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Laabri

Practice Test

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Last updated about 1 year ago
16 Nsɛmmisa
Right Triangle Trigonometry (Day 1)
1
1
1
1
Special Right Triangle (Day 1)
1
1
1
1
Radians/Degrees Coterminal and Reference Angles (Day 2)
1
1
1
1
Arc Length/Area of a Sector (Day 2)
1
1
1
1
Asemmisa {{asɛmmisaAhyɛnsode}}
1.

(Level 1) Given the diagram, write the six trig ratios

\sin(\alpha)=

\cos(\alpha)=

\tan(\alpha)=

\csc(\alpha)=

\sec(\alpha)=

\cot(\alpha)=

Asemmisa {{asɛmmisaAhyɛnsode}}
2.

(Level 2) Solve for the value of x for each diagram

x=

x=

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3.

(Level 3) A student lets out 200 feet of string on a kite from a hand height of 5 feet. The angle between horizontal hand height and the kite is 35º. Find the height of the kite above the ground, to the nearest foot.

Asemmisa {{asɛmmisaAhyɛnsode}}
4.

(Level 4) You stand in front of the flagpole at Alisal HS. Your best friend stands 10 ft. behind you and looks up at the top of the same flagpole with an angle of elevation of 54⁰. The distance from your best friend’s eyes to the top of the flagpole is 29.4 feet. How far away are you standing from the base of the flagpole? Round your answer to the nearest tenth.

Asemmisa {{asɛmmisaAhyɛnsode}}
5.

(Level 1) Solve for a,b,c and d. You must leave your answer in radical form to receive credit

a=

b=

c=

d=

Asemmisa {{asɛmmisaAhyɛnsode}}
6.

(Level 2) Solve for a,b,c and d. You must leave your answer in radical form to receive credit

a=

b=

c=

d=

Asemmisa {{asɛmmisaAhyɛnsode}}
7.

(Level 3) In the complex triangle below the \csc(\theta)=2. Find cos(𝛼), leave your answer in simplest form

\cos(\alpha)=

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8.

(Level 4) Find all of the missing sides and angles of the complex triangle.

KN=

LN=

NM=

LM=

∢K=

∢NLM=

∢LNM=

Asemmisa {{asɛmmisaAhyɛnsode}}
9.

(Level 1) Convert the following into degrees

\frac{\pi}{4}=

\frac{7\pi}{3}=

Convert the following into radians

30\degree=

125\degree=

Asemmisa {{asɛmmisaAhyɛnsode}}
10.

(level 2) Solve for two conterminal angles for \frac{\pi}{6} , one positive and one negative. CHANGE YOUR ANSWER TO DEGREES

Positive angle =

Negative angle=

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11.

Solve for the reference angle of \frac{11\pi}{6} , your answer must be in degrees.

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12.

(Level 4) A Ferris wheel has a diameter of 50 ft. You start at the bottom and travel 80 degrees before it stops. How much of the Ferris wheel did you travel before you stopped. Round to the nearest foot

Asemmisa {{asɛmmisaAhyɛnsode}}
13.

Solve for the arc length and area of the sector

Arc Length:

Area of Sector:

Asemmisa {{asɛmmisaAhyɛnsode}}
14.

Solve for the arc length and area of the sector

Arc Length:

Area of Sector:

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15.

(Level 3) Solve for the area of the shaded region

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16.

(Level 4) A contractor was hired to build a pool and needs to put tile on the outer edge. The shaded region represents the pool. He measures everything in feet.

How much area does the pool take up?

How many feet of tile does he need to complete the perimeter of the pool?