`xy=c^(2), …. x=c, x= 2c`

The area bounded by the curve xy = c^(2) , X-axis and the lines x = c, x = 2c is

Inclination of the normal to the curve xy=c^(2) , at the point x=c , is

If there are two points A and B on rectangular hyperbola xy=c^(2) such that abscissa of A= ordinate of B, then locusof point of intersection of tangents at A and B is (a) y^(2)-x^(2)=2c^(2)( b) y^(2)-x^(2)=(c^(2))/(2) (c) y=x( d) non of these

If A = 7x^(2) + 5xy - 9y^(2), B = - 4x^(2) + xy + 5y^(2) and C = 4y^(2) - 3x^(2) - 6xy then show that A + B + C = 0

Equation of the tangent and normal to the curve xy=c^(2) at the point x=c on it are respectively

Find the coordinates of points on the hyperbola xy=c^(2). at which the normal is perpendicular to the line x+t^(2)y=2c

The locus of the foot of the perpendicular from the centre of the hyperbola xy=c^(2) on a variable tangent is (A) (x^(2)-y^(2))=4c^(2)xy(B)(x^(2)+y^(2))^(2)=2c^(2)xy(C)(x^(2)+y^(2))=4c^(2)xy(D)(x^(2)+y^(2))^(2)=4c^(2)xy