Test #3

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Let f(x)=sinx and g(x)=cosx.Find the value of (f•g) (π/4).

5.3 Q#9

Name the quadrant in which the angle θ lies.

5.4 Q#5

Is the tangent function​ even, odd, or​ neither? Is its graph​ symmetric? With respect to​ what?

5.5 Q#11

Solve the following triangle. A=20°, B=20°, c=2

7 Q#4

The point P=(4,−3) on the circle x^2+y^2=r^2 is also on the terminal side of an angle θ in standard position. Find sinθ, cosθ, tanθ, cscθ, secθ, and cotθ.

5.5 Q#2

What is the domain of the sine​ function?

5.5 Q#9

Find the exact value of the following expression. tan^-1 sqrt(3)/3

6.1 Q#1,2,3

Find the value of each of the six trigonometric functions of the angle θ in the figure. a=7 and b=6

5.2 Q#1,2

Given cos30°=sqrt(3)/2,use the trigonometric identities to find the exact value of each of the following. ​(a) sin60° (b) sin^2 30° (c) secπ/6 (d)csc π/3

5.2 Q#11,12

Find the distance from A to C across the gorge illustrated in the figure.

5.3 Q#11

For what numbers θ is f(θ​)=tanθ not​ defined?

5.5 Q#13,14

Find the exact solution of the equation. 18sin^-1 x=3pi

6.1 Q#10

Find the exact value of the following expression. sin-1 (-sqrt(3)/2)

6.1 Q#11

Write the trigonometric expression as an algebraic expression in u.

6.2 Q#10,11

Use the​ half-angle formulas to find the exact value of the trigonometric function sin(-22.5)

6.6 Q#2,3

Establish the identity sin7θ+sin3θ / cos7θ+cos3θ =tan(5θ).

6.7 Q#4,7

Use the right triangle and the given information to solve the triangle. a=5, B=34°; find b,c, and A

7 Q#1

A tower.... A state trooper A aircraft

7 Q#11,12,13

Use identities to find the exact value of each of the four remaining trigonometric functions of the acute angle θ. sinθ = 1/5 , cosθ=2sqrt6/5

5.2 Q#3

Use the definition or identities to find the exact value of each of the remaining five trigonometric functions of the acute angle θ. sinθ= sqrt5/4

5.2 Q#4,5,6

Use fundamental identities​ and/or the complementary angle theorem to find the exact value of the expression. Do not use a calculator. sin19 csc19

5.2 Q#7,8,9,10

Find the exact value of the expression. Do not use a calculator. 8cos45-7sin45

5.3 Q#1,2,3,4

A right triangle has a hypotenuse of length 3 inches. If one angle is 38°​,find the length of each leg.

5.3 Q#10

A right triangle contains a 75° angle. ​(a)If one leg has length 11 ​inches, what is the length of the​ hypotenuse? ​(b)There are two answers. How is this​ possible?

5.3 Q#12

Suppose you are headed toward a plateau 53m high. If the angle of elevation to the top of the plateau is 60°​,how far are you from the base of the​ plateau?

5.3 Q#13

Use the reference angle to find the exact value of the following expression. Do not use a calculator. cos 420

5.4 Q#8,10

Use the reference angle to find the exact value of the given expression. sin(-120)

5.4 Q#9

Find the values of sin t, cos t, tan t, csc t, sec t, and cot t if P=(−1/2, sqrt(3)/2 is the point on the unit circle that corresponds to the real number t.

5.5 Q#1

Is the sine function​ even, odd, or​ neither? Is its graph​ symmetric? With respect to​ what?

5.5 Q#10

What is the range of the secant​ function?

5.5 Q#15

Use the fact that the trigonometric functions are periodic to find the exact value of the given expression. Do not use a calculator. sin(420)

5.5 Q#3,4,5

Use the​ even-odd properties of the trigonometric functions to find the exact value of the given expression. Do not use a calculator. cos(−60°)

5.5 Q#6,7,8,12

Find the exact​ value, if​ any, of the following composite function. Do not use a calculator. cos^-1 [cos(7pi/10)]

6.1 Q#6,7,8,9

Find the exact value of the expression. cos[sin^−1 (1/2)]

6.2 Q#1,2,3,4,5,6,7,8

Solve the equation. 2sin^2 θ-3sin θ + 1=0

6.3 Q#8

Two sides and an angle are given below. Determine whether the given information results in one​ triangle, two​ triangles, or no triangle at all. Solve any resulting​ triangle(s). a=8, c=6, C=10°

7 Q#5,6

Solve the triangle

7 Q#7,8,9,10

Develop a formula for cos(3θ) as a​ third-degree polynomial in the variable cosθ.

