Formelsammlung Mathematik: Kettenbrüche: Unterschied zwischen den Versionen

Zurück zur Formelsammlung Mathematik

Ein regulärer Kettenbruch hat die Form

${\displaystyle a_0+\frac{1}{{\displaystyle a_1+\frac{1}{{\displaystyle a_2+\frac{1}{a_3+\cdots }}}}}}$,

wobei ${\displaystyle a_0\in \mathbb{Z}}$ ist und ${\displaystyle a_1,a_2,a_3,...\in {\mathbb{Z}}^{>0}}$ sind. Man kürzt ihn mit ${\displaystyle [a_0,a_1,a_2,a_3,...]}$ ab.

${\displaystyle -[a_0,a_1,a_2,a_3,a_4,\dots ]=\{\begin{array}{ccc}[-(a_0+1),a_2+1,a_3,a_4,a_5,\dots ]& ,& a_1=1\\ \\ [-(a_0+1),1,a_1-1,a_2,a_3,a_4,\dots ]& ,& a_1>1\end{array}}$

${\displaystyle {[a_0,a_1,a_2,...]}^{-1}=\{\begin{array}{ccc}[0,a_0,a_1,...]& ,& a_0>0\\ \\ [a_1,a_2,a_3...]& ,& a_0=0\end{array}}$

${\displaystyle \phi =\frac{1+\sqrt{5}}{2}=\left[\bar{1}\right]}$

${\displaystyle e={[2,\overline{1,2k,1}]}_{k\ge 1}}$

Blender3D: Vorlage:Klappbox

${\displaystyle e^{1/n}={\left[\overline{1,(2k-1)n-1,1}\right]}_{k\ge 1}n\in {\mathbb{Z}}^{>1}}$

Blender3D: Vorlage:Klappbox

${\displaystyle e^2={[7,\overline{3k-1,1,1,3k,6(2k+1)}]}_{k\ge 1}}$

Blender3D: Vorlage:Klappbox

${\displaystyle e^{2/n}={\left[\overline{1,\frac{(6k-5)n-1}{2},6(2k-1)n,\frac{(6k-1)n-1}{2},1}\right]}_{k\ge 1}n\in {\mathbb{Z}}^{>1}\mathrm{u}\mathrm{n}\mathrm{g}\mathrm{e}\mathrm{r}\mathrm{a}\mathrm{d}\mathrm{e}}$

Blender3D: Vorlage:Klappbox

${\displaystyle \frac{e-1}{2}={[0,1,\overline{4k+2}]}_{k\ge 1}}$

${\displaystyle \frac{1}{\sqrt{e}-1}={\left[\overline{4k+1,1,1}\right]}_{k\ge 0}}$

${\displaystyle \frac{1}{\sqrt{e}+1}={[0,2,\overline{4k+1,1,1}]}_{k\ge 0}}$

${\displaystyle \tan (1)={\left[\overline{1,2k-1}\right]}_{k\ge 1},\cot (1)={[0,\overline{1,2k-1}]}_{k\ge 1}}$

${\displaystyle \cot \left(\frac{1}{n}\right)={[n-1,\overline{1,(2k+1)n-2}]}_{k\ge 1},\tan \left(\frac{1}{n}\right)={[0,n-1,\overline{1,(2k+1)n-2}]}_{k\ge 1}n\in {\mathbb{Z}}^{>1}}$

${\displaystyle \coth \left(\frac{1}{n}\right)={\left[\overline{(2k-1)n}\right]}_{k\ge 1},\tanh \left(\frac{1}{n}\right)={[0,\overline{(2k-1)n}]}_{k\ge 1}n\in {\mathbb{Z}}^{>0}}$

${\displaystyle \sqrt{n}\tan \left(\frac{1}{\sqrt{n}}\right)={\left[\overline{1,(4k-1)n-2,1,4k-1}\right]}_{k\ge 1}n\in {\mathbb{Z}}^{>0}}$

${\displaystyle \sqrt{n}\cot \left(\frac{1}{\sqrt{n}}\right)={[n-1,\overline{1,4k-3,1,(4k+1)n-2}]}_{k\ge 1}n\in {\mathbb{Z}}^{>0}}$

${\displaystyle \sqrt{n}\tanh \left(\frac{1}{\sqrt{n}}\right)={[0,\overline{4k-3,(4k-1)n}]}_{k\ge 1}n\in {\mathbb{Z}}^{>0}}$

