Does logint function work well? (for PNT)
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On the 'Prime Obsession' book, 20 to the power 1/2 + 14.134725i is −0.302303 − 4.46191i. Take the logarithmic integral—the Li function—of that to get the answer −0.105384 + 3.14749i.
I tried as belows, but failed.
>> a=20^(1/2+14.134725i)
a =
-0.3023 - 4.4619i % OK
>> logint(a)-logint(2)
ans =
0.9528 - 3.9138i % Wrong
6 件のコメント
Notae
2018 年 10 月 13 日
KALYAN ACHARJYA
2018 年 10 月 13 日
Explain what are you looking for?
the cyclist
2018 年 10 月 13 日
Li(x) = integral(1/log(t)) from 0 to x
not from x to 2 as you state. I don't have the symbolic math toolbox to test.
the cyclist
2018 年 10 月 14 日
Li(20^(1/2+14.134725i)) - Li(2)
you get the answer
0.952805 - 3.91384i
which is what you say that MATLAB also gives. Therefore, I think the problem is not with MATLAB.
Maybe you could post more of what it says in the book you mention. Maybe there is some other part you are missing.
Notae
2018 年 10 月 15 日
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