How is the summation being expanded? I am trying to understand summations by solving some example p

cooloicons62

cooloicons62

Answered question

2022-07-07

How is the summation being expanded?
I am trying to understand summations by solving some example problems, but I could not understand how is the second to last line being expanded? I would really appreciate if you could explain me how is it being expanded.
i = 1 n 1 j = i + 1 n k = 1 j 1 = i = 1 n 1 j = i + 1 n j = i = 1 n 1 ( j = 1 n j j = 1 i j ) = i = 1 n 1 ( n ( n + 1 ) 2 i ( i + 1 ) 2 ) = 1 2 i = 1 n 1 n 2 + n i 2 i = 1 2 ( ( n 1 ) n 2 + ( n 1 ) n ( n ( n + 1 ) ( 2 n + 1 ) 6 n 2 ) ( n ( n + 1 ) 2 n ) ) = f ( n ) = n ( n ( n + 1 ) ) 2 n ( n + 1 ) ( 2 n + 1 ) 12 n ( n + 1 ) 4

Answer & Explanation

Keegan Barry

Keegan Barry

Beginner2022-07-08Added 18 answers

Step 1
I take it that what has to be explained is this (I've introduced parentheses on the left hand side for clarity):
i = 1 n 1 ( n 2 + n i 2 i ) = ( n 1 ) n 2 + ( n 1 ) n ( n ( n + 1 ) ( 2 n + 1 ) 6 n 2 ) ( n ( n + 1 ) 2 n ) .
This equation results from adding together the following four identities:
i = 1 n 1 n 2 = ( n 1 ) n 2 , i = 1 n 1 n = ( n 1 ) n , i = 1 n 1 i 2 = i = 1 n i 2 n 2 = n ( n + 1 ) ( 2 n + 1 ) 6 n 2 , i = 1 n 1 i = i = 1 n i n = n ( n + 1 ) 2 n .
Step 1
Lines 4 and 6 follow, of course, from the familiar identities:
i = 1 n i 2 = n ( n + 1 ) ( 2 n + 1 ) 6 , i = 1 n i = n ( n + 1 ) 2 .
I don't know why it was done this way! It seems to me that it would have been simpler just to write:
i = 1 n 1 i 2 = ( n 1 ) n ( 2 n 1 ) 6 , i = 1 n 1 i = ( n 1 ) n 2 .
(Also, in the comments, I've suggested two ways to arrive at the final answer with less calculation.)
kolutastmr

kolutastmr

Beginner2022-07-09Added 2 answers

Step 1
Starting from line 4 of the displayed equation, we have
i = 1 n 1 n ( n + 1 ) 2 = ( n 1 ) n ( n + 1 ) 2 because there are n 1 equal terms. Also, i = 1 n 1 i ( i + 1 ) 2 = i = 1 n 1 ( i ( i + 1 ) ( i + 2 ) 6 ( i 1 ) i ( i + 1 ) 6 ) is a telescoping sum, hence equal to ( n 1 ) n ( n + 1 ) 0 6 .
Step 2
Therefore, the whole sum is equal to ( n 1 ) n ( n + 1 ) 2 ( n 1 ) n ( n + 1 ) 6 = ( n 1 ) n ( n + 1 ) 3 .
The "weird" decomposition above comes in fact from a general property of the raising factorials: e.g.
i ( i + 1 ) ( i + 2 ) ( i + 3 ) ( i + 4 ) ( i 1 ) i ( i + 1 ) ( i + 2 ) ( i + 3 ) = 5 i ( i + 1 ) ( i + 2 ) ( i + 3 ) .

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