Expression for sums of powers
In mathematics , Faulhaber's formula , named after the early 17th century mathematician Johann Faulhaber , expresses the sum of the p -th powers of the first n positive integers
∑
k
=
1
n
k
p
=
1
p
+
2
p
+
3
p
+
⋯
+
n
p
{\displaystyle \sum _{k=1}^{n}k^{p}=1^{p}+2^{p}+3^{p}+\cdots +n^{p}}
as a polynomial in
n . In modern notation, Faulhaber's formula is
∑
k
=
1
n
k
p
=
1
p
+
1
∑
r
=
0
p
(
p
+
1
r
)
B
r
n
p
−
r
+
1
.
{\displaystyle \sum _{k=1}^{n}k^{p}={\frac {1}{p+1}}\sum _{r=0}^{p}{\binom {p+1}{r}}B_{r}n^{p-r+1}.}
Here,
(
p
+
1
r
)
{\textstyle {\binom {p+1}{r}}}
is the
binomial coefficient "
p + 1 choose
r ", and the
Bj are the
Bernoulli numbers with the convention that
B
1
=
+
1
2
{\textstyle B_{1}=+{\frac {1}{2}}}
.
The result: Faulhaber's formula [ edit ] Faulhaber's formula concerns expressing the sum of the p -th powers of the first n positive integers
∑
k
=
1
n
k
p
=
1
p
+
2
p
+
3
p
+
⋯
+
n
p
{\displaystyle \sum _{k=1}^{n}k^{p}=1^{p}+2^{p}+3^{p}+\cdots +n^{p}}
as a (
p + 1)th-degree
polynomial function of
n .
The first few examples are well known. For p = 0, we have
∑
k
=
1
n
k
0
=
∑
k
=
1
n
1
=
n
.
{\displaystyle \sum _{k=1}^{n}k^{0}=\sum _{k=1}^{n}1=n.}
For
p = 1, we have the
triangular numbers
∑
k
=
1
n
k
1
=
∑
k
=
1
n
k
=
n
(
n
+
1
)
2
=
1
2
(
n
2
+
n
)
.
{\displaystyle \sum _{k=1}^{n}k^{1}=\sum _{k=1}^{n}k={\frac {n(n+1)}{2}}={\frac {1}{2}}(n^{2}+n).}
For
p = 2, we have the
square pyramidal numbers
∑
k
=
1
n
k
2
=
n
(
n
+
1
)
(
2
n
+
1
)
6
=
1
3
(
n
3
+
3
2
n
2
+
1
2
n
)
.
{\displaystyle \sum _{k=1}^{n}k^{2}={\frac {n(n+1)(2n+1)}{6}}={\frac {1}{3}}(n^{3}+{\tfrac {3}{2}}n^{2}+{\tfrac {1}{2}}n).}
The coefficients of Faulhaber's formula in its general form involve the Bernoulli numbers Bj . The Bernoulli numbers begin
B
0
=
1
B
1
=
1
2
B
2
=
1
6
B
3
=
0
B
4
=
−
1
30
B
5
=
0
B
6
=
1
42
B
7
=
0
,
{\displaystyle {\begin{aligned}B_{0}&=1&B_{1}&={\tfrac {1}{2}}&B_{2}&={\tfrac {1}{6}}&B_{3}&=0\\B_{4}&=-{\tfrac {1}{30}}&B_{5}&=0&B_{6}&={\tfrac {1}{42}}&B_{7}&=0,\end{aligned}}}
where here we use the convention that
B
1
=
+
1
2
{\textstyle B_{1}=+{\frac {1}{2}}}
. The Bernoulli numbers have various definitions (see
Bernoulli number#Definitions ), such as that they are the coefficients of the exponential generating function
t
1
−
e
−
t
=
t
2
(
coth
t
2
+
1
)
=
∑
k
=
0
∞
B
k
t
k
k
!
.
{\displaystyle {\frac {t}{1-\mathrm {e} ^{-t}}}={\frac {t}{2}}\left(\operatorname {coth} {\frac {t}{2}}+1\right)=\sum _{k=0}^{\infty }B_{k}{\frac {t^{k}}{k!}}.}
Then Faulhaber's formula is that
∑
k
=
1
n
k
p
=
1
p
+
1
∑
k
=
0
p
(
p
+
1
k
)
B
k
n
p
−
k
+
1
.
{\displaystyle \sum _{k=1}^{n}k^{p}={\frac {1}{p+1}}\sum _{k=0}^{p}{\binom {p+1}{k}}B_{k}n^{p-k+1}.}
Here, the
Bj are the
Bernoulli numbers as above, and
(
p
+
1
k
)
=
(
p
+
1
)
!
(
p
+
1
−
k
)
!
k
!
=
(
p
+
1
)
p
(
p
−
1
)
⋯
(
p
−
k
+
3
)
(
p
−
k
+
2
)
k
(
k
−
1
)
(
k
−
2
)
⋯
2
⋅
1
{\displaystyle {\binom {p+1}{k}}={\frac {(p+1)!}{(p+1-k)!\,k!}}={\frac {(p+1)p(p-1)\cdots (p-k+3)(p-k+2)}{k(k-1)(k-2)\cdots 2\cdot 1}}}
is the
binomial coefficient "
p + 1 choose
k ".
Examples [ edit ] So, for example, one has for p = 4
1
4
+
2
4
+
3
4
+
⋯
+
n
4
=
1
5
∑
j
=
0
4
(
5
j
)
B
j
n
5
−
j
=
1
5
(
B
0
n
5
+
5
B
1
n
4
+
10
B
2
n
3
+
10
B
3
n
2
+
5
B
4
n
)
=
1
5
(
n
5
+
5
2
n
4
+
5
3
n
3
−
1
6
n
)
.
