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ecoist
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Average condition implies sequence is constant
« on: Feb 28th, 2006, 9:21pm » |
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A certain sequence of 100 real numbers has the property that, for every subsequence of 8 of these numbers, there exists a subsequence of 9 of these numbers with the same average as the 8. Show that the entire sequence is constant. (Appeared in sci.math. I seem to be the only one in posession of an elementary proof. Who else belongs to this club?)
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« Last Edit: Mar 1st, 2006, 6:02am by ecoist » |
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Icarus
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Re: Average condition implies sequence is constant
« Reply #1 on: Mar 1st, 2006, 4:04pm » |
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Are you sure there isn't a flaw in your elementary proof? I have come up with a couple of elementary "almost" proofs, that trip up on subtleties.
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"Pi goes on and on and on ... And e is just as cursed. I wonder: Which is larger When their digits are reversed? " - Anonymous
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ecoist
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Re: Average condition implies sequence is constant
« Reply #2 on: Mar 1st, 2006, 5:06pm » |
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Good point. However, I have worked on this for years without success, until now. I have also seen a very clever, but not elementary, proof. What finally enabled me to prove this with an elementary argument was seeing a proof of the following similar problem. hidden: | You have 11 weights with the property that, after removing any one of the weights, the remaining 10 weights can be split into two groups of 5 weights each which balance on a scale. Must then all the weights be the same? |
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ecoist
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Re: Average condition implies sequence is constant
« Reply #3 on: Mar 1st, 2006, 5:15pm » |
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Sorry. My reply probably did not convince you that my proof is correct. It is. It has been checked by experts. I hope you can solve the problem without looking at the similar problem (although it is a very weak hint).
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Icarus
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Re: Average condition implies sequence is constant
« Reply #4 on: Mar 1st, 2006, 5:32pm » |
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I wasn't particularly doubting you, either. I don't have enough information to say one way or another. It just seemed a possibility, particularly given that my first thoughts failed on a some-what subtle point. Since I don't know your math skills, I didn't know if perhaps you had missed that or a similar flaw. After a suitable time has passed for our own attempts, I look forward to seeing your proof.
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ecoist
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Re: Average condition implies sequence is constant
« Reply #5 on: Jun 28th, 2006, 9:12pm » |
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Is it time for a hint? This is a really nice problem and a hint might spoil things for those who want no help. Besides, the only hint I can think of could be a near giveaway.
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Barukh
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Re: Average condition implies sequence is constant
« Reply #6 on: Jun 28th, 2006, 11:54pm » |
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on Jun 28th, 2006, 9:12pm, ecoist wrote: It probably is.
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ecoist
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Re: Average condition implies sequence is constant
« Reply #7 on: Jun 30th, 2006, 8:37pm » |
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Ok, Barukh, but I'm afraid that this hint may be too big. Assume first that all 100 numbers in the sequence are integers.
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Icarus
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Re: Average condition implies sequence is constant
« Reply #8 on: Jul 1st, 2006, 12:21pm » |
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I don't have a complete proof yet, but it looks like you can show that if the sequence has at least 2 values, then you can force a never-ending series of new values from those two using the average rule. Since the sequence is finite, this is impossible.
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ecoist
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Re: Average condition implies sequence is constant
« Reply #9 on: Jul 2nd, 2006, 11:25am » |
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Icarus' proof outline made me wonder where finiteness comes in in my proof (not really my proof, a correction of someone's flawed but lovely proof). It turns out that, if the sequence consists of integers, it is constant even when the sequence is infinite. My proof requires finiteness only to extend the proof from integer sequences to real number sequences. This is what fascinates me about this problem. I know of no other fact about real numbers whose proof depends on results from the theory of integers. Maybe Icarus will show that this problem doesn't depend on the integers either.
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Barukh
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Re: Average condition implies sequence is constant
« Reply #10 on: Jul 4th, 2006, 12:36am » |
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I've got a question: Does the situation changes if we replace parameters 8 and 9 to 1 and 2 accordingly?
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ecoist
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Re: Average condition implies sequence is constant
« Reply #11 on: Jul 4th, 2006, 9:45am » |
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My proof crumbles with 1 and 2, Barukh. But it continues to work if 8 and 9 are replaced by, resp., a>1 and b relatively prime to a (recently noticed that it suffices if a>1 and a does not divide b).
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pex
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Re: Average condition implies sequence is constant
« Reply #12 on: Jul 4th, 2006, 9:55am » |
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on Jul 4th, 2006, 9:45am, ecoist wrote:My proof crumbles with 1 and 2, (...) |
| ..., as it should, since a sequence with 50 x's and 50 y's does the trick.
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ecoist
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Re: Average condition implies sequence is constant
« Reply #13 on: Jul 4th, 2006, 10:28am » |
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Good point, pex. Your example shows that the result is also false if a divides b (provided a and b are small enough relative to 100).
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Icarus
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Re: Average condition implies sequence is constant
« Reply #14 on: Jul 5th, 2006, 8:16pm » |
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on Jul 2nd, 2006, 11:25am, ecoist wrote:I know of no other fact about real numbers whose proof depends on results from the theory of integers. |
| Sorry that I haven't done more. I've had too much to think about lately and haven't been inclined to get too deep into this as a result. But I would like to point out that in some sense all results about real numbers depend on the theory of integers, since you can develop the real numbers and all their properties from the theory of integers.
