Snapshot

2023-04-20 12:25:26 +00:00 · 2023-04-20 12:25:26 +00:00 · 6d71b10a3f
commit 6d71b10a3f
parent 6b15aece4d
8 changed files with 330 additions and 145 deletions
--- a/Media/index.md
+++ b/Media/index.md
@ -10,78 +10,77 @@ not yet rated
 ## Recipes
 <!-- #query page where name =~ /^Media\/recipes/ render [[templates/recipe]] -->
 ### [[Media/recipes/French-Bread-Pizza|French-Bread-Pizza]]
-not yet rated
+4/5 Stars
 ### [[Media/recipes/Lemony-Arugula-Spaghetti-Cacio-Pepe|Lemony-Arugula-Spaghetti-Cacio-Pepe]]
-not yet rated
+_not yet rated_
 ### [[Media/recipes/Broccoli-Blanched-with-Sesame-Oil|Broccoli-Blanched-with-Sesame-Oil]]
-5 Stars 
+5/5 Stars
 ### [[Media/recipes/Koreanisches-Rindfleisch|Koreanisches-Rindfleisch]]
-5 Stars 
+5/5 Stars
 ### [[Media/recipes/Mie-Nudeln-Erdnusssoße|Mie-Nudeln-Erdnusssoße]]
-not yet rated
+_not yet rated_
 ### [[Media/recipes/Auberginen-Feta-Reispfanne|Auberginen-Feta-Reispfanne]]
-4 Stars 
+4/5 Stars
 ### [[Media/recipes/One-Skillet-Chicken-Alfredoy|One-Skillet-Chicken-Alfredoy]]
-5 Stars 
+5/5 Stars
 ### [[Media/recipes/Molten-Chocolate-Chunk-Brownies|Molten-Chocolate-Chunk-Brownies]]
-4 Stars 
+4/5 Stars
 ### [[Media/recipes/Hähnchen-Curry|Hähnchen-Curry]]
-not yet rated
+_not yet rated_
 ### [[Media/recipes/Ham-Cheese-Breakfast-Pockets|Ham-Cheese-Breakfast-Pockets]]
-4 Stars 
+4/5 Stars
 ### [[Media/recipes/Miso-Suppe|Miso-Suppe]]
-5 Stars 
+5/5 Stars
 ### [[Media/recipes/Cast-Iron-Peach-Crisp|Cast-Iron-Peach-Crisp]]
-3 Stars 
+3/5 Stars
 ### [[Media/recipes/Roto-chick-Chicken-Noodle-Soup|Roto-chick-Chicken-Noodle-Soup]]
-5 Stars 
+5/5 Stars
 ### [[Media/recipes/Süßscharfe-Kürbiscremesuppe-mit-Kokosmilch|Süßscharfe-Kürbiscremesuppe-mit-Kokosmilch]]
-5 Stars 
+5/5 Stars
 ### [[Media/recipes/Broccoli-Bolognese-with-Orecchiette|Broccoli-Bolognese-with-Orecchiette]]
-4 Stars 
+4/5 Stars
 ### [[Media/recipes/Großmutter-Käsekuchen|Großmutter-Käsekuchen]]
-not yet rated
+_not yet rated_
 ### [[Media/recipes/Indian-Butter-Chicken|Indian-Butter-Chicken]]
-5 Stars 
+5/5 Stars
 ### [[Media/recipes/Swedish-Meatballs|Swedish-Meatballs]]
-5 Stars 
+5/5 Stars
 ### [[Media/recipes/Linsenpfanne-mit-Staudensellerie|Linsenpfanne-mit-Staudensellerie]]
-4 Stars 
+4/5 Stars
 ### [[Media/recipes/Mochi|Mochi]]
-4 Stars 
+4/5 Stars
 ### [[Media/recipes/Spinach-Ohitashi|Spinach-Ohitashi]]
-not yet rated
+_not yet rated_
 ### [[Media/recipes/Egg-Fried-Rice|Egg-Fried-Rice]]
-5 Stars 
+5/5 Stars
-
+![](Media/recipes/images/egg-fried-rice.jpg)
 <img src=Media/recipes/images/egg-fried-rice.jpg width=”50%”/>
