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Pythagorean Theorem Proof

You can learn all about the Pythagorean theorem, but here is a quick summary:

The Pythagorean theorem says that, in a right triangle, the square of a (which is a×a, and is written a²) plus the square of b (b²) is equal to the square of c (c²):

a² + b² = c²

We can show that a² + b² = c² using Algebra

Take a look at this diagram ... it has that "abc" triangle in it (four of them actually):

It is a big square, with each side having a length of a+b, so the total area is:

A = (a+b)(a+b)

Now let's add up the areas of all the smaller pieces:

First, the smaller (tilted) square has an area of:

c²

Each of the four triangles has an area of:

ab2

So all 4 of them together is:

4ab2 = 2ab

The tilted square and the 4 triangles together is:

A = c² + 2ab

The area of the large square is equal to the area of the tilted square and the 4 triangles. This can be written as:

(a+b)(a+b) = c² + 2ab

NOW, let us rearrange this to see if we can get the Pythagorean theorem:

Start with:

(a+b)(a+b) = c² + 2ab

a² + 2ab + b² = c² + 2ab

Subtract "2ab" from both sides:

a² + b² = c²

DONE!

Now we can see why the Pythagorean theorem works ... and it is actually a proof of the theorem.

This proof came from China over 2000 years ago!

There are many more proofs of the Pythagorean theorem, but this one works neatly.

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