Let `alpha and beta` be real numbers and z be a complex number. If `z^(2)+alphaz+beta=0` has two distinct non-real roots with Re(z)=1, then it is necessary that

Let alpha and beta be two fixed non-zero complex numbers and 'z' a variable complex number. If the lines alphabarz+baraz+1=0 and betabarz+barbetaz-1=0 are mutually perpendicular, then

Let alpha and beta be nonzero real numbers such that 2(cosbeta-cosalpha)+cosalphacosbeta=1 . Then which of the following is/are true?

Solve the equation z^2 +|z|=0 , where z is a complex number.

Let alpha and beta be two distinct complex numbers, such that abs(alpha)=abs(beta) . If real part of alpha is positive and imaginary part of beta is negative, then the complex number (alpha+beta)//(alpha-beta) may be

The number of complex numbers z such that |z-1|=|z+1|=|z-i| is

Let S be the set of all non-zero numbers alpha such that the quadratic equation alphax^2-x+alpha=0 has two distinct real roots x_1, and x_2 satisfying the inequality |x_1-x_2|lt1 which of the following intervals is(are) a subset of S?

For complex number z =3 -2i,z + bar z = 2i Im(z) .

If alpha and beta are two distinet roots of the equation x^(2)-x+1=0 then alpha^(101)+beta^(107)= ....

If alpha and beta are different complex numbers with |beta|=1 , then find |(beta -alpha)/(1-baralphabeta)|

If alpha and beta are different complex numbers with |beta|=1, then find |(beta-alpha)/(1- baralphabeta)| .