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Five-Minute Check (over Lesson 7-2) Then/Now New Vocabulary
Key Concept: Standard Forms of Equations for Hyperbolas Example 1: Graph Hyperbolas in Standard Form Example 2: Graph a Hyperbola Example 3: Write Equations Given Characteristics Example 4: Find the Eccentricity of a Hyperbola Key Concept: Classify Conics Using the Discriminant Example 5: Identify Conic Sections Example 6: Real-World Example: Apply Hyperbolas Lesson Menu
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Graph the ellipse given by 4x 2 + y 2 + 16x – 6y – 39 = 0.
A. B. C. D. 5-Minute Check 1
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Write an equation in standard form for the ellipse with vertices (–3, –1) and (7, –1) and foci (–2, –1) and (6, –1). A. B. C. D. 5-Minute Check 2
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Determine the eccentricity of the ellipse given by
A B C D 5-Minute Check 3
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Write an equation in standard form for a circle with center at (–2, 5) and radius 3.
A. (x + 2)2 + (y – 5)2 = 3 B. (x + 2)2 + (y – 5)2 = 9 C. (x – 2)2 + (y + 5)2 = 9 D. (x – 2)2 + (y + 5)2 = 3 5-Minute Check 4
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Identify the conic section represented by 8x 2 + 5y 2 – x + 6y = 0.
A. circle B. ellipse C. parabola D. none of the above 5-Minute Check 5
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You analyzed and graphed ellipses and circles. (Lesson 7-2)
Analyze and graph equations of hyperbolas. Use equations to identify types of conic sections. Then/Now
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hyperbola transverse axis conjugate axis Vocabulary
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Key Concept 1
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A. Graph the hyperbola given by
Graph Hyperbolas in Standard Form A. Graph the hyperbola given by The equation is in standard form with h = 0, k = 0, Example 1
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Graph Hyperbolas in Standard Form
Graph the center, vertices, foci, and asymptotes. Then make a table of values to sketch the hyperbola. Answer: Example 1
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B. Graph the hyperbola given by
Graph Hyperbolas in Standard Form B. Graph the hyperbola given by The equation is in standard form with h = 2 and k = –4. Because a2 = 4 and b2 = 9, a = 2 and b = 3. Use the values of a and b to find c. c2 = a2 + b2 Equation relating a, b, and c for a hyperbola c2 = a2 = 4 and b2 = 9 Solve for c. Example 1
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Graph Hyperbolas in Standard Form
Use h, k, a, b, and c to determine the characteristics of the hyperbola. Example 1
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Graph Hyperbolas in Standard Form
Graph the center, vertices, foci, and asymptotes. Then make a table of values to sketch the hyperbola. Answer: Example 1
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Graph the hyperbola given by
A. B. C. D. Example 1
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First, write the equation in standard form.
Graph a Hyperbola Graph the hyperbola given by 4x2 – y2 + 24x + 4y = 28. First, write the equation in standard form. 4x2 – y2 + 24x + 4y = 28 Original equation 4x2 + 24x – y2 + 4y = 28 Isolate and group like terms. 4(x2 + 6x) – (y2 – 4y) = 28 Factor. 4(x2 + 6x + 9) – (y2 – 4y + 4) = (9) – 4 Complete the squares. 4(x + 3)2 – (y – 2)2 = 60 Factor and simplify. Example 2
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The equation is now in standard form with h = –3,
Graph a Hyperbola Divide each side by 60. The equation is now in standard form with h = –3, Example 2
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Graph a Hyperbola Graph the center, vertices, foci, and asymptotes. Then make a table of values to sketch the hyperbola. Answer: Example 2
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Graph the hyperbola given by 3x2 – y2 – 30x – 4y = –119.
A. B. C. D. Example 2
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center: (1, –2) Midpoint of segment between foci
Write Equations Given Characteristics A. Write an equation for the hyperbola with foci (1, –5) and (1, 1) and transverse axis length of 4 units. Because the x-coordinates of the foci are the same, the transverse axis is vertical. Find the center and the values of a, b, and c. center: (1, –2) Midpoint of segment between foci a = 2 Transverse axis = 2a c = 3 Distance from each focus to center c2 = a2 + b2 Example 3
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Write Equations Given Characteristics
Answer: Example 3
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center: (–3, 4) Midpoint of segment between vertices
Write Equations Given Characteristics B. Write an equation for the hyperbola with vertices (–3, 10) and (–3, –2) and conjugate axis length of 6 units. Because the x-coordinates of the foci are the same, the transverse axis is vertical. Find the center and the values of a, b, and c. center: (–3, 4) Midpoint of segment between vertices b = 3 Conjugate axis = 2b a = 6 Distance from each vertex to center Example 3
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Write Equations Given Characteristics
Answer: Example 3
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Write an equation for the hyperbola with foci at (13, –3) and (–5, –3) and conjugate axis length of 12 units. A. B. C. D. Example 3
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Find c and then determine the eccentricity.
