RE: Studying Mathematics Thread
April 6, 2018 at 4:16 am
(This post was last modified: April 6, 2018 at 4:18 am by robvalue.)
Yup, that is the same method I used.
To get to the next one, you do the same thing but starting with sum[(k+1)^4 - k^4]
Using the binomial theorem, that gives you (inside the sum)
k^4 + 4k^3 + 6k^2 + 4k + 1 - k^4
The k^4 cancels as before, and when you sum everything you can rearrange to find sum(k^3) in terms of sum(k^2) and sum(k) which we already know.
The proof that polymath requested that the answer is 1/p for all powers p is, I expect, the fact that pC1=p (the second coefficient in the binomial expansion is just the power p), which you end up dividing the LHS by. I'd have to write that out better to formalize it
All lower powers ends up disappearing once you divide by k^p and take the limit.
To get to the next one, you do the same thing but starting with sum[(k+1)^4 - k^4]
Using the binomial theorem, that gives you (inside the sum)
k^4 + 4k^3 + 6k^2 + 4k + 1 - k^4
The k^4 cancels as before, and when you sum everything you can rearrange to find sum(k^3) in terms of sum(k^2) and sum(k) which we already know.
The proof that polymath requested that the answer is 1/p for all powers p is, I expect, the fact that pC1=p (the second coefficient in the binomial expansion is just the power p), which you end up dividing the LHS by. I'd have to write that out better to formalize it
All lower powers ends up disappearing once you divide by k^p and take the limit.
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