Difference between revisions of "2020 USOMO Problems/Problem 4"
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There are <math>n</math> terms, so our answer be <math>2n-3</math> and in case of <math>n=100</math> that means | There are <math>n</math> terms, so our answer be <math>2n-3</math> and in case of <math>n=100</math> that means | ||
<cmath>\boxed{N=197}.</cmath>~Lopkiloinm | <cmath>\boxed{N=197}.</cmath>~Lopkiloinm | ||
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+ | -in collaboration with WONGBOB |
Revision as of 23:53, 8 December 2020
Problem 4
Suppose that are distinct ordered pairs of nonnegative integers. Let denote the number of pairs of integers satisfying and . Determine the largest possible value of over all possible choices of the ordered pairs.
Solution
Let's start off with just and suppose that it satisfies the given condition. We could use for example. We should maximize the number of conditions that the third pair satisfies. We find out that the third pair should equal or
We know this must be true:
So
We require the maximum conditions for
Then one case can be:
We try to do some stuff such as solving for with manipulations:
We showed that 3 pairs are a complete graph, but 4 pairs are not a complete graph. We will now show that
This is clearly impossible because RHS must be even. OK, so we done. Not yet. We not solve answer yet. The answer is clearly that: has subtractions that follow condition while has and then the rest has . There are terms, so our answer be and in case of that means ~Lopkiloinm
-in collaboration with WONGBOB