Sum of multiple of two binomial coefficient. sum_{i=0}^{n-1}(2i+1)((m-2),(n-1-i))((n),(i+1))=2(n-1)((2n-3),(n))+((2(n-1)),(n))+2((2n-3),(n-1))

Pavukol

Pavukol

Answered question

2022-09-06

Sum of multiple of two binomial coefficient
I'm trying to show this equality. I try to expand it but I have no idea to go on.Thanks in advance for your help. The equality is
i = 0 n 1 ( 2 i + 1 ) ( n 2 n 1 i ) ( n i + 1 ) = 2 ( n 1 ) ( 2 n 3 n ) + ( 2 ( n 1 ) n ) + 2 ( 2 n 3 n 1 )
I write the left side of equality as below
i = 0 n 1 ( 2 ( i + 1 ) 1 ) ( n 2 n 1 i ) ( n i + 1 ) = 2 i = 0 n 1 ( i + 1 ) ( n 2 n 1 i ) ( n i + 1 ) i = 0 n 1 ( n 2 n 1 i ) ( n i + 1 ) = 2 n ( n 2 n 1 i ) ( n 1 i ) ( 2 ( n 1 ) n ) = 2 n ( 2 n 3 n 1 ) ( 2 ( n 1 ) n )

Answer & Explanation

Francis Blanchard

Francis Blanchard

Beginner2022-09-07Added 12 answers

Step 1
1. Rewrite 2 i + 1 as 2 ( i + 1 ) 1, and split into two sums.
Step 2
2. For the left sum, apply ( i + 1 ) ( n i + 1 ) = n ( n 1 i ) .
Step 3
3. For both sums, use Vandermonde.
nizkem0c

nizkem0c

Beginner2022-09-08Added 13 answers

Step 1
Let j = i + 1 you can write your sum as:
j = 1 n ( 2 j 1 ) ( n 2 n j ) ( n j ) = 2 [ j = 1 n j ( n 2 n j ) ( n j ) ] [ j = 1 n ( n 2 n j ) ( n j ) ]
You can use the hypergeometrics sums:
j = max { 0 , d + m N } min { m , d } ( d j ) ( N d m j ) = ( N m ) , j = max { 0 , d + m N } min { m , d } j ( d j ) ( N d m j ) = ( N m ) m d N
Step 2
You can choose d = n, m = n and N = 2 n 2 to prove:
j = 1 n ( n j ) ( n 2 n j ) = j = 2 n ( n j ) ( n 2 n j ) + n ( n 2 n 1 ) = ( 2 n 2 n ) + n ( n 2 n 1 ) j = 1 n j ( n j ) ( n 2 n j ) = j = 2 n j ( n j ) ( n 2 n j ) + n ( n 2 n 1 ) = ( 2 n 2 n ) n 2 2 n 2 + n ( n 2 n 1 )  
Step 3
Finally
j = 1 n ( 2 j 1 ) ( n 2 n j ) ( n j ) = ( 2 n 2 n ) [ 2 n 2 2 n 2 ] + n ( n 2 n 1 )

Do you have a similar question?

Recalculate according to your conditions!

New Questions in Discrete math

Ask your question.
Get an expert answer.

Let our experts help you. Answer in as fast as 15 minutes.

Didn't find what you were looking for?