You are given a set of blocks to build a panel using 3”×1” and 4.5”×1" blocks.

For structural integrity, the spaces between the blocks must not line up in adjacent rows.

There are 2 ways in which to build a 7.5”×1” panel, 2 ways to build a 7.5”×2” panel, 4 ways to build a 12”×3” panel, and 7958 ways to build a 27”×5” panel. How many different ways are there to build a 48”×10” panel?

This is what I understand so far:

with the blocks **3 x 1** and **4.5 x 1**

I've used combination formula to find all possible combinations that the 2 blocks can be arranged in a panel of this size

**C = choose --> C(n, k) = n!/r!(n-r)! combination of group n at r at a time**

**Panel: 7.5 x 1 = 2 ways** -->

1 (3 x 1 block) and 1 (4.5 x 1 block) --> Only 2 blocks are used--> 2 C 1 = **2 ways**

**Panel: 7.5 x 2 = 2 ways**

I used combination here as well

1(3 x 1 block) and 1 (4.5 x 1 block) --> 2 C 1 = **2 ways**

**Panel: 12 x 3 panel = 2 ways** -->

2(4.5 x 1 block) and 1(3 x 1 block) --> 3 C 1 = **3 ways**

0(4.5 x 1 block) and 4(3 x 1 block) --> 4 C 0 = **1 way**

3 ways + 1 way = **4 ways**

**(This is where I get confused)**

**Panel 27 x 5 panel = 7958 ways**

6(4.5 x 1 block) and 0(3 x 1) --> 6 C 0 = **1 way**

4(4.5 x 1 block) and 3(3 x 1 block) --> 7 C 3 = **35 ways**

2(4.5 x 1 block) and 6(3 x 1 block) --> 8 C 2 = **28 ways**

0(4.5 x 1 block) and 9(3 x 1 block) --> 9 C 0 = **1 way**

1 way + 35 ways + 28 ways + 1 way = **65 ways**

As you can see here the number of ways is nowhere near 7958. What am I doing wrong here?

Also how would I find how many ways there are to construct a 48 x 10 panel? Because it's a little difficult to do it by hand especially when trying to find 7958 ways.

How would write a program to calculate an answer for the number of ways for a 7958 panel? Would it be easier to construct a program to calculate the result? Any help would be greatly appreciated.

Exceptsome of them are not going to work, because they'll have the separation between bricks lined up with each other. – MatrixFrog Jul 11 '11 at 3:35