Difference between revisions of "2003 USAMO Problems"
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=== Problem 4 === | === Problem 4 === | ||
+ | Let <math>ABC</math> be a triangle. A circle passing through <math>A</math> and <math>B</math> intersects segments <math>AC</math> and <math>BC</math> at <math>D</math> and <math>E</math>, respectively. Lines <math>AB</math> and <math>DE</math> intersect at <math>F</math>, while lines <math>BD</math> and <math>CF</math> intersect at <math>M</math>. Prove that <math>MF = MC</math> if and only if <math>MB\cdot MD = MC^2</math>. | ||
* [[2003 USAMO Problems/Problem 4 | Solution]] | * [[2003 USAMO Problems/Problem 4 | Solution]] | ||
=== Problem 5 === | === Problem 5 === | ||
+ | Let <math>a</math>, <math>b</math>, <math>c</math> be positive real numbers. Prove that | ||
+ | <center><math>\dfrac{(2a + b + c)^2}{2a^2 + (b + c)^2} + \dfrac{(2b + c + a)^2}{2b^2 + (c + a)^2} + \dfrac{(2c + a + b)^2}{2c^2 + (a + b)^2} \le 8.</math></center> | ||
* [[2003 USAMO Problems/Problem 5 | Solution]] | * [[2003 USAMO Problems/Problem 5 | Solution]] | ||
=== Problem 6 === | === Problem 6 === | ||
+ | At the vertices of a regular hexagon are written six nonnegative integers whose sum is 2003. Bert is allowed to make moves of the following form: he may pick a vertex and replace the number written there by the absolute value of the difference between the numbers written at the two neighboring vertices. Prove that Bert can make a sequence of moves, after which the number 0 appears at all six vertices. | ||
* [[2003 USAMO Problems/Problem 6 | Solution]] | * [[2003 USAMO Problems/Problem 6 | Solution]] |
Revision as of 16:56, 20 August 2008
Contents
Day 1
Problem 1
Prove that for every positive integer there exists an -digit number divisible by all of whose digits are odd.
Problem 2
A convex polygon in the plane is dissected into smaller convex polygons by drawing all of its diagonals. The lengths of all sides and all diagonals of the polygon are rational numbers. Prove that the lengths of all sides of all polygons in the dissection are also rational numbers.
Problem 3
Let . For every sequence of integers
satisfying , for , define another sequence
by setting to be the number of terms in the sequence that precede the term and are different from . Show that, starting from any sequence as above, fewer than applications of the transformation lead to a sequence such that .
Day 2
Problem 4
Let be a triangle. A circle passing through and intersects segments and at and , respectively. Lines and intersect at , while lines and intersect at . Prove that if and only if .
Problem 5
Let , , be positive real numbers. Prove that
Problem 6
At the vertices of a regular hexagon are written six nonnegative integers whose sum is 2003. Bert is allowed to make moves of the following form: he may pick a vertex and replace the number written there by the absolute value of the difference between the numbers written at the two neighboring vertices. Prove that Bert can make a sequence of moves, after which the number 0 appears at all six vertices.