The diagram shows a section of a garden divided into three parts - Leaving Cert Mathematics - Question 8 - 2018

Using the sine function for angle \alpha:

$\sin \alpha = \frac{|PR|}{|PQ|} = \frac{3.3}{6.5}$

Calculating \alpha:

$\alpha = \sin^{-1}\left(\frac{3.3}{6.5}\right) \approx 30.51^{\circ}$

Rounding to the nearest degree, we have:

$\alpha \approx 31^{\circ}$

Using the angle sum of a triangle:

$\beta = 180^{\circ} - 90^{\circ} - \alpha$ $\beta = 180^{\circ} - 90^{\circ} - 31^{\circ}$ $\beta = 180^{\circ} - 121^{\circ} = 59^{\circ}$

Using the Cosine Rule:

$|RS|^2 = |RQ|^2 + |QS|^2 - 2 |RQ| |QS| \cos(\beta)$

Substituting the known values:

$|RS|^2 = (7.3)^2 + (8)^2 - 2(7.3)(8)\cos(59^{\circ})$ $|RS|^2 = 53.29 + 64 - 2(7.3)(8)(0.515)$

Calculate:

$|RS|^2 = 117.29 - 60.14 \\ \approx 57.15$

Thus, $|RS| \approx \sqrt{57.15} \approx 7.6 \, m$ Rounding to the nearest metre: $|RS| \approx 8 \, m$

The formula for the length of the arc is given by:

$\text{Arc } TS = 2 \pi r \frac{\theta}{360}$

Substituting the values:

$\text{Arc } TS = 2 \pi (8) \frac{31}{360}$

Calculating: $\text{Arc } TS \approx 4.3 \, m$

The area of the sector is given by:

$\text{Area} = \pi r^2 \frac{\theta}{360}$

Substituting the values:

$\text{Area} = \pi (8)^2 \frac{31}{360}$

Calculating: $\text{Area} \approx 17.3 \, m^2$