Take the 2-minute tour ×
Stack Overflow is a question and answer site for professional and enthusiast programmers. It's 100% free, no registration required.

Consider a convergent serie in the form:


where n is the index of iteration (n goes from 1 to infinity).

If we implement direclty the formula, we have std::pow(-1, n) but is there a more "rapid" algorithmic trick to implement that ?

share|improve this question
You can always use a boolean condition if pow is too slow. –  chris Jan 5 '13 at 23:35
Have you benchmarked? How do you know the compiler doesn't automatically optimize away the exponential? –  Mahmoud Al-Qudsi Jan 5 '13 at 23:36
How is that convergent? Won't the sum flicker between -something and 0 as n goes from 1 to infinity? –  mattjgalloway Jan 5 '13 at 23:51
@mattjgalloway I’m sure something isn’t a variable here, but just a placeholder for a term that is of no matter for this question. –  Lumen Jan 6 '13 at 0:57

5 Answers 5

up vote 13 down vote accepted

Check whether n is even or odd,

(n % 2 == 0) ? 1 : -1;

does it. If you want to avoid a branch,

1 - 2*(n & 1)
share|improve this answer
I'm pretty sure (n & 1)?-1:1 is the faster method. I'd worry that % 2 makes it actually divide (if n is not unsigned), and multiplication most likely does lead to true multiplication, which is at least a few cycles on a modern processor. gcc at the very least does a good job at sorting out ternary expressions without branching. –  Mats Petersson Jan 5 '13 at 23:42
@MatsPetersson If the compiler doesn't replace a % 2 with an & 1 (on a two's complement machine), throw it away, it's garbage. The multiplication should only remain one if bit-shifting isn't faster on the platform in question. But I wouldn't expect the branchless code to be faster either. Should both be pretty much the same. –  Daniel Fischer Jan 5 '13 at 23:47
gcc does a and with one, but adds another 4 instructions to cope with the fact that n may be negative. Make it unsigned [assuming that's valid] and it doesn't. ` movl %edi, %eax shrl $31, %eax leal (%rdi,%rax), %esi andl $1, %esi subl %eax, %esi` (That's probably looking very messy in a comment!) –  Mats Petersson Jan 5 '13 at 23:53
@MatsPetersson Oh four-letter-word, it does indeed. The one time I heed the "write % 2 if you mean to test parity, the compiler will sort it out" exhortations, I shouldn't have, and stuck to instinct. –  Daniel Fischer Jan 5 '13 at 23:57
@Tinctorius I can't deny that. For replacing the modulo operation on signed integers, of course two's complement is a requirement. –  Daniel Fischer Jan 6 '13 at 0:32

I'm assuming that sum(((-1)^n)*something) is pseudocode, and n is a variable bound by sum.

Let's extend that notation to sum(n <- [0,1,2,3..], ((-1)^n)*f(n)). Your best option would probably be to first split this into two sums, that you add together:

sum(n <- [0,2..], ((-1)^n)*f(n)) + sum(n <- [1,3..], ((-1)^n)*f(n))

In the first term, n is always even, so (-1)^n will always be +1. Analogously, in the second term, it will always be -1. We can now rewrite this as follows:

sum(n <- [0,2..], f(n)) + sum(n <- [1,3..], -f(n))

Since every term in the second sum is multiplied by a constant, we can move that constant out of the sum:

sum(n <- [0,2..], f(n)) - sum(n <- [1,3..], f(n))

Now, let's make sure these sums take the same sequences of indices, and substitute 2*m and 2*m+1 for n:

sum(m <- [0,1..], f(2*m)) - sum(m <- [0,1..], f(2*m+1))

Now we can unite these sums again:

sum(m <- [0,1..], f(2*m) - f(2*m+1))

Or, if you want pseudo-C:

T result = 0;
for(m = 0; m < limit; m+=2) {
    result += f(m);
    result -= f(m+1);

This saves you a multiplication by +1 or -1, as most seem to suggest here. Since your sequence is convergent, taking an extra term should not negatively influence the correctness of the answer.

share|improve this answer
I like this answer! –  Mats Petersson Jan 6 '13 at 0:04

Yeah, there is a magic trick: (-1)^n == 1 if and only if n is even, and (-1)^n == -1 if and only if n is odd. Thus:

int p = (n % 2 == 0) ? 1 : -1;
share|improve this answer

If you are doing this in a loop, you could simply do:

x = 1;   // Assuming we start on n = 0
for(...)    // or while(...)
   sum += x * something;

   x = -x;

This is most likely a lot faster than doing checks on n - of course, it DOES assume that all n values are iterated over, and you are not skipping a few here and there...

share|improve this answer

The term ((-1)^n)*something evaluates to -something for odd n, or something for even n:

n & 1 ? -something : something

If something is a constant value, then sum(((-1)^n)*something) evaluates to -something when the last value of n is odd, or 0 for an even number of summands:

n & 1 ? -something : 0

In this case, the serie would not be convergent.

share|improve this answer
My interpretatin was that "something" is not a constant. –  Mats Petersson Jan 5 '13 at 23:47
My interpretation is that average developers are really bad at maths. –  GOTO 0 Jan 5 '13 at 23:49
The term "convergent series" does however imply that it's not a constant something, as that will just oscilate, as you describe, between 0 and -something - that's not convergence in my math book - but that was more about thirty years ago, so maybe "new math" doesn't have the same interpretation of convergence. –  Mats Petersson Jan 5 '13 at 23:55
@ft1: It's safe to assume that the OP really meant f(n) by something. Combined with the guarantee that the series is convergent, the function f must either be constantly 0, or not constant at all. –  Rhymoid Jan 6 '13 at 0:20
Hey @MatsPetersson and ft1, you are both saying the same thing. One is saying that "if something is constant, then the series is not convergent", the other is saying "if the series is convergent, then something is not constant". And (according to my even older math books) these two statements are equivalent. –  ypercube Jan 6 '13 at 0:22

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.