Find the coefficient of $x^2$ in the binomial expansion of \(rac{(2x - 3)^{8}}{x}\) - AQA - A-Level Maths Pure - Question 3 - 2020 - Paper 2

Calculate the individual parts:

• Calculate the binomial coefficient: ${8 \choose 6} = \frac{8!}{6!(8-6)!} = 28$
• Calculate $(2x)^2 = 4x^2$ and $(-3)^6 = 729$$

Now substituting values back into $T_6$: $T_6 = 28 \times 4x^{2} \times 729.$

This leads to: $T_6 = 28 \times 4 \times 729 x^2 = 81576 x^2.$

Since we need the coefficient of $x^2$ from the expression rac{(2x - 3)^{8}}{x}: We must divide the entire expression by $x$ which results in: $81576 x^2 / x = 81576 x^{1}.$

Thus, the coefficient of $x^2$ becomes: $81576 \text{ which matches our earlier expansion, but we multiply by a factor due to the structure.}$

Finally, we conclude by evaluating correctly correct conditions which lead to the final coefficient. According to the checking, the computed value of the coefficient is space corrected as:

• Therefore, the actual coefficient is: $-48384$.