Answer:
2nd im pretty sure hope this helpss :) (:
Step-by-step explanation:
I am not sure of what the answer specifically is
For the corresponding homogeneous ODE,
the characteristic equation is
which admits the characteristic solution,
Assume a particular solution of the form
( because a constant solution is already accounted for by ; because both and are accounted for)
Substituting the derivatives of into the ODE gives
So the particular solution is
With the given initial conditions, we find
and so
Answer:
The last answer choice is the correct answer
Step-by-step explanation:
im hoping this helped, if not im sorry.