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ecoist
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Re: Average condition implies sequence is constant
« Reply #15 on: Jul 5th, 2006, 9:32pm » |
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Naturally, I am anxious to see what you guys come up with, but I can be patient. This problem is well worth the wait. Of course you are right, Icarus, but I doubt if anyone thinks that the mean value theorem is a consequence of number theory. Its proof certainly does not make explicit use of any purely number-theoretic results. That said, the only proofs I know of this problem make direct use of number theory. Moreover, even after the problem is solved for integer sequences, the first proof I saw had to invoke some relatively advanced mathematics to extend the result from integer sequences to real number sequences. My contribution eliminates the esoteric math. I can state that bit of esoteric math if someone wants a second hint.
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Michael Dagg
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Re: Average condition implies sequence is constant
« Reply #16 on: Jul 7th, 2006, 6:18am » |
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By "subsequence" of 8 do you mean 8 _consecutive_ elements of the sequence? Same question for the subsequence of 9 of these numbers...
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« Last Edit: Jul 7th, 2006, 6:20am by Michael Dagg » |
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Regards, Michael Dagg
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ecoist
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Re: Average condition implies sequence is constant
« Reply #17 on: Jul 7th, 2006, 9:23am » |
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The subsequences of lengths 8 and 9 need not be consecutive. Pretty strong assumption given the seemingly milder assumption of the related problem I mentioned early in this thread. Now I realize that one can assume the condition applies to only consecutive subsequences of length 8, provided wraparound is allowed and the length of the whole sequence is 101 instead of 100.
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JP05
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Re: Average condition implies sequence is constant
« Reply #18 on: Jul 9th, 2006, 4:31pm » |
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Let me ask a question here: For example, let A = {1, 2, 3, 4, 5, 6, 7, 8} and B = {11, 1, 13, 14, 2, 3, 10, 4, 22, 5, 6, 7, 19, 22, 8, 43,..., --> the reset of the numbers up to 100 of them}. I know the numbers can be real numbers but I just used integers and I know the set A does not have to have 1-8 as shown. So A is a subsequence of B by your rules?
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ecoist
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Re: Average condition implies sequence is constant
« Reply #19 on: Jul 9th, 2006, 6:40pm » |
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The important thing, JP05, is that a number can appear more than once among the 100 numbers. I could have used the term multiset instead of sequence but I thought readers would find the latter more readable. So, your example would be more accurate if you allowed A to have repeated numbers and B to contain all the elements of A, including all of its repeats. For example, A={1,1,1,2,2,2,2,3} and B=(17, 3, 2,1,-7,2,1,1,2,4,13,...,2,...}. Note that the ordering of the elements doesn't matter, just their presence including multiplicities.
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JP05
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Re: Average condition implies sequence is constant
« Reply #20 on: Jul 9th, 2006, 7:20pm » |
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Does seem difficult from my view probably because I do not have the artillery to solve it. It kinda makes me think of some exotic triangle number problem.
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ecoist
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Re: Average condition implies sequence is constant
« Reply #21 on: Jul 9th, 2006, 9:28pm » |
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It is indeed a difficult problem but, surprisingly (given the first solution I saw), no more than high school mathematics is required.
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JP05
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Re: Average condition implies sequence is constant
« Reply #22 on: Jul 10th, 2006, 8:24pm » |
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Thanks but I wouldn't know where to start with this one. Seems to me that if it is true for 100 real numbers then it should be true for 1000 real numbers. Expect one of the hard-hitters to get it.
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ecoist
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Re: Average condition implies sequence is constant
« Reply #23 on: Jul 10th, 2006, 9:15pm » |
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You are not alone, JP05, and you are right. The number 100 is not sacred; any length sequence will do. As I assume Icarus did, I was able to prove that the 9 smallest (or 9 largest) numbers are all equal, but I couldn't extend this to all 100 numbers (hence, if there were only 17 numbers altogether, we are done). Everyone has his own unique way of looking at things. Maybe the similar problem I hid in an earlier post will seem more accessible to you. If you can solve it, this problem may look more manageable, as it did for me. It never ocurred to me to assume first that the 100 numbers were integers. If it had ocurred to me, maybe I could have made some progress. But, since the "hard-hitters" have yet to put this baby to bed, I probably would have still failed to make any headway. Polya wrote that sometimes a more general problem is easier to solve. It turns out that this problem remains true if the 100 numbers are complex numbers.
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James Fingas
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Re: Average condition implies sequence is constant
« Reply #24 on: Jul 25th, 2006, 10:57am » |
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Start of a solution: hidden: | Form all the different average values that can be formed by choosing 8 numbers from the set. Take the largest and call it A. Now find the selection of 9 numbers a1, a2, ... a9, that has the average A. Find the smallest of those 9, call it ai, and take it away from the set. Now you have a set of 8 numbers, with an average value of 9A/8 - ai/8. Since A is the largest average we can have, we know that: A >= 9A/8 - ai/8 0 >= A/8 - ai/8 ai >= A Because ai is the smallest in the set, we know that it cannot be larger than the average: ai <= A Hence ai = A, which is a way of saying that the set of 100 must have at least 9 copies of A in it. |
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