Consider the following condition on a function \( f : {C} \to {C} \):
\[
|f(z)| = 1 \quad {for all } z \in {C} { such that } \operatorname{Im}(z) = 0.
\]
Which one of the following is correct?
Show Hint
- There is a non-constant analytic polynomial \( f \) satisfying the condition.
- Every entire function \( f \) satisfying the condition is a constant function.
- Every entire function \( f \) satisfying the condition has no zeroes in \( {C} \).
- There is an entire function \( f \) satisfying the condition with infinitely many zeroes in \( {C} \).
The Correct Option is C
Solution and Explanation
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