Figure 3 shows a sketch of part of the curve with equation y = 7x^2(5 - 2√x), during x > 0 - Edexcel - A-Level Maths Pure - Question 2 - 2018 - Paper 1

To find the x-coordinate at point B where the curve crosses the x-axis, set y to zero:

$0 = 7x^2(5 - 2\sqrt{x})$

This gives us two cases: $7x^2 = 0$ (which implies $x = 0$, not in consideration) or $5 - 2\sqrt{x} = 0$.

From the latter:

$2\sqrt{x} = 5$ $\sqrt{x} = \frac{5}{2}$

Squaring both sides:

$x = \left(\frac{5}{2}\right)^2 = \frac{25}{4} = 6.25$

Thus, the x-coordinate of point B is 6.25.

To find the area of region R between points A and B, we need to calculate:

$\int_{4}^{6.25} (7x^2(5 - 2\sqrt{x})) \, dx$

This can be expanded and computed separately:

1. First, compute the integral:

   $= \int_{4}^{6.25}(35x^2 - 14x^{\frac{5}{2}}) \, dx$

2. Integrate each term:

   $= \left[\frac{35x^3}{3} - \frac{14x^{\frac{7}{2}}}{\frac{7}{2}}\right]_{4}^{6.25}$

3. Evaluating:

   At x = 6.25:

   $\frac{35(6.25)^3}{3} - 4(6.25)^{\frac{7}{2}}$

   At x = 4:

   $\frac{35(4^3)}{3} - 4(4^{\frac{7}{2}})$

4. Calculate the definite integral and simplify:

   This will yield the total area in the form of a decimal:

   Giving the area as approximately 172.23 after calculation, rounded appropriately gives the final answer of: 172.23.