In the figure given below, if OP || RS, ∠OPQ=110o and ∠QRS=130o, then ∠PQR is equal to
60o
In the given figure, if we extend OP then a triangle PQT is formed, where T is the point where OP cuts QR.
Now from the above figure:
∠OPQ + ∠QPT = 180∘
⇒∠QPT = 180∘ - 110∘ = 70∘
Now, since if OP || RS, ∠SRQ and ∠UTQ are corresponding angles hence, ∠UTQ = ∠SRQ = 130∘.
Therefore we have,
∠UTQ + ∠PTQ = 180∘
⇒∠PTQ = 180∘ - 130∘ = 50∘
In triangle PTQ
∠PTQ + ∠TQP + ∠QPT = 180∘
⇒50∘ + ∠TQP + 70∘ = 180∘
⇒∠TQP = 180∘ - 120∘ = 60∘
⇒∠TQP = ∠PQR = 60∘.