${\displaystyle \sqrt{n}\coth \left(\frac{1}{\sqrt{n}}\right)={\left[\overline{(4k-3)n,4k-1}\right]}_{k\ge 1}n\in {\mathbb{Z}}^{>0}}$

${\displaystyle \sqrt{2}=[1,\bar{2}]}$

${\displaystyle \sqrt{3}=[1,\overline{1,2}]}$

${\displaystyle \sqrt{4}=\left[2\right]}$

${\displaystyle \sqrt{5}=[2,\bar{4}]}$

${\displaystyle \sqrt{6}=[2,\overline{2,4}]}$

${\displaystyle \sqrt{7}=[2,\overline{1,1,1,4}]}$

${\displaystyle \sqrt{8}=[2,\overline{1,4}]}$

${\displaystyle \sqrt{9}=\left[3\right]}$

${\displaystyle \sqrt{10}=[3,\bar{6}]}$

Ist ${\displaystyle d\in {\mathbb{Z}}^{>0}}$ kein Quadrat, so lässt sich ${\displaystyle \sqrt{d}}$ schreiben in der Form ${\displaystyle [a_0,\overline{a_1,...,a_n,2a_0}]}$

Zum Beispiel

${\displaystyle \sqrt{a^2+1}=[a,\overline{2a}]}$

${\displaystyle \sqrt{a^2+2}=[a,\overline{a,2a}]}$

${\displaystyle \sqrt{a^2+a}=[a,\overline{2,2a}]}$

${\displaystyle \sqrt{a^2+2a}=[a,\overline{1,2a}]}$

${\displaystyle \sqrt{9a^2+3}=[3a,\overline{2a,6a}]}$

Eine ausführlichere Einteilung stellen die Bernstein Familien und die Levesque-Rhin Familien dar.

• Ein regulärer Kettenbruch ist genau dann irrational, wenn er nicht abbricht.
• Ein regulärer Kettenbruch ist genau dann periodisch, wenn er die Form ${\displaystyle \frac{a+b\sqrt{c}}{d}}$ besitzt, wobei ${\displaystyle a\in \mathbb{Z},b,c,d\in {\mathbb{Z}}^{\ne 0}}$ ist und ${\displaystyle c}$ keine Quadratzahl ist.

Sind ${\displaystyle a_0,...,a_n\in {\mathbb{Z}}^{>0}}$, dann lässt sich der reinperiodische Kettenbruch ${\displaystyle \alpha =[\overline{a_0,...,a_n}]}$ schreiben in der Form ${\displaystyle \frac{P+\sqrt{D}}{Q}}$,

wobei ${\displaystyle P,Q,D\in {\mathbb{Z}}^{>0}}$ sind und ${\displaystyle D}$ keine Quadratzahl ist.

Ist ${\displaystyle \beta =[\overline{a_n,...,a_0}]}$ der zu ${\displaystyle \alpha }$ inverse Kettenbruch, so stimmt ${\displaystyle \frac{-1}{\beta }}$ mit der Wurzelkonjugierten ${\displaystyle \frac{P-\sqrt{D}}{Q}}$ überein.

Eine mögliche Verallgemeinerung ist es Kettenbrüche der Form

${\displaystyle b_0+\frac{a_1}{{\displaystyle b_1+\frac{a_2}{{\displaystyle b_2+\frac{a_3}{b_3+\cdots }}}}}}$

zu betrachten, wobei ${\displaystyle b_0\in \mathbb{Z}}$ ist und wobei ${\displaystyle b_1,b_2,...}$ und ${\displaystyle a_1,a_2...}$ positive ganze Zahlen sind. Genauso könnte man für ${\displaystyle b_0,b_1,b_2,...}$ und ${\displaystyle a_1,a_2,a_3,...}$ auch reelle oder komplexe Zahlen zulassen. Ein verallgemeinerter Kettenbruch lässt sich nach Pringsheim abkürzend mit ${\displaystyle b_0+\frac{a_1|}{|b_1}+\frac{a_2|}{|b_2}+\frac{a_3|}{|b_3}+...}$ und nach Gauß abkürzend mit ${\displaystyle b_0+\underset{k=1}{\stackrel{\mathrm{\infty }}{K}}\frac{a_k}{b_k}}$ notieren.

