(mn)^2×m^3×n^4/m×(mn)^3​

To simplify the expression $(mn)^2 \cdot m^3 \cdot n^4 / (m \cdot (mn)^3)$, you can follow these steps:

1. Simplify each term within the parentheses: $(mn)^2 = m^2 \cdot n^2$ $(mn)^3 = m^3 \cdot n^3$

2. Rewrite the expression with these simplified terms: $\frac{m^2 \cdot n^2 \cdot m^3 \cdot n^4}{m \cdot (m^3 \cdot n^3)}$

3. Cancel out common factors in the numerator and denominator:

   • In the numerator, you can cancel $m$ in $m^2$ with $m$ in the denominator, leaving $m$ in the numerator.
   • Similarly, you can cancel $m^3$ in the denominator with $m^3$ in the numerator, leaving 1 in the denominator.
   • You can also cancel $n^2$ in the numerator with $n^3$ in the denominator, leaving $n$ in the denominator.

The simplified expression is now: $m \cdot n$

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