How to alter these functions so that they recursively find the solution

This is a question about Project Euler problem #67. (Find the maximum path down a triangle) I know it may be in bad taste to ask for help on these.

I have these functions:

``````def chooseBest(rowOfTriangle):
if len(rowOfTriangle) == 1:
return rowOfTriangle
return list(max(element) for element in zip(rowOfTriangle[0:-1],rowOfTriangle[1:]))
``````

and:

``````def consolidatePath(rowOfTriangle , bestPath):
return list(sum(element) for element in zip(rowOfTriangle,bestPath))
``````

which work on a data set formatted like this:

``````triangle = [[1], [2, 3], [4, 5, 6], [7, 8, 9, 10]]
``````

where the solution for this triangle would look like:

``````consolidatePath(triangle[0],chooseBest(consolidatePath(triangle[1],chooseBest(consolidatePath(triangle[2],chooseBest(triangle[3]))))))
``````

This outputs (correctly):

``````[20]
``````

Writing out each nested function call is far from optimal, and is going to be impossible when I scale up to the problem's hundred rows. How do I alter `consolidatePath` and `chooseBest` to call each other where appropriate?

EDIT: Figured it out.

-
Think dynamic programming. –  Justin Peel Sep 24 '11 at 2:42
If you figured it out, then post the answer! –  Michael J. Barber Sep 24 '11 at 6:05

Something like this?

``````def max_path(triangle, idx=0, total=0):
if triangle:
row = triangle[0]
next = max(row[idx:idx+2])
return max_path(triangle[1:], row.index(next), total+next)
While your method finds the sum of the largest elements in each row, it's not guaranteed to find the `max_path` like the method suggests. (swap 2 & 3 in the second row in the given test data and the max path is 19 but this would still return 20). –  Austin Salonen Sep 26 '11 at 14:41