What are the important information needed to graph $y = tan (x + \frac{π}{3})$ $y = tan (x + pi/3)$ ?

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What are the important information needed to graph $y = tan (x + \frac{π}{3})$ $y = tan (x + pi/3)$ ?

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Answer 1 · 2015-11-09T11:21:38

You are changing a function by adding something to its argument, i.e., you're passing from $f (x)$ $f(x)$ to $f (x + k)$ $f(x+k)$ .

This kind of changes affects the graph of the original function in terms of a horizontal shift: if $k$ $k$ is positive, the shift is toward the left, and vice versa if $k$ $k$ is negative, the shift is to the right.

So, since in our case the original function is $f (x) = tan (x)$ $f(x)=tan(x)$ , and $k = \frac{π}{3}$ $k=pi/3$ , we have that the graph of $f (x + k) = tan (x + \frac{π}{3})$ $f(x+k)=tan(x+pi/3)$ is the graph of $tan (x)$ $tan(x)$ , shifted $\frac{π}{3}$ $pi/3$ units to the left.

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What are the important information needed to graph $y = tan (x + \frac{π}{3})$ $y = tan (x + pi/3)$ ?

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What are the important information needed to graph y = tan (x + pi/3) y=tan(x+π3)y = tan (x + pi/3) ?

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What are the important information needed to graph $y = tan (x + \frac{π}{3})$ $y = tan (x + pi/3)$ ?