Let n be a positive integer. Initially, a bishop is placed in each square of the top row of a 2n×2n
chessboard; those bishops are numbered from 1 to 2n from left to right. A jump is a simultaneous move made by all bishops such that each bishop moves diagonally, in a straight line, some number of squares, and at the end of the jump, the bishops all stand in different squares of the same row.Find the total number of permutations σ of the numbers 1,2,…,2n with the following property: There exists a sequence of jumps such that all bishops end up on the bottom row arranged in the order σ(1),σ(2),…,σ(2n), from left to right.Israel RMMcombinatoricsBishopchesspermutationsProcess