Examples include:
f(x)= 5 x^2 , 3 x^4 +x^2i.e. polynomials with only even powers ofx.
Anodd functionchanges sign with its argument
f(−x)=−f(x)Examples aref(x)= 3 x,2x^3 −x, i.e. polynomials with only odd powers ofx.
The trig function cosx, studied in Chapter 6 is even:
cos(−x)=cosxOn the other hand sinxis odd:sin(−x)=−sinxThe graph of an even function is symmetric about they-axis, while the graph of an odd
function is unchanged under a rotation of 180°– see Figure 3.3.
y0 xy = x^4Eveny0 xy = x^3OddFigure 3.3Even and odd functions.
Anyfunctionf(x)for whichf(−x)exists can be expressed as the sum of an even and
an odd function:
f(x)=f(x)+f(−x)
2
even+f(x)−f(−x)
2
oddnote the ‘something for nothing’ trick of adding zero in the form
0 =f(−x)
2−f(−x)
2