#-------------------------------------------------------------------------------
# Copyright 2012 Yuriy Lagodiuk
# 
# Licensed under the Apache License, Version 2.0 (the "License");
# you may not use this file except in compliance with the License.
# You may obtain a copy of the License at
# 
#   http://www.apache.org/licenses/LICENSE-2.0
# 
# Unless required by applicable law or agreed to in writing, software
# distributed under the License is distributed on an "AS IS" BASIS,
# WITHOUT WARRANTIES OR CONDITIONS OF ANY KIND, either express or implied.
# See the License for the specific language governing permissions and
# limitations under the License.
#-------------------------------------------------------------------------------
Start time is: Thu Dec 20 02:14:58 EET 2012

f(x) = (x * (-0.03497647400759352))
1 	 12.569697409104204

f(x) = (0.03206375777473447 - (x / 17.859742523423733))
2 	 12.45310280520347

f(x) = (0.03206375777473447 / (x / 3.983422951936845))
3 	 12.152068113028749
4 	 12.152068113028749

f(x) = (0.16410654890797227 - ((2.0299865145513394 ^ x) / 27.160308551872905))
5 	 11.458518951142699
6 	 11.458518951142699

f(x) = ((-0.08190782796508467) - ((x * 0.3250906200640813) * ((0.5612667000580951 ^ x) / 25.142726236353084)))
7 	 10.658531610257057

f(x) = ((-0.1820149022978066) - ((x * 0.09015777715283968) * ((0.4280416776009639 ^ x) / 21.065084851380853)))
8 	 10.516453362951314

f(x) = ((-0.01503108962299926) - ((x * (-24.265371409776968)) * (((0.7310665285787377 ^ x) ^ x) / 19.010083617783746)))
9 	 5.926306763301507

f(x) = (0.033809751868219884 - ((x * (-22.683745105291987)) * (((0.7310665285787377 ^ x) ^ x) / 17.834566430135432)))
10 	 5.855312350773518

f(x) = (0.033809751868219884 - ((x * (-22.683745105291987)) * (((0.7310665285787377 ^ x) ^ x) / 17.79616422156097)))
11 	 5.855294223104098
12 	 5.855294223104098

f(x) = (0.033809751868219884 - ((x * (-23.19192196847812)) * (((0.717967820948241 ^ x) ^ x) / 17.386188149870783)))
13 	 5.836810741669103

f(x) = (0.033809751868219884 - ((x * (-21.669518751123967)) * (((0.717967820948241 ^ x) ^ x) / 16.287254620910687)))
14 	 5.836761497328263
15 	 5.836761497328263

f(x) = (0.038546517497714206 - ((x * (-21.669518751123967)) * (((0.717967820948241 ^ x) ^ x) / 16.287254620910687)))
16 	 5.836229539440452
17 	 5.836229539440452

f(x) = (0.03843417466089871 - ((x * (-21.669518751123967)) * (((0.717967820948241 ^ x) ^ x) / 16.287254620910687)))
18 	 5.836229167974826
19 	 5.836229167974826
20 	 5.836229167974826
21 	 5.836229167974826
22 	 5.836229167974826
23 	 5.836229167974826
24 	 5.836229167974826
25 	 5.836229167974826
26 	 5.836229167974826
27 	 5.836229167974826
28 	 5.836229167974826
29 	 5.836229167974826
30 	 5.836229167974826
31 	 5.836229167974826
32 	 5.836229167974826
33 	 5.836229167974826
34 	 5.836229167974826
35 	 5.836229167974826
36 	 5.836229167974826

f(x) = (0.03843417466089871 - ((x * (-21.669518751123967)) * (((0.7175444245047398 ^ x) ^ x) / 16.26151878069896)))
37 	 5.836200483976189
38 	 5.836200483976189
39 	 5.836200483976189

f(x) = (0.03843417466089871 - ((x * (-21.669518751123967)) * (((0.7175444245047398 ^ x) ^ x) / 16.262705747349774)))
40 	 5.836200268757786
41 	 5.836200268757786
42 	 5.836200268757786
43 	 5.836200268757786

f(x) = (0.03843417466089871 - ((x * (-21.662524193965517)) * (((0.7175444245047398 ^ x) ^ x) / 16.262705747349774)))
44 	 5.83620024612793
45 	 5.83620024612793
46 	 5.83620024612793
47 	 5.83620024612793

f(x) = (0.03843417466089871 - ((x * (-21.667776661667226)) * (((0.7175444245047398 ^ x) ^ x) / 16.262705747349774)))
48 	 5.836200121399585
49 	 5.836200121399585

f(x) = (0.03843417466089871 - ((x * (-21.662524193965517)) * (((0.7175444245047398 ^ x) ^ x) / 16.26141837828798)))
50 	 5.8362001114409825
51 	 5.8362001114409825
52 	 5.8362001114409825
53 	 5.8362001114409825
54 	 5.8362001114409825
55 	 5.8362001114409825
56 	 5.8362001114409825
57 	 5.8362001114409825
58 	 5.8362001114409825
59 	 5.8362001114409825

f(x) = (0.03843417466089871 - ((x * (-24.624664221314188)) * (((0.7175444245047398 ^ x) ^ x) / 18.482635204699278)))
60 	 5.836200086756856
61 	 5.836200086756856
62 	 5.836200086756856
63 	 5.836200086756856
64 	 5.836200086756856
65 	 5.836200086756856
66 	 5.836200086756856
67 	 5.836200086756856
68 	 5.836200086756856
69 	 5.836200086756856
70 	 5.836200086756856
71 	 5.836200086756856
72 	 5.836200086756856

f(x) = (0.03843417466089871 - ((x * (-23.803425055908484)) * (((0.7175444245047398 ^ x) ^ x) / 17.866721331430185)))
73 	 5.836200071940088
74 	 5.836200071940088
75 	 5.836200071940088
76 	 5.836200071940088
77 	 5.836200071940088

f(x) = (((x * (-21.727813149886583)) * (((0.444473883735897 ^ x) ^ x) / 25.877440479220724)) - ((x * (-27.869805964415654)) * (((0.7175444245047398 ^ x) ^ x) / 16.054058406243342)))
78 	 5.753786607216474

f(x) = cos(((-1.5518824117603933) - ((x * (-22.779793630567173)) * ((0.9905590241810334 ^ x) / 22.778425607844536))))
79 	 0.06523396656992454

Best function is:
f(x) = cos(((-1.5518824117603933) - ((x * (-22.779793630567173)) * ((0.9905590241810334 ^ x) / 22.778425607844536))))

End time is: Thu Dec 20 02:17:52 EET 2012