[*Ex.33C" is the complex numbers "f:C rarr R" is defined by "],[f(z)=|z^(3)-z+2|" Find the maximum value of "f(z)" ,"j],[|z|=1.]

C is the complex numbers f:CrarrR is defined by f(z)=|z^(3)-z+2|. Find the maximum value of f(z),If|z|=1.

C is the complex numbers f:CrarrR is defined by f(z)=|z^(3)-z+2|. Find the maximum value of f(z),If|z|=1.

C is the complex numvers f:CrarrR is defined by f(z)=|z^(3)-z+2|. Find the maximum value of f(z),If|z|=1.

C is the complex numvers f:CrarrR is defined by f(z)=|z^(3)-z+2|. Find the maximum value of f(z),If|z|=1.

C is the complex numbers f: CvecR is defined by f(z)=|z^3-z+2|dot The maximum value of f on the circle |z|=1 is lambda then value of lambda^2-5 is equal to

If the complex number z is such that |z-1|le1 and |z-2|=1 find the maximum possible value |z|^(2)

If z a complex number satisfying |z^(3)+z^(-3)|le2 , then the maximum possible value of |z+z^(-1)| is -

Find whether f:Z rarr Z given by f(x)=x^(2)+1 for all x in Z