How do you determine the end behavior of $f(x)=6-2x+4x^2-5x^3$ ?

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How do you determine the end behavior of $f(x)=6-2x+4x^2-5x^3$ ?

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Answer 1 · 2017-11-02T17:26:16

Opposite tails (up to down as you go from left to right).

Explanation:

First, you have to arrange the polynomial by degree

$-5x^3+4x^2-2x+6$

then you can see that $-5$ is the leading coefficient and that $3$ is the highest degree, these two attributes tell you the end behavior.

The degree tells you if the tails go in opposite directions (odd degree) or the same direction (even degree). $3$ is an odd number so the tails go in the opposite direction, and the function goes from up to down because the leading coefficient is negative $(-5)$ .

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How do you determine the end behavior of $f(x)=6-2x+4x^2-5x^3$ ?

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Explanation:

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How do you determine the end behavior of f(x)=6-2x+4x^2-5x^3f(x)=6-2x+4x^2-5x^3?

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Explanation:

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How do you determine the end behavior of $f(x)=6-2x+4x^2-5x^3$ ?