7.3 Factor quadratic trinomials with leading coefficient other than (Page 2/6)

Elementary algebra Page 2 / 6

Identify the best method to use to factor each polynomial:

ⓐ $a b + a + 4 b + 4$
ⓑ $3 k^{2} + 15$
ⓒ $p^{2} + 9 p + 8$

ⓐ factor using grouping ⓑ no method ⓒ undo using FOIL

Factor trinomials of the form ax ² + bx + c With a gcf

Now that we have organized what we’ve covered so far, we are ready to factor trinomials whose leading coefficient is not 1, trinomials of the form $a x^{2} + b x + c$ .

Remember to always check for a GCF first! Sometimes, after you factor the GCF, the leading coefficient of the trinomial becomes 1 and you can factor it by the methods in the last section. Let’s do a few examples to see how this works.

Watch out for the signs in the next two examples.

Factor completely: $2 n^{2} - 8 n - 42$ .

Solution

Use the preliminary strategy.

$\begin{matrix} Is there a greatest common factor? & 2 n^{2} - 8 n - 42 \\ Yes, GCF = 2. Factor it out. & 2 (n^{2} - 4 n - 21) \\ Inside the parentheses, is it a binomial, trinomial, or are there \\ more than three terms? \\ It is a trinomial whose coefficient is 1, so undo FOIL. & 2 (n) (n) \\ Use 3 and −7 as the last terms of the binomials. & 2 (n + 3) (n - 7) \end{matrix}$

Factors of $−21$	Sum of factors
$1, −21$	$1 + (−21) = −20$
$3, −7$	$3 + (−7) = −4 *$

Check.

$2 (n + 3) (n - 7)$

$2 (n^{2} - 7 n + 3 n - 21)$

$2 (n^{2} - 4 n - 21)$

$2 n^{2} - 8 n - 42 ✓$

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Factor completely: $4 m^{2} - 4 m - 8$ .

$4 (m + 1) (m - 2)$

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Factor completely: $5 k^{2} - 15 k - 50$ .

$5 (k + 2) (k - 5)$

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Factor completely: $4 y^{2} - 36 y + 56$ .

Solution

Use the preliminary strategy.

$\begin{matrix} Is there a greatest common factor? & 4 y^{2} - 36 y + 56 \\ Yes, GCF = 4. Factor it. & 4 (y^{2} - 9 y + 14) \\ Inside the parentheses, is it a binomial, trinomial, or are \\ there more than three terms? \\ It is a trinomial whose coefficient is 1. So undo FOIL. & 4 (y) (y) \\ Use a table like the one below to find two numbers that multiply to \\ 14 and add to −9 . \\ Both factors of 14 must be negative. & 4 (y - 2) (y - 7) \end{matrix}$

Factors of $14$	Sum of factors
$−1, −14$	$−1 + (−14) = −15$
$−2, −7$	$−2 + (−7) = −9 *$

Check.

$4 (y - 2) (y - 7)$

$4 (y^{2} - 7 y - 2 y + 14)$

$4 (y^{2} - 9 y + 14)$

$4 y^{2} - 36 y + 42 ✓$

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Factor completely: $3 r^{2} - 9 r + 6$ .

$3 (r - 1) (r - 2)$

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Factor completely: $2 t^{2} - 10 t + 12$ .

$2 (t - 2) (t - 3)$

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In the next example the GCF will include a variable.

Factor completely: $4 u^{3} + 16 u^{2} - 20 u$ .

Solution

Use the preliminary strategy.

$\begin{matrix} Is there a greatest common factor? & 4 u^{3} + 16 u^{2} - 20 u \\ Yes, GCF = 4 u . Factor it. & 4 u (u^{2} + 4 u - 5) \\ Binomial, trinomial, or more than three terms? \\ It is a trinomial. So “undo FOIL.” & 4 u (u) (u) \\ Use a table like the table below to find two numbers that & 4 u (u - 1) (u + 5) \\ multiply to −5 and add to 4 . \end{matrix}$

Factors of $−5$	Sum of factors
$−1, 5$	$−1 + 5 = 4 *$
$1, −5$	$1 + (−5) = −4$

Check.

$4 u (u - 1) (u + 5)$

$4 u (u^{2} + 5 u - u - 5)$

$4 u (u^{2} + 4 u - 5)$

$4 u^{3} + 16 u^{2} - 20 u ✓$

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Factor completely: $5 x^{3} + 15 x^{2} - 20 x$ .

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

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Factor completely: $6 y^{3} + 18 y^{2} - 60 y$ .

$6 y (y - 2) (y + 5)$

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Factor trinomials using trial and error

What happens when the leading coefficient is not 1 and there is no GCF? There are several methods that can be used to factor these trinomials. First we will use the Trial and Error method.

Let’s factor the trinomial $3 x^{2} + 5 x + 2$ .

From our earlier work we expect this will factor into two binomials.

\begin{matrix} 3 x^{2} + 5 x + 2 \\ () () \end{matrix}

We know the first terms of the binomial factors will multiply to give us $3 x^{2}$ . The only factors of $3 x^{2}$ are $1 x, 3 x$ . We can place them in the binomials.

This figure has the polynomial 3 x^ 2 +5 x +2. Underneath there are two terms, 1 x, and 3 x. Below these are the two factors x and (3 x) being shown multiplied.

Check. Does $1 x \cdot 3 x = 3 x^{2}$ ?

We know the last terms of the binomials will multiply to 2. Since this trinomial has all positive terms, we only need to consider positive factors. The only factors of 2 are 1 and 2. But we now have two cases to consider as it will make a difference if we write 1, 2, or 2, 1.

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Source: OpenStax, Elementary algebra. OpenStax CNX. Jan 18, 2017 Download for free at http://cnx.org/content/col12116/1.2

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7.3 Factor quadratic trinomials with leading coefficient other than (Page 2/6)

Factor trinomials of the form ax 2 + bx + c With a gcf

Solution

Solution

Solution

Factor trinomials using trial and error

Read also:

Get Jobilize Job Search Mobile App in your pocket Now!

Factor trinomials of the form ax ² + bx + c With a gcf