Benutzer:Wiasazubis/Artikelentwurf

Explizite Ermittlung der Summe der Potenzen $S_{k}(n)=\sum _{i=1}^{n}i^{k}$

Explizite Darstellungen Bearbeiten

Die Summe der Potenzen lässt sich mit Hilfe von

S_{k}(n)=\sum _{i=1}^{n}i^{k}=\sum _{i=1}^{n}\sum _{j=i}^{n}j^{k-1}

(1)

für alle $k\in \mathbb {N}$ berechnen.

Mit der Identität $\sum _{j=i}^{n}j^{k-1}=\sum _{j=1}^{n}j^{k-1}-\sum _{j=1}^{i-1}j^{k-1}$ lässt sich $(1)$ in

S_{k}(n)=\sum _{i=1}^{n}{(\sum _{j=1}^{n}j^{k-1}-\sum _{j=1}^{i-1}j^{k-1})}

(2)

umformen. Während sich $(1)$ nur für $k=1,2$ direkt auswerten lässt,

zum Beispiel für $k=2$ mit $\sum _{j=i}^{n}j={\frac {(n+i)(n-i+1)}{2}}$ ,

gilt $(2)$ für alle $k\in \mathbb {N}$ .

Herleitung:

Mit dem Ansatz $i^{k}=i^{k-1}\cdot \sum _{i=1}^{k}1$ wird die folgende Tabelle aufgestellt.

Beispiel: $k=2;$ $1^{2}=1\cdot (1);$ $2^{2}=2\cdot (1+1)=2+2;$ $3^{2}=3\cdot (1+1+1)=3+3+3;$ $...$

$i^{k}$	$1^{k}$	$2^{k}$	$3^{k}$	$4^{k}$	$...$	$n^{k}$	$\sum _{i=1}^{n}i^{k}$
Senkrecht werden die	$1^{k-1}$	$2^{k-1}$	$3^{k-1}$	$4^{k-1}$	$...$	$n^{k-1}$	$\sum _{i=1}^{n}i^{k-1}$
$i^{k-1}\cdot \sum _{1}^{i}1$ aufgeschrieben,		$+2^{k-1}$	$+3^{k-1}$	$+4^{k-1}$		$+n^{k-1}$	$+\sum _{i=2}^{n}i^{k-1}$
waagerecht wird summiert.			$+3^{k-1}$	$+4^{k-1}$		$+n^{k-1}$	$+\sum _{i=3}^{n}i^{k-1}$
				$+4^{k-1}$		$+n^{k-1}$	$+\sum _{i=4}^{n}i^{k-1}$
						$...$	$...$
						$+n^{k-1}$	$+\sum _{i=n}^{n}i^{k-1}$
							$\sum _{i=1}^{n}\sum _{j=i}^{n}j^{k-1}$

Für $k=1$ ergibt sich die Gaußsche Summenformel:

\sum _{1}^{n}i^{1}=\sum _{1}^{n}{\Biggl [}\sum _{1}^{n}i^{0}-\sum _{1}^{i-1}j^{0}{\Biggr ]}

i^{0}=j^{0}=1

, denn

1={\frac {a^{n}}{a^{n}}}=a^{n-n}=a^{0}

für

a

≠

0

\sum _{1}^{n}i=\sum _{1}^{n}{\Bigl [}\sum _{1}^{n}1-\sum _{1}^{i-1}1{\Bigr ]}

\sum _{1}^{n}i=\sum _{1}^{n}\lbrack n-(i-1)\rbrack =\sum _{1}^{n}n-\sum _{1}^{n}i+\sum _{1}^{n}1

|+\sum _{1}^{n}i

2\sum _{1}^{n}i=\sum _{1}^{n}n+\sum _{1}^{n}1=n^{2}+n

\sum _{1}^{n}i={\frac {1}{2}}n^{2}+{\frac {1}{2}}n

Rekursion Bearbeiten

Ausgangspunkt ist die Summe $\sum _{1}^{n}i={\frac {1}{2}}n^{2}+{\frac {1}{2}}n$ .

