Question

In the given figure $ABC$ is a right-angled triangle at B. Let $D$ and $E$ be any points on $AB$ and $BC$ respectively. Prove that ${\left(AE\right)}^2+{\left(CD\right)}^2={\left(AC\right)}^2+{\left(DE\right)}^2$

Answer 1

Step 1: Form equations for $∆ABE$ and $∆DBC$ by Pythagoras theorem.

Given: $ABC$ is a right-angled triangle at $B$

In $∆ABE$ use Pythagoras theorem

${\left(AE\right)}^2={\left(AB\right)}^2+{\left(BE\right)}^2..\left(i\right)$

In $∆DBC$ use Pythagoras theorem

${\left(CD\right)}^2={\left(BD\right)}^2+{\left(BC\right)}^2..\left(ii\right)$

Add $\left(i\right)$ and $\left(ii\right)$

$$\begin{gathered} {\left(AE\right)}^2+{\left(CD\right)}^2={\left(AB\right)}^2+{\left(BE\right)}^2+{\left(BD\right)}^2+{\left(BC\right)}^2 \\ {\left(AE\right)}^2+{\left(CD\right)}^2={\left(AB\right)}^2+{\left(BC\right)}^2+{\left(BD\right)}^2+{\left(BE\right)}^2..\left(iii\right) \end{gathered}$$

Step 2: Prove the required condition

In $∆ABC$ use Pythagoras theorem

${\left(AC\right)}^2={\left(AB\right)}^2+{\left(BC\right)}^2...\left(iv\right)$

In $∆DBE$use Pythagoras theorem

${\left(DE\right)}^2={\left(BE\right)}^2+{\left(BD\right)}^2...\left(v\right)$

Use $\left(iv\right),\left(v\right)$ in $\left(iii\right)$

${\left(AE\right)}^2+{\left(CD\right)}^2={\left(AC\right)}^2+{\left(DE\right)}^2$

Hence, the required condition ${\left(AE\right)}^2+{\left(CD\right)}^2={\left(AC\right)}^2+{\left(DE\right)}^2$ is proved.