Final answer:
The principal branch of a* is defined as a* = e^(z Log(a)). To find the derivative of a, we use the chain rule and find the derivative of Log(a) first. The derivative is valid for all complex numbers a and z.
Step-by-step explanation:
The principal branch of a* is defined as a* = e^(z Log(a)). To compute the derivative of a, we can use the chain rule. Let's start by finding the derivative of Log(a).
d/dz(Log(a)) = 1/a
Next, we can find the derivative of e^(z Log(a)). Using the chain rule, the derivative is:
d/dz(e^(z Log(a))) = e^(z Log(a)) * Log(a)
This derivative is valid for all complex numbers a and z.