Which set of angles has the same terminal arm as 40∘ ?
A) 400∘,760∘,1120∘
B) 220∘,400∘,580∘
C) 80∘,120∘,200∘
D) 130∘,220∘,310∘ Question 7 (1 point)
✓ Saved In which quadrants are the sine ratios negative values?
2 and 4
3 and 4
1 and 3
None of the options
1 and 2
Question 8 (1 point)
Saved
Solve the equation on the interval 0≤θ<2π.
(cotθ−1)(cscθ−1)=0 Select the correct choice below and fill in any answer boxes in your choice.
A. The solution set is □ \}.
(Simplify your answer. Type an exact answer, using π as needed. Type your answer i any numbers in the expression. Use a comma to separate answers as needed.)
B. There is no solution on this interval.
10. If secθ=2 and 0≤θ≤2π, determine the exact value(s) of cscθ. Include a diagram. 11. If sinθ=−1 and π≤θ≤2π, determine the exact value(s) of cosθ and cotθ. Include a diagram. 12. If cosθ=−53 and sinθ<0, determine the exact value(s) of cscθ. Include a diagram. 13. Solve for θ given tanθ=−3 for −2π≤θ≤2π 14. Solve for θ given cotθ=5 for −π≤θ≤π
2uestion 5 (1 point)
The height, h, in centimetres, of a piston moving up and down in an engine cylinder can be modelled by the function h(t)=18sin(50πt)+18, where t is the time, in seconds. What is the period?
a) 50 s
b) 0.04 cm
c) 25 s
d) 0.04 s
Question 22 (1 point)
The height, h, in metres, above the ground of a car as a Ferris wheel rotates can be modelled by the function h(t)=16cos(120πt)+18, where t is the time, in seconds. What is the radius of the Ferris wheel?
a) 16 m
b) 8 m
c) 9 m
d) 18 m
Question 6 (1 point)
Solve 3cscx+2=0 on the interval x∈[0,2π], to the nearest hundredth of a radian.
a) x≐1.05,x≐2.09
b) x≐4.19,x≐5.24
C) x=60,x=120
d) x=240,x=300
Question 13 (1 point)
Solve 2sinx+1=0 on the interval x∈[0,2π], to the nearest hundredth of a radian.
a) x=210,x=330
b) x≐0.52,x≐2.62
C) x=30,x=150
d) x≐3.67,x≐5.76
A sinusoidal wave is traveling on a string with speed 107cm/s. The displacement of the particles of the string at x=16cm is found to vary with time according to the equation
y=(1cm)sin[0.84−(5.6s−1)t] The linear density of the string is 1.8g/cm. What are (a) the frequency and (b) the wavelength of the wave? If the wave equation is of the form
y(x,t)=ymsin(kx−ωt),
what are (c) ym, (d) k, and (e) ω, and (f) the correct choice of sign in front of ω ? (g) What is the tension in the string?
Select the correct answer. In a right triangle, if ∠θ=39∘ and the side adjacent to ∠θ is equal to 12.0 centimeters, what is the approximate length of the opposite side?
A. 7.6 centimeters
B. 9.3 centimeters
C. 9.7 centimeters
D. 14.8 centimeters
Type the correct answer in the box. Round your answer to the nearest integer. A train traveled a distance of 1 mile, or 5,280 feet, while climbing a hill at an angle of 5∘. The vertical height that the train climbed is approximately □ feet.
(9) If : cos220∘+θ=sin240∘+θ,0∘<θ<90∘ then θ=
(a) 60∘
(b) 45∘
(c) 30∘
(d) 20∘
(10) If the ratio between areas of two similar triangles equals 9:25 and the pe the smaller triangle is 60 cm then the perimeter of the greater triangle equals
(a) 60
(b) 80
(c) 100
(d) 120
For the triangle shown below, use your calculator to solve for the missing sides and angles.
θ=□ degrees
f=□e=□
Round your answers to two decimal places.
Question Help:
Video 1
Video 2
5. Find the phase relations for the following pairs of sinusoids:
a) u=6sin(30t−40∘)V and i=10sin(30t−π/3)mA
b) u1=−8sin(40t−80∘)V and u2=−10sin(40t−50∘)V
c) i1=4cos(70t−40∘)mA and i2=−6cos(70t+80∘)mA
d) u=−4sin(45t+5∘)V and i=7cos(45t+80∘)mA Ans. a) u leads i by 20∘; b) u1 lags u2 by 30∘; c) i1 leads i2 by 60∘; d) u leads i by 15∘
Solve the right triangle shown in the figure for all unknown sides and angles. Round your answers to two decimal places
AcbcB=78.7∘,a=4.9=□∘=□∘=□∘=□∘
A 165 -foot tall antenna has 4 guy-wires connected to the top of the antenna, and each guy-wire is anchored to the ground. A side-view of this scenario is shown. One of the guy-wires forms an angle of α=0.3 radians with the antenna and the opposing guy-wire forms an angle of β=0.41 radians with the antenna.
a. What is the horizontal distance between anchor 1 and the base of the antenna?
