# Recursive numeric triangle in python

I'm trying to create a triangle like the following:

``````1 2 3 4 5 6
2 3 4 5 6
3 4 5 6
4 5 6
5 6
6
``````

Without using while, for in, lists, etc. Just "if-else" cases and recursive functions. I've just learned how to do an asterisk triangle.

``````def triangle(i, t=0):
if i == 0:
return ' '
else:
print '*' * i
return triangle( i - 1, t + 1 )

triangle(6)
``````

It has the same idea I want to apply to my exercise, but I really don't know how to do with the code for changing term by term and print them all to the right like this one.

-

Here is my solution. Note that there is neither `range` nor `join`, which implies `for` or `list`

``````In [1]: def tri(size, row = 0, col = 0):
...:     if row < size:
...:         num = row + col + 1
...:         if num == size + 1:
...:             print '\n',
...:             tri(size, row + 1, 0)
...:         if num <= size:
...:             print num, '',
...:             tri(size, row, col + 1)
...:

In [2]: tri(6)
1  2  3  4  5  6
2  3  4  5  6
3  4  5  6
4  5  6
5  6
6
``````

If `range` is acceptable, then here is a short one:

``````def tri2(size):
row = map(str, range(1, size + 1))
print '\n'.join(map(lambda n: ' '.join(row[n:]), range(size)))
``````
-

You can use `range()` or `xrange()` to get the list of numbers, and decrease the range with each recursion:

``````def triangle(i, t):
if i == t:
return i
else:
print " ".join([str(x) for x in range(i,t+1)])
return triangle( i + 1, t )
``````

output:

``````>>> triangle(1,6)
1 2 3 4 5 6
2 3 4 5 6
3 4 5 6
4 5 6
5 6
6
>>> triangle(1,8)
1 2 3 4 5 6 7 8
2 3 4 5 6 7 8
3 4 5 6 7 8
4 5 6 7 8
5 6 7 8
6 7 8
7 8
8
``````
-

By calling the function recursively You have realized a kind of loop. Now you can replicate the same idea:

``````def OneLess(i,j):
print i,
if i < j:
OneLess(i+1,j)
else:
print ""

def triangle(i, t=1):
OneLess(t,i)#print '*' * i
if i == t:
return ' '
return triangle( i , t + 1 )

triangle(6)
``````
-

I'd suggest something like this:

``````def triangle(i, t = 1):
if i > 0:
print ' '.join([str(n+t) for n in range(i)])
triangle( i - 1, t + 1 )
``````

The `range` gives you a list of the numbers needed at each level, and the `t` offset is increased by one so you're starting from a higher value each level you go down.

Update

I've just noticed your requirement for no `for in` and lists, which probably makes the above example wrong. So here is another suggestion using only recursion:

``````def triangle(size, col = 1, row = 1):
if col < size:
print col,
triangle(size, col+1, row)
else:
print col
if row < size:
triangle(size, row+1, row+1)
``````
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