Right Triangle Trigonometry 23 March 2011. Degree Mode v. Radian Mode.
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Transcript of Right Triangle Trigonometry 23 March 2011. Degree Mode v. Radian Mode.
![Page 1: Right Triangle Trigonometry 23 March 2011. Degree Mode v. Radian Mode.](https://reader030.fdocuments.in/reader030/viewer/2022032708/56649e865503460f94b8a1aa/html5/thumbnails/1.jpg)
Right Triangle Trigonometry
23 March 2011
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Degree Mode v. Radian Mode
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Symbols
Theda – Represents the angle measure
Hypotenuse
Opposite Side
Adjacent
Side
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Six Trigonometric Ratios
3 Basic Ratios + 3 Reciprocal Ratios What is a reciprocal?
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Six Trigonometric Ratios, cont.
Basic Trig. Ratio Sine Cosine Tangent
Reciprocal Trig. Ratio Cosecant Secant Cotangent
It’s a sin to have two c’s.
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Three Basic Trig. Ratios
SOH-CAH-TOA
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Sine (SOH)
hypotenuse
oppositesin
24 25
7
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Cosine (CAH)
hypotenuse
adjacentcos
24 25
7
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Tangent (TOA)
adjacent
oppositetan
24 25
7
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Cosecant – Reciprocal of Sine
opposite
hypotenusecsc
24 25
7
sin
1csc
(“It’s a sin to have two C’s.”)
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Secant – Reciprocal of Cosine
adjacent
hypotenusesec 24 25
7
cos
1sec
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Cotangent – Reciprocal of Tangent
opposite
adjacentcot 24 25
7
tan
1cot
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Your Turn:
Pg. 419: 9 – 14, 27 – 32
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Solving for Side Lengths
If given one side and one angle measure, then we can solve for any other side of the triangle.
8
x
65
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Solving Right Triangles, cont.
1. Ask yourself what types of sides do you have: opposite, adjacent, and/or hypotenuse?
2. Pick the appropriate trig function to solve for x.
3. Solve for x.
8
x
65
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Solving for Side Lengths, cont.
8
x
65
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Solving Side Lengths, cont.
14x
30
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Special Trigonometric RatiosMemorize These!!!
30° 45° 60°
sin
cos
tan
2
1
2
2
2
32
3
2
2
2
1
3
3 1 3
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Your Turn:
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Inverse Trigonometric Ratios
We can “undo” trig ratios Gives us the angle measurement (theda) Represented by a small –1 in the upper right hand
corner Ex.
2nd button → correct trig ratio
1sin
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Inverse Trigonometric Ratios, cont.
6.0cos
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Your Turn: Solve for thedaRound to nearest hundredth
5.0sin
5.0cos 2
3sin
1tan
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Solving For Angle Measures
If given two sides of a triangle, then we can solve for any of the angles of the triangle.
54
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Solving for Angle Measures, cont.
1. Ask yourself what types of sides do you have: opposite, adjacent, and/or hypotenuse?
2. Pick the appropriate trig function to solve for
3. Solve for using the inverse trigonometric function
54
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Solving for Angle Measures, cont.
54
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Your Turn:
Complete problems 11 – 16 on the Solving Right Triangles Practice handout
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Solving Right Triangles
We can use two properties of triangles to solve for all the angles and the side lengths of a right triangle.
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Properties of Triangles
Pythagorean Theorem
For a right triangle,
a2 + b2 = c2
Triangle Sum Theorem
When you add up all the angles in a triangle, they equal 180°
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Tricks for Solving Right Triangles
Given Two Sides
1. Use Pythagorean Theorem to solve for remaining side.
2. Solve for 1 of the angles using trig ratios
3. Solve for the other angle using Triangle Sum Theorem
Given an Angle & a Side
1. Use the Triangle Sum Theorem to solve for the other angle
2. Use trig ratios to solve for 1 of the sides
3. Use the Pythagorean Theorem to solve for the other side
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Beta
– Another symbol for an unknown angle measure
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Solving Right Triangles – Examples: Given Two Sides
54
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Solving Right Triangles – Examples: Given an Angle and a Side
2
30°