Each of these ODEs is linear and homogeneous with constant coefficients, so we only need to find the roots to their respective characteristic equations.
(a) The characteristic equation for
is
which arises from the ansatz 
.
The characteristic roots are 
and 
. Then the general solution is
where 
are arbitrary constants.
(b) The characteristic equation here is
with a root at 
of multiplicity 2. Then the general solution is
(c) The characteristic equation is
with roots at 
, where 
. Then the general solution is
Recall Euler's identity,
Then we can rewrite the solution as
or even more simply as
Used as a way for learners<span> to assess how to apply their patterns, i.e., tether, intensify, or forge their use. Dynamic </span>Learner<span>: refers to the LCI scale scores of an individual who uses one or two patterns at the Use First level and any other combination of Avoid or Use as Needed for the remaining patterns.</span>
Answer:
d? I don't know to lazy to make Algodoo
A student should highlight important terms at R3 or more specifically reading
Answer:
just take a photo of your question and post it so it's easy for us to answer
I know how to do this question so
