Question

How do you determine if `f(x)= (x-3)^2` is an even or odd function?

Answer 1

An even function has the property that

`f(-x)=f(x)`

an odd function has the property that

`f(-x)=-f(x)`.

This function is neither even nor odd.

We can try with a value, for example `x=1`

`f(1)=(1-3)^2=(-2)^2=4`.

Now we try with `x=-1`

`f(-1)=(-1-3)^2=(-4)^2=16`

then none of the two conditions is verified.