What is the standard form of a polynomial $3(x^3-3)(x^2+2x-4)$ ?

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What is the standard form of a polynomial $3(x^3-3)(x^2+2x-4)$ ?

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Answer 1 · 2018-02-10T03:06:15

$3x^5+6x^4-12x^3-9x^2-18x+36$

Explanation:

Polynomials are in standard form when the highest-degree term is first, and the lowest degree term is last. In our case, we just need to distribute and combine like terms:

Start by distributing the $3$ to $x^3-3$ . We multiply and get:

$3x^3-9$

Next, we multiply this by the trinomial $(x^2+2x-4)$ :

$color(red)(3x^3)color (blue)(-9)(x^2+2x-4)$

$=color(red)(3x^3)(x^2+2x-4)color (blue)(-9)(x^2+2x-4)$

$=(3x^5+6x^4-12x^3)- 9x^2-18x+36$

There are no terms to combine, since every term has a different degree, so our answer is:

$3x^5+6x^4-12x^3-9x^2-18x+36$ , a 5th degree polynomial.

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What is the standard form of a polynomial $3(x^3-3)(x^2+2x-4)$ ?

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