How do you find the vertical, horizontal and slant asymptotes of: $y= 2^x$ ?

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How do you find the vertical, horizontal and slant asymptotes of: $y= 2^x$ ?

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Answer 1 · 2017-12-18T16:05:05

This function has one asymptote at $y=0$ .

Explanation:

Any function of the form $y=n^x$ , where $n$ is some number, has a horizontal asymptote where $y=0$ because you can't raise a number to any power that will make that original number negative. Like, there is no $x$ that exists that could make $n^x$ a negative number.

Exponential functions have infinite domains, because there is no number you can put in for $x$ that would make $y=2^x$ not equal to a real number.
Since there are no $y$ -values where the function can't exist, there is no horizontal or slant asymptote.

Note: You can also get the $y$ -intercept by plugging $0$ in for $x$ :
$y=2^0=1$ , so the $y$ -intercept is at $(0,1)$ .
Here's the graph:
enter image source here

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How do you find the vertical, horizontal and slant asymptotes of: $y= 2^x$ ?

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