Let ABC be a triangle and P be a point inside ABC such that `vec(PA) +2vec(PB)+ 3vec(PC)= vec(0)`. The ratio of the area of triangle ABC to that of APC is

Let ABC be a triangle and P be a point inside ABC such that vec(PA) + 2vec(PB) + 3vec(PC) = vec0 . The ratio of the area of triangle ABC to that of APC is - (A) 2 (B) 3/2 (C) 5/3 (D) 3

Let O be an interior point of triangle ABC, such that 2vec(OA)+3vec(OB)+4vec(OC)=0 , then the ratio of the area of DeltaABC to the area of DeltaAOC is

If P is a point inside Delta ABC such that BC(vec PA)+CA(vec PB)+AB(vec PC)=vec O then P is the .....

Let O be an interior point of Delta ABC such that 2vec OA+5vec OB+10vec OC=vec 0

Let vec(A)D be the angle bisector of angle A" of " Delta ABC such that vec(A)D=alpha vec(A)B+beta vec(A)C, then

If P is a point on the plane of DeltaABC such that bar(PA) + bar(PB) + bar(PC) = 0 , then, for Delta ABC, the point P is

G is a point inside the plane of the triangle ABC,vec GA+vec GB+vec GC=0, then show that G is the centroid of triangle ABC.

Let A(5,-3), B (2,7) and C (-1, 2) be the vertices of a triangle ABC . If P is a point inside the triangle ABC such that the triangle APC,APB and BPC have equal areas, then length of the line segment PB is:

If D,E and F are the mid-points of the sides BC, CA and AB respectively of a triangle ABC and lambda is scalar, such that vec(AD) + 2/3vec(BE)+1/3vec(CF)=lambdavec(AC) , then lambda is equal to