If we didn't know what the number 6711 looks like we could at least determine what its last two digits were by replacing the divisor B in the above with 100. When we do this the program calculates the remainder as 83 as expected.
The program is surprisingly fast even for what are very large numbers. For example 67617 is the 1,127 digit number (from WolframAlpha)
48770057363439563967134348355325038065481286153662007642823470550486
71980560027835524800048781488164580806474123084454431777128171666866
18607377904496236891798400886042117666614291800426648265371610864835
40929572898386140596732260223574328368309073158031647754279482918284
65663724881612657390133487402742747112192939724971784183405095503257
69918877553469511522677242675385108662437741711997020059606722804142
09675268052772569724085754968798539106891583795237329222561781805522
85062589820240643630480393850097329533051647302120862011637881575053
71309698184194685080288379701970330799370917504675997998122640686686
98423317552437389277363219335647530610628399241914162225364781445082
70644504402991235669883493855155234017024331172877674569648340943127
70360444117552920156878524196353157664201104105212692362637491637938
54079014668035647988158392840059044333758548155163870985659977545610
52000559917423988628809593315580421167977682921477636773152575740312
22156667453352073011960706603866023551139632454252812187342672444656
55949111316392732278972914732349074457742403565481714331119758806068
559399641911405354923544154126627269027
However, using the fx-50F program we can determine that the last digit of this number is 7 in only a few seconds (this is 67617mod 10).
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