Find the Eccentricity of a Hyperbola Find c and then determine the eccentricity. c2 = a2 + b2 Equation relating a, b, and c c2 = a2 = 32 and b2 = 25 Simplify. Example 4
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Eccentricity equation
Find the Eccentricity of a Hyperbola Eccentricity equation Simplify. The eccentricity of the hyperbola is about 1.33. Answer: 1.33 Example 4
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A. 0.59 B. 0.93 C. 1.24 D. 1.69 Example 4
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Key Concept 3
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The discriminant is greater than 0, so the conic is a hyperbola.
Identify Conic Sections A. Use the discriminant to identify the conic section in the equation 2x2 + y2 – 2x + 5xy + 12 = 0. A is 2, B is 5, and C is 1. Find the discriminant. B2 – 4AC = 52 – 4(2)(1) or 17 The discriminant is greater than 0, so the conic is a hyperbola. Answer: hyperbola Example 5
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Identify Conic Sections
B. Use the discriminant to identify the conic section in the equation 4x2 + 4y2 – 4x + 8 = 0. A is 4, B is 0, and C is 4. Find the discriminant. B2 – 4AC = 02 – 4(4)(4) or –64 The discriminant is less than 0, so the conic must be either a circle or an ellipse. Because A = C, the conic is a circle. Answer: circle Example 5
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The discriminant is 0, so the conic is a parabola.
Identify Conic Sections C. Use the discriminant to identify the conic section in the equation 2x2 + 2y2 – 6y + 4xy – 10 = 0. A is 2, B is 4, and C is 2. Find the discriminant. B2 – 4AC = 42 – 4(2)(2) or 0 The discriminant is 0, so the conic is a parabola. Answer: parabola Example 5
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Use the discriminant to identify the conic section given by 15 + 6y + y2 = –14x – 3x2.
A. ellipse B. circle C. hyperbola D. parabola Example 5
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Apply Hyperbolas A. NAVIGATION LORAN (LOng RAnge Navigation) is a navigation system for ships relying on radio pulses that is not dependent on visibility conditions. Suppose LORAN stations E and F are located 350 miles apart along a straight shore with E due west of F. When a ship approaches the shore, it receives radio pulses from the stations and is able to determine that it is 80 miles farther from station F than it is from station E. Find the equation for the hyperbola on which the ship is located. Example 6A
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Apply Hyperbolas First, place the two sensors on a coordinate grid so that the origin is the midpoint of the segment between station E and station F. The ship is closer to station E, so it should be in the 2nd quadrant. The two stations are located at the foci of the hyperbola, so c is 175. The absolute value of the difference of the distances from any point on a hyperbola to the foci is 2a. Because the ship is 80 miles farther from station F than station E, 2a = 80 and a = 40. Example 6A
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Use the values of a and c to find b2.
Apply Hyperbolas Use the values of a and c to find b2. c2 = a2 + b2 Equation relating a, b, and c 1752 = b2 c = 175 and a = 40 29,025 = b2 Simplify. Example 6A
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Apply Hyperbolas Example 6A
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Apply Hyperbolas Answer: Example 6A
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Apply Hyperbolas B. NAVIGATION LORAN (LOng RAnge Navigation) is a navigation system for ships relying on radio pulses that is not dependent on visibility conditions. Suppose LORAN stations E and F are located 350 miles apart along a straight shore with E due west of F. When a ship approaches the shore, it receives radio pulses from the stations and is able to determine that it is 80 miles farther from station F than it is from station E. Find the exact coordinates of the ship if it is 125 miles from the shore. Example 6B
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Apply Hyperbolas Because the ship is 125 miles from the shore, y = 125. Substitute the value of y into the equation and solve for x. Original equation y = 125 Solve. Example 6B
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Apply Hyperbolas Since the ship is closer to station E, it is located on the left branch of the hyperbola, and the value of x is about –49.6. Therefore, the coordinates of the ship are (–49.6, 125). Answer: (–49.6, 125) Example 6B
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NAVIGATION Suppose LORAN stations S and T are located 240 miles apart along a straight shore with S due north of T. When a ship approaches the shore, it receives radio pulses from the stations and is able to determine that it is 60 miles farther from station T than it is from station S. Find the equation for the hyperbola on which the ship is located. A. C. B. D. Example 6
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End of the Lesson
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