In Exercises 74–79, solve each logarithmic equation. log2 (x+3) + log2 (x-3) =4

Understanding the properties of logarithms is essential for solving logarithmic equations. Key properties include the product rule, which states that log_b(m) + log_b(n) = log_b(m*n), and the power rule, which states that k*log_b(m) = log_b(m^k). These properties allow us to combine or simplify logarithmic expressions, making it easier to isolate the variable.

Logarithmic equations can often be solved by converting them into exponential form. For example, if log_b(a) = c, then a = b^c. This transformation is crucial for isolating the variable in the equation, as it allows us to express the logarithmic relationship in a more straightforward algebraic form.

The domain of a logarithmic function is restricted to positive real numbers. In the equation log2(x+3) + log2(x-3) = 4, both x+3 and x-3 must be greater than zero. This means that x must be greater than 3 for the logarithmic expressions to be defined, which is an important consideration when solving the equation.