February 12 MATH 1112 sec. 54 Spring 2020
Transcript of February 12 MATH 1112 sec. 54 Spring 2020
February 12 MATH 1112 sec. 54 Spring 2020Trigonometric Functions of Acute Angles
In this section, we are going to define six new functions calledtrigonometric functions. We begin with an acute angle θ in a righttriangle with the sides whose lengths are labeled:
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Sine, Cosine, and TangentFor the acute angle θ, we define the three numbers as follows
sin θ =opphyp
, read as ”sine theta”
cos θ =adjhyp
, read as ”cosine theta”
tan θ =oppadj
, read as ”tangent theta”
Note that these are numbers, ratios of side lengths, and have no units.
It may be convenient to enclose the argument of a trig function inparentheses. That is,
sin θ = sin(θ).
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Cosecant, Secant, and Cotangent
The remaining three trigonometric functions are the reciprocals of thefirst three
csc θ =hypopp
=1
sin θ, read as ”cosecant theta”
sec θ =hypadj
=1
cos θ, read as ”secant theta”
cot θ =adjopp
=1
tan θ, read as ”cotangent theta”
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A Word on Notation
The trigonometric ratios define functions:
input angle number→ output ratio number.
From the definitions, we see that
csc θ =1
sin θ.
Functions have arguments. It is NOT acceptable to write the aboverelationship as
csc =1sin.
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QuestionSuppose we know that cos θ =
35
. Then the length X of the hypotenuse
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ExampleSuppose the acute angle α satisfies tanα = 2. Determine theremaining five trigonometric values of α.
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