The ratio in which the line segment `(a_(1), b_(1))` and B`(a_(2), b_(2))` is divided by Y-axis is

Find the ratio in which the line segment joining A(1, -5) and B(-4, 5) is divided by the x-axis. Also find the coordinates of the point of division.

Find the ratio in which the line segment PQ P(4, 5) and Q(3,7), is internally divided by the Y-axis.

If the equation of the locus of a point equidistant from the points (a_(1), b_(1)) and (a_(2), b_(2)) is : (a_(1)-a_(2))x+(b_(1)-b_(2))y+c=0 , then c =

The ratio in which the y -axis divides the line segment joining (-4,2) and (8,3) is

Find the coordinates of the points which divide the line segment joining A(-2, 2) and B(2, 8) into four equal parts.

To divide a line segment AB in the ratio 5 : 6 , draw a ray AX such that BAX is an acute angle , drawn a ray BY parallel to AX with the points A_(1) , A_(2), A_(3), ,… and B_(1), B_(2), B_(3) ,… located at equal distances on ray AX and BY respectively. Then the points joined are

Find the values of a and b if P (9a-2,-b) divides the line segment A (3a +1,-3) and B (8a, 5) in the ratio 3:1.

The point (4,2) divides the line segment joining (5,-1) and (2,y) in the ratio 1:2 .Find y .