How do you find the domain and range of $x^5-2x^3+1$ ?

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Answer 1 · 2016-04-30T10:20:09

The domain and range are both the whole of $RR$ , i.e. $(-oo, oo)$

Any polynomial $f(x)$ in $x$ is well defined for all $x in RR$ , so the domain is $RR$ .

For any polynomial $f(x)$ , as $x$ gets larger, the term with highest degree tends to dominate.

So if $f(x)$ is of odd degree with positive leading coefficient (as in our example), then:

Polynomials are also continuous (no breaks in the graph).

As a result, the graph of $f(x)$ will intersect any horizontal line - that is, given any $y in RR$ , there is an $x in RR$ for which $f(x) = y$ .

Hence the range is also the whole of $RR$ .

graph{(x^5-2x^3+1-y)(y - 3.2) = 0 [-10, 10, -5, 5]}

How do you find the domain and range of x^5-2x^3+1x^5-2x^3+1?