Show that the real zeros of each polynomial function satisfy the given conditions. See Example 6. ƒ(x)=x^4-x^3+3x^2-8x+8; no real zero greater than 2

A polynomial function is a mathematical expression involving a sum of powers in one or more variables multiplied by coefficients. The general form is f(x) = a_n*x^n + a_(n-1)*x^(n-1) + ... + a_1*x + a_0, where n is a non-negative integer and a_n is not zero. Understanding the behavior of polynomial functions, including their degree and leading coefficient, is essential for analyzing their zeros.

Real zeros of a polynomial function are the values of x for which the function evaluates to zero. These points are crucial for understanding the function's graph, as they indicate where the graph intersects the x-axis. The number and nature of real zeros can be determined using techniques such as factoring, the Rational Root Theorem, or numerical methods.

Inequalities are mathematical statements that compare two expressions, indicating that one is greater than, less than, or equal to the other. In the context of polynomial functions, establishing bounds on the real zeros can be done using the Upper and Lower Bound Theorems, which help determine the limits within which the real zeros lie. This is particularly useful for proving conditions like 'no real zero greater than 2.'