The roots of the cubic equation `(z+ab)^3=a^3,a !=0` represents the vertices of an equilateral triangle of sides of length

The roots of the cubic equation (z+ ab)^(3) = a^(3) , such that a ne 0 , respresent the vertices of a trinagle of sides of length

The roots of the cubic equation (z + alpha beta)^(3) = alpha^(3) , alpha ne 0 represent the vertices of a triangle of sides of length

The roots of the equation 1+z+z^(3)+z^(4)=0 are represented by the vertices of

The roots of the equation t^3+3a t^2+3b t+c=0a r ez_1, z_2, z_3 which represent the vertices of an equilateral triangle. Then a^2=3b b. b^2=a c. a^2=b d. b^2=3a

The roots of the equation t^3+3a t^2+3b t+c=0a r ez_1, z_2, z_3 which represent the vertices of an equilateral triangle. Then a^2=3b b. b^2=a c. a^2=b d. b^2=3a

The roots of the equation t^3+3a t^2+3b t+c=0a r ez_1, z_2, z_3 which represent the vertices of an equilateral triangle. Then a^2=3b b. b^2=a c. a^2=b d. b^2=3a

The roots of the cubic equation (z+alpha beta)^^3=alpha^(^^)3,alpha is not equal to 0, represent the vertices of a triangle of sides of length

The roots of the cubic equation (z + alpha beta )^3 = alpha ^3 , alpha is not equal to 0, represent the vertices of a triangle of sides of length