`a` and `b` are real numbers between 0 and 1 such that the points `Z_1 =a+ i`, `Z_2=1+ bi`, `Z_3= 0` form an equilateral triangle, then `a` and `b` are equal to

Let z_(1) and z_(2) be two roots of the equation z^(2)+az+b=0 , z being complex number, assume that the origin z_(1) and z_(2) form an equilateral triangle , then

If z_(1), z_(2), z_(3) be vertices of an equilateral triangle occurring in the anticlockwise sense then,

The three vertices of a triangle are represented by the complex numbers 0 , z_(1) and z_(2) . If the triangle is equilateral , then :

The acute angle between the planes x+3y-z+2=0 and 2 x-3y+z-1=0 is

Let z be a comples number such that the imaginary part of z is non-zero and a=z^(2)+z+1 is real. Then a cannot take the value :

Let z_1 \and\ z_2 be the roots of the equation z^2+p z+q=0, where the coefficients p \and \q may be complex numbers. Let A \and\ B represent z_1 \and\ z_2 in the complex plane, respectively. If /_A O B=theta!=0 \and \O A=O B ,\where\ O is the origin, prove that p^2=4q"cos"^2(theta//2)dot

The points z_(1),z_(2),z_(3),z_(4) in complex plane are the vertices of a parallelogram, taken in order if :

Let a, b, and c be three real numbers satifying [(a, b, c)] [(1,9,7),(8,2,7),(7,3,7)]=[(0,0,0)] If the point P(a, b, c) with reference to (E) lies on the plane 2x+y+z=1 , then the value of 7a+b+c is

Represent the complex number Z = (1)/(1 + i) in the polar form.

If z=-1 , the principal value of arg. (z^(2//3)) is equal to :