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Chapter 6.1 Law of Sines

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Chapter 6 * * * * * * * * * * * Chapter 6.1 Law of Sines In Chapter 4 you looked at techniques for solving right triangles. In this section and the next section you ... – PowerPoint PPT presentation

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Title: Chapter 6.1 Law of Sines


1
Chapter 6
2
Chapter 6.1 Law of Sines
  • In Chapter 4 you looked at techniques for solving
    right triangles.
  • In this section and the next section you will
    solve oblique triangles.
  • Oblique triangles are triangles that have no
    right angle.
  • As standard notation, the angles of a triangle
    are labeled A, B,and C and their opposite angles
    are labeled a,b,and c.

C
Note Angle A is between b and c, B is between a
and c, C is between a and b.
a
b
B
A
c
3
Chapter 6.1 Law of Sines
  • To solve an oblique triangle, you need to know
    the measure of at least one side and the measures
    of any two other parts of the triangle- two
    sides, two angles, or one angle and one side.
  • This breaks down into four cases
  • Two angles and any side (AAS or ASA)
  • Two sides and an angle opposite one of them (SSA)
  • Three sides (SSS)
  • Two sides and their included angle (SAS)

4
Derive Law of Sines
5
Chapter 6.1 Law of Sines1
NOTE The Law of Sines can also be written in the
reciprocal form
6
Example 1 GIVEN Two Angles and One Side-AAS
  • C102.3, B28.7, and b27.4 feet
  • Find the remaining angle
  • and sides
  • A180 - B - C
  • 180 -
  • By the Law of Sines you
  • have

7
Try 3 page 398
  • Use Law of Sines to Solve the triangle

GIVEN A10, a4.5, B60
8
Example2 GIVEN Two Angles and One Side-ASA
  • A pole tilts toward the sun at an 8 angle from
    the vertical, and it casts a 22 foot shadow. The
    angle of elevation from the tip of the shadow to
    the top of the pole is 43. How tall is the pole?

9
Try 27 page 398
  • Use Law of Sines to Solve the triangle

10
The Ambiguous Case (SSA)
  • If two sides and one opposite angle are given,
    three possible situations can occur (1) no such
    triangle exists, (2) one such triangle
  • exists, or (3) two distinct triangles satisfy
    the conditions

11
Example 3 Single-Solution Case (SSA)
  • One solution a gt b

12
Try 15 page 398
  • Use Law of Sines to Solve the triangle

13
Example 4 No-Solution Case SSA
  • Show that there is no triangle for which a 15,
    b 25, and A 85º

No solution a lt h
14
Try 17 page 398
  • Use Law of Sines to Solve the triangle

15
Example 5 Two Solution Case
  • Find two triangles for which a 12 meters, b
    31 meters, and A 20.5º

16
Try 19 page 398
  • Use Law of Sines to Solve the triangle

17
  • Area of a Oblique Triangle

18
Example 6 Area of an Oblique Triangle
  • Find the area of a triangular lot having two
    sides of lengths 90 meters and 52 meters and an
    included angle of 102

19
Try 21 page 398
  • Find the area of the triangle

20
Example 7 An Application of the Law of Sines
  • The course for a boat race starts at point A and
    proceeds in the direction S 52 W to point B,
    then in the direction S 40 E to point C, and
    finally back to A. Point C lies 8 kilometers
    directly south of point A. Approximate the total
    distance of the race course.

21
Try 29 page 398
  • Use Law of Sines to Solve the triangle

22
THEEND
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