Difference between revisions of "1995 USAMO Problems/Problem 2"

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==Alternate Solution (using infinite descent):==
Alternate Solution (using infinite descent):
 
  
This solution is similar to the above solution. We can invert it with<cmath>\tan \sin^{-1} \cos \tan^{-1} \sqrt{n/m} = \sqrt{m/n}</cmath>and we can get<cmath>\tan \sin^{-1} \cos \tan^{-1}\cos\tan^{-1}\sqrt{x} = \sqrt{x + 1}.</cmath>
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This solution is similar to the above solution. We can invert a number with<cmath>\tan \sin^{-1} \cos \tan^{-1} \sqrt{n/m} = \sqrt{m/n}</cmath> and we can get <cmath>\tan \sin^{-1} \cos \tan^{-1}\cos\tan^{-1}\sqrt{x} = \sqrt{x + 1}.</cmath>
 
Then we do <math>\sqrt{x}</math> to <math>\sqrt{x + 1}</math> in reverse, trying to get 1. Subtracting one inside the radical for a fraction <math>\sqrt{m/n}</math> will eventually result in a fraction less than or equal to 1. Taking the reciprocal of this will result in a fraction greater than or equal to 1, and we can keep subtracting one inside the radical.
 
Then we do <math>\sqrt{x}</math> to <math>\sqrt{x + 1}</math> in reverse, trying to get 1. Subtracting one inside the radical for a fraction <math>\sqrt{m/n}</math> will eventually result in a fraction less than or equal to 1. Taking the reciprocal of this will result in a fraction greater than or equal to 1, and we can keep subtracting one inside the radical.
  
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~Unum
 
~Unum
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{{alternate solutions}}
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== See Also ==
 
== See Also ==
  

Latest revision as of 00:18, 6 April 2020

Problem

A calculator is broken so that the only keys that still work are the $\, \sin, \; \cos,$ $\tan, \; \sin^{-1}, \; \cos^{-1}, \,$ and $\, \tan^{-1} \,$ buttons. The display initially shows 0. Given any positive rational number $\, q, \,$ show that pressing some finite sequence of buttons will yield $\, q$. Assume that the calculator does real number calculations with infinite precision. All functions are in terms of radians.

Solution

We will prove the following, stronger statement : If $m$ and $n$ are relatively prime nonnegative integers such that $n>0$, then the some finite sequence of buttons will yield $\sqrt{m/n}$.

To prove this statement, we induct strongly on $m+n$. For our base case, $m+n=1$, we have $n=1$ and $m=0$, and $\sqrt{m/n} = 0$, which is initially shown on the screen. For the inductive step, we consider separately the cases $m=0$, $0<m\le n$, and $n<m$.

If $m=0$, then $n=1$, and we have the base case.

If $0< m \le n$, then by inductive hypothesis, $\sqrt{(n-m)/m}$ can be obtained in finitely many steps; then so can \[\cos \tan^{-1} \sqrt{(n-m)/m} = \sqrt{m/n} .\]

If $n<m$, then by the previous case, $\sqrt{n/m}$ can be obtained in finitely many steps. Since $\cos \tan^{-1} \sqrt{n/m} = \sin \tan^{-1} \sqrt{m/n}$, it follows that \[\tan \sin^{-1} \cos \tan^{-1} \sqrt{n/m} = \sqrt{m/n}\] can be obtained in finitely many steps. Thus the induction is complete. $\blacksquare$


Alternate Solution (using infinite descent):

This solution is similar to the above solution. We can invert a number with\[\tan \sin^{-1} \cos \tan^{-1} \sqrt{n/m} = \sqrt{m/n}\] and we can get \[\tan \sin^{-1} \cos \tan^{-1}\cos\tan^{-1}\sqrt{x} = \sqrt{x + 1}.\] Then we do $\sqrt{x}$ to $\sqrt{x + 1}$ in reverse, trying to get 1. Subtracting one inside the radical for a fraction $\sqrt{m/n}$ will eventually result in a fraction less than or equal to 1. Taking the reciprocal of this will result in a fraction greater than or equal to 1, and we can keep subtracting one inside the radical.

We do this repeatedly, and this should eventually result in 1 in a finite number of steps. This is because each time we do this, m+n is smaller. This is true even if $\sqrt{m/n}$ can be simplified, as simplifying will only result in a smaller value. The smallest possible value of the fraction is 1/1, so this will be achieved after finite steps.

Finally, we know that 1 is achievable as cos(0) = 1.

~Unum


Alternate solutions are always welcome. If you have a different, elegant solution to this problem, please add it to this page.

See Also

1995 USAMO (ProblemsResources)
Preceded by
Problem 1
Followed by
Problem 3
1 2 3 4 5
All USAMO Problems and Solutions

The problems on this page are copyrighted by the Mathematical Association of America's American Mathematics Competitions. AMC logo.png