# I need help in making my program faster [closed]

## I am working on projecteuler # 14 http://projecteuler.net/problem=14 and this is my code:

Is there any way that I can make my code more efficient because it is taking way too long.

Any and all help is appreciated!

``````#include <iostream>

bool tester(int n)
{
bool result = false;
if (n%2 == 0) result = true;
return result;
}

int collatz_counter (int collatz_number)
{
int j = collatz_number;
int total = 0;
do
{
if (tester(j))
{
j /=2;
total ++;
}
else
{
j = 3*j +1;
total ++;
}
}while (j!=1);
total +=1;          // To account for the original number itself
}

int max_number_finder(int n)
{
int max = 0;
int max_number = 0;
for (int i = n; i>1; i--)
{
if(collatz_counter(i) > max)
{
max_number = i;
max = collatz_counter(i);
}
}
return max_number;
}

int max_finder (int n)
{
int max = 0;
int max_number = 0;
for (int i = n; i>1; i--)
{
if(collatz_counter(i) > max)
{
max_number = i;
max = collatz_counter(i);
}
}
return max;
}

int main (void)
{
int starter;
int x;
std::cout<<"Enter value :"<<std::endl;
std::cin>>starter;
std::cout<<std::endl;
int Max = 0;
int Max_Number = 0;
for (x = starter; x>= (starter / 3) -1 ; x--)
{
if (max_finder(x) > Max)
{
Max_Number = max_number_finder(x);
Max = max_finder(x);
}
}

std::cout<<" The maximum numbers in the collatz sequence is "<<Max_Number<<std::endl;
std::cout<<" The starting number of the collatz sequence is "<<Max<<std::endl;
system ("pause");
return 0;
}
``````
-
CodeReview was meant for that matters. –  Patrick Bassut Jan 15 '13 at 22:46
This belongs in Code Review. –  Rapptz Jan 15 '13 at 22:47
If it is "taking way too long" then the issue might be not using a suitable algorithm .. (I believe the above is somewhere in `O(n^2)`.) –  user166390 Jan 15 '13 at 22:47
You can improve speed by using dynamic programming. Any time you encounter a number that has already had its chain length calculated, you can use that calculation and stop immediately. –  paddy Jan 15 '13 at 22:47
Read en.wikipedia.org/wiki/Project_Euler - the whole idea of this code challenge is to figure out yourself how to make the search faster. –  D Mac Jan 15 '13 at 23:02

## closed as not a real question by Oli Charlesworth, Mysticial, billz, 0x499602D2, Bo PerssonJan 15 '13 at 22:57

It's difficult to tell what is being asked here. This question is ambiguous, vague, incomplete, overly broad, or rhetorical and cannot be reasonably answered in its current form. For help clarifying this question so that it can be reopened, visit the help center.If this question can be reworded to fit the rules in the help center, please edit the question.

You are basically executing the same algorithm twice, once for returning the maximum number, once for returning the number which yields the maximum number. One algorithm that returns a `pair` is enough:

``````#include <tuple> // Don't forget this

std::pair<int, int> max_finder (int n)
{
int max = 0;
int max_number = 0;
for (int i = n; i>1; i--)
{
if(collatz_counter(i) > max)
{
max_number = i;
max = collatz_counter(i);
}
}
return {max, max_number};
}
``````

Then, you could use it this way in your `main()` procedure:

``````int main (void)
{
int starter;
int x;
std::cout<<"Enter value :"<<std::endl;
std::cin>>starter;
std::cout<<std::endl;
int Max = 0;
int Max_Number = 0;
for (x = starter; x>= (starter / 3) -1 ; x--)
{
int m, mn;
std::tie(m, mn) = max_finder(x);
if (mn > Max_Number)
{
m = Max;
Max_Number = mn;
}
}

std::cout<<" The maximum numbers in the collatz sequence is "<<Max_Number<<std::endl;
std::cout<<" The starting number of the collatz sequence is "<<Max<<std::endl;
return 0;
}
``````

This should improve the execution time by about 2x

-
It's still a lot of overhead... –  Luchian Grigore Jan 15 '13 at 22:51
@LuchianGrigore: agreed. but he asked how to make the code more efficient, so I provided a hint. i did not analyze the algorithm itself - probably our answers are complementary –  Andy Prowl Jan 15 '13 at 22:53
Consider the number `x` and sequence `x->y->z->...`.
Think about this - you know that `x` has a longer chain than all subsequent numbers, so there's no need to check them as weill, right?