How do you factor the trinomial $32 z^{5} - 20 z^{4} - 12 z^{3}$ $32z^5-20z^4-12z^3$ ?

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How do you factor the trinomial $32 z^{5} - 20 z^{4} - 12 z^{3}$ $32z^5-20z^4-12z^3$ ?

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Answer 1 · 2015-11-21T11:57:39

$32 z^{5} - 20 z^{4} - 12 z^{3} = 4 z^{3} (z - 1) (8 z + 3)$ $32z^5 - 20z^4 - 12z^3 = 4z^3(z-1)(8z+3)$

Explanation:

Noting that each term has a factor of $z^{3}$ $z^3$ and that the greatest common divisor of $32$ $32$ , $20$ $20$ , and $12$ $12$ is $4$ $4$ , we may first factor those out to obtain

$32 z^{5} - 20 z^{4} - 12 z^{3} = 4 z^{3} (8 z^{2} - 5 z - 3)$ $32z^5 - 20z^4 - 12z^3 = 4z^3(8z^2 - 5z - 3)$

Next, we can check to see how to factor $8 z^{2} - 5 z - 3$ $8z^2 - 5z - 3$ .
As $z = 1 \Rightarrow 8 z^{2} - 5 z - 3 = 0$ $z = 1 => 8z^2 - 5z - 3 = 0$ we know that $(z - 1)$ $(z - 1)$ will be a factor. So all we need is to figure out what $a$ $a$ and $b$ $b$ gives us
$(z - 1) (a z + b) = 8 z^{2} - 5 z - 3$ $(z-1)(az+b) = 8z^2 - 5z - 3$ .

Because $z \cdot a z = 8 z^{2}$ $z * az = 8z^2$ we can tell that $a = 8$ $a = 8$ .
Because $- 1 \cdot b = - 3$ $-1*b = -3$ we can tell that $b = 3$ $b = 3$ .

So $(z - 1) (8 z + 3) = 8 z^{2} - 5 z - 3$ $(z-1)(8z+3) = 8z^2 - 5z - 3$ .

Substituting this back in gives our final result:

$32 z^{5} - 20 z^{4} - 12 z^{3} = 4 z^{3} (z - 1) (8 z + 3)$ $32z^5 - 20z^4 - 12z^3 = 4z^3(z-1)(8z+3)$

Answer 2 · 2015-11-21T12:03:09

$4 z^{3} (8 z + 3) (z - 1)$ $4z^3(8z+3)(z-1)$

Explanation:

$S t e p 1$ $color(blue)(Step 1)$
Are we able to turn this partly into a quadratic form?
Yes if we factor out as many $z's$ as possible. We can also factor out 4.

Write as: $4z^3(8z^2 -5z-3)$

~~~~~~~~~~~~~~~~~~~~~~~~~~~~
$color(blue)(Step 2)$

Consider just the brackets
We know that the product of 2 numbers give us the -3.
We also know that the product of 2 numbers give us the 8 in $color(white)(.)8z^2$

Factors of 8 $->{1,8} , {2,4}$
Factors of 3 $->{1,3}$

As there are only 2 factors of three we are safe in writing:
$4z( ? .. 1)(?.. 3)$

Now consider the factors of 8
Suppose we used {2,4}

$color(brown)(Try color(white)(.) 1)$

$(2...1)(4...3) -> (2 times 3) +-(1 times 4) != 5 color(white)(..) color(red)("Fail!")$

$color(brown)(Try color(white)(.) 2)$

$(2...3)(4...1) -> (2 times 4) -(3 times 1) = 5 color(white)(..) color(red)("Fail!")$ we need -5

$color(brown)(Try color(white)(.) 3)$

$(8z +3 )(z -1 ) = 8z^2 +3z-8z-3color(white)(..) color(green)("Works!")$

$color(blue)("Putting it all together")$

$color(green)(4z^3(8z+3)(z-1)) =4z^3(8z^2-5z-3) =32z^5 -20z^4-12z^3$

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How do you factor the trinomial $32 z^{5} - 20 z^{4} - 12 z^{3}$ $32z^5-20z^4-12z^3$ ?

2 Answers

Explanation:

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How do you factor the trinomial 32z^5-20z^4-12z^332z5−20z4−12z332z^5-20z^4-12z^3?

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How do you factor the trinomial $32 z^{5} - 20 z^{4} - 12 z^{3}$ $32z^5-20z^4-12z^3$ ?