Additional raw data was listed on lines G5, G6/H32, G14, G15, G16, G17/H33 and G18/H34, as follows: Chace and Shute had noted the Reisner Papyrus division by 10 method, also applied in the RMP.
Other additive scholars have also muddled the reading the first 6 problems of the Rhind Mathematical Papyrus, missing its use of quotient and remainders.
Gillings, Chace and Shute apparently had not analyzed the RMP data in a broader context, and reported its older structure, thereby missing a major fragment of Akhmim Wooden Tablet and Reisner Papyrus remainder arithmetic.
That is, Gillings' citation in the Reisner and RMP documented in the "Mathematics in the Time of the Pharaohs" only scratched the surface of scribal arithmetic.
Had scholars dug a little deeper, academics may have found 80 years ago other reasons for the Reisner Papyrus 39/10 error.
Gillings may have forgotten to summarize his findings in a rigorous manner, showing that several Middle Kingdom texts had used quotients and remainders.
Seen in a broader sense the Reisner Papyrus data should be noted as: such that: with 9/10 being converted to a unit fraction series following rules set down in the AWT, and followed in RMP and other texts.
The modern looking remainder arithmetic was later found by others by taking a broader view of the 39/10 error, as corrected as the actual Eastern Chapel data reports.