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Polar Graphing. Miss Hayley Summers. Start Lesson!. http://www.free-wallpapers-free.com. Action Buttons. Go back to the Previous Slide. Head “ Home ” to the Main Menu for other sections or the Quiz!. Go ahead to the Next Slide. Target Audience.
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Polar Graphing Miss Hayley Summers Start Lesson! http://www.free-wallpapers-free.com
Action Buttons Go back to the Previous Slide Head “Home” to the Main Menu for other sections or the Quiz! Go ahead to the Next Slide
Target Audience • High school students (9th or 10th graders) in Algebra II or Pre-calculus • Requires previous math knowledge (up to Algebra II) • Students generally interested in learning • Any socioeconomic level • Ability to complete assignment with study materials ActionButtons Learning Environment
Learning Environment • Access to a computer • Access to Internet, class notes, book, etc. • Quiet or noisy setting depending on learner’s preference • Work is individual • Lesson moves at learner’s own pace Target Audience Objectives
Objectives • Given a PowerPoint presentation of information and review and practice, students should: • Be able to recognize different types of graphs and draw graphs on polar coordinate planes in 100% accuracy on the quiz. • Be able to plot points and find the function to double check their work and receive100% accuracy on the quiz. • Be able to compare and contrast the different graphs in an “A” essay given Word processing. Learning Environment
Main Menu • Review • Modern • Use • History • Spirals • Circles • Limacons • Lemnis- • cates • Roses • Practice • Quiz http://www.conmishijos.com/dibujos/Iglu_1_g.gif
Review! Do you remember the Polar Coordinate System?? point radius Θ (polar angle) pole polar axis More Review
Review! • Circular grid based off a central fixed origin and ray • A point is graphed based on the length (r) from the origin and bond angle theta (θ) in relation to fixed ray • (r,θ) exists as coordinates and location of the point (r, θ) More Review Review
Review! • Symmetry (r, -θ) = (-r, -πθ) Sine: symmetric to vertical axis Cosine: symmetric to horizontal axis • Graphing on calculator! • **Only to be used in emergencies** • 1. 2nd FORMAT (ZOOM) • RectGCPolarGC • 2. MODE • FuncPol • 3. Y= • r1= (enter equation) Review History
History • Pythagoras: octave ratio 2:1, chord • Archimedes: spiral (r=a+bθ) • Hipparchus: Worked off Archimedes spiral and Pythagoras’ theorems to create a table of chord, to determine given length of a chord for each angle Modern Use Review
Modern Use • Calculus! (Differential and Integral) • Finding Arc length • Flight Navigation • Surveying • Physics • Spirals : Parker spiral of solar wind, Catherine’s wheel of fireworks History Spirals
Spirals • r= aθ • For smaller values a and b, the spiral is tighter. For larger values a and b, the spiral is wider. Modern Use Circles
Circles • r= asinθ or r= acosθ • r= diameter • Remember! • Sin: symmetric to y • Cos: symmetric to x r= 3sinθ Limacons Spirals
Limacons • For cosine: • Length left of y axis: a-b • Length right of y axis: a+b • r= a+bcosθ • a>2b: convex Limacon • a>b: Limaconw/ dimple • a=b: Cardioid (heart shape) • a<b: Limaconw/ loop 1 2 3 4 Lemnis-cates Circles
Lemniscates • r2= a2cos2θ • a= length of each loop • cosθ indicates symmetry around x-axis • sinθ indicates symmetry around y-axis Limacons Roses
Roses • r= asin (nθ) • a= length of petals • n= determines # of petals n=even 2n petals n=odd n petals • Cos: aligns on x-axis, or all axes when n is even • Sin: aligns on y-axis, or between axes when n is even r=cos4θ r= -4.5 sinθ Practice Lemniscates
PracticeProblems Here are 3 problems for you to try on your own! • Draw the polar coordinate graph (a picture is given on the next slide) on a piece of paper. • Analyze the different parts of the function and decide what each tells you about the graph. • Draw the graph! Proceed to Practice Problems! Roses
Practice- #1 • Graph r= 2cosθ Instructions S#1
Solution- #1 • Watch me work out Problem #1 here! • Please note this link will take you out of the presentation. After viewing the solution, please click back into the presentation and continue. P#2 P#1
Practice- #2 • Graph r= 2cos(3θ) S#2 S#1
Solution- #2 • Watch me work out Problem #2 here! • Please note this link will take you out of the presentation. After viewing the solution, please click back into the presentation and continue. P#3 P#2
Practice- #3 • Graph r= 2- 2sinθ S#3 S#2
Solution- #3 • Watch me work out Problem #3 here! • Please note this link will take you out of the presentation. After viewing the solution, please click back into the presentation and continue. QUIZ P#3
Quiz! Are you ready? Quiz Practice Go home at any time to review material! Warning! Returning Home during quiz will not save your place!
