# Algorithm using recursion

I am given three operation on integer:
A - add 3 to number
B - doubles the number
C - swaps two last digits of number
I am supposed to write algorithm that checks if i can make k prime number using operations A,B,C in n steps. At the end i have to print the sequence of operations that i used to make k prime number. Lets assume we have function:

``````bool ifprime(int n);
``````

The function `ifprime` returns true when the number is prime and return false when it is not.

The code:

``````bool is_possible(int k, int n, int a)
{
if(ifprime(k))
{
return true;
}
if(n==0)
{
return false;
}
switch(a)
{
case 1:
k = A(k); // perform operation A
break;
case 2:
k=B(k); //perform operation B
break;
case 3:
k=C(k); //perform operation C
break;
}
return is_possible(k,n-1,1)||is_possible(k,n-1,2)||is_possible(k,n-1,3);
}
``````

My problem is that i do not know how to remember the correct path and then print it.

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at the time when you've detected the positive result print a message, after every recursive call if the return value is `true` print a message. once debugged replace "print a message" with appropriate output step –  bobah Dec 7 '13 at 19:08
Did you mean enter "print message" 'if(ifprime(k)){cout << a; return true;}' I do not really understand. When i print message after detection i won't be able to print all steps. I would be extremely grateful if you could explain me this one more time. –  Marcin Majewski Dec 7 '13 at 19:16
every time your `is_possible()` is about to return `true`, including cases when it returns a value from the recursive call to itself, log the message. –  bobah Dec 7 '13 at 19:53

Pass an array `steps` of size `n` to your function as the forth parameter. Pass `N`, the total size of the array, as the fifth parameter. Put the value of `a` into `steps[N-n]` upon entering the function. Rather than returning `bool`, return an `int` that says how many steps it took to find a prime. If no prime has been found, return `-1`.

You need to return an `int` to know how many steps it took to come up with an answer in situations when it took less than `n` steps to reach a prime.

``````int is_possible(int k, int n, int a, int[] steps, int N) {
if(ifprime(k))
{
return N-n;
}
if (!n)
{
return -1;
}
steps[N-n] = a;
...
for (int i = 1 ; i <= 3 ; i++) {
int res = is_possible(k, n-1, i, steps, N);
if (res != -1) return res;
}
return -1;
}
``````

Note that this approach may not be fast enough. You may need to memoize your recursion.

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I think i understood it, but i have question. "..." this three dots mean that code `switch(a) { case 1: k = A(k); // perform operation A break; case 2: k=B(k); //perform operation B break; case 3: k=C(k); //perform operation C break; }` ? –  Marcin Majewski Dec 7 '13 at 19:40
@MarcinMajewski Yes - I did not want to copy the parts of your code that did not change. Did you check the link on memoization? –  dasblinkenlight Dec 7 '13 at 19:42
I checked and it was very useful to understand the idea of "memorization". I will try to use this in this code. Thank you –  Marcin Majewski Dec 7 '13 at 19:52

I think you should not use a switch case if u want to evaluate all possibilities. Here is a way to do what u intended :-

``````bool is_possible(int k,int n,int i,char* ch) {

if(ifprime(k)) {
ch[i] = '\0';
return true;
}

if(n==0)
return false;

if(is_possible(A(k),n-1,i+1,ch)) {

ch[i] = 'A';
return true;
}
if(is_possible(B(k),n-1,i+1,ch)) {

ch[i] = 'B';
return true;
}
if(is_possible(C(k),n-1,i+1,ch)) {

ch[i] = 'C';
return true;
}

return false;

}

if(is_possible(3,5,0,ch))
print(ch);
``````
-

Or just print as you go (which is probably simplest way):

``````bool is_possible(int k, int n, int a)
{
if(ifprime(k))
{
return true;
}
if(n==0)
{
return false;
}
std::cout << "n=" << n << " a = " << a << std::endl;
switch(a)
{
case 1:
k = A(k); // perform operation A
break;
case 2:
k=B(k); //perform operation B
break;
case 3:
k=C(k); //perform operation C
break;
}
return is_possible(k,n-1,1)||is_possible(k,n-1,2)||is_possible(k,n-1,3);
}
``````
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