In Exercises 59–70, evaluate each exponential expression. (-1)^33

Exponential expressions involve a base raised to a power, where the base is multiplied by itself as many times as indicated by the exponent. For example, in the expression a^n, 'a' is the base and 'n' is the exponent. Understanding how to evaluate these expressions is crucial, especially when dealing with negative bases and odd or even exponents.

The properties of exponents provide rules for simplifying and evaluating expressions involving powers. Key properties include the product of powers, power of a power, and the power of a product. Specifically, when the exponent is odd, a negative base raised to that exponent will yield a negative result, while an even exponent would yield a positive result.

When evaluating expressions with negative bases, the sign of the result depends on whether the exponent is odd or even. A negative base raised to an odd exponent results in a negative value, while raising it to an even exponent results in a positive value. This distinction is essential for correctly evaluating expressions like (-1)^33.