Difference between revisions of "2015 IMO Problems/Problem 1"

Latest revision as of 07:14, 19 July 2016

Problem

We say that a finite set $\mathcal{S}$ in the plane is balanced if, for any two different points $A$ , $B$ in $\mathcal{S}$ , there is a point $C$ in $\mathcal{S}$ such that $AC=BC$ . We say that $\mathcal{S}$ is centre-free if for any three points $A$ , $B$ , $C$ in $\mathcal{S}$ , there is no point $P$ in $\mathcal{S}$ such that $PA=PB=PC$ .

Show that for all integers $n\geq 3$ , there exists a balanced set consisting of $n$ points.
Determine all integers $n\geq 3$ for which there exists a balanced centre-free set consisting of $n$ points.

Solution

Part (a): We explicitly construct the sets $\mathcal{S}$ . For odd $n$ , $\mathcal{S}$ can be taken to be the vertices of regular polygons $P_n$ with $n$ sides: given any two vertices $A$ and $B$ , one of the two open half-spaces into which $AB$ divides $P_n$ contains an odd number of $k$ of vertices of $P_n$ . The $((k+1)/2)^{th}$ vertex encountered while moving from $A$ to $B$ along the circumcircle of $P_n$ is therefore equidistant from $A$ and $B$ .

If $n \geq 4$ is even, choose $m\geq 0$ to be the largest integer such that $x:=(n-2)(\pi/3)/2^m \geq 2\pi/3.$ Hence $x < 4\pi/3 < 2\pi$ . Consider a circle $K$ with centre $O$ , and let $A_1, \ldots, A_{n-1}$ be distinct points placed counterclockwise (say) on $K$ such that $\angle A_iOA_{i+1}=\pi/3/2^m$ (for $i=1,\ldots,n-2$ ). Hence for any line $OA_i$ , there is a line $OA_j$ such that $\angle A_iOA_j=\pi/3$ (using the facts that $2\pi > x=\angle A_1OA_{n-1} \geq 2\pi/3$ , and $n-1$ odd). Thus $O$ , $A_i$ and $A_j$ form an equilateral triangle. In other words, for arbitrary $A_i$ , there exists $A_j$ equidistant to $O$ and $A_i$ . Also given any $i,j$ such that $1 \leq i, j \leq n-1$ , $O$ is equidistant to $A_i$ and $A_j$ . Hence the $n$ points $O, A_1, \ldots, A_{n-1}$ form a balanced set.

Part (b): Note that if $n$ is odd, the set $\mathcal{S}$ of vertices of a regular polygon $P_n$ of $n$ sides forms a balanced set (as above) and a centre-free set (trivially, since the centre of the circumscribing circle of $P_n$ does not belong to $\mathcal{S}$ ).

For $n$ even, we prove that a balanced, centre free set consisting of $n$ points does not exist. Assume that $\mathcal{S}=\{A_i: 1\leq i \leq n\}$ is centre-free. Pick an arbitrary $A_i \in \mathcal{S}$ , and let $n_i$ be the number of distinct non-ordered pairs of points $(A_j,A_k)$ ( $j\neq k$ ) to which $A_i$ is equidistant. Any two such pairs are disjoint (for, if there were two such pairs $(A_r,A_s)$ and $(A_r, A_t)$ with $r, s, t$ distinct, then $A_i$ would be equidistant to $A_r$ , $A_s$ , and $A_t$ , violating the centre-free property). Hence $n_i \leq (n-2)/2$ (we use the fact that $n$ is even here), which means $\sum_i n_i \leq n(n-2)/2 = n(n-1)/2 -n/2$ . Hence there are at least $n/2$ non-ordered pairs $(A_j, A_k)$ such that no point in $\mathcal{S}$ is equidistant to $A_j$ and $A_k$ .

@@ Line 1: / Line 1: @@
+==Problem==
+We say that a finite set <math>\mathcal{S}</math> in the plane is <i> balanced </i>
+if, for any two different points <math>A</math>, <math>B</math> in <math>\mathcal{S}</math>, there is
+a point <math>C</math> in <math>\mathcal{S}</math> such that <math>AC=BC</math>. We say that
+<math>\mathcal{S}</math> is <i>centre-free</i> if for any three points <math>A</math>, <math>B</math>, <math>C</math> in
+<math>\mathcal{S}</math>, there is no point <math>P</math> in <math>\mathcal{S}</math> such that
+<math>PA=PB=PC</math>.
+<ol style="list-style-type: lower-latin;">
+  <li> Show that for all integers <math>n\geq 3</math>, there exists a balanced set consisting of <math>n</math> points. </li>
+  <li> Determine all integers <math>n\geq 3</math> for which there exists a balanced centre-free set consisting of <math>n</math> points. </li>
+</ol>
 ==Solution==
@@ Line 22: / Line 34: @@
 <math>O</math>, <math>A_i</math> and <math>A_j</math> form an equilateral triangle. In other words, for
 arbitrary <math>A_i</math>, there exists <math>A_j</math> equidistant to
-<math>O</math> and <math>A_i</math>. Also given {\em any} <math>i,j</math> such that
+<math>O</math> and <math>A_i</math>. Also given <i>any</i> <math>i,j</math> such that
 <math>1 \leq i, j \leq n-1</math>, <math>O</math> is equidistant to <math>A_i</math> and <math>A_j</math>. Hence
 the <math>n</math> points <math>O, A_1, \ldots, A_{n-1}</math> form a balanced set.
@@ Line 32: / Line 44: @@
 For <math>n</math> even, we prove that a balanced, centre free set consisting of <math>n</math>
-sides does <b>not</b> exist.  Assume that
+points does <b>not</b> exist.  Assume that
-<math>\mathcal{S}=\{A_i: 1\leq i \leq n\}</math> is center-free. Pick an
+<math>\mathcal{S}=\{A_i: 1\leq i \leq n\}</math> is centre-free. Pick an
 arbitrary <math>A_i \in \mathcal{S}</math>, and let <math>n_i</math> be the number of
 distinct non-ordered pairs of points <math>(A_j,A_k)</math> (<math>j\neq k</math>) to
@@ Line 45: / Line 57: @@
 <math>n/2</math> non-ordered pairs <math>(A_j, A_k)</math> such that no point in
 <math>\mathcal{S}</math> is equidistant to <math>A_j</math> and <math>A_k</math>.
+==See Also==
+{{IMO box|year=2015|before=First Problem|num-a=2}}
+[[Category:Olympiad Combinatorics Problems]]

2015 IMO (Problems) • Resources
Preceded by First Problem	1 • 2 • 3 • 4 • 5 • 6	Followed by Problem 2
All IMO Problems and Solutions

Page

Toolbox

Search

Difference between revisions of "2015 IMO Problems/Problem 1"

Latest revision as of 07:14, 19 July 2016

Problem

Solution

See Also