From e971bf9bcf923e621db486e85b32a5aa6273afc4 Mon Sep 17 00:00:00 2001 From: luc Date: Thu, 2 Nov 2023 12:49:38 +0100 Subject: [PATCH] Improved syntax. --- .../multivariable-calculus/differentation.md | 29 +++++++++++++-- .../implicit-equations.md | 14 ++++++-- .../taylor-polynomials.md | 8 ++++- .../laplace-transform.md | 36 ++++++++++++++++--- .../second-order-ode.md | 21 ++++++++--- .../systems-of-linear-ode.md | 12 +++++-- 6 files changed, 101 insertions(+), 19 deletions(-) diff --git a/docs/en/mathematics/multivariable-calculus/differentation.md b/docs/en/mathematics/multivariable-calculus/differentation.md index 3b7bd70..67650bc 100644 --- a/docs/en/mathematics/multivariable-calculus/differentation.md +++ b/docs/en/mathematics/multivariable-calculus/differentation.md @@ -22,7 +22,12 @@ $$ \partial_{12} f(P) = \partial_{21} f(P), $$ -*Proof*: will be added later. +
+Proof: + +will be added later. +
+
## Total derivatives @@ -50,6 +55,13 @@ $$ with $\nabla f(\mathbf{a})$ the gradient of $f$. +
+Proof: + +will be added later. +
+
+ ## Chain rule *Definition*: let $D \subseteq \mathbb{R}^n$ ($n=2$ for simplicity) and let $f: D \to \mathbb{R}$, also let $g: \mathbb{R} \to \mathbb{R}$ given by @@ -78,7 +90,10 @@ The direction of the gradient is the direction of steepest increase of $f$ at $\ *Theorem*: gradients are orthogonal to level lines and level surfaces. -*Proof*: let $\mathbf{r}(t) = \big(x(t),\; y(t) \big)^T$ be a parameterization of the level curve of $f$ such that $\mathbf{r}(0) = \mathbf{a}$. Then for all $t$ near $0$, $f(\mathbf{r}(t)) = f(\mathbf{a})$. Differentiating this equation with respect to $t$ using the chain rule, we obtain +
+Proof: + +let $\mathbf{r}(t) = \big(x(t),\; y(t) \big)^T$ be a parameterization of the level curve of $f$ such that $\mathbf{r}(0) = \mathbf{a}$. Then for all $t$ near $0$, $f(\mathbf{r}(t)) = f(\mathbf{a})$. Differentiating this equation with respect to $t$ using the chain rule, we obtain $$ \partial_1 f(\mathbf{x}) \dot x(t) + \partial_2 f(\mathbf{x}) \dot y(t) = 0, @@ -91,6 +106,8 @@ $$ $$ obtaining that $\nabla f$ is orthogonal to $\mathbf{\dot r}$. +
+
## Directional derivatives @@ -138,4 +155,10 @@ We have two interpretations: * the composition of linear maps, * the matrix multiplication of the Jacobian. -*Proof*: will be added later. \ No newline at end of file +
+Proof: + +will be added later. +
+
+ \ No newline at end of file diff --git a/docs/en/mathematics/multivariable-calculus/implicit-equations.md b/docs/en/mathematics/multivariable-calculus/implicit-equations.md index 9795fe1..bb71128 100644 --- a/docs/en/mathematics/multivariable-calculus/implicit-equations.md +++ b/docs/en/mathematics/multivariable-calculus/implicit-equations.md @@ -26,7 +26,12 @@ $$ \phi' (x) = - \frac{\partial_1 f\big(x,\phi(x)\big)}{\partial_2 f\big(x,\phi(x)\big)}. $$ -*Proof*: will be added later. +
+Proof: + +will be added later. +
+
