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

OPQR is a square and M,N are the middle points of sides PQ and QR respectively then the ratio of the area of the square and the triangle OMN is

The line x+y=p meets the x-and y-axes at A and B, respectively. A triangle APQ is inscribed in triangle OAB, O being with right at Q.P and Q lie, respectivley, on OB and AB. If the area of triangle APQ is 3//8 th of the area of triangle OAB, then AQ/BQ is equal to

If P, Q, R are 3 points on a line and Q lies between P and R, then prove that PQ=PR+RQ

Prove that sqrtp+sqrtq is an irrational, where p,q are primes.

Prove that sqrtp+sqrtq is an irrational, where p,q are primes.

Let 'O' be the origin and A, B be two points. bar(p), bar(q) are vectors represented by bar(OA), bar(OB) and their magnitudes are p, q respectively. Unit vector bisecting angleAOB is

P, Q, R are the midpoints of the sides AB, BC and CA of the triangle ABC and O is a point within the triangle, then OA + OB + OC =

P and Q are any two points lying on the sides DC and AD respectively of a parallelogram ABCD show that ar(DeltaAPB) = ar Delta(BQC)