Prove that the midpoints of the adjacent sides of a quadrilateral will form a parallelogram. [4 MARKS]

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Solution

Diagram : 1 Mark
Concept : 1 Mark
Proof : 2 Marks

Let $A B C D$ be the quadrilateral and let $P, Q, R$ and $S$ be the midpoints of sides $A B, B C, C D$ and $D A$ respectively.

In $Δ C D B, R Q ∥ D B$ and $R Q = \frac{1}{2} D B$ ......(i)
[By mid point theorem]

In $Δ A D B, S P ∥ D B$ and $S P = \frac{1}{2} D B$ .......(ii)
[By mid point theorem]

By (i) and (ii),

$\Rightarrow R Q ∥ S P$ and $R Q = S P$

$∴$ a pair of opposite sides of $P Q R S$ are equal and parallel.

$\Rightarrow P Q R S$ is a parallelogram.

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