 ### [[Media/recipes/Slow-Cooker-Beef-Stew|Slow-Cooker-Beef-Stew]]
-not yet rated
+_not yet rated_
 ### [[Media/recipes/Cucumber-Basil-Egg-Salad|Cucumber-Basil-Egg-Salad]]
-not yet rated
+_not yet rated_
 ### [[Media/recipes/Banana-Bread|Banana-Bread]]
-5 Stars
+5/5 Stars
 <!-- /query -->
--- a/Media/recipes/French-Bread-Pizza.md
+++ b/Media/recipes/French-Bread-Pizza.md
@ -1,6 +1,6 @@
 ---
 link: https://www.epicurious.com/recipes/food/views/french-bread-pizzas-with-mozzarella-and-pepperoni-56390008
-tating: ★★★★
+rating: 4
 time: 30 minutes
 yield: 4
 ---
--- a/PUBLISH.md
+++ b/PUBLISH.md
@ -5,4 +5,5 @@ tags:
 - "#pub"
 prefixes:
 - Media
 - Resources
 ```
--- a/Resources/electricity/circuits/rc-high-pass.md
+++ b/Resources/electricity/circuits/rc-high-pass.md
@ -8,8 +8,203 @@ Because high pass filters work exactly like low pass filters but in reverse, let
 Lets first calculate the cutoff frequency of this filter:
-![[formulas#Cutoff Frequency for RC Filters]]
+[[Resources/electricity/formulas|Formulas]]
 <!-- #include [[Resources/electricity/formulas]] -->
 ---
 cards-deck: electricity
 ---
-$\displaystyle f_{c} = \frac{1}{2\pi 100 * 0.00000001}$
+## Ohms Law 
-$\displaystyle f_{c} = 159154.94 \approx 159.1kHz$
+
 *Solve for voltage:* 
 #card
 $\displaystyle V = I*R$
 ^1654598090369
 *Solve for resistance:* 
 #card
 $\displaystyle R = \frac{V}{I}$
 ^1654598090389
 *Solve for current* 
 #card
 $\displaystyle I = \frac{V}{R}$
 ^1654598090398
 ## Resistors in Series 
 #card
 $R = R1 + R2 + R3 ...$
 ^1654598090404
 ## Resistors in Parallel 
 #card
 $$
 \begin{flalign}
 &\frac{1}{R} = \frac{1}{R1} + \frac{1}{R2} + \frac{1}{R3} ... &\\
 \\
 &\textit{For two resistors in parallel:} &\\
 \\
 &R = \frac{R1 * R2}{R1 + R2} &\\\
 \end{flalign}
 $$
 ***Tip:***
 If resistors of the same value are in parallel the total resistance is a single resistor divided by the amount if resistors.
 ## Voltage Divider
 #card 
 ^1654598090410
 $V_{out} = V_{in}(\frac{R_{1}}{R_1+R_2})$
 ## Thevenin’s Theorem 
 States that it is possible to simplify any linear circuit, no matter how complex, to an equivalent circuit with just a single voltage source and series resistance connected to a load.
 ## Conservation of Charge (First Law) 
 #card
 All current entering a node must also leave that node
 $$
 \begin{flalign}
 \sum{I_{IN}} = \sum{I_{OUT}}&&
 \end{flalign}
 $$
 **Example:**
 ^1654598090415
 ![](kirchhoffs-law-01.svg)
 For this circuit kirchhoffs law states that:
 $\displaystyle i1 = i2 + i3 + i4$
 ## Conservation of Energy (Second Law)
 All the potential differences around the loop must sum to zero.
