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Trigonometric
Identities
Vectors
Oblique
Triangles
Polar Graphs,
Coordinates, and
Planes
Application
Examples
100

Use the sum and difference formulas for sine to solve, sin(135-120)

Simplify to Sq6-Sq2/4.

100

Find the x and y components of a vector at an angle of 60 degrees from the point of origin and a magnitude of 8.

<4, 4Sq3>

100

Using Heron’s formula = a+b+c/2 determine the area of a triangle where the sides are 6, 8, and 12.

Area = 13

100

What of the polar coordinates below reference the same point (6, pi/6):

A. (-6, -pi/6)    B. (-6, -5pi/6)

C. (6, -11pi/6)    D. (-6, 11pi/6)

B and C

100

What is the simplified version of 2(1-sin2(x))-1?

Cos(2x)

200

Verify the identity, cot x * sec x * sin x=1

Simplify to, (cos x/ sin x) * (1/ cos x) * sin x=1

200

Find the magnitude and direction of the vector, v=6i-6j

Magnitude is 6Sq2

Direction= -45 degrees

200

Find the area of a triangle when given two sides and one angle, <C= 24, a=21, b=16

Area= 68.33

200

Convert these cartesian coordinates rounded to two decimals: (6, pi/6)

(5.20,3)

200

Determine the magnitude and direction of a vector with an initial point P (2,13) and a terminal point Q (-4,9)

Magnitude: 2Sq13

Direction: tan^-1(-4,-6)=tan^-1(2/3)

300

Given theta= -3/4 and is in Quadrant 2, determine tan(2Theta) 

-24/7

300

If a+b then find the magnitude.

a= <2,-3,5>

b= <-2,6,-1>

Magnitude = 5

300

Use the law of sines to solve the triangle with <A=24, a=8.5, and c=10.6.

<C=30.5, <B=125.5, b=17

300

What are these cartesian coordinates converted to polar coordinates rounded to one decimal, (7, 60°)

(3.5, 6.1)

300

A pendulum swings one complete swing every 5 seconds at a maximum angle of 14 degrees. Determine an equation of the angle as a function of time (t).

Theta(t)= 14sin (2pi/5 t)

400

Use Pythagorean identities to verify csc x/ sin x - cot x/ tan x

Simplify to sin^2(x)/sin^2(x) =1

400

Sketch the graph f(x)= 1/x-2 an state any asymptote.

X=2, y=0

400

Determine the amount of triangles possible with the angle A= 20 and sides a=7 and b=10

There are two solutions and two triangles.

400

Find the equation for the polar graph

R= 1+1cos(theta)

400

Determine the solutions on the interval [0, 2pi) for 2sin(2x)-1=0

Pi/12, 5pi/12, 13pi/12, 17pi/12

500

Find all solutions to the trigonometric equation, cos theta = 1/2

Theta= pi/3 +/- 2kpi and Theta= 5pi/3 +/- 2kpi

500

Find U + V and U - V, if U=<3,4> and V=<5,-1>

U+V= <8,3>

U-V= <-2,5>

500

Use the law of sines and the law of cosines to solve the triangle given the following, <C=98, a=8, b=5.

c= 10

<A= 54.2

<B=29.6

500

Find the equation based on the polar graph.

r= 6 cos(2theta)

500

Determine the solutions on the interval [0, 2pi) given sin^2(x)-5sin(x)-6=0

3pi/2