Two young mathematicians examine one (or two!) functions.
- Devyn
- Riley, I have a pressing question.
- Riley
- Tell me. Tell me everything.
- Devyn
- Think about the function
- Riley
- OK.
- Devyn
- Is this function equal to ?
- Riley
- Well if I plot them with my calculator, they look the same.
- Devyn
- I know!
- Riley
- And I suppose if I write
- Devyn
- Sure! But what about when ? In this case
- Riley
- Right, is undefined because we cannot divide by zero. Hmm. Now I see the problem. Yikes!
Suppose and are functions but the domain of is different from the domain of .
Could it be that and are actually the same function?
yes no
The domain of a function is part of the “data” of the function. A function is not a
rule for transforming the input to the output, but rather the relationship between a
specified collection of inputs (the domain) and possible outputs (the range).