Daraus lässt sich jede weitere, nächst höhere Potenz berechnen, wie für die ersten Summen der Potenzen deutlich wird:

${\frac {3}{2}}\sum _{1}^{n}i^{2}=(n+{\frac {1}{2}})\sum _{1}^{n}i$	⇒ $\sum _{1}^{n}i^{2}$ $=$ ${\frac {1}{3}}n^{3}+{\frac {1}{2}}n^{2}+{\frac {1}{6}}n$
${\frac {4}{3}}\sum _{1}^{n}i^{3}=(n+{\frac {1}{2}})\sum _{1}^{n}i^{2}-{\frac {1}{6}}\sum _{1}^{n}i$	⇒ $\sum _{1}^{n}i^{3}$ $=$ ${\frac {1}{4}}n^{4}+{\frac {1}{2}}n^{3}+{\frac {1}{4}}n^{2}$
${\frac {5}{4}}\sum _{1}^{n}i^{4}=(n+{\frac {1}{2}})\sum _{1}^{n}i^{3}-{\frac {1}{4}}\sum _{1}^{n}i^{2}$	⇒ $\sum _{1}^{n}i^{4}$ $=$ ${\frac {1}{5}}n^{5}+{\frac {1}{2}}n^{4}+{\frac {1}{3}}n^{3}-{\frac {1}{30}}n$
${\frac {6}{5}}\sum _{1}^{n}i^{5}=(n+{\frac {1}{2}})\sum _{1}^{n}i^{4}-{\frac {1}{3}}\sum _{1}^{n}i^{3}+{\frac {1}{30}}\sum _{1}^{n}i$	⇒ $\sum _{1}^{n}i^{5}$ $=$ ${\frac {1}{6}}n^{6}+{\frac {1}{2}}n^{5}+{\frac {5}{12}}n^{4}-{\frac {1}{12}}n^{2}$

S_{k}=\sum _{1}^{n}i^{k}=a_{k+1}\cdot n^{k+1}+a_{k}\cdot n^{k}+a_{k-1}\cdot n^{k-1}+...+a_{1}\cdot n^{1}

Die jeweils nächste Summe setzt sich folgendermaßen zusammen:

{\frac {k+1}{k}}\sum _{1}^{n}i^{k}=(n+{\frac {1}{2}})\cdot \sum _{1}^{n}i^{k-1}-\sum _{l=2}^{k-1}{\Bigl (}b_{k-l}\cdot \sum _{1}^{n}i^{k-l}{\Bigr )}

{\frac {k+1}{k}}\sum _{1}^{n}i^{k}=(n+{\frac {1}{2}})\cdot \sum _{1}^{n}i^{k-1}-b_{k-2}\cdot \sum _{1}^{n}i^{k-2}-b_{k-3}\cdot \sum _{1}^{n}i^{k-3}-...-b_{1}\cdot \sum _{1}^{n}i^{1}

Es gilt $\forall ~j>2~b_{j}=a_{j}$ .

Setzt man für $\sum i^{k-x}$ rekursiv Werte ein und löst nach $\sum i^{k}$ auf, erhält man das Ergebnis.

Berechnungen Bearbeiten

Beispielberechnung für $S_{13}$ :

$S_{12}={\frac {1}{13}}n^{13}+{\frac {1}{2}}n^{12}+n^{11}-{\frac {11}{6}}n^{9}+{\frac {22}{7}}n^{7}-{\frac {33}{10}}n^{5}+{\frac {5}{3}}n^{3}-{\frac {691}{2730}}n$

⇒ ${\frac {14}{13}}S_{13}=(n+{\frac {1}{2}})S_{12}-S_{11}+{\frac {11}{6}}S_{9}-{\frac {22}{7}}S_{7}+{\frac {33}{10}}S_{5}-{\frac {5}{3}}S_{3}+{\frac {691}{2730}}S_{1}$

