Statement -1: for any complex number z, `|Re(z)|+|Im(z)| le |z|`
Statement-2: `|sintheta| le 1`, for all `theta`

Statement-1: for any non-zero complex number z, |z/|z|-1| le "arg"(z) Stetement-2 :sintheta le theta for theta ge 0

For any complex number z prove that |Re(z)|+|Im(z)|<=sqrt(2)|z|

z is a complex number such that |Re(z)| + |Im (z)| = 4 then |z| can't be

If z is a complex number such that Re(z)=Im(2), then

Statement-1: for any non-zero complex number |z-1| le ||z|-1|+|z| arg (z) Statement-2 : For any non-zero complex number z |z/(|z|)-1| le "arg"(z)

Statement -1 : For any four complex numbers z_(1),z_(2),z_(3) and z_(4) , it is given that the four points are concyclic, then |z_(1)| = |z_(2)| = |z_(3)|=|z_(4)| Statement -2 : Modulus of a complex number represents the distance form origin.

Statement-1: for any two complex numbers z_(1) and z_(2) |z_(1)+z_(2)|^(2) le (1+1/lamba)|z_(2)|^(2) , where lambda is a positive real number. Statement:2 AM ge GM .

For any complex number z, prove that: (i) -|z| le R_(e)(z)le|z| (ii) -|z|leI_(m)(z)le|z| .