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Precalculus PreAP/Dual, Revised Β©2016 10.6: Parametric Functions
Section 10.4 Precalculus PreAP/Dual, Revised Β©2016 2/23/2019 9:11 PM 10.6: Parametric Functions
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10.6: Parametric Functions
Definitions Rectangular Equation involves π (horizontal distance) and π (vertical distance) Third variable, π, is written as time or known as the parameter. A PLANE CURVE is whereas π and π are continuous functions on t on an interval and the set of ordered pairs. 2/23/2019 9:11 PM 10.6: Parametric Functions
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10.6: Parametric Functions
Parametric Curves Basic graphing with direction to them Describing curves in a plane that are not necessarily functions Objects that move all around in 2 dimensions When eliminating a parameter, it will look like, at least, a portion of a rectangular equation just have to take into account the domain Parametric curves have aΒ direction of motion.Β The direction of motion is given by increasingΒ π. 2/23/2019 9:11 PM 10.6: Parametric Functions
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10.6: Parametric Functions
Visual Example Example of π=β π π ππ +π 2/23/2019 9:11 PM 10.6: Parametric Functions
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Parametric Applications of Projectile Simulation
Suppose two bugs are crawling along linear paths. Bug 1 begins a trek towards a point of 70 inches from where he begins, traveling at a speed of 12 inches per hour. Bug 2 travels at a speed of 18 inches per hour but leaves 1 hour after the other buy from a similar starting position on a parallel path. Note: distance = rate β’ time (π«=πΉβ’π») Given that π» represents Bug 1βs travel time, what formulas represent the distance for each buy travels over time? Distance Bug 1 = ___________ (Rate) β’ ___________ (Time) Distance Bug 2 = ___________ (Rate) β’ ___________ (Time) Question: Which bug do you think will win the race? Why? 2/23/2019 9:11 PM 10.6: Parametric Functions
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Graphing Calculator Simulation
Suppose two bugs are crawling along linear paths. Bug 1 begins a trek towards a point of 70 inches from where he begins, traveling at a speed of 12 inches per hour. Bug 2 travels at a speed of 18 inches per hour but leaves 1 hour after the other buy from a similar starting position on a parallel path. Note: distance = rate β’ time (π«=πΉβ’π») 2/23/2019 9:11 PM 10.6: Parametric Functions
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Graphing Calculator Simulation
Suppose two bugs are crawling along linear paths. Bug 1 begins a trek towards a point of 70 inches from where he begins, traveling at a speed of 12 inches per hour. Bug 2 travels at a speed of 18 inches per hour but leaves 1 hour after the other buy from a similar starting position on a parallel path. Note: distance = rate β’ time (π«=πΉβ’π») Letβs watch the race. Which bug wins the race? 2/23/2019 9:11 PM 10.6: Parametric Functions
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Graphing Calculator Simulation
Suppose two bugs are crawling along linear paths. Bug 1 begins a trek towards a point of 70 inches from where he begins, traveling at a speed of 12 inches per hour. Bug 2 travels at a speed of 18 inches per hour but leaves 1 hour after the other buy from a similar starting position on a parallel path. Note: distance = rate β’ time (π«=πΉβ’π») Question: At what time are the buys the same distance from the starting points along from their paths? In other words, when are the bugs alongside each other? 2/23/2019 9:11 PM 10.6: Parametric Functions
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10.6: Parametric Functions
Steps Make a table of values, setting π, π, and π Identify the Parametric equations and/or inequality Plot points by creating a π»-CHART Plug in π to get the π and π-coordinates Draw arrows and follow the direction where time follows. 2/23/2019 9:11 PM 10.6: Parametric Functions
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10.6: Parametric Functions
Example 1 Graph the curve given by π=πβππ π=πβπ from βπβ€πβ€π π π π βπ βπ βπ π π π π π π π βπ βπ π π π π π π 2/23/2019 9:11 PM 10.6: Parametric Functions
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10.6: Parametric Functions
Example 1 (Calc.) Graph the curve given by π=πβππ π=πβπ from βπβ€πβ€π 2/23/2019 9:11 PM 10.6: Parametric Functions
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10.6: Parametric Functions
Example 2 Graph the curve given by π=πβπ π= π π +ππ from βπβ€πβ€π π π π βπ βπ βπ π π π βπ βπ βπ βπ βπ π π βπ π ππ 2/23/2019 9:11 PM 10.6: Parametric Functions
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10.6: Parametric Functions
Example 2 Graph the curve given by π=πβπ π= π π +ππ from βπβ€πβ€π π π π βπ βπ βπ π π π βπ βπ βπ βπ βπ π π βπ π ππ 2/23/2019 9:11 PM 10.6: Parametric Functions
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10.6: Parametric Functions
Your Turn Graph the curve given by π=ππ+π π= π π βπ from βπ, π π π π βπ βπ π π π π βπ π βπ βπ π π π π 2/23/2019 9:11 PM 10.6: Parametric Functions
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Eliminate the Parameter
Identify the Parametric Equation Solve for π in one equation Substitute in other equation Convert to Rectangular equation or π = Choose smart points Involving trig functions include two equations π¬π’π§ π π½ + ππ¨π¬ π π½ =π π¬ππ π π½ β πππ§ π π½ =π 2/23/2019 9:11 PM 10.6: Parametric Functions
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10.6: Parametric Functions
In Generalβ¦ If only π is involved, it is a line If π π is involved, it is a parabola If ππ¨π¬ π½ or π¬π’π§ π½ in involved, it is a circle or an ellipse 2/23/2019 9:11 PM 10.6: Parametric Functions
