Assignment:
The existence and uniqueness theorem for ordinary differential equations (ODE) says that the solution of a 1st order ODE with given initial value exists and is unique.
Let y=f(x) be the solution of dy/dx=y that satisfies f(0)=1. It is thus uniquely specified. Of course we know that this function is the usual exponential function y=exp(x), but suppose we didn't know that. In this problem we will show the main properties of the exponential function from the differential equation alone, together with the existence and uniqueness theorem.
(a) Let A be any constant. Write down a differential equation satisfied by g(x)=f(A)f(x), and also give the value of g(0). Do the same for the function h(x)=f(x+A). Conclude, with a clear argument, that g and h are the same functions.
(b) Let r be any constant. Write down a differential equation satisfied by g(x)=[f(x)]^r, and also the value of g(0). Do the same for the function h(x)=f(rx). Conclude, with a clear argument, that g and h are the same functions.
(c) How do we usually state the properties proved in (a) and (b) above?
Provide complete and step by step solution for the question and show calculations and use formulas.