SOLUTION: The factoring Strategy
Factor each polynomial completely. If a polynomial is prime, say so.
66. 8b2 + 24b + 18
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Question 167956: The factoring Strategy
Factor each polynomial completely. If a polynomial is prime, say so.
66. 8b2 + 24b + 18
Answer by jim_thompson5910(35256) (Show Source): You can put this solution on YOUR website!
Start with the given expression
Factor out the GCF
Now let's focus on the inner expression
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Looking at the expression , we can see that the first coefficient is , the second coefficient is , and the last term is .
Now multiply the first coefficient by the last term to get .
Now the question is: what two whole numbers multiply to (the previous product) and add to the second coefficient ?
To find these two numbers, we need to list all of the factors of (the previous product).
Factors of :
1,2,3,4,6,9,12,18,36
-1,-2,-3,-4,-6,-9,-12,-18,-36
Note: list the negative of each factor. This will allow us to find all possible combinations.
These factors pair up and multiply to .
1*36
2*18
3*12
4*9
6*6
(-1)*(-36)
(-2)*(-18)
(-3)*(-12)
(-4)*(-9)
(-6)*(-6)
Now let's add up each pair of factors to see if one pair adds to the middle coefficient :
| First Number | Second Number | Sum | | 1 | 36 | 1+36=37 |
| 2 | 18 | 2+18=20 |
| 3 | 12 | 3+12=15 |
| 4 | 9 | 4+9=13 |
| 6 | 6 | 6+6=12 |
| -1 | -36 | -1+(-36)=-37 |
| -2 | -18 | -2+(-18)=-20 |
| -3 | -12 | -3+(-12)=-15 |
| -4 | -9 | -4+(-9)=-13 |
| -6 | -6 | -6+(-6)=-12 |
From the table, we can see that the two numbers and add to (the middle coefficient).
So the two numbers and both multiply to and add to
Now replace the middle term with . Remember, and add to . So this shows us that .
Replace the second term with .
Group the terms into two pairs.
Factor out the GCF from the first group.
Factor out from the second group. The goal of this step is to make the terms in the second parenthesis equal to the terms in the first parenthesis.
Combine like terms. Or factor out the common term
Simplify
------------------------------------------------------------
So our expression goes from and factors further to
------------------
Answer:
So completely factors to
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