# Strange behavior when dividing

Quick question but it's making me crazy:

isn't this:

``````return c*(t/=d/2)*t*t + b;
``````

the same as:

``````t = t/d/2;
return c*(t)*t*t + b;
``````

Because it seems like it's not, I'm getting different results.

-

The / operator is left-associative. This means that

``````t = t/d/2;
``````

Is the same as:

``````t = (t/d)/2;
``````

Of course,

``````t /= d/2;
``````

works out to:

``````t = t/(d/2);
``````
-
I see... so t/(d/2) is different than t/d/2. I can't understand why, mathematically they should be the same. –  Artemix Mar 31 '13 at 21:54
Well, (t/d)/2 is certainly different from t/(d/2), in any sort of math. E.g.: (400/4)/2 = 100/2 = 50, 400/(4/2) = 400/2 = 200. t/d/2 is ambiguous unless you resolve this ambiguity by choosing a direction. Note that if you wrote this in conventional mathematical notation you would have to make it clear which you meant. –  svk Mar 31 '13 at 22:02
You are right, I forgot how math works :p. –  Artemix Mar 31 '13 at 22:02
Yeah, I remembered now, for some reason I thought that dividing was the same as multiplying for 1/number. Like, if you want to divide by 2 is the same as multiplying by 1/2. And then I associated that with the fact that multiplication is commutative. –  Artemix Mar 31 '13 at 22:13