## General case @@ -51,4 +56,9 @@ $$ D \mathbf{\phi}(\mathbf{x}) = - \Big(D_2 \mathbf{F}\big(\mathbf{x},\mathbf{\phi}(\mathbf{x})\big) \Big)^{-1} D_1 \mathbf{F}\big(\mathbf{x},\mathbf{\phi}(\mathbf{x})\big). $$ -*Proof*: will be added later. \ No newline at end of file +
+Proof: + +will be added later. +
+
diff --git a/docs/en/mathematics/multivariable-calculus/taylor-polynomials.md b/docs/en/mathematics/multivariable-calculus/taylor-polynomials.md index 69d54ec..0b668cf 100644 --- a/docs/en/mathematics/multivariable-calculus/taylor-polynomials.md +++ b/docs/en/mathematics/multivariable-calculus/taylor-polynomials.md @@ -24,12 +24,18 @@ $$ f(\mathbf{x}) = T(\mathbf{x}) + \frac{1}{(n+1)!} \partial_\mathbf{h}^{n+1} f(\mathbf{a} + \theta \mathbf{h}). $$ -*Proof*: Apply Taylor’s theorem in 1D and the chain rule to the function $\phi : [0, 1] \to \mathbb{R}$ given by +
+Proof: + +apply Taylor’s theorem in 1D and the chain rule to the function $\phi : [0, 1] \to \mathbb{R}$ given by $$ \phi(\theta) := f(\mathbf{a} + \theta \mathbf{h}). $$ +
+
+ ## Other methods Creating multivariable Taylor polynomials by using 1D Taylor polynomials of the different variables and composing them. diff --git a/docs/en/mathematics/ordinary-differential-equations/laplace-transform.md b/docs/en/mathematics/ordinary-differential-equations/laplace-transform.md index ed4381b..c40ead1 100644 --- a/docs/en/mathematics/ordinary-differential-equations/laplace-transform.md +++ b/docs/en/mathematics/ordinary-differential-equations/laplace-transform.md @@ -18,7 +18,12 @@ $$ on the interval where both are defined. -*Proof*: will be added sometime. +
+Proof: + +will be added later. +
+
If $c \in \mathbb{R}$ then $cf$ also has a Laplace transform and, @@ -40,7 +45,12 @@ $$ on this interval -*Proof*: will be added sometime. +
+Proof: + +will be added later. +
+
**More shifting**: let $a>0$, if $f$ has a Laplace transform $F$ on $s_0, \infty$ then the function $g$ given by @@ -56,7 +66,12 @@ $$ on this interval. -*Proof*: will be added sometime. +
+Proof: + +will be added later. +
+
**Scaling**: let $a > 0$. If $f$ has a Laplace transform $F$ on $(s_0, \infty)$ then the function $g$ given by @@ -72,7 +87,12 @@ $$ on this interval. -*Proof*: will be added sometime. +
+Proof: + +will be added later. +
+
**Derivatives**: if $f$ has a derivative $g$ having a Laplace transform $G$ on the interval $(s_0,\infty)$ then $f$ has a Laplace transform on the same interval, and @@ -86,7 +106,10 @@ $$ \mathcal{L}[f^{(n)}](s) = s^n F(s) - \sum_{k=0}^{n-1} s^k f^{(n-1-k)}(0) $$ -*Proof*: for large enough $s$, the case $n=1$ follows by integration by parts +
+Proof: + +for large enough $s$, the case $n=1$ follows by integration by parts $$ \begin{align*} \mathcal{L}[f'](s) &= \int_0^\infty e^{-st} f'(t)dt, \\ &= \Big[e^{-st} f(t) \Big]_0^\infty + s\int_0^\infty e^{-st}f(t), \\ &= sF(s) - f(0) \end{align*}, @@ -98,6 +121,9 @@ $$ \begin{align*} \mathcal{L}[f^{k+1}](s) &= \int_0^\infty e^{-st} f^{(k+1)}(t)dt , \\ &= \Big[e^{-st} f^{(k+1)}(t) \Big]_0^\infty + s\int_0^\infty e^{-st}f^{(k)}(t), \\ &= s \mathcal{L}[f^{(k)}] - f^{(k)}(0), \\ &= s \Big(s^k F(s) - \sum_{r=0}^{k-1} s^r f^{(k-1-r)}(0)\Big) - f^{(k)}(0), \\ &= s^{k+1} F(s) - \sum_{r=0}^{k} s^r f^{(k-r)}(0) \end{align*}. $$ +
