2. Conic Sections ©Mathworld

3. Circle ©National Science Foundation

4. Circle The Standard Form of a circle with a center at (0,0) and a radius, r, is…….. center (0,0) radius = 2 Copyright ©1999-2004 Oswego City School District Regents Exam Prep Center

5. Circles The Standard Form of a circle with a center at (h,k) and a radius, r, is…….. center (3,3) radius = 2 Copyright ©1999-2004 Oswego City School District Regents Exam Prep Center

6. Parabolas © Art Mayoff © Long Island Fountain Company

7. What’s in a Parabola A parabola is the set of all points in a plane such that each point in the set is equidistant from a line called the directrix and a fixed point called the focus. Copyright © 1997-2004, Math Academy Online™ / Platonic Realms™.

8. Why is the focus so important? © Jill Britton, September 25, 2003

9. Parabola The Standard Form of a Parabola that opens to the right and has a vertex at (0,0) is…… ©1999 Addison Wesley Longman, Inc.

10. Parabola The Parabola that opens to the right and has a vertex at (0,0) has the following characteristics…… p is the distance from the vertex of the parabola to the focus or directrix This makes the coordinates of the focus (p,0) This makes the equation of the directrix x = -p The makes the axis of symmetry the x-axis (y = 0)

11. Parabola The Standard Form of a Parabola that opens to the left and has a vertex at (0,0) is…… © Shelly Walsh

12. Parabola The Parabola that opens to the left and has a vertex at (0,0) has the following characteristics…… p is the distance from the vertex of the parabola to the focus or directrix This makes the coordinates of the focus(-p,0) This makes the equation of the directrix x = p The makes the axis of symmetry the x-axis (y = 0)

13. Parabola The Standard Form of a Parabola that opens up and has a vertex at (0,0) is…… ©1999-2003 SparkNotes LLC, All Rights Reserved

14. Parabola The Parabola that opens up and has a vertex at (0,0) has the following characteristics…… p is the distance from the vertex of the parabola to the focus or directrix This makes the coordinates of the focus (0,p) This makes the equation of the directrix y = -p This makes the axis of symmetry the y-axis (x = 0)

15. Parabola The Standard Form of a Parabola that opens down and has a vertex at (0,0) is…… ©1999 Addison Wesley Longman, Inc.

16. Parabola The Parabola that opens down and has a vertex at (0,0) has the following characteristics…… p is the distance from the vertex of the parabola to the focus or directrix This makes the coordinates of the focus (0,-p) This makes the equation of the directrix y = p This makes the axis of symmetry the y-axis (x = 0)

17. Parabola The Standard Form of a Parabola that opens to the right and has a vertex at (h,k) is…… © Shelly Walsh

18. Parabola The Parabola that opens to the right and has a vertex at (h,k) has the following characteristics…….. p is the distance from the vertex of the parabola to the focus or directrix This makes the coordinates of the focus (h+p, k) This makes the equation of the directrix x = h – p This makes the axis of symmetry

19. Parabola The Standard Form of a Parabola that opens to the left and has a vertex at (h,k) is…… ©June Jones, University of Georgia

20. Parabola The Parabola that opens to the left and has a vertex at (h,k) has the following characteristics…… p is the distance from the vertex of the parabola to the focus or directrix This makes the coordinates of the focus (h – p, k) This makes the equation of the directrix x = h + p The makes the axis of symmetry

21. Parabola The Standard Form of a Parabola that opens up and has a vertex at (h,k) is…… Copyright ©1999-2004 Oswego City School District Regents Exam Prep Center

22. Parabola The Parabola that opens up and has a vertex at (h,k) has the following characteristics…… p is the distance from the vertex of the parabola to the focus or directrix This makes the coordinates of the focus (h, k + p) This makes the equation of the directrix y = k – p The makes the axis of symmetry

23. Parabola The Standard Form of a Parabola that opens down and has a vertex at (h,k) is…… Copyright ©1999-2004 Oswego City School District Regents Exam Prep Center

24. Parabola The Parabola that opens down and has a vertex at (h,k) has the following characteristics…… p is the distance from the vertex of the parabola to the focus or directrix This makes the coordinates of the focus (h, k - p) This makes the equation of the directrix y = k + p This makes the axis of symmetry

25. Ellipse © Jill Britton, September 25, 2003 Statuary Hall in the U.S. Capital building is elliptic. It was in this room that John Quincy Adams, while a member of the House of Representatives, discovered this acoustical phenomenon. He situated his desk at a focal point of the elliptical ceiling, easily eavesdropping on the private conversations of other House members located near the other focal point.

