If curve `y = 1 - ax^2 and y = x^2` intersect orthogonally then the value of a is

If 4x^(2)+ py^(2) =45 and x^(2)-4y^(2) =5 cut orthogonally, then the value of p is

If the curves ax^2 + by^2 =1 and a'x^2 +b'y^2 =1 intersect orthogonally, prove that: 1/a-1/a'=1/b-1/b'

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

If the graphs of the functions y= log _(e)x and y = ax intersect at exactly two points,then find the value of a .

Find the condition for the curves (X^2)/(a^2) - (y^2)/(b^2) = 1 and xy = c^2 to intersect orthogonally.

If the curves: alphax^2 + betay^2 =1 and alpha'x^2 + beta'y^2=1 intersect orthogonally, prove that (alpha-alpha') betabeta' = (beta-beta') alphaalpha'

Two parabolas C and D intersect at two different points, where C is y =x^2-3 and D is y=kx^2 . The intersection at which the x value is positive is designated Point A, and x=a at this intersection the tangent line l at A to the curve D intersects curve C at point B , other than A. IF x-value of point B is 1, then a equal to

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

Show that the curves x^2 + y^2 - 2x = 0 and x^2 + y^2 - 2 y = 0 cut orthogonally at the point (0,0).