Noah and Amelia are standing 91m apart and observe a drone at an angle of elevation of 63° and 42° respectively. Find the distance (ND) between Noah (N) and the drone (D) to the nearest metre.
where: a is the side opposite angle A b is the side opposite angle B c is the side opposite angle C
When to use the Sine Rule
a) Given 2 sides and 1 angle to find the other angle
or
b) Given 2 angles 1 side to find the other side
Notice that the scenario creates an obtuse triangle. Let ND be the distance of the two poles on the ground.
Identify the two other angles in the triangle.
First angle:
Remember that a straight line measures 180°. Subtract 63° from 180° to find the measure of the larger angle.
180-63
=
117°
Second angle:
Remember that the sum of the interior angles in a triangle is 180°. Subtract 42° and 117° from 180° to find the measure of the smaller angle.
180-42-117
=
21°
Since 1 side and 2 angles are now known, use the Sine Rule to find the missing side.
Side 1=ND
Angle 1=42°
Side 2=91m
Angle 2=21°
asinA
=
bsinB
NDsin42°
=
91sin21°
Substitute the values
ND×sin21°
=
91×sin42°
Cross multiply
ND×sin21°÷sin21°
=
91×sin42°÷sin21°
Divide both sides by sin21°
ND
=
91×sin42°sin21°
ND
=
91×0.66913060.3583679
Use the calculator to simplify
ND
=
169.991164
ND
=
170m
Rounded off to the nearest metre
170m
Question 2 of 4
2. Question
Noah and Amelia are standing 91m apart and observe a drone at an angle of elevation of 63° and 42° respectively. Find the height (h) of the drone to the nearest metre.
Notice that the scenario creates two right triangles. Focus on the smaller one and label it in reference to the given angle.
opposite=h
hypotenuse=170
Since we now have the opposite and hypotenuse values, we can use the sin ratio to find h.
sin63°
=
oppositehypotenuse
sin63°
=
h170
170×sin63°
=
h170×170
Multiply both sides by 170
170sin63°
=
h
h
=
170sin63°
Simplify this further by evaluating sin63° using the calculator:
1. Press sin
2. Press 63
3. Press =
The result will be: 0.89100652
Continue solving for h.
sin63°=0.89100652
h
=
170sin63°
=
170×0.89100652
=
151.47
=
151m
Rounded off to the nearest metre
151m
Question 3 of 4
3. Question
Two support wires, one 13m long and the other 12m long, are attached to a pole from a common point A. The longer wire is attached to the top of the pole. The shorter wire is attached 4m below the longer wire. Find the measurement of ∠ABD.
where: a is the side opposite angle A b is the side opposite angle B c is the side opposite angle C
Calculator Buttons to Use
sin= Sine function
cos= Cosine function
tan= Tangent function
DMS or °‘‘‘= Degree/Minute/Second
Shift or 2nd F or INV= Inverse function
== Equal function
Since 3 sides of the triangle ABC are given, we can use the Cosine Rule.
First, label the triangle ABC according to the Cosine Rule.
Substitute the three known values to the Cosine Rule to find B or ∠ABD.
From labelling the triangle, we know that the known values are those with labels a,b and c.
B=∠ABD
a=15cm
b=11cm
c=6cm
cosB
=
a2+c2−b22ac
cosB
=
132+42−1222(13)(4)
Substitute the values
cosB
=
169+16-144104
Simplify
cosB
=
41104
B
=
cos-1(41104)
Get the inverse of the cosine
Simplify this further by evaluating cos-1(41104) using the calculator:
1. Press Shift or 2nd F(depending on your calculator)
2. Press cos
3. Press 41
4. Press ÷
3. Press 104
4. Press =
The result will be: 66.78199226°
Proceed with solving for ∠ABD.
cos-1(41104)=66.78199226°
B
=
cos-1(41104)
B
=
66.78199226°
B
=
66°46’55”
Press DMS on the calculator
B or ∠ABD
=
66°47’
Round off to the nearest minute
66°47’
Question 4 of 4
4. Question
Two support wires, one 13m long and the other 12m long, are attached to a pole from a common point A. The longer wire is attached to the top of the pole. The shorter wire is attached 4m below the longer wire. Find the height of the pole BD.
