Find the condition for the orthogonality of the curves `ax^2 + by^2 = 1 ` and `a_1 x^2 + b_1 y^2 = 1`

The equation of the normal to the curve 2y=3-x^2 at (1,1) is

Find the question of the circle which passes through (1, 1) and cuts orthogonally each of the circles. x^2 + y^2 - 8x - 2y + 16 = 0and "___"(1) x^2 + y^2 - 4x - 1 = 0. "___"(2)

The length of the normal to the curve y=x^2+1 at (1, 2) is

If ax^(2) + by^(2) = 1, a_(1) x^(2) + b_(1)y^(2) = 1 , then show that the condition for orthogonality of above curves is (1)/(a)-(1)/(b)=(1)/(a_(1))-(1)/(b_(1))

The condition that the two curves x=y^2,xy=k cut orthogonally is

Find the equations of the tangent and normal to the curve x^(2/3)+y^((2)/(3))=2 at (1,1).

Find the equation of the normal to the curve y=(1+x)^(y)+sin^(-1)(sin^(2)x) at x=0.

The condition that the two curves y^2=4ax,xy=c^2 cut orthogonally is