Question

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

Answer 1

Neither.

Explanation:

`y>=0`.

#y(-x) is not y(x). So, it is not even. Y([x) is not -y(-x). So, it is not odd.

The given equation is the combined equation for the parabolas

`y=x^2+x, x>=0 and x<=-1` and

`y=-(x^2+x), x<=0 and x>=-1`.

As `y>-0`, the missing parts of the parabolas are not represented by

the given equation.

graph{y-|x^2+x|=0 [-5, 5, -2.5, 2.5]}