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Problem: Find the number of integers 1 < n < 10^7, for which n and n + 1 have the same number of positive divisors. For example, 14 has the positive divisors 1, 2, 7, 14 while 15 has 1, 3, 5, 15.

I can't reach 10^7 because it is too big number for C and me. How can i solve this problem in C?


int divisorcount(int);

int main()
    int number,divisornumber1,divisornumber2,j=0;

            printf("%d and %d\n",number-1,number);
    printf("\nThere is %d integers.",j);


int divisorcount(int num)
    int i,divi=0;
    return divi;
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Too big for int, not C. Use a long long instead. – Gregor McGregor Sep 30 '12 at 10:36
Instead of finding the number that can divide, you can work backward and mark all multiple of a number. – nhahtdh Sep 30 '12 at 10:37

2 Answers 2

up vote 2 down vote accepted

Ever tried long long num = 100000000LL;? C isn't smart enough to conclude the type on the right side from the left long long so you have to add the LL. With this approach you should be able to handle larger numbers than normal integers, just change your functions and variables in a suitable way.

A long long is always at least 2^64 bit in size which you can check on Wikipedia.

Hint: As someone mentioned in the comments, Project Euler is not about bruteforcing. This is a lame approach. Think about some better strategies. You might want to get help at math.stackexchange?

EDIT: I don't know why I thought, that a uint32_t is not enough for 10^7 - sorry for that mistake.

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10^7 should fit in int for 32-bit computer, unless the OP is using 16-bit compiler... – nhahtdh Sep 30 '12 at 10:38
You're right... why did I think this is the issues?! o.O I will leave this answer due to its general content about data types. – Christian Ivicevic Sep 30 '12 at 10:40
Is long long defined by C89? – pmg Sep 30 '12 at 10:40
@pmg: long long is defined by C99 but NOT C89. – Christian Ivicevic Sep 30 '12 at 10:40
@doruk: As i mentioned in my answer, you need a good strategy in general how to bruteforce in an intelligent manner (e.g. ignore primes maybe?) or how to use different properties from number theory. This would be suitable for math.stackexchange. – Christian Ivicevic Sep 30 '12 at 10:46

As a hint to how to solve the problem within a minute, you can go through each number from 2 to 10^7, loop through all multiples of the those numbers and increment by 1 (1 is ignored, since all numbers are multiple of 1). In the end, you will get the number of divisors of each of the numbers in the array (check whether your compiler support 32-bit index). Just use a final linear scan to count.

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