# Getting started with recursion

I need to write a function that is the recursive version of summing up numbers 1 through n. It needs to be recursive, which I have no idea how to do, although I did the iterative version quite easily.

All I know about recursion is that you call the function in the function. Any help on where to get started is greatly appreciated.

Here is the iterative version I did.

``````def summ(n):
result = 0
for i in range(1,n+1,1):
result = result + i
return result
``````
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See here: stackoverflow.com/questions/785897/… –  Pablo Nov 22 '11 at 18:33
When thinking about recursion, I've always found it helpful to formulate an English sentence for how my recursion works. In this case I might say something like "The `sum` from `1` to `n` can be described as: `n` plus the `sum` of `1` to `n-1`." While you still have to define base cases and such, I've always found a good sentence helps me visualize the execution. –  Wilduck Nov 22 '11 at 19:29

As always with recursive functions, define a base case and a recursive case, then implement these in a function that checks whether it's reached the base case. There are various recursive algorithms for this problem, one of which is:

Base case. `n==1`. The sum is trivial.

Recursive case. If you have the sum of the numbers through `n`, how do you get the sum through `n+1`?

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Depending on how you want your function to handle values less than 1, I'd say the base case should be `n <= 1`. –  Manny D Nov 22 '11 at 18:41
@MannyD: the OP wants to sum "numbers 1 through n". In practice, I'd just write `sum(xrange(n+1))`. –  larsmans Nov 22 '11 at 18:42
Yeah I'm always thinking error cases and if you call your function with 0 or less, you'd best be prepared to handle it otherwise you might have your function infinitely recur on itself. In normal cases, yes, that base case would be sufficient. –  Manny D Nov 22 '11 at 18:45
@larsmans In practice you should write `n*(n+1)/2` ;) –  Pablo Nov 22 '11 at 19:01

I think this answer is in order,using the base case as m==1

``````def summ(m):
if m==1:
return 1
else:
return m+summ(m-1)
``````
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``````def addup(n):