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THE LAW OF COSINESOur last new Section…………5.6
Deriving the Law of Cosines
a
c
b
A B(c,0)
C(x, y)
a
c
b
A B(c,0)
C(x, y)
a
c
b
A B(c,0)
C(x, y)In all three cases:
cosx
Ab
siny
Ab
Rewrite:
cosx b A siny b A
Deriving the Law of Cosines
a
c
b
A B(c,0)
C(x, y)
a
c
b
A B(c,0)
C(x, y)
a
c
b
A B(c,0)
C(x, y) Set a equal to the distance from C to Busing the distance formula:
2 20a x c y
Deriving the Law of Cosines
2 20a x c y
cosx b A siny b A
22 2a x c y
2 2cos sinb A c b A
2 2 2 2 2cos 2 cos sinb A bc A c b A
2 2 2 2cos sin 2 cosb A A c bc A 2 2 2 cosb c bc A
Law of Cosines
2 2 2 2 cosa b c bc A
Let ABC be any triangle with sides and angleslabeled in the usual way. Then
2 2 2 2 cosb a c ac B 2 2 2 2 cosc a b ab C
Note: While the Law of Sines was used to solve AAS andASA cases, the Law of Cosines is required for SAS and SSScases. Either method can be used in the SSA case, butremember that there might be 0, 1, or 2 triangles.
Guided Practice
11a Solve ABC, given the following.
5b 20C
A
B
C
205
11
c
6.529
2 2 2 2 cosc a b ab C 2 211 5 2 11 5 cos20c
2 2 2 2 cosa b c bc A
144.8 2 2 2
1 11 5cos
2 5
cA
c
180 15.2B A C
Guided Practice
9a Solve ABC, given the following.
7b 5c A
BC
7
9
95.7
2 2 29 7 5 2 7 5 cos A 5
180 33.6C A B
2 2 2
1 9 7 5cos
2 7 5A
50.7
2 2 27 9 5 2 9 5 cosB
2 2 2
1 7 9 5cos
2 9 5B
Recall some diagrams :
a
c
b
A B(c,0)
C(x, y)
a
c
b
A B(c,0)
C(x, y)
a
c
b
A B(c,0)
C(x, y)For all three triangles: sin A
y
bRewrite: siny b A
This can be considered theheight of each triangle, whileside c would be the base…
Area of a TriangleArea = (base)(height)
1 1 1sin sin sin
2 2 2bc A ac B ab C
Generalizing:
Note: These formulas work in SAS cases…
1
2= (c)(b sinA)
1
2= bc sinA
1
2
Area =
Theorem: Heron’s FormulaLet a, b, and c be the sides of ABC, and let s denote
s s a s b s c
Clearly, this theorem is used in the SSS case…
the semiperimeter (a + b + c)/2. Then the area of
ABC is given by:
Area =
Guided PracticeFind the area of the triangle described.
52A An SAS case!!!(a)
Area =
14mb 21mc 1
sin2bc A 1
14 21 sin522
2115.838m
112C An SAS case!!!(b)
Area =
1.8ina 5.1inb1
sin2ab C 1
1.8 5.1 sin1122
24.256in
Guided PracticeDecide whether a triangle can be formed with the given sidelengths. If so, use Heron’s formula to find the area of the triangle.
5a Yes the sum of any twosides is greater than thethird side!!!
(a) 9b 7c
2
a b cs
Can a triangle be formed?
Find the semiperimeter:
5 9 7
2
2110.5
2
10.5 10.5 5 10.5 9 10.5 7A Heron’s formula:
17.412
Guided PracticeDecide whether a triangle can be formed with the given sidelengths. If so, use Heron’s formula to find the area of the triangle.
7.2a No b + c < a
(b) 4.5b 2.5c Can a triangle be formed?
Guided PracticeDecide whether a triangle can be formed with the given sidelengths. If so, use Heron’s formula to find the area of the triangle.
18.2a Yes the sum of any twosides is greater than thethird side!!!
(c) 17.1b 12.3c
2
a b cs
Can a triangle be formed?
Find the semiperimeter:
18.2 17.1 12.3
2
23.8
23.8 23.8 18.2 23.8 17.1 23.8 12.3A Heron’s formula:
101.337
Guided Practicep.494: #36
(a) Find the distance from the pitcher’s rubber to the far cornerof second base. How does this distance compare with the distance from the pitcher’s rubber to first base?
90 2
A
90 2 60.5(Firstbase)
Second base
(Pitcher’srubber) B
(Home plate)C
90 ft60.5 ft
45
c
The home-to-second segment is thehypotenuse of a right triangle, whichhas a length of…
Distance from pitcher to second:
66.779ft
Guided Practicep.494: #36
(a) Find the distance from the pitcher’s rubber to the far cornerof second base. How does this distance compare with the distance from the pitcher’s rubber to first base?
2 260.5 90 2 60.5 90 cos 45c
A
(Firstbase)
Second base
(Pitcher’srubber) B
(Home plate)C
90 ft60.5 ft
45
c
Solve for c with the Law of Cosines:
63.717ft66.779 ft
Guided Practicep.494: #36
(b) Find angle B in triangle ABC.
2 2 290 60.5 2 60.5 cosc c B
A
(Firstbase)
Second base
(Pitcher’srubber) B
(Home plate)C
90 ft60.5 ft
45
c
Again, the Law of Cosines:
92.8
2 2 21 90 60.5
cos2 60.5
cB
c
66.779 ft
Whiteboard Practice
51A Solve ABC, given the following.
11a 12bC
BA
12
c13.385,1.718c
2 2 211 12 2 12 cos51c c
11
58.0
2 24cos51 23 0c c
2 2 2
1 11
1
12 11cos
2 11
cB
c
1 13.385c
2 2 21 1 112 11 2 11 cosc c B
51
1 1180C A B 71.0
Whiteboard Practice
51A Solve ABC, given the following.
11a 12bC
BA
12
c
11
122.0
2 2 21 2
22
12 11cos
2 11
cB
c
2 1.718c
2 2 22 2 212 11 2 11 cosc c B
51
2 2180C A B 7.0
13.385,1.718c
2 2 211 12 2 12 cos51c c
2 24cos51 23 0c c
Whiteboard Practice
74A Solve ABC, given the following.
6.1a 8.9bC
BA
8.9
c
2 2 26.1 8.9 2 8.9 cos74c c 6.1 2 17.8cos74 42 0c c
74 No real solutions!!!
No triangle is formed!!!
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