For each expression, simplify if possible. If applicable, click on "Cannot be simplified", $$ \frac{2 u+3}{3 u+2}=\square $$ $$ \frac{4-3 u}{3 u-4}-\square $$

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1. Consider the expression
   $$
   \frac{2u+3}{3u+2}.
   $$
   Neither the numerator $$2u+3$$ nor the denominator $$3u+2$$ have a common factor, so the expression cannot be simplified further.

2. Now, look at
   $$
   \frac{4-3u}{3u-4}.
   $$
   Notice that the numerator can be rewritten as:
   $$
   4-3u = -(3u-4).
   $$
   Substituting this into the fraction gives:
   $$
   \frac{4-3u}{3u-4} = \frac{-(3u-4)}{3u-4} = -1.
   $$
1. The expression $$ \frac{2u+3}{3u+2} $$ cannot be simplified further. 2. The expression $$ \frac{4-3u}{3u-4} $$ simplifies to $$-1$$.

For each expression, simplify if possible. If applicable, click on "Cannot be simplified", \( \frac{2 u+3}{3 u+2}=\square \) \( \frac{4-3 u}{3 u-4}-\square \)

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