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+# Unit 3: Solving Equations and Inequailties
+
+## Equations
+- a ```mathematical statement``` in which the value on the ```left side``` equals the value on the ```right side``` of the equal sign
+- To ```solve``` and equation is to find the variable that makes the statement true
+### Methods to solve an equation
+ 1. Expand and simplify both sides
+ 2. Isolate using reverse order of operations
+ 3. Check the solution by plugging the variable back into the equation and check if the ```left side``` equals the ```right side```
+
+## Absolute Values
+- There are 2 cases. For this sort of equation, you must split the equation into 2 separate equations. One of the
+- equations will have the absolute bracket be positive while the other negative.
+- Absolute values are written in the form $`| x |`$
+- where
+$`
+| x | =
+\begin{cases}
+x, & \text{if } x > 0\\
+0, & \text{if } x = 0\\
+-x, & \text{if } x < 0
+\end{cases}
+`$
+
+## Quadractic Equations
+- ```Quadratic Function```: A parabolic graph where the axis of symmetry is parallel to the y-axis
+- ```Quadratic Equation```: This function is set equal to ```0```. The solution to the equation are called ```roots```
+- Solve quadratic equation by:
+
+ 1. Isolation
+ - $`a(x+b)^2 + k = 0`$
+ 2. Factor using zero-product property
+ - ```The Zero Factor Property``` refers to when a×b=0, then either a=0 or b=0.
+ - $`(x-a)(x-b)=0`$
+ - $`x = a, b`$
+
+- 
+
+**Note:**
+- √x2 = ± x (There are 2 possible solutions)
+- ```Distrubutive Property``` - This is opening the bracket. a(x+y) = ax+ay
+
+## Tips
+- ```Absolute Values``` can have 2 solutions
+- ```Quadratics``` can also have 2 solutions
+- Make sure to do the reverse when moving things to the other side, meaning a positive on the ```left side``` becomes a negative on the ```right side```