Trigonometry (11th Edition) Clone

RECALL: (1) The period of the function $y=\tan{(bx)}$ is $\frac{\pi}{b}$. (2) The consecutive vertical asymptotes of the function $y=\tan{x}$, whose period is $\pi$, are $x=-\frac{\pi}{2}$ and $x=\frac{\pi}{2}$. Thus, with $b=\frac{1}{4}$, the period of the given function is $\frac{\pi}{\frac{1}{4}}=4\pi$. Consecutive vertical asymptotes of the given function are $x=-2\pi$ and $2\pi$. This means that one period of the given function is in the interval $[-2\pi, 2\pi]$. Dividing this interval into four equal parts give the key x-values: $-\pi, 0, \pi$. To graph the given function, perform the following steps: (1) Create a table of values for the given function using the key x-values listed above. (Refer to the attached image table below.) (2) Graph the consecutive vertical asymptotes. (3) Plot each point from the table then connect them using a smooth curve, making sure that the curves are asymptotic with the lines in Step (2) above. Refer to the graph in the answer part above.