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Step-by-step explanation:
In the given figure, we are provided that,
PS = PT
PQ = PR
also,
∠QPR = ∠SPT
As we know that Angle opposite to the equal sides are also equal.
Therefore,
∠PQR = ∠PRQ = θ (say) (because, PQ = PR)
also,
∠PST = ∠PTS = ∅ (say) (because, PS = PT)
Now,
As,
Sum of angles in a triangle is equal to 180°.
Therefore, in triangle PQR,
∠QPR = 180° - ∠PQR - ∠PRQ = 180° - θ - θ = 180° - 2θ
Similarly, in triangle PST,
∠TPS = 180° - ∠PST - ∠PTS = 180° - ∅ - ∅ = 180° - 2∅
But,
∠QPR = ∠TPS (given)
So,
180° - 2θ = 180° - 2∅
θ = ∅
Now,
In triangle PQS and triangle PRT,
PQ = PR (given)
∠QPS = 180° - 2θ + ∠RPS = ∠TPR = 180° - 2∅ + ∠RPS (because, θ = ∅)
and,
PS = PT (given)
Therefore,
Triangle PQS ≅ Triangle PRT (SAS congruency)
So,
QS = RT
Hence, proved.
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