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Fred is \\[\(4\)\\] times as old as Nathan and is also \\[\(27\)\\] years older than Nathan. Let \\[f\\] be Fred's age and let \\[n\\] be Nathan's age. Which system of equations represents this situation? Choose \(1\) answer: Choose \(1\) answer:\(\newline\)(Choice A) \\[\begin{cases} n=\(4\)f \\\\ n=f+\(27\) \end{cases}\\] A \\[\begin{cases} n=\(4\)f \\\\ n=f+\(27\) \end{cases}\\]\(\newline\)(Choice B) \\[\begin{cases} \(4\)f=n \\\\ f=n+\(27\) \end{cases}\\] B \\[\begin{cases} \(4\)f=n \\\\ f=n+\(27\) \end{cases}\\]\(\newline\)(Choice C) \\[\begin{cases} f=\(4\)n \\\\ f=n+\(27\) \end{cases}\\] C \\[\begin{cases} f=\(4\)n \\\\ f=n+\(27\) \end{cases}\\]\(\newline\)(Choice D) \\[\begin{cases} f=\(4\)n \\\\ f=n\(-27\) \end{cases}\\] D \\[\begin{cases} f=\(4\)n \\\\ f=n\(-27\) \end{cases}\\]

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