If the equation `z^(3)+(3+i)z^(2)-3z-(m+i)=0, " where " i=sqrt(-1) " and " m in R`, has atleast one real root, value of m is

If the equation (1+m)x^(2)-2(1+3m)x+(1-8m)=0 where m epsilonR~{-1} , has atleast one root is negative, then

Let z be a complex number satisfying the equation z^(2)-(3+i)z+lambda+2i=0, whre lambdain R and suppose the equation has a real root , then find the non -real root.

If (3+i)(z+bar(z))-(2+i)(z-bar(z))+14i=0 , where i=sqrt(-1) , then z bar(z) is equal to

1. If |z-2+i|≤ 2 then find the greatest and least value of | z|

If one root of the quadratic equation ix^2-2(i+1)x +(2-i)=0,i =sqrt(-1) is 3-i , the other root is

If one root of the quadratic equation ix^2-2(i+1)x +(2-i)=0,i =sqrt(-1) is 2-i , the other root is

The equation 3x^(2)+4ax+b=0 has atleast one root in (0, 1) if :

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

If |z-2i|lesqrt(2), where i=sqrt(-1), then the maximum value of |3-i(z-1)|, is

If z=(sqrt(3)+i)/(sqrt(3)-i) , then the fundamental amplitude of z is :