MathDB

1

v^2_1 +v^2_2 +...+v^2_n = p^2_1 +p^2_2 +...+p^2_n, in basketball tournament

In a basketball tournament any two of the

n

teams

S_1,S_2,...,S_n

play one match (no draws). Denote by

v_i

and

p_i

the number of victories and defeats of team

S_i

(

i = 1,2,...,n

), respectively. Prove that

v^2_1 +v^2_2 +...+v^2_n = p^2_1 +p^2_2 +...+p^2_n

4

1

terms of 1,11,111,1111,... base 9 are triangular

Show that all terms of the sequence

1,11,111,1111,...

in base

9

are triangular numbers, i.e. of the form

\frac{m(m+1)}{2}

for an integer

m

7

1

3 of n positive integers with same gcd, have also the same gcd

Given

n \ge 3

positive integers not exceeding

100

, let

d

be their greatest common divisor. Show that there exist three of these numbers whose greatest common divisor is also equal to

d

.

3

1

5 equal disks cover a regular pentagon, min radius

A regular pentagon of side length

1

is given. Determine the smallest

r

for which the pentagon can be covered by five discs of radius

r

and justify your answer.

6

1

x+y+z <= a+b+c+3d , in a tetrahedron

The edge lengths of the base of a tetrahedron are

a,b,c

, and the lateral edge lengths are

x,y,z

. If

d

is the distance from the top vertex to the centroid of the base, prove that

x+y+z \le a+b+c+3d

.

5

1

projections of 4 points onto a plane are the vertices of a parallelogram

Given four non-coplanar points, is it always possible to find a plane such that the orthogonal projections of the points onto the plane are the vertices of a parallelogram? How many such planes are there in general?

1

A tosses a coin n times, and B does n+1 times, n for fair game

Players

A

and

B

play the following game:

A

tosses a coin

n

times, and

B

does

n+1

times. The player who obtains more ”heads” wins; or in the case of equal balances,

A

is assigned victory. Find the values of

n

for which this game is fair (i.e. both players have equal chances for victory).

1988 ITAMO

Subcontests

v^2_1 +v^2_2 +...+v^2_n = p^2_1 +p^2_2 +...+p^2_n, in basketball tournament

terms of 1,11,111,1111,... base 9 are triangular

3 of n positive integers with same gcd, have also the same gcd

5 equal disks cover a regular pentagon, min radius

x+y+z <= a+b+c+3d , in a tetrahedron

projections of 4 points onto a plane are the vertices of a parallelogram

A tosses a coin n times, and B does n+1 times, n for fair game

1988 ITAMO

Subcontests

v^2_1 +v^2_2 +...+v^2_n = p^2_1 +p^2_2 +...+p^2_n, in basketball tournament

terms of 1,11,111,1111,... base 9 are triangular

3 of n positive integers with same gcd, have also the same gcd

5 equal disks cover a regular pentagon, min radius

x+y+z &lt;= a+b+c+3d , in a tetrahedron

projections of 4 points onto a plane are the vertices of a parallelogram

A tosses a coin n times, and B does n+1 times, n for fair game

x+y+z <= a+b+c+3d , in a tetrahedron