# Why is this function/loop O(log n) and not O(n)?

This function is O(log(n)). Why? Isn't it looping up to n?

``````function fxn(\$n) {
for (\$i = 1; \$i <= \$n; \$i *= 2)
echo \$i;
}
``````

I'm pretty new to O(n) analysis by the way. This function sure looks O(n) though since it loops up to n.

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So many good answers that say [almost] exactly the same thing ;-) –  user166390 Apr 6 '12 at 4:34
Sorry everyone, I think 1 makes more sense for initializing \$i :) –  Justin Copeland Apr 6 '12 at 4:34

This loop would be O(n):

``````function fxn(\$n) {
for (\$i = 0; \$i <= \$n; \$i++)
echo \$i;
}
``````

But this loop is only O(log(n)):

``````function fxn(\$n) {
for (\$i = 1; \$i <= \$n; \$i *= 2)
echo \$i;
}
``````

Because in the latter case `\$i` takes on the values:

``````1, 2, 4, 8, 16, 32, 64, 128, 256, 512, 1024... etcetera.
``````

And this sequence definitely has a logarithmic number of elements.

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It's not looping through all of the elements, in each step it jumps over twice of the elements of the previous step - because of the `\$i *= 2` part. That is, assuming that `\$i` starts in a value greater than zero, otherwise it's an infinite loop: `\$i` will always be `0` as it is written.

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Note: that your function will never end because you're starting at 0, and 0 * 2 = 0. I'll assume your loop starts at 1.

The loop increments by a multiple of 2 every time, which is why the runtime is `O(lg(n))`.

Let's consider a simple example where n = 128.

here are the values of i for each iteration: 1, 2, 4, 8, 16, 32, 64, 128. Thus, you've gone through 8 values.

``````lg(128) = 7 (lg = log in base 2)
= 8 - 1
``````

Note here that the `- 1` is a constant, so it doesn't affect our runtime calculation.

If the loop incremented by 1 (or any constant, k) the runtime would be O(n). The important thing to consider here is the difference between a geometric series and an arithmetic series, which gives you different runtimes.

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lg(32) = 5, but you have the right idea. –  erickson Apr 6 '12 at 4:34
whoops, corrected it :) –  Kshitij Mehta Apr 6 '12 at 4:36

Actually, that particular piece of code is O(infinity) since you start `i` at zero, and continuously multiply by two, meaning it will never reach a positive `n` :-)

If you change the starting point to `\$i = 1`, that would be better.

In that case, yes, it loops up to `n` but not by ones (or any constant value) which would make it O(n).

This is what it does:

``````       1  2  3  4  5  6  7  8  9 10 11 12 13 14 15 16
|  |     |           |                       |
+--+-----+-----------+-----------------------+
Steps    1    2        3               4
``````

Because it's doubling each time, it's actually O(log N), similar to the way a binary tree search halves the search space on each iteration.

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