Difference between revisions of "1979 IMO Problems/Problem 5"
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==Problem== | ==Problem== | ||
| − | Determine all real numbers a for which there exists | + | Determine all real numbers a for which there exists non-negative reals <math>x_{1}, \ldots, x_{5}</math> which satisfy the relations <math> \sum_{k=1}^{5} kx_{k}=a,</math> <math> \sum_{k=1}^{5} k^{3}x_{k}=a^{2},</math> <math> \sum_{k=1}^{5} k^{5}x_{k}=a^{3}.</math> |
==Solution== | ==Solution== | ||
| − | + | Let <math>\Sigma_1= \sum_{k=1}^{5} kx_{k}</math>, <math>\Sigma_2=\sum_{k=1}^{5} k^{3}x_{k}</math> and <math>\Sigma_3=\sum_{k=1}^{5} k^{5}x_{k}</math>. For all pairs <math>i,j\in \mathbb{Z}</math>, let<cmath>\Sigma(i,j)=i^2j^2\Sigma_1-(i^2+j^2)\Sigma_2+\Sigma_3</cmath>Then we have on one hand<cmath>\Sigma(i,j)=i^2j^2\Sigma_1-(i^2+j^2)\Sigma_2+\Sigma_3=\sum_{k=1}^5(i^2j^2k-(i^2+j^2)k^3+k^5)x_k =\sum_{k=1}^5k(i^2j^2-(i^2+j^2)k^2+k^4)x_k</cmath>Therefore \\(1)<cmath>\Sigma(i,j)=\sum_{k=1}^5k(k^2-i^2)(k^2-j^2)x_k</cmath>and on the other hand \\ (2)<cmath>\Sigma(i,j)=i^2j^2a-(i^2+j^2)a^2+a^3=a(a-i^2)(a-j^2)</cmath>Then from (1) we have<cmath>\Sigma(0,5)=\sum_{k=1}^5k^3(k^2-5^2)x_k\leq 0</cmath>and from (2)<cmath>\Sigma(0,5)=a^2(a-25)</cmath>so <math>a\in [0,25]</math> Besides we also have from (1)<cmath>\Sigma(0,1)=\sum_{k=1}^5k^3(k^2-1)x_k\geq 0</cmath>and from (2)<cmath>\Sigma(0,1)=a^2(a-1)\geq 0 \implies a\notin (0,1)</cmath>and for <math>n=1,2,3,4</math><cmath>\Sigma(n,n+1)=\sum_{k=1}^5k(k^2-n^2)(k^2-(n+1)^2)x_k</cmath>where in the right hand we have that<cmath>k<n \implies (k^2-n^2)<0, (k^2-(n+1)^2)<0</cmath>, so<cmath>(k^2-n^2)(k^2-(n+1)^2)>0</cmath>,<cmath>k=n,n+1 , \implies (k^2-n^2)(k^2-(n+1)^2)=0</cmath>and<cmath>k>n \implies (k^2-n^2)(k^2-(n+1)^2)>0</cmath>, so<cmath>\Sigma(n,n+1)\geq 0</cmath>for <math>n=1,2,3,4</math> From the latter and (2) we also have<cmath>\Sigma(n,n+1)=a(a-n^2)(a-(n+1)^2))\geq 0\implies a\notin (n^2,(n+1)^2)</cmath>So we have that<cmath>a\in [0,25]-\bigcup_{n=0}^4(n^2,(n+1^2))=\{0,1,4,9,16,25\}</cmath> | |
| + | If <math>a=k^2</math>, <math>k=0,1,2,3,4,5</math> take <math>x_k=k</math>, <math>x_j=0</math> for <math>j\neq k</math>. Then <math>\Sigma_1=k^2=a</math>, <math>\Sigma_2=k^3k=k^4=a^2</math>, and <math>\Sigma_3=k^5k=k^6=a^3</math> | ||
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== See Also == {{IMO box|year=1979|num-b=4|num-a=6}} | == See Also == {{IMO box|year=1979|num-b=4|num-a=6}} | ||
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Latest revision as of 09:55, 30 September 2022
Problem
Determine all real numbers a for which there exists non-negative reals 
which satisfy the relations 
Solution
Let 
, 
and 
. For all pairs 
, let![\[\Sigma(i,j)=i^2j^2\Sigma_1-(i^2+j^2)\Sigma_2+\Sigma_3\]](http://latex.artofproblemsolving.com/3/9/b/39b56a4eccc2eeebaab5f870cda8312eddc8c9e5.png)
