The condition that the parabolas `y^2=4c(x-d)` and `y^2=4ax` have a common normal other than X-axis `(agt0,cgt0)` is

The common tangent to the parabola y^2=4ax and x^2=4ay is

If the parabolas y^2=4a x and y^2=4c(x-b) have a common normal other than the x-axis (a , b , c being distinct positive real numbers), then prove that b/(a-c)> 2.

If the parabolas y^2=4a x and y^2=4c(x-b) have a common normal other than the x-axis (a , b , c being distinct positive real numbers), then prove that b/(a-c)> 2.

If a,b,c are distincl positive real numbers such that the parabola y^(2) = 4ax and y^(2) = 4c ( x - b) will have a common normal, then prove that (b)/(a-c) gt 2

If the parabols y^(2) = 4kx (k gt 0) and y^(2) = 4 (x-1) do not have a common normal other than the axis of parabola, then k in

The set of points on the axis of the parabola y^2-4x-2y+5=0 find the slope of normal to the curve at (0,0)

Parabolas (y-alpha)^(2)=4a(x-beta)and(y-alpha)^(2)=4a'(x-beta') will have a common normal (other than the normal passing through vertex of parabola) if

The point of contact of 2x-y+2 =0 to the parabola y^(2)=4ax is

The equation of the common tangent to the parabolas y^2= 4ax and x^2= 4by is given by

Find the area common to two parabolas x^2=4ay and y^2=4ax, using integration.