If `z=1+I,` then what is the inverse of `z^(2)`?

If z=(1+2i)/(2-i)-(2-i)/(1+2i), then what is the value of z^(2)+zbarz (i=sqrt(-1))

If (x + y) z = 1 , then z is a multiplicative inverse of ________.

If Z=1+i , where i=sqrt(-1) , then what is the modulus of Z+(2)/(Z) ?

If z= 4+ 7i be a complex number, then find (i) Additive inverser of z. (ii) Multiplicative inverse of z.

Let z be a non-zero complex number Then what is z^(-1) (multiplicative inverse of z) equal to ?

Find the multiplicative inverse of z=3-2i

Consider the following statements : 1. If x is directly proportional to z and y is directly proportional to z, then (x^(2) - y^(2)) is directly proportional to z^2 . 2. If x is inversely proportional to z and y is inversely proportional to z, then (xy) is inversely proportional to z^2 . Which of the above statements is/are correct?

If z=(1-i)^(6)+(1-i) , then find the modulus of z (i.e., |z|) and multiplicative inverse of z (i.e., z^(-1) ).

If z_(1)=2-i, z_(2)=1+ 2i, then find the value of the following : (i) Re((z_(1)*z_(2))/(bar(z)_(2))) (ii) Im (z_(1)*bar(z)_(2))