Then we have on one hand![\[\Sigma(i,j)=i^2j^2\Sigma_1-(i^2+j^2)\Sigma_2+\Sigma_3=\sum_{k=1}^5(i^2j^2k-(i^2+j^2)k^3+k^5)x_k =\sum_{k=1}^5k(i^2j^2-(i^2+j^2)k^2+k^4)x_k\]](http://latex.artofproblemsolving.com/b/2/e/b2e0d22d3e1a971f0ca9d134bec7282c0ab01461.png)
Therefore \\(1)![\[\Sigma(i,j)=\sum_{k=1}^5k(k^2-i^2)(k^2-j^2)x_k\]](http://latex.artofproblemsolving.com/d/3/0/d30f9c854cbff4ea35e5e05b329d5da6450cf50a.png)
and on the other hand \\ (2)![\[\Sigma(i,j)=i^2j^2a-(i^2+j^2)a^2+a^3=a(a-i^2)(a-j^2)\]](http://latex.artofproblemsolving.com/7/0/5/7056e9ff66736d1c2d08200727670dd79d8ed8ce.png)
Then from (1) we have![\[\Sigma(0,5)=\sum_{k=1}^5k^3(k^2-5^2)x_k\leq 0\]](http://latex.artofproblemsolving.com/c/a/c/cac0d33f30e130fbbe7c0f346e92a952fdef463e.png)
and from (2)![\[\Sigma(0,5)=a^2(a-25)\]](http://latex.artofproblemsolving.com/e/4/7/e47de2de2c4422884d3dd67202f3ce17d3f5d9eb.png)
so ![$a\in [0,25]$](http://latex.artofproblemsolving.com/3/d/f/3df120a38729f1e1a0913d49ba4609220ff16aa7.png)
Besides we also have from (1)![\[\Sigma(0,1)=\sum_{k=1}^5k^3(k^2-1)x_k\geq 0\]](http://latex.artofproblemsolving.com/7/c/4/7c4462a0e1dbdc5946100caf8d44526ba3d0188b.png)
and from (2)![\[\Sigma(0,1)=a^2(a-1)\geq 0 \implies a\notin (0,1)\]](http://latex.artofproblemsolving.com/6/c/6/6c6db4f0c65a9a9eb2ed42ebef776dd68a73502b.png)
and for 
![\[\Sigma(n,n+1)=\sum_{k=1}^5k(k^2-n^2)(k^2-(n+1)^2)x_k\]](http://latex.artofproblemsolving.com/c/8/b/c8b96fc5ecf2ea245299be24c945515ede639102.png)
where in the right hand we have that![\[k<n \implies (k^2-n^2)<0, (k^2-(n+1)^2)<0\]](http://latex.artofproblemsolving.com/a/5/e/a5e6164c02f0f443125e99f53b91d3d96f3c882d.png)
, so![\[(k^2-n^2)(k^2-(n+1)^2)>0\]](http://latex.artofproblemsolving.com/4/8/5/485d1cfe551264c3bd2f823d81ed6ebb7d7943c9.png)
,![\[k=n,n+1 , \implies (k^2-n^2)(k^2-(n+1)^2)=0\]](http://latex.artofproblemsolving.com/0/8/d/08dc916f8fcc405c4fb4f04a6384d0914bc8b196.png)
and![\[k>n \implies (k^2-n^2)(k^2-(n+1)^2)>0\]](http://latex.artofproblemsolving.com/f/f/f/fffbf63b5acef55ab2b800c872904245a14e4711.png)
, so![\[\Sigma(n,n+1)\geq 0\]](http://latex.artofproblemsolving.com/5/f/8/5f826909cdbd3344404e3ea7dcd9c04496553dad.png)
for From the latter and (2) we also have![\[\Sigma(n,n+1)=a(a-n^2)(a-(n+1)^2))\geq 0\implies a\notin (n^2,(n+1)^2)\]](http://latex.artofproblemsolving.com/b/0/2/b027896330b83e9a9c3ed80c181c76cb867e0b61.png)
So we have that![\[a\in [0,25]-\bigcup_{n=0}^4(n^2,(n+1^2))=\{0,1,4,9,16,25\}\]](http://latex.artofproblemsolving.com/2/8/f/28fed36f7937afc9686aefc9a7083e2d94f4203a.png)
If 
, 
take 
, 
for 
. Then 
, 
, and 
See Also
| 1979 IMO (Problems) • Resources | ||
| Preceded by Problem 4 |
1 • 2 • 3 • 4 • 5 • 6 | Followed by Problem 6 |
| All IMO Problems and Solutions | ||
