The points `D, E, F` divide `BC, CA and AB` of the triangle ABC in the ratio `1:4,3:2 and 3:7` respectively and the point divides AB in the ratio `1:3`, then `(bar(AD) +bar(BE) + bar(CF)): bar(CK)` is equal to

The points D,E,F divide BC,CA and AB of the triangle ABC in the ratio 1:4,3:2 and 3:7 respectively and the point divides AB in the ratio 1:3, then (AD+bar(BE)+bar(CF)):CK is equal to

In triangleABC, if the points P, Q, R divides the sides BC, CA, AB in the ratio 1:4, 3:2, 3:7 respectively and the point S divides side AB in the ratio 1:3, then (overline(AP)+overline(BQ)+overline(CR)):(overline(CS)) =

If D is the mid -point of side AB of DeltaABC , then bar(AB) + bar(BC) + bar(AC) =

If ABCD is a square, then bar(AB) + 2 bar(BC) + 3 bar(CD) + 4 bar(DA) =

In DeltaABC,L,M,N are points on BC,CA,AB respectively, dividing them in the ratio 1:2,2:3,3:5, if the point K divides AB in the ratio 5:3 , then (|bar(AL)+bar(BM)+bar(CN)|)/(|bar(CK)|)=

Points L, M, N divide the sides BC, CA, AB of ABC in the ratio 1:4, 3:2, 3:7 respectively. Prove thatAL + BM + CŃ is a vector parallel to CK where K divides AB in the ratio 1: 3.

If A(a,2) and B(b,3) then x-axis divides bar(AB) in the ratio

D,E divide sides BC and CA of a triangle ABC in the ratio 2:3 respectively.Find the position vector of the point of intersection of AD and BE and the ratio in which this point divides AD and BE.