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Exploring Conic Sections

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Presentation on theme: "Exploring Conic Sections"— Presentation transcript:

1 Exploring Conic Sections
ALGEBRA 2 LESSON 10-1 Graph the equation x2 + y2 = 16. Describe the graph and its lines of symmetry. Then find the domain and range. x y –3 ± ± 2.6 –2 ± ± 3.5 –1 ± ± 3.9 ±4 1 ± ± 3.9 2 ± ± 3.5 3 ± ± 2.6 Make a table of values. Plot the points and connect them with a smooth curve. 10-1

2 Exploring Conic Sections
ALGEBRA 2 LESSON 10-1 (continued) The graph is a circle of radius 4. Its center is at the origin. Every line through the center is a line of symmetry. Recall from Chapter 2 that you can use set notation to describe a domain or a range. In this Example, the domain is {x| – x }. The range is {y| – y }. < 10-1

3 Exploring Conic Sections
ALGEBRA 2 LESSON 10-1 Graph the equation 9x y2 = 36. Describe the graph and the lines of symmetry. Then find the domain and range. x y –1 ± 2.6 0 ± 3 1 ± 2.6 Make a table of values. Plot the points and connect them with smooth curves. The graph is an ellipse. The center is at the origin. It has two lines of symmetry, the x-axis and the y-axis. The domain is {x| – x }. The range is {y| – y }. < 10-1

4 Exploring Conic Sections
ALGEBRA 2 LESSON 10-1 Graph the equation x2 – y2 = 4. Describe the graph and its lines of symmetry. Then find the domain and range. x y –5 ± 4.6 –4 ± 3.5 –3 ± 2.2 – — 3 ± 2.2 4 ± 3.5 5 ± 4.6 Make a table of values. Plot the points and connect them with smooth curves. 10-1

5 Exploring Conic Sections
ALGEBRA 2 LESSON 10-1 (continued) The graph is a hyperbola that consists of two branches. Its center is at the origin. It has two lines of symmetry, the x-axis and the y-axis. The domain is {x| x –2 or x }. The range is all real numbers. > < 10-1

6 Exploring Conic Sections
ALGEBRA 2 LESSON 10-1 Identify the center and intercepts of the conic section. Then find the domain and range. The center of the ellipse is (0, 0). The x-intercepts are (–5, 0) and (5, 0), and the y-intercepts are (0, –4) and (0, 4). The domain is {x| – x }. The range is {y| – y }. < 10-1

7 Exploring Conic Sections
ALGEBRA 2 LESSON 10-1 Describe each Moiré pattern as a circle, an ellipse, or a hyperbola. Match it with one of these possible equations, 2x2 – y2 = 16, 25x y2 = 100, or x2 + y2 = 16. a. b. c. a. The equation 25x y2 = 100 represents a conic section with two sets of intercepts, (±2, 0) and (0, ±5). Since the intercepts are not equidistant from the center, the equation models an ellipse. 10-1

8 Exploring Conic Sections
ALGEBRA 2 LESSON 10-1 (continued) a. b. c. b. The equation x2 + y2 = 16 represents a conic section with two sets of intercepts, (±4, 0) and (0, ±4). Since each intercept is 4 units from the center, the equation models a circle. c. The equation 2x2 – y2 = 16 represents a conic section with one set of intercepts, (±2 2, 0), so the equation must be a hyperbola. 10-1

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