Problem 447. swap sign sum & multiply castles
- It is an easy problem, if you know the answer.
- Given a square matrix of NxN ordinary numbers.
- Initially place N identical indistinguishable castles or rooks (chess pieces) on the main diagonal.
- Then keep swapping any two rows or columns to exhaustively enumerate all possible unique patterns of castle formation.
- Not a single castle in any of these formations should be under threat of any other castle,
- only one castle watches over an otherwise empty row and column.
- For each pattern, find the product of all numbers covered by the castles.
- If this pattern was obtained after even number (0,2,4,...) of swaps,
- then add the product to an initially empty accumulator,
- otherwise subtract the product from the accumulator.
- Give the final expected value of the accumulator,
- does not matter whether by hook or by crook,
- but please give a general solution,
- the test suite may be modified soon.
Solution Stats
Problem Comments
-
4 Comments
Show
1 older comment
Robert Wagner
on 16 Feb 2024
??? kannitverstan
Zuha Altaf
on 14 Aug 2024
points 3 and 4 are not clear. Can you explain what is meant by castle here? probably a visualization may help better understand the picture in this problem
Christian Schröder
on 15 Aug 2024
@Zuha Altaf "castle" here means a rook, as in the chess piece; the given (square) matrix is also interpreted as an NxN chessboard.
Zuha Altaf
on 16 Aug 2024
@Christian Schröder, this clears the picture a little, thankyou for your explanation.
Solution Comments
Show commentsProblem Recent Solvers61
Suggested Problems
-
340 Solvers
-
convert matrix to single column
407 Solvers
-
Rounding off numbers to n decimals
4504 Solvers
-
642 Solvers
-
Solve a System of Linear Equations
11944 Solvers
More from this Author100
Problem Tags
Community Treasure Hunt
Find the treasures in MATLAB Central and discover how the community can help you!
Start Hunting!