Transcript Finding an angle from a triangle

Trigonometry
Trigonometry is concerned with the
connection between the sides and
angles in any right angled triangle.
Angle
The sides of a right -angled triangle are
given special names:
The hypotenuse, the opposite and the
adjacent.
The hypotenuse is the longest side and is
always opposite the right angle.
The opposite and adjacent sides refer to
another angle, other than the 90o.
A
A
There are three formulae involved in
trigonometry:
sin A=
cos A=
tan A =
S OH C AH T OA
Finding the ratios
The simplest form of question is finding the
decimal value of the ratio of a given angle.
Find:
1) sin 32
=
sin
32
2) cos 23
=
3) tan 78
=
4) tan 27
=
5) sin 68
=
=
Using ratios to find angles
We have just found that a calculator
holds the ratio information for sine
(sin), cosine (cos) and tangent (tan)
for all angles.
It can also be used in reverse, finding
an angle from a ratio.
To do this we use the sin-1, cos-1 and
tan-1 function keys.
Example:
1. sin x = 0.1115 find angle x.
sin-1
(
shift
0.1115
=
)
sin
x = sin-1 (0.1115)
x = 6.4o
2.
cos x = 0.8988 find angle x
cos-1
(
shift
0.8988
cos
=
)
x = cos-1 (0.8988)
x = 26o
Finding an angle from a triangle
To find a missing angle from a right-angled
triangle we need to know two of the sides of
the triangle.
We can then choose the appropriate ratio,
sin, cos or tan and use the calculator to
identify the angle from the decimal value of
the ratio.
1.
Find angle C
14 cm
6 cm
C
a) Identify/label the
names of the sides.
b) Choose the ratio that
contains BOTH of the
letters.
1.
H
14 cm
6 cm
A
C
We have been given
the adjacent and
hypotenuse so we use
COSINE:
Cos A =
adjacent
hypotenuse
Cos A = a
h
Cos C = 6
14
Cos C = 0.4286
C = cos-1 (0.4286)
C = 64.6o
2. Find angle x
3 cm
A
Given adj and opp
need to use tan:
x
opposite
Tan A = adjacent
8 cm
O
Tan A = o
a
Tan x = 8
3
Tan x = 2.6667
x = tan-1 (2.6667)
x = 69.4o
3.
10 cm
12 cm
Given opp and hyp
need to use sin:
opposite
Sin A = hypotenuse
y
o
h
sin x = 10
12
sin A =
sin x = 0.8333
x = sin-1 (0.8333)
x = 56.4o
Finding a side from a triangle
To find a missing side from a right-angled
triangle we need to know one angle and one
other side.
Note: If
Cos45 =
x
13
To leave x on its own we need to
move the ÷ 13.
It becomes a “times” when it moves.
Cos45 x 13 = x
1.
H
7 cm
k
A
30o
We have been given
the adj and hyp so we
use COSINE:
Cos A =
Cos A = a
h
Cos 30 = k
7
Cos 30 x 7 = k
6.1 cm = k
adjacent
hypotenuse
2.
We have been given
the opp and adj so we
use TAN:
50o
4 cm
A
Tan A =
r
O
Tan A = o
a
r
Tan 50 =
4
Tan 50 x 4 = r
4.8 cm = r
3.
k
O
H
12 cm
We have been given
the opp and hyp so we
use SINE:
Sin A =
25o
o
h
sin 25 = k
12
sin A =
Sin 25
x 12 = k
5.1 cm = k
Finding a side from a triangle
There are occasions when the unknown
letter is on the bottom of the fraction after
substituting.
Cos45 = 13
u
Move the u term to the other side.
It becomes a “times” when it moves.
Cos45 x u = 13
To leave u on its own, move the cos 45
to other side, it becomes a divide.
u =
13
Cos 45
02 April 2016
Trigonometry
Learning Objective:
To be able to use trigonometry to find an
unknown side when the unknown letter is
on the bottom of the fraction.
When the unknown letter is on the bottom
of the fraction we can simply swap it with
the trig (sin A, cos A, or tan A) value.
Cos45 = 13
u
u =
13
Cos 45
Cos A = a
1.
x
H
Cos 30 = 5
x
30o
5 cm
A
5
x = cos 30
x = 5.8 cm
o
h
sin 25 = 8
m
8
m=
sin25
sin A =
2.
8 cm
O
h
H
m
25o
m = 18.9 cm
02 April 2016
Trigonometry
Learning Objective:
To be able to use trigonometry to find
unknown sides and unknown angles in a
triangle.
1.
a
h
Cos A =
H
x
5
x
Cos 30 =
x =
30o
5 cm
A
5
cos 30
x = 5.8 cm
2.
o
a
= r
4
Tan A =
50o
Tan 50
4 cm
A
Tan 50 x 4 = r
4.8 cm = r
rO
3.
10 cm
sin A =
12 cm
y
sin y =
o
h
10
12
sin y = 0.8333
y = sin-1 (0.8333)
y = 56.4o