$\"\"$

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The polynomial is $\"\"$ .

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The GCF of $\"\"$ is $\"\"$ , so factor it out.

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$\"\"$

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In the polynomial $\"\"$ , since the first term $\"\"$ is not a perfect square, this is not a perfect square terminal. $\"\"$

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The general quadratic expression form is $\"\"$ .

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In the above trinomial, $\"\"$ . Since $\"\"$ is negative, so the factors m and p have opposite signs.So either m or p is negative, but not both.

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Since $\"\"$ is positive, the factor with the greater absolute value is also positive.

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You need to find one factor of each pair is negative with a sum of 6 and a product of $\"\"$ .

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Make a list of the factors of $\"\"$ and look for the of factors with the sum of 5.

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$\"\"$

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The correct factors are $\"\"$ . $\"\"$

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Apply the pattern: $\"\"$ .

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$\"\"$ .

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Group terms with common factors.

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$\"\"$

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Factors the GCF from each group.

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$\"\"$

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Apply distributive property: $\"\"$ .

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$\"\"$ $\"\"$

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The factors form of polynomial is $\"\"$ .