Consider a Cartesian grid, with verteces at integer x and y values, where every four vertices around a vacant space define a unit square. An Aztec Diamond of order d is the shape formed by all unit squares whose centers satisfy the equation:
abs(x) + abs(y) <= d
Given the order of an Aztec Diamond, d (positive integer), return the number, n, of possible tilings using domino tiles, i.e. rectangles sized 1x2 and 2x1, such that:
- The entire shape is covered
- There are no overlapping tiles
- None of the tiles stick out of the shape
Example:
An Aztec Diamond of order 4 is shown at this URL.
Input: d = 4
Output: n = 1024
Solution Stats
Solution Comments
Show commentsProblem Recent Solvers13
Suggested Problems
-
4322 Solvers
-
What is the distance from point P(x,y) to the line Ax + By + C = 0?
554 Solvers
-
Number of 1s in a binary string
10974 Solvers
-
Set the array elements whose value is 13 to 0
1437 Solvers
-
Approximation of Pi (vector inputs)
272 Solvers
More from this Author45
Problem Tags
Community Treasure Hunt
Find the treasures in MATLAB Central and discover how the community can help you!
Start Hunting!
