Final answer:
The inequality is solved by distributing the negative across the parentheses, combining like terms, and isolating y to find that y must be greater than or equal to 5.
Step-by-step explanation:
To solve the inequality 13 ≤ -2(y - 4) + 3y, we can follow these steps:
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- Distribute the -2 across the parentheses: 13 ≤ -2y + 8 + 3y.
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- Combine like terms: 13 ≤ y + 8.
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- Subtract 8 from both sides to isolate y: 5 ≤ y or y ≥ 5.
This means y must be greater than or equal to 5 to satisfy the inequality.