Answer:
x'-5x=0, or x''-25x=0, or x'''-125x=0
Step-by-step explanation:
The function [tex]x(t)=e^{5t}[/tex] is infinitely differentiable, so it satisfies a infinite number of differential equations. The required answer depends on your previous part, so I will describe a general procedure to obtain the equations.
Using rules of differentiation, we obtain that [tex]x'(t)=5e^{5t}=5x \text{ then }x'-5x=0[/tex]. Differentiate again to obtain, [tex]x''(t)=25e^{5t}=25x=5x' \text{ then }x''-25x=0=x''-5x'[/tex]. Repeating this process, [tex]x'''(t)=125e^{5t}=125x=25x' \text{ then }x'''-125x=0=x'''-25x'[/tex].
This can repeated infinitely, so it is possible to obtain a differential equation of order n. The key is to differentiate the required number of times and write the equation in terms of x.
