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Factor the given polynomial by finding the greatest common monomial factor (or the negativ \[ x^{2}+13 x y \] Answer

Ask by Wright Dunn. in the United States
Feb 20,2025

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Answer

The factored form of \( x^{2}+13xy \) is \( x(x+13y) \).

Solution

Factor the expression \( x^{2}+13x*y \). Factor the expression by following steps: - step0: Factor: \(x^{2}+13xy\) - step1: Rewrite the expression: \(x\times x+x\times 13y\) - step2: Factor the expression: \(x\left(x+13y\right)\) The greatest common monomial factor of the polynomial \(x^{2}+13xy\) is \(x\). Therefore, the factored form of the polynomial is \(x(x+13y)\).

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To factor the polynomial \( x^{2} + 13xy \), we first identify the greatest common factor (GCF) of the two terms. Here, both terms share a common factor of \( x \). Thus, we can factor out \( x \) from the expression: \[ x(x + 13y) \] Now we have factored the polynomial into \( x \) and \( (x + 13y) \). For some extra knowledge, did you know that factoring polynomials is often like breaking down a recipe into its basic ingredients? In mathematics, this helps highlight underlying relationships. When working with polynomials, always look for GCF first! Common mistakes include overlooking negative signs or forgetting to factor out all of the common variables, so double-check for complete factors!

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