Bell Work - Warrior Run School District
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UNIT 7 ANALYTIC TRIGONOMETRY LESSON 7.1 VERIFYING IDENTITIES PROOFS! • I know, we have already done proofs. But… • Now we are able to transform the left, right, or both sides of the equation to verify the identity. • Watch out for conjugates, factoring, Pythagorean Identities, etc…when working on these proofs. EXAMPLE: • Verify the identity below: • tan ๐ฅ − sec ๐ฅ 2 = 1−sin ๐ฅ 1+sin ๐ฅ HOMEWORK: • Pages 498 – 499 #’s 1 – 47 odds BELL WORK: • Verify the following identities: • 1) ln sec ๐ฅ = − ln cos ๐ฅ • 2) log csc ๐ฅ + log tan ๐ฅ = − log cos ๐ฅ • 3) 1 − ๐๐๐ 4 ๐ฅ = 2๐ ๐๐2 ๐ฅ − ๐ ๐๐4 ๐ฅ LESSON 7.2 TRIGONOMETRIC EQUATIONS EXAMPLE: • Find the solutions for the equation sin θ = ½. • How many solutions are there? • How do we represent them? EXAMPLE: • Find the solutions for the equation tan ๐ = −1 given the following restrictions on m: • A) m is in the interval from (-π, π) • B) m is any real number • C) m < 0 EXAMPLE: • Solve the equation cos 2x = 0 and express the solutions in both radians and degrees. EXAMPLE: • Solve the equation sin θ tan θ = sin θ. HOMEWORK: • Page 511 #’s 1 – 13 odds BELL WORK: • Solve the equation 4sin² x tan x – tan x = 0 given the following restrictions: • A) x is in the interval from [0,2π] • B) x is any real number • C) x < 0 EXAMPLE: • Solve the equation 2sin²x – cos x = 1. EXAMPLE: • Solve the equation ๐๐ ๐ 4 2๐ข = 4. • *Warning* This problem is so awesome, it may cause you to become even more awesomer than you already are, which may cause an overload of awesome, which has caused fatalities in the past. Proceed with caution. EXAMPLE: • On the interval from [0°,720°], approximate all the values of x that would satisfy the following equation. (Round to the nearest degree.) • 5 sin ๐ฅ tan ๐ฅ − 10 tan ๐ฅ + 3 sin ๐ฅ − 6 = 0 HOMEWORK: • Page 511 #’s 19 – 35 odds BELL WORK: • Using the following restrictions on x, solve: • sec ๐ฅ โ csc ๐ฅ = 2 csc ๐ฅ • A) When x is in the interval from [0,4π] • B) When x is any real number EXAMPLE: • Solve the equation 2๐๐๐ 2 ๐ฅ = 5 cos ๐ฅ + 3. HOMEWORK: • Pages 511 – 512 #’s 37 – 59 odds • This assignment will be collected!!! WORD PROBLEM: • The number of hours of daylight D(t) at a particular time of the year is approximated by: • ๐ท ๐ก = 2 sin 2๐ 365 ๐ก − 79 + 12 • with t in days and t = 1 corresponding