How does:
1 + 2 + ... + N-1 + N
+ N + N-1 + ... + 2 + 1
---------------------------
N+1 + N+1 + ... + N+1 + N+1
equal N(N + 1)? Shouldn't it be 4N + 4 or 4(N + 1)?
asked Jan 22, 2010 at 6:44
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1And where is your programming question?– Doc BrownJan 22, 2010 at 6:48
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@Doc Brown, can you please stop saying 'Jigawatts'.– paviumJan 22, 2010 at 6:50
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Is the question how the sum of 1 to N is N(N+1)? It's actually N(N+1)/2.– MSNJan 22, 2010 at 6:50
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1doc brown: programming is basically an applied form of maths, so let's be generous.– CarstenJan 22, 2010 at 6:52
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2@Carsten: by that argument you can justify almost any math question here on SO. By the way, you might have noticed, I gave the OP an serious answer.– Doc BrownJan 22, 2010 at 6:57
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4 Answers
It is N(N + 1).
Because you have N number of (N+1) terms.
answered Jan 22, 2010 at 6:47
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1Oh my god, that is the most elegant answer i've ever seen. Well done. +1– Ian BoydJan 29, 2010 at 23:22
If N is 4, sure. Otherwise you need to fill in the rest of the elided values that the ellipses represent.
answered Jan 22, 2010 at 6:47
Ignacio Vazquez-AbramsIgnacio Vazquez-Abrams
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i assume your notation means row 1 + row 2 = row 3?
in this case, look at the columns. Each column of the first 2 rows adds up to n+1. there are n columns. thus row 1 + row 2 = n*(n+1)
Read the part about the early years of Carl Friederich Gauss here. He solved almost the same problem when he was in primary school.
