2015 Greece National Olympiad

Part of Greece National Olympiad

Subcontests

(4)

1

From A to C

ABCD

with side-length

n

is divided into

n^2

small (fundamental) squares by drawing lines parallel to its sides (the case

n=5

is presented on the diagram).The squares' vertices that lie inside (or on the boundary) of the triangle

ABD

are connected with each other with arcs.Starting from

A

,we move only upwards or to the right.Each movement takes place on the segments that are defined by the fundamental squares and the arcs of the circles.How many possible roots are there in order to reach

C

1

Angle and bisection (Simple)

Given is a triangle

ABC

\angle{B}=105^{\circ}

D

BC

\angle{BDA}=45^{\circ}

D

is the midpoint of

BC

then prove that

\angle{C}=30^{\circ}

\angle{C}=30^{\circ}

then prove that

D

is the midpoint of

BC

1

Coefficients of a polynomial

P(x)=ax^3+(b-a)x^2-(c+b)x+c

Q(x)=x^4+(b-1)x^3+(a-b)x^2-(c+a)x+c

be polynomials of

x

a,b,c

non-zero real numbers and

b>0

P(x)

has three distinct real roots

x_0,x_1,x_2

which are also roots of

Q(x)

then: A)Prove that

abc>28

a,b,c

are non-zero integers with

b>0

,find all their possible values.

1

Equation with integers and prime

Find all triplets

(x,y,p)

of positive integers such that

p

be a prime number and

\frac{xy^3}{x+y}=p