+
+ ## Examples **Solving a second order linear ODE**: with $y: \mathbb{K} \to \mathbb{R}$ given by diff --git a/docs/en/mathematics/ordinary-differential-equations/second-order-ode.md b/docs/en/mathematics/ordinary-differential-equations/second-order-ode.md index 544f39e..9470db2 100644 --- a/docs/en/mathematics/ordinary-differential-equations/second-order-ode.md +++ b/docs/en/mathematics/ordinary-differential-equations/second-order-ode.md @@ -52,7 +52,12 @@ $$ y(t) = (c_1 + c_2t) e^{\lambda_1 t}. $$ -*Proof*: will at some point be added. +
+Proof: + +will be added later. +
+
#### Example @@ -75,19 +80,25 @@ $$ *Theorem*: let $y_p$ be a particular solution to $(*)$. Then the general solution to $(*)$ is given by $$ -y = y_H + y_p, +y = y_h + y_p, $$ -with $y_H$ the solution to the homegeneous case. +with $y_h$ the solution to the homegeneous case. -*Proof*: let $y$ be a solution to $(*)$, then $L[y - y_p] = L[y] - L[y_p] = f - f = 0$. Therefore $y = (y - y_p) + y_p = y_H + y_p$. +
+Proof: + +let $y$ be a solution to $(*)$, then $L[y - y_p] = L[y] - L[y_p] = f - f = 0$. Therefore $y = (y - y_p) + y_p = y_h + y_p$. + +
+
#### Method of variation of parameters We need the general solution to the homogeneous case $$ -y_H(t) = c_1 y_1(t) + c_2 y_2(t), \qquad c_1,c_2 \in \mathbb{C}. +y_h(t) = c_1 y_1(t) + c_2 y_2(t), \qquad c_1,c_2 \in \mathbb{C}. $$ Ansatz: let $y_p(t) = c_1(t) y_2(t) + c_2(t) y_2(t)$, then taking the derivative of $y_p(t)$ diff --git a/docs/en/mathematics/ordinary-differential-equations/systems-of-linear-ode.md b/docs/en/mathematics/ordinary-differential-equations/systems-of-linear-ode.md index 46cb3f0..b678e44 100644 --- a/docs/en/mathematics/ordinary-differential-equations/systems-of-linear-ode.md +++ b/docs/en/mathematics/ordinary-differential-equations/systems-of-linear-ode.md @@ -44,13 +44,19 @@ $$ \mathbf{\dot y}(t) = A \mathbf{y}(t) + \mathbf{f}(t), \qquad t \in I. \qquad (*) $$ -*Theorem*: let $\mathbf{y}_p: I \to \mathbb{R}^n$ a particular solution for $(*)$ and $\mathbf{y}_H$ the general solution to the homegeneous system. Then the general solutions of the inhomogeneous system $(*)$ is given by +*Theorem*: let $\mathbf{y}_p: I \to \mathbb{R}^n$ a particular solution for $(*)$ and $\mathbf{y}_h$ the general solution to the homegeneous system. Then the general solutions of the inhomogeneous system $(*)$ is given by $$ -\mathbf{y}(t) = \mathbf{y}_p(t) + \mathbf{y}_H(t), \qquad t \in I +\mathbf{y}(t) = \mathbf{y}_p(t) + \mathbf{y}_h(t), \qquad t \in I $$ -*Proof*: similar to 1d case, will possibly be added later. +
+Proof: + +similar to 1d case, will be added later. + +
+
### Method of variation of parameters