2016 Kyrgyzstan National Olympiad

Part of Kyrgyzstan National Olympiad

Subcontests

(6)

1

three pairwise tangent circles

Given three pairwise tangent equal circles

\Omega_i (i=1,2,3)

r

\Gamma

touches the three circles internally (circumscribed about 3 circles).The three equal circles

\omega_i (i=1,2,3)

x

\Omega_i

\Omega_{i+1}

\Omega_4= \Omega_1

\Gamma

internally.Find

x

r

1

polynomials

Given two monic polynomials

P(x)

Q(x)

with degrees 2016.

P(x)=Q(x)

has no real root. Prove that P(x)=Q(x+1) has at least one real root.

1

combinatorics problem

Aibek wrote 6 letters to 6 different person.In how many ways can he send the letters to them,such that no person gets his letter.

1

find the area,

\triangle ABC

a,b,c.

Three tangents are drawn to the incircle of

\triangle ABC

parallel to the sides of

\triangle ABC

.These tangents cut three new little triangles.Three little incircles are drawn into new little triangles.Find the sum of the area of these 4 incircles.

1

nice combinatorics problem

N

2's

1's

in its decimal representation.We know that,after deleting digits from N,we can get any number consisting

9999

1's

one

2's

in its decimal representation.Find the least number of digits in the decimal representation of N

1

a+b+c=0,then?

a+b+c=0

,then find the value of

(\frac{a}{b-c}+\frac{b}{c-a}+\frac{c}{a-b})(\frac{b-c}{a}+\frac{c-a}{b}+\frac{a-b}{c})