Take the 2-minute tour ×
Stack Overflow is a question and answer site for professional and enthusiast programmers. It's 100% free.

I'm trying to convert this C++ to Python. I practice Python only and haven't touched C/C++ yet.

int phi(const int n)
  // Base case
  if ( n < 2 )
    return 0;

  // Lehmer's conjecture
  if ( isprime(n) )
    return n-1;

  // Even number?
  if ( n & 1 == 0 ) {
    int m = n >> 1;
    return !(m & 1) ? phi(m)<<1 : phi(m);

  // For all primes ...
  for ( std::vector<int>::iterator p = primes.begin();
        p != primes.end() && *p <= n;
        ++p )
    int m = *p;
    if ( n % m  ) continue;

    // phi is multiplicative
    int o = n/m;
    int d = binary_gcd(m, o);
    return d==1? phi(m)*phi(o) : phi(m)*phi(o)*d/phi(d);

Most of it is straightforward to convert, it just requires looking up C++ operators. However, this bit:

      for ( std::vector<int>::iterator p = primes.begin();
        p != primes.end() && *p <= n;
        ++p )

What does it mean in Python?

share|improve this question
It's just iterating through the array primes, stopping if the current value <= n –  therefromhere Aug 20 '12 at 2:11
@therefromhere: "stopping if the current value <= n" - rather, stopping when the current value is NOT <= n. @nebffa: in a C++ for loop, the first statement executes once, much as if it appeared on a line before the for loop, except that p is only in scope within the loop; the second part is like a while() loop condition - it must be true for the loop to run, even the first time; the last bit is executed after the loop tries to continue but before retesting the middle condition. So, this iterates over the vector for primes up to n. –  Tony D Aug 20 '12 at 2:36
@TonyDelroy gah, sorry, brain fart. –  therefromhere Aug 20 '12 at 3:03

1 Answer 1

up vote 3 down vote accepted
for p in primes:
  if p > n:


for p in (x for x in primes if x <= n):

Although the former will end quicker.

share|improve this answer
And technically, the former is a more faithful translation, since the latter will behave differently if the primes vector is not sorted in increasing order (which I acknowledge, it probably is). –  happydave Aug 20 '12 at 2:27
Woooo thanks! You rock –  nebffa Aug 20 '12 at 3:24

Your Answer


By posting your answer, you agree to the privacy policy and terms of service.

Not the answer you're looking for? Browse other questions tagged or ask your own question.