Prove that the midpoints of the adjacent sides of a rectangle will form a rhombus. [4 MARKS]

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Solution

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

Consider a rectangle $A B C D$ .

Let $P Q R S$ be the quadrilateral formed by the midpoint of the adjacent sides of the rectangle.

Let the length of the rectangle be $2 a$ and let the breadth be $2 b .$

$\Rightarrow A P = P B = D R = R C = a .$ [Since $P$ and $R$ are midpoints of $A B$ and $C D$ ]

and $A S = S D = B Q = Q C = b .$ [Since $S$ and $Q$ are midpoints of $A D$ and $B C$ ]

Consider triangles $Δ P A S$ and $Δ R D S$

$P A = R D$ [Proved above]

$A S = D S$ [Proved above]

$∠ P A S = ∠ R D S = 90^{\circ}$ [Angles of a rectangle – included angle]

$Δ P A S ≅ Δ R D S$ [SAS congruency]

$\Rightarrow P S = R S$ ......(i) [CPCTC]

Similarly $Δ P A S ≅ Δ P B Q$

$\Rightarrow P S = P Q$ .....(ii) [CPCTC]

$Δ P B Q ≅ Δ R C Q$

$\Rightarrow P Q = R Q$ .....(iii) [CPCTC]

$Δ R C Q ≅ Δ R D S$

$\Rightarrow R Q = R S$ .....(iv) [CPCTC]

By (i), (ii), (iii) and (iv) $P S = R S = P Q = R Q$

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

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