[" If "|z|=1" and "omega=(z-1)/(z+1)(z!=-1)" then "],[Re(omega)=]

If |z|=1 and omega=(z-1)/(z+1) (where z in -1 ), then Re (omega) is

If |z|=1 and w=(z-1)/(z+1) (where z!=-1), then R e(w) is

If |z|=k and omega=(z-k)/(z+k) , then Re (omega) =

If |z|=k and omega=(z-k)/(z+k) , then Re (omega) =

If |z|=1 and w=(z-1)/(z+1) (where z ne -1 ), then Re (w) is :

If |z|=1 and w=(z-1)/(z+1) (where z!=-1) then Re(w) is (A) 0(B)-(1)/(|z+1|^(2))(C)|(z)/(z+1)|(1)/(|z+1|^(2))(D)(sqrt(2))/(|z+1|^(2))

If |z|=1 and w=(z-1)/(z+1) (where z!=-1), then Re(w) is 0(b)(1)/(|z+1|^(2))|(1)/(z+1)|,(1)/(|z+1|^(2))(d)(sqrt(2))/(|z|1|^(2))

If |z|=1 and w=(z-1)/(z+1) (where z!=-1), then R e(w) is 0 (b) 1/(|z+1|^2) |1/(z+1)|,1/(|z+1|^2) (d) (sqrt(2))/(|z|1""|^2)

If |z|=1 and w=(z-1)/(z+1) (where z!=-1), then R e(w) is 0 (b) 1/(|z+1|^2) |1/(z+1)|,1/(|z+1|^2) (d) (sqrt(2))/(|z|1""|^2)

If |z|=1 and w=(z-1)/(z+1) (where z!=-1), then R e(w) is 0 (b) 1/(|z+1|^2) |1/(z+1)|,1/(|z+1|^2) (d) (sqrt(2))/(|z|1""|^2)