{\displaystyle {\begin{aligned}1^{4}+2^{4}+3^{4}+\cdots +n^{4}&={\frac {1}{5}}\sum _{j=0}^{4}{5 \choose j}B_{j}n^{5-j}\\&={\frac {1}{5}}\left(B_{0}n^{5}+5B_{1}n^{4}+10B_{2}n^{3}+10B_{3}n^{2}+5B_{4}n\right)\\&={\frac {1}{5}}\left(n^{5}+{\tfrac {5}{2}}n^{4}+{\tfrac {5}{3}}n^{3}-{\tfrac {1}{6}}n\right).\end{aligned}}}
The first seven examples of Faulhaber's formula are
∑
k
=
1
n
k
0
=
1
1
(
n
)
∑
k
=
1
n
k
1
=
1
2
(
n
2
+
2
2
n
)
∑
k
=
1
n
k
2
=
1
3
(
n
3
+
3
2
n
2
+
3
6
n
)
∑
k
=
1
n
k
3
=
1
4
(
n
4
+
4
2
n
3
+
6
6
n
2
+
0
n
)
∑
k
=
1
n
k
4
=
1
5
(
n
5
+
5
2
n
4
+
10
6
n
3
+
0
n
2
−
5
30
n
)
∑
k
=
1
n
k
5
=
1
6
(
n
6
+
6
2
n
5
+
15
6
n
4
+
0
n
3
−
15
30
n
2
+
0
n
)
∑
k
=
1
n
k
6
=
1
7
(
n
7
+
7
2
n
6
+
21
6
n
5
+
0
n
4
−
35
30
n
3
+
0
n
2
+
7
42
n
)
.
{\displaystyle {\begin{aligned}\sum _{k=1}^{n}k^{0}&={\frac {1}{1}}\,{\big (}n{\big )}\\\sum _{k=1}^{n}k^{1}&={\frac {1}{2}}\,{\big (}n^{2}+{\tfrac {2}{2}}n{\big )}\\\sum _{k=1}^{n}k^{2}&={\frac {1}{3}}\,{\big (}n^{3}+{\tfrac {3}{2}}n^{2}+{\tfrac {3}{6}}n{\big )}\\\sum _{k=1}^{n}k^{3}&={\frac {1}{4}}\,{\big (}n^{4}+{\tfrac {4}{2}}n^{3}+{\tfrac {6}{6}}n^{2}+0n{\big )}\\\sum _{k=1}^{n}k^{4}&={\frac {1}{5}}\,{\big (}n^{5}+{\tfrac {5}{2}}n^{4}+{\tfrac {10}{6}}n^{3}+0n^{2}-{\tfrac {5}{30}}n{\big )}\\\sum _{k=1}^{n}k^{5}&={\frac {1}{6}}\,{\big (}n^{6}+{\tfrac {6}{2}}n^{5}+{\tfrac {15}{6}}n^{4}+0n^{3}-{\tfrac {15}{30}}n^{2}+0n{\big )}\\\sum _{k=1}^{n}k^{6}&={\frac {1}{7}}\,{\big (}n^{7}+{\tfrac {7}{2}}n^{6}+{\tfrac {21}{6}}n^{5}+0n^{4}-{\tfrac {35}{30}}n^{3}+0n^{2}+{\tfrac {7}{42}}n{\big )}.\end{aligned}}}
History [ edit ] Faulhaber's formula is also called Bernoulli's formula . Faulhaber did not know the properties of the coefficients later discovered by Bernoulli. Rather, he knew at least the first 17 cases, as well as the existence of the Faulhaber polynomials for odd powers described below.[1]
Jakob Bernoulli's Summae Potestatum , Ars Conjectandi , 1713 In 1713, Jacob Bernoulli published under the title Summae Potestatum an expression of the sum of the p powers of the n p + 1polynomial function of n Bj Bernoulli numbers :
∑
k
=
1
n
k
p
=
n
p
+
1
p
+
1
+
1
2
n
p
+
1
p
+
1
∑
j
=
2
p
(
p
+
1
j
)
B
j
n
p
+
1
−
j
.
{\displaystyle \sum _{k=1}^{n}k^{p}={\frac {n^{p+1}}{p+1}}+{\frac {1}{2}}n^{p}+{1 \over p+1}\sum _{j=2}^{p}{p+1 \choose j}B_{j}n^{p+1-j}.}
Introducing also the first two Bernoulli numbers (which Bernoulli did not), the previous formula becomes
∑
k
=
1
n
k
p
=
1
p
+
1
∑
j
=
0
p
(
p
+
1
j
)
B
j
n
p
+
1
−
j
,
{\displaystyle \sum _{k=1}^{n}k^{p}={1 \over p+1}\sum _{j=0}^{p}{p+1 \choose j}B_{j}n^{p+1-j},}
using the Bernoulli number of the second kind for which
B
1
=
1
2
{\textstyle B_{1}={\frac {1}{2}}}
, or
∑
k
=
1
n
k
p
=
1
p
+
1
∑
j
=
0
p
(
−
1
)
j
(
p
+
1
j
)
B
j
−
n
p
+
1
−
j
,
{\displaystyle \sum _{k=1}^{n}k^{p}={1 \over p+1}\sum _{j=0}^{p}(-1)^{j}{p+1 \choose j}B_{j}^{-}n^{p+1-j},}
using the Bernoulli number of the first kind for which
B
1
−
=
−
1
2
.
{\textstyle B_{1}^{-}=-{\frac {1}{2}}.}
Faulhaber himself did not know the formula in this form, but only computed the first seventeen polynomials; the general form was established with the discovery of the Bernoulli numbers .
A rigorous proof of these formulas and Faulhaber's assertion that such formulas would exist for all odd powers took until Carl Jacobi (1834 ), two centuries later.
Proof with exponential generating function [ edit ] Let
S
p
(
n
)
=
∑
k
=
1
n
k
p
,
{\displaystyle S_{p}(n)=\sum _{k=1}^{n}k^{p},}
denote the sum under consideration for integer
p
≥
0.
{\displaystyle p\geq 0.}
Define the following exponential generating function with (initially) indeterminate
z
{\displaystyle z}
G
(
z
,
n
)
=
∑
p
=
0
∞
S
p
(
n
)
1
p
!
z
p
.
{\displaystyle G(z,n)=\sum _{p=0}^{\infty }S_{p}(n){\frac {1}{p!}}z^{p}.}
We find
G
(
z
,
n
)
=
∑
p
=
0
∞
∑
k
=
1
n
1
p
!
(
k
z
)
p
=
∑
k
=
1
n
e
k
z
=
e
z
⋅
1
−
e
n
z
1
−
e
z
,
=
1
−
e
n
z
e
−
z
−
1
.
