" The curves "y=x^(2)-1,y=8x-x^(2)-9

Find the angle between the curves y^(2)=8x,x^(2)=4y-12

The angle of intersection between the curves y^(2)=8x and x^(2)=4y-12 at (2,4) is

Prove that the curves y=x^(3)-3x^(2)-8x-4,y=3x^(2)+7x+4 touch each other and equation of the common tangent is x-y+1=0 .

The area bounded by the curve y^(2) = 8x and x^(2) = 8y is :

Let L_1 be the length of the common chord of the curves x^(2) +y^(2) = 9 and y^(2) =8x and L_ 2 be the length of the latus rectum of y^(2) =8x, then

Let L_(1) be the length of the common chord of the curves x^(2)+y^(2)=9 and y^(2)=8x and L_(2) be the length of the latus rectum of y^(2)=8x , then

The area enclosed by the curves y=8x-x^(2) and 8x-4y+11=0 is