Make a sketch and identify the opposite and adjacent sides and the hypotenuse

Use given information and appropriate ratio to solve for \(h\) and \(d\)

1. \begin{align*} \sin 63° & = \frac{\text{opposite}}{\text{hypotenuse}} \\ \sin 63° & = \frac{h}{17} \\ \therefore h & = 17 \sin 63° \\ & = \text{15,14711...} \\ & \approx \text{15,15}\text{ m} \end{align*}
2. \begin{align*} \cos 63° & = \frac{\text{adjacent}}{\text{hypotenuse}} \\ \cos 63° & = \frac{d}{17} \\ \therefore d & = 17 \cos 63° \\ & = \text{7,7178...} \\ & \approx \text{7,72}\text{ m} \end{align*}

Note that the third side of the triangle can also be calculated using the theorem of Pythagoras: \({d}^{2} = {17}^{2} - {h}^{2}\).

Write the final answers

1. The kite is \(\text{15,15}\) \(\text{m}\) above the ground.

2. Mandla and Sipho are \(\text{7,72}\) \(\text{m}\) apart.

Draw trapezium and label all given lengths on diagram. Indicate that \(B\hat{E}C = 90°\)

We will use \(\triangle ABE\) and \(\triangle CBE\) to find \(A\hat{B}E\) and \(C\hat{B}E\). We can then add these two angles together to find \(A\hat{B}C\).

Find the first angle, \(A\hat{B}E\)

The hypotenuse and opposite side are given for both triangles, therefore use the \(\sin\) function.

In \(\triangle ABE\):

\begin{align*} \sin A\hat{B}E & = \frac{\text{opposite}}{\text{hypotenuse}} \\ & = \frac{3}{4} \\ A\hat{B}E & = \text{48,5903...} \\ & \approx \text{48,6}° \end{align*}

Use the theorem of Pythagoras to determine \(BE\)

In \(\triangle ABE\):

\begin{align*} BE^{2} & = AB^{2} - AE^{2} \\ & = {4}^{2} - {3}^{2} \\ & = 7 \\ \therefore BE & = \sqrt{7}\text{cm} \end{align*}

Find the second angle \(C\hat{B}E\)

In \(\triangle CBE\):

\begin{align*} \cos C\hat{B}E & = \frac{\text{adjacent}}{\text{hypotenuse}} \\ & = \frac{\sqrt{7}}{5} \\ & = \text{0,52915...} \\ C\hat{B}E & = \text{58,0519...} \\ & \approx \text{58,1}° \end{align*}

Calculate the sum of the angles

\[A\hat{B}C = \text{48,6}° + \text{58,1}° = \text{106,7}°\]

Identify the opposite and adjacent sides and the hypotenuse

We have a right-angled triangle and know the length of one side and an angle. We can therefore calculate the height of the building.

In \(\triangle QTB\):

\begin{align*} \tan \text{38,7}° & = \frac{\text{opposite}}{\text{adjacent}} \\ & = \frac{h}{100} \end{align*}

Rearrange and solve for \(h\)

\begin{align*} h & = 100 \times \tan \text{38,7}° \\ & = \text{80,1151...} \\ & \approx \text{80} \end{align*}

Write final answer

The height of the building is \(\text{80}\) \(\text{m}\).

To determine height \(CE\), first calculate lengths \(DE\) and \(CD\)

\(\triangle BDE\) and \(\triangle BDC\) are both right-angled triangles. In each of the triangles, the length \(BD\) is known. Therefore we can calculate the sides of the triangles.

Calculate \(CD\)

The length \(AC\) is given. \(CABD\) is a rectangle so \(BD = AC = \text{200}\text{ m}\).

In \(\triangle CBD\):

\begin{align*} \tan C\hat{B}D & = \frac{CD}{BD} \\ \therefore CD & = BD \times \tan C\hat{B}D \\ & = 200 \times \tan 62° \\ & = \text{376,1452...} \\ & \approx \text{376}\text{ m} \end{align*}

Calculate \(DE\)

In \(\triangle DBE\):

\begin{align*} \tan D\hat{B}E & = \frac{DE}{BD} \\ \therefore DE & = BD \times \tan D\hat{B}E \\ & = 200 \times \tan 34° \\ & = \text{134,9017...} \\ & \approx \text{135}\text{ m} \end{align*}

Add the two heights to get the final answer

The height of the tower is: \(CE = CD + DE = \text{135}\text{ m} + \text{376}\text{ m} = \text{511}\text{ m}\).

Identify opposite and adjacent sides and hypotenuse

\(\triangle ABC\) is right-angled. The hypotenuse and an angle are known therefore we can calculate \(AC\). The height of the wall \(BD\) is then the height of the garage minus \(AC\).

\begin{align*} \sin A\hat{B}C & = \frac{AC}{BC} \\ \therefore AC & = BC \times \sin A\hat{B}C \\ & = 5 \sin 5° \\ & = \text{0,43577...} \\ & \approx \text{0,4}\text{ m} \\ \\ \therefore BD& = \text{4}\text{ m} - \text{0,4}\text{ m} \\ & = \text{3,6}\text{ m} \end{align*}

Write the final answer

Mr Nkosi must build his wall to be \(\text{3,6}\) \(\text{m}\) high.