Question 175
A line l is parallel to line m and a transversal p intersects them at X, Y respectively. Bisectors of interior angles at X and Y intersect at P and Q. Is PXQY a rectangle? Give reason.
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Solution
Given, l∥m ∴∠DXY=∠XYA [alternate interior angles] ⇒∠DXY2=∠XYA2 [dividing both the sides by 2]
Now, ∠1=∠2 [∵ XP and YQ are bisectors]
Alternate angles are equal, i.e. ∠1=∠2 ⇒XP∥QY ....... (i)
Similarly, XQ∥PY ....... (ii)
From Eqs. (i) and (ii), we get
PXQY is a parallelogram ........ (iii) ⇒∠DXY+∠XYB=180∘ [∵ interior angles on the same side of transversal are supplementary] ∠DXY2+XYB2=180∘2 [dividing both the sides by 2] ∠1+∠3=90∘ ....... (iv)
In ΔXYP, ∠1+∠3+∠P=180∘ 90∘+∠P=180∘ [from Eq. (iv)] ∠P=90∘ ......... (v)
Similarly, ∠Q=90∘ ......... (vi)
From Eqs. (iii), (v) and (vi), PXQY is a rectangle.