How do you multiply $(6 z^{2} - 4 z + 1) (8 - 3 z)$ $(6z^2 - 4z + 1)(8 - 3z)$ ?

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How do you multiply $(6 z^{2} - 4 z + 1) (8 - 3 z)$ $(6z^2 - 4z + 1)(8 - 3z)$ ?

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Answer 1 · 2016-04-14T22:02:01

$- 18 z^{3} + 60 z^{2} - 35 z + 8$ $-18z^3+60z^2-35z+8$

Explanation:

When multiplying polynomials, as we see here, we must distribute everything.

Every term that is in the trinomial $6 z^{2} - 4 z + 1$ $6z^2-4z+1$ must be multiplied individually by both terms in the following binomial $8 - 3 z$ $8-3z$ . Then, all these multiplied terms will be added to one another to form a large polynomial.

Let's break down what we'll multiply:

$"("underbrace(color(green)(6z^2)underbrace(color(blue)(-4z)+underbrace(color(red)1")("8-3z)_(color(red)(1(8-3z))))_color(blue)(-4z(8-3z)))_color(green)(6z^2(8-3z))")"$

So, we see that the $(8-3z)$ term is distributed to each term within $(6z^2-4z+1)$ .

Adding these all together, we see that

$(6z^2-4z+1)(8-3z)=color(green)(6z^2(8-3z))+color(blue)((-4z)(8-3z))+color(red)(1(8-3z)$

Distributing each, we obtain

$=color(green)(48z^2-18z^3)+color(blue)(-32z+12z^2)+color(red)(8-3z)$

Now, to simplify, sort this by degree (combine like terms):

$=-18z^3+underbrace(48z^2+12z^2) _ (48+12=60)underbrace(-32z-3z) _ (-32-3=-35)+8$

$=-18z^3+60z^2-35z+8$

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How do you multiply $(6 z^{2} - 4 z + 1) (8 - 3 z)$ $(6z^2 - 4z + 1)(8 - 3z)$ ?

1 Answer

Explanation:

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How do you multiply (6z^2 - 4z + 1)(8 - 3z)(6z2−4z+1)(8−3z)(6z^2 - 4z + 1)(8 - 3z)?

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How do you multiply $(6 z^{2} - 4 z + 1) (8 - 3 z)$ $(6z^2 - 4z + 1)(8 - 3z)$ ?