Question 1 of 20
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5.0/ 5.0 Points |
Use the given information to find the exact value of the expression.
sin α = , α lies in quadrant II, and cos β = , β lies in quadrant I Find sin (α – β).
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Question 2 of 20
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Solve the equation on the interval [0, 2π).
tan2x sin x = tan2x
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A. 0, |
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B. , 2π |
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C. , π |
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D. 0, π |
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Question 3 of 20
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The sound produced by touching each button on a touch-tone phone is described by y = sin 2πlt + sin 2πht where l and h are the low and high frequencies (cycles per seconD. in the figure shown.
Use a calculator to find the graph of the sound emitted by touching the 4 key in a [0, 0.01, 0.001] by [-2, 2, 1] viewing rectangle.
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Question 4 of 20
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0.0/ 5.0 Points |
Solve the equation on the interval [0, 2π).
cos x + 2 cos x sin x = 0
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A. 0, , , |
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B. , , , |
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C. , , 2π |
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D. , |
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Question 5 of 20
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0.0/ 5.0 Points |
Rewrite the expression as an equivalent expression that does not contain powers of trigonometric functions greater than 1.
cos3x
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A. cos x + cos 3x + cos 2x |
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B. cos x + cos 3x |
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C. cos x – cos 3x |
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D. cos x – cos 3x – cos 2x |
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Question 6 of 20
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Rewrite the expression in terms of the given function or functions. (sec x + csc x) (sin x + cos x) – 2 – cot x; tan x
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A. 0 |
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B. 2tan x |
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C. tan x |
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D. 2 + tan x |
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Question 7 of 20
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0.0/ 5.0 Points |
Complete the identity. = ?
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A. cot α + cot β |
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B. tan β + tan α |
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C. tan α + tan β |
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D. -tan α + cot β |
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Question 8 of 20
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5.0/ 5.0 Points |
Solve the equation on the interval [0, 2π).
sec = cos
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A. , , , , , , |
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B. 0 |
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C. , |
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D. 0, , π, |
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Question 9 of 20
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0.0/ 5.0 Points |
The weekly sales in thousands of items of a product has a seasonal sales record approximated by (t is time in weeks with t = 1 referring to the first week in the year). During which week(s) will the sales equal 96,990 items?
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A. week 4, week 20, and week 52 |
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B. week 21 and week 30 |
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C. week 4 and week 47 |
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D. week 30 and week 47 |
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Question 10 of 20
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Find the exact value of the expression.
sin 265° cos 25° – cos 265° sin 25°
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Question 11 of 20
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5.0/ 5.0 Points |
Find all solutions of the equation.
5 sin x – 8 = 3 sin x- 7
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A. x = + nπ or x = + nπ |
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B. x = + nπ or x = + nπ |
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C. x = + 2nπ or x = + 2nπ |
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D. x = + 2nπ or x = + 2nπ |
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Question 12 of 20
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0.0/ 5.0 Points |
Write the expression as the sine, cosine, or tangent of a double angle. Then find the exact value of the expression.
2 sin 120° cos 120°
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Question 13 of 20
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0.0/ 5.0 Points |
Complete the identity. sin 4x – cos 4x = ?
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A. 1 – 2cos2 x |
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B. 1 – 2sin2 x |
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C. 1 + 2sin2 x |
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D. 1 + 2cos2 x |
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Question 14 of 20
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0.0/ 5.0 Points |
Complete the identity. = ?
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A. 1 + cot α cot β |
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B. tan α tan β + cot β |
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C. 1 + tan α tan β |
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D. 1 + cot α tan β |
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Question 15 of 20
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5.0/ 5.0 Points |
Use the given information to find the exact value of the expression.
sin θ = , θ lies in quadrant II Find tan 2θ.
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Question 16 of 20
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5.0/ 5.0 Points |
Use a calculator to solve the equation on the interval [0, 2π). Round to the nearest hundredth of a radian. sin 2x – sin x = 0
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A. 1.05, 3.14, 5.24 |
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B. 0, 1.05, 3.14, 5.24 |
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C. 0, 2.09, 3.14, 4.19 |
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D. 0, 2.09, 4.19 |
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Question 17 of 20
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5.0/ 5.0 Points |
Express the sum or difference as a product. sin 4x – sin 6x
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A. 2 cos 4x cos 5x |
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B. 2 sin 5x cos x |
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C. -2 sin x cos 5x |
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D. -2 sin x |
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Question 18 of 20
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0.0/ 5.0 Points |
Solve the equation on the interval [0, 2π).
sin2 x – cos2x = 0
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Question 19 of 20
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0.0/ 5.0 Points |
Show that the equation is not an identity by finding a value of x for which both sides are defined but not equal. cos x – cos x sinx = cos 3x
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Question 20 of 20
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5.0/ 5.0 Points |
Complete the identity. = ?
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A. cot α + cot β |
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B. tan α + tan β |
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C. tan β + tan α |
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D. -tan α + cot β |
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