Difference between revisions of "2010 USAMO Problems/Problem 5"
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\begin{align*} | \begin{align*} | ||
\frac{1}{p} - 2S_q | \frac{1}{p} - 2S_q | ||
− | &= \frac{1}{2r+1} - \left(\sum_{k= | + | &= \frac{1}{2r+1} - \left(\sum_{k=2}^{3r+1}\frac{1}{k} - \sum_{k=1}^{r} \frac{1}{k}\right) \\ |
&= \frac{1}{2r+1} - \left(\sum_{k=r+1}^{3r+1}\frac{1}{k} - 1\right) \\ | &= \frac{1}{2r+1} - \left(\sum_{k=r+1}^{3r+1}\frac{1}{k} - 1\right) \\ | ||
&= 1 - \left(\sum_{k=r+1}^{2r}\frac{1}{k} + \sum_{k=2r+2}^{3r+1}\frac{1}{k}\right) | &= 1 - \left(\sum_{k=r+1}^{2r}\frac{1}{k} + \sum_{k=2r+2}^{3r+1}\frac{1}{k}\right) |
Revision as of 22:14, 26 April 2011
Problem
Let where is an odd prime, and let
Prove that if for integers and , then is divisible by .
Solution
Since is an odd prime, , for a suitable positive integer , and consequently .
The partial-fraction decomposition of the general term of is:
therefore
with and positive relatively-prime integers.
Since and is a prime, in the final sum all the denominators are relatively prime to , but all the numerators are divisible by , and therefore the numerator of the reduced fraction will be divisible by . Since the sought difference , we conclude that divides as required.
Alternative Calculation
We can obtain the result in a slightly different way:
In the above sum the denominators of the fractions represent each non-zero remainder exactly once. Multiplying all the denominators yields a number that is . The numerator is times the sum of the inverses of each non-zero remainder, and since this sum is , the numerator is . The rest of the argument is as before.
See also
2010 USAMO (Problems • Resources) | ||
Preceded by Problem 4 |
Followed by Problem 6 | |
1 • 2 • 3 • 4 • 5 • 6 | ||
All USAMO Problems and Solutions |