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Makkasi · Answer 1 · 2022-04-10T05:26:42+0000

Answer:

$x \to +\infty$ ,
$f(x) \to +\infty$ and
$x \to -\infty$ ,
$f(x) \to -\infty$ .

Explanation:

A polynomial is an algebraic function of the form:

$y = \Sigma_(i=0)^(n)c_(i)\cdot x^(i)$ (1)

Where:

c_(i) - i-th Coefficient.

x^(i) - i-th Power.

- Grade of the polynomial.

- Dependent variable.

Mathematically speaking, polynomials are unbounded functions, and from graphic we notice that polynomial is of order 3 due to the fact that function pass through the x axis three times, where each point is a root of the polynomial.

Then, we may conclude that:

(i)
$\lim_(n \to +\infty) f(x) = N.E.$

(ii)
$\lim_(n \to - \infty) f(x) = N.E.$

Then, the right answer is:
$x \to +\infty$ ,
$f(x) \to +\infty$ and
$x \to -\infty$ ,
$f(x) \to -\infty$ .

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