In Exercises 1–40, use properties of logarithms to expand each logarithmic expression as much as possible. Where possible, evaluate logarithmic expressions without using a calculator.log √(100x)

The properties of logarithms include rules that simplify 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 expanding and simplifying logarithmic expressions.

Radicals, such as square roots, can be expressed in terms of exponents. For example, √(a) can be rewritten as a^(1/2). This relationship is crucial when working with logarithmic expressions that involve roots, as it allows for the application of logarithmic properties to simplify the expression effectively.

Evaluating logarithmic expressions involves determining the value of the logarithm based on its definition. For instance, log_b(a) answers the question: 'To what power must b be raised to obtain a?' In the context of the given expression, understanding how to evaluate logarithms without a calculator can help in simplifying and expanding the expression accurately.