Ist ${\displaystyle \sqrt{z}=x+y}$, so gilt ${\displaystyle z=x^2+2xy+y^2\Rightarrow \frac{z-x^2}{2x+y}=y\Rightarrow y=\underset{k=1}{\stackrel{\mathrm{\infty }}{K}}\frac{z-x^2}{2x}\Rightarrow \sqrt{z}=x+\underset{k=1}{\stackrel{\mathrm{\infty }}{K}}\frac{z-x^2}{2x}}$

${\displaystyle e=2+\underset{k=2}{\stackrel{\mathrm{\infty }}{K}}\frac{k}{k}=2+\frac{2|}{|2}+\frac{3|}{|3}+\frac{4|}{|4}+...}$

${\displaystyle e=2+\frac{1|}{|1}+\underset{k=1}{\stackrel{\mathrm{\infty }}{K}}\frac{k}{k+1}=2+\frac{1|}{|1}+\frac{1|}{|2}+\frac{2|}{|3}+\frac{3|}{|4}+...}$

${\displaystyle \frac{1}{\sqrt{e}-1}=1+\underset{k=1}{\stackrel{\mathrm{\infty }}{K}}\frac{2k}{2k+1}=1+\frac{2|}{|3}+\frac{4|}{|5}+...}$

${\displaystyle \frac{\pi }{2}=1+\underset{k=1}{\stackrel{\mathrm{\infty }}{K}}\frac{1}{\frac{1}{k}}=1+\frac{1|}{|1}+\frac{1|}{|\frac{1}{2}}+\frac{1|}{|\frac{1}{3}}+...}$

${\displaystyle \frac{4}{\pi }=1+\underset{k=1}{\stackrel{\mathrm{\infty }}{K}}\frac{k^2}{2k+1}=1+\frac{1|}{|3}+\frac{4|}{|5}+\frac{9|}{|7}+...}$

${\displaystyle \pi =3+\underset{k=1}{\stackrel{\mathrm{\infty }}{K}}\frac{(2k-1{)}^2}{6}=3+\frac{1|}{|6}+\frac{9|}{|6}+\frac{25|}{|6}+...}$

Formel von Brouncker

${\displaystyle \frac{4}{\pi }=1+\underset{k=1}{\stackrel{\mathrm{\infty }}{K}}\frac{(2k-1{)}^2}{2}=1+\frac{1|}{|2}+\frac{9|}{|2}+\frac{25|}{|2}+...}$

${\displaystyle \frac{2}{\pi }=1-\frac{1|}{|2}+\underset{k=1}{\stackrel{\mathrm{\infty }}{K}}\frac{k(k+1)}{1}=1-\frac{1|}{|2}+\frac{1\cdot 2|}{|1}+\frac{2\cdot 3|}{|1}+\frac{3\cdot 4|}{|1}+\frac{4\cdot 5|}{|1}+...}$

${\displaystyle \frac{\pi }{2}=1-\frac{1|}{|3}-\frac{2\cdot 3|}{|1}-\frac{2\cdot 1|}{|3}-\frac{4\cdot 5|}{|1}-\frac{4\cdot 3|}{|3}-\frac{6\cdot 7|}{|1}-\frac{6\cdot 5|}{|3}+...}$

${\displaystyle \frac{12}{{\pi }^2}=1+\underset{k=1}{\stackrel{\mathrm{\infty }}{K}}\frac{k^4}{2k+1}=1+\frac{1|}{|3}+\frac{16|}{|5}+\frac{81|}{|7}+...}$

${\displaystyle \frac{6}{{\pi }^2-6}=1+\frac{1\cdot 1|}{|1}+\frac{1\cdot 2|}{|1}+\frac{2\cdot 2|}{|1}+\frac{2\cdot 3|}{|1}+\frac{3\cdot 3|}{|1}+\frac{3\cdot 4|}{|1}...}$

${\displaystyle \frac{1}{2K-1}=\frac{1}{2}+\frac{1\cdot 1|}{|\frac{1}{2}}+\frac{1\cdot 2|}{|\frac{1}{2}}+\frac{2\cdot 2|}{|\frac{1}{2}}+\frac{2\cdot 3|}{|\frac{1}{2}}+\frac{3\cdot 3|}{|\frac{1}{2}}+\frac{3\cdot 4|}{|\frac{1}{2}}...}$

