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@@ -20,6 +20,6 @@ The solution space $\mathcal{S}$ is spanned by $k$ functions, which thus form a
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\begin{enumerate}[label=\bi{(\arabic*)}, noitemsep]
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\begin{enumerate}[label=\bi{(\arabic*)}, noitemsep]
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\item Find the solution to the homogeneous equation ($b(x) = 0$) using one of the methods below
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\item Find the solution to the homogeneous equation ($b(x) = 0$) using one of the methods below
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\item If inhomogeneous, use a method below for an Ansatz for $f_p$, derive it and input that into the diffeq and solve.
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\item If inhomogeneous, use a method below for an Ansatz for $f_p$, derive it and input that into the full diffeq and solve.
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\item If there are initial conditions, find equations $\in \cS$ which fulfill conditions using SLE (as always)
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\item If there are initial conditions, find equations $\in \cS$ which fulfill conditions using SLE (as always)
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\end{enumerate}
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\end{enumerate}
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@@ -4,9 +4,9 @@
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\shortproposition Solution of $y' + ay = 0$ is of form $f(x) = C e^{-A(x)}$ with $A$ anti-derivative of $a$
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\shortproposition Solution of $y' + ay = 0$ is of form $f(x) = C e^{-A(x)}$ with $A$ anti-derivative of $a$
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\rmvspace
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\rmvspace
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\shade{gray}{Imhomogeneous equation}
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\shade{gray}{Imhomogeneous equation} $y' + ay = b$ with $b$ any function.
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\rmvspace
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\rmvspace
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\begin{enumerate}[noitemsep]
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\begin{enumerate}[noitemsep]
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\item Find solution to $y_p = z(x) e^{-A(x)}$ with $z(x) = \int b(x) e^{A(x)} \dx x$ ($A(x)$ in exp here!),
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\item Compute $y_p = z(x) e^{-A(x)}$ with $z(x) = \int b(x) e^{A(x)} \dx x$ ($A(x)$ in exp here!),
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\item Solve and the result is $y(x) = y_h + c \cdot y_p$. For initial value problem, determine coefficient $C$
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\item Solve and the result is $y(x) = y_h + c \cdot y_p$. For initial value problem, determine coefficient $C$
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\end{enumerate}
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\end{enumerate}
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@@ -16,16 +16,18 @@ The homogeneous equation will then be all the elements of the set summed up.\\
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\shade{gray}{Inhomogeneous Equation}\rmvspace
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\shade{gray}{Inhomogeneous Equation}\rmvspace
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\begin{enumerate}[noitemsep]
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\begin{enumerate}[noitemsep]
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\item \bi{(Case 1)} $b(x) = c x^d e^{\alpha x}$, with special cases $x^d$ and $e^{\alpha x}$:
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\item \bi{(Case 1)} $b(x) = c x^d e^{\alpha x}$, with special cases $x^d$ and $e^{\alpha x}$:
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$f_p = Q(x) e^{\alpha x}$ with $Q$ a polynomial with $\deg(Q) \leq j + d$,
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$f_p = Q(x) e^{\alpha x}$ with $Q$ a polynomial with $\deg(Q) \leq j + d$,
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where $j$ is multiplicity of root $\alpha$ (if $P(\alpha) \neq 0$, then $j = 0$) of characteristic polynomial
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where $j$ is multiplicity of root $\alpha$ (if $P(\alpha) \neq 0$, then $j = 0$) of characteristic polynomial
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\item \bi{(Case 2)} $b(x) = c x^d \cos(\alpha x)$, or $b(x) = c x^d \sin(\alpha x)$:
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\item \bi{(Case 2)} $b(x) = c x^d \cos(\alpha x)$, or $b(x) = c x^d \sin(\alpha x)$:
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$f_p = Q_1(x) \cdot \cos(\alpha x) + Q_2(x) \cdot \sin(\alpha x))$,
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$f_p = Q_1(x) \cdot \cos(\alpha x) + Q_2(x) \cdot \sin(\alpha x))$,
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where $Q_i(x)$ a polynomial with $\deg(Q_i) \leq d + j$,
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where $Q_i(x)$ a polynomial with $\deg(Q_i) \leq d + j$,
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where $j$ is the multiplicity of root $\alpha i$ (if $P(\alpha i) \neq 0$, then $j = 0$) of characteristic polynomial
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where $j$ is the multiplicity of root $\alpha i$ (if $P(\alpha i) \neq 0$, then $j = 0$) of characteristic polynomial
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\item \bi{(Case 3)} $b(x) = c e^{\alpha x} \cos(\beta x)$, or $b(x) = c e^{\alpha x} \sin(\beta x)$, use the Ansatz
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\item \bi{(Case 3)} $b(x) = c e^{\alpha x} \cos(\beta x)$, or $b(x) = c e^{\alpha x} \sin(\beta x)$, use the Ansatz
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$Q_1(x) e^{\alpha x} \sin(\beta x) + Q_2(x) e^{\alpha x} \cos(\beta x)$, agasin with the same polynomial.
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$Q_1(x) e^{\alpha x} \sin(\beta x) + Q_2(x) e^{\alpha x} \cos(\beta x)$, again with the same polynomial.
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Often, it is sufficent to have a polynomial of degree 0 (i.e. constant)
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Often, it is sufficent to have a polynomial of degree 0 (i.e. constant)
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\end{enumerate}
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\end{enumerate}
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\rmvspace
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For inhomogeneous parts with addition or subtraction, the above cases can be combined.
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For inhomogeneous parts with addition or subtraction, the above cases can be combined.
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For any cases not covered, start with the same form as the inhomogeneous part has (for trigonometric functions, duplicate it with both $\sin$ and $\cos$).
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For any cases not covered, start with the same form as the inhomogeneous part has (for trigonometric functions, duplicate it with both $\sin$ and $\cos$).
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