Difference between revisions of "1967 IMO Problems/Problem 5"
(Created page with "Take |a1| >= |a2| >= ... >= |a8|. Suppose that |a1|, ... , |ar| are all equal and greater than |ar+1|. Then for sufficiently large n, we can ensure that |as|n < 1/8 |a1|n for ...") |
Catoptrics (talk | contribs) (Latexed the document.) |
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| − | Take | | + | Take <math>|a_1| >= |a_2| >= ... >= |a_8|</math>. Suppose that <math>|a_1|, ... , |a_r|</math> are all equal and greater than <math>|a_{r+1}|</math>. Then for sufficiently large <math>n</math>, we can ensure that <math>|a_s|n < \frac{1}{8} |a_1|n</math> for <math>s > r</math>, and hence the sum of <math>|a_s|n</math> for all <math>s > r</math> is less than <math>|a_1|n</math>. Hence <math>r</math> must be even with half of <math>a_1, ... , a_r</math> positive and half negative. |
| − | If that does not exhaust the | + | If that does not exhaust the <math>a_i</math>, then in a similar way there must be an even number of <math>a_i</math> with the next largest value of <math>|a_i|</math>, with half positive and half negative, and so on. Thus we find that <math>cn = 0</math> for all odd <math>n</math>. |
Revision as of 10:18, 30 June 2020
Take 
. Suppose that 
are all equal and greater than 
. Then for sufficiently large 
, we can ensure that 
for 
, and hence the sum of 
for all is less than 
. Hence 
must be even with half of 
positive and half negative.
If that does not exhaust the 
, then in a similar way there must be an even number of with the next largest value of 
, with half positive and half negative, and so on. Thus we find that 
for all odd .
