Question

In triangle below, ab=qr, bc=rp, ca=pq. Compute

Answer 1

Answer:

We know that, if ΔRST is congruent to ΔUVW i.e., ΔRST = ΔUVW, then sides of ΔRST fall on corresponding equal sides of ΔUVW and angles of ΔRST fall on corresponding equal angles of ΔUVW.

Here, given AB = QR, BC = PR and CA = PQ, which shows that AB covers QR, BC covers PR and CA covers PQ i.e., A correspond to Q, B correspond to R and C correspond to P.

or A↔Q,B↔R,C↔P

Under this correspondence,

ΔABC ≅ ΔQRP....✌️❤️

Step-by-step explanation: