Transcript Math 2204

Math 2204
Unit 4: Trigonometric equations
Section 4.1
Trigonometric Equation
Curriculum outcomes covered in
section 4.1
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A1 demonstrate an understanding of irrational numbers in applications
B4 use the calculator correctly and efficiently
C1 model situations with sinusoidal functions
C9 analyze tables and graphs of various sine and cosine functions to find
patterns, identify characteristics and determine equations
C15 demonstrate an understanding of sine and cosine ratios and functions
for non-acute angles
C18 interpolate and extrapolate to solve problems
C27 apply function notation to trigonometric equations
C28 analyze and solve trigonometric equations with and without
technology
C30 Demonstrate an understanding of the relationship between solving
algebraic and trigonometric equations
DIRECTION ON THE UNIT CIRCLE
COORDINATES ON UNIT CIRCLE
USING TRIG CIRCLE COORDINATES TO
SIMPLIFY EXPRESSIONS
USING TRIG CIRCLE COORDINATES TO
SIMPLIFY EXPRESSIONS
USING TRIG CIRCLE COORDINATES TO
SIMPLIFY EXPRESSIONS
EXAMPLE 1
Find the exact value of the sine and cosine of 300o.
Solution
1. Sketch a diagram showing a
rotation of 300o
2. The side opposite 30o is the xcoordinate, which is , and this
gives us the cosine of the angle.
3. The side opposite 60o is the ycoordinate which is and this
gives us the sine of the angle.
Since the point is in the fourth
quadrant the x-coordinate is
positive and the y-coordinate is
negative. Thus we can say:
EXAMPLE 2
Find the exact value of sine and cosine of -225o
Solution
1. Remember that for a negative
angle the rotation is clockwise.
2. Sketch a diagram showing the
angle and the corresponding
right triangle as on the right.
3. The resulting triangle is 45o 45o - 90o so both sides are
Since the point is in the second
quadrant, the x-coordinate is
negative and the y-coordinate is
positive.
PROBLEMS DONE ON BOARD
(IF YOU ARE ABSENT OR REFUSE TO
WRITE THESE SOLUTIONS DOWN IT IS
UP TO YOU TO GET THE NOTES FROM
A CLASSMATE)
• Do CYU Questions 7-9,13,16,18 on pages 135 138.
SOLVING TRIGONOMETRIC
EQUATIONS USING EXACT VALUES
SOLVING TRIGONOMETRIC
EQUATIONS USING NON-EXACT
VALUES (USING CALCULATOR)
SOLVING TWO EQUATIONS TOGETHER
SOLVING TWO EQUATIONS TOGETHER
GRAPHICALLY
SOLVING TWO EQUATIONS TOGETHER
ALGEBRAICALLY
PROBLEMS DONE ON BOARD
(IF YOU ARE ABSENT OR REFUSE TO
WRITE THESE SOLUTIONS DOWN IT IS
UP TO YOU TO GET THE NOTES FROM
A CLASSMATE)
• Do CYU Questions 28, 30,31 on pages 142 145.
Section 4.2
Trigonometric identities
CURRICULUM OUTCOMES CONTAINED
IN SECTION 4.2
A1 demonstrate an understanding of irrational numbers in
applications
B1 demonstrate an understanding of the relationship between
operations on fractions and rational algebraic expressions
B4 use the calculator correctly and efficiently
C9 analyze tables and graphs of various sine and cosine functions to
find patterns, identify characteristics and determine equations
C24derive and apply the reciprocal and Pythagorean identities
C25prove trigonometric identities
C28analyze and solve trigonometric equations with and without
technology
SUMMARY OF TRIG FUNCTIONS,
EQUATIONS AND IDENTITIES
SIMPLIFYING RATIONAL EXPRESSIONS
• To simplify a rational expression (as you did
with fractions) you remove the common
factors from its numerator and denominator.
This is best explained by use of an example
EXAMPLE 1
EXAMPLE 2
MULTIPLYING & DIVIDING
• To multiply rational expressions, multiply
together the numerators and denominators,
factor, and remove common factors from the
numerator and denominator. Division is
identical except that you first have to change
the division to a multiplication.
EXAMPLE 1
EXAMPLE 2
ADDITION & SUBTRACTION
• As you learned with your work on fractions in
earlier grades, to add and subtract rational
expressions requires that they have a
common denominator. Once two expressions
have a common denominator, we simply add
or subtract their numerators. It is easiest if we
find the least common denominator of the
two fractions before we start to add or
subtract. To do this, factor the denominator of
all fractions.
EXAMPLE 1
EXAMPLE 2
PROBLEMS DONE ON BOARD
(IF YOU ARE ABSENT OR REFUSE TO
WRITE THESE SOLUTIONS DOWN IT IS
UP TO YOU TO GET THE NOTES FROM
A CLASSMATE)
• Do CYU Questions pg. 155 and 156 #’s 15, 16,
18, 19
A GOOD STRATEGY TO USE IN
VERIFYING OR PROVING IDENTITIES IS
1. select the expressions on one side of the equal sign to
work with, usually start with the left hand side.
2. write all the expressions on that side in terms of sine
or cosine and/or apply the various trigonometric
identities that you have memorized.
3. simplify using algebraic manipulation, which may
include factoring.
4. if necessary, repeat the process for the other side of
the equal sign.
• Hopefully, if you have done your work correctly, both
sides of the equal sign will give the same expression or
value, regardless of the measure of the angle.
PROBLEMS DONE ON BOARD
(IF YOU ARE ABSENT OR REFUSE TO
WRITE THESE SOLUTIONS DOWN IT IS
UP TO YOU TO GET THE NOTES FROM
A CLASSMATE)
• Do CYU Questions 11, 12,13,14,17,19
Section 4.3
Radian measure
CURRICULUM OUTCOMES COVERED IN
SECTION 4.3
A1demonstrate an understanding of irrational numbers in
applications
B4use the calculator correctly and efficiently
C9analyze tables and graphs of various sine and cosine functions
to find patterns, identify characteristics and determine
equations
D1derive, analyze, and apply angle and arc length relationships
D2demonstrate an understanding of the connection between
degree and radian measure and apply them
COMPARISON OF DEGREE AND
RADIAN MEASURE
EXAMPLE: DEGREES TO RADIANS
EXAMPLE: RADIANS TO DEGREES
RADIAN TO DEGREES AND DEGREES TO
RADIANS
RADIANS AND DEGREES
SOLVING EQUATIONS IN
TRIGONOMETRY
PROBLEMS DONE ON BOARD
(IF YOU ARE ABSENT OR REFUSE TO
WRITE THESE SOLUTIONS DOWN IT IS
UP TO YOU TO GET THE NOTES FROM
A CLASSMATE)
• Do the CYU questions 6 - 22.
assignment
End of unit 4