Show that the curves `4x = y^(2) and 4xy = k` cuts at right angles, if `k^(2) = 512`.

Prove that the curves x = y^(2) and xy = k cut at right angles, if 8k^(2) = 1 .

Prove that the curves y^(2) = 4ax and xy = c^(2) cut at the right angles, if c^(4) = 32 a^(4) .

Show that the curves y = 2^(x) and y = 5^(x) intersect at an angle tan^(-1) |("1n ((5)/(2)))/(1 + 1n 2 1n 5)| . Note Angle between two curves is the angle between their tangents at the point of intersection.

Show that the curves ax^2 + by^2 = 1 and a' x^2 + b' y^2 = 1. Intersect at right angles if 1/a - 1/b = 1/a' - 1/b' cdot

Find the value of p for which the curves x^(2) = 9 p(9 - y) and x^(2) = p(y + 1) cuts each other at right angles.

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

Prove that the curves y^(2)=4x and x^(2)=4y divide the area of the square bounded by x=0, x=4, y=4 and y=0 into three equal parts.