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Question
Prove that if both pairs of opposite angles of a quadrilateral are equal, then it is a parallelogram. [3 MARKS]
Prove that if both pairs of opposite angles of a quadrilateral are equal, then it is a parallelogram. [3 MARKS]
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Solution
Concept : 1 Mark
Application : 1 Mark
Proof : 1 Mark
Consider a parallelogram ABCD with both pairs of opposite angles equal.
We know that, 2x+2y=360° [By angle sum property]
⇒x+y=180°
i.e., ∠A+∠B=x+y=180°
So, AD∥BC.......(i) [Since the co interior angles are supplementary]
Similarly, ∠A+∠D=x+y=180°
So, AB∥DC.......(ii) [Since the co interior angles are supplementary)]
From (i) and (ii) both opposite sides of ABCD are parallel.
⇒ABCD is a parallelogram.
Concept : 1 Mark
Application : 1 Mark
Proof : 1 Mark
Consider a parallelogram ABCD with both pairs of opposite angles equal.
We know that, 2x+2y=360° [By angle sum property]
⇒x+y=180°
i.e., ∠A+∠B=x+y=180°
So, AD∥BC.......(i) [Since the co interior angles are supplementary]
Similarly, ∠A+∠D=x+y=180°
So, AB∥DC.......(ii) [Since the co interior angles are supplementary)]
From (i) and (ii) both opposite sides of ABCD are parallel.
⇒ABCD is a parallelogram.
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