If S is the midpoint of a straight line PQ and R is a point different from S , such that PR = RQ , then

In triangle ABC , P and Q are the middle points of the sides AB and AC respectively. R is a point on the segment PQ such that PR: RQ =1: 2. If PR = 2cm, then BC =? triangle ABC में, P और Q क्रमशः भुजाओं AB तथा AC के मध्य बिंदु हैं। R, PQ पर एक बिंदु इस प्रकार है कि PR: RQ =1: 2 यदि PR=2 सेमी, तो BC=

PQ is a line segment 12cm long and R is a point in its interior such PR=8cm,then

The position vectors of P and Q are respectively a and b. If R is a point on PQ such that PR=5PQ, then the position vector of R is

PQ is a line segment 12cm long and R is a point in its interior such that PR=8cm, then find QR,PQ^(2)-PR^(2) and PR^(2)+QR^(2)+2PR*QR

In the following figures, PQ = LM, Q is the midpoint of PR and M is the midpoint of LN. Using the axioms, prove that PR = LN.

If S is the mid-point of side QR of a DeltaPQR , then prove that PQ+PR=2PS .

In a DeltaPQR , S in a point on side PQ and T is a point on side PR such that ST II QR (PS)/(SQ) = 3/5 and PR = 28 cm. What is the value of PT?

In DeltaPQR,Pq=PR and S is the mid-point of PQ. A line drawn from S parallel to QR, intersects the line PR at T. Prove that PS = PT.