Help with summations for discrete math. sum_{i=28}^{n}(3i^2-4i+(5//7^i))

Jazmyn Saunders

Jazmyn Saunders

Answered question

2022-09-07

Help with summations for discrete math
I could start them but I have no idea how to simplify after expanding them.
i = 28 n ( 3 i 2 4 i + ( 5 / 7 i ) )
i = 1 n i 2 n i + 1

Answer & Explanation

Maggie Tanner

Maggie Tanner

Beginner2022-09-08Added 18 answers

Step 1
- Assuming you know that
i = 0 n i = n ( n + 1 ) 2 , i = 0 n i 2 = n ( n + 1 ) ( 2 n + 1 ) 6
and
i = 0 n r i = 1 r n + 1 1 r , r 1
then you can rewrite the first sum as
i = 28 n ( 3 i 2 4 i + 5 7 i ) = i = 0 n ( 3 i 2 4 i + 5 7 i ) i = 0 27 ( 3 i 2 4 i + 5 7 i )
and observe that
i = 0 n ( 3 i 2 4 i + 5 7 i ) = 3 i = 0 n i 2 4 i = 0 n i + 5 i = 0 n ( 1 7 ) i .
(You can then compute each of the three terms separately.)
Step 2
As for the second, a change of indices gives
i = 1 n i 2 n i + 1 = k = 1 n n k + 1 2 k = ( n + 1 ) k = 1 n 1 2 k k = 1 n k 2 k
The first term, you can compute using the same expression for k = 0 n r k (be careful with the indices!). The second, one way to compute it is to recognize the derivative of some polynomial of the form k = 0 n x k , evaluated at x = 1 / 2 (again, with the appropriate bounds).

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