Given that $a > b > 0$ and that $a$ and $b$ satisfy the equation $$ ext{log } a - ext{log } b = ext{log }(a - b)$$ (a) show that $$a = \frac{b^2}{b - 1}$$ (b) Write down the full restriction on the value of $b$, explaining the reason for this restriction. - Edexcel - A-Level Maths Pure - Question 11 - 2019 - Paper 1

To prove the equation, we start from:

$ext{log } a - ext{log } b = ext{log }(a - b)$

Using the logarithmic identity, we can rewrite this as:

$\text{log} \left( \frac{a}{b} \right) = \text{log}(a - b)$

This leads us to:

$\frac{a}{b} = a - b$

Multiplying both sides by $b$ gives us:

$a = b(a - b)$

Rearranging yields:

$a - ab = -b^2$

Thus,

$a(1 - b) = b^2$

Now, solving for $a$ results in:

$a = \frac{b^2}{1 - b}$

Since $b$ must be less than 1 to avoid division by zero, we adjust this to:

$a = \frac{b^2}{b - 1}$.