Multiple Choice
Write the following difference of squares as a product of two binomials.
7. Factoring
Factoring Special Products
Multiple Choice
Factor completely. Hint: Factor out the GCF first.
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Verified step by step guidance1
Identify the general form of a perfect square trinomial, which is either \(a^{2} + 2ab + b^{2}\) or \(a^{2} - 2ab + b^{2}\). These can be factored as \((a + b)^{2}\) or \((a - b)^{2}\) respectively.
Look at the given trinomial and determine if it fits the pattern of a perfect square trinomial by checking if the first and last terms are perfect squares and if the middle term is twice the product of the square roots of the first and last terms.
Express the first and last terms as squares, for example, write \(x^{2}\) as \((x)^{2}\) and \$9\( as \)(3)^{2}$.
Check if the middle term matches \$2ab\( or \)-2ab\( where \)a\( and \)b$ are the square roots found in the previous step. This confirms the trinomial is a perfect square.
Write the factored form as \((a + b)^{2}\) if the middle term is positive, or \((a - b)^{2}\) if the middle term is negative.
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