I just came across this question:

How to expand and compute log(a + b)?

It's closed, presumably because it's a question about math, which generally isn't on topic. But for this particular question, there is a very programming-related issue with solving it in the obvious way: it is very easy to hit underflow or overflow. (This isn't just a hypothetical; it's a well-known issue when implementing e.g. naive Bayes classifiers.)

**If the question were rewritten in terms of the under/overflow issue, e.g. something like this:**

I am trying to calculate

`log(a + b)`

given`log(a)`

and`log(b)`

. The problem is,`log(a)`

and`log(b)`

are so negative that when I try to calculate`a`

and`b`

themselves, they underflow and I get`log(0)`

, which is undefined.For

`log(a * b)`

and`log(a / b)`

, this isn't a problem, since`log(a * b) = log(a) + log(b)`

and`log(a / b) = log(a) - log(b)`

. Is there a similar way to calculate`log(a + b)`

without needing`a`

and`b`

themselves, avoiding the underflow?

**Would that be an acceptable question for Stack Overflow?** If not, what would be the more appropriate site?

(Part of the reason I bring this up is that there is a very programming-specific detail in the proper solution to this question: Most languages have a `log1p`

function in their standard library that calculates `log(1 + x)`

, meant to solve exactly the sort of issue above. And there is a correct way to use it in order to preserve the most precision. An answer on math.stackexchange.com would not include such programming details.)