Quiz- #1 • What is the polar graph of r= 2cosθ? Circle of radius _____ centered at _____. A 2, x axis 1, y axis 4, x axis 2, y axis B C D
Quiz- #1 Try Again! • What does cos(θ) indicate? • What does the value “a” represent in the equation r= a cosθ? Try Again! or Review Material! or Go Home!
Quiz- #1 Correct! The answer is A: • Cos (θ) indicates the equation lies on the x axis • A= length (diameter)= 2 Next Question!
Quiz- #2 • What is correct about the number of petals on a rose? A n petals if n is even, 2n if n is odd 2n petals if n is even, n if n is odd 2n petals if n is even, 4n if n is odd 4n petals if n is even, n if n is odd B C D
Quiz- #2 Try Again! • A rose has the equation r= acos(nθ). • What occurs in the graph when n is even or odd? Try Again! or Review Material! or Go Home!
Quiz- #2 Correct! The answer is B: • A rose has n petals if n is odd and 2n petals if n is even! Next Question!
Quiz- #3 • What is the polar graph of r= 2-sinθ ? A B C D
Quiz- #3 Try Again! • Does the negative sign effect the graph in any way? • Where does θ=0? Try Again! or Review Material! or Go Home!
Quiz- #3 Correct! The answer is D: • Because sinθ has a negative sign, the graph points down. • The graph intersects the x axis at 3. Next Question!
Quiz- #4 • Which Greek philosopher developed the table of chord? A Archimedes Donatello Hipparchus Socrates B C D
Quiz- #4 Try Again! • Think back to the people discussed in the History section. • Hint: He’s not a ninja turtle! Try Again! or Review Material! or Go Home!
Quiz- #4 Correct! The answer is C: • Hipparchus discovered the table of chord! • Archimedes discovered the spiral • Socrates was a Greek philosopher. • Donatello was an Italian artist and sculptor (also a ninja turtle!) Next Question!
Quiz- #5 • What shape does the graph r= 6-4cosθ make? A Lemniscate Limacon with loop Cardioid Limacon with dimple B C D
Quiz- #5 Try Again! • Limacons have the equation r= a-bcosθ. • What is the relationship between a and b? Try Again! or Review Material! or Go Home!
Quiz- #5 Correct! The answer is D: • a>b, in the equation r= a-bcosθ so the limacon has a dimple! Next Question!
Quiz- #6 • What is the graph of r=3sin4θ? A B C D
Quiz- #6 Try Again! • In a rose equation r= asin(nθ), what does the value “a” represent? “n”? • How does sinθ affect the graph? Try Again! or Review Material! or Go Home!
Quiz- #6 Correct! The answer is B: • In the rose equation r=asin(nθ), • a=3, the length of the petals • n=4, which is even, so there are 2n or 8 petals total • Sinθ gives symmetry to the y-axis Next Question!
Quiz- #7 • What does the equation r2= a2sin2θ represent? A Circle Limacon Rose Lemniscate B C D
Quiz- #7 Try Again! • Which graph has an r2 value in its general equation? Try Again! or Review Material! or Go Home!
Quiz- #7 Correct! The answer is D: • Lemniscates are the only polar graphs with an r2 value in their general equation! Next Question!
Quiz- #8 • Which is NOT a way polar graphing is used today? A Differential/ Integral Calculus Physics and Arc Length Flight and Navigation All of the above are uses of polar graphing. B C D
Quiz- #8 Try Again! • Remember polar graphing has many uses! Try Again! or Review Material! or Go Home!
Quiz- #8 Correct! The answer is D: • Polar graphing has many real world applications, and that is why we are taking the time to learn it! Next Question!
Quiz- #9 • In a general spiral equation r=aθ, a spiral is tighter for _______ “a” values and wider for ______ “a” values? A larger, smaller even, odd smaller, larger odd, even B C D
Quiz- #9 Try Again! • It is the size of the number “a” that shrinks or widens the spiral. Try Again! or Review Material! or Go Home!