 $\displaystyle \sum{V} = 0$
 ## Capacitors in Series
 #card 
 $\displaystyle \frac{1}{C_{t}} = \frac{1}{C_{1}}+\frac{1}{C_{2}}+\frac{1}{C_{3}} ...$
 ^1654598090421
 ## Impedance in a Circuit 
 #card 
 $$
 \begin{flalign}
 &Z = \sqrt{R^2 + X^2} &\\\
 \\
 &X = X_{L} - X_{C} \\ 
 \end{flalign}
 $$
 ## Capacitive Reactance 
 #card
 ^1654598090426
 $\displaystyle X_{c} = \frac{1}{2 \pi fC}$
 ## Inductive Reactance 
 #card
 $\displaystyle X_{l} = 2\pi fL$
 ^1654598090432
 ## Analog Filters
 ## Cutoff Frequency for RC Filters 
 #card 
 $\displaystyle f_{c} = \frac{1}{2\pi RC}$
 ^1654598090437
 ## Cutoff Frequency for RL Filters
 #card
 $\displaystyle f_{c} = \frac{R}{2\pi L}$
 ^1654598090445
 ## Cutoff Frequency for multiple Low Pass Filters
 $\displaystyle f_{(-3db)} = f_{c}\sqrt{2^{(\frac{1}{n})}-1}$
 Where $n$ = Number if **identical** filters
 ## Resonance Frequency for RLC Low Pass Filter
 #card 
 $\displaystyle f_{o} = \frac{1}{2\pi \sqrt{LC}}$
 ^1654598090452
 ## Center Frequency with Fc and Fh
 #card 
 $f_{c} = \sqrt{f_{h}*f_{l}}$
 ^1654598090459
 ## Filter Response for RC Filters 
 #card
 $V_{out} = V_{in}(\frac{X_c}{\sqrt{R_{1}^2+X_{c}^2}})$
 ^1654598090466
 ## Cutoff Frequency $\pi$ Topology Filter
 #card 
 When the two capacitors have the same capacitance, it can be calculated like this:
 ^1654598090479
 $\displaystyle f_c = \frac{1}{4\pi\sqrt{LC}}$
 ## Angular Frequency ($\omega$) 
 #card
 $\omega = 2\pi f = \frac{2\pi}{T}$
 ^1654598090492
 ## RLC Series Response
 This is basically Ohms Law:
 $\displaystyle V = IZ$
 Where $Z$ is the impedance:
 $Z = \sqrt{R^2 + (X_L - X_C)^2}$
 $X_L$ = Reactive Inductance
 $X_C$ = Reactive Capacativw 
 ## Current through a transistor
 $\displaystyle I_{EQ} = \frac{V_{BB}-{V_{BE}}}{\frac{R_B}{(\beta+1)}+R_E}$
 ## Gain Bandwidth Product 
 #card 
 $GBP = A_V * f_c$
 ^1654598090498
 $\displaystyle f_c = \frac{GBP}{A_V}$
 ## Bandwidth of Multiple OpAmps
 Where $n$ = number of stages
 and $BW$ = Bandwidth of single op-amp
 $BW_E = BW\sqrt{2^\frac{1}{n}-1}$
 ## Power lost in a Resistor
 #card 
 $P = IV = I^2R = \frac{V^2}{R}$
 ^1654598090504
 <!-- /include -->
 ```latex
 \displaystyle f_{c} = \frac{1}{2\pi 100 * 0.00000001}
 \displaystyle f_{c} = 159154.94 \approx 159.1kHz
 ```
--- a/Resources/electricity/formulas.md
+++ b/Resources/electricity/formulas.md
@ -1,191 +1,183 @@
 ---
 cards-deck: electricity
 ---
 ## Ohms Law 
 *Solve for voltage:* 
 #card
-$\displaystyle V = I*R$
+```latex
-^1654598090369
+\displaystyle V = I*R
 ```
 *Solve for resistance:* 
 #card
-$\displaystyle R = \frac{V}{I}$
+```latex
-^1654598090389
+\displaystyle R = \frac{V}{I}
 ```
 *Solve for current* 
-#card
+```latex
-
+\displaystyle I = \frac{V}{R}
-$\displaystyle I = \frac{V}{R}$
+```
 ^1654598090398
 ## Resistors in Series 
 #card
-$R = R1 + R2 + R3 ...$
+```latex
-^1654598090404
+R = R1 + R2 + R3 ...
 ```
 ## Resistors in Parallel 
 #card
-$$
+```latex
-\begin{flalign}
+\frac{1}{R} = \frac{1}{R1} + \frac{1}{R2} + \frac{1}{R3} ... \\
-&\frac{1}{R} = \frac{1}{R1} + \frac{1}{R2} + \frac{1}{R3} ... &\\
+\textit{}\\
-\\
+\textit{For two resistors in parallel:}\\
-&\textit{For two resistors in parallel:} &\\
+\textit{}\\
-\\
+R = \frac{R1 * R2}{R1 + R2}
-&R = \frac{R1 * R2}{R1 + R2} &\\\
+```
-\end{flalign}
+
 $$
 ***Tip:***
 If resistors of the same value are in parallel the total resistance is a single resistor divided by the amount if resistors.
