The two curves `x^3-3xy^2+2=0` and `3x^2y-y^3=2`, are:

The two curves x^(3)-3xy^(2)+2=0 and 3x^(2)y-y^(3)-2=0

The two curves x^(3)-3xy^(2)+5=0 and 3x^(2)y-y^(3)-7=0

The curves x^(3) -3xy^(2) = a and 3x^(2)y -y^(3)=b, where a and b are constants, cut each other at an angle of

Find common tangent of the two curve y^(2)=4x and x^(2)+y^(2)-6x=0 (a) y=(x)/(3)+3 (b) y=((x)/(sqrt(3))-sqrt(3)) (c) y=(x)/(3)-3 (d) y=((x)/(sqrt(3))+sqrt(3))

The two curves x=y^(2) and xy=a^(3)cut orthogonally,then a^(2) is equal to (1)/(3)(b)3(c)2 (d) (1)/(2)

x^(3)-3xy^(2)=183x^(2)y-y^(3)=26 If x,y in N