Which statement describes a rational function?

• A. It is a ratio of two polynomial expressions with q(x) ≠ 0
• B. It is sin(x) divided by cos(x)
• C. It has only constant terms
• D. It cannot be evaluated at any x

Answer: (A)

Rational functions are formed as the ratio of two polynomials, with the denominator not equal to zero wherever you evaluate the function. This statement matches that idea because it describes a ratio of two polynomial expressions and explicitly requires the denominator q(x) to be nonzero, which ensures the function is defined at the x-values you test. The other options don’t fit this exact idea: a ratio like sin(x) over cos(x) uses trigonometric functions rather than polynomials, so it isn’t a rational function in the standard algebraic sense; having only constant terms describes a constant function, not a ratio of polynomials; and saying it cannot be evaluated at any x goes against the usual notion that a rational function is defined for many x values except where the denominator happens to be zero.