`tan(x) = sin(x) / cos(x)`, but when you expand out the definitions of sin and cos with the same right angle triangle, you have `(opposite / hypotenuse) / (adjacent / hypotenuse)` or simplified, `opposite / adjacent` , which is the ratio of the lengths of the two non-diagonal lines in a right-angle triangle. Take a step back and look at that… the tangent function basically converts between angles (degrees) and slope (the mathematical graph concept, and what a derivative calculates).
Examples:
`tan(0 degrees) = 0` which is correct for a flat line
`tan(45 degrees) = 1`which is correct for a straight diagonal line moving upwards.
`tan(90 degrees)` does not exist, which is correct because a vertical line has no slope.
etc.
tan^-1 (2) = 63.4 degrees which, when drawn, should look right for a slope of 2.
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