# Unit 5: Analytical Geometry and Linear Relations 
- ```Linear Relation```: A relation which a single straight line can be drawn through every data point and the first differences are constant   
- ```Non - Linear Relation```: A single smooth curve can be drawn through every data point and the first differences are not constant   

## Slope and Equation of Line   
- ```Slope```: The measure of the steepness of a line - ```rise / run``` or ```the rate of change```       
- ```Slope Formula```: $`m = \dfrac{y_2 - y_1}{x_2 - x_1}`$    
- ```Standard Form```: $`ax + by + c = 0, a \isin \mathbb{Z}, b \isin \mathbb{Z}, c \isin \mathbb{Z}`$ (must be integers and $`a`$ must be positive)   
- ```Y-intercept Form```: $`y = mx + b`$    
- ```Point-slope Form```: $`y_2-y_1 = m(x_2-x_1)`$   
- The slope of a vertical lines is undefined    
- The slope of a horizontal line is 0
- Parallel lines have the ```same slope```   
- Perpendicular slopes are negative reciprocals    

## Relations
- A relation can be described using   
   1. Table of Values (see below)   
   2. Equations $`(y = 3x + 5)`$   
   3. Graphs (Graphing the equation)    
   4. Words 
- When digging into the earth, the temperature rises according to the
- following linear equation: $`t = 15 + 0.01 h`$. $`t`$ is the increase in temperature in
- degrees and $`h`$ is the depth in meters.

## Perpendicular Lines
- To find the perpendicular slope, you will need to find the slope point   
- Formula: slope1 × slope2 = -1   
- Notation: $`m_\perp`$   
- <img src="https://www.varsitytutors.com/assets/vt-hotmath-legacy/hotmath_help/topics/parallel-perpendicular-lines/parallel_perpendicular_lines_1.gif" width="300">   


## Definitions
- ```Parallel```: 2 lines with the same slope   
- ```Perpendicular```: 2 lines with slopes that are the negative reciprocal to the other. They form a 90 degree angle where they meet.      
- ```Domain```: The **ordered** set of all possible values of the independent variable $`x`$.   
- ```Range```: The **ordered** set of all possible values of the dependent variable $`y`$.   
- ```Continous Data```: A data set that can be broken into smaller parts. This is represented by a ```Solid line```.   
- ```Discrete Data```: A data set that **cannot** be broken into smaller parts. This is represented by a ```Dashed line```.   
- ```First Difference```: the difference between 2 consecutive y values in a table of values which the difference between the x-values are constant.   
- ```Collinear Points```: points that line on the same straight line

## Variables
- ```Independent Variable```: A Variable in a relation which the values can be chosen or isn't affected by anything.   
- ```Dependent Varaible```: A Variable in a relation which is **dependent** on the independent variable.   

## Statistics
- ```Interpolation```: Data **inside** the given data set range.   
- ```Extrapolation```: Data **outside** the data set range.   
- ```Line of Best Fit```: A line that goes through as many points as possible, and the points are the closest on either side of the line,
- and it represents the trend of a graph.   
- ```Coefficient of Correlation```: The value that indicates the strength of two variables in a relation. 1 is the strongest and 0 is the weakest.   
- ```Partial Variation```: A Variation that represents a relation in which one variable is a multiple of the other plus a costant term. 

## Time - Distance Graph
- Time is the independent variable and distance is the dependent variable   
- You can't go backwards on the x-axis, as you can't go back in time   
- Plot the points accordingly   
- Draw the lines accordingly   
- <img src="https://dryuc24b85zbr.cloudfront.net/tes/resources/6061038/image?width=500&height=500&version=1519313844425" width="400">   

**Direction is always referring to:**

 1. ```go towards home```    
 2. ```going away from home```   
 3. ```stop```    

## Scatterplot and Line of Best Fit
- A scatterplot graph is there to show the relation between two variables in a table of values.    
- A line of best fit is a straight line that describes the relation between two variables.    
- If you are drawing a line of best fit, try to use as many data points, have an equal amount of points onto and under the line of best fit, and keep it as a straight line.   
- <img src="https://www.varsitytutors.com/assets/vt-hotmath-legacy/hotmath_help/topics/line%20of%20best%20fit-eyeball/lineofbestfit-e-1.gif" width="300">    

### How To Determine the Equation Of a Line of Best Fit
  1. Find two points **```ON```** the ```line of best fit```
  2. Determine the ```slope``` using the two points
  3. Use ```point-slope form``` to find the equation of the ```line of best fit```

## Table of values
- To find first differences or any points on the line, you can use a ```table of values```

 | y | x |First Difference|
 |:--|:--|:---------------|
 |-1|-2|.....|
 |0|-1|(-1)-(-2) = 1|
|1|0|0 - (-1) = 1|
|2|1|1 - 0 = 1|
|3|2|2 - 1 = 1|
|4|3|3 - 2 = 1|

## Tips
- Label your graph correctly, the scales/scaling and always the ```independent variable``` on the ```x-axis``` and the ```dependent variable``` on ```y-axis```   
- Draw your ```Line of Best Fit``` correctly   
- Read the word problems carefully, and make sure you understand it when graphing things     
- Sometimes its better not to draw the shape, as it might cloud your judgement (personal exprience)   
- Label your lines