{\displaystyle {\begin{aligned}G(z,n)=&\sum _{p=0}^{\infty }\sum _{k=1}^{n}{\frac {1}{p!}}(kz)^{p}=\sum _{k=1}^{n}e^{kz}=e^{z}\cdot {\frac {1-e^{nz}}{1-e^{z}}},\\=&{\frac {1-e^{nz}}{e^{-z}-1}}.\end{aligned}}}
This is an entire function in
z
{\displaystyle z}
so that
z
{\displaystyle z}
can be taken to be any complex number.
We next recall the exponential generating function for the Bernoulli polynomials
B
j
(
x
)
{\displaystyle B_{j}(x)}
z
e
z
x
e
z
−
1
=
∑
j
=
0
∞
B
j
(
x
)
z
j
j
!
,
{\displaystyle {\frac {ze^{zx}}{e^{z}-1}}=\sum _{j=0}^{\infty }B_{j}(x){\frac {z^{j}}{j!}},}
where
B
j
=
B
j
(
0
)
{\displaystyle B_{j}=B_{j}(0)}
denotes the Bernoulli number with the convention
B
1
=
−
1
2
{\displaystyle B_{1}=-{\frac {1}{2}}}
. This may be converted to a generating function with the convention
B
1
+
=
1
2
{\displaystyle B_{1}^{+}={\frac {1}{2}}}
by the addition of
j
{\displaystyle j}
to the coefficient of
x
j
−
1
{\displaystyle x^{j-1}}
in each
B
j
(
x
)
{\displaystyle B_{j}(x)}
(
B
0
{\displaystyle B_{0}}
does not need to be changed):
∑
j
=
0
∞
B
j
+
(
x
)
z
j
j
!
=
z
e
z
x
e
z
−
1
+
∑
j
=
1
∞
j
x
j
−
1
z
j
j
!
=
z
e
z
x
e
z
−
1
+
∑
j
=
1
∞
x
j
−
1
z
j
(
j
−
1
)
!
=
z
e
z
x
e
z
−
1
+
z
e
z
x
=
z
e
z
x
+
z
e
z
e
z
x
−
z
e
z
x
e
z
−
1
=
z
e
z
x
1
−
e
−
z
{\displaystyle {\begin{aligned}\sum _{j=0}^{\infty }B_{j}^{+}(x){\frac {z^{j}}{j!}}=&{\frac {ze^{zx}}{e^{z}-1}}+\sum _{j=1}^{\infty }jx^{j-1}{\frac {z^{j}}{j!}}\\=&{\frac {ze^{zx}}{e^{z}-1}}+\sum _{j=1}^{\infty }x^{j-1}{\frac {z^{j}}{(j-1)!}}\\=&{\frac {ze^{zx}}{e^{z}-1}}+ze^{zx}\\=&{\frac {ze^{zx}+ze^{z}e^{zx}-ze^{zx}}{e^{z}-1}}\\=&{\frac {ze^{zx}}{1-e^{-z}}}\end{aligned}}}
It follows immediately that
S
p
(
n
)
=
B
p
+
1
+
(
n
)
−
B
p
+
1
+
(
0
)
p
+
1
{\displaystyle S_{p}(n)={\frac {B_{p+1}^{+}(n)-B_{p+1}^{+}(0)}{p+1}}}
for all
p
{\displaystyle p}
.
Faulhaber polynomials [ edit ] The term Faulhaber polynomials is used by some authors to refer to another polynomial sequence related to that given above.
Write
a
=
∑
k
=
1
n
k
=
n
(
n
+
1
)
2
.
{\displaystyle a=\sum _{k=1}^{n}k={\frac {n(n+1)}{2}}.}
Faulhaber observed that if
p is odd then
∑
k
=
1
n
k
p
{\textstyle \sum _{k=1}^{n}k^{p}}
is a polynomial function of
a .
Proof without words for p = 3 [2] For p = 1, it is clear that
∑
k
=
1
n
k
1
=
∑
k
=
1
n
k
=
n
(
n
+
1
)
2
=
a
.
{\displaystyle \sum _{k=1}^{n}k^{1}=\sum _{k=1}^{n}k={\frac {n(n+1)}{2}}=a.}
For
p = 3, the result that
∑
k
=
1
n
k
3
=
n
2
(
n
+
1
)
2
4
=
a
2
{\displaystyle \sum _{k=1}^{n}k^{3}={\frac {n^{2}(n+1)^{2}}{4}}=a^{2}}
is known as
Nicomachus's theorem .
Further, we have
∑
k
=
1
n
k
5
=
4
a
3
−
a
2
3
∑
k
=
1
n
k
7
=
6
a
4
−
4
a
3
+
a
2
3
∑
k
=
1
n
k
9
=
16
a
5
−
20
a
4
+
12
a
3
−
3
a
2
5
∑
k
=
1
n
k
11
=
16
a
6
−
32
a
5
+
34
a
4
−
20
a
3
+
5
a
2
3
{\displaystyle {\begin{aligned}\sum _{k=1}^{n}k^{5}&={\frac {4a^{3}-a^{2}}{3}}\\\sum _{k=1}^{n}k^{7}&={\frac {6a^{4}-4a^{3}+a^{2}}{3}}\\\sum _{k=1}^{n}k^{9}&={\frac {16a^{5}-20a^{4}+12a^{3}-3a^{2}}{5}}\\\sum _{k=1}^{n}k^{11}&={\frac {16a^{6}-32a^{5}+34a^{4}-20a^{3}+5a^{2}}{3}}\end{aligned}}}
(see
OEIS : A000537 ,
OEIS : A000539 ,
OEIS : A000541 ,
OEIS : A007487 ,
OEIS : A123095 ).
More generally, [citation needed
∑
k
=
1
n
k
2
m
+
1
=
1
2
2
m
+
2
(
2
m
+
2
)
∑
q
=
0
m
(
2
m
+
2
2
q
)
(
2
−
2
2
q
)
B
2
q
[
(
8
a
+
1
)
m
+
1
−
q
−
1
]
.
