Question

IF AB =QR ,BC=PR AND CA=PQ THEN

Answer 1

Answer:

QS is the answer.........

Answer 2

Answer:

ΔABC≅ΔPQR

ΔCBA≅ΔPQR

ΔBAC≅ΔRPQ

ΔPQR≅ΔBCA

Answer :

B

Solution :

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 angels 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 correcpond P

of A↔Q,B↔R,C↔P

Under this correspondence,

ΔABC≅ΔQRP ,so option (a) is incorrect.

or ΔBAC≅ΔRQP ,so option ( c) is incorrect.

ΔCBA≅ΔPRQ ,so option (b ) is correct.

ΔBCA≅ΔRPQ ,so option (d) is incorrect.