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Difference between revisions of "2001 AIME I Problems/Problem 11"
(Sidenote)
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\end{align*}</cmath>
 
\end{align*}</cmath>
 
As these are all positive and less than <math>N</math>, <math>\boxed{149}</math> is the solution.
 
As these are all positive and less than <math>N</math>, <math>\boxed{149}</math> is the solution.
 +
 +
== Sidenote ==
 +
If we express all the <math>c_i</math> in terms of <math>N</math>, we have
 +
<cmath>24c_1=5N+23</cmath>
 +
<cmath>24c_2=N+19</cmath>
 +
<cmath>124c_3=117N+51</cmath>
 +
<cmath>124c_4=73N+35</cmath>
 +
<cmath>124c_5=89N+7</cmath>
 +
 +
It turns out that there exists such an array satisfying the problem conditions if and only if
 +
<cmath>N\equiv 149 \pmod{744}</cmath>
  
 
== See also ==
 
== See also ==

Revision as of 20:32, 4 December 2015

Problem

In a rectangular array of points, with 5 rows and $N$ columns, the points are numbered consecutively from left to right beginning with the top row. Thus the top row is numbered 1 through $N,$ the second row is numbered $N + 1$ through $2N,$ and so forth. Five points, $P_1, P_2, P_3, P_4,$ and $P_5,$ are selected so that each $P_i$ is in row $i.$ Let $x_i$ be the number associated with $P_i.$ Now renumber the array consecutively from top to bottom, beginning with the first column. Let $y_i$ be the number associated with $P_i$ after the renumbering. It is found that $x_1 = y_2,$ $x_2 = y_1,$ $x_3 = y_4,$ $x_4 = y_5,$ and $x_5 = y_3.$ Find the smallest possible value of $N.$

Solution

Let each point $P_i$ be in column $c_i$. The numberings for $P_i$ can now be defined as follows. \begin{align*}x_i &= (i - 1)N + c_i\\ y_i &= (c_i - 1)5 + i \end{align*}

We can now convert the five given equalities. \begin{align}x_1&=y_2 & \Longrightarrow & & c_1 &= 5 c_2-3\\ x_2&=y_1 & \Longrightarrow & & N+c_2 &= 5 c_1-4\\ x_3&=y_4 & \Longrightarrow & & 2 N+c_3 &= 5 c_4-1\\ x_4&=y_5 & \Longrightarrow & & 3 N+c_4 &= 5 c_5\\ x_5&=y_3 & \Longrightarrow & & 4 N+c_5 &= 5 c_3-2 \end{align} Equations $(1)$ and $(2)$ combine to form \[N = 24c_2 - 19\] Similarly equations $(3)$, $(4)$, and $(5)$ combine to form \[117N +51 = 124c_3\] Take this equation modulo 31 \[24N+20\equiv 0 \pmod{31}\] And substitute for N \[24 \cdot 24 c_2 - 24 \cdot 19 +20\equiv 0 \pmod{31}\] \[18 c_2 \equiv 2 \pmod{31}\]

Thus the smallest $c_2$ might be is $7$ and by substitution $N = 24 \cdot 7 - 19 = 149$

The column values can also easily be found by substitution \begin{align*}c_1&=32\\ c_2&=7\\ c_3&=141\\ c_4&=88\\ c_5&=107 \end{align*} As these are all positive and less than $N$, $\boxed{149}$ is the solution.

Sidenote

If we express all the $c_i$ in terms of $N$, we have \[24c_1=5N+23\] \[24c_2=N+19\] \[124c_3=117N+51\] \[124c_4=73N+35\] \[124c_5=89N+7\]

It turns out that there exists such an array satisfying the problem conditions if and only if \[N\equiv 149 \pmod{744}\]

See also

2001 AIME I (ProblemsAnswer KeyResources)
Preceded by
Problem 10 		Followed by
Problem 12
1 2 3 4 5 6 7 8 9 10 11 12 13 14 15
All AIME Problems and Solutions

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