If the distance from `P` to the points `(5,-4),(7,6)` are in the ratio `2:3,` then the locus of `P` is

If the distances from P to the points (5,-4),(7,6) are in the ratio 2:3, then find the locus

If the distances from P to the points (5,–4), (7, 6) are in the ratio 2 : 3, then find the locus of P

The distances of a point 'P' from the points A(5,-4),B(7,6) are in the ratio 2:3 and the locus of P is x^(2)+y^(2)-(34)/(5)x+(120)/(5)y+k=0 then "k" is

If the distance from P to the points(2.3).(2.-3)are in the ratio 2:3 then find the equation of locus of P.

Find the distance between the points P(-4, 7) and Q(2, -5).

Find the distances of the point P(-4,3,5) from the coordinate axes.

A point P(x,y) moves so that the sum of the distance from P to the coordinate axes is equal to the distance from P to the point A(1,1). The equation of the locus of P in the first quadrant is-

Find the distance of the point P(3, 4, 6) from y-axis.

Find the distance between the points P(-6,7) and Q(-1,-5)