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Lesson 10 conic sections - hyperbola
The document discusses properties of hyperbolas including: - A hyperbola is defined as the set of points where the difference between distances to two fixed points (foci) is constant. - The standard equation of a horizontal hyperbola is (x-h)2/a2 - (y-k)2/b2 = 1 and a vertical hyperbola is (y-k)2/a2 - (x-h)2/b2 = 1. - Examples are given to find the equation of hyperbolas given properties like the center, foci, vertices or asymptotes and to draw the graph of hyperbolas given their equation.
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An introduction to conic sections presented by Prof. Teresita P. Liwanag – Zapanta.
Students will learn the properties, equations, and graphing techniques of hyperbolas.
A hyperbola is defined mathematically, highlighting differences from ellipses and providing foundational understanding.
Key terms for hyperbola graphing, including transverse axis and general equations for different transverse axes.
Details on hyperbolas with the center at the origin (0,0) and conditions for foci placement.
Derivation of generalized equations for hyperbolas depending on the position of foci.
Special properties and real-world applications of hyperbolas including airplane shock waves and LORAN.
Examples illustrating how to find hyperbola equations based on various conditions, centered on specific points.
Instructions on reducing hyperbola equations to standard form and identifying center, vertices, and foci.
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Lesson 10 conic sections - hyperbola
- 1. CONIC SECTIONS Prepared by: Prof. Teresita P. Liwanag – Zapanta B.S.C.E., M.S.C.M., M.Ed. (Math-units), PhD-TM (on-going)
- 2. SPECIFIC OBJECTIVES: At the end of the lesson, the student is expected to be able to: • give the properties of hyperbola. • write the standard and general equation of a hyperbola. • sketch the graph of hyperbola accurately.
- 3. THE HYPERBOLA (e> 1) A hyperbola is the set of points in a plane such that the difference of the distances of each point of the set from two fixed points (foci) in the plane is constant. The equations of hyperbolas resemble those of ellipses but the properties of these two kinds of conics differ considerably in some respects. To derive the equation of a hyperbola, we take the origin midway between the foci and a coordinate axis on the line through the foci.
- 4. The following termsare important in drawing the graph of a hyperbola; Transverse axis is a line segment joining the two vertices of the hyperbola. Conjugate axis is the perpendicular bisector of the transverse axis. General Equations of a Hyperbola 1. Horizontal Transverse Axis : Ax2 – Cy2 + Dx + Ey + F = 0 2. Vertical Transverse Axis: Cy2 – Ax2 + Dx + Ey + F = 0
- 5. HYPERBOLA WITH CENTERAT THE ORIGIN C(0,0)
- 7. Then letting b2= c2 – a2 and dividing by a2b2, we have if foci are on the x-axis if foci are on the y-axis The generalized equations of hyperbolas with axes parallel to the coordinate axes and center at (h, k) are if foci are on a axis parallel to the x-axis if foci are on a axis parallel to the y-axis
- 10. SPECIAL PROPERTIES ANDAPPLICATIONS 1. When an airplane flies at a speed faster than the speed of sound, it creates a shock waves heard as a sonic bomb in the shape of a cone and it intersects the ground in a curve which is hyperbolic in shape. 2. In Long Range Navigation (LORAN) this constant difference is utilized in finding the location of a navigator.
- 11. Examples: 1. Find theequation of the hyperbola which satisfies the given conditions a. Center (0,0), transverse axis along the x-axis, a focus at (8,0), a vertex at (4,0) b. Center (0,0), transverse axis along the x-axis, a focus at (5,0), transverse axis = 6 c. Center (0,0), transverse axis along y-axis, passing through the points (5,3) and (-3,2). d. Center (1, -2), transverse axis parallel to the y-axis, transverse axis = 6 conjugate axis = 10
- 12. e. Center (-3,2),transverse axis parallel to the y-axis, passing through (1,7), the asymptotes are perpendicular to each other. f. Center (0,6), conjugate axis along the y-axis, asymptotes are 6x – 5y + 30 = 0 and 6x + 5y – 30 = 0. 2. Reduce each equation to its standard form. Find the coordinates of the center, the vertices and the foci. Draw the asymptotes and the graph of each equation. a. 9x2 –4y2 –36x + 16y – 16 = 0 b. 49y2 – 4x2 + 48x – 98y - 291 = 0