${\displaystyle e^z=1+\frac{z|}{|1}+\underset{k=2}{\stackrel{\mathrm{\infty }}{K}}\frac{-\frac{z}{k}}{1+\frac{z}{k}}=1+\frac{z|}{|1}-\frac{\frac{z}{2}|}{|1+\frac{z}{2}}-\frac{\frac{z}{3}|}{|1+\frac{z}{3}}-\frac{\frac{z}{4}|}{|1+\frac{z}{4}}-...}$

${\displaystyle \sin z=\frac{z|}{|1}+\frac{z^2|}{|2\cdot 3-z^2}+\underset{k=2}{\stackrel{\mathrm{\infty }}{K}}\frac{(2k-2)(2k-1)z^2}{2k(2k+1)-z^2}=\frac{z|}{|1}+\frac{z^2|}{|2\cdot 3-z^2}+\frac{2\cdot 3z^2|}{|4\cdot 5-z^2}+\frac{4\cdot 5z^2|}{|6\cdot 7-z^2}+...}$

${\displaystyle \sinh z=\frac{z|}{|1}-\frac{z^2|}{|2\cdot 3-z^2}+\underset{k=2}{\stackrel{\mathrm{\infty }}{K}}\frac{-(2k-2)(2k-1)z^2}{2k(2k+1)+z^2}=\frac{z|}{|1}-\frac{z^2|}{|2\cdot 3+z^2}-\frac{2\cdot 3z^2|}{|4\cdot 5+z^2}-\frac{4\cdot 5z^2|}{|6\cdot 7+z^2}-...}$

${\displaystyle \begin{array}{c}\tanh \\ \tan \end{array}\left(\frac{x}{y}\right)=\frac{x|}{|y}+\underset{k=1}{\stackrel{\mathrm{\infty }}{K}}\frac{\pm x^2}{(2k+1)y}=\frac{x|}{|y}\pm \frac{x^2|}{|3y}\pm \frac{x^2|}{|5y}+...}$

Blender3D: Vorlage:Klappbox

${\displaystyle \begin{array}{c}\tanh \\ \tan \end{array}\left(\frac{\pi z}{4}\right)=\frac{z|}{|1}+\underset{k=1}{\stackrel{\mathrm{\infty }}{K}}\frac{(2k-1{)}^2\pm z^2}{2}=\frac{z|}{|1}+\frac{1^2\pm z^2|}{|2}+\frac{3^2\pm z^2|}{|2}+\frac{5^2\pm z^2|}{|2}+...}$

${\displaystyle \begin{array}{c}\tanh \\ \tan \end{array}\left(nz\right)=\frac{n\tan (z)|}{|1}+\underset{k=1}{\stackrel{n-1}{K}}\frac{(k^2\pm n^2){\tan }^2(z)}{2k+1}}$

${\displaystyle \begin{array}{c}\tanh \\ \tan \end{array}\left(\alpha z\right)=\frac{\alpha \tan (z)|}{|1}+\underset{k=1}{\stackrel{\mathrm{\infty }}{K}}\frac{(k^2\pm {\alpha }^2){\tan }^2(z)}{2k+1}}$

${\displaystyle z\coth \left(\frac{z}{2}\right)=2+\underset{k=1}{\stackrel{\mathrm{\infty }}{K}}\frac{z^2}{4k+2}=2+\frac{z^2|}{|6}+\frac{z^2|}{|10}+\frac{z^2|}{|14}+...}$

${\displaystyle z\coth z=1+\underset{k=1}{\stackrel{\mathrm{\infty }}{K}}\frac{z^2|}{|2k+1}=1+\frac{z^2|}{|3}+\frac{z^2|}{|5}+\frac{z^2|}{|7}+...}$

${\displaystyle \text{arsinh}z=\frac{z\sqrt{1+z^2}|}{|1}+\frac{1\cdot 2z^2|}{|3}+\frac{1\cdot 2z^2|}{|5}+\frac{3\cdot 4z^2|}{|7}+\frac{3\cdot 4z^2|}{|9}+\frac{5\cdot 6z^2|}{|11}+\frac{5\cdot 6z^2|}{|13}+...}$

