Math Olympiad in Athens
Ivars Peterson
The Olympic games in ancient Greece were part of a major religious festival
honoring the god Zeus. Every 4 years, men from every corner of the Greek world
gathered for several days of celebrations, athletic contests, and ceremonies.
The term olympiad refers to the 4-year interval between Olympic games by
which time was reckoned in ancient Greece. Inevitably, the games attracted
vendors, traders, sculptors, poets, writers, and others?all presenting varied
wares to sell to or entertain the many spectators.
The Olympic games were not the only athletic contests in ancient Greece. The
Pythian games took place at Delphi every 4 years, 2 years after the Olympic
games. These games had started off as music contests in honor of the god Apollo,
but by 582 B.C., they also included athletic events. The
festivities lasted 6 to 8 days and featured various cultural activities.
Musicians and actors competed to be the best in playing the flute, singing, or
reciting tragedy.
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The Acropolis in Athens.
I.
Peterson |
In that spirit, modern-day Olympic Games have included a variety of cultural
events. This year, as Athens prepared for the latest edition of the Olympic
Games, the Hellenic Mathematical Society hosted the 45th International
Mathematical Olympiad (IMO), July 6?18.
Held annually since 1959, the IMO brings together teams of high school
students from around the world to compete in solving extremely challenging math
problems. This year's competition in Athens featured six-student teams from 85
countries.
Over the course of 2 days, the competing students had 9 hours to solve six
problems.
In the final team standings, China took first place, followed by the United
States and Russia. It was the best U.S. showing since 1994.
The IMO also awarded 45 gold medals to the students who managed to "correctly
and elegantly" solve all six problems.
Overall, the U.S. team earned five gold medals and one silver medal. Oleg
Golberg of Bedford, Mass., earned a gold medal and 40 out of 42 possible points,
obtaining the best score on the U.S. team. The other gold-medal winners were
Tiankai Liu of Saratoga, Calif., (38 points), Aaron Pixton of Vestal, N.Y., (37
points), Alison Miller of Niskayuna, N.Y., (33 points), and Tony Zhang of
Arcadia, Calif., (33 points). Miller was the first female gold-medal winner for
a team from the U.S. Matt Ince of Arnold, Mo., earned 31 points and a silver
medal.
Interestingly, Tiankai was a member of the 2001 U.S. IMO team. That team's
efforts are vividly described in Steve Olson's book Count Down. He also
participated in the 2002 IMO. Tiankai has a Web site at http://www.geocities.com/buniakowski/.
How would you do at the IMO? You can find a list of questions (and solutions)
featured at these competitions since 1959 at http://www.kalva.demon.co.uk/imo.html.
Here's a geometry problem from this year's set of questions.
Let ABC be an acute-angled triangle with AB not equal to AC. The circle with
diameter BC intersects the sides AB and AC at M and N respectively. Denote by O
the midpoint of the side BC. The bisectors of the angles BAC and MON intersect
at R. Prove that the circumcircles of the triangles BMR and CNR have a common
point lying on the side BC.
Next year's IMO will take place in Cancun, Mexico.
References:
2004. International Mathematical Olympiad announces winners.
Mathematical Association of America press release. July 17. Available at http://www.maa.org/news/072104imowinners.html.
Kuczma, M.E. 2003. International Mathematical Olympiads
1986?1999. Washington, D.C.: Mathematical Association of America.
Olson, S. 2004. Count Down: Six Kids Vie for Glory at the
World's Toughest Math Competition. New York: Houghton Mifflin. See http://www.houghtonmifflinbooks.com/features/countdown/.
Peterson, I. 2002. Dangerous problems. Science News
Online (June 29). Available at http://www.sciencenews.org/articles/20020629/mathtrek.asp.
______. 2001. Bubbles and math olympiads. Science News
Online (June 16). Available at http://www.sciencenews.org/articles/20010616/mathtrek.asp.
______. 1998. Prime talent. Science News Online (July
4). Available at http://www.sciencenews.org/pages/sn_arc98/7_4_98/mathland.htm.
Information about the 45th International Mathematical
Olympiad, held in Athens, is available at http://www.imo2004.gr/.
Information about the American Mathematics Competitions can
be found at http://www.unl.edu/amc/.
Problems (and solutions) from all previous International
Mathematical Olympiad competitions are available online at http://www.kalva.demon.co.uk/imo.html.
You can learn more about the ancient Olympic Games in Greece
at http://www.museum.upenn.edu/new/olympics/olympicintro.shtml
and http://www.perseus.tufts.edu/Olympics/.
**********
A collection of Ivars Peterson's early
MathTrek articles, updated and illustrated, is now available as the
Mathematical Association of America (MAA) book Mathematical Treks: From
Surreal Numbers to Magic Circles. See http://www.maa.org/pubs/books/mtr.html.
| Comments are welcome. Please send messages to Ivars
Peterson at ip@sciserv.org.
 Ivars Peterson is the mathematics/computer writer and online
editor at Science News (http://www.sciencenews.org). He is the
author of The Mathematical Tourist, Islands of Truth, Newton's
Clock, Fatal Defect, and The Jungles of Randomness. He also
writes for the children's magazine Muse (http://www.musemag.com) and is working on a
book about math and art.
NEW! NEW! NEW! Math Trek 2: A
Mathematical Space Odyssey by Ivars Peterson and Nancy Henderson. For
children ages 10 and up. New York: Wiley, 2001. ISBN 0-471-31571-0. $12.95 USA
(paper). |
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