Solve: log₂ (x+9) — log₂ x = 1.

Understanding the properties of logarithms is essential for solving logarithmic equations. One key property is the difference of logs, which states that log_a(b) - log_a(c) = log_a(b/c). This allows us to combine logarithmic expressions, simplifying the equation to a more manageable form.

Logarithmic equations can be rewritten in exponential form, which is crucial for finding the value of the variable. For example, if log_a(b) = c, then it can be expressed as a^c = b. This transformation helps in isolating the variable and solving the equation effectively.

The domain of logarithmic functions is restricted to positive real numbers. This means that the arguments of the logarithms must be greater than zero. In the equation log₂(x+9) - log₂(x) = 1, it is important to ensure that both x and x+9 are positive to maintain valid logarithmic expressions.