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Conics: The Parabola Objectives:
Use the standard and general forms of the equation of a parabola Graph parabolas ©2002 Roy L. Gover (
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Applications Trajectory The Parabola: Parabolic Reflectors
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Definition A parabola is the locus (set) of all points that are equidistant from a point called the focus and a line called the directrix.
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Important Idea They may point up and down or left and right
The graphs of parabolas come in different shapes and sizes
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Definition The vertex is the lowest, highest, leftmost or rightmost point on the graph
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Definition The vertex is half-way between a point called the focus and a line called the directrix. Vertex Focus Directrix Focus Directrix Vertex
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Important Idea The focus is a point and is always inside the parabola
Directrix Vertex Vertex Directrix
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Important Idea The directrix is a line and is always outside the parabola Focus Focus Directrix Vertex Vertex Directrix
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Definition The line connecting the focus and vertex and perpendicular to the directrix is the axis of symmetry
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Important Idea The distance between the focus and vertex is p units where p is a real number. p
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Important Idea The distance between the vertex and directrix is also p units p These distances are always the same.
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Important Idea Every point on the parabola is the same distance from the focus and the directrix
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Try This Match the letter to the name of the parts of a parabola: A C
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Try This Match the letter to the name of the parts of a parabola:
What is true about the distance from C to A and the distance from C to B? C B A C A
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Try This What appears to be true about the distance from the focus to the points on the parabola opposite the focus? 2p
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Definition Standard Equation for the parabola-2 forms: 1.
Opens left if p is negative Opens right if p is positive Vertex is at (h,k) P is distance from vertex to focus
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Definition Standard Equation for the parabola-2 forms: 2.
Opens down if p is negative Opens up if p is positive Vertex is at (h,k) P is distance from vertex to focus
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Definition p>0 p<0 p>0 p<0
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Example Sketch the parabola, label the vertex, focus, directrix & axis of symmetry for the parabola with vertex at (2,3), p=2, & directrix parallel to the y axis. Write the equation.
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Try This Sketch the parabola, label the vertex, focus, directrix & axis of symmetry for the parabola with vertex at (3,2), p=2, & directrix parallel to the x axis. Write the equation.
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Solution h k 4p Vertex: (3,2) Focus:(3,4) Directrix:y=0
Axis of Sym:x=3
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Example Graph using a graphing calculator:
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Example Graph using a graphing calculator:
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Example Sketch the graph of the parabola:
Hint: write in standard form by completing the square.
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Try This Write the standard form of the following parabola:
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Try This Find the coordinates of the vertex and the value of p for the parabola. Which way does the parabola open? Vertex: (0,4);p=4;open up
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Lesson Close Which of the following are equations of circles and which are equations of parabolas?
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