To determine which equation corresponds to your problem, we need more context about what the problem actually is. However, if we assume the problem involves solving for \( n \) in relation to an equation involving 8 and the expression \( n + 6 \), then we can analyze the given options based on typical algebraic setups.
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8(2n + 6) = 104: This equation suggests that 8 times the quantity \( 2n + 6 \) equals 104.
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8(n + 6) = 104: This one suggests that 8 times the quantity \( n + 6 \) equals 104.
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2n + 6 = 8: This equation is much simpler and suggests a direct relation between \( 2n + 6 \) and the number 8.
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8 + n + n + 6 = 104: This can be simplified to \( 2n + 14 = 104 \), which is still a different equation.
Without additional context, the best approach to matching an equation would depend on details like whether it's a word problem, an equality to solve, or something else.
If you're looking for an equation where you have something multiplied by a sum to equal a number, the choices of the first two equations might be most relevant.
Let me know if there is specific context or a specific type of problem you're asking about, and I can help narrow it down further!
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