1. 6.2 Trigonometry of Right Triangles
Deuteronomy 31:6 Be strong and courageous. Do not be afraid
or terrified because of them, for the LORD your God goes with
you; he will never leave you nor forsake you.
17. Review from Geometry - Special Right Triangles
60°
45°
1 1
2 1
2 2
45° 30°
2 3
2 2
18. Review from Geometry - Special Right Triangles
60°
45°
1 1
2 1
2 2
45° 30°
2 3
2 2
Look at the sin, cos and tan of these angles to see the
connection of these triangles to the Unit Circle
21. Review from Geometry - Pythagorean Triples
c 2 2
a +b = c 2
a
b
3, 4, 5 and it ' s dilations
22. Review from Geometry - Pythagorean Triples
c 2 2
a +b = c 2
a
b
3, 4, 5 and it ' s dilations
5, 12, 13 and it ' s dilations
23. Review from Geometry - Pythagorean Triples
c 2 2
a +b = c 2
a
b
3, 4, 5 and it ' s dilations
5, 12, 13 and it ' s dilations
7, 24, 25 and it ' s dilations
27. Review from Geometry
Angles of Elevation & Depression
If the lines are parallel,
then the alternate interior angles are congruent.
28. Review from Geometry
Angles of Elevation & Depression
If the lines are parallel,
then the alternate interior angles are congruent.
∴ angle of depression = angle of elevation
29. From a point 700 feet from the base of a building, it is
observed that the angle of elevation to the top of the
building is 21 degrees and the angle of elevation to the
top of a flagpole atop the building is 23 degrees. Find
the height of the flagpole.
30. From a point 700 feet from the base of a building, it is
observed that the angle of elevation to the top of the
building is 21 degrees and the angle of elevation to the
top of a flagpole atop the building is 23 degrees. Find
the height of the flagpole.
h=b−a
31. From a point 700 feet from the base of a building, it is
observed that the angle of elevation to the top of the
building is 21 degrees and the angle of elevation to the
top of a flagpole atop the building is 23 degrees. Find
the height of the flagpole.
a
tan 21° =
700
h=b−a
32. From a point 700 feet from the base of a building, it is
observed that the angle of elevation to the top of the
building is 21 degrees and the angle of elevation to the
top of a flagpole atop the building is 23 degrees. Find
the height of the flagpole.
a
tan 21° =
700
a = 700 tan 21° ≈ 268.7
h=b−a
33. From a point 700 feet from the base of a building, it is
observed that the angle of elevation to the top of the
building is 21 degrees and the angle of elevation to the
top of a flagpole atop the building is 23 degrees. Find
the height of the flagpole.
a
tan 21° =
700
a = 700 tan 21° ≈ 268.7
b
tan 23° =
700
h=b−a
34. From a point 700 feet from the base of a building, it is
observed that the angle of elevation to the top of the
building is 21 degrees and the angle of elevation to the
top of a flagpole atop the building is 23 degrees. Find
the height of the flagpole.
a
tan 21° =
700
a = 700 tan 21° ≈ 268.7
b
tan 23° =
700
b = 700 tan 23° ≈ 297.1
h=b−a
35. From a point 700 feet from the base of a building, it is
observed that the angle of elevation to the top of the
building is 21 degrees and the angle of elevation to the
top of a flagpole atop the building is 23 degrees. Find
the height of the flagpole.
a
tan 21° =
700
a = 700 tan 21° ≈ 268.7
b
tan 23° =
700
b = 700 tan 23° ≈ 297.1
h=b−a h ≈ 297.1− 268.7 ≈ 28.4 feet
37. Review from Advanced Algebra & Trigonometry
ArcSin (aka Inverse Sine)
If we know the ratios of the sides of a right triangle,
then we can find the angles using ArcSin, etc.
38. Review from Advanced Algebra & Trigonometry
ArcSin (aka Inverse Sine)
If we know the ratios of the sides of a right triangle,
then we can find the angles using ArcSin, etc.
β
130
7
α
9
39. Review from Advanced Algebra & Trigonometry
ArcSin (aka Inverse Sine)
If we know the ratios of the sides of a right triangle,
then we can find the angles using ArcSin, etc.
β
130
7
α
9
ArcSin, ArcCos & ArcTan
are all built into our
calculators
40. Review from Advanced Algebra & Trigonometry
ArcSin (aka Inverse Sine)
If we know the ratios of the sides of a right triangle,
then we can find the angles using ArcSin, etc.
7
β sin α =
130 130
7
α
9
ArcSin, ArcCos & ArcTan
are all built into our
calculators
41. Review from Advanced Algebra & Trigonometry
ArcSin (aka Inverse Sine)
If we know the ratios of the sides of a right triangle,
then we can find the angles using ArcSin, etc.
7
β sin α =
130 130
7
α −1 7
α = sin
130
9
this is calculator notation;
it means ‘ArcSin’
ArcSin, ArcCos & ArcTan
are all built into our
calculators
42. Review from Advanced Algebra & Trigonometry
ArcSin (aka Inverse Sine)
If we know the ratios of the sides of a right triangle,
then we can find the angles using ArcSin, etc.
7
β sin α =
130 130
7
α −1 7
α = sin
130
9
this is calculator notation;
it means ‘ArcSin’
ArcSin, ArcCos & ArcTan
are all built into our α ≈ 37.9°
calculators
43. Review from Advanced Algebra & Trigonometry
ArcSin (aka Inverse Sine)
If we know the ratios of the sides of a right triangle,
then we can find the angles using ArcSin, etc.
7
β sin α =
130 130
7
α −1 7
α = sin
130
9
this is calculator notation;
it means ‘ArcSin’
ArcSin, ArcCos & ArcTan
are all built into our α ≈ 37.9°
calculators
β = 90 − α ≈ 52.1°
44. An 18 foot ladder leans against a building. If the base
of the ladder is 5 feet from the base of the building,
what angle is formed by the ladder and the ground?
45. An 18 foot ladder leans against a building. If the base
of the ladder is 5 feet from the base of the building,
what angle is formed by the ladder and the ground?
18
θ
5
46. An 18 foot ladder leans against a building. If the base
of the ladder is 5 feet from the base of the building,
what angle is formed by the ladder and the ground?
5
18 cosθ =
18
θ
5
47. An 18 foot ladder leans against a building. If the base
of the ladder is 5 feet from the base of the building,
what angle is formed by the ladder and the ground?
5
18 cosθ =
18
−1 5
θ = cos
θ 18
5
48. An 18 foot ladder leans against a building. If the base
of the ladder is 5 feet from the base of the building,
what angle is formed by the ladder and the ground?
5
18 cosθ =
18
−1 5
θ = cos
θ 18
5 θ ≈ 73.9°
49. HW #3
Draw diagrams for your problems!!!
Pain is temporary. It may last a minute, or an hour, or a
day, or a year, but eventually it will subside and
something else will take its place. If I quit, however, it
lasts forever.
Lance Armstrong
