# Multiple recursions in a single statement

I have a question which asks, how many times '1' is printed when the code below is executed:

#!/usr/local/bin/python2.7

def rec(n):
count = 1
if n > 0:
count += rec(n - 1) + rec(n - 1)
print '1'
return count

rec(5)

When trying to solve the above problem shown above, i was confounded with certain concepts of recursion.

1> How to approach problems with multiple recursive calls in a single statement. In the question in what order do the recursion takes place, simultaneous or one after the other.

2> I have learnt (in C) that there must always be a condition in the recursive function, which determines the number of recursions, i am not able to find such condition, so how do i find out the number of levels.

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how many times '1' is printed when the code below is executed... Execute the code once :) –  thefourtheye Mar 11 at 8:53
@thefourtheye, Answer is 63, But how ? –  Beagle Bone Mar 11 at 8:54
And why don't you simply do 2 * rec(n - 1)? –  thefourtheye Mar 11 at 8:54
It helps if you think of each call as a separate function, that just happens to do the same thing. count += rec1(n - 1) + rec2(n - 1). –  Martijn Pieters Mar 11 at 8:56
Draw, on paper, a tree with root node value 5, then make 2 branches each with the immideate childhaving one less. Continue untill you have leaf nodes of 0. Since your print is doneunconditionally count all the nodes.Answer would be (n+1)^2-1 –  Sylwester Mar 11 at 9:27

Let's see it level by level:

rec(5) - you call once, print 1 once
rec(4) - you call twice ONE AFTER ANOTHER (not in parallel). Print 1 twice.
rec(3) - you call 4 times (called twice from the two rec(4)-s), print 1 four times.
rec(2) - call 8 times, print 1 eight times
rec(1) - call 16 times, print 1 sixteen times.
rec(0) - call 32 times, print 1 32 times, but no further recursion called because n==0

32+16+8+4+2+1=63

As in recursions, execution in performed bottom up, so your rec(0) ones will be printed first:

Printed ones:

rec(0) - 32
rec(1) - 16
rec(2) - 8
rec(3) - 4
rec(4) - 2
rec(5) - 1

As you can see, you can easily generalize the case for any n as a sum of series. Basically, this double-call recursion is no different from the simple recursion except that you don't call levels once, but 2^n times.

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above code, number of times print statement will be executed for input 5 is 63 which is correct. Lets see using the tree.Every node has 2 children because function is called 2 times in recursion.

5---->1

4 4---->2(child nodes of 5)

3 3 3 3--->4(child nodes of 4 and 4(second one)) and likewise

2 2 2 2 2 2 2 2----->8

1 1 1 1 1 1 1 1 1 1 1 1 1 1 1 1--->16

0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0 0--->32