0,1222n^6 - 2,7833n^5 + 26,139n^4 - 127,25n^3 + 328,74n^2 - 410,97n + 196

gives you this series in the interval n = [1,7], that was obvious right  :-)

to bad this isn't the solution (impossible to find this equation without the solution) my best guess it that it's something like fibonacci where you have to use the value of the previous two to figure out the next one.

Sofie Van Landeghem schreef: 
Ooh, I love these things but can't seem to get it solved right away...
If nobody finds it, I can put it in the newsletter ;-)

Sofie


Tine Blomme wrote:
  
Hi,

I found the following series of numbers on the internet and, as usual,  
the question is 'what is the nent number?'

10, 8, 16, 10, 2, 14

I can tell you that they also added the solution (140), but I have no  
idea why. Can someone help me? I really would like to know...

Thn,
Tine
_______________________________________________
Binari Implicitly Neglects All Recursive Iterations
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-- 
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Sebastian Proost                                       PhD Student

Tel:+ 32 (0) 9 33 13 822                      fan:+32 (0)9 3313809
VIB Department of Plant Systems Biology, Ghent University
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sebastian.proost@psb.vib-ugent.be          http://www.psb.ugent.be
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"If I knew what I was doing, it wouldn't be called research."
                                                 --Albert Einstein