Write a polynomial $$ f(x) $$ that meets the given conditions. Answers may vary. Degree 3 polynomial with zeros 1,5 , and -4 . $$ f(x)=\square $$

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We first note that a degree 3 polynomial with zeros $$ 1 $$, $$ 5 $$, and $$ -4 $$ can be written in factored form as

$$
f(x)=a(x-1)(x-5)(x+4)
$$

where $$ a $$ is a constant (usually chosen as $$ a=1 $$ for simplicity).

Choosing $$ a=1 $$, we have

$$
f(x)=(x-1)(x-5)(x+4)
$$

To expand, we first multiply two factors:

$$
(x-1)(x-5)=x^2-6x+5
$$

Next, multiplying by the third factor:

$$
f(x)=(x^2-6x+5)(x+4)
$$

Multiply term by term:

$$
\begin{aligned}
x^2\cdot x &= x^3, \
x^2\cdot 4 &= 4x^2, \
-6x\cdot x &= -6x^2, \
-6x\cdot 4 &= -24x, \
5\cdot x &= 5x, \
5\cdot 4 &= 20.
\end{aligned}
$$

Now combine like terms:

$$
x^3+(4x^2-6x^2)+(-24x+5x)+20 = x^3-2x^2-19x+20
$$

Thus, one possible polynomial is

$$
f(x)=(x-1)(x-5)(x+4)=x^3-2x^2-19x+20.
$$
One possible polynomial is $$ f(x) = x^3 - 2x^2 - 19x + 20 $$.

Write a polynomial \( f(x) \) that meets the given conditions. Answers may vary. Degree 3 polynomial with zeros 1,5 , and -4 . \( f(x)=\square \)

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