Find the maximum and minimum values of `|z|` satisfying `|z+(1)/(z)|=2`

If |z+(4)/(z)|=2, find the maximum and minimum values of |z|.

True or false If the feasible region is unbounded, the maximum value of the minimum value of the objective function Z=ax+by may or may not exist.

The minimum value of |2Z -1 | + | 3Z-2| is:

Find the gratest and the least values of |z_(1)+z_(2)|, if z_(1)=24+7iand |z_(2)|=6," where "i=sqrt(-1)

The feasible region for an LPP is shown shaded in the figure 12.47. Determine the maximum and minimum values of Z=x+2y.

For any complex number z, the minimum value of |z|+|z-1| is :

If abs(z+4) le 3 , the maximum value of abs(z+1) is

In the equation 6 = z + 2, the value of z is :

If |z-4/z|=2 then the greatest value of |z| is: