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Factor by grouping. \( 25 y^{3}+15 y^{2}+15 y+9 \)

Ask by Pena Burton. in the United States
Feb 04,2025

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The expression \(25y^{3}+15y^{2}+15y+9\) factors to \((5y+3)(5y^{2}+3)\).

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Mind Expander

To factor by grouping, we can first group the terms in pairs: \[ (25y^3 + 15y^2) + (15y + 9) \] Now, we factor out the common factors in each group: From the first group \( 25y^3 + 15y^2 \), we can factor out \( 5y^2 \): \[ 5y^2(5y + 3) \] From the second group \( 15y + 9 \), we can factor out \( 3 \): \[ 3(5y + 3) \] Now we have: \[ 5y^2(5y + 3) + 3(5y + 3) \] Since \( (5y + 3) \) is a common factor, we can factor that out as well: \[ (5y + 3)(5y^2 + 3) \] So, the fully factored form is: \[ (5y + 3)(5y^2 + 3) \]

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