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Verifying Trig Identities (5.1)

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Title: Verifying Trig Identities (5.1)


1
Verifying Trig Identities(5.1)
  • JMerrill, 2009
  • (contributions from DDillon)

2
Trig Identities
  • Identity an equation that is true for all values
    of the variable for which the expressions are
    defined
  • Ex or (x 2) x 2
  • Conditional Equation only true for some of the
    values
  • Ex tan x 0 or x2 3x 2 0

3
Recall
4
Recall - Identities
Reciprocal Identities
Also true
5
Recall - Identities
Quotient Identities
6
Fundamental Trigonometric Identities
Negative Identities (even/odd)
These are the only even functions!
7
Recall - Identities
Cofunction Identities
8
Recall - Identities
Pythagorean Identities
9
Simplifying Trig Expressions
  • Strategies
  • Change all functions to sine and cosine (or at
    least into the same function)
  • Substitute using Pythagorean Identities
  • Combine terms into a single fraction with a
    common denominator
  • Split up one term into 2 fractions
  • Multiply by a trig expression equal to 1
  • Factor out a common factor

10
Simplifying 1
11
Simplifying 2
12
Simplifying 3
13
Simplifying 4
14
Simplifying 5
15
Proof Strategies
  • Never cross over the equal sign (you cannot
    assume equality)
  • Transform the more complicated side of the
    identity into the simpler side.
  • Substitute using Pythagorean identities.
  • Look for opportunities to factor
  • Combine terms into a single fraction with a
    common denominator, or split up a single term
    into 2 different fractions
  • Multiply by a trig expression equal to 1.
  • Change all functions to sines and cosines, if the
    above ideas dont work.

ALWAYS TRY SOMETHING!!!
16
Example
  • Prove
  • 2 fractions that need to be added
  • Shortcut

17
1 cot2x csc2 x
18
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