(a) What property must an operator satisfy to be linear?
for all constants and all functions
.
(b) Why is linearity important for the solution of linear differential equations?
Because it allows you to express the general solution of the ODE as a sum of the other solutions.
(c) How many linearly independent solutions does an th order linear homogeneous equation have?
(d) When you integrate and
in variation of parameters, why can you always set the
integration constant to zero?
Because and
are coefficients of the homogeneous solutions
and
in the ansatz
any constant
included in the value of or
or could just be absorbed into the constants in front of
and
in the general solution. E.g.
(e) What is Euler's formula?
(f) How would you prove Euler's formula? Don't do the proof, just describe the proof in a sentence or two.
Substitute in place of
in the power series expansion of
, then simplify and regroup so that the
even terms become the power series for
and the odd terms become
times the power series for
.