Math, asked by AnishNayak5286, 6 months ago

Diagonals of a quadrilateral abcd intersect in point q. if 2qa = qc , 2qb = qd , then prove that dc = 2ab.

Answers

Answered by ganeshholge7
0

Answer:

Diagonals of a quadrilateral ABCD intersect in point Q. if 2 QA = QC, 2 QB = QD, then prove that DC = 2 AB.

Answered by ATHARVDALVI
1

Answer:

DC = 2 AB if  Diagonals of a quadrilateral ABCD intersect in point O. and 2 OA=OC, 2 OB= OD,

Step-by-step explanation:

2OA = OC

2OB = OD

=> 2OA/2OB = OC/OD

=> OA/OB = OC/OD

=> OA/OC = OB/OD

& ∠AOB = ∠COD ( Vertically opposite angles)

Comparing triangle

ΔOAB & ΔOCD

OA/OC  = OB/OD          

∠AOB = ∠COD

=>    ΔOAB ≈ ΔOCD

=> OA/OC  = AB/CD

=> 1/2 = AB/CD

=> CD = 2 * AB

=> DC = 2 AB

QED

proved

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