need help with this proof complex numbers very hard
The function f(z) is complex valued in the complex plane. f(z) is bounded and entire. Prove that f(z) must be a constant.
We Accept
Chapter 12 – From the chapter reading
The function f(z) is complex valued in the complex plane. f(z) is bounded and entire. Prove that f(z) must be a constant.
Chapter 12 – From the chapter reading