
You have to break this problem down into the question of how many ways you can make each coin value with coins of the same or lower values. This would lead you to something like this (I hope my assumptions are correct):
1p
A_1p = {{1p}}
A_1p = 1
2p
A_2p = {{2p}, {1p,1p}}
A_2p = 1 + 1 = 2
5p
A_5p = {{5p}, {2p,2p,1p}, {2p,1p,1p,1p}, {1p,1p,1p,1p,1p}}
A_5p = 1 + 3 = 4
10p
A_10p = {{10p},
{5p,5p}, {5p,2p,2p,1p}, {5p,2p,1p,1p,1p}, {5p,1p,1p,1p,1p,1p},
{2p,2p,1p,2p,2p,1p}, {2p,2p,1p,2p,1p,1p,1p,}, {2p,2p,1p,1p,1p,1p,1p,1p,},
{2p,1p,1p,1p,2p,1p,1p,1p,}, {2p,1p,1p,1p,1p,1p,1p,1p,1p},
{1p,1p,1p,1p,1p,1p,1p,1p,1p,1p},
{2p,2p,2p,2p,2p,2p}
}
A_10p = 1 + 10 + 1 = 12
…

answered Apr 26 '09 at 11:49

