MathDB

Let

n\geqslant 2

be a positive integer. Paul has a

1\times n^2

rectangular strip consisting of

n^2

unit squares, where the

i^{\text{th}}

square is labelled with

i

for all

1\leqslant i\leqslant n^2

. He wishes to cut the strip into several pieces, where each piece consists of a number of consecutive unit squares, and then translate (without rotating or flipping) the pieces to obtain an

n\times n

square satisfying the following property: if the unit square in the

i^{\text{th}}

row and

j^{\text{th}}

column is labelled with

a_{ij}

, then

a_{ij}-(i+j-1)

is divisible by

n

.
Determine the smallest number of pieces Paul needs to make in order to accomplish this.

C4

Problems(1)