Sketch a graph of an odd function and give the function’s defining property.

Step-by-step solution Step 1 of 1 The property of an odd function f is for all x in the domain. The graph of an even function is symmetric about the origin. Polynomials consisting of only odd powers of the variable (of the form , where n is the non-negative integer) are odd functions. It is very important to remember that this is not the case for the polynomials with even power x . 2n For example an even...