{\displaystyle \sum _{k=1}^{n}k^{2m+1}={\frac {1}{2^{2m+2}(2m+2)}}\sum _{q=0}^{m}{\binom {2m+2}{2q}}(2-2^{2q})~B_{2q}~\left[(8a+1)^{m+1-q}-1\right].}
Some authors call the polynomials in a on the right-hand sides of these identities Faulhaber polynomials . These polynomials are divisible by a 2 Bernoulli number B j j > 1
Inversely, writing for simplicity
s
j
:=
∑
k
=
1
n
k
j
{\displaystyle s_{j}:=\sum _{k=1}^{n}k^{j}}
4
a
3
=
3
s
5
+
s
3
8
a
4
=
4
s
7
+
4
s
5
16
a
5
=
5
s
9
+
10
s
7
+
s
5
{\displaystyle {\begin{aligned}4a^{3}&=3s_{5}+s_{3}\\8a^{4}&=4s_{7}+4s_{5}\\16a^{5}&=5s_{9}+10s_{7}+s_{5}\end{aligned}}}
and generally
2
m
−
1
a
m
=
∑
j
>
0
(
m
2
j
−
1
)
s
2
m
−
2
j
+
1
.
{\displaystyle 2^{m-1}a^{m}=\sum _{j>0}{\binom {m}{2j-1}}s_{2m-2j+1}.}
Faulhaber also knew that if a sum for an odd power is given by
∑
k
=
1
n
k
2
m
+
1
=
c
1
a
2
+
c
2
a
3
+
⋯
+
c
m
a
m
+
1
{\displaystyle \sum _{k=1}^{n}k^{2m+1}=c_{1}a^{2}+c_{2}a^{3}+\cdots +c_{m}a^{m+1}}
then the sum for the even power just below is given by
∑
k
=
1
n
k
2
m
=
n
+
1
2
2
m
+
1
(
2
c
1
a
+
3
c
2
a
2
+
⋯
+
(
m
+
1
)
c
m
a
m
)
.
{\displaystyle \sum _{k=1}^{n}k^{2m}={\frac {n+{\frac {1}{2}}}{2m+1}}(2c_{1}a+3c_{2}a^{2}+\cdots +(m+1)c_{m}a^{m}).}
Note that the polynomial in parentheses is the derivative of the polynomial above with respect to
a .
Since a = n (n + 1)/2, these formulae show that for an odd power (greater than 1), the sum is a polynomial in n having factors n 2 and (n + 1)2 , while for an even power the polynomial has factors n , n + ½ and n + 1.
Expressing products of power sums as linear combinations of power sums [ edit ] Products of two (and thus by iteration, several) power sums
s
j
r
:=
∑
k
=
1
n
k
j
r
{\displaystyle s_{j_{r}}:=\sum _{k=1}^{n}k^{j_{r}}}
n
{\displaystyle n}
30
s
2
s
4
=
−
s
3
+
15
s
5
+
16
s
7
{\displaystyle 30s_{2}s_{4}=-s_{3}+15s_{5}+16s_{7}}
n
=
1
{\displaystyle n=1}
s
j
{\displaystyle s_{j}}
(
m
+
1
)
s
m
2
=
2
∑
j
=
0
⌊
m
2
⌋
(
m
+
1
2
j
)
(
2
m
+
1
−
2
j
)
B
2
j
s
2
m
+
1
−
2
j
.
m
(
m
+
1
)
s
m
s
m
−
1
=
m
(
m
+
1
)
B
m
s
m
+
∑
j
=
0
⌊
m
−
1
2
⌋
(
m
+
1
2
j
)
(
2
m
+
1
−
2
j
)
B
2
j
s
2
m
−
2
j
.
2
m
−
1
s
1
m
=
∑
j
=
1
⌊
m
+
1
2
⌋
(
m
2
j
−
1
)
s
2
m
+
1
−
2
j
.
{\displaystyle {\begin{aligned}(m+1)s_{m}^{2}&=2\sum _{j=0}^{\lfloor {\frac {m}{2}}\rfloor }{\binom {m+1}{2j}}(2m+1-2j)B_{2j}s_{2m+1-2j}.\\m(m+1)s_{m}s_{m-1}&=m(m+1)B_{m}s_{m}+\sum _{j=0}^{\lfloor {\frac {m-1}{2}}\rfloor }{\binom {m+1}{2j}}(2m+1-2j)B_{2j}s_{2m-2j}.\\2^{m-1}s_{1}^{m}&=\sum _{j=1}^{\lfloor {\frac {m+1}{2}}\rfloor }{\binom {m}{2j-1}}s_{2m+1-2j}.\end{aligned}}}
Note that in the second formula, for even
m
{\displaystyle m}
the term corresponding to
j
=
m
2
{\displaystyle j={\dfrac {m}{2}}}
is different from the other terms in the sum, while for odd
m
{\displaystyle m}
, this additional term vanishes because of
B
m
=
0
{\displaystyle B_{m}=0}
.
Matrix form [ edit ] Faulhaber's formula can also be written in a form using matrix multiplication .
Take the first seven examples
∑
k
=
1
n
k
0
=
−
1
n
∑
k
=
1
n
k
1
=
−
1
2
n
+
1
2
n
2
∑
k
=
1
n
k
2
=
−
1
6
n
+
1
2
n
2
+
1
3
n
3
∑
k
=
1
n
k
3
=
−
0
n
+
1
4
n
2
+
1
2
n
3
+
1
4
n
4
∑
k
=
1
n
k
4
=
−
1
30
n
+
0
n
2
+
1
3
n
3
+
1
2
n
4
+
1
5
n
5
∑
k
=
1
n
k
5
=
−
0
n
−
1
12
n
2
+
0
n
3
+
5
12
n
4
+
1
2
n
5
+
1
6
n
6
∑
k
=
1
n
k
6
=
−
1
42
n
+
0
n
2
−
1
6
n
3
+
0
n
4
+
1
2
n
5
+
1
2
n
6
+
1
7
n
7
.
