How do you determine if #f(x)=x^4 - x^12 +1# is an even or odd function?
1 Answer
Explanation:
-
An even function is one that satisfies
#f(-x) = f(x)# for all#x# in its domain. -
An odd function is one that satisfies
#f(-x) = -f(x)# for all#x# in its domain.
In our example:
#f(-x) = (-x)^4-(-x)^12+1 = x^4-x^12+1 = f(x)#
for any value of
So
Footnote
There is a shortcut to determine whether a polynomial or rational function
-
If
#f(x)# only contains even powers of#x# , then it is an even function. -
If
#f(x)# only contains odd powers of#x# , then it is an odd function. -
If
#f(x)# contains a mixture of terms of odd and even degree then it is neither odd nor even.
Note that constant terms are of even degree
