A point `C = (5a + 4b - 5c)/(3)` divides the line joining A = a - 2b + 3c and B in the ratio 2 : 1, then the poistion vector of B is

A point C=(3vec a+4vec b-5vec c)/(3) divides the line joining the points A=vec a-2vec b+3vec c and B in the ratio 2:1, then the position vector of B is

A point C=(5vec a+4vec b-5vec c)/(3) divides the line joining the points A and B=2vec a+3vec b-4vec c in the ratio 2:1 then the position vector of A is

A point C=(5bar(a)+4bar(b)-5bar(c))/(3) divides the line joining A=bar(a)-2bar(b)+3bar(c) and B in the ratio 2:1 then bar(AB) is

A point (-4,1) divides the line joining A(2,-2) and B(x,y) in the ratio 3:5. Then point B is

If point C(-4,1) divides the line segment joining the point A(2,-2) and B in the ratio 3:5 , then the coordinates of B are

If the point C(1,1) divides the line segment joining A(-2,7) and B in the ratio 3:2 , find the coordinates of B .

If the point P (-1,2) divides the line segment joining A (2,5) and B in the ratio 3 : 4 , find the co-ordinate of B .

If the point P (-1,2) divides the line segment joining A (2,5) and B in the ratio 3 : 4 , find the co-ordinate of B .

If the point C (-1, 2) divides internally the line segment joining A (2, 5) and B in the ration 3:4 . Find the coordinates of B .