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Title: Integer inequalities Post by NickH on Nov 30th, 2004, 2:44pm Find the smallest positive integers A, B, C, D, such that A+A > A+B > A+C > B+B > B+C > A+D > C+C > B+D > C+D > D+D. (If there is any ambiguity, choose smallest D, then smallest C, then smallest B, and finally smallest A.) |
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Title: Re: Integer inequalities Post by towr on Nov 30th, 2004, 3:43pm Maybe I'm getting it wrong, but there doesn't seem to be a solution.. |
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Title: Re: Integer inequalities Post by NickH on Nov 30th, 2004, 4:38pm Quote:
There is definitely a solution! |
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Title: Re: Integer inequalities Post by Aryabhatta on Nov 30th, 2004, 4:57pm is it [hide] 1,5,7,10 [/hide]? Found it easier to work putting B = A-X, C = A-Y and D = A-Z and finding possible values of X,Y,Z. |
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Title: Re: Integer inequalities Post by towr on Dec 1st, 2004, 12:47am ::[hide]0,4,6,9[/hide]:: |
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Title: Re: Integer inequalities Post by Grimbal on Dec 1st, 2004, 2:32am Positive integers! ::[hide]A,B,C,D = 10,7,5,1[/hide]:: |
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Title: Re: Integer inequalities Post by towr on Dec 1st, 2004, 7:02am I'm an optimist, I consider everything that's not negative positive ;) |
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Title: Re: Integer inequalities Post by Aryabhatta on Dec 1st, 2004, 11:27am on 12/01/04 at 07:02:49, towr wrote:
Wouldn't that make you a realist? An optimist would consider even a negative as positive.. ;D |
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Title: Re: Integer inequalities Post by TenaliRaman on Dec 1st, 2004, 9:04pm LOL!! This reminds me of a discussion i had with a philosophist. During our discussion (math based) we came up with something like this, Optimistic function : f(x) = abs(x) Realistic function : f(x) = x Ignorant function : f(x) = signum(x) Pessimistic function : f(x) = min(-inf,x) OverConfident function : f(x) = max(x,inf) We had more of this , i dont recall well .... If u were wondering what we were discussing , we were trying to capture emotions in mathematical symbols :D |
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Title: Re: Integer inequalities Post by Sir Col on Dec 14th, 2004, 7:48am *chuckle* ;D I love the pessimistic function! I'm sure we can add a few more to these... Exaggerating function: f(x)=2x Boring function: f(x)=0 Unoriginal/copycat function: f(x)=x [So I suppose that realists are unoriginal copycats!] Contradictory function: f(x)=-x Temperamental/unpredicatable/chaotic function: f(z)=z100, where z0=z and zn+1=zn2+z0 |
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Title: Re: Integer inequalities Post by THUDandBLUNDER on Dec 14th, 2004, 5:06pm PMT function: f(x) = sin(1/x) |
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Title: Re: Integer inequalities Post by John_Gaughan on Dec 15th, 2004, 6:41am PMT function? on 12/14/04 at 07:48:38, Sir Col wrote:
Interesting function. I wrote a program to calculate the sequence this generates, and noticed some interesting properties. Consecutive values tend to be different by one, with wild variances in the value and sign of numbers. Code:
Edit: I think the sign issue comes from the fact that this thing overflows even 64 bit integers. |
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Title: Re: Integer inequalities Post by THUDandBLUNDER on Dec 15th, 2004, 7:46am Quote:
Pre Menstrual Tension I thought you said you were married. ;) |
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Title: Re: Integer inequalities Post by towr on Dec 15th, 2004, 11:02am on 12/15/04 at 06:41:18, John_Gaughan wrote:
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Title: Re: Integer inequalities Post by John_Gaughan on Dec 15th, 2004, 11:12am on 12/15/04 at 07:46:19, THUDandBLUNDER wrote:
I am. Here in the ol' USA we call it PMS: the 'S' stands for "Syndrome." |
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Title: Re: Integer inequalities Post by TenaliRaman on Dec 18th, 2004, 7:06am Consider f(x) as monotonically decreasing and g(x) as monotonically increasing function ... we form a new function phi(x) = f(x) + g(x) This is an altruistic function ;D |
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