Domain of ln(x): What numbers can be plugged in for ln(x) to make sense?

frasifrasi · Feb 19, 2008

I know this is a ridiculous question, but what is the domain of ln (x) ?

Is it > 0 ?

Thank you!

quasar987 · Feb 19, 2008

ln(x) is the inverse function of e^y.

So the domain of ln(x) is the range of e^y. So yes, the domain of ln(x) is x>0, because for no y do we have e^y<0 or e^y=0, but for every x>0, there is a y such that e^y=x.

Shackman · Feb 19, 2008

The natural log of a number x is the power to which e would be raised to equal x. Note that e is positive, and you can't raise a positive number to any power and get a negative number, so what numbers for x can you plug into ln(x) for it to make sense? Also note that when speaking of domain and range, it is best to say explicitly what set of numbers they belong to (in this case the positive reals).

Domain of ln(x): What numbers can be plugged in for ln(x) to make sense?

Related to Domain of ln(x): What numbers can be plugged in for ln(x) to make sense?

1. What is the domain of ln(x)?

2. Why is the domain of ln(x) > 0?

3. Can the domain of ln(x) include 0 or negative numbers?

4. How is the domain of ln(x) related to the range?

5. Can the domain of ln(x) be extended beyond > 0?

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