What are the important information needed to graph $y = tan (2 x)$ $y=tan(2x)$ ?

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What are the important information needed to graph $y = tan (2 x)$ $y=tan(2x)$ ?

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Answer 1 · 2016-05-17T14:02:40

Please see below.

Explanation:

A typical graph of $tan x$ $tanx$ has domain for all values of $x$ $x$ except at $(2 n + 1) \frac{π}{2}$ $(2n+1)pi/2$ , where $n$ $n$ is an integer (we have asymptotes too here) and range is from $[- \infty, \infty]$ $[-oo,oo]$ and there is no limiting (unlike other trigonometric functions other than tan and cot). It appears like graph{tan(x) [-5, 5, -5, 5]}

The period of $tan x$ $tanx$ is $π$ $pi$ (i.e. it repeats after every $π$ $pi$ ) and that of $tan a x$ $tanax$ is $\frac{π}{a}$ $pi/a$ and hence for $tan 2 x$ $tan2x$ period will be $\frac{π}{2}$ $pi/2$

Hencem the asymptotes for $tan 2 x$ $tan2x$ will be at each $(2 n + 1) \frac{π}{4}$ $(2n+1)pi/4$ , where $n$ $n$ is an integer.

As the function is simply $tan 2 x$ $tan2x$ , there is no phase shift involved (it is there only if function is of the type $tan (n x + k)$ $tan(nx+k)$ , where $k$ $k$ is a constant. Phase shift causes graph pattern to shift horizontally to left or right.

The graph of $tan 2 x$ $tan2x$ appears like graph{tan(2x) [-5, 5, -5, 5]}

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What are the important information needed to graph $y = tan (2 x)$ $y=tan(2x)$ ?

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Science

Math

Humanities

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What are the important information needed to graph y=tan(2x)y=tan(2x)?

1 Answer

Explanation:

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What are the important information needed to graph $y = tan (2 x)$ $y=tan(2x)$ ?