the diagonal of parallelogram are equal then show that it is rectangle
Answers
Answer:
Step-by-step explanation:
(please draw a parallelogram abcd by yourself...... and diagnols= ac and bd are diagnols)
Given : A parallelogram ABCD , in which AC = BD
TO Prove : ABCD is a rectangle .
Proof : In △ABC and △ABD
AB = AB [common]
AC = BD [given]
BC = AD [opp . sides of a | | gm]
⇒ △ABC ≅ △BAD [ by SSS congruence axiom]
⇒ ∠ABC = △BAD [c.p.c.t.]
Also, ∠ABC + ∠BAD = 180° [co - interior angles]
⇒ ∠ABC + ∠ABC = 180° [∵ ∠ABC = ∠BAD]
⇒ 2∠ABC = 180°
⇒ ∠ABC = 1 /2 × 180° = 90°
Hence, parallelogram ABCD is a rectangle.
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Given: ABCD is a parallelogram and AC = BD
To prove: ABCD is a rectangle
Proof: In Δ ACB and ΔDCB
AB = DC _____ Opposite sides of parallelogram are equal
BC = BC _____ Common side
AC = DB _____ Given
Therefore,
Δ ACB ≅ ΔDCB by S.S.S test
Angle ABC = Angle DCB ______ C.A.C.T
Now,
AB ║ DC _______ Opposite sides of parallelogram are parallel
Therefore,
Angle B + Angle C = 180 degree (Interior angles are supplementary)
Angle B + Angle B = 180
2 Angle B = 180 degree
Angle B = 90 degree
Similarly, we can prove that, Angle A = 90 degree, Angle C = 90 degree and Angle D = 90 degree.
Therefore, ABCD is a rectangle.
(Refer to the attachment for the figure)
