ملخص

الوصفPrime number theorem ratio convergence.svg	English: A plot showing how two estimates described by the prime number theorem, ${\displaystyle {\frac {x}{\ln x}}}$ and ${\displaystyle \int _{2}^{x}{\frac {1}{\ln t}}\mathrm {d} t=Li(x)=li(x)-li(2)}$ converge asymptotically towards ${\displaystyle \pi (x)}$, the number of primes less than x. The x axis is ${\displaystyle x}$ and is logarithmic (labelled in evenly spaced powers of 10), going up to 1024, the largest ${\displaystyle x}$ for which ${\displaystyle \pi (x)}$ is currently known. The former estimate converges extremely slowly, while the latter has visually converged on this plot by 108. Source used to generate this chart is shown below.
التاريخ	٢١ مارس ٢٠١٣
المصدر	عمل شخصي
المؤلف	Dcoetzee
SVG منشأ الملف InfoField	الشيفرة المصدرية لهذا الرسم المتجه صالحة.   هذا الرسم المتجهي أُنشئ بواسطة Mathematica    This chart uses embedded text that can be easily translated using a text editor.

ترخيص

أنا، صاحب حقوق التأليف والنشر لهذا العمل، أنشر هذا العمل تحت الرخصة التالية:

هذا الملف متوفر تحت ترخيص المشاع الإبداعي CC0 1.0 الحقوق العامة.

لقد وَضَعَ صاحب حقوق التَّأليف والنَّشر هذا العملَ في النَّطاق العامّ من خلال تنازُلِه عن حقوق العمل كُلِّها في أنحاء العالم جميعها تحت قانون حقوق التَّأليف والنَّشر، ويشمل ذلك الحقوق المُتَّصِلة بها والمُجاورة لها برمتها بما يتوافق مع ما يُحدده القانون. يمكنك نسخ وتعديل وتوزيع وإعادة إِنتاج العمل، بما في ذلك لأغراضٍ تجاريَّةٍ، دون حاجةٍ لطلب مُوافَقة صاحب حقوق العمل. http://creativecommons.org/publicdomain/zero/1.0/deed.enCC0Creative Commons Zero, Public Domain Dedicationfalsefalse

Source

All source released under CC0 waiver.

Mathematica source to generate graph (which was then saved as SVG from Mathematica):

(* Sample both functions at 600 logarithmically spaced points between \
1 and 2^40 *)
base = N[E^(24 Log[10]/600)];
ratios = Table[{Round[base^x], 
    N[PrimePi[Round[base^x]]/(base^x/(x*Log[base]))]}, {x, 1, 
    Floor[40/Log[2, base]]}];
ratiosli = 
  Table[{Round[base^x], 
    N[PrimePi[
       Round[base^x]]/(LogIntegral[base^x] - LogIntegral[2])]}, {x, 
    Ceiling[Log[base, 2]], Floor[40/Log[2, base]]}];
(* Supplement with larger known PrimePi values that are too large for \
Mathematica to compute *)
LargePiPrime = {{10^13, 346065536839}, {10^14, 3204941750802}, {10^15,
     29844570422669}, {10^16, 279238341033925}, {10^17, 
    2623557157654233}, {10^18, 24739954287740860}, {10^19, 
    234057667276344607}, {10^20, 2220819602560918840}, {10^21, 
    21127269486018731928}, {10^22, 201467286689315906290}, {10^23, 
    1925320391606803968923}, {10^24, 18435599767349200867866}};
ratios2 = 
  Join[ratios, 
   Map[{#[[1]], N[#[[2]]]/(#[[1]]/(Log[#[[1]]]))} &, LargePiPrime]];
ratiosli2 = 
  Join[ratiosli, 
   Map[{#[[1]], N[#[[2]]]/(LogIntegral[#[[1]]] - LogIntegral[2])} &, 
    LargePiPrime]];
(* Plot with log x axis, together with the horizontal line y=1 *)
Show[LogLinearPlot[1, {x, 1, 10^24}, PlotRange -> {0.8, 1.25}], 
 ListLogLinearPlot[{ratios2, ratiosli2}, Joined -> True], 
 LabelStyle -> FontSize -> 14]

LaTeX source for labels:

$$ \left.{\pi(x)}\middle/{\frac{x}{\ln x}}\right. $$
$$ \left.{\pi(x)}\middle/{\int_2^x \frac{1}{\ln t} \mathrm{d}t}\right. $$

These were converted to SVG with [1] and then the graph was embedded into the resulting document in Inkscape. Axis fonts were also converted to Liberation Serif in Inkscape.