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Mar 8th, 2004, 04:01 PM
#1
Thread Starter
Fanatic Member
Finding sum of an exponential (not geometric) series
If I want to find the sum of a series that is = x^2, how can I do it without adding each individual element?
For example, with linear series, you take the lowest and highest values (at the beginning and end) to get the average, then multiply by the number of elements. I've been trying to figure out one for
1^2+2^2 + 3^2 + ... n^2
but keep hitting dead ends. Care to help?
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Mar 8th, 2004, 10:19 PM
#2
Fanatic Member
Massey RuleZ! ^-^__  Cheers!  __^-^ Massey RuleZ!
Did you know that...
The probability that a random rational number has an even denominator is 1/3 (Salamin and Gosper 1972)? This result is independently verified by me (2002)!
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Mar 8th, 2004, 10:29 PM
#3
Thread Starter
Fanatic Member
Could you explain how you found it? Just searched? I worked for awhile trying to figure it out on my own.
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Mar 9th, 2004, 06:07 AM
#4
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Mar 9th, 2004, 07:26 AM
#5
Thread Starter
Fanatic Member
You know I was basing my entire problem on that regularity? (the +1, +3, +5) I just didn't consider actually shoving it into an equation!
I hope this doesn't mean geometric series can't be summed... (since their pattern just moves to the right if you try adding, only multiplying works..)
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Mar 10th, 2004, 05:02 AM
#6
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