Ques: In Fig. below, CM and RN are respectively the medians of A ABC and APQR. If A ABC - A PQR, prove that: (1) A AMC - A PNR (ii) CM/RN = AB/PQ ACMB - ARNO N P A M M C B R

In the given figure, CM and RN are respectively the medians of DeltaABC and DeltaPQR . If DeltaABC ~DeltaPQR , prove that, (CM)/(RN)=(AB)/(PQ)

In the given figure , CM and RN are respectively the median of triangles ABC and PQR IF Delta ABC is similar to Delta PQR ,prove that (i) Delta AMC ~ Delta PNR (ii) (CM)/(RN) = (AB)/(PQ) and (iii)Delta CMB ~ Delta RNQ

Given that /_\ABC~/_\PQR , CM and RN are respectively the medians of /_\ABC and /_\PQR . Prove that i) /_\AMC~/_\PNR

In figure Cm and RN are respectively the medians of DeltaA B C and DeltaP Q R . If DeltaA B C ~DeltaP Q R , prove that: (i) DeltaA M C ~DeltaP N R (ii) (C M)/(R N)=(A B)/(P Q) (ii) DeltaC M B ~DeltaR N Q

In figure Cm and RN are respectively the medians of DeltaA B C and DeltaP Q R . If DeltaA B C ~DeltaP Q R , prove that: (i) DeltaA M C ~DeltaP N R (ii) (C M)/(R N)=(A B)/(P Q) (ii) DeltaC M B ~DeltaR N Q

Given that Delta ABC ~ Delta PQR , CM and RN are respectively the medians of Delta ABC and Delta PQR . Prove that (i) Delta AMC ~ Delta PNR (ii) (CM)/(RN) = (AB)/(PQ) (iii) Delta CMB ~ Delta RNQ

CM and RN are respectively the medians of similar triangle DeltaABC and DeltaPQR . Prove that (CM)/(RN)=(AB)/(PQ)

Given that DeltaABC~DeltaPQR , CM and RN are respectively the medians of DeltaABC and DeltaPQR . Prove that (CM)/(RN)=(AB)/(PQ)

Giventhat /_\ABC~/_\PQR ,CM and RN are respectively the medians of /_\ABC and /_\PQR .Provethat ii) (CM)/(RN) =(AB)/(PQ)

Given that /_\ABC~/_\PQR ,CM and RN are respectively the medians of /_\ABC and /_\PQR .Prove that iii) /_\CMB~/_\RNQ