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Question

Question 3
In figure, if 1=2 and ΔNSQΔMTR, then prove that ΔPTSΔPRQ.

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Solution

Given, ΔNSQΔMTR and 1=2
To prove :ΔPTSΔPRQ
Proof :

Since, ΔNSQΔMTR
So, SQ = TR ...(i)
Also, 1=2 PT=PS (ii) [since, sides opposite to equal angles are also equal]

Dividing Eqn. (ii) by (i), we get,
PSSQ=PTTR
STQR [byconverseofbasicproportionallytheorem]
1=PQR
and 2=PRQ

In ΔPTS and ΔPRQ,
P=P [common angles]
1=PQR (Corresponding angles)
2=PRQ (Corresponding angles)
ΔPTSΔPRQ [by AAA similarity criterion]


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