How do you find the end behavior of $f (x) = {(x + 1)}^{2} (x - 1)$ $f(x) = (x+1)^2(x-1)$ ?

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How do you find the end behavior of $f (x) = {(x + 1)}^{2} (x - 1)$ $f(x) = (x+1)^2(x-1)$ ?

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Answer 1 · 2015-12-30T07:01:54

as $x \to - \infty, f (x) \to - \infty$ $xrarr-oo,f(x)rarr-oo$ ; as $x \to + \infty, f (x) \to + \infty$ $xrarr+oo,f(x)rarr+oo$

Explanation:

The degree of the polynomial is $3$ $3$ , an odd number.

Since the degree is odd, you know that $f (x)$ $f(x)$ will approach both $- \infty$ $-oo$ and $+ \infty$ $+oo$ . In other words, it will end going in different directions—either "up" or "down."

Look at the mother functions:

$f (x) = x^{1}$ $f(x)=x^1$ (odd)
as $x \to - \infty, f (x) \to - \infty$ $xrarr-oo,f(x)rarr-oo$ ; as $x \to + \infty, f (x) \to + \infty$ $xrarr+oo,f(x)rarr+oo$
graph{x [-10, 10, -5, 5]}

$f (x) = x^{2}$ $f(x)=x^2$ (even)
as $x \to - \infty, f (x) \to + \infty$ $xrarr-oo,f(x)rarr+oo$ ; as $x \to + \infty, f (x) \to + \infty$ $xrarr+oo,f(x)rarr+oo$
graph{x^2 [-10, 10, -5, 5]}

$f (x) = x^{3}$ $f(x)=x^3$ (odd)
as $x \to - \infty, f (x) \to - \infty$ $xrarr-oo,f(x)rarr-oo$ ; as $x \to + \infty, f (x) \to + \infty$ $xrarr+oo,f(x)rarr+oo$
graph{x^3 [-10, 10, -5, 5]}

$f (x) = x^{4}$ $f(x)=x^4$ (even)
as $x \to - \infty, f (x) \to + \infty$ $xrarr-oo,f(x)rarr+oo$ ; as $x \to + \infty, f (x) \to + \infty$ $xrarr+oo,f(x)rarr+oo$
graph{x^4 [-10, 10, -5, 5]}

Let's examine a cubic: if we change the sign of the first term, what happens?

$f (x) = - x^{3}$ $f(x)=-x^3$
as $x \to - \infty, f (x) \to + \infty$ $xrarr-oo,f(x)rarr+oo$ ; as $x \to + \infty, f (x) \to - \infty$ $xrarr+oo,f(x)rarr-oo$
graph{-x^3 [-10, 10, -5, 5]}

However, in our case, we know that the leading term will be positive, so the graph will start "down" and then go "up".

Its end behavior:
as $x \to - \infty, f (x) \to - \infty$ $xrarr-oo,f(x)rarr-oo$ ; as $x \to + \infty, f (x) \to + \infty$ $xrarr+oo,f(x)rarr+oo$

We can check on a graph:

$f (x) = {(x + 1)}^{2} (x - 1)$ $f(x)=(x+1)^2(x-1)$
graph{(x+1)^2(x-1) [-10, 10, -5, 5]}

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How do you find the end behavior of $f (x) = {(x + 1)}^{2} (x - 1)$ $f(x) = (x+1)^2(x-1)$ ?

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How do you find the end behavior of f(x) = (x+1)^2(x-1) f(x)=(x+1)2(x−1) f(x) = (x+1)^2(x-1) ?

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How do you find the end behavior of $f (x) = {(x + 1)}^{2} (x - 1)$ $f(x) = (x+1)^2(x-1)$ ?