Difference between revisions of "2005 Indonesia MO Problems"

Latest revision as of 23:31, 4 September 2018

Day 1

Problem 1

Let $n$ be a positive integer. Determine the number of triangles (non congruent) with integral side lengths and the longest side length is $n$ .

Solution

Problem 2

For an arbitrary positive integer $n$ , define $p(n)$ as the product of the digits of $n$ (in decimal). Find all positive integers $n$ such that $11p(n)=n^2-2005$ .

Solution

Problem 3

Let $k$ and $m$ be positive integers such that $\frac12\left(\sqrt{k+4\sqrt{m}}-\sqrt{k}\right)$ is an integer.

(a) Prove that $\sqrt{k}$ is rational.

(b) Prove that $\sqrt{k}$ is a positive integer.

Solution

Problem 4

Let $M$ be a point in triangle $ABC$ such that $\angle AMC=90^{\circ}$ , $\angle AMB=150^{\circ}$ , $\angle BMC=120^{\circ}$ . The centers of circumcircles of triangles $AMC,AMB,BMC$ are $P,Q,R$ , respectively. Prove that the area of $\triangle PQR$ is greater than the area of $\triangle ABC$ .

Solution

Day 2

Problem 5

For an arbitrary real number $x$ , $\lfloor x\rfloor$ denotes the greatest integer not exceeding $x$ . Prove that there is exactly one integer $m$ which satisfy $m-\left\lfloor \frac{m}{2005}\right\rfloor=2005$ .

Solution

Problem 6

Find all triples $(x,y,z)$ of integers which satisfy

$x(y + z) = y^2 + z^2 - 2$

$y(z + x) = z^2 + x^2 - 2$

$z(x + y) = x^2 + y^2 - 2$ .

Solution

Problem 7

Let $ABCD$ be a convex quadrilateral. Square $AB_1A_2B$ is constructed such that the two vertices $A_2,B_1$ is located outside $ABCD$ . Similarly, we construct squares $BC_1B_2C$ , $CD_1C_2D$ , $DA_1D_2A$ . Let $K$ be the intersection of $AA_2$ and $BB_1$ , $L$ be the intersection of $BB_2$ and $CC_1$ , $M$ be the intersection of $CC_2$ and $DD_1$ , and $N$ be the intersection of $DD_2$ and $AA_1$ . Prove that $KM$ is perpendicular to $LN$ .

Solution

Problem 8

There are $90$ contestants in a mathematics competition. Each contestant gets acquainted with at least $60$ other contestants. One of the contestants, Amin, state that at least four contestants have the same number of new friends. Prove or disprove his statement.

Solution

@@ Line 15: / Line 15: @@
 ===Problem 3===
-Let <math> k</math> and <math> m</math> be positive integers such that <math> \displaystyle\frac12\left(\sqrt{k+4\sqrt{m}}-\sqrt{k}\right)</math> is an integer.
+Let <math> k</math> and <math> m</math> be positive integers such that <math>\frac12\left(\sqrt{k+4\sqrt{m}}-\sqrt{k}\right)</math> is an integer.
 (a) Prove that <math> \sqrt{k}</math> is rational.
@@ Line 33: / Line 33: @@
 ===Problem 5===
-For an arbitrary real number <math> x</math>, <math> \lfloor x\rfloor</math> denotes the greatest integer not exceeding <math> x</math>. Prove that there is exactly one integer <math> m</math> which satisfy <math> \displaystyle m-\left\lfloor \frac{m}{2005}\right\rfloor=2005</math>.
+For an arbitrary real number <math> x</math>, <math> \lfloor x\rfloor</math> denotes the greatest integer not exceeding <math> x</math>. Prove that there is exactly one integer <math> m</math> which satisfy <math>m-\left\lfloor \frac{m}{2005}\right\rfloor=2005</math>.
 [[2005 Indonesia MO Problems/Problem 5|Solution]]
@@ Line 44: / Line 44: @@
 <math> y(z + x) = z^2 + x^2 - 2</math>
+<math> z(x + y) = x^2 + y^2 - 2</math>.
 [[2005 Indonesia MO Problems/Problem 6|Solution]]
@@ Line 61: / Line 63: @@
 ==See Also==
 {{Indonesia MO box|year=2005|before=[[2004 Indonesia MO]]|after=[[2006 Indonesia MO]]}}
-<math> z(x + y) = x^2 + y^2 - 2</math>.

2005 Indonesia MO (Problems)
Preceded by 2004 Indonesia MO	1 • 2 • 3 • 4 • 5 • 6 • 7 • 8	Followed by 2006 Indonesia MO
All Indonesia MO Problems and Solutions

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Difference between revisions of "2005 Indonesia MO Problems"

Latest revision as of 23:31, 4 September 2018

Contents

Day 1

Problem 1

Problem 2

Problem 3

Problem 4

Day 2

Problem 5

Problem 6

Problem 7

Problem 8

See Also