A variable line through the point `((6)/(5),(6)/(5))` cuts the coordinate axes at the points A and B respectively. If the point P divides AB internally in the ratio `2:1`, then the equation of the locus of P is

A variable line through the point (6/5, 6/5) cuts the coordinates axes in the point A and B . If the point P divides AB internally in the ratio 2:1 , show that the equation to the locus of P is : 5xy = 2( 2x+y) .

A variable line through the point (6/5, 6/5) cuts the coordinates axes in the point A and B . If the point P divides AB internally in the ratio 2:1 , show that the equation to the locus of P is :

A variable line through the point (1/5,1/5) cuts the coordinate axes in the points A and B. If the point P divides AB internally in the ratio 3: 1, then the locus of P is :

A variable line through the point ((1)/5,1/5)cuts the coordinate axes in the points A and B. If the point P divides AB internally in the ratio 3:1, then the locus of P is (A) 3x+y = 20xy (B) y + 3x = 20 xy (C) x + y = 20 xy (D) 3x+3y = 20xy

The line segment AB meets the coordinate axes in points A and B. If point P (3, 6) divides AB in the ratio 2:3, then find the points A and B.

Find the equation of straight line which passes through the point P(2,6) and cuts the coordinate axis at the point A and B respectively so that AP:BP=2:3

Find the equation of straight line which passes through the point P(2,6) and cuts the coordinate axis at the point A and B respectively so that AP:BP=2:3.

Write the coordinates of the point dividing line segment toining points (2,3) and (3,4) internally in the ratio 1:5 .

Calculate the co-ordinates of the point P that divides the line joining point A(-1,3) and B(5,-6) internally in the ratio 1:2

Point P lies on segment AB such that (AP)/(AB) = (2)/(5). Then, point P divides AB internally in the ratio…….