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Question
In the figure, ray AE || ray BD, ray AF is the bisector of ∠EAB and ray BC is the bisector of ∠ABD. Prove that line AF || line BC.
Solution
Since, ray AF bisects ∠EAB and ray BC bisects ∠ABD, then
∠EAF = ∠FAB = ∠x = `1/2`∠EAB and
∠CBA = ∠DBC = ∠y = `1/2`∠ABD
∴ ∠x = `1/2`∠EAB and ∠y = `1/2`∠ABD ...(1)
Since ray AE || ray BD and segment AB is a transversal intersecting them at A and B, then
∠EAB = ∠ABD ...(Alternate interior angles)
On multiplying both sides by `1/2`, we get
`1/2"∠EAB" = 1/2"∠ABD"`
Now, using (1), we get
∠x = ∠y
But ∠x and ∠y are alternate interior angles formed by a transversal AB of ray AF and ray BC.
∴ ray AF || ray BC ...(Alternate angles test)
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