165∗tan(0.3)⋆ feet □165⋅tan(0.3)=51.040481185587836.
b. What is the horizontal distance between anchor 2 and the base of the antenna?
165∗tan(0.41)□⊗ feet □165⋅tan(0.41)=71.71414875898176.
c. What is the distance between anchor 1 and anchor 2?
□ feet
Preview
7. Nate is in a meadow standing exactly 185 ft from the base of a mountain. He sees someone climbing the mountain in his binoculars. His eyes are 6 ft above the ground, and is angle of elevation is 10∘. How far above the ground is the climber?
8. An airplane must fly over a 120 ft tower. The plane is 400 ft away from the tower when it begins to climb. At what angle should the plane climb to make it over the tower?
Sections
4.7+4.8 Show all work!
(1) Find the exact value of each expression. state if undefined.
a) arccos(21)
b) arcsin(4)
c) sin(arcsin(−21))
d) tan(arccos(73)) sketcl this on the coordinate plane.
(2) Solve the problem. Use exact values (leave in terms of a trig function.
Aski slope is 52 ft long and the angle A ski slope is from the ground to the summit is 42∘. How high is the summit? (Draw your best ski slope and mountain) "̈
An electric current, I, in amps, is given by
I=cos(wt)+3sin(wt),
where w=0 is a constant. What are the maximum and minimum values of I ?
Minimum value of I : □ amp Maximum value of I : □ amp Note: You can earn partial credit on this problem.
Product-to-Sum Formulas: 1. sin(u)cos(v)=21[sin(u+v))+sin(u−v)] 2. cos(u)sin(v)=21[sin(u+v))−sin(u−v)] 3. cos(u)cos(v)=21[cos(u+v))+cos(u−v)] 4. sin(u)sin(v)=21[cos(u−v))−cos(u+v)] Rewrite the expression below using one of the given formulas.
sin(3x)sin(5x)
Using formula number one:
sin(3x)sin(5x)=21[cos(3x−5x)−cos(3x+5x)]
Using formula four:
sin(3x)sin(5x)=21[cos(3x+5x)−cos(3x−5x)]
Using formula one:
sin(3x)sin(5x)=21[cos(3x+5x)−cos(3x−5x)]
Using formula number four:
sin(3x)sin(5x)=21[cos(3x−5x)−cos(3x+5x)]
Match the expression (I, II) with its correct formula (i, ii, iii or iv).
1sin(2x)=11cos(2x)=
i cos2(x)−sin2(x) ii 2sinθcosθ
iii sin2θ−cos2θ iv −2cosθsinθ I
[Choose] II
[Choose]
3. At a seaport, the depth of the water, d , in meters, at time t hours, during a certain day is given by:
d=3.4sin(2π10.6(t−7.00))+2.8
[4 marks]
a) What is the depth of the water at 6:30pm ? (Answer to the nearest hundredths).
b) How long will the depth be above 4 metres during one full day of 24 hours?
Nrite the complex number in trigonometric form r(cosθ+isinθ), with θ in the interval [0∘,360∘).
−3+3i−3+3i=□□ (cos ∘+isin□∘ )
(Type the value for r as an exact answer, using radicals as needed. Type the value for θ as an integ nearest tenth as needed.)
Question 1 (1 point)
✓ Saved The graphs of the functions y=sinx and y=cosx have the same domain.
True
False Question 2 (1 point)
✓ Saved The graphs of the functions y=cotx and y=tanx have the same domain.
True
False Question 3 (1 point)
✓ Saved A solution to the trigonometric equation sinx+cosx=0 is x=0.
True
False
Question 4 (1 point)
The function y=−3sinx+1 has an amplitude of -3 .
True
False Question 5 (1 point)
The graph of the function y=sinπx has a period of 2 .
True
False Question 6 (1 point)
The trigonometric equation cos2x−sin2x=0 has the same solutions as the trigonometric equation cos2x=0.
True
False
Write the complex number in rectangular form.
12(cos150∘+isin150∘)12(cos150∘+isin150∘)=□
(Type your answer in the form a + bi. Type an exact answer, using radicals as needed.)
Question 49 (1 point)
Matthew is trying to figure out which value for x is NOT a solution for tanx=0. Do you have an answer? Choose one.
a) −3π
b) 0
c) 2π
d) 2π
Gina and Hone are on opposite sides of a tower. Gina is 20 m away with an angle of elevation of 53∘. Hone's angle is 37∘. Find Hone's distance from the tower.