O P Q R is a square and M ,N are the mid...

`O P Q R` is a square and `M ,N` are the midpoints of the sides `P Q` and `Q R` , respectively. If the ratio of the area of the square to that of triangle `O M N` is `lambda:6,` then `lambda/4` is equal to 2 (b) 4 (c) 2 (d) 16

Similar Questions

Explore conceptually related problems

O P Q R is a square and M ,N are the midpoints of the sides P Q and Q R , respectively. If the ratio of the area of the square to that of triangle O M N is lambda:6, then lambda/4 is equal to (a)2 (b) 4 (c) 2 (d) 16

O P Q R is a square and M ,N are the middle points of the sides P Qa n dQ R , respectively. Then the ratio of the area of the square to that of triangle O M N is 4:1 (b) 2:1 (c) 8:3 (d) 7:3

O P Q R is a square and M ,N are the middle points of the sides P Qa n dQ R , respectively. Then the ratio of the area of the square to that of triangle O M N is (a)4:1 (b) 2:1 (c) 8:3 (d) 7:3

O P Q R is a square and M ,N are the middle points of the sides P Qa n dQ R , respectively. Then the ratio of the area of the square to that of triangle O M N is (a) 8:1 (b) 2:1 (c) 8:3 (d) 7:3

In Delta P Q R , if P Q=Q R and L ,M and N are the mid-points of the sides P Q ,Q R and R P respectively. Prove that L N=M Ndot

OPQR is square ('O' being origin and M,N are middle points of sides PQ, QR respectively and the ratio of areas of square and triangle OMN is p/q (where P,q are relatively prime ) then P-q is

`O P Q R` is a square and `M ,N` are the midpoints of the sides `P Q` and `Q R` , respectively. If the ratio of the area of the square to that of triangle `O M N` is `lambda:6,` then `lambda/4` is equal to 2 (b) 4 (c) 2 (d) 16

Similar Questions

Recommended Questions