1996 APMO

Part of APMO

Subcontests

(5)

1

Triangle inequality

a

b

c

be the lengths of the sides of a triangle. Prove that

\sqrt{a+b-c} + \sqrt{b+c-a} + \sqrt{c+a-b} \leq \sqrt{a} + \sqrt{b} + \sqrt{c}

and determine when equality occurs.

1

Inequality with !

m

n

be positive integers such that

n \leq m

2^n n! \leq \frac{(m+n)!}{(m-n)!} \leq (m^2 + m)^n

1

Form groups

The National Marriage Council wishes to invite

n

couples to form 17 discussion groups under the following conditions: (1) All members of a group must be of the same sex; i.e. they are either all male or all female. (2) The difference in the size of any two groups is 0 or 1. (3) All groups have at least 1 member. (4) Each person must belong to one and only one group. Find all values of

n

n \leq 1996

, for which this is possible. Justify your answer.

1

Distance constant

ABCD

be a quadrilateral

AB = BC = CD = DA

MN

PQ

be two segments perpendicular to the diagonal

BD

and such that the distance between them is

d > \frac{BD}{2}

M \in AD

N \in DC

P \in AB

Q \in BC

. Show that the perimeter of hexagon

AMNCQP

does not depend on the position of

MN

PQ

so long as the distance between them remains constant.

1

ABCD cyclic --> incenters of BCD, etc. form rectangle

ABCD

is a cyclic quadrilateral, then prove that the incenters of the triangles

ABC

BCD

CDA

DAB

are the vertices of a rectangle.