# Unit 6: System of Equations
## Linear System
- Two or more equation that you are working on all together at once on the same set of axes.
- The lines may ```cross``` or ```intersect``` at a point called the ```Point of Intersection (POI)```.
- The coordinated of the ```POI``` must satisfy the equation of all the lines in a linear equation.
- In business, the ```Point of Intersection``` is known as the **Break Even Point** where ```Revenue - Cost = Profit```
- when **Profit = 0**. There is no gain or loss.
### Number of Solutions
- <img src="https://lh5.googleusercontent.com/wqYggWjMVXvWdY9DiCFYGI7XSL4fXdiHsoZFkiXcDcE93JgZHzPkWSoZ6f4thJ-aLgKd0cvKJutG6_gmmStSpkVPJPOyvMF4-JcfS_hVRTdfuypJ0sD50tNf0n1rukcLBNqOv42A" width="500">
## Discriminant
- The discriminant determines the number of solutions (roots) there are in a quadratic equation. $`a, b , c`$ are the
- coefficients and constant of a quadratic equation: $`y = ax^2 + bx + c`$
$`
D = b^2 - 4ac
\begin{cases}
\text{2 distinct real solutions}, & \text{if } D > 0 \\
\text{1 real solution}, & \text{if } D = 0 \\
\text{no real solutions}, & \text{if } D < 0
\end{cases}
`$
- <img src="https://image.slidesharecdn.com/thediscriminant-160218001000/95/the-discriminant-5-638.jpg?cb=1455754224" width="500">
## Solving Linear-Quadratic Systems
- To find the point of intersection, do the following:
1. Isolate both equations for $`y`$
2. Set the equations equal to each other by ```subsitution``` Equation 1 = Equation 2
3. Simplify and put everything on one side and equal to zero on the other side
4. Factor
5. Use zero-product property to solve for all possible x-values
6. Subsitute the x-values to one of the original equations to solve for all y-values
7. State a conclusion / the solution
- <img src = "https://lh5.googleusercontent.com/AJxSjT24kwneM_UH6kehfX-7AnzVewTJIk6v02aXOZ84veou2xNyBMPmhGSXWNhvhJfZT-wwHSlDNvbsfeHzjpGSuXMOohoIvaS2u0saoO1BZTRV3xNVobdoWytLhkVl0CkEaIiQ" width ="500">
- There are 3 possible cases
- In addition, to determine the number of solutions, you the Discriminant formula $`D = b^2 - 4ac`$
# Ways to solve Systems of Equations
## 1. Subsitution
- Here we eliminate a variable by subbing in another variable from another equation
- We usually do this method if a variable is easily isolated
- Example:
- ```
y = x + 10 (1)
x + y + 34 = 40 (2)
```
- We can sub $`(1)`$ into $`(2)`$ to find $`x`$, then you the value of $`x`$ we found to solve for $`y`$
```
x + (x + 10) + 34 = 40
2x + 44 = 40
2x = -4
x = -2
```
- Then solve for $`y`$
```
y = -2 + 10
y = -8
```
## 2. Elimination
- Here we eliminate a variable by basically eliminate a variable from an equation
- We usually use this method first when the variables are not easily isolated, then use subsitution to solve
- Example:
- ```
2x + 3y = 10 (1)
4x + 3y = 14 (2)
```
- We can then use elimination
```
4x + 3y = 14
2x + 3y = 10
------------
2x + 0 = 4
x = 2
```
- Then sub the value of $`x`$ into an original equation and solve for $`y`$
```
2(2) + 3y = 10
3y = 6
y = 2
```
## 3. Graphing
- we can rewrite the equations into ```y-intercept form``` and then graph the lines, and see where the lines intersect (P.O.I), and the P.O.I is the solution
## Solving Systems of Linear Inequalities
- Find the intersection region as the ```solution```.
- ## If
- | |Use ```Dash``` line|Use ```Solid line```|
|:-|:------------------|:-------------------|
|Shade the region ```above``` the line|$`y > mx + b`$|$`y \ge mx + b`$|
|Shade the region ```below``` the line|$`y < mx + b`$|$`y \le mx + b`$|
- ## If
- |$`x > a`$ <br> $`x \ge a`$|
|:------------------|
|shade the region on the **right**|
- ## If
- |$`x < a`$ <br> $`x \le a`$|
|:------------------|
|shade the region on the **left**|
- Step 1. change all inequalities to ```y-intercept form```
- Step 2. graph the line
- Step 3. shade the region where all the regions overlap
- <img src="https://www.varsitytutors.com/assets/vt-hotmath-legacy/hotmath_help/topics/graphing-systems-of-linear-inequalities/image3.gif" width="400">
## Tips
- Read the questions carefully and model the system of equations correctly
- Be sure to name your equations
- Label your lines