{\displaystyle {\begin{aligned}\sum _{k=1}^{n}k^{0}&={\phantom {-}}1n\\\sum _{k=1}^{n}k^{1}&={\phantom {-}}{\tfrac {1}{2}}n+{\tfrac {1}{2}}n^{2}\\\sum _{k=1}^{n}k^{2}&={\phantom {-}}{\tfrac {1}{6}}n+{\tfrac {1}{2}}n^{2}+{\tfrac {1}{3}}n^{3}\\\sum _{k=1}^{n}k^{3}&={\phantom {-}}0n+{\tfrac {1}{4}}n^{2}+{\tfrac {1}{2}}n^{3}+{\tfrac {1}{4}}n^{4}\\\sum _{k=1}^{n}k^{4}&=-{\tfrac {1}{30}}n+0n^{2}+{\tfrac {1}{3}}n^{3}+{\tfrac {1}{2}}n^{4}+{\tfrac {1}{5}}n^{5}\\\sum _{k=1}^{n}k^{5}&={\phantom {-}}0n-{\tfrac {1}{12}}n^{2}+0n^{3}+{\tfrac {5}{12}}n^{4}+{\tfrac {1}{2}}n^{5}+{\tfrac {1}{6}}n^{6}\\\sum _{k=1}^{n}k^{6}&={\phantom {-}}{\tfrac {1}{42}}n+0n^{2}-{\tfrac {1}{6}}n^{3}+0n^{4}+{\tfrac {1}{2}}n^{5}+{\tfrac {1}{2}}n^{6}+{\tfrac {1}{7}}n^{7}.\end{aligned}}}
Writing these polynomials as a product between matrices gives
(
∑
k
0
∑
k
1
∑
k
2
∑
k
3
∑
k
4
∑
k
5
∑
k
6
)
=
G
7
(
n
n
2
n
3
n
4
n
5
n
6
n
7
)
,
{\displaystyle {\begin{pmatrix}\sum k^{0}\\\sum k^{1}\\\sum k^{2}\\\sum k^{3}\\\sum k^{4}\\\sum k^{5}\\\sum k^{6}\end{pmatrix}}=G_{7}{\begin{pmatrix}n\\n^{2}\\n^{3}\\n^{4}\\n^{5}\\n^{6}\\n^{7}\end{pmatrix}},}
where
G
7
=
(
1
0
0
0
0
0
0
1
2
1
2
0
0
0
0
0
1
6
1
2
1
3
0
0
0
0
0
1
4
1
2
1
4
0
0
0
−
1
30
0
1
3
1
2
1
5
0
0
0
−
1
12
0
5
12
1
2
1
6
0
1
42
0
−
1
6
0
1
2
1
2
1
7
)
.
{\displaystyle G_{7}={\begin{pmatrix}1&0&0&0&0&0&0\\{1 \over 2}&{1 \over 2}&0&0&0&0&0\\{1 \over 6}&{1 \over 2}&{1 \over 3}&0&0&0&0\\0&{1 \over 4}&{1 \over 2}&{1 \over 4}&0&0&0\\-{1 \over 30}&0&{1 \over 3}&{1 \over 2}&{1 \over 5}&0&0\\0&-{1 \over 12}&0&{5 \over 12}&{1 \over 2}&{1 \over 6}&0\\{1 \over 42}&0&-{1 \over 6}&0&{1 \over 2}&{1 \over 2}&{1 \over 7}\end{pmatrix}}.}
Surprisingly, inverting the matrix of polynomial coefficients yields something more familiar:
G
7
−
1
=
(
1
0
0
0
0
0
0
−
1
2
0
0
0
0
0
1
−
3
3
0
0
0
0
−
1
4
−
6
4
0
0
0
1
−
5
10
−
10
5
0
0
−
1
6
−
15
20
−
15
6
0
1
−
7
21
−
35
35
−
21
7
)
=
A
¯
7
{\displaystyle G_{7}^{-1}={\begin{pmatrix}1&0&0&0&0&0&0\\-1&2&0&0&0&0&0\\1&-3&3&0&0&0&0\\-1&4&-6&4&0&0&0\\1&-5&10&-10&5&0&0\\-1&6&-15&20&-15&6&0\\1&-7&21&-35&35&-21&7\\\end{pmatrix}}={\overline {A}}_{7}}
In the inverted matrix, Pascal's triangle can be recognized, without the last element of each row, and with alternating signs.
Let
A
7
{\displaystyle A_{7}}
A
¯
7
{\displaystyle {\overline {A}}_{7}}
a
i
,
j
{\displaystyle a_{i,j}}
(
−
1
)
i
+
j
a
i
,
j
{\displaystyle (-1)^{i+j}a_{i,j}}
G
¯
7
{\displaystyle {\overline {G}}_{7}}
G
7
{\displaystyle G_{7}}
A
7
=
(
1
0
0
0
0
0
0
1
2
0
0
0
0
0
1
3
3
0
0
0
0
1
4
6
4
0
0
0
1
5
10
10
5
0
0
1
6
15
20
15
6
0
1
7
21
35
35
21
7
)
{\displaystyle A_{7}={\begin{pmatrix}1&0&0&0&0&0&0\\1&2&0&0&0&0&0\\1&3&3&0&0&0&0\\1&4&6&4&0&0&0\\1&5&10&10&5&0&0\\1&6&15&20&15&6&0\\1&7&21&35&35&21&7\\\end{pmatrix}}}
and
A
7
−
1
=
(
1
0
0
0
0
0
0
−
1
2
1
2
0
0
0
0
0
1
6
−
1
2
1
3
0
0
0
0
0
1
4
−
1
2
1
4
0
0
0
−
1
30
0
1
3
−
1
2
1
5
0
0
0
−
1
12
0
5
12
−
1
2
1
6
0
1
42
0
−
1
6
0
1
2
−
1
2
1
7
)
=
G
¯
7
.
