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.

`pow`

is too slow. – chris Jan 5 '13 at 23:35`-something`

and`0`

as`n`

goes from`1`

to`infinity`

? – mattjgalloway Jan 5 '13 at 23:51`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