For complex value of z, solve `|z|+z=(2+i)`

For any complex number z prove that |R e(z)|+|I m(z)|<=sqrt(2)|z|

For any complex number z prove that |R e(z)|+|I m(z)|<=sqrt(2)|z|

For complex number z,|z-1|+|z+1|=2, then z lies on

The complex number z satisfies z+|z|=2+8i . find the value of |z|-8

For a complex number Z, if arg Z=(pi)/(4) and |Z+(1)/(Z)|=4 , then the value of ||Z|-(1)/(|Z|)| is equal to

For a complex number z, if z^(2)+barz-z=4i and z does not lie in the first quadrant, then ("where "i^(2)=-1)

Statement-1, If z_(1),z_(2),z_(3),……………….,z_(n) are uni-modular complex numbers, then |z_(1)+z+(2)+…………+z_(n)|=|1/z_(1)+1/z_(2)+…………..+1/z_(n)| Statement-2: For any complex number z, zbarz=|z|^(2)

If a complex number z satisfies |z|^(2)+(4)/(|z|)^(2)-2((z)/(barz)+(barz)/(z))-16=0 , then the maximum value of |z| is

Let complex number z satisfy |z - 2/z| =1 " then " |z| can take all values except

For a complex number Z, if |Z-i|le2 and Z_(1)=5+3i , then the maximum value of |iZ+Z_(1)| is (where, i^(2)=-1 )