deletions | additions       diff --git a/begin_itemize_item_textbf_Show__.tex b/begin_itemize_item_textbf_Show__.tex  index fd05ebb..0e7ba19 100644  --- a/begin_itemize_item_textbf_Show__.tex  +++ b/begin_itemize_item_textbf_Show__.tex 
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  \[2^{\log_{2} (3)} = 3 \]  \[ 2^\frac{p}{q} = 3 \]  \[2^{p} - 2^{q} \[2^{p-q}  = 3\] $\nexists$ two integers for p,q.   \\ Also \[ (2^\frac{p}{q})^q = (3)^q \]  \[ 2^p = 3^q \] 
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\[m^p = n^q\]  $m = a_{1}^{\mu_{1}} , a_{2}^{\mu_{2}}, a_{3}^{\mu_{3}}, a_{i}^{\mu_{i}}$ where $\mu_{i}$ are integers $\ge 1$ and $a_{i}$ are primes.  \\ $n = b_{1}^{v_{1}} , b_{2}^{v_{2}}, b_{3}^{v_{3}}, b_{i}^{v_{i}}$ where $v_{i}$ are integers $\ge 1$ and $b_{i}$ are primes.  \[ m^p - m^q\]  \end{itemize}