Oscar is taking some measurements and is using trigonometry to work out some angles, distances, and areas. First, Oscar takes measurements of two adjacent triangular fields, Field 1 (ABC) and Field 2 (BDC), as shown in the diagram below (not to scale). B lies on the line AD. |AB| = 30 m, |BD| = 10 m, |AC| = 35 m, and |∠CAD| = 50°. Note: the angle |ABC| is not a right angle. a) Find the area of Field 1 and, hence, find the area of Field 2. Give each answer correct to the nearest m². b) Find the length of the perimeter of Field 1. Give your answer correct to the nearest metre.

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Oscar is taking some measurements and is using trigonometry to work out some angles, distances, and areas - Leaving Cert Mathematics - Question 9 - 2022

Question 9

Oscar is taking some measurements and is using trigonometry to work out some angles, distances, and areas. First, Oscar takes measurements of two adjacent triangula... show full transcript

Worked Solution & Example Answer:Oscar is taking some measurements and is using trigonometry to work out some angles, distances, and areas - Leaving Cert Mathematics - Question 9 - 2022

Step 1

Find the area of Field 1

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Answer

To find the area of Field 1, we can use the formula for the area of a triangle:

ext{Area} = rac{1}{2} imes ext{base} imes ext{height}

In this case, the base can be taken as |AB| = 30 m and the height can be determined using trigonometry:

The height from point C to line AB can be calculated as:

ext{Height} = |AC| imes ext{sin}( ext{∠CAD}) = 35 imes ext{sin}(50°)

Calculating this:

$ext{Height} ≈ 35 imes 0.7660 ≈ 26.81 ext{ m}$

Now applying the values into the area formula:

$ext{Area of Field 1} = rac{1}{2} imes 30 imes 26.81 \approx 402.15 ext{ m}²$

Thus, rounding to the nearest m²:

Area of Field 1 = 402 m²

Step 2

Find the area of Field 2

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Answer

Since Field 2 shares the same height as Field 1, we can use the following relation for the area of Field 2:

ext{Area of Field 2} = rac{1}{2} imes |BD| imes ext{Height} = rac{1}{2} imes 10 imes 26.81

Calculating this:

$ext{Area of Field 2} = 5 imes 26.81 ≈ 134.05 ext{ m}²$

Thus, rounding to the nearest m²:

Area of Field 2 = 134 m²

Step 3

Find the length of the perimeter of Field 1

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Answer

To find the perimeter of Field 1, we need to calculate the length of |BC| using the cosine rule, as we have two sides and the included angle:

$|BC|^2 = |AB|^2 + |AC|^2 - 2 imes |AB| imes |AC| imes ext{cos}( ext{∠CAB})$

Given that:

|AB| = 30 m
|AC| = 35 m

To find |∠CAB|, we first need to know it, or we can assume it is derived from the remaining angle in triangle ABC. However, assuming it is not needed directly:

Calculating, we find:

$|BC|^2 ≈ 30^2 + 35^2 - 2 imes 30 imes 35 imes ext{cos}(50°)$

After finding |BC|, the perimeter can be determined as:

$ext{Perimeter} = |AB| + |AC| + |BC|$

Using the approximation from above, |BC| can be calculated, and finally:

Perimeter of Field 1 = 93 m.

Oscar is taking some measurements and is using trigonometry to work out some angles, distances, and areas - Leaving Cert Mathematics - Question 9 - 2022

Worked Solution & Example Answer:Oscar is taking some measurements and is using trigonometry to work out some angles, distances, and areas - Leaving Cert Mathematics - Question 9 - 2022

Find the area of Field 1

Find the area of Field 2

Find the length of the perimeter of Field 1

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