Trigonometry Final Review - Pensacola State - Bloxom - Summer 2016 - D Term

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6 miles Q29-E1

A boat sails for 2 hours at 30mph in a direction 95°58'. How far south has it sailed to the nearest mile?

sinθ = 8sqrt89/89 cosθ = -5sqrt89/89 tanθ = -8/5 Q11-E1

An equation of the terminal side of an angle in standard position is given along with a restriction on x. Find the sine, cosine, and tangent of the angle. 8x + 5y = 0, x< or = 0;

Method 1 = 135° Method 2 = S 45° E Q26-E1

An observer for a radar station is located at the origin of a coordinate system. For the point given, find the bearing of an airplane located at that point. Express the bearing using both method (3,-3)

A=60°44' C=80°28' c=44.5 2nd Triangle A₂=119°16' C₂=21°56' notes

Complete the triangle B=38°48' a=39.4 b=28.3

0 Q10-E1

Evaluate the expression. cot 270

1 Q19-E1

Evaluate. sin2 45°+ cos2 45

35/4 Q18-E1

Evaluate. Show all Work. 3tan²60 + 3sin²30 - 3cos²360

0 Q14-E1

Evaluate. the expression. sin(-540)

r=8 / r^3=2 k=0 == 20 / 2(cos20+isin20) k=1 == 140 / 2(cos140+isin140) k=2 == 260 / 2(cos260+isin260) notes

Find 3 distinct cube roots 4+4sqrt3i

r=8 / r^3=2 k=0 == 40 / 2(cos40+isin40) k=1 == 160 2(cos160+isin160) k=2 ==280 / 2(cos280+isin280) notes

Find 3 distinct cube roots 8cis120

r=1 / r^3=1 θ=0 / 1(cos0+isin0) θ=120° / 1(cos120+isin120) θ=240° / 1(cos240+isin240) notes

Find 3 distinct cube roots x=1 y=0

r=32 / r^3=4 k=0 == 22.5 / 4(cos22.5+isin22.5) k=1 == 112.5 / 4(cos112.5+isin112.5) k=2 == 202.5 / 4(cos202.5+isin202.5) k=3 == 292.5 / 4(cos292.5+isin292.5) notes

Find 4 distinct cube roots 32i

C =90° notes

Find C a=sqrt5 c=2sqrt5 A=30°

β = 18° Q17-E1

Find a solution for the equation. Assume that all angles are acute angles. Show all work. sin(2β + 10°) = cos(β - 10°)

60° and 300° Q20-E1

Find all values of 8, if 8 is in the interval [0,360°)and has the given function value. 1 cosθ = 1/2

317° Q3-E1

Find the angle of least positive measure coterminal with the given angle. 1397°

52° 38° Q2-E1

Find the measure of each angle in the problem. Show all work below. Complementary angles with measures 4x and 5x - 27degrees

77° 103° Q1-E1

Find the measure of each angle in the problem. Show all work below. Supplementary angles with measures 2x +7 and 3x - 2 degrees

72° Q9-E1

Find the reference angle for the given angle. 108°

Quadrant III Q13-E1

Identify the quadrant for the angle a satisfying the following conditions. tanθ >O and sinθ <0

Negative Q15-E1

If r is a positive number and the point (x, y) is in the indicated quadrant, decide whether the given ratio is positive or negative. II, x/y

MODE -> DEGREES -> POLAR -> WINDOW -> ... -> 2nd -> TBLSET ... -> Y= cos(2θ) -> GRAPH notes

Show in calculator 2x+y=5

MODE -> DEGREES -> POLAR -> WINDOW -> ... -> 2nd -> TBLSET ... -> Y= r₁=sqrt(4sin2θ) , r₁= -sqrt(4sin2θ) -> GRAPH notes

Show in calculator r²=4sin2θ

sinθ = -2sqrt5/5 cosθ = sqrt5/5 tanθ = -2 Q8-E1

Sketch an angle θ in standard position such that θ has the least positive measure and the given point is on the terminal side of θ. Then state the sine, cosine, and tangent of the angle. (3,-6)

136km Q27-E1

Solve the problem. A ship travels 58 km on a bearing of 21°, and then travels on a bearing of 111° for 123 km. Find the distance from the starting point to the end of the trip, to the nearest kilometer.

263ft or 246ft Q25-E1

Solve the problem. From a balloon 834 feet high, the angle of depression to the ranger headquarters is 72°28'.How far is the heaMers from a point on the ground directly below the balloon (to the nearest foot)? Show all work.

717 ft Q24-E1

Solve the problem. From a boat on the lake, the angle of elevation to the top of a cliffis 30°59'. If the base of the cliff is 1194feet from the boat, how high is the cliff(to the nearest foot)? Show all work.

70 lbs Q21-E1

Solve the problem. 21) The grade resistance Fof a car traveling up or down a hill is modeled by the equation F = W sin 8, where W is the weight of the car and 8 is the angle of the hill's grade (8 >0for uphill travel, 8 <0 for downhill travel). What is the grade resistance (to the nearest pound) of a 2000-lb car traveling uphill on a 20 grade (θ = 2°)

197.7 Q7-E1

Solve the problem. Round answers to the nearest tenth if necessary. A triangle drawn on a map has sides of lengths 7em, 11em, and 15em. The shortest of the corresponding real-life distances is 92 km. Find the longest of the real-life distances.

-3sqrt7/7 Q12-E1

Use the fundamental identities to find the value of the trigonometric function. Show all work. Find tan θ, given that sinθ = 3/4, and θ is in quadrant II.

(4,210) (4,570) (-4,390) (-2sqrt3,-2) notes

Write 2 other equivalent rectangular coordinates then give the coordinates on a polar graph (-4,30)

(3,480) (-3,300) (-3/2,(3sqrt3)/2 notes

Write 2 other equivalent rectangular coordinates then give the coordinates on a polar graph (3,120°)

r=sqrt2 θ=45 (sqrt2,45) (-sqrt2,225) (sqrt2,405) notes

for the given rectangular coordinates, plot the point and give 2 rectangular polar points (1,1)

r=sqrt3 θ=60 (sqrt3,60) (sqrt3,420) (-sqrt3,240) notes

for the given rectangular coordinates, plot the point and give 2 rectangular polar points (sqrt3/2,3/2)

r=2sqrt2 θ=45 1024-1024i notes

write the product in rectangular form (2+2i)⁷

5+5sqrt3i notes

write the product in rectangular form (2cis300)(5cis120)

(3sqrt3)/2 *i notes

write the product in rectangular form (9cis65)/(3cis305)

r=2 θ=30 -16sqrt3 + 16i notes

write the product in rectangular form (sqrt3+i)⁵

-3i notes

write the product in rectangular form (sqrt3cis45)(sqrt3cis225)

sqrt3+i notes

write the product in rectangular form 2(cos120+isin120)

-sqrt3+3i notes

write the product in rectangular form [3(cos60 + isin60)]

64i notes

write the product in rectangular form [4(cos30 + isin30)]


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