{\displaystyle A_{7}^{-1}={\begin{pmatrix}1&0&0&0&0&0&0\\-{1 \over 2}&{1 \over 2}&0&0&0&0&0\\{1 \over 6}&-{1 \over 2}&{1 \over 3}&0&0&0&0\\0&{1 \over 4}&-{1 \over 2}&{1 \over 4}&0&0&0\\-{1 \over 30}&0&{1 \over 3}&-{1 \over 2}&{1 \over 5}&0&0\\0&-{1 \over 12}&0&{5 \over 12}&-{1 \over 2}&{1 \over 6}&0\\{1 \over 42}&0&-{1 \over 6}&0&{1 \over 2}&-{1 \over 2}&{1 \over 7}\end{pmatrix}}={\overline {G}}_{7}.}
Also
(
∑
k
=
0
n
−
1
k
0
∑
k
=
0
n
−
1
k
1
∑
k
=
0
n
−
1
k
2
∑
k
=
0
n
−
1
k
3
∑
k
=
0
n
−
1
k
4
∑
k
=
0
n
−
1
k
5
∑
k
=
0
n
−
1
k
6
)
=
G
¯
7
(
n
n
2
n
3
n
4
n
5
n
6
n
7
)
{\displaystyle {\begin{pmatrix}\sum _{k=0}^{n-1}k^{0}\\\sum _{k=0}^{n-1}k^{1}\\\sum _{k=0}^{n-1}k^{2}\\\sum _{k=0}^{n-1}k^{3}\\\sum _{k=0}^{n-1}k^{4}\\\sum _{k=0}^{n-1}k^{5}\\\sum _{k=0}^{n-1}k^{6}\\\end{pmatrix}}={\overline {G}}_{7}{\begin{pmatrix}n\\n^{2}\\n^{3}\\n^{4}\\n^{5}\\n^{6}\\n^{7}\\\end{pmatrix}}}
This is because it is evident that
∑
k
=
1
n
k
m
−
∑
k
=
0
n
−
1
k
m
=
n
m
{\textstyle \sum _{k=1}^{n}k^{m}-\sum _{k=0}^{n-1}k^{m}=n^{m}}
and that therefore polynomials of degree
m
+
1
{\displaystyle m+1}
of the form
1
m
+
1
n
m
+
1
+
1
2
n
m
+
⋯
{\textstyle {\frac {1}{m+1}}n^{m+1}+{\frac {1}{2}}n^{m}+\cdots }
subtracted the monomial difference
n
m
{\displaystyle n^{m}}
they become
1
m
+
1
n
m
+
1
−
1
2
n
m
+
⋯
{\textstyle {\frac {1}{m+1}}n^{m+1}-{\frac {1}{2}}n^{m}+\cdots }
.
This is true for every order, that is, for each positive integer m , one has
G
m
−
1
=
A
¯
m
{\displaystyle G_{m}^{-1}={\overline {A}}_{m}}
G
¯
m
−
1
=
A
m
.
{\displaystyle {\overline {G}}_{m}^{-1}=A_{m}.}
[3] [4]
Variations [ edit ] Replacing
k
{\displaystyle k}
p
−
k
{\displaystyle p-k}
∑
k
=
1
n
k
p
=
∑
k
=
0
p
1
k
+
1
(
p
k
)
B
p
−
k
n
k
+
1
.
{\displaystyle \sum _{k=1}^{n}k^{p}=\sum _{k=0}^{p}{\frac {1}{k+1}}{p \choose k}B_{p-k}n^{k+1}.}
Subtracting
n
p
{\displaystyle n^{p}}
n
{\displaystyle n}
1
{\displaystyle 1}
∑
k
=
1
n
k
p
=
1
p
+
1
∑
k
=
0
p
(
p
+
1
k
)
(
−
1
)
k
B
k
(
n
+
1
)
p
−
k
+
1
=
∑
k
=
0
p
1
k
+
1
(
p
k
)
(
−
1
)
p
−
k
B
p
−
k
(
n
+
1
)
k
+
1
,
{\displaystyle {\begin{aligned}\sum _{k=1}^{n}k^{p}&={\frac {1}{p+1}}\sum _{k=0}^{p}{\binom {p+1}{k}}(-1)^{k}B_{k}(n+1)^{p-k+1}\\&=\sum _{k=0}^{p}{\frac {1}{k+1}}{\binom {p}{k}}(-1)^{p-k}B_{p-k}(n+1)^{k+1},\end{aligned}}}
where
(
−
1
)
k
B
k
=
B
k
−
{\displaystyle (-1)^{k}B_{k}=B_{k}^{-}}
B
1
−
=
−
1
2
{\displaystyle B_{1}^{-}=-{\tfrac {1}{2}}}
We may also expand
G
(
z
,
n
)
{\displaystyle G(z,n)}
G
(
z
,
n
)
=
e
(
n
+
1
)
z
e
z
−
1
−
e
z
e
z
−
1
=
∑
j
=
0
∞
(
B
j
(
n
+
1
)
−
(
−
1
)
j
B
j
)
z
j
−
1
j
!
,
{\displaystyle {\begin{aligned}G(z,n)&={\frac {e^{(n+1)z}}{e^{z}-1}}-{\frac {e^{z}}{e^{z}-1}}\\&=\sum _{j=0}^{\infty }\left(B_{j}(n+1)-(-1)^{j}B_{j}\right){\frac {z^{j-1}}{j!}},\end{aligned}}}
∑
k
=
1
n
k
p
=
1
p
+
1
(
B
p
+
1
(
n
+
1
)
−
(
−
1
)
p
+
1
B
p
+
1
)
=
1
p
+
1
(
B
p
+
1
(
n
+
1
)
−
B
p
+
1
(
1
)
)
.
{\displaystyle \sum _{k=1}^{n}k^{p}={\frac {1}{p+1}}\left(B_{p+1}(n+1)-(-1)^{p+1}B_{p+1}\right)={\frac {1}{p+1}}\left(B_{p+1}(n+1)-B_{p+1}(1)\right).}
B
n
=
0
{\displaystyle B_{n}=0}
n
>
1
{\displaystyle n>1}
(
−
1
)
p
+
1
{\displaystyle (-1)^{p+1}}
p
>
0
{\displaystyle p>0}
It can also be expressed in terms of Stirling numbers of the second kind and falling factorials as[5]
∑
k
=
0
n
k
p
=
∑
k
=
0
p
{
p
k
}
(
n
+
1
)
k
+
1
k
+
1
,
{\displaystyle \sum _{k=0}^{n}k^{p}=\sum _{k=0}^{p}\left\{{p \atop k}\right\}{\frac {(n+1)_{k+1}}{k+1}},}
∑
k
=
1
n
k
p
=
∑
k
=
1
p
+
1
{
p
+
1
k
}
(
n
)
k
k
.
