juantheron
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Positive integer ordered pairs in binomial coefficients (1 Viewer)
- Thread starter juantheron
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Paradoxica
-insert title here-
m9 it's been 3 years. let it go already.
http://math.stackexchange.com/questions/283977/ordered-pairs-in-binomial-coefficients
http://math.stackexchange.com/questions/283977/ordered-pairs-in-binomial-coefficients
For anyone who might want to try this using 2016's factors, here are its factors:
1, 2, 3, 4, 6, 7, 8, 9, 12, 14, 16, 18, 21, 24, 28, 32, 36, 42, 48, 56, 63, 72, 84, 96, 112, 126, 144, 168, 224, 252, 288, 336, 504, 672, 1008, 2016 .
1, 2, 3, 4, 6, 7, 8, 9, 12, 14, 16, 18, 21, 24, 28, 32, 36, 42, 48, 56, 63, 72, 84, 96, 112, 126, 144, 168, 224, 252, 288, 336, 504, 672, 1008, 2016 .
Paradoxica
-insert title here-
The problem with this exact type of problem is that you have to consider every single divisor of whatever number you are solving for, thereby making it a brute force problem.
And 2016 has too many factors to do by hand without it getting very tedious.
And 2016 has too many factors to do by hand without it getting very tedious. (There could be a more elegant way though.)
Paradoxica
-insert title here-
If there is, it is beyond all of stack exchange...
seanieg89
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A rather dry problem but I was a little bored. Here goes:
64C2=2016
24C3=2024
17C4=2380
15C5=3003
14C6=3003
The above binomial coefficients xCy are each those with the least x for a given y such that the binomial coefficient is at least equal to 2016 (v easy to bruteforce with a calc by increasing x till you hit 2016).
Apart from giving us the nontrivial solution at x=64, this also tells us from monotonicity that:
-for x>64, all solutions must have y=1 or x-1.
-for x>=24, all solutions must have y=1,2,x-2,x-1
...
-for x>=14, all solutions must have min(y,x-y) =< 5.
On the y-side of things, these inequalities also tell us by monotonicity that there are no solutions for y=j or x-j where j=3,4,5 and that y=2 and y=x-2 each have a unique solution at x=64.
This tells us that apart from 2016C1,2016C2015,64C2,64C62, all remaining solutions must have y =< x =< 13.
This is very good! These binomial coefficients are small! In fact the largest of them is 13C6=1716<2016 so there is nothing left to check.
I.e. there are precisely four solutions.
64C2=2016
24C3=2024
17C4=2380
15C5=3003
14C6=3003
The above binomial coefficients xCy are each those with the least x for a given y such that the binomial coefficient is at least equal to 2016 (v easy to bruteforce with a calc by increasing x till you hit 2016).
Apart from giving us the nontrivial solution at x=64, this also tells us from monotonicity that:
-for x>64, all solutions must have y=1 or x-1.
-for x>=24, all solutions must have y=1,2,x-2,x-1
...
-for x>=14, all solutions must have min(y,x-y) =< 5.
On the y-side of things, these inequalities also tell us by monotonicity that there are no solutions for y=j or x-j where j=3,4,5 and that y=2 and y=x-2 each have a unique solution at x=64.
This tells us that apart from 2016C1,2016C2015,64C2,64C62, all remaining solutions must have y =< x =< 13.
This is very good! These binomial coefficients are small! In fact the largest of them is 13C6=1716<2016 so there is nothing left to check.
I.e. there are precisely four solutions.
Last edited:
seanieg89
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Yep x-1. Will edit, thanks.$? Because $\binom{x}{x}=1$.$)
juantheron
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Thanks seanieg89 for Nice explanation.