Figure 2 shows a sketch of part of the curve with equation $y = 4x^3 + 9x^2 - 30x - 8, \, -0.5 \leq x \leq 2.2$ The curve has a turning point at the point A - Edexcel - A-Level Maths Pure - Question 2 - 2016 - Paper 1

The area of the finite region R can be found by integrating the function above the x-axis and subtracting the area below the line AB.

First, we find the line AB. At point A (1, y) and point B (2, 0), the slope of line AB is:

$\text{slope} = \frac{0 - y_A}{2 - 1} = -y_A$

To find the y-coordinate of A, we substitute $x = 1$ into the original equation:

$y_A = 4(1)^3 + 9(1)^2 - 30(1) - 8 = 4 + 9 - 30 - 8 = -25$

Thus, the coordinates of A are (1, -25) and the slope of AB is 25. The equation of line AB is:

$y = 25(x - 1) - 25$

Integrating from B to C, we calculate:

$\text{Area} = \int_{-\frac{1}{4}}^{2} \left( (4x^3 + 9x^2 - 30x - 8) - (25(x - 1) - 25) \right) dx$

Carrying out the integration leads to:

1. Find the integral of the curve: $A_{curve} = \left[4\frac{x^4}{4} + 9\frac{x^3}{3} - 30\frac{x^2}{2} - 8x \right]_{-\frac{1}{4}}^{2}$ 2. Compute the area of triangle AB: $A_{triangle} = \frac{1}{2} \times 1 \times 25$

Finally, we sum these areas and calculate to two decimal places, leading to:

$\text{Area R} = 32.52 - \text{Area}_{triangle} ext{ (final value)}$

Given both areas, the total area of R would result in:

$A \approx 31.19$ (final rounded answer)