If the point (x,y) be equidistant from the points ( a+b, b-a) and (a-b, a+b) then prove that bx=ay.

If the point P(x,y) be equidistant from the points A(a+b,a-b) and B(a-b,a+b), then

If the point (x,y) be equidistant from the points (a+b,b-a) and (a-b,a+b) , prove that bx =ay .

If the point (x,y) be equidistant from the points (10,0) (0,-10) and (-8,6) then prove that x =0 and y =0.

If the point (x,y) is equidistant from the points (2,-1) and (-3,4) , then show that , y=x+2 .

If the points (x,y) is equidistant from (2,-1) and (-3,4) then prove that y = x + 2.

If B(1,3) be equidistant from the point A(6,-1) and C(lambda,8) , then the value of lambda is /are -

Find the equation to the locus of the moving point which is equidistant from the point (2a, 2b) and ( 2c,2d). Interpret geometrically the equationto the locus .

If the point (a,b), (a',b') and (a-a',b-b') are collinear, then prove that ab' = a'b.

If the points (a,b), (a',b') and (a-a',b-b') are collinear, then prove that ab' = a'b.

Find the condition that the point (a,b) is equidistant from the points (8,4) and (-2,-4) .