SECT. 4.5 APPLICATIONS OFTRIGONOMETRY
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REVIEW: SOLVING
“Solving” means finding a value for the variable, so thatboth sides of an equation will be equal
There are several ways to solve a system of equations:
Algebraically:
Chapter 5 – Solving Trigonometric Solutions
Graphically:
Make Y1 equal to the trig. Function
Make Y2 equal to the value you want the trig. Function to beequal to
Then find the points of intersection(s)
Points where the graph intersect the x-coordinates are thesolutions
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SOLVING TRIGONOMETRIC FUNCTIONS WITH TI-83
Make the left side of the equation y1
Make the right side of the equation y2
Solve the system by findingthe points of intersection
Press:
2nd
TRACE
#5: Intersect
1st Curve?
ENTER
2nd Curve?
ENTER
Guess?
ENTER
Repeat this process untilyou find all the points ofintersection
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I) APPLICATIONS OF TRIGONOMETRIC FUNCTIONS IN THEREAL WORLD:
Mechanical Engineering
Circular or Periodic Motions
Bicycles, Ferris Wheels,
Simple Harmonic Motions (Springs)
Ecological Studies
Ocean Tides (High and Low tides)
Ocean Depths
Astronomy
Solar System, Hayley’s Comet
Physics
Waves: Sound waves, Electromagnetic waves
Light
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II) OCEAN TIDES
Earth's ocean surface will rise and fall periodically
High tide occurs when water level peaks
Low tide occurs when ocean levels is at it’s minimum
When water levels begin to change (Slack point/ Turning)
Caused by the gravitational pulls from the Moon and the Sunacting on the oceans (wikipedia)
As the moon rotates around the earth, different parts of themoon will generate different amounts of gravitatonal pull onthe ocean surface
Important for coastal navigation
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High tide at
Bay of Fundy
Low tide at
Bay of Fundy
High tide occurs at 3:30am
with ocean depths at 10.9m
Low tide occurs 8.5 hours laterwith ocean levels at 3.9m
Ocean levels will fluctuate
up and down over several hours
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Ex: If high tide (10.6m) occur at 3:30am andlow tide (3.9m) is 8.5 hours later, write anequation for the depth of the water at anytime, t hours.
Ex: If high tide (10.6m) occur at 3:30am and low tide(3.9m) is 8.5 hours later, write an equation for thedepth of the water at any time, t hours.
High Tide
Low Tide
High Tide
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III) FERRIS WHEEL PROBLEM:
A Ferris Wheel at a park has riders get on at the bottom of thewheel, which is 11m above the ground. The highest point of theride is 55m above ground. The ride takes 120s to complete onerevolution. Derive a formula in the form of :for the height of a rider.
x
y
0
20
40
60
80
100
120
20
40
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The height of the rider v.s. time creates a sinusoidal wave
To find the formula for the equation, use the graph to obtain theamplitude, period, vertical & horizontal shifts
x
y
0
20
40
60
80
100
120
20
40
No horizontal shift, the graph begins at t = 0.
However, there’s a vertical reflection. (UpsideDown Cosine Function) Graph begins at thebottom
Plug the values into the trigonometricfunction
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Q1: Find the height of the rider 30seconds after the ride begins:
Q2: Within 1 complete revolution, what is the total amount oftime a rider on the ferris wheel will spend above 40m?
x
y
0
20
40
60
80
100
120
20
40
Find the intersection pointsbetween the two functions
The time above 40m will be
the horizontal differencebetween the two points
The height of the riderafter 30s will be 33metersabove the ground
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IV) EARTH AND SUN IN THE SOLAR SYSTEM
The earth circulates in an elliptical orbit around the sun
Perogee (Perihelion) point in orbit where the earth-sundistance is at its minimum (early January - Winter)
Distance = 147.5 million km (2008)
Apogee (Aphelion) point in orbit where the earth-sundistance is at its maximum (early July - Summer)
Distance = 152.6 million km (2008)
Earth’s orbit is stabilizing, but changes slightly every year
Note: Seasons depend on earth’s axis of orbit, not on earth-sun distance
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Perihelion: distancebetween the earth andsun is shortest at this point
D = 147.5million km
Aphelion: Distance between the earth and sun is longest at this point.
D=152.6 million km
http://www.spaceweather.com/glossary/aphelion.html
Ex: In 2008, perihelion is on January 8 and aphelion is on July 4.Express the distance, d million km, from Earth to sun as asinusoidal function of the number of days of the year.
b) Use the function to find the earth/sun distance on Dec 2, 2008
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Perihelion
Aphelion
