Difference between revisions of "1999 IMO Problems/Problem 1"
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<math>\angle P_{k}OP_{(k-c)\; mod\; n}=\frac{2\pi}{n}\left( (k-(k-c))\; mod\; n \right)=\frac{2\pi}{n}\left( c\; mod\; n \right)</math> | <math>\angle P_{k}OP_{(k-c)\; mod\; n}=\frac{2\pi}{n}\left( (k-(k-c))\; mod\; n \right)=\frac{2\pi}{n}\left( c\; mod\; n \right)</math> | ||
− | Therefore, <math>\angle P_{k}OP_{(k+c)\; mod\; n}=\angle P_{k}OP_{(k-c)\; mod\; n}</math> for any integer <math>c</math> | + | Therefore, <math>\angle P_{k}OP_{(k+c)\; mod\; n}=\angle P_{k}OP_{(k-c)\; mod\; n}</math> for any integer <math>c</math>. |
+ | |||
+ | Also, since <math>\left| OP_{(k+c)\; mod\; n} \right|=\left| OP_{(k-c)\; mod\; n} \right|=R</math> for any integer <math>c</math> | ||
+ | |||
+ | then this proves that the bisector of any points <math>A</math> and <math>B</math> is an axis of symmetry. | ||
{{alternate solutions}} | {{alternate solutions}} |
Revision as of 20:06, 12 November 2023
Problem
Determine all finite sets of at least three points in the plane which satisfy the following condition:
For any two distinct points and in , the perpendicular bisector of the line segment is an axis of symmetry of .
Solution
Upon reading this problem and drawing some points, one quickly realizes that the set consists of all the vertices of any regular polygon.
Now to prove it with some numbers:
Let , with , where is a vertex of a polygon which we can define their coordinates as: for .
That defines the vertices of any regular polygon with being the radius of the circumcircle of the regular -sided polygon.
Now we can pick any points and of the set as:
and , where ; ; and
Then,
and
Let be point which is not part of
Then, , and
The perpendicular bisector of passes through .
Let point , not in be a point that passes through the perpendicular bisector of at a distance from
Then, and
CASE I: is even
and is integer
Then
This means that the perpendicular bisector also passes through a point of
Let be any positive integer
and
Therefore, for any integer .
Also, since for any integer
then this proves that the bisector of any points and is an axis of symmetry.
Alternate solutions are always welcome. If you have a different, elegant solution to this problem, please add it to this page.