${\frac {14}{13}}\cdot S_{13}$	$n^{14}$	$n^{13}$	$n^{12}$	$n^{11}$	$n^{10}$	$n^{9}$	$n^{8}$	$n^{7}$	$n^{6}$	$n^{5}$	$n^{4}$	$n^{3}$	$n^{2}$	$n$
${\color {red}n}\cdot S_{12}$	${\frac {1}{13}}$	${\frac {1}{2}}$	$1$		$-{\frac {11}{6}}$		${\frac {22}{7}}$		$-{\frac {33}{10}}$		${\frac {5}{3}}$		$-{\frac {691}{2730}}$
${\color {Red}{\frac {1}{2}}}\cdot S_{12}$		${\color {Red}{\frac {1}{2}}}\cdot {\frac {1}{13}}$	${\color {Red}{\frac {1}{2}}}\cdot {\frac {1}{2}}$	${\color {Red}{\frac {1}{2}}}\cdot 1$		${\color {Red}{\frac {1}{2}}}\cdot (-{\frac {11}{6}})$		${\color {Red}{\frac {1}{2}}}\cdot {\frac {22}{7}}$		${\color {Red}{\frac {1}{2}}}\cdot (-{\frac {33}{10}})$		${\color {Red}{\frac {1}{2}}}\cdot {\frac {5}{3}}$		${\color {Red}{\frac {1}{2}}}\cdot (-{\frac {691}{2730}})$
${\color {Red}-1}\cdot S_{11}$			${\color {Red}(-1)}\cdot {\frac {1}{12}}$	${\color {Red}(-1)}\cdot {\frac {1}{2}}$	${\color {Red}(-1)}\cdot (-{\frac {11}{12}})$		${\color {Red}(-1)}\cdot -({\frac {11}{8}})$		${\color {Red}(-1)}\cdot {\frac {11}{6}}$		${\color {Red}(-1)}\cdot (-{\frac {11}{8}})$		${\color {Red}(-1)}\cdot {\frac {5}{12}}$
${\color {Red}{\frac {11}{6}}}\cdot S_{9}$					${\color {Red}{\frac {11}{6}}}\cdot {\frac {1}{10}}$	${\color {Red}{\frac {11}{6}}}\cdot {\frac {1}{2}}$	${\color {Red}{\frac {11}{6}}}\cdot {\frac {3}{4}}$		${\color {Red}{\frac {11}{6}}}\cdot (-{\frac {7}{10}})$		${\color {Red}{\frac {11}{6}}}\cdot {\frac {1}{2}}$		${\color {Red}{\frac {11}{6}}}\cdot (-{\frac {3}{20}})$
${\color {Red}(-{\frac {22}{7}})}\cdot S_{7}$							${\color {Red}(-{\frac {22}{7}})}\cdot {\frac {1}{8}}$	${\color {Red}(-{\frac {22}{7}})}\cdot {\frac {1}{2}}$	${\color {Red}(-{\frac {22}{7}})}\cdot {\frac {7}{12}}$		${\color {Red}(-{\frac {22}{7}})}\cdot (-{\frac {7}{24}})$		${\color {Red}(-{\frac {22}{7}})}\cdot {\frac {1}{12}}$
${\color {Red}{\frac {33}{10}}}\cdot S_{5}$									${\color {Red}{\frac {33}{10}}}\cdot {\frac {1}{6}}$	${\color {Red}{\frac {33}{10}}}\cdot {\frac {1}{2}}$	${\color {Red}{\frac {33}{10}}}\cdot {\frac {5}{12}}$		${\color {Red}{\frac {33}{10}}}\cdot (-{\frac {1}{12}})$
${\color {Red}(-{\frac {5}{3}})}\cdot S_{3}$											${\color {Red}(-{\frac {5}{3}})}\cdot {\frac {1}{4}}$	${\color {Red}(-{\frac {5}{3}})}\cdot {\frac {1}{2}}$	${\color {Red}(-{\frac {5}{3}})}\cdot {\frac {1}{4}}$
${\color {Red}{\frac {691}{2730}}}\cdot S_{1}$													${\color {Red}{\frac {691}{2730}}}\cdot {\frac {1}{2}}$	${\color {Red}{\frac {691}{2730}}}\cdot {\frac {1}{2}}$
${\frac {14}{13}}\cdot S_{13}$	${\frac {1}{13}}$	${\frac {7}{13}}$	${\frac {7}{6}}$		$-{\frac {77}{30}}$		${\frac {11}{2}}$		$-{\frac {77}{10}}$		${\frac {35}{6}}$		$-{\frac {691}{390}}$
$S_{13}$	${\frac {1}{14}}$	${\frac {1}{2}}$	${\frac {13}{12}}$		$-{\frac {143}{60}}$		${\frac {143}{28}}$		$-{\frac {143}{20}}$		${\frac {65}{12}}$		$-{\frac {691}{420}}$

⇒ $S_{13}={\frac {1}{14}}n^{14}+{\frac {1}{2}}n^{13}+{\frac {13}{12}}n^{12}-{\frac {143}{60}}n^{10}+{\frac {143}{28}}n^{8}-{\frac {143}{20}}n^{6}+{\frac {65}{12}}n^{4}-{\frac {691}{420}}n^{2}$

Probe: ${\frac {1}{14}}+{\frac {1}{2}}+{\frac {13}{12}}-{\frac {143}{60}}+{\frac {143}{28}}-{\frac {143}{20}}+{\frac {65}{12}}-{\frac {691}{420}}=1$

(siehe Satz von ?)

Siehe auch Bearbeiten

Faulhabersche Formel