If D is the mid-point of the hypotenuse AC of a right triangle ABC, prove that BD = $\frac{1}{2}$ AC. [4 MARKS]

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Solution

Concept : 1 Mark
Process : 2 Marks
Proof : 1 Mark

To Prove: BD = $\frac{1}{2}$ AC

Construction: Produce BD to E such that BD = DE and join EC

Proof: In $Δ$ ADB and $Δ$ CDE, we have

AD = DC [Given]

BD = DE [By Construction]

And, $∠$ ADB = $∠$ CDE [Vertically opposite angles]

So,

$△$ ADB $≅$ $△$ CDE [by SAS criterion of congruence]

$\Rightarrow$ EC = AB and $∠$ CED = $∠$ ABD [C.P.C.T.C] ............(1)

But $∠$ CED and $∠$ ABD are alternate angles and are equal.

So, CE || AB

$∠$ ABC + $∠$ ECB = $180^{\circ}$ [Co - interior angles angles]

90^o + $∠$ ECB = $180^{\circ}$

$∠$ ECB = $90^{\circ}$

In $Δ$ s ABC and ECB,

AB = EC [From 1]

BC = CB [Common]

And, $∠$ ABC = $∠$ ECB = $90^{\circ}$

So

$△$ ABC $≅$ $△$ ECB [by SAS criterion of congruence]

$\Rightarrow$ AC = BE [C.P.C.T.C]

$\frac{1}{2}$ AC = $\frac{1}{2}$ BE

$∴$ BD = $\frac{1}{2}$ AC

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If D is the mid-point of the hypotenuse AC of a right triangle ABC, prove that BD = 12AC. [4 MARKS]

If D is the mid-point of the hypotenuse AC of a right triangle ABC, prove that BD = $\frac{1}{2}$ AC. [4 MARKS]