Linear differential equation/Solution/Differentiability/0/All derivatives 0/Exercise

Let

{}y'=g(t)y\,

be a homogeneous linear ordinary differential equation with a function ${}g$ differentiable infinitely many times and let ${}y$ be a differentiable solution.

a) Prove that ${}y$ is also infinitely differentiable.

b) Let ${}y(t_{0})=0$ for a time-point ${}t_{0}$ . Prove, using the formula

{}(f\cdot g)^{(n)}=\sum _{k=0}^{n}{\binom {n}{k}}f^{(k)}\cdot g^{(n-k)}\,,

that ${}y^{(n)}(t_{0})=0$ for all

{}n\in \mathbb {N}

.

Create a solution

Linear differential equation/Solution/Differentiability/0/All derivatives 0/Exercise

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