Precalculus - Trig Functions Jeopardy Template

Degrees, Radians and DMS

Trig Functions of Acute Angles

Circular Functions

Graphs of Sine and Cosine

Problem Solving

100

Convert 3pi/7 to degrees. Round to the nearest hundredth of a degree.

77.1 degrees.

100

For an acute angle, A, in a right triangle, the ratio of the length of the opposite leg to the length of the hypotenuse.

sinA

100

Two angles are ___________ if they have the same initial side and terminal side, but have different measures.

Coterminal

100

A function that can be written in the form: f(x) = a sin(bx + c) + d

A sinusoid

100

To the nearest inch, find the perimeter of a 10-degree sector cut from a circular disc of radius 11 inches.

24 inches.

200

Convert 24 degrees into radians. Reduce your answer to the simplest fraction.

2pi/15

200

Find cosA and tanA if sinA = 5/13.

cosA = 12/13; tanA = 5/12.

200

Find one positive and one negative angle that are coterminal with -142 degrees.

+218 degrees; -502 degrees (other coterminal angles acceptable, also)

200

The period of the function f(X) = -2 sinX is pi. What does that mean?

The function will make one full rotation or cycle in pi units.

200

It takes ten identical pieces to form a circular track for a pair of toy racing cars. If the inside arc of each piece is 3.4 inches shorter than the outside arc, what is the width of the track? Hint: Pick arc lengths.

approximately 5.4 inches

300

Use the appropriate arc length formula to find the arc length if the radius is 5ft and the central angle measures 18 degrees.

pi/2 ft

300

WITHOUT using a calculator, evaluate sec(pi/3).

300

Find the six trig functions of angle A, whose terminal side contains the point (-8,15).

sinA = 15/17; cosA = -8/17; tanA = -15/8 cscA = 17/15; secA = -17/8; cotA = -8/15

300

The amplitude of the function f(x) = 1/2 cos X is 1/2. How does that affect the graph?

It vertically shrinks the curves by a factor of 1/2.

300

The concentric circles on an archery target are 5 inches apart. The inner circle (red) has a perimeter of 41.416 inches. What is the perimeter of the next-largest (yellow) circle?

approximately 72.83 inches.

400

Convert 118.32 from decimal form to DMS.

118 degrees, 19 mins, 12 sec

400

Find acute angle A in degrees AND radians, such that cotA = 1.

45 degrees; pi/4 radians

400

Find the 6 trig functions of 330 degrees.

sin(330) = -1/2; cos(330) = sqrt3/2; tan(330) = -1/sqrt3 csc(330) = -2; sec(330) = 2/sqrt3; tan(330) = -sqrt3

400

The frequency of the function f(x) = 4 sin(2x/3) is 1/(3pi). How many cycles are completed in 2pi units?

2/3; frequency is (2/3)/2pi = 1/(3pi)

400

Kirsten places her surveyor's telescope on the top of a tripod of 6 feet above the ground. She measures a 9 degree elevation above the horizontal to the top of a tree that is 125 feet away. How tall is the tree?

approximately 25.8 feet.

500

Convert 48 degrees, 30 mins, 36 sec from DMS to degrees.

48.51 degrees

500

A guy wire from the top of a transmission tower forms a 75 degree angle with the ground at a 55 ft distance from the base of the tower. How tall is the tower?

205.26 ft.

500

Find secA and cscA if cotA = -4/3 and cosA < 0

secA = -5/4; cscA = 5/3

500

List how f(X) = -2 sin(4X) + 1 transforms the graph of f(X) = sinX

a = -2, so the amplitude shifts from 1 to 2, stretching it vertically by a factor of 2, as well as reflecting across the x-axis. b = 4, so the period changes from 2pi to pi/2, shrinking it horizontally by a factor of 1/4. d = 1, so it shifts the entire graph vertically up 1 unit.

500

What would be a function to represent a Ferris wheel whose center is 45 feet off the ground and takes 40 seconds to make one full rotation?

f(x) = sin (Xpi/20) + 45