Find a closed form for sum_{k=0}^{n}k^5 using generating functions.

cyrilicesj

cyrilicesj

Answered question

2022-09-05

Find a closed form for k = 0 n k 5 using generating functions.

Answer & Explanation

Ashlee Ramos

Ashlee Ramos

Beginner2022-09-06Added 20 answers

Step 1
It seems there's just an off-by-one error. Note that since
f ( x ) = n = 0 k = 0 n k 5 x n = 0 + x + 32 x 2 + 276 x 3 + 1 300 x 4 = x + 26 x 2 + 66 x 3 + 26 x 4 + x 5 ( 1 x ) 7
the coefficients a n should be considered as
(1) n 0 1 2 3 4 a n 0 1 33 276 1 300
Taking an as in (1) will result in
k = 1 n k 5 = m = 0 4 A ( 5 , m ) ( n + m + 1 6 ) = ( n + 1 6 ) + 26 ( n + 2 6 ) + 66 ( n + 3 6 ) + 26 ( n + 4 6 ) + ( n + 5 6 )
where A ( 5 , m ) : 1 , 26 , 66 , 26 , 1 are Eulerian numbers which provide nice connections with k-th powers of natural numbers.
The sequence
( n + 6 6 ) + 26 ( n + 5 6 ) + 66 ( n + 4 6 ) + 26 ( n + 3 6 ) + ( n + 2 6 ) ( n 0 )
starts with 1,33,276,1300,…

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