26. What is in an Ellipse? The set of all points in the plane, the sum of whose distances from two fixed points, called the foci, is a constant. (“Foci” is the plural of “focus”, and is pronounced FOH-sigh.) Copyright © 1997-2004, Math Academy Online™ / Platonic Realms™.

27. Why are the foci of the ellipse important? The ellipse has an important property that is used in the reflection of light and sound waves. Any light or signal that starts at one focus will be reflected to the other focus. This principle is used in lithotripsy, a medical procedure for treating kidney stones. The patient is placed in a elliptical tank of water, with the kidney stone at one focus. High-energy shock waves generated at the other focus are concentrated on the stone, pulverizing it.

28. Why are the foci of the ellipse important? St. Paul's Cathedral in London. If a person whispers near one focus, he can be heard at the other focus, although he cannot be heard at many places in between. © 1994-2004 Kevin Matthews and Artifice, Inc. All Rights Reserved.Artifice, Inc.

29. Ellipse General Rules –x and y are both squared –Equation always equals(=) 1 –Equation is always plus(+) –a 2 is always the biggest denominator –c 2 = a 2 – b 2 –c is the distance from the center to each foci on the major axis –The center is in the middle of the 2 vertices, the 2 covertices, and the 2 foci.

30. Ellipse General Rules –a is the distance from the center to each vertex on the major axis –b is the distance from the center to each vertex on the minor axis (co-vertices) –Major axis has a length of 2a –Minor axis has a length of 2b –Eccentricity(e): e = c/a (The closer e gets to 1, the closer it is to being circular)

31. Ellipse The standard form of the ellipse with a center at (0,0) and a horizontal axis is……

32. Ellipse The ellipse with a center at (0,0) and a horizontal axis has the following characteristics…… Vertices ( a,0) Co-Vertices (0, b) Foci ( c,0) © Cabalbag, Porter, Chadwick, and Liefting

33. Ellipse The standard form of the ellipse with a center at (0,0) and a vertical axis is……

34. Ellipse The ellipse with a center at (0,0) and a vertical axis has the following characteristics…… Vertices (0, a) Co-Vertices ( b,0) Foci (0, c) © Cabalbag, Porter, Chadwick, and Liefting

35. Ellipse The standard form of the ellipse with a center at (h,k) and a horizontal axis is……

36. Ellipse The ellipse with a center at (h,k) and a horizontal axis has the following characteristics…… Vertices (h a, k) Co-Vertices (h, k b) Foci (h c, k) ©Sellers, James

37. Ellipse The standard form of the ellipse with a center at (h,k) and a vertical axis is……

38. Ellipse The ellipse with a center at (h,k) and a vertical axis has the following characteristics…… Vertices (h, k a) Co-Vertices (h b, k) Foci (h, k c) © Joan Bookbinder 1998 -2000

39. Hyperbola The huge chimney of a nuclear power plant has the shape of a hyperboloid, as does the architecture of the James S. McDonnell Planetarium of the St. Louis Science Center. © Jill Britton, September 25, 2003

40. What is a Hyperbola? The set of all points in the plane, the difference of whose distances from two fixed points, called the foci, remains constant. Copyright © 1997-2004, Math Academy Online™ / Platonic Realms™.

41. Where are the Hyperbolas? A sonic boom shock wave has the shape of a cone, and it intersects the ground in part of a hyperbola. It hits every point on this curve at the same time, so that people in different places along the curve on the ground hear it at the same time. Because the airplane is moving forward, the hyperbolic curve moves forward and eventually the boom can be heard by everyone in its path. © Jill Britton, September 25, 2003

42. Hyperbola General Rules –x and y are both squared –Equation always equals(=) 1 –Equation is always minus(-) –a 2 is always the first denominator –c 2 = a 2 + b 2 –c is the distance from the center to each foci on the major axis –a is the distance from the center to each vertex on the major axis

43. Hyperbola General Rules –b is the distance from the center to each midpoint of the rectangle used to draw the asymptotes. This distance runs perpendicular to the distance (a). –Major axis has a length of 2a –Eccentricity(e): e = c/a (The closer e gets to 1, the closer it is to being circular –If x 2 is first then the hyperbola is horizontal –If y 2 is first then the hyperbola is vertical.