${\displaystyle \arcsin z=\frac{z\sqrt{1-z^2}|}{|1}-\frac{1\cdot 2z^2|}{|3}-\frac{1\cdot 2z^2|}{|5}-\frac{3\cdot 4z^2|}{|7}-\frac{3\cdot 4z^2|}{|9}-\frac{5\cdot 6z^2|}{|11}-\frac{5\cdot 6z^2|}{|13}-...}$

${\displaystyle \arctan z=\frac{z|}{|1}+\underset{k=1}{\stackrel{\mathrm{\infty }}{K}}\frac{k^2{z}^2}{2k+1}=\frac{z|}{|1}+\frac{z^2|}{|3}+\frac{4z^2|}{|5}+\frac{9z^2|}{|7}+...}$

${\displaystyle \text{artanh}z=\frac{z|}{|1}+\underset{k=1}{\stackrel{\mathrm{\infty }}{K}}\frac{-k^2{z}^2}{2k+1}=\frac{z|}{|1}-\frac{z^2|}{|3}-\frac{4z^2|}{|5}-\frac{9z^2|}{|7}-...}$

${\displaystyle \begin{array}{c}\arctan \\ \mathrm{artanh}\end{array}(z)=\frac{z|}{|1}+\underset{k=1}{\stackrel{\mathrm{\infty }}{K}}\frac{\pm (2k-1{)}^2{z}^2}{2k+1\mp (2k-1)z^2}=\frac{z|}{|1}\pm \frac{z^2|}{|3\mp z^2}\pm \frac{9z^2|}{|5\mp 3z^2}\pm \frac{25z^2|}{|7\mp 5z^2}\pm ...}$

${\displaystyle \mathrm{artanh}(z)=\pm \frac{i\pi }{2}+\frac{1|}{|z}+\underset{k=2}{\stackrel{\mathrm{\infty }}{K}}\frac{-\frac{k-1}{k}}{\frac{2k-1}{k}z}=\pm \frac{i\pi }{2}+\frac{1|}{|z}-\frac{\frac{1}{2}|}{|\frac{3}{2}z}-\frac{\frac{2}{3}|}{|\frac{5}{3}z}-\frac{\frac{3}{4}|}{|\frac{7}{4}z}-...\begin{array}{c}\text{Im}(z)>0\\ \text{Im}(z)<0\end{array}}$

${\displaystyle e^{2\mu \arctan \left(\frac{1}{z}\right)}=1+\frac{2\mu |}{|z-\mu }+\underset{k=1}{\stackrel{\mathrm{\infty }}{K}}\frac{{\mu }^2+k^2}{(2k+1)z}=1+\frac{2\mu |}{|z-\mu }+\frac{{\mu }^2+1|}{|3z}+\frac{{\mu }^2+4|}{|5z}+\frac{{\mu }^2+9|}{|7z}+...}$

${\displaystyle \log (1+z)=\frac{z|}{|1}+\frac{1^{2}z|}{|2}+\frac{1^{2}z|}{|3}+\frac{2^{2}z|}{|4}+\frac{2^{2}z|}{|5}+\frac{3^{2}z|}{|6}+\frac{3^{2}z|}{|7}+\frac{4^{2}z|}{|8}+\frac{4^{2}z|}{|9}+...}$

${\displaystyle \log (1+z)=\frac{1|}{|\frac{1}{z}}+\frac{1|}{|\frac{2}{1}}+\frac{1|}{|\frac{3}{z}}+\frac{1|}{|\frac{2}{2}}+\frac{1|}{|\frac{5}{z}}+\frac{1|}{|\frac{2}{3}}+\frac{1|}{|\frac{7}{z}}+\frac{1|}{|\frac{2}{4}}+\frac{1|}{|\frac{9}{z}}+\frac{1|}{|\frac{2}{5}}+...}$

${\displaystyle \log (1+z)=\frac{z|}{|1}+\underset{k=1}{\stackrel{\mathrm{\infty }}{K}}\frac{k^{2}z}{k+1-kz}=\frac{z|}{|1}+\frac{z|}{|2-z}+\frac{4z|}{|3-2z}+\frac{9z|}{|4-3z}+\frac{16z|}{|5-4z}+...}$

