ellipse (An Introduction)
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Introductory presentation of an Ellipse
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ellipse (An Introduction)
- 2. Introduction An ellipse is one of the conic sections; Its shape is a bounded curve which looks like a flattened circle. The orbits of the planets in our solar system around the sun happen to be elliptical in shape. Also, just like parabolas, ellipses have reflective properties that have been used in the construction of certain structures.
- 3. Definition and Equation of an Ellipse Consider the points F1(3,0) and F2(3,0), as shown in Figure 1.19. What is the sum of the distances of A(4,2.4) from F1 and from F2? How about the sum of the distances of B and C(0,4) from F1 and from F2?
- 4. REMEMBER THIS! An ellipse is the set of all points on the plane, the sum of whose distances from two fixed points is a constant.
- 5. Definition and Equation of an Ellipse Let F1 and F2 be two distinct points. The set of all points P, whose distances from F1 and from F2 add up to a certain constant, is called an ellipse. The pointsF1 and F2 are called the foci of the ellipse.
- 6. GRAPH OF AN ELLIPSE WITH STANDARD EQUATION Here the features of the graph of an ellipse with standard equation where a > b. Let 𝑐 = 𝑎2 − 𝑏2 . 𝑥2 𝑎2 + 𝑦2 𝑏2 = 1
- 7. GRAPH OF AN ELLIPSE WITH STANDARD EQUATION (1) Center: origin (0,0) (2) foci: F1(-c,0) and F2(c,0) (3) vertices: V1(-a,0) and V2(a,0) (4) covertices W1(0,-b) and W2(0,b)
- 8. ELLIPSE WITH STANDARD EQUATION Example 1. Give the coordinates of the foci, vertices, and covertices of the ellipse with equation 𝑥2 25 + 𝑦2 9 = 1. Sketch the graph, and include these points.
- 9. ELLIPSE WITH STANDARD EQUATION Example 2. Find the (standard) equation of the ellipse whose foci are F1(3,0) and F2(3,0), such that for any point on it, the sum of its distances from the foci is 10.
- 10. TRY THIS! 1. Give the coordinates of the foci, vertices, and covertices of the ellipse with equation 𝑥2 169 + 𝑦2 25 = 1. Sketch the graph, and include these points. 2. Find the equation in standard form of the ellipse whose foci are F1(8,0) and F2(8,0), such that for any point on it, the sum of its distances from the foci is 20.