Difference between revisions of "2008 IMO Problems"

Latest revision as of 23:30, 17 February 2021

Problems of the 49th IMO 2008 Spain.

Day 1

Problem 1

Let $H$ be the orthocenter of an acute-angled triangle $ABC$ . The circle $\Gamma_{A}$ centered at the midpoint of $BC$ and passing through $H$ intersects line $BC$ at points $A_{1}$ and $A_{2}$ . Similarly, define the points $B_{1}$ , $B_{2}$ , $C_{1}$ and $C_{2}$ .

Prove that six points $A_{1}$ , $A_{2}$ , $B_{1}$ , $B_{2}$ , $C_{1}$ and $C_{2}$ are concyclic.

Solution

Problem 2

Let $x, y, z\neq 1$ be three real numbers, such that $xyz = 1$

(i) Prove that; $\frac {x^{2}}{\left(x - 1\right)^{2}} + \frac {y^{2}}{\left(y - 1\right)^{2}} + \frac {z^{2}}{\left(z - 1\right)^{2}} \geq 1$ .

(ii) Prove that $\frac {x^{2}}{\left(x - 1\right)^{2}} + \frac {y^{2}}{\left(y - 1\right)^{2}} + \frac {z^{2}}{\left(z - 1\right)^{2}} = 1$ for infinitely many triples of rational numbers $x$ , $y$ and $z$ .

Solution

Problem 3

Prove that there are infinitely many positive integers $n$ such that $n^{2} + 1$ has a prime divisor greater than $2n + \sqrt {2n}$ .

Solution

Day 2

Problem 4

Find all functions $f: (0, \infty) \mapsto (0, \infty)$ (so $f$ is a function from the positive real numbers) such that

$\frac {\left( f(w) \right)^2 + \left( f(x) \right)^2}{f(y^2) + f(z^2) } = \frac {w^2 + x^2}{y^2 + z^2}$

for all positive real numbes $w,x,y,z,$ satisfying $wx = yz.$

Solution

Problem 5

Let $n$ and $k$ be positive integers with $k \geq n$ and $k - n$ an even number. Let $2n$ lamps labelled $1, 2, \dots, 2n$ be given, each of which can be either on or off. Initially all the lamps are off. We consider sequences of steps: at each step one of the lamps is switched (from on to off or from off to on).

Let $N$ be the number of such sequences consisting of $k$ steps and resulting in the state where lamps $1$ through $n$ are all on, and lamps $n + 1$ through $2n$ are all off.

Let $M$ be number of such sequences consisting of $k$ steps, resulting in the state where lamps $1$ through $n$ are all on, and lamps $n + 1$ through $2n$ are all off, but where none of the lamps $n + 1$ through $2n$ is ever switched on.

Determine $\frac {N}{M}$ .

Solution

Problem 6

Let $ABCD$ be a convex quadrilateral with $BA$ different from $BC$ . Denote the incircles of triangles $ABC$ and $ADC$ by $k_{1}$ and $k_{2}$ respectively. Suppose that there exists a circle $k$ tangent to ray $BA$ beyond $A$ and to the ray $BC$ beyond $C$ , which is also tangent to the lines $AD$ and $CD$ .

Prove that the common external tangents to $k_{1}$ and $k_{2}$ intersect on $k$ .

Solution

Resources

2008 IMO (Problems) • Resources
Preceded by 2007 IMO Problems	1 • 2 • 3 • 4 • 5 • 6	Followed by 2009 IMO Problems
All IMO Problems and Solutions

@@ Line 1: / Line 1: @@
 Problems of the 49th [[IMO]] 2008 Spain.
-== Day I ==
+== Day 1 ==
 === Problem 1 ===
@@ Line 11: / Line 11: @@
 === Problem 2 ===
-'''(i)''' If <math>x</math>, <math>y</math> and <math>z</math> are three real numbers, all different from <math>1</math>, such that <math>xyz = 1</math>, then prove that
+Let <math>x, y, z\neq 1</math> be three real numbers, such that <math>xyz = 1</math>
+'''(i)''' Prove that;
 <math>\frac {x^{2}}{\left(x - 1\right)^{2}} + \frac {y^{2}}{\left(y - 1\right)^{2}} + \frac {z^{2}}{\left(z - 1\right)^{2}} \geq 1</math>.
-(With the <math>\sum</math> sign for cyclic summation, this inequality could be rewritten as <math>\sum \frac {x^{2}}{\left(x - 1\right)^{2}} \geq 1</math>.)
-'''(ii)''' Prove that equality is achieved for infinitely many triples of rational numbers <math>x</math>, <math>y</math> and <math>z</math>.
+'''(ii)''' Prove that <math>\frac {x^{2}}{\left(x - 1\right)^{2}} + \frac {y^{2}}{\left(y - 1\right)^{2}} + \frac {z^{2}}{\left(z - 1\right)^{2}} = 1</math> for infinitely many triples of rational numbers <math>x</math>, <math>y</math> and <math>z</math>.
 [[2008 IMO Problems/Problem 2 | Solution]]
@@ Line 24: / Line 25: @@
 [[2008 IMO Problems/Problem 3 | Solution]]
-== Day II ==
+== Day 2 ==
 === Problem 4 ===
@@ Line 36: / Line 37: @@
 === Problem 5 ===
-Let <math>n</math> and <math>k</math> be positive integers with <math>k \geq n</math> and <math>k - n</math> an even number. Let <math>2n</math> lamps labelled <math>1</math>, <math>2</math>, ..., <math>2n</math> be given, each of which can be either ''on'' or ''off''. Initially all the lamps are off. We consider sequences of steps: at each step one of the lamps is switched (from on to off or from off to on).
+Let <math>n</math> and <math>k</math> be positive integers with <math>k \geq n</math> and <math>k - n</math> an even number. Let <math>2n</math> lamps labelled <math>1, 2, \dots, 2n</math> be given, each of which can be either ''on'' or ''off''. Initially all the lamps are off. We consider sequences of steps: at each step one of the lamps is switched (from on to off or from off to on).
 Let <math>N</math> be the number of such sequences consisting of <math>k</math> steps and resulting in the state where lamps <math>1</math> through <math>n</math> are all on, and lamps <math>n + 1</math> through <math>2n</math> are all off.

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Difference between revisions of "2008 IMO Problems"

Latest revision as of 23:30, 17 February 2021

Contents

Day 1

Problem 1

Problem 2

Problem 3

Day 2

Problem 4

Problem 5

Problem 6

Resources