Assume that a and b are integers such that a^2 - 4b - 2 = 0 9 (a) Prove that a is even - AQA - A-Level Maths Pure - Question 9 - 2022 - Paper 3

Given that $a$ is even, we can rewrite $a$ as $a = 2k$ for some integer $k$. Substituting this back into our original equation, we have:

$(2k)^2 - 4b - 2 = 0$

Expanding this yields:

$4k^2 - 4b - 2 = 0$

This can be rearranged to find $b$:

$4b = 4k^2 - 2$

b = k^2 - rac{1}{2}

Notice that for $b$ to be an integer, k^2 - rac{1}{2} must also be an integer. However, since rac{1}{2} is not an integer, $b$ cannot be an integer, leading us to the conclusion that:

$2b + 1$ would be odd, which contradicts our initial assumption that $b$ is an integer.

From our analysis, we have derived a contradiction when assuming that both $a$ and $b$ are integers while solving the equation $a^2 - 4b - 2 = 0$. Therefore, we conclude that:

There are no solutions to the equation $a^2 - 4b - 2 = 0$ where $a$ and $b$ are integers.