Use the change-of-base theorem to find an approximation to four decimal places for each logarithm. See Example 8. log_π e

The Change of Base Theorem allows us to convert logarithms from one base to another. It states that for any positive numbers a, b, and c (where a and b are not equal to 1), the logarithm can be expressed as log_b(a) = log_c(a) / log_c(b). This theorem is particularly useful when calculating logarithms with bases that are not easily computable using standard calculators.

A logarithm is the inverse operation to exponentiation, answering the question: to what exponent must a base be raised to produce a given number? For example, log_b(a) = c means that b^c = a. Understanding the properties of logarithms, such as the product, quotient, and power rules, is essential for manipulating and solving logarithmic expressions.

When calculating logarithms, especially with non-standard bases, approximation techniques may be necessary. This often involves using a scientific calculator or logarithm tables to find values to a specified number of decimal places. In this context, approximating log_π e requires converting it to a more manageable base, such as 10 or e, to facilitate the calculation.