{\displaystyle \sum _{k=1}^{n}k^{p}=\sum _{k=1}^{p+1}\left\{{p+1 \atop k}\right\}{\frac {(n)_{k}}{k}}.}
mononomials in terms of falling factorials, and the behaviour of falling factorials under the indefinite sum . Interpreting the Stirling numbers of the second kind,
{
p
+
1
k
}
{\displaystyle \left\{{p+1 \atop k}\right\}}
[
p
+
1
]
{\displaystyle \lbrack p+1\rbrack }
k
{\displaystyle k}
f
:
[
p
+
1
]
−
>
[
n
]
{\displaystyle f:\lbrack p+1\rbrack ->\lbrack n\rbrack }
f
(
1
)
{\displaystyle f(1)}
k
=
f
(
1
)
{\displaystyle k=f(1)}
(
n
+
1
)
k
+
1
−
1
=
∑
m
=
1
n
(
(
m
+
1
)
k
+
1
−
m
k
+
1
)
=
∑
p
=
0
k
(
k
+
1
p
)
(
1
p
+
2
p
+
⋯
+
n
p
)
.
{\displaystyle {\begin{aligned}(n+1)^{k+1}-1&=\sum _{m=1}^{n}\left((m+1)^{k+1}-m^{k+1}\right)\\&=\sum _{p=0}^{k}{\binom {k+1}{p}}(1^{p}+2^{p}+\dots +n^{p}).\end{aligned}}}
This in particular yields the examples below – e.g., take k = 1
n
k
+
1
=
∑
m
=
1
n
(
m
k
+
1
−
(
m
−
1
)
k
+
1
)
=
∑
p
=
0
k
(
−
1
)
k
+
p
(
k
+
1
p
)
(
1
p
+
2
p
+
⋯
+
n
p
)
.
{\displaystyle {\begin{aligned}n^{k+1}=\sum _{m=1}^{n}\left(m^{k+1}-(m-1)^{k+1}\right)=\sum _{p=0}^{k}(-1)^{k+p}{\binom {k+1}{p}}(1^{p}+2^{p}+\dots +n^{p}).\end{aligned}}}
Faulhaber's formula was generalized by Guo and Zeng to a q -analog[7] Relationship to Riemann zeta function [ edit ] Using
B
k
=
−
k
ζ
(
1
−
k
)
{\displaystyle B_{k}=-k\zeta (1-k)}
∑
k
=
1
n
k
p
=
n
p
+
1
p
+
1
−
∑
j
=
0
p
−
1
(
p
j
)
ζ
(
−
j
)
n
p
−
j
.
{\displaystyle \sum \limits _{k=1}^{n}k^{p}={\frac {n^{p+1}}{p+1}}-\sum \limits _{j=0}^{p-1}{p \choose j}\zeta (-j)n^{p-j}.}
If we consider the generating function
G
(
z
,
n
)
{\displaystyle G(z,n)}
n
{\displaystyle n}
ℜ
(
z
)
<
0
{\displaystyle \Re (z)<0}
lim
n
→
∞
G
(
z
,
n
)
=
1
e
−
z
−
1
=
∑
j
=
0
∞
(
−
1
)
j
−
1
B
j
z
j
−
1
j
!
{\displaystyle \lim _{n\rightarrow \infty }G(z,n)={\frac {1}{e^{-z}-1}}=\sum _{j=0}^{\infty }(-1)^{j-1}B_{j}{\frac {z^{j-1}}{j!}}}
Heuristically, this suggests that
∑
k
=
1
∞
k
p
=
(
−
1
)
p
B
p
+
1
p
+
1
.
{\displaystyle \sum _{k=1}^{\infty }k^{p}={\frac {(-1)^{p}B_{p+1}}{p+1}}.}
This result agrees with the value of the
Riemann zeta function
ζ
(
s
)
=
∑
n
=
1
∞
1
n
s
{\textstyle \zeta (s)=\sum _{n=1}^{\infty }{\frac {1}{n^{s}}}}
for negative integers
s
=
−
p
<
0
{\displaystyle s=-p<0}
on appropriately analytically continuing
ζ
(
s
)
{\displaystyle \zeta (s)}
.
Umbral form [ edit ] In the umbral calculus , one treats the Bernoulli numbers
B
0
=
1
{\textstyle B^{0}=1}
B
1
=
1
2
{\textstyle B^{1}={\frac {1}{2}}}
B
2
=
1
6
{\textstyle B^{2}={\frac {1}{6}}}
as if the index j in
B
j
{\textstyle B^{j}}
as if the Bernoulli numbers were powers of some object B .
Using this notation, Faulhaber's formula can be written as
∑
k
=
1
n
k
p
=
1
p
+
1
(
(
B
+
n
)
p
+
1
−
B
p
+
1
)
.
{\displaystyle \sum _{k=1}^{n}k^{p}={\frac {1}{p+1}}{\big (}(B+n)^{p+1}-B^{p+1}{\big )}.}
Here, the expression on the right must be understood by expanding out to get terms
B
j
{\textstyle B^{j}}
that can then be interpreted as the Bernoulli numbers. Specifically, using the
binomial theorem , we get
1
p
+
1
(
(
B
+
n
)
p
+
1
−
B
p
+
1
)
=
1
p
+
1
(
∑
k
=
0
p
+
1
(
p
+
1
k
)
B
k
n
p
+
1
−
k
−
B
p
+
1
)
=
1
p
+
1
∑
k
=
0
p
(
p
+
1
j
)
B
k
n
p
+
1
−
k
.
{\displaystyle {\begin{aligned}{\frac {1}{p+1}}{\big (}(B+n)^{p+1}-B^{p+1}{\big )}&={1 \over p+1}\left(\sum _{k=0}^{p+1}{\binom {p+1}{k}}B^{k}n^{p+1-k}-B^{p+1}\right)\\&={1 \over p+1}\sum _{k=0}^{p}{\binom {p+1}{j}}B^{k}n^{p+1-k}.\end{aligned}}}
A derivation of Faulhaber's formula using the umbral form is available in The Book of Numbers by John Horton Conway and Richard K. Guy .[8]
Classically, this umbral form was considered as a notational convenience. In the modern umbral calculus, on the other hand, this is given a formal mathematical underpinning. One considers the linear functional T on the vector space of polynomials in a variable b given by
T
(
b
j
)
=
B
j
.
{\textstyle T(b^{j})=B_{j}.}
∑
k
=
1
n
k
p
=
1
p
+
1
∑
j
=
0
p
(
p
+
1
j
)
B
j
n
p
+
1
−
j
=
1
p
+
1
∑
j
=
0
p
(
p
+
1
j
)
T
(
b
j
)
n
p
+
1
−
j
=
1
p
+
1
T
(
∑
j
=
0
p
(
p
+
1
j
)
b
j
n
p
+
1
−
j
)
=
T
(
(
b
+
n
)
p
+
1
−
b
p
+
1
p
+
1
)
.
