Match each expression in Column I with its equivalent expression in Column II. Choices may be used once, more than once, or not at all. a. 5^-3 b. -5^-3 c. (-5)^-3 d. -(-5)^-3 A. 125 B. -125 C. 1/125 D. -1/125

Negative exponents indicate the reciprocal of the base raised to the absolute value of the exponent. For example, a^-n = 1/a^n. This concept is crucial for simplifying expressions like 5^-3, which equals 1/(5^3) = 1/125.

When raising a negative number to an exponent, the result depends on whether the exponent is even or odd. For instance, (-5)^3 results in -125, while (-5)^2 results in 25. Understanding this distinction is essential for evaluating expressions like (-5)^-3.

Parentheses in mathematical expressions dictate the order of operations. For example, -(-5)^-3 requires evaluating (-5)^-3 first, which is 1/(-5)^3 = -1/125, and then applying the negative sign outside the parentheses. This concept is vital for correctly interpreting and simplifying expressions.