# Number of ways in which you can make a cuboid of particular dimension

I was asked this problem in an interview. I could not figure out a way apart from taking all possibilities—i.e., complete brute force.

You have 3 kind of cubes 1×1×1, 1×2×1, and 1×1×2. How many ways can you make a cube of dimension 1×2n×k using the above types of cubes?

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What are the constraints of n and k? Can you rotate the cubes? –  fgb Dec 11 '12 at 21:53

for reduce this question i delete one constant dimension .

this question is simple:

we have 2 kind of 1*1,1*2 Squares,

HOW MANY WAYS you can make a Square of dimension 2^n X k using the above type of Squares?

and this question equal by: how many matching in Lattice graph with 2^n X k size?

because for each match we have one pattern to fill our Square,that set (1*2 Square) where the edge is match.and for other square set (1*1 Square)

i guess Matching polynomial & Bipartite graph is useful.

in same question with(n=1) you can use recursive function to solve it.and it is easy to prove that the result is between fibonacci_number and Catalan_number(for more details see Fibonacci numbers and Brick Wall Patterns in this link)

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