ABCD is a trapezium in which AB parallel to CD if AD is equals to BC. show that angle A is equals to angle B and angle C is equal to angle D
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here in trapezium ABCD A B is parallel to CD and AD is equal to BC that is it is also a parallel to BC therefore in trapezium all the opposite sides are parallel and the angles will be the equal
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Let us extend AB. Then, draw a line through C, which is parallel to AD, intersecting AE at point E
AD||CE ( by construction)
AE||DC ( as AB is extended to E)
It is clear that AECD is a parallelogram
(i) AD = CE (Opposite sides of parallelogram AECD)
However,
AD = BC (Given)
Therefore,
BC = CE
∠CEB = ∠CBE (Angle opposite to equal sides are also equal)
Consider parallel lines AD and CE. AE is the transversal line for them
∠A + ∠CEB = 1800 (Angles on the same side of transversal)
∠A + ∠CBE = 1800 (Using the relation CEB = CBE) ...(1)
However,
∠B + ∠CBE = 1800 (Linear pair angles) ...(2)
From equations (1) and (2), we obtain
∠A = ∠B
(ii) AB || CD
∠A + ∠D = 1800 (Angles on the same side of the transversal)
Also,
∠C + ∠B = 1800 (Angles on the same side of the transversal)
∠A + ∠D = ∠C + ∠B
However,
∠A = ∠B [Using the result obtained in (i)
∠C = ∠D
(iii) In ΔABC and ΔBAD,
AB = BA (Common side)
BC = AD (Given)
∠B = ∠A (Proved before)
ΔABC ΔBAD (SAS congruence rule)
(iv) We had observed that,
ΔABC ΔBAD
AC = BD (By CPCT)
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