 ## Voltage Divider
 #card 
 ^1654598090410
-$V_{out} = V_{in}(\frac{R_{1}}{R_1+R_2})$
+## Voltage Divider
 ```latex
 V_{out} = V_{in}(\frac{R_{1}}{R_1+R_2})
 ```
 ## Thevenin’s Theorem 
 States that it is possible to simplify any linear circuit, no matter how complex, to an equivalent circuit with just a single voltage source and series resistance connected to a load.
 ## Conservation of Charge (First Law) 
 #card
 All current entering a node must also leave that node
 $$
 \begin{flalign}
 \sum{I_{IN}} = \sum{I_{OUT}}&&
 \end{flalign}
 $$
 **Example:**
 ^1654598090415
-![](kirchhoffs-law-01.svg)
+```latex
 \sum{I_{IN}} = \sum{I_{OUT}}
 ```
 **Example:**
 ![](Resources/electricity/assets/kirchhoffs-law-1.svg)
 For this circuit kirchhoffs law states that:
-$\displaystyle i1 = i2 + i3 + i4$
+```latex
 \displaystyle i1 = i2 + i3 + i4
 ```
 ## Conservation of Energy (Second Law)
 All the potential differences around the loop must sum to zero.
-$\displaystyle \sum{V} = 0$
+```latex
 \displaystyle \sum{V} = 0
 ```
 ## Capacitors in Series
 #card 
-$\displaystyle \frac{1}{C_{t}} = \frac{1}{C_{1}}+\frac{1}{C_{2}}+\frac{1}{C_{3}} ...$
+```latex
-^1654598090421
+\displaystyle \frac{1}{C_{t}} = \frac{1}{C_{1}}+\frac{1}{C_{2}}+\frac{1}{C_{3}} ...
 ```
 ## Impedance in a Circuit 
-#card 
+```latex
-$$
+Z = \sqrt{R^2 + X^2} \\
-\begin{flalign}
+\textit{}\\
-&Z = \sqrt{R^2 + X^2} &\\\
+X = X_{L} - X_{C} \\ 
-\\
+```
 &X = X_{L} - X_{C} \\ 
 \end{flalign}
 $$
 ## Capacitive Reactance 
 #card
 ^1654598090426
-$\displaystyle X_{c} = \frac{1}{2 \pi fC}$
+## Capacitive Reactance 
 ```latex
 \displaystyle X_{c} = \frac{1}{2 \pi fC}
 ```
 ## Inductive Reactance 
-#card
+```latex
-
+\displaystyle X_{l} = 2\pi fL
-$\displaystyle X_{l} = 2\pi fL$
+```
 ^1654598090432
 ## Analog Filters
 ## Cutoff Frequency for RC Filters 
-#card 
+```latex
-
+\displaystyle f_{c} = \frac{1}{2\pi RC}
-$\displaystyle f_{c} = \frac{1}{2\pi RC}$
+```
 ^1654598090437
 ## Cutoff Frequency for RL Filters
-#card
+```latex
-
+\displaystyle f_{c} = \frac{R}{2\pi L}
-$\displaystyle f_{c} = \frac{R}{2\pi L}$
+```
 ^1654598090445
 ## Cutoff Frequency for multiple Low Pass Filters
-$\displaystyle f_{(-3db)} = f_{c}\sqrt{2^{(\frac{1}{n})}-1}$
+```latex
 \displaystyle f_{(-3db)} = f_{c}\sqrt{2^{(\frac{1}{n})}-1}
 ```
 Where $n$ = Number if **identical** filters
 ## Resonance Frequency for RLC Low Pass Filter
-#card 
+```latex
-
+\displaystyle f_{o} = \frac{1}{2\pi \sqrt{LC}}
-$\displaystyle f_{o} = \frac{1}{2\pi \sqrt{LC}}$
+```
 ^1654598090452
 ## Center Frequency with Fc and Fh
-#card 
+```latex
-
+f_{c} = \sqrt{f_{h}*f_{l}}