to January 1st. On approximately what days of the year is there exactly 13 hours of daylight? How many days of the year have 11 or more hours of daylight? HOMEWORK: • Pages 512 – 513 #’s 68, 71, 73, 75b BELL WORK: • Verify each identity: • 1) sin ๐ฅ 1−cos ๐ฅ = csc ๐ฅ + cot ๐ฅ • 2) ๐ ๐๐3 ๐ฅ + ๐๐๐ 3 ๐ฅ = (1 − sin ๐ฅ cos ๐ฅ)(sin ๐ฅ + cos ๐ฅ) BELL WORK CONTINUED: • Solve each equation: • 1) 2๐๐๐ 2 ๐ฅ + 3 cos ๐ฅ = −1 • 2) ๐ ๐๐ 5 ๐ฅ = 4sec ๐ฅ • 3) sin ๐ฅ + cos ๐ฅ cot ๐ฅ = csc ๐ฅ BELL WORK: • Simplify the expressions below (find the exact value) • 1) cos 45° + cos 30° • 2) cos(75°) LESSON 7.3 ADDITION AND SUBTRACTION FORMULAS ADDITION/SUBTRACTION FOR COSINE • cos ๐ข − ๐ฃ = cos ๐ข cos ๐ฃ + sin ๐ข sin ๐ฃ • cos ๐ข + ๐ฃ = cos ๐ข cos ๐ฃ − sin ๐ข sin ๐ฃ • How could we use these to find the cos 75°? ADDITION/SUBTRACTION FOR SINE • sin ๐ข + ๐ฃ = sin ๐ข cos ๐ฃ + cos ๐ข sin ๐ฃ • sin ๐ข − ๐ฃ = sin ๐ข cos ๐ฃ − cos ๐ข sin ๐ฃ • How could we use this to find the sin 13๐ ? 12 ADDITION/SUBTRACTION TANGENT • tan ๐ข + ๐ฃ = tan ๐ข+tan ๐ฃ 1−tan ๐ข tan ๐ฃ • tan ๐ข − ๐ฃ = tan ๐ข−tan ๐ฃ 1+tan ๐ข tan ๐ฃ • How could we use this to find the tan 345°? COFUNCTION FORMULAS • Cosine/Sine: • cos ๐ข = ๐ sin( 2 − ๐ข) sin ๐ข = ๐ cos( 2 − ๐ข) • Tangent/Cotangent ๐ 2 • tan ๐ข = cot( − ๐ข) ๐ 2 cot ๐ข = tan( − ๐ข) • Secant/Cosecant ๐ 2 • sec ๐ข = csc( − ๐ข) ๐ 2 csc ๐ข = sec( − ๐ข) HOMEWORK: • Pages 522 – 523 #’s 5 – 9 odds, 17 – 21 odds, 35 - 41 BELL WORK: • If a and b are acute angles such that the csc a = 13/12 and cot b = 4/3, find: • 1) sin (a + b) • 2) tan (a + b) • 3) the quadrant containing a + b EXAMPLES: • Verify: • 1) sin ๐ − 3๐ 2 = cos ๐ • 2) tan ๐ − ๐ = −๐ก๐๐๐ • 3) cos(๐ − 5๐ ) 2 = ๐ ๐๐๐ EXAMPLE: • Verify: • 4) cos(๐ข + ๐ฃ) โ cos ๐ข − ๐ฃ = ๐๐๐ 2 ๐ข − ๐ ๐๐2 ๐ฃ EXAMPLE: • Use the addition and/or subtraction formulas to find the solutions for the equation in the interval from [0,π]. • sin4x· cosx = sinx· cos4x HOMEWORK: • Pages 523 – 524 #’s 10, 22, 26, 36, 38, 40 QUIZ FRIDAY • Lessons 7.1 – 7.3 • 7.1 Proofs • 7.2 Solving Trigonometric Equations (either on a given interval or for all real numbers) • 7.3 Addition/Subtraction Formulas and Proofs PRACTICE PROBLEMS: • Page 524 #’s 54, 55, 58 BELL WORK: • Verify the following identities: • 1) ๐๐๐ก๐ฅ−๐ก๐๐๐ฅ ๐ ๐๐๐ฅ ๐๐๐ ๐ฅ = ๐๐ ๐²๐ฅ − ๐ ๐๐ 2 ๐ฅ • 2) ln ๐๐ ๐²θ = −2ln ๐ ๐๐θ CLASS WORK: • Pages 511 – 512 #’s 31, 34, 38, 42 • Pages 523 – 524 #’s 20, 33, 38, 56 • Also review the proofs from lesson 7.1! BELL WORK: • Use the addition and/or subtraction formulas to find the solutions for the equations in the interval from [0,2π]. • 1) sin4x· cosx = sinx· cos4x • 2) tan2x + tanx = 1 – tan2x· tanx LESSON 7.4 MULTIPLE-ANGLE FORMULAS DOUBLE ANGLE FORMULAS • 1) sin 2๐ข = 2 sin ๐ข cos ๐ข • 2) a) cos 2๐ข = ๐๐๐ ²๐ข − ๐ ๐๐2 ๐ข • b) cos 2๐ข = 1 − 2๐ ๐๐2 ๐ข • c) cos 2๐ข = 2๐๐๐ ²๐ข − 1 • 3) tan 2๐ข = 2 tan ๐ข 1−๐ก๐๐2 ๐ข • Where did these come from??? EXAMPLES: • Ex1: If the sin x = 4/5 and x is in the first quadrant, find the exact values of sin2x, cos2x, and tan2x. • Ex2: Verify the identity, cos 3๐ฅ = 4๐๐๐ ³๐ฅ − 3 cos ๐ฅ. EXAMPLE: • Find all solutions: • 1) sin 2x + sin x = 0 • Verify the identity: • 2) cos 4๐ฅ = 1 − 8๐ ๐๐2 ๐ฅ + 8๐ ๐๐4 ๐ฅ HALF-ANGLE IDENTITIES • 1) ๐ ๐๐²๐ข = 1−cos 2๐ข 2 • 2) ๐๐๐ ²๐ข = 1+cos 2๐ข 2 • 3) ๐ก๐๐²๐ข = 1−cos 2๐ข 1+cos 2๐ข EXAMPLES: 1 8 • Ex3: Verify the identity, ๐ ๐๐²๐ฅ ๐๐๐ ²๐ฅ = (1 − cos 4๐ฅ). HOMEWORK: • Page 532 #’s 3, 11, 15, 17, 23 BELL WORK: • 1) Find the exact value of sin 2x, cos 2x, and tan 2x if you know that the cscx = -13/5, and x is in the third quadrant. • 2) Verify: ๐ ๐๐2 2๐ฅ ๐ ๐๐2 ๐ฅ = 4 − 4๐ ๐๐2 ๐ฅ • 3) Verify: (๐ ๐๐๐ฅ + ๐๐๐ ๐ฅ)2 = ๐ ๐๐2๐ฅ + 1 BELL WORK: • Find all solutions: • cos 3๐ฅ cos 2๐ฅ − sin 3๐ฅ sin 2๐ฅ = − • Find all solutions between [0,2π] 1 2 • ๐๐๐ ๐ฅ + 3cos( ๐ฅ) + 2 = 0 1 2 EXAMPLES: • Verify each identity: • ๐๐๐ 2๐ฅ = 2−๐ ๐๐ 2 ๐ฅ ๐ ๐๐ 2 ๐ฅ • ๐ก๐๐๐ฅ + ๐๐๐ก๐ฅ = 2๐๐ ๐2๐ฅ • ๐ก๐๐๐ฅ = ๐๐ ๐2๐ฅ − ๐๐๐ก2๐ฅ CLASS WORK: • Pages 532 – 533 #’s 2, 4, 18, 20, 25, 35, 37, 40 HALF-ANGLE FORMULAS • 1) ๐ฃ sin 2 • 2) ๐ฃ cos 2 • 3) ๐ฃ tan 2 =± 1−cos ๐ฃ 2 =± 1+cos ๐ฃ 2 =± 1−cos ๐ฃ 1+cos ๐ฃ • Also with tangent: ๐ฃ tan 2 = 1−cos ๐ฃ sin ๐ฃ = sin ๐ฃ 1+cos ๐ฃ EXAMPLES: • Find the exact value of the sin 22.5°. • Find the exact value of the cos 112.5°. EXAMPLE: • Find the solution for the equation below that are in the interval [0,2π]. • ๐๐๐ 2๐ − ๐ก๐๐๐ = 1 • Warning: This one is off the hook… HOMEWORK: • Pages 532 – 533 #’s 5, 9, 13, 19, 25, 33, 35, 37 CLASS WORK/HOME WORK: • Pages 532 – 533 #’s 4, 8, 10, 12, 16, 22, 24, 34, 36, 38 BELL WORK: • Solve: LESSON 7.6 INVERSE TRIGONOMETRIC FUNCTIONS LET’S REVIEW INVERSES: • Domain of ๐ = Range of ๐ −1 • Range of ๐ = Domain of ๐ −1 • ๐ ๐ −1 ๐ฅ = ๐ฅ ๐๐๐ ๐๐ฃ๐๐๐ฆ ๐ฅ ๐๐ ๐กโ๐ ๐๐๐๐๐๐ ๐๐๐ −1 • ๐ −1 ๐ ๐ฆ = ๐ฆ ๐๐๐ ๐๐ฃ๐๐๐ฆ ๐ฆ ๐๐ ๐กโ๐ ๐๐๐๐๐๐ ๐๐ ๐ • The graphs of ๐ and ๐ −1 are reflections across the line y = x. • This means the point (a,b) on the graph of ๐ is point (b,a) on the graph of ๐ −1 . INVERSE SINE (๐ ๐๐−1 ) • The inverse sine function is also referred to as the arcsine function. • ๐ฆ = ๐ ๐๐−1 ๐ฅ ๐๐ ๐กโ๐ ๐ ๐๐๐ ๐๐ ๐ฆ = arcsin(๐ฅ) • Domain: [-1,1] Range: ๐ ๐ [− , ] 2 2 • What is off about the domain and/or range? GRAPH OF ARCSINE • Let’s derive the graph of y = arcsin(x) USING ๐ ๐๐−1 • Find the exact value: • Ex: 1 −1 sin(๐ ๐๐ ) 2 • Ex: ๐ ๐๐−1 (sin 2๐ ) 3 INVERSE COSINE (๐๐๐ −1 ) • The inverse cosine function is also referred to as the arccosine function. • ๐ฆ = ๐๐๐ −1 ๐ฅ ๐๐ ๐กโ๐ ๐ ๐๐๐ ๐๐ ๐ฆ = arccos(๐ฅ) • Domain: [-1,1] Range: [0, ๐] GRAPH OF ARCCOSINE • Let’s derive the graph of y = arccos(x) USING ๐๐๐ −1 • Find the exact value: • Ex: 1 −1 cos(๐๐๐ ) 2 • Ex: ๐๐๐ −1 (cos 2๐ ) 3 INVERSE TANGENT (๐ก๐๐−1 ) • The inverse tangent function is also referred to as the arctangent function. • ๐ฆ = ๐ก๐๐−1 ๐ฅ ๐๐ ๐กโ๐ ๐ ๐๐๐ ๐๐ ๐ฆ = arctan(๐ฅ) • Domain: All Real Numbers Range: ๐ ๐ (− , ) 2 2 GRAPH OF ARCTANGENT • Let’s derive the graph of y = arctan(x) USING ๐ก๐๐−1 • Find the exact value: • Ex: tan(๐ก๐๐−1 3) • Ex: ๐ก๐๐ −1 2๐ (๐ก๐๐ ) 3 HOMEWORK: • Pages 553 – 554 #’s 1 – 19 odds, 31 and 32 BELL WORK: • Find the exact value of the following expressions: 3 2 • 1) arccos( ) • 2) arctan(tan 11๐ ) 4 EXAMPLE: 1 2 4 5 • Find the exact value of sin(arctan − arccos ). EXAMPLE: • Find the solutions for the equation on the interval from [-π,π]. (Round your answers to three decimal places if necessary.) • ๐ ๐๐²๐ฅ − ๐ ๐๐๐ฅ − 5 = 0 GRAPHS OF OTHER INVERSES • **Blue Chart on Page 552** • These are the graphs for the inverses of cotangent, secant, and cosecant. • We are going to skip these!!! HOMEWORK: • Pages 553 – 555 #’s 10 – 20 evens, 53, 55, 57 TEST WEDNESDAY • Lessons 7.1 – 7.6 (no 7.5) • Proofs • Solving Trigonometric Equations (For all real numbers and through intervals) • Addition and Subtraction Formulas • Double/Half Angle Identities • Inverse Functions(Sine, Cosine, and Tangent only) TEST REVIEW: • Pages 557 – 559 (Unit 7) • #’s 1 – 8, 14, 18, 19, 23 – 34, 45, 48, 53, 56 • Pages 620 – 623 (Unit 8) • #’s 5 – 10, 40 – 45, 47, 48 • As always, these are review problems that are very similar to problems that you will see on your test!!! • Also remember to look over previous homework assignments!!!
