Here is my implementation of Problem 25 - Project Euler (see comments in code for explanation of how it works):

```
#include <iostream> //Declare headers and use correct namespace
#include <math.h>
using namespace std;
//Variables for the equation F_n(newTerm) = F_n-1(prevTerm) + Fn_2(currentTerm)
unsigned long long newTerm = 0;
unsigned long long prevTerm = 1; //F_1 initially = 1
unsigned long long currentTerm = 1; //F_2 initially = 2
unsigned long long termNo = 2; //Current number for the term
void getNextTerms() { //Iterates through the Fib sequence, by changing the global variables.
newTerm = prevTerm + currentTerm; //First run: newTerm = 2
unsigned long long temp = currentTerm; //temp = 1
currentTerm = newTerm; //currentTerm = 2
prevTerm = temp; //prevTerm = 1
termNo++; //termNo = 3
}
unsigned long long getLength(unsigned long long number) //Returns the length of the number
{
unsigned long long length = 0;
while (number >= 1) {
number = number / 10;
length++;
}
return length;
}
int main (int argc, const char * argv[])
{
while (true) {
getNextTerms(); //Gets next term in the Fib sequence
if (getLength(currentTerm) < 1000) { //Checks if the next terms size is less than the desired length
}
else { //Otherwise if it is perfect print out the term.
cout << termNo;
break;
}
}
}
```

This works for the example, and will run quickly as long as this line:

```
if (getLength(currentTerm) < 1000) { //Checks if the next term's size is less than the desired length
```

says 20 or lower instead of 1000. But if that number is greater than 20 it takes a forever, my patience gets the better of me and I stop the program, how can I make this algorithm more efficient?

If you have any questions just ask in the comments.

`unsigned long long`

is something like 3*10^38. That's much too small to hold a thousand-digit number. – Mat Jul 11 '11 at 5:14`long long`

will be 64-bits - the largest number that can be represented by such a type (if it's unsigned) is`18446744073709551615`

, which has 20 digits. There's no way to represent a number that has 1000 digits with that type (which is why it's taking your program forever - it can't be done). To find a fibonacci number with 1000 digits, you won't be able to just use`long long`

types - you'll need represent the numbers in some other way, – Michael Burr Jul 11 '11 at 5:16