In `DeltaOAB`, E is the mid point of AB and F is a point on OA such that OF=2FA. If C is the point of intersection of OE and BF, then find the ratios OC : CE and BC : CF are

In DeltaOAB , E is the midpoint of AB and F is a point on OA such that OF = 2FA. If C is the point of intersection of bar(OE) and bar(BF) , then find the ratios OC : CE and BC : CF.

If C is the mid point of AB and P is any point outside AB, then

In a DeltaOAB, E is the mid point of OB and D is a point in AB such that AD : DB = 2 : 1. If OD and AE intersect at P, then OP : PD =

In DeltaOAB , L is the midpoint of OA and M is a point on OB such that (OM)/(MB)=2 . P is the mid point of LM and the line AP is produced to meet OB at Q. If bar(OA)=bar(a), bar(OB)=bar(b) then find vectors bar(OP) and bar(AP) interms of bar(a) and bar(b) .

In DeltaABC , D, E and F are the mid points of the sides, then DeltaDEF =

If C is the mid point of AB and if P is any point out side AB then show that bar(PA)+bar(PB)=2bar(PC) .

In DeltaABC , P is a point on the side BC such that 3BP = 2PC. Q is a point on the side CA such that 4CQ = QA. The lines AP and BQ intersect in R. Produce the line CR to meet the side AB in S. Find the ratio in which S divides AB.

In the given DeltaABC , points D and E are mid points of AB and AC and also BC=6 cm then find DE.