Presentation is loading. Please wait.

Presentation is loading. Please wait.

Conics Name the vertex and the distance from the vertex to the focus of the equation (y+4) 2 = -16(x-1) Question:

Published byBeatrix Casey Modified over 8 years ago

Similar presentations

Presentation on theme: "Conics Name the vertex and the distance from the vertex to the focus of the equation (y+4) 2 = -16(x-1) Question:"— Presentation transcript:

1 Conics 1 2 3 4 7 8 6 5 10 12 11 9 16 15 14 13

2 1 Name the vertex and the distance from the vertex to the focus of the equation (y+4) 2 = -16(x-1) Question: Answer: Vertex: (1, -4) Distance = 4

3 2 Write the equation in standard form 18x 2 + 12y 2 - 144x - 48y + 120 = 0 Question: Answer:

4 3 Write the equation in standard form 9x 2 - 4y 2 - 54x - 40y - 55 = 0 Question: Answer:

5 4 Determine the equation of the circle with center (-4,7) and a point (1,2). Question: Answer:

6 5 Write in vertex form: x 2 + 4x - y + 8 = 0 Question: Answer: y = (x + 2) 2 + 4

7 6 Graph: Question: Answer: Center: (4, -6) Vertices: (8, -6) (0, -6) vertices: (4, -3) (4, -9) Foci:

8 7 Graph: Question: Answer: Center: (3,1) Vertices: (3,3) (3,-1) Foci: vertices: (8,1) (-2,1)

9 8 The following equations will graph which type of conic section? A) B) C) parabola hyperbola ellipse Question: Answer:

10 9 Graph: (x-2) 2 = 8(y-3) Question: Answer: Vertex: (2, 3) Focus: (2, 5) Directrix: y = 1 Length of LR = 8

11 10 Write the equation from the graph Question: Answer:

12 11 Question: Answer: Write the equation of the hyperbola whose covertices are 6 units apart and vertices are (3,4) and (3,0) Center: (3, 2) a = 2 b = 3

13 12 Determine the equation of the conic section represented by: 4y 2 - 8y + 4x 2 - 56x + 49 = 0 Question: Answer:

14 13 Write the equation from the graph Question: Answer: (-4, 2)

15 14 Write the equation of the ellipse with vertical major axis 20 units long, and center at (3,0) and a foci at (3,7) Question: Answer: h = 3k = 0 a = 10 c = 7

16 15 Write the equation of the hyperbola and foci at (0, 9) and (0,-1) and a co-vertex at (-3,4) Question: Answer: Center: (0, 4) a = 4 b = 3 c = 5

17 16 Question: Answer: Write the equation of the conic with center at (3, 1), vertical major axis 12 units long, and a focus at (3,3).

18 Final Jeopardy Identify the conic section Write the equation in vertex form Graph the equation Question: x 2 - 6y - 8x + 16 = 0

19 Final Jeopardy Question: x 2 - 6y - 8x + 16 = 0 Answer: parabola Vertex: (4,0) focus: (4, 1.5) Directrix: y = -1.5 Axis: x = 4

Download ppt "Conics Name the vertex and the distance from the vertex to the focus of the equation (y+4) 2 = -16(x-1) Question:"

Similar presentations

Conics Review Your last test of the year! Study Hard!

Conics Review Your last test of the year! Study Hard!
Section 11.6 – Conic Sections

Section 11.6 – Conic Sections
Parabolas $100 100 $300 $300 $200 200 $400 400 $500 500 $100 100 $300 300 $200 200 $400 400 $500 500 $100 100 $300 300 $200 200 $400 400 $500 500 $100.

Parabolas $ $300 $300 $ $ $ $ $ $ $ $ $ $ $ $ $ $100.
Conic Sections Parabola Ellipse Hyperbola

Conic Sections Parabola Ellipse Hyperbola
C.P. Algebra II The Conic Sections Index The Conics The Conics Translations Completing the Square Completing the Square Classifying Conics Classifying.

C.P. Algebra II The Conic Sections Index The Conics The Conics Translations Completing the Square Completing the Square Classifying Conics Classifying.
Advanced Geometry Conic Sections Lesson 4

Advanced Geometry Conic Sections Lesson 4
Chapter 12 12-4 Hyperbolas.

Chapter Hyperbolas.
Ellipse Standard Equation Hyperbola. Writing equation of an Ellipse Example: write the standard form on an ellipse that has a vertex at (0,5) and co-vertex.

Ellipse Standard Equation Hyperbola. Writing equation of an Ellipse Example: write the standard form on an ellipse that has a vertex at (0,5) and co-vertex.
What is the standard form of a parabola who has a focus of ( 1,5) and a directrix of y=11.

What is the standard form of a parabola who has a focus of ( 1,5) and a directrix of y=11.
JEOPARDY Rational Functions and Conics By: Linda Heckman.

JEOPARDY Rational Functions and Conics By: Linda Heckman.
Review Day! Hyperbolas, Parabolas, and Conics. What conic is represented by this definition: The set of all points in a plane such that the difference.

Review Day! Hyperbolas, Parabolas, and Conics. What conic is represented by this definition: The set of all points in a plane such that the difference.
Hosted by Mrs. Hopkins We need teams of no more than 4 people, and each team needs a team name and whiteboard. Each team will get to pick a question,

Hosted by Mrs. Hopkins We need teams of no more than 4 people, and each team needs a team name and whiteboard. Each team will get to pick a question,
Conics A conic section is a graph that results from the intersection of a plane and a double cone.

Conics A conic section is a graph that results from the intersection of a plane and a double cone.
50 Miscellaneous Parabolas Hyperbolas Ellipses Circles 40 30 20 10 20 30 40 50 10 20 30 40 50 10 20 30 40 50 10 20 30 40 50.

50 Miscellaneous Parabolas Hyperbolas Ellipses Circles
200 300 400 500 100 200 300 400 500 100 200 300 400 500 100 200 300 400 500 100 200 300 400 500 100 8-1 & 8-2 8-3 & 8-4 8-5 & 8-6 8-7 Formulas.

& & & Formulas.
Conics 1 2 3 4 7 8 6 5 10 12 11 9 16 15 14 13 This presentation was written by Rebecca Hoffman Retrieved from McEachern High School.

Conics This presentation was written by Rebecca Hoffman Retrieved from McEachern High School.
Translating Conic Sections