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

The circle, which passes through the origin and whose centre lies on the line y = x and cutting the circle x^2+y^2-4x-6y+10 = 0 orthogonally is :

The curves x = y^(2) and xy = a^(3) cut orthogonally at a point, then a^(2) =

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

The locus of the centre of a circle which cuts orthogonally the circle x^2+y^2 -20x+4=0 and which touches x = 2 is :

The curve x = y^(2) and xy = k cut at right angles if

The equation of the common tangent to the curves y^2=8x and xy =-1 is :

The circle passes through the point (1,2) and cuts the circle x^(2)+y^(2)=4 orthogonally, then the equation of the locus of the centre is

If a circle passes through the point (a, b) and cuts the circle x^2+y^2=p^2 orthogonally, then the equation of the locus of its centre is:

Find the equation of the circle which cuts the circle x^(2)+y^(2)+5x+7y-4=0 orthogonally, has its centre on the line x=2 and passes through the point (4,-1).

The equation of the circle, which cuts orthogonally : x^2+y^2+3x-5y+6=0 and 4x^2+4y^2 -28x+29=0 and whose centre lies on 3x+4y+1=0 is :