1

Part of 1975 Polish MO Finals

Problems(1)

\sum_{i=N}^{N+k} a_i \ge 0

Source: Polish MO Finals 1975 p1

(a_k)_{k=1}^{\infty}

has the property that there is a natural number

n

a_1 + a_2 +...+ a_n = 0

a_{n+k} = a_k

k

. Prove that there exists a natural number

N

\sum_{i=N}^{N+k} a_i \ge 0 \,\, \,\, for \,\,\,\, k = 0,1,2...

algebrainequalities