2018 Finnish National High School Mathematics Comp

Part of Finnish National High School Mathematics Competition

Subcontests

(5)

1

game for 2, each with a pile of stones, largest prime factor of n related

f : \mathbb{Z}_+ \to \mathbb{Z}_+

f(1) = 1

f(n)

is the greatest prime divisor of

n

n > 1

. Aino and Väinö play a game, where each player has a pile of stones. On each turn the player to turn with

m

stones in his pile may remove at most

f(m)

stones from the opponent's pile, but must remove at least one stone. (The own pile stays unchanged.) The first player to clear the opponent's pile wins the game. Prove that there exists a positive integer

n

such that Aino loses, when both players play optimally, Aino starts, and initially both players have

n

1

Eve and Martti give each other euros

Eve and Martti have a whole number of euros. Martti said to Eve: ''If you give give me three euros, so I have

n

times the money compared to you. '' Eve in turn said to Martti: ''If you give me

n

euros then I have triple the amount of money compared to you'' . Suppose, that both claims are valid. What values can a positive integer

n

1

computational with segments by angle bisectors in terms of sidelengths

The sides of triangle

ABC

a = | BC |, b = | CA |

c = | AB |

D, E

F

are the points on the sides

BC, CA

AB

AD, BE

CF

are the angle bisectors of the triangle

ABC

. Determine the lengths of the segments

AD, BE

CF

a, b

c

1

butterfly theorem in finnish high school math competition

AB

CD

of a circle intersect at

M

, which is the midpoint of the chord

PQ

X

Y

are the intersections of the segments

AD

PQ

, respectively, and

BC

PQ

, respectively. Show that

M

is the midpoint of

XY

1

diophantine x^{2018}-y^{2018}=(xy)^{2017} for non-negative integers

Solve the diophantine equation

x^{2018}-y^{2018}=(xy)^{2017}

x

y

are non-negative integers.