Given $f (x) = - 7 x^{2} (2 x - 3) (x^{2} + 1)$ $f(x) = -7x^2(2x-3)(x^2+1)$ how do you determine the following?

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Given $f (x) = - 7 x^{2} (2 x - 3) (x^{2} + 1)$ $f(x) = -7x^2(2x-3)(x^2+1)$ how do you determine the following?

a) The degree of $f (x)$ $f(x)$ .
b) The leading coefficient.
c) The maximum possible number of turning points.
d) The real zeros of $f (x)$ $f(x)$ .
e) The end behaviour of $f (x)$ $f(x)$ as $x \to - \infty$ $x->-oo$
f) The end behaviour of $f (x)$ $f(x)$ as $x \to \infty$ $x->oo$

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Answer 1 · 2017-08-12T06:56:09

a) $5$ $" "5$
b) $- 14$ $" "-14$
c) $4$ $" "4$
d) $0$ $" "0$ of multiplicity $2$ $2$ , $\frac{3}{2}$ $3/2$ of multiplicity $1$ $1$
e) $f (x) \to \infty$ $" "f(x)->oo$ as $x \to - \infty$ $x->-oo$
f) $f (x) \to - \infty$ $" "f(x)->-oo$ as $x \to \infty$ $x->oo$

Explanation:

Given:

$f (x) = - 7 x^{2} (2 x - 3) (x^{2} + 1)$ $f(x) = -7x^2(2x-3)(x^2+1)$

It is not too arduous to multiply out $f (x)$ $f(x)$ fully, but we do not need to in order to answer all of the questions.

In particular, note that the term of highest degree in $f (x)$ $f(x)$ comes from multiplying:

$- 7 x^{2} (2 x) (x^{2}) = - 14 x^{5}$ $-7x^2(2x)(x^2) = -14x^5$

a) The degree of $f$ $f$ is the highest degree of any term, i.e. the degree of $- 14 x^{5}$ $-14x^5$ , which is $5$ $5$ . It is a quintic.

b) The leading coefficient is the coefficient of this term, namely $- 14$ $-14$ .

c) A polynomial of degree $n > 0$ $n > 0$ has at most $n - 1$ $n - 1$ turning points. So our quintic has at most $4$ $4$ turning points.

d) The real zeros of a polynomial correspond to its linear factors. In our example $f (x)$ $f(x)$ has linear factors $x$ $x$ , $x$ $x$ and $(2 x - 3)$ $(2x-3)$ , corresponding to real zeros $0$ $0$ , $0$ $0$ and $\frac{3}{2}$ $3/2$ . The quadratic factor $(x^{2} + 1)$ $(x^2+1)$ will be non-zero for any real value of $x$ $x$ , since $x^{2} \geq 0$ $x^2 >= 0$ for any real value of $x$ $x$ . The coincident zeros for $x = 0$ $x=0$ are described by saying that $f (x)$ $f(x)$ has a zero at $x = 0$ $x=0$ of multiplicity $2$ $2$ . The zero at $x = \frac{3}{2}$ $x=3/2$ has multiplicity $1$ $1$ .

e) As $x \to - \infty$ $x->-oo$ , the behaviour of $f$ $f$ is determined by the leading term $- 14 x^{5}$ $-14x^5$ , which becomes much larger faster than the other terms. Since this term is of odd degree and the coefficient is negative ( $- 14 < 0$ $-14 < 0$ ), $f (x) \to \infty$ $f(x)->oo$ as $x \to - \infty$ $x->-oo$ .

f) As $x \to \infty$ $x->oo$ , the behaviour of $f$ $f$ is dominated by the term of highest degree $- 14 x^{5}$ $-14x^5$ , which becomes large and negative. So $f (x) \to - \infty$ $f(x)->-oo$ as $x \to \infty$ $x->oo$ .

graph{-7x^2(2x-3)(x^2+1) [-5, 5, -25, 25]}

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Given $f (x) = - 7 x^{2} (2 x - 3) (x^{2} + 1)$ $f(x) = -7x^2(2x-3)(x^2+1)$ how do you determine the following?

a) The degree of $f (x)$ $f(x)$ .
b) The leading coefficient.
c) The maximum possible number of turning points.
d) The real zeros of $f (x)$ $f(x)$ .
e) The end behaviour of $f (x)$ $f(x)$ as $x \to - \infty$ $x->-oo$
f) The end behaviour of $f (x)$ $f(x)$ as $x \to \infty$ $x->oo$

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Explanation:

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Given f(x) = -7x^2(2x-3)(x^2+1)f(x)=−7x2(2x−3)(x2+1)f(x) = -7x^2(2x-3)(x^2+1) how do you determine the following?

a) The degree of f(x)f(x)f(x). b) The leading coefficient. c) The maximum possible number of turning points. d) The real zeros of f(x)f(x)f(x). e) The end behaviour of f(x)f(x)f(x) as x->-oox→−∞x->-oo f) The end behaviour of f(x)f(x)f(x) as x->oox→∞x->oo

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Explanation:

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Impact of this question

Given $f (x) = - 7 x^{2} (2 x - 3) (x^{2} + 1)$ $f(x) = -7x^2(2x-3)(x^2+1)$ how do you determine the following?

a) The degree of $f (x)$ $f(x)$ .
b) The leading coefficient.
c) The maximum possible number of turning points.
d) The real zeros of $f (x)$ $f(x)$ .
e) The end behaviour of $f (x)$ $f(x)$ as $x \to - \infty$ $x->-oo$
f) The end behaviour of $f (x)$ $f(x)$ as $x \to \infty$ $x->oo$