In the alongside figure, ABCD is a parallelogram in which AP bisects angle A and BQ bisects angle B. Prove that :
(i) AQ = BP
(ii) PQ = CD
(iii) ABPQ is a parallelogram

Question

In the alongside figure, ABCD is a parallelogram in which AP bisects angle A and BQ bisects angle B. Prove that : (i) AQ = BP (ii) PQ = CD (iii) ABPQ is a parallelogram

KnowledgeBoat · Accepted Answer

(i) Let ∠A = 2x. We know that, Sum of consecutive angles in a parallelogram equals to 180°. ⇒ ∠A + ∠B = 180° ⇒ 2x + ∠B = 180° ⇒ ∠B = 180° - 2x. ⇒ ∠PAB = = x. ⇒ ∠QBA = = 90° - x. In △ ABP, ⇒ ∠PAB + ∠ABP + ∠BPA = 180° (By angle sum property of triangle) ⇒ x + 180° - 2x + ∠BPA = 180° ⇒ 180° - x + ∠BPA = 180° ⇒ ∠BPA = 180° - 180° + x = x. ∴ ∠BPA = ∠PAB (Both equal to x) ∴ AB = BP (In a triangle sides opposite to equal angles are equal) ..........(1) In △ ABQ, ⇒ ∠QBA + ∠BAQ + ∠AQB = 180° (By angle sum property of triangle) ⇒ 90° - x + 2x + ∠AQB = 180° ⇒ 90° + x + ∠AQB = 180° ⇒ ∠AQB = 180° - 90° - x = 90° - x. ∴ ∠AQB = ∠QBA (Both equal to 90° - x) ∴ AB = AQ (In a triangle sides opposite to equal angles are equal) ..........(2) From equation (1) and (2), we get : ⇒ AQ = BP. Hence, proved that AQ = BP. (ii) Given, ABCD is a parallelogram. We know that, Opposite sides of parallelogram are equal and parallel. ∴ AB = CD ............(1) ∴ AD || BC. Since, AD || BC ∴ AQ || BP Join PQ. We know that, AQ = BP (Proved above) In quadrilateral ABPQ, AQ = BP and AQ || BP. Since, one of the pair of opposite sides of quadrilateral ABPQ are equal and parallel. ∴ ABPQ is a parallelogram. ∴ AB = PQ [Opposite sides of parallelogram are equal] .........(2) From (1) and (2), we get : PQ = CD. Hence, proved that PQ = CD. (iii) In quadrilateral ABPQ, AQ || BP and AQ = BP. ∴ ABPQ is a parallelogram (Since, one of the pair of opposite sides of quadrilateral ABPQ are equal and parallel.) Hence, proved that ABPQ is a parallelogram.

Mathematics

In the alongside figure, ABCD is a parallelogram in which AP bisects angle A and BQ bisects angle B. Prove that :
(i) AQ = BP
(ii) PQ = CD
(iii) ABPQ is a parallelogram

Rectilinear Figures

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Mathematics

In the alongside figure, ABCD is a parallelogram in which AP bisects angle A and BQ bisects angle B. Prove that :(i) AQ = BP(ii) PQ = CD(iii) ABPQ is a parallelogram

Rectilinear Figures

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(i) AQ = BP
(ii) PQ = CD
(iii) ABPQ is a parallelogram

The alongside figure shows a parallelogram ABCD in which AE = EF = FC. Prove that :
(i) DE is parallel to FB
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