2011 Nordic

Part of Nordic

Subcontests

(4)

1

Harmonic sums of relatively prime integers

Show that for any integer

n \ge 2

the sum of the fractions

\frac{1}{ab}

a

b

are relatively prime positive integers such that

a < b \le n

a+b > n

\frac{1}{2}

a

b

are called relatively prime if the greatest common divisor of

a

b

1

1

Functional: f(f(x)+y)=f(x^2-y)+4yf(x)

Find all functions

f

f(f(x) + y) = f(x^2-y) + 4yf(x)

for all real numbers

x

y

1

Ratio between parallel segments in an isosceles triangle

ABC

AB = AC

D

E

be points on the extension of segment

BA

A

and on the segment

BC

, respectively, such that the lines

CD

AE

are parallel. Prove CD \ge \frac{4h}{BC}CE, where

h

is the height from

A

ABC

. When does equality hold?

1

Can a number plus its reverse have only odd digits

a_0, a_1, \dots , a_{1000}

denote digits, can the sum of the

1001

a_0a_1\cdots a_{1000}

a_{1000}a_{999}\cdots a_0

have odd digits only?