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10.6: Parametric Functions
Example 3 Determine the rectangular equation of π= π πβππ π=πβπ 2/23/2019 9:11 PM 10.6: Parametric Functions
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10.6: Parametric Functions
Example 4 Determine the rectangular equation and graph the curve given by π= π π+π π= π π+π 2/23/2019 9:11 PM 10.6: Parametric Functions
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10.6: Parametric Functions
Example 4 Determine the rectangular equation and graph the curve given by π= π π+π π= π π+π π π π β1 3 βπ π π Und. π π/π Und. π π/π 2/23/2019 9:11 PM 10.6: Parametric Functions
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10.6: Parametric Functions
Your Turn Determine the rectangular equation and graph the curve given by π= π π +π π= π π βπ from [βπ,π] π π π βπ βπ π π π βπ π π π π βπ ππ 2/23/2019 9:11 PM 10.6: Parametric Functions
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10.6: Parametric Functions
Example 5 Determine the rectangular equation and graph the curve given by π=π ππ¨π¬ π½ π=π π¬π’π§ π½ at π, ππ
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10.6: Parametric Functions
Example 5 Determine the rectangular equation and graph the curve given by π=π ππ¨π¬ π½ π=π π¬π’π§ π½ at π, ππ
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10.6: Parametric Functions
Example 5 Determine the rectangular equation and graph the curve given by π=π ππ¨π¬ π½ π=π π¬π’π§ π½ at π, ππ
π½ π π π ο°/π ο° πο°/π πο° π π βπ π π βπ 2/23/2019 9:11 PM 10.6: Parametric Functions
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10.6: Parametric Functions
Example 6 Determine the rectangular equation and graph the curve given by π=π+πππ¨π¬π π=βπ+ππ¬π’π§π at π, ππ
π π π π ο°/π ο° πο°/π πο° π π π βπ π βπ 2/23/2019 9:11 PM 10.6: Parametric Functions
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10.6: Parametric Functions
Your Turn Determine the rectangular equation and graph the curve given by π=π ππ¨π¬ π½ π=π π¬π’π§ π½ at π, ππ
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10.6: Parametric Functions
Projectile Motion Newtonβs laws and advanced mathematics can be used to determine the path of a projectile. π½ π is the initial speed of the projectile at an angle π½ with the horizontal and π¨ π is the initial altitude of the projectile Equations π= π½ π ππ¨π¬ π½ π π=βπ.π π π + π½ π π¬π’π§ π½ π+ π¨ π (meters/sec) π=βππ π π + π½ π π¬π’π§ π½ π+ π¨ π (feet/sec) 2/23/2019 9:11 PM 10.6: Parametric Functions
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10.6: Parametric Functions
Example 7 In a pumpkin tossing contest in Morton, Illinois, a contestant won the catapult competition by using two telephone poles, huge rubber bands, and a power winch. Suppose the pumpkin was launched with an initial speed of 125 feet per second, at an angle of 45Β°, and from an initial height of 25 feet. Write a set of parametric equations for the motion of the pumpkin. Use the equations to find how far the pumpkin traveled. 2/23/2019 9:11 PM 10.6: Parametric Functions
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10.6: Parametric Functions
Example 7a In a pumpkin tossing contest in Morton, Illinois, a contestant won the catapult competition by using two telephone poles, huge rubber bands, and a power winch. Suppose the pumpkin was launched with an initial speed of 125 feet per second, at an angle of 45Β°, and from an initial height of 25 feet. Write a set of parametric equations for the motion of the pumpkin. 2/23/2019 9:11 PM 10.6: Parametric Functions
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10.6: Parametric Functions
Example 7b In a pumpkin tossing contest in Morton, Illinois, a contestant won the catapult competition by using two telephone poles, huge rubber bands, and a power winch. Suppose the pumpkin was launched with an initial speed of 125 feet per second, at an angle of 45Β°, and from an initial height of 25 feet. B. Use the equations to find how far the pumpkin traveled. 2/23/2019 9:11 PM 10.6: Parametric Functions
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10.6: Parametric Functions
Your Turn Suppose that Joe hit a golf ball with an initial velocity of 150 feet per second at an angle of 30 degrees to the horizontal. (a) Find parametric equations that describe the position of the ball as a function of time. (b) How long is the golf ball in the air? (c) Determine the distance that the ball traveled. 2/23/2019 9:11 PM 10.6: Parametric Functions
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10.6: Parametric Functions
Your Turn Suppose that Joe hit a golf ball with an initial velocity of 150 feet per second at an angle of 30 degrees to the horizontal. (a) Find parametric equations that describe the position of the ball as a function of time. 2/23/2019 9:11 PM 10.6: Parametric Functions
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10.6: Parametric Functions
Your Turn Suppose that Joe hit a golf ball with an initial velocity of 150 feet per second at an angle of 30 degrees to the horizontal. (b) How long is the golf ball in the air? 2/23/2019 9:11 PM 10.6: Parametric Functions
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10.6: Parametric Functions
Your Turn Suppose that Joe hit a golf ball with an initial velocity of 150 feet per second at an angle of 30 degrees to the horizontal. (c) Determine the distance that the ball traveled. 2/23/2019 9:11 PM 10.6: Parametric Functions
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10.6: Parametric Functions
Assignment Worksheet 2/23/2019 9:11 PM 10.6: Parametric Functions
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