vault backup: 2023-12-13 14:03:19

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# Notes
## Composition of functions
For $(f\circ g)(x)$ for two sets, you look for $x$ from $f$ and an equivalent $y$ value from $g$, and leftover coordinates are the answer. The order of $f$ and $g$ does matter.
# Formulae
The general equation for a circle:
$$ (x - h)^2 + (y - k)^2 =r $$
Distance formula:
$$ \sqrt{(x_2-x_1)^2 + (y_2-y_1)^2} $$
Midpoint foruma:
$$ (\frac{x_1 + x_2}{2}, \frac{y_1 + y_2}{2}) $$
Adding functions:
$$ (f + g)(x) = f(x) + g(x) $$
Multiplying functions:
$$ (f*g)(x)=f(g(x)) $$
# Examples
Given the function $f = \{(0, 2), (3, -1), (5, 4), (2, 1)\}$, and $g=\{(2, 0), (3, -1), (4, -2), (5, 2)\}$, and applying $(f+g(x)$, If the same $x$ value exists in both the sets $f$ and $g$, then you can solve for that value by adding $y$ values for the matching x coordinates together.
# Terminology
| Term | Definition |
|--|--|
| $h$ | How far left or right something is shifted from the origin |
| $k$| How far up or down something is shifted from the origin |
| $r$ | The radius of a circle |

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## Scatter Diagrams ## Scatter Diagrams
A scatter diagram or scatter plot shows the relationship between two variables. One variable is on the X axis, the other on the Y axis. A scatter diagram or scatter plot shows the relationship between two variables. One variable is on the X axis, the other on the Y axis.
### Association ### Association
- Positive association is demonstrated when the dots are trend upward as `x` increases. - Positive association is demonstrated when the dots are trend upward as $x$ increases.
- Negative association is demonstrated when the the dots trend downward as `x` increases. - Negative association is demonstrated when the the dots trend downward as $x$ increases.
- Strong association is demonstrated when dots are clustered tightly together along a line. - Strong association is demonstrated when dots are clustered tightly together along a line.
- Weak association is demonstrated when dots are not clustered tightly. - Weak association is demonstrated when dots are not clustered tightly.
## Correlation ## Correlation
Correlation is between `-1` and `1`. Correlation near 1 means tight clustering, and correlation near 0 means loose clustering. Correlation is between `-1` and `1`. Correlation near 1 means tight clustering, and correlation near 0 means loose clustering. $r$ is -1 if the points are on a line with negative slope, $r$ is positive 1 if the points are on a line with a positive slope. As $|r|$ gets closer to 1, the line points cluster more tightly around a line.
# Terminology # Terminology
| Term | Definition | | Term | Definition |
| `r` | Correlation Coefficient | | -- | -- |
| $r$ | Correlation Coefficient |
| Linear Correlation | Measures the strength of a line |