{\displaystyle {\begin{aligned}\sum _{k=1}^{n}k^{p}&={1 \over p+1}\sum _{j=0}^{p}{p+1 \choose j}B_{j}n^{p+1-j}\\&={1 \over p+1}\sum _{j=0}^{p}{p+1 \choose j}T(b^{j})n^{p+1-j}\\&={1 \over p+1}T\left(\sum _{j=0}^{p}{p+1 \choose j}b^{j}n^{p+1-j}\right)\\&=T\left({(b+n)^{p+1}-b^{p+1} \over p+1}\right).\end{aligned}}}
A General Formula [ edit ] The series
1
m
+
2
m
+
3
m
+
.
.
n
m
{\displaystyle 1^{m}+2^{m}+3^{m}+..n^{m}}
S
m
{\displaystyle S_{m}}
S
m
{\displaystyle S_{m}}
S
1
:
S
1
N
=
1
2
N
∑
r
=
0
N
(
N
r
)
S
N
+
r
(
1
−
(
−
1
)
N
−
r
)
{\displaystyle S_{1}:\;\;\;S_{1}^{\;N}={\frac {1}{2^{N}}}\sum _{r=0}^{N}{N \choose r}S_{N+r}(1-(-1)^{N-r})}
S
1
{\displaystyle S_{1}}
S
3
,
S
5
,
S
7
{\displaystyle S_{3},\;\;S_{5},\;\;S_{7}}
S
1
2
=
S
3
,
S
1
3
=
1
4
S
3
+
3
4
S
5
,
S
1
4
=
1
2
S
5
+
1
2
S
7
{\displaystyle S_{1}^{\;2}=S_{3},\;\;S_{1}^{\;3}={\frac {1}{4}}S_{3}+{\frac {3}{4}}S_{5},\;\;S_{1}^{\;4}={\frac {1}{2}}S_{5}+{\frac {1}{2}}S_{7}}
S
2
2
=
1
3
S
4
+
2
3
S
5
{\displaystyle S_{2}^{\;2}={\frac {1}{3}}S_{4}+{\frac {2}{3}}S_{5}}
S
2
3
=
1
12
S
4
+
7
12
S
6
+
1
3
S
8
{\displaystyle S_{2}^{\;3}={\frac {1}{12}}S_{4}+{\frac {7}{12}}S_{6}+{\frac {1}{3}}S_{8}}
S
m
N
{\displaystyle S_{m}^{\;N}}
[9]
S
m
N
=
∑
k
=
1
N
(
−
1
)
k
−
1
(
N
k
)
∑
r
=
1
n
r
m
k
S
m
N
−
k
(
r
)
{\displaystyle S_{m}^{\;N}=\sum _{k=1}^{N}(-1)^{k-1}{N \choose k}\sum _{r=1}^{n}r^{mk}S_{m}^{\;\;N-k}(r)}
This can be calculated in matrix form, as described above. In the case when m = 1 it replicates Beardon’s formula for
S
1
N
{\displaystyle S_{1}^{\;N}}
S
2
2
{\displaystyle S_{2}^{\;\;2}}
S
2
3
{\displaystyle S_{2}^{\;3}}
S
2
4
=
1
54
S
5
+
5
18
S
7
+
5
9
S
9
+
4
27
S
11
{\displaystyle S_{2}^{\;4}={\frac {1}{54}}S_{5}+{\frac {5}{18}}S_{7}+{\frac {5}{9}}S_{9}+{\frac {4}{27}}S_{11}}
S
6
3
=
1
588
S
8
−
1
42
S
10
+
13
84
S
12
−
47
98
S
14
+
17
28
S
16
+
19
28
S
18
+
3
49
S
20
{\displaystyle S_{6}^{\;3}={\frac {1}{588}}S_{8}-{\frac {1}{42}}S_{10}+{\frac {13}{84}}S_{12}-{\frac {47}{98}}S_{14}+{\frac {17}{28}}S_{16}+{\frac {19}{28}}S_{18}+{\frac {3}{49}}S_{20}}
See also [ edit ]
^ Donald E. Knuth (1993). "Johann Faulhaber and sums of powers". Mathematics of Computation . 61 (203): 277–294. arXiv :math.CA/9207222 doi :10.2307/2152953 . JSTOR 2152953 .Correct version. Archived 2010-12-01 at the Wayback Machine ^ Gulley, Ned (March 4, 2010), Shure, Loren (ed.), Nicomachus's Theorem ^ Pietrocola, Giorgio (2017), On polynomials for the calculation of sums of powers of successive integers and Bernoulli numbers deduced from the Pascal's triangle (PDF) ^ Derby, Nigel (2015), "A search for sums of powers" , The Mathematical Gazette , 99 (546): 416–421, doi :10.1017/mag.2015.77 , S2CID 124607378 ^ Concrete Mathematics , 1st ed. (1989), p. 275.^ Kieren MacMillan, Jonathan Sondow (2011). "Proofs of power sum and binomial coefficient congruences via Pascal's identity". American Mathematical Monthly 118 (6): 549–551. arXiv :1011.0076 doi :10.4169/amer.math.monthly.118.06.549 . S2CID 207521003 . ^ Guo, Victor J. W.; Zeng, Jiang (30 August 2005). "A q-Analogue of Faulhaber's Formula for Sums of Powers". The Electronic Journal of Combinatorics . 11 (2). arXiv :math/0501441 Bibcode :2005math......1441G . doi :10.37236/1876 . S2CID 10467873 . ^ John H. Conway , Richard Guy (1996). The Book of Numbers 107 . ISBN 0-387-97993-X ^ Derby, Nigel, [A General Formula for Sums of Powers]
External links [ edit ] 
![{\displaystyle \sum _{k=1}^{n}k^{2m+1}={\frac {1}{2^{2m+2}(2m+2)}}\sum _{q=0}^{m}{\binom {2m+2}{2q}}(2-2^{2q})~B_{2q}~\left[(8a+1)^{m+1-q}-1\right].}](https://wikimedia.org/api/rest_v1/media/math/render/svg/bc27eceaadde4620df290aa132c3862224b764e1)
