1980 IMO Shortlist

Part of IMO Shortlist

Subcontests

(4)

1

straight line D is tangent at A

C_{1}

C_{2}

are (externally or internally) tangent at a point

P

. The straight line

D

A

to one of the circles and cuts the other circle at the points

B

C

. Prove that the straight line

PA

is an interior or exterior bisector of the angle

\angle BPC

1

ten gamblers

Ten gamblers started playing with the same amount of money. Each turn they cast (threw) five dice. At each stage the gambler who had thrown paid to each of his 9 opponents

\frac{1}{n}

times the amount which that opponent owned at that moment. They threw and paid one after the other. At the 10th round (i.e. when each gambler has cast the five dice once), the dice showed a total of 12, and after payment it turned out that every player had exactly the same sum as he had at the beginning. Is it possible to determine the total shown by the dice at the nine former rounds ?

1

common interior tangent

A,B,C

B \in ]AC[

. On the side of

AC

we draw the three semicircles with diameters

[AB], [BC]

[AC]

. The common interior tangent at

B

to the first two semi-circles meets the third circle in

E

U

V

be the points of contact of the common exterior tangent to the first two semi-circles. Denote the area of the triangle

ABC

S(ABC)

. Evaluate the ratio

R=\frac{S(EUV)}{S(EAC)}

as a function of

r_1 = \frac{AB}{2}

r_2 = \frac{BC}{2}

1

f(xy) = f(x)f(y) - f(x+y) + 1

f

is defined on the set

\mathbb{Q}

of all rational numbers and has values in

\mathbb{Q}

. It satisfies the conditions

f(1) = 2

f(xy) = f(x)f(y) - f(x+y) + 1

x,y \in \mathbb{Q}

f