Trigonometry III Fundamental Trigonometric Identities. By Mr Porter
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Trigonometry IIIFundamental Trigonometric Identities.
By Mr Porter
Summary of Definitions
Reciprocal RelationshipsHypotenuse
Adjacent
Opposite
θ
α
Complementary Relationships Negative Angle
Pythagorean Identities of Trigonometry.
For any angle θ
θ
r
x
y
Now and
Using Pythagoras’ Theorem
Likewise,
Examples: Simplify the following
a) Write down the identities
Options:(1) replace the ‘1’ with a trig expression(2) Rearrange an identity and replace
In this case, rearrange the 1st identity sin2θ = 1 – cos2θ, and cos2θ = 1 – sin2θ
b) Write down the identities
Sometimes, we need to take small steps!
Use the 3rd identity to replace denominator
Now, replace cot and cosec with their sin and cos equivalents.
Fraction rearrange
Extension student would continue to the next step.
Examples: Simplify the following
c) Write down the identities
Use the 2nd identity, rearranged.
Use the reciprocal trig angles.
d)Write down the identities
No matches, FACTORISE!
Now use an identity (try number 1).
Use the complementary trig angles.
Exercise
a) Simplify
b) Simplify
c) Simplify
d) Simplify
Trigonometric Identity Proofs.a) Prove that
LHS Break into terms of sin and cos
Common denominator.
Expand numerator
Rearrange numerator
Write down the identities
Trigonometric Identity Proofs.
b) Prove
LHS Break into terms of sin and cos
Common denominator.
Write down the identities
Trigonometric Identity Proofs.
d) Prove
LHS Break into terms of sin and cos and rearrange
Factorise
Express brackets as a common denominator.
Use identity
Expand brackets
Use definitions
This was NOT an easy question!
Exercise
a) Prove
b) Prove
c) Prove
d) Prove
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