Recursion Program

I am stuck up in this code:

Problem: A child can hop a staircase of steps n in 1,2 or 3 steps at one time. Given a value of n, print all the permutations of the order in which he can climb the staircase.

This is my code:

``````    public class HoppingLad
{
int count;
void hop(int n,int present)
{
if(n==present)
{
count++;
System.out.println("\nFinished type "+count+" climbing.\n");
}
else
{
if((n-present)>=1)
{
System.out.print("\nClimbed 1 step.\nReached "+(present+1)+"   ");
hop(n,present+1);
}
if((n-present)>=2)
{
System.out.print("\nClimbed 2 step. \nReached "+(present+2)+"   ");
hop(n,present+2);
}
if((n-present)>=3)
{
System.out.print("\nClimbed 3 step. \nReached "+(present+3)+"   ");
hop(n,present+3);
}

}

}

public static void main(String [] args)
{
hl.hop(3, 0);
System.out.println("There are "+hl.count+" ways to climb.");
}
}
``````

The output is :

`````` Climbed 1 step.
Reached 1
Climbed 1 step.
Reached 2
Climbed 1 step.
Reached 3
Finished type 1 climbing.

Climbed 2 step.
Reached 3
Finished type 2 climbing.

Climbed 2 step.
Reached 2
Climbed 1 step.
Reached 3
Finished type 3 climbing.

Climbed 3 step.
Reached 3
Finished type 4 climbing.

There are 4 ways to climb.
``````

The output I get is partly correct, partly incomplete. The number of ways to climb the staircase is correct but as you notice,

Climbed 2
Reached 3

part of the output is coming as it is without

Climbed 1
Reached 1

part coming before it. I have drawn the recursion tree and the tree even suggests that the first part is not there in the output.

However, the user has to be instructed from the ground level. I have tried many things, to no avail. Can anyone fix this out for me please?

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Sorry, I miss read the question –  BlackHatSamurai Jul 3 '12 at 21:41
If this is a homework question then please add the homework tag. –  pb2q Jul 3 '12 at 21:41
Actually it isn't a homework, i have taken it up independently.. Still for reference, i have done it. :) –  user1500024 Jul 3 '12 at 21:44

Your problem -- if I've understood the question correctly -- is that when, e.g., you consider the possibilities that start with climbing from step 0 to step 1, you just print out "climbed from 0 to 1" once and then display all the possibilities starting from step 1. (Of which, in general, there will be lots.)

Instead, you need to arrange that as you go through the recursion you keep track of the complete route, and then when you reach the top of the staircase you print out the whole route.

You could do this, for instance, by giving the `HoppingLad` class an array that, at the start of an invocation of `hop(n,k)`, describes how the lad got to step `k`. Then, in the `n==present` case, you can look through that array to output a complete description of how the lad got from 0 to `n`.

There are a few different ways to organize this, and the problem looks rather homework-y so I'd rather not fill in too many details. I hope the above is helpful despite this.

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you have interpreted it perfectly. Actually I am known to that solution with an array. i was wondering if there exists a work-around which might be just perfect to solve this one rather than me maintaining an array with some pain? –  user1500024 Jul 3 '12 at 21:49
I doubt you'll find anything that's appreciably simpler than that. You could keep track of a string rather than an array, or something. It wouldn't really be any easier. –  Gareth McCaughan Jul 3 '12 at 21:56
For the avoidance of doubt, when I say "array" I mean any data structure that behaves kinda like an array. It doesn't need to be literally an array; it could be a LinkedList or a Vector or ArrayList or whatever. –  Gareth McCaughan Jul 3 '12 at 21:57
Got it Sir. Thank you for answering and your guidance. –  user1500024 Jul 3 '12 at 21:59

You are printing the solution as partial results, so they are not repeated when you get a new solution based in that partial solution.

In other words, you do (for n= 3)

``````        --> state 0
hop(1)  --> state 1 --> print "1"
hop(1)  --> state 2 --> print "1"
hop(1)  --> state 3 --> print "1" --> print "solution";
``````

then you go back to state 2 (no further solutions possible) and back to state 1, and then you

``````hop(2) --> state 3 --> print "2" --> print "solution"
``````

without printing the "1" that allowed you to get to the state 1

The solution would be passing the list of steps needed to get to the actual state and, when a solution is reached, print all the list. Of course, since you will use an array or List for this, you will need to delete those steps when you go back to previous states.

UPDATE: An alternative (based in the changing the output) could be tabulating the answer based in the number of steps needed. I.e., the output would be something like that (for the same solution as above):

``````Climbed 1
-> Climbed 1
-> Climbed 1. Solution Found!
-> Climbed 2. Solution Found!
``````

That would allow the user to rebuild the path by itself. Then again, you need a new parameter to know the current number of steps.

If you want the array / List version but do not want to delete items, you can clone the list and pass a copy to the next function call, but that would be inefficient.

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So I feel that is the only way to go right? the one with arrays? –  user1500024 Jul 3 '12 at 21:53
Watch the update –  SJuan76 Jul 3 '12 at 21:58
Very Very innovative.Thanks a ton for sharing such an idea Sir. –  user1500024 Jul 3 '12 at 22:01

I have implemented this solution. I will email you only if you have completed your homework.

What you can do is maintain a `String` and keep concating the current step taken and when the condition is reached, print the entire `String`, do not print individual steps. That way, you will reduce the overhead of checking at every recursive step how close you are to the solution. You will be sure the path will be printed only if the current step leads to a solution.

For example (suppose n=3)

`3,0,"" -> 3,1,"1" -> 3,2,"11" -> 3,3,"111"` (one solution over, print "111")

In these kind of problems (generally), where you need to make a series of steps to reach a threshold value, the most efficient solution (generally) is to store the list of steps and then print the entire solution rather than printing individual steps. That whay you know you can be sure you gets all solutions covered, and you are not printing when the current step does not lead to a solution.

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