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# Ohms Law
Solve for voltage:
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$\displaystyle V = \frac{I}{R}$
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*Solve for resistance:*
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$R = \frac{V}{I}$
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_Solve for current_
$$
\begin{flalign}
I & = \frac{V}{R} &
\end{flalign}
$$
# Resistors in Series
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$R = R1 + R2 + R3 ...$
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# Resistors in Parallel
$$
\begin{flalign}
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& \frac{1}{R} = \frac{1}{R1} + \frac{1}{R2} + \frac{1}{R3} ... & \\
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\\
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& \textit{For two resistors in parallel:} & \\
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\\
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& R = \frac{R1 * R2}{R1 + R2} & \\\
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\end{flalign}
$$
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***Tip:***
If resistors of the same value are in parallel the total resistance is a single resistor divided by the amount if resistors.
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## 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.
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# Kirchhoff's Law
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## Conservation of Charge (First Law)
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All current entering a node must also leave that node
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$$
\begin{flalign}
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\sum{I_{IN}} = \sum{I_{OUT}}&&
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\end{flalign}
$$
**Example:**
![](./assets/kirchhoffs-law-01.svg)
For this circuit kirchhoffs law states that:
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$\displaystyle i1 = i2 + i3 + i4$
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## Conservation of Energy (Second Law)
All the potential differences around the loop must sum to zero.
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$\displaystyle \sum{V} = 0$
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## Capacitors in Series
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$\displaystyle \frac{1}{C_{t}} = \frac{1}{C_{1}}+\frac{1}{C_{2}}+\frac{1}{C_{3}} ...$
### Impedance in a Circuit
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$$
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\begin{flalign}
& Z = \sqrt{R^2 + X^2} & \\\
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\\
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& X = X_{L} - X_{C} \\
\end{flalign}
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$$
# Capacitive Reactance
$\displaystyle X_{c} = \frac{1}{2 \pi fC}$
# Inductive Reactance
$\displaystyle X_{l} = 2\pi fL$
# Filters
## Cutoff Frequency for RC Filters
$\displaystyle f_{c} = \frac{1}{2\pi RC}$
## Cutoff Frequency for RL Filters
$\displaystyle f_{c} = \frac{R}{2\pi L}$
## Signal Response of an RC Filter
Xc = [[#Capacitive Reactance]]
$\displaystyle V_{out} = V_{in}(\frac{X_{c}}{\sqrt{R^2+X_{c}^2}})$
## Cutoff Frequency for multiple Low Pass Filters
$\displaystyle f_{(-3db)} = f_{c}\sqrt{2^{(\frac{1}{n})}-1}$
Where $n$ = Number if **identical** filters
# Center Frequency for RLC Low Pass Filter
$\displaystyle f_{o} = \frac{1}{2\pi \sqrt{LC}}$