Take the 2-minute tour ×
Stack Overflow is a question and answer site for professional and enthusiast programmers. It's 100% free, no registration required.
public class Recursive_Prob
{    
    public static void main(String[] args)    
    {    
        out.print("\f");   
        out.print(m(4));   
    }   
    public static int m(int a)   
    {   
        if (a < 0)    
            return 0;    
        else    
            return m(a-2) + n(a-1);    
    }       
    public static int n(int b)     
    {     
        if (b <= 0)    
            return 0;     
        else     
            return 1 + n(b-1);     
    }       
}    

I had a question asking what the output would be when method m was called with out.print(m(4)); I tried working it out and came out with 0 but the answer was 4 when I ran the code. I ended up with m(a-2) being 0 and that part was right but using the same logic, n(a-1) was also 0 so clearly I'm doing something wrong. Could someone explain how this works?

share|improve this question
1  
Run it under a debugger and find out? –  RC. Feb 4 '14 at 6:07
    
Use the concept of stack frame in order to trace the execution. –  surya singh Feb 4 '14 at 6:11
    
m just calls n counting down. n adds 1 a number of times equal to b. What you get is (1+1+1)+(1). –  Radiodef Feb 4 '14 at 6:13

6 Answers 6

up vote 5 down vote accepted

The best way to find out the answer would be drawing a recursion tree . Let me try :

                    m(4)
                     /\
                    /  \
                   m(2) \
                   /\   n(3)
                  /  \     \
                 m(0) \     \
                 /\   n(1)  1+n(2)
                /  \    \      \
              m(-2) \  1+n(0)   \
               /   n(-1)   \   1+n(1)
              0       \     0      \   
                       0            \
                                   1+n(0)
                                      \
                                       0

Add them up , the result should be 4.

share|improve this answer
1  
+1 for the ascii art tree :) –  RC. Feb 4 '14 at 6:14
    
The left subtree should go till m(-2) as per the condition. –  Prince Feb 4 '14 at 6:18
1  
@Prince Thanks for the correction. –  NINCOMPOOP Feb 4 '14 at 6:24

Here's a step by step calculation:

m(4) = m(2) + n(3)
     = m(0) + n(1) + n(3)
     = m(-2) + n(-1) + n(1) + n(3)
     = 0 + 0 + 1 + n(0) + 1 + n(2)
     = 0 + 0 + 1 + 0 + 1 + 1 + n(1)
     = 0 + 0 + 1 + 0 + 1 + 1 + 1 + n(0)
     = 0 + 0 + 1 + 0 + 1 + 1 + 1 + 0
     = 4
share|improve this answer

enter image description here

If you add up all the red lines it equals 4.

The left side of the tree actually goes to m(-2) but I didn't include it because it results in 0.

share|improve this answer

You have 1 + n(b-1) in n(int b) function. The call n(a-1) will do 4 recursive calls to n(int b) and return 4

share|improve this answer

Let's break it down:

m(4) = m(2) + n(3);
m(2) = m(0) + n(1);
m(0) = m(-2) + n(-1);
     =   0   +   0

n(3) = 1 + n(2);
n(2) = 1 + n(1);
n(1) = 1 + n(0);
     = 1 +  0 
n(1) = 2

Lets substitute all the values back:

n(2) = 1 + n(1) = 2
n(3) = 1 + n(2) = 3

m(2) = 0 + 1;
m(4) = 1 + 3 = 4
share|improve this answer
first call m(4) +n(3)
second call m(2) + n(1)
third call m(0) +n(-1)
fourth call m(-2) + n(-3)
the function m returns 0
so the fourth call becomes 0+n(-3)
n(-3) also returns 0 so overall the function in fourth call will return 0
now in third call we have m(0) = 0, now n(-1) will also return 0,so overall 
the third call will return 0 to second call.
now in second call m(2) = 0 , and now it call n(1) .. n(1) will return 1+n(0)=>1
so second call will return 0+1 to first call 
now in first call m(4) =1 ,now it will call n(3).
now in n(3)..it will call 1+n(2) => 1+n(1) => 1+n(0) =>1 so n(3) will return 3
so overall result is 1+3 =>4
share|improve this answer

Your Answer

 
discard

By posting your answer, you agree to the privacy policy and terms of service.

Not the answer you're looking for? Browse other questions tagged or ask your own question.