![A graph of sine and cosine](./assets/graphsincos.png) Given the above graph: - At the origin, $sin(x) = 0$ and $cos(x) = 1$ - A full wavelength takes $2\pi$ # Manipulation | Formula | Movement | | ---------------- | ---------------------------------- | | $y = cos(x) - 1$ | Vertical shift down by 1 | | $y = 2cos(x)$ | Vertical stretch by a factor of 2 | | $y = -cos(x)$ | Flip over x axis | | $y = cos(2x)$ | Horizontal shrink by a factor of 2 | # Periodic Functions A function is considered periodic if it repeats itself at even intervals, where each interval is a complete cycle, referred to as a *period*. # Sinusoidal Functions A function that has the same shape as a sine or cosine wave is known as a sinusoidal function. There are 4 general functions: | $$A * sin(B*x - C) + D$$ | $a$ | | ------------------------ | --- | | Variable | Meaning | | -------- | --------------------------------------------------------------------------------------------- | | $A$ | The amplitude of a function can be found by taking $\|A\|$. The sign flips it over the x axis | | $B$ | Horizontal, or phase | $$ y = A * \sin(B(x-\frac{C}{B})) $$