Let f(x)={((z^3−1)/(z^2+z+1) if |z|!=1 (−1+i sqrt(3))/2 if |z|=1) is f continous in z_0=(1+sqrt(3)i)/2

Jackson Garner

Jackson Garner

Answered question

2022-09-18

Let
f ( x ) = { z 3 1 z 2 + z + 1 i f | z | 1 1 + i 3 2 i f | z | = 1
is f continous in z 0 = 1 + 3 i 2
I think to f is not continous at z 0 , i try using the sequence criterion for continuity searching a sequence { z n } such that lim n z n = z 0 but lim n f ( z n ) f ( z 0 ). but i cant find that sequence, ill be very grateful for any hint or help to solve my problem.

Answer & Explanation

belidla5a

belidla5a

Beginner2022-09-19Added 8 answers

Note that, if | z | 1,
f ( z ) = z 3 1 z 2 + z + 1 = ( z 1 ) ( z 2 + z + 1 ) z 2 + z + 1 = z 1
and that
lim z z 0 z 1 = 1 + 3 i 2 .
So, f is continuous at z 0 .
Actually, this argument only works for z 0 . In fact, f is discontinuous at every other point of the unit circle.

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