To subtract the fractions \( \frac{7}{4}m \) and \( \frac{4}{3}m \), we first need a common denominator.
The denominators are 4 and 3. The least common multiple of 4 and 3 is 12.
Now, we can convert each fraction to have the denominator of 12:
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Convert \( \frac{7}{4}m \) to twelfths: \[ \frac{7}{4}m = \frac{7 \times 3}{4 \times 3}m = \frac{21}{12}m \]
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Convert \( \frac{4}{3}m \) to twelfths: \[ \frac{4}{3}m = \frac{4 \times 4}{3 \times 4}m = \frac{16}{12}m \]
Now, we can subtract the two fractions: \[ \frac{21}{12}m - \frac{16}{12}m = \frac{21 - 16}{12}m = \frac{5}{12}m \]
So, the difference in simplest form is: \[ \frac{5}{12}m \]