Solve each logarithmic equation in Exercises 49–92. Be sure to reject any value of x that is not in the domain of the original logarithmic expressions. Give the exact answer. Then, where necessary, use a calculator to obtain a decimal approximation, correct to two decimal places, for the solution. log(x+4)−log 2=log(5x+1)

Understanding the properties of logarithms is essential for solving logarithmic equations. Key properties include the product rule (log(a) + log(b) = log(ab)), the quotient rule (log(a) - log(b) = log(a/b)), and the power rule (n * log(a) = log(a^n)). These properties allow us to combine or simplify logarithmic expressions, making it easier to isolate the variable.

The domain of a logarithmic function is restricted to positive real numbers. This means that the argument of any logarithm must be greater than zero. In the given equation, it is crucial to determine the values of x that keep the expressions inside the logarithms positive, as any solution that does not meet this criterion must be rejected.

To solve for x in logarithmic equations, we often convert the logarithmic form to exponential form. This involves rewriting the equation so that the base raised to the logarithm equals the argument. After isolating x, we may need to check the solutions against the domain restrictions to ensure they are valid, and then use a calculator for decimal approximations if required.