Let alpha,beta be real and z be a comple...

Let `alpha,beta` be real and z be a complex number. If `z^2+alphaz""+beta=""0` has two distinct roots on the line Re `z""=""1` , then it is necessary that : (1) `b"" in (0,""1)` (2) `b"" in (-1,""0)` (3) `|b|""=""1` (4) `b"" in (1,oo)`

Similar Questions

Explore conceptually related problems

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

If z^2+alphaz+beta has one root 1-2i , then find the value of alpha-beta (alpha,beta , in R)

Let z_(1) and z_(2)q ,be two complex numbers with alpha and beta as their principal arguments suith that alpha+beta then principal arguments suiven by:

If alpha, beta are the roots of the equation x^(2)-ax+b=0 .then the equation whose roots are 2 alpha+(1)/(beta), 2 beta+(1)/(alpha) is

If alpha,beta in R are such that 1-2i (here i^(2)=-1 ) is a root of z^(2)+alpha z+beta=0 , then (alpha-beta) is equal to:

If abs(z+1)=alphaZ+beta(1+i) then z=1/2-2i then the value of abs(alpha+beta) is equal to, where alpha,betainR

Let `alpha,beta` be real and z be a complex number. If `z^2+alphaz""+beta=""0` has two distinct roots on the line Re `z""=""1` , then it is necessary that : (1) `b"" in (0,""1)` (2) `b"" in (-1,""0)` (3) `|b|""=""1` (4) `b"" in (1,oo)`

Similar Questions

Recommended Questions