The equation of the common tangent to the curve `y^(2) = 8x " and " xy = - 1` is

Find the equation of the common tangent to the curves y^(2)=8x and xy=-1

Statement 1: The equatio of the common tangent to the curves y^2 = 8x and xy= -1 is y=x+2 . Statement 2: Curves y^2 = 8x and xy=-1 intersect at (1/2, -2) .

The equation of the common tangent between the curve y^(2)=4x and xy=-2 is

The equation of a common tangent to the curves y^(2)=8x & xy= -1 is

The equation of common tangent to the curves y^(2)=16x and xy=-4 is

The equation of the common tangent to the curves y^(2)=4x and x^(2)+32y=0 is x+by+c=0 . the value of |sin^(-1)(sin1)+sin^(-1)(sinb)+sin^(-1)(sinc)| is equal to

The equation of common tangent to the curve y^2=4x and xy=-1 is

The equation of a common tangent tangent to the curves, y^(2)=16x and xy= -4, is

The common tangent of the curves y=x^(2) +(1)/(x) " and " y^(2) =4 x is