-$f_{c} = \sqrt{f_{h}*f_{l}}$
+```
 ^1654598090459
 ## Filter Response for RC Filters 
-#card
+```latex
-
+V_{out} = V_{in}(\frac{X_c}{\sqrt{R_{1}^2+X_{c}^2}})
-$V_{out} = V_{in}(\frac{X_c}{\sqrt{R_{1}^2+X_{c}^2}})$
+```
 ^1654598090466
 ## Cutoff Frequency $\pi$ Topology Filter
 #card 
 When the two capacitors have the same capacitance, it can be calculated like this:
-^1654598090479
+```latex
-
+\displaystyle f_c = \frac{1}{4\pi\sqrt{LC}}
-$\displaystyle f_c = \frac{1}{4\pi\sqrt{LC}}$
+```
 ## Angular Frequency ($\omega$) 
-#card
+```latex
-
+\omega = 2\pi f = \frac{2\pi}{T}
-$\omega = 2\pi f = \frac{2\pi}{T}$
+```
 ^1654598090492
 ## RLC Series Response
 This is basically Ohms Law:
-$\displaystyle V = IZ$
+```latex
 \displaystyle V = IZ
 ```
 Where $Z$ is the impedance:
-$Z = \sqrt{R^2 + (X_L - X_C)^2}$
+```latex
 Z = \sqrt{R^2 + (X_L - X_C)^2}
 ```
 $X_L$ = Reactive Inductance
 $X_C$ = Reactive Capacativw 
 ## Current through a transistor
- 
+
-$\displaystyle I_{EQ} = \frac{V_{BB}-{V_{BE}}}{\frac{R_B}{(\beta+1)}+R_E}$
+```latex
 \displaystyle I_{EQ} = \frac{V_{BB}-{V_{BE}}}{\frac{R_B}{(\beta+1)}+R_E}
 ```
 ## Gain Bandwidth Product 
-#card 
+```latex
 GBP = A_V * f_c
 ```
-$GBP = A_V * f_c$
+```latex
-^1654598090498
+\displaystyle f_c = \frac{GBP}{A_V}
-
+```
 $\displaystyle f_c = \frac{GBP}{A_V}$
 ## Bandwidth of Multiple OpAmps
 Where $n$ = number of stages
 and $BW$ = Bandwidth of single op-amp
-$BW_E = BW\sqrt{2^\frac{1}{n}-1}$
+```latex
 BW_E = BW\sqrt{2^\frac{1}{n}-1}
 ```
 ## Power lost in a Resistor
-#card 
+```latex
-
+P = IV = I^2R = \frac{V^2}{R}
-$P = IV = I^2R = \frac{V^2}{R}$
+```
 ^1654598090504
--- a/Resources/index.md
+++ b/Resources/index.md
@ -97,5 +97,5 @@ It contains some ressources
 [[Resources/games/web-based|Resources/games/web-based]]
 [[Resources/games/rpg|Resources/games/rpg]]
 [[Resources/mechanics/gaggia-baby-millenium|Resources/mechanics/gaggia-baby-millenium]]
-[[Resources|Resources]]
+[[Resources/index|Resources/index]]
 <!-- /query -->
--- a/Resources/mathematics/derivation/lim-proof.md
+++ b/Resources/mathematics/derivation/lim-proof.md
@ -1,7 +1,7 @@
 # Proof of x² = 2x
-$$
+```latex
 \begin{flalign}
 & \frac{d}{dx}(x^2) = 2 &\\\
 \\
@ -20,7 +20,7 @@ $$
 &f'(x) = \lim_{x \to 0} 2x+h \\
 \end{flalign}
-$$
+```
 ```desmos-graph
--- a/templates/recipe.md
+++ b/templates/recipe.md
@ -1,10 +1,8 @@
 ### [[{{name}}|{{substring name 100 14 ““}}]]
 {{#if rating}}
-{{rating}} Stars 
+{{rating}}/5 Stars
 {{else}}
-not yet rated
+_not yet rated_
 {{/if}}
 {{#if image}}
-<img src={{image}} width=”50%”/>
+![]({{image}}){{/if}}
 {{/if}}