Prove that the curves `x=y^2` and `xy=k` cut at right angles* if `8k^2 =1`

Prove that the curves 4x = y^2 and 4xy = k cut at right angles if k^2 = 512 .

Show that the curves 2x = y^2 and 2xy = k cut at right angles if k^2 = 8 .

Prove that the curves y^(2)=4axandxy=c^(2) cut at right angles if c^(4)=32a^(4)

Prove that the curves xy = 4 and x^2+y^2 =8 touch each other.

The lines x+(k-1)y+1=0 and 2x+k^2y-1=0 are at right angles if

Find the condition that the curves 2x = y^2 and 2 xy = k may intersect orthogonally.

The point at which the curves x^2 =y and y^2 = x cut orthogonally is

If the lines joining the origin to the intersection of the line y=nx+2 and the curve x^2+y^2=1 are at right angles, then the value of n^2 is

Prove that the curves y^2 = 4x and x^2 + y^2 - 6x + 1 = 0 touch each other at the point (1,2)