Let C be the set of curves having the property that the point of intersection of tangent with y-axis is equidistant from the point of tangency and origin (0,0)
If `C_(3) in C`
`C_(3):` is passing through (2,4). If `(x)/(a)+(y)/(b)=1.` is tangent to `C_(3)`, then

Let C be the set of curves having the property that the point of intersection of tangent with y-axis is equidistant from the point of tangency and origin (0,0) If C_(1),C_(2) in C C_(1) : Curve is passing through (1,0) C_(2) : Curve is passing through (-1,0) The number of common tangents for C_(1) and C_(2) is

Let C be the set of curves having the property that the point of intersection of tangent with y-axis is equidistant from the point of tangency and origin (0,0) If common tangents of C_(1) and C_(2) form an equilateral triangle, where C_(1),C_(2) in C and C_(1) : Curve passes through f(2,0), then C_(2) may passes through

The equation of the line joining the point {3, 5) to the point of intersection of the lines 4x + y - 1 = 0 and 7x - 3y - 35 = 0 is equidistant from the points (0,0) and (8,34) .

The point on the axis of y which is equidistant from (-1, 2) and (3, 4), is

Find point on Y -axis which is at the equidistance from the given points A(-4, 3) and B(5, 2) .

Find the coordinates of the point equidistant from three given points A(5,1), B(-3,-7) and C(7,-1)

The Curve possessing the property text the intercept made by the tangent at any point of the curve on the y-axis is equal to square of the abscissa of the point of tangency, is given by

If P(x, y) is a point equidistant from the points A(6, -1) and B(2, 3), show that x-y = 3.

The lines joining the origin to the point of intersection of x^2+y^2+2gx+c=0 and x^2+y^2+2fy-c=0 are at right angles if

Let f(x,y) be a curve in the x-y plane having the property that distance from the origin of any tangent to the curve is equal to distance of point of contact from the y-axis. It f(1,2)=0, then all such possible curves are