Find the angle between the curves `2y^2=x^3a n dy^2=32 xdot`

Find the angle between the curvesC1: x^2-(y^2)/3=a^2a n dC_2: x y^3=c

Find the acute angle between the curves y=x^(2) and x=y^(2) at their points of intersection (0,0), (1,1) .

Find the area between the curves y = x and y = x^(2) .

Find the minimum distance between the curves y^2=4xa n dx^2+y^2-12 x+31=0

Find the angle between the lines 3x^(2)-10xy-3y^(2)=0 :

Find the angle of intersection of the curves 2y^(2)=x^(3)andy^(2)=32x .

Column I : Curves Column II : Angle between the curves y^2=4xa n dx^2=4y p. 90^0 2y^2=x^3a n dy^2=32 x q. Any one of tan^(-1)(3/4)ortan^(-1)(16^(1/3)) x y=a^2a n dx^2+y^2=2a^2 r. 0^0 y^2=xa n dx^3+y^3=3x y at other than origin s. tan^(-1)(1/2)

Find the angle of intersection of the curves x y=a^2a n dx^2+y^2=2a^2