This question is inspired by the question on memory leaks in *Mathematica* due to internal caching of results of intermediate computations. All these things are undocumented but are important for anyone who runs memory-intensive computations.

When trying to understand the logic of the internal caching mechanism I found something interesting. Consider the following:

```
$HistoryLength = 0;
(*dummy command for loading of the Root package*)
Root[# &, 1];
d = 13;
f[z_, i_] := Sum[(2 Mod[Floor[(i - 1)/2^k], 2] - 1) z^(d - k), {k, 0, d}];
(memLog = Flatten[
Table[Root[f[z, i], j]; {SessionTime[], MemoryInUse[]/1024.^2}, {j, 1,
d}, {i, 1, 2^d}], 1];) // Timing
pl1 = ListLinePlot[memLog,
FrameLabel -> {"SessionTime, sec", "MemoryInUse, Mb"}, PlotRange -> All,
Frame -> True, Axes -> False]
pl2 = ListLinePlot[memLog[[All, 2]],
FrameLabel -> {"Point", "MemoryInUse, Mb"}, PlotRange -> All, Frame -> True,
Axes -> False]
```

In **fresh** kernel session the output on my machine (*Mathematica* 7.0.1 for Windows) is always as follows:

Can anyone explain why there is a break of the curve near the point number 8400?

withthe source code right under your nose) is an oracle's job. From Wikipedia:Oracles were thought to be portals through which the gods spoke directly to man.– belisarius Jul 25 '11 at 2:32scientific approachfor investigation of black boxes. – Alexey Popkov Jul 25 '11 at 5:54logical, while software ... – belisarius Jul 25 '11 at 16:55models. You know, a model is not anexplanation, but just a rational approach useful to formulatepredictions. A question like "why there is a break of the curve near the point number 8400" is more engineering than science. To be able to answer, you have to understand the internals of the system. Answers like the excellent one by Sjoerd below are models, and you can use them until a better model comes up ... – belisarius Jul 25 '11 at 21:23