成人快手

Complex Pythagoras

You now know how to use Pythagoras' theorem to find any side of a right-angled triangle. Sometimes you have to use it more than once in the same problem.

Question

How would you find S in this diagram, where a right-angled triangle has been split in half?

Diagram of right-angled triangle with values

Answer

You cannot find S until you have found the length of the other side of the whole triangle. We will call it \(x\). Note that \(x\) also forms one side of the smaller right-angled triangle.

Looking at this smaller triangle, you will see that:

\({x^2} = {7^2} - {3^2}\)

So \({x^2} = 49 - 9 = 40\)

(We will not calculate \(x=\sqrt{40}\) as we are going to square it again below)

Diagram of two right-angled triangles with different values

Looking at the bigger right-angled triangle, you will see that:

\({S^2} = {x^2} + {6^2}\)

which means \({S^2} = 40 + 36\)

\({S^2} = 76\)

\(S = \sqrt {76}\)

\(S = 8.72\,(to\,two\,decimal\,places)\)

Now try the example question below.

Question

How would you find \(c\) in this diagram?

Diagram of a trio of pythagoras triangles with values