the theorem: \( a^2 + b^2 = c^2 \).
  2. Substitute the legs: \( 3^2 + 4^2 = c^2 \).
  3. Work out the squares: \( 9 + 16 = c^2 \), so \( c^2 = 25 \).
  4. Take the square root: \( c = \sqrt{25} = 5 \).

The 3–4–5 triangle This exact set of whole numbers turns up everywhere — carpenters still use it to check that a corner is perfectly square.

Worked example 2 — finding a missing leg

Example The hypotenuse is 13 and one leg is 5. How long is the other leg?
  1. Write the theorem with the unknown leg as \( b \): \( 5^2 + b^2 = 13^2 \).
  2. Square the known values: \( 25 + b^2 = 169 \).
  3. Subtract to isolate \( b^2 \): \( b^2 = 169 - 25 = 144 \).
  4. Take the square root: \( b = \sqrt{144} = 12 \).

When you already know the hypotenuse, you subtract instead of add — the longest side is the one being broken apart.

Where you’ll meet it

Beyond the classroom The straight-line distance between two points on a map, the diagonal of a TV screen, whether a ladder will reach a window — all of them are just the Pythagorean theorem wearing different clothes.

Practice

Try each one yourself, then reveal the full solution.

1. A right triangle has legs of 6 and 8. Find the hypotenuse.

\( 6^2 + 8^2 = 36 + 64 = 100 \), so \( c = \sqrt{100} = \mathbf{10} \).

2. The hypotenuse is 17 and one leg is 8. Find the other leg.

\( b^2 = 17^2 - 8^2 = 289 - 64 = 225 \), so \( b = \sqrt{225} = \mathbf{15} \).

3. A 10 m ladder rests against a wall with its base 6 m out. How high up the wall does it reach?

The ladder is the hypotenuse. \( h^2 = 10^2 - 6^2 = 100 - 36 = 64 \), so \( h = \sqrt{64} = \mathbf{8\ \text{m}} \).

You did it. That’s a full EastMath lesson — intuition, a proof you can see, worked examples, and practice that checks itself. Every lesson on the path works exactly like this.

This is one lesson of many

The full path has 40+ modules just like this, in careful order. Start at the beginning, or jump to whatever you want to master next.

Explore the curriculum See pricing