44. Hyperbola General Rules –The center is in the middle of the 2 vertices and the 2 foci. –The vertices and the covertices are used to draw the rectangles that form the asymptotes. –The vertices and the covertices are the midpoints of the rectangle –The covertices are not labeled on the hyperbola because they are not actually part of the graph

45. Hyperbola The standard form of the Hyperbola with a center at (0,0) and a horizontal axis is……

46. Hyperbola The Hyperbola with a center at (0,0) and a horizontal axis has the following characteristics…… Vertices ( a,0) Foci ( c,0) Asymptotes:

47. Hyperbola The standard form of the Hyperbola with a center at (0,0) and a vertical axis is……

48. Hyperbola The Hyperbola with a center at (0,0) and a vertical axis has the following characteristics…… Vertices (0, a) Foci ( 0, c) Asymptotes:

49. Hyperbola The standard form of the Hyperbola with a center at (h,k) and a horizontal axis is……

50. Hyperbola The Hyperbola with a center at (h,k) and a horizontal axis has the following characteristics…… Vertices (h a, k) Foci (h c, k ) Asymptotes:

51. Hyperbola The standard form of the Hyperbola with a center at (h,k) and a vertical axis is……

52. Hyperbola The Hyperbola with a center at (h,k) and a vertical axis has the following characteristics…… Vertices (h, k a) Foci (h, k c) Asymptotes: ©Sellers, James

53. Rotating the Coordinate Axis © James Wilson

54. Equations for Rotating the Coordinate Axes

55. Resources Bookbinder, John. Unit 8: Conic Sections (College Algebra Online). 2000. June 3, 2004. Britton, Jill. Occurrence of the Conics. September 25, 2003. June 3, 2004. Cabalbag, Christain, and Porter, Amanda and Chadwick, Justin and Liefting. Nick. Graphing Conic Sections (Microsoft Power Point Presentation 1997). 2001. June3, 2004 <http://www.granite.k12.ut.us/Hunter_High/StaffPages/Olsen_P/Cla ssWebSite/2003%20student%20projects/27circlesandelipse.ppt

56. Resources Finney, Ross, et. al. Calculus: Graphical, Numerical, Algebraic. Scott Foresman-Addison Wesley, 1999. Jones, June. Instructional Unit on Conic Sections. University of Georgia. June 3, 2004 http://jwilson.coe.uga.edu/emt669/Student.Folders/Jones.June/conic s/conics.html Mathews, Kevin. Great Buildings Online. Great Buildings. une 3, 2004 <http://www.GreatBuildings.com/buildings/Saint_Pauls_Cathe dral.html

57. Resources Mayoff, Art. San Francisco and the Golden Gate Bridge. June 3, 2004 http://mathworld.wolfram.com/ConicSection.html>. Mueller, William. Modeling Periodicity. June 3, 2004. PRIME Articles. Platomic Realms. June 3, 2004.

58. Resources Quadratics. Spark Notes from Barnes and Noble. June 3, 2004 <http://www.sparknotes.com/math/algebra1/quadratics/section1.html Roberts, Donna. Mathematics A. Oswego City School District Regents Exam Prep. June, 3, 2004. Seek One Web Services, Long Island Fountain Company.. Sellers, James, Introduction to Conics, June 8, 2004. http://www.krellinst.org/UCES/archive/resources/conics/newconics.ht ml

59. Resources Walsh, Shelly. Chapter 9 (Precalculus). June 3, 2004 http://faculty.ed.umuc.edu/~swalsh/UM/M108Ch9.html Weissteing, Eric W. "Conic Section." From MathWorld--A Wolfram Web Resource. http://mathworld.wolfram.com/ConicSection.htmlMathWorld Wilson, James W. CURVE BUILDING. An Exploration with Algebraic Relations University of Georgia. June 3, 2004 http://jwilson.coe.uga.edu/Texts.Folder/cb/curve.building.html