The cune roots of unity when represented on Argand diagram form the vertces of an equilateral triangle.

The cube roots of unity when represented on Argand diagram form the vertices of an equilateral triangle.

If lambda in R such that the origin and the non-real roots of the equation 2z^(2)+2z+lambda=0 form the vertices of an equilateral triangle in the argand plane, then (1)/(lambda) is equal to

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

If the origin and the non - real roots of the equation 3z^(2)+3z+lambda=0, AA lambda in R are the vertices of an equilateral triangle in the argand plane, then sqrt3 times the length of the triangle is

Let z_1 and z_2 be the roots of z^2+pz+q =0. Then the points represented by z_1,z_2 the origin form an equilateral triangle if p^2 =3q.

If (a costheta_1,asintheta_1),(acostheta_2,a sintheta_2) , and (acostheta_3a sintheta_3) represent the vertces of an equilateral triangle inscribed in a circle. Then.

For n>=3, the n roots of unity form

Let lambda in R. If the origin and the non-real roots of 2z^(2)+2z+lambda=0 form the three vertices of an equilateral triangle in the Argand lane, then lambda is 1 b.(2)/(3) c.2 d.-1

Let z_1 and z_2 be the roots of the equation 3z^2 + 3z + b=0 . If the origin, together with the points represented by z_1 and z_2 form an equilateral triangle then find the value of b.