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

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

Assertion (A): For any non zero complex numbers z,|z-|z||le|z|argz| Reason (R): |sintheta|letheta for all theta (A) Both A and R are true and R is the correct explanation of A (B) Both A and R are true R is not te correct explanation of A (C) A is true but R is false. (D) A is false but R is true.

Let z be any non-zero complex number. Then pr. arg(z) + pr.arg (barz) is equal to

Statement-1, if z_(1) and z_(2) are two complex numbers such that |z_(1)| le 1, |z_(2)| le 1 , then |z_(1)-z_(2)|^(2) le (|z_(1)|-|z_(2)|)^(2)-"arg"(z_(2))}^(2) Statement-2 sintheta gt theta for all theta gt 0 .

Let z be a complex number such that |5z+(1)/(z)|=3 and arg(z)=theta ,then maximum value of cos(2 theta) is -

If z_1,z_2 are nonzero complex numbers then |(z_1)/(|z_1|)+(z_2)/(|z_2|)|le2 .

Statement-1 If|z_1| and |z_2| are two complex numbers such that |z_1|=|z_2|+|z_1-z_2|, then Im(z_1/z_2)=0 and Statement-2: arg(z)=0 =>z is purely real