${\displaystyle \mathrm{erf}(z)=\pm 1-\frac{\frac{1}{\sqrt{\pi }}{e}^{-z^2}|}{|z}+\frac{1|}{|2z}+\frac{2|}{|z}+\frac{3|}{|2z}+\frac{4|}{|z}+\frac{5|}{|2z}+\frac{6|}{|z}+\frac{7|}{|2z}+\frac{8|}{|z}+...\begin{array}{c}\mathrm{Re}(z)>0\\ \mathrm{Re}(z)<0\end{array}}$

${\displaystyle \mathrm{erf}(z)=\frac{\frac{z}{\sqrt{\pi }}{e}^{-z^2}|}{|\frac{1}{2}}+\underset{k=1}{\stackrel{\mathrm{\infty }}{K}}\frac{(-1{)}^k\frac{k}{2}{z}^2}{\frac{2k+1}{2}}=\frac{\frac{z}{\sqrt{\pi }}{e}^{-z^2}|}{|\frac{1}{2}}-\frac{\frac{1}{2}{z}^2|}{|\frac{3}{2}}+\frac{\frac{2}{2}{z}^2|}{|\frac{5}{2}}-\frac{\frac{3}{2}{z}^2|}{|\frac{7}{2}}+\frac{\frac{4}{2}{z}^2|}{|\frac{9}{2}}-\frac{\frac{5}{2}{z}^2|}{|\frac{11}{2}}+\frac{\frac{6}{2}{z}^2|}{|\frac{13}{2}}-...}$

${\displaystyle \frac{\mathrm{\Gamma }\left(\frac{z+\alpha +1}{4}\right)\mathrm{\Gamma }\left(\frac{z-\alpha +1}{4}\right)}{\mathrm{\Gamma }\left(\frac{z+\alpha +3}{4}\right)\mathrm{\Gamma }\left(\frac{z-\alpha +3}{4}\right)}=\frac{4|}{|z}+\underset{k=1}{\stackrel{\mathrm{\infty }}{K}}\frac{(2k-1{)}^2-{\alpha }^2}{2z}=\frac{4|}{|z}+\frac{1^2-{\alpha }^2|}{|2z}+\frac{3^2-{\alpha }^2|}{|2z}+\frac{5^2-{\alpha }^2|}{|2z}+\frac{7^2-{\alpha }^2|}{|2z}+...}$

${\displaystyle \frac{\text{BesselI}(1+\frac{a}{d},\frac{2x}{d})}{\text{BesselI}(\frac{a}{d},\frac{2x}{d})}\cdot x=\underset{k=1}{\stackrel{\mathrm{\infty }}{K}}\frac{x^2}{a+kd}}$

Blender3D: Vorlage:Klappbox

${\displaystyle (\sqrt{\frac{5+\sqrt{5}}{5}}-\frac{\sqrt{5}+1}{2})e^{2\pi /5}=\underset{k=0}{\stackrel{\mathrm{\infty }}{K}}\frac{e^{-2k\pi }}{1}=\frac{1|}{|1}+\frac{e^{-2\pi }|}{|1}+\frac{e^{-4\pi }|}{|1}+\frac{e^{-6\pi }|}{|1}+\frac{e^{-8\pi }|}{|1}+...}$

${\displaystyle (\frac{\sqrt{5}}{1+\sqrt[5]{{\sqrt[4]{5}}^3\cdot {\sqrt{\frac{\sqrt{5}-1}{2}}}^5-1}}-\frac{\sqrt{5}+1}{2})e^{2\pi /\sqrt{5}}=\underset{k=0}{\stackrel{\mathrm{\infty }}{K}}\frac{e^{-2k\pi \sqrt{5}}}{1}=\frac{1|}{|1}+\frac{e^{-2\pi \sqrt{5}}|}{|1}+\frac{e^{-4\pi \sqrt{5}}|}{|1}+\frac{e^{-6\pi \sqrt{5}}|}{|1}+\frac{e^{-8\pi \sqrt{5}}|}{|1}+...}$

${\displaystyle \sqrt{\frac{\pi e^x}{2x}}={\displaystyle \sum _{k=0}^{\mathrm{\infty }}}\frac{k!(2x{)}^k}{(2k+1)!}+\frac{1|}{|x}+\frac{1|}{|1}+\frac{2|}{|x}+\frac{3|}{|1}+\frac{4|}{|x}+\frac{5|}{|1}+\frac{6|}{|x}+...}$