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I want to make the code below fast. It takes so long time to run, and I got this error:

Warning: FOR loop index is too large. Truncating to 2147483647.

I need to calculate over 3^100 so... is it impossible?

function sodiv = divisorSum(n)
    sodiv = 0;
    for i=1:n
        if (mod(n,i) == 0)
            sodiv = sodiv + i;
        end
    end
end

function finalSum1 = formular1(N,n)
    finalSum1 = 0;
    for k = 1:N
       finalSum1 = finalSum1 + (divisorSum(k) * divisorSum(3^n*(N-k)));
    end
end

Nv=100;
nv=[1:20];

for i=1:length(nv)
    tic;
    nfunc1(i)=formular1(Nv,nv(i));
    nt1(i)=toc;
    sprintf('nt1 : %d finished, %f', i,nt1(i))
end

The purpose of this code is to check the algorithm's calculation time.

share|improve this question
    
If it's homework, then 3^100 is taken so big probably so you can't calculate it bruteforce (at least not without specialized software) – Gunther Struyf Aug 6 '12 at 6:35
up vote 3 down vote accepted

This code will never finish, because it is so inefficient.

For instance, there is a function that counts number of all divisors and is going through all numbers from 1 to N and count. But using an efficient formula would make it run much master.

Let's say that one need to sum divisors of number a^b where a is prime number. Instead of calculating a^b and going form 1 to a^b, one can see that it is better going a^1, a^2, a^3, ..., a^n, because only these numbers are divisors. But you can go even further and observe that the sum of these numbers are the sum of geometric progression so the number of divisors become:

sum divisors, a^b = (a^(b+1)-1) / (a-1)

share|improve this answer
    
do you know how to modify this code ? – wonjun Aug 6 '12 at 6:43
    
can you explain what you need to do? – Luka Rahne Aug 6 '12 at 19:59
    
I want to calculate the sum of divisors when Nv=100 and nv=[1:20] – wonjun Aug 7 '12 at 0:56
    
I finally solved the problem thanks – wonjun Nov 8 '12 at 1:25

The algorithm is too general and inefficient for this particular problem.

I understand you want to sum the divisors of 3^100. But these divisors are easily determined.

S = 1 + 3 + 3^2 + 3^3 + ... + 3^100, a geometric series.

3*S = 3 + 3^2 + ... + 3^101

subtract

2*S = 3^101 - 1

S = (3^101 - 1)/2

share|improve this answer
    
do you know how to modify this code? I need to modify this code to calculate the algorithm – wonjun Aug 6 '12 at 6:44
    
the result was codepad.org/mL6Sv5Fr – wonjun Aug 6 '12 at 8:41

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