$n_1<n_2<\ldots<n_k$ are all positive integer numbers $n$, that have the following property: In a square $n \times n$ one can mark $50$ cells so that in any square $3 \times 3$ an odd number of cells are marked. Find $n_{k-2}$
Source: Belarusian MO 2021
Tags: combinatorics
$n_1<n_2<\ldots<n_k$ are all positive integer numbers $n$, that have the following property: In a square $n \times n$ one can mark $50$ cells so that in any square $3 \times 3$ an odd number of cells are marked. Find $n_{k-2}$