Using the laws of logarithms, solve the equation $$\log_3 (12y + 5) - \log_3 (1 - 3y) = 2$$ - Edexcel - A-Level Maths Pure - Question 4 - 2021 - Paper 1

Next, we convert the logarithmic equation to its exponential form: $\frac{12y + 5}{1 - 3y} = 3^2$ This simplifies to: $\frac{12y + 5}{1 - 3y} = 9$

Cross-multiplying gives: $12y + 5 = 9(1 - 3y)$ Expanding the right-hand side results in: $12y + 5 = 9 - 27y$

Now, rearranging the equation we get: $12y + 27y = 9 - 5$ This simplifies to: $39y = 4$

Finally, divide both sides by 39: $y = \frac{4}{39}$