[" Let "z in C" be such that "|z|<],[" 1."],[" If "omega=(5+3z)/(5(1-z))z" ,then: "],[bigotimes4Im(omega)>5],[" ( "B" 5Im "(omega)<1],[" o. "5Re(omega)>4]

Let z in C be such that |z| lt 1 .If omega =(5+3z)/(5(1-z) then

Let z in C be such that |z| lt 1 .If omega =(5+3z)/(5(1-z) then

Let z and omega be two complex numbers such that |z|<=1,| omega|<=1 and |z+omega|=|z-1vec omega|=2 Use the result |z|^(2)=zz and |z+omega|<=|z|+| omega|

Let z,omega be complex number such that z+ibar(omega)=0 and z omega=pi. Then find arg z

Let z and omega be two non zero complex numbers such that |z|=|omega| and argz+argomega=pi , then z equals (A) omega (B) -omega (C) baromega (D) -baromega

Let z and omega be two non zero complex numbers such that |z|=|omega| and argz+argomega=pi, then z equals (A) omega (B) -omega (C) baromega (D) -baromega

Let z and omega be two non zero complex numbers such that |z|=|omega| and argz+argomega=pi, then z equals (A) omega (B) -omega (C) baromega (D) -baromega

Let z be a complex number such that Im(z) ne 0. "If a" = z^(2) + 5z + 7 , then a cannot take value ____________

Let z and w are two non zero complex number such that |z|=|w|, and Arg(z)+Arg(w)=pi then (a) z=w (b) z=overlinew (c) overlinez=overlinew (d) overlinez=-overlinew