In Exercises 54–57, use properties of logarithms to condense each logarithmic expression. Write the expression as a single logarithm whose coefficient is 1. log 3 - 3 log x

Logarithmic properties are rules that govern the manipulation of logarithmic expressions. Key properties include the product rule (log_b(MN) = log_b(M) + log_b(N)), the quotient rule (log_b(M/N) = log_b(M) - log_b(N)), and the power rule (log_b(M^p) = p * log_b(M)). Understanding these properties is essential for condensing or expanding logarithmic expressions.

Condensing logarithms involves combining multiple logarithmic terms into a single logarithmic expression. This is typically achieved by applying the properties of logarithms, such as using the power rule to move coefficients into the logarithm as exponents, and then applying the product or quotient rules to combine terms. The goal is to simplify the expression while maintaining its equivalence.

When condensing logarithmic expressions, it is often required to express the final result with a coefficient of 1. This means that the logarithm should not have any numerical coefficient in front of it. Achieving this typically involves ensuring that all terms are combined correctly and that any coefficients are absorbed into the logarithmic argument, resulting in a clean, simplified expression.