Solve each problem. Use a calculator to find an approximation for each logarithm. log 3.984

A logarithm is the inverse operation to exponentiation, meaning it answers the question: to what exponent must a base be raised to produce a given number? For example, log_b(a) = c implies that b^c = a. Understanding logarithms is essential for solving problems involving exponential growth or decay, as well as for simplifying complex calculations.

The common logarithm is a logarithm with base 10, often denoted as log(x) or log_10(x). It is widely used in scientific calculations and is particularly useful for simplifying multiplication and division into addition and subtraction. Knowing how to use a calculator to compute common logarithms is crucial for solving logarithmic problems efficiently.

Most scientific calculators have built-in functions for calculating logarithms, typically labeled as 'log' for common logarithms and 'ln' for natural logarithms (base e). Familiarity with these functions allows students to quickly find logarithmic values without manual computation, which is essential for solving problems that require precise numerical approximations.