6.6 Q#4

Use the information given about the​ angle, 0≤θ<2π​, to find the exact value of each trigonometric function. tanθ=−2, sinθ<0 ​(a) sin(2θ) ​(b) cos(2θ) ​(c) sinθ/2 ​(d) cosθ/2 ​(e) tan2θ ​(f)tanθ/2

6.6 Q#5

Find the exact value of each of the remaining trigonometric functions of θ. cosθ=−24/25​, θ in Quadrant III

5.4 Q#11,12

Use a coterminal angle to find the exact value of the expression. Do not use a calculator. tan 405

5.4 Q#3,4

Find the reference angle of 130°.

5.4 Q#6,7

Find the exact​ value, if​ any, of the following composite function. Do not use a calculator. tan^-1 [tan(-5pi/17)]

6.1 Q#12,13

Use a calculator to find the value in radians of the following expression rounded to two decimal places. tan^-1 8

6.1 Q#4

Use a calculator to find the value of the following expression rounded to two decimal places. cos^-1 1/11

6.1 Q#5

Use a calculator to find the value of the expression rounded to two decimal places. cot^-1 (-sqrt(7))

6.2 Q#9

Use a calculator to find the approximate value of the expression. Round the answer to two decimal places. tan31

5.3 Q#5,6,7

Let f(x)=sinx and g(x)=cosx. Find the value of (f+g)(45°).

5.3 Q#8

A point on the terminal side of an angle θ in standard position is (−7, 24).Find the exact value of each of the six trigonometric functions of θ.

5.4 Q#1,2

Solve the equation on the interval 0 < θ <2pi. 4sin θ + 5 = 7

6.3 Q#1,2,3,4

Solve the equation. Give a general formula for all the solutions. List six solutions. sin θ = -(sqrt(2)/2)

6.3 Q#5

Solve the equation. Give a general formula for all the solutions. List all the solutions for k=​0, ​1, 2,​ 3, 4, and 5.

6.3 Q#6

Solve the equation on the interval 0≤θ<2π. ​sqrt2 sin^2 θ - sin θ=0

6.3 Q#7,9,10,11,12

Rewrite tanθ•cscθ in terms of sine and cosine.

6.4 Q#1

Rewrite (sin θ−cos θ) / sin θ − (sin θ+cos θ) / cos θ over a common denominator. Type your answer in terms of sine​ and/or cosine.

6.4 Q#2

Establish the identity. (1-cos θ)(1+ cos θ) = sin^2 θ

6.4 Q#3,4,5,7,8,9,10

Verify the identity. cosx − sin^2 x cosx = cos3x

6.4 Q#6

Use a sum or difference formula to find the exact value of the trigonometric function.

6.5 Q#

Establish the identity. sin(3pi/2 - θ) = -cosθ

6.5 Q#10

Find the exact value of the expression. sin(10) cos(20) + cos(10) sin (20)

6.5 Q#2,3,4,5,6,7

Find the exact value of each of the following under the given conditions below. tan α = −12/5, π/2<α<π​; cosb.....

6.5 Q#8

If sinθ=4/9​, θ in quadrant​ II, find the exact value of (a) cosθ (b) sinθ+π6 (c) cosθ−π3 (d) tan(θ+π/4)

6.5 Q#9

If sinθ= 40/41, 0<θ<π2, find the exact value of each of the following. ​(a) sin(2θ) ​(b) cos(2θ) ​(c) sin θ/2 ​(d) cos θ/2 ​(e) tan 2/θ ​(f) tan θ/2

6.6 Q#1

Express the given product as a sum containing only sines or cosines. sin(9θ) sin(7θ)

6.7 Q#1,2,5

Express the given sum or difference as a product of sines​ and/or cosines.

6.7 Q#3,6

Solve the triangle shown to the right.

7 Q#2,3


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