deletions | additions       diff --git a/Predictions.tex b/Predictions.tex  index 1d7d1c8..c86e992 100644  --- a/Predictions.tex  +++ b/Predictions.tex 
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In general for any digit which is $p$ places away form the least significant, if \begin{equation}  (n-p) \; mod \; 4\cdot5^p = k , \; p\in[0,...] p\in[0,...],  \end{equation}  then where $k$ will take ranges from $0$ to $4\codt5^p-1$. Then  the $p^{th}$ least significant digit is $D_p(k\;mod\;4\cdot5^p)$, $D_p(k)$,  that is the $(k\;mod\;4\cdot5^p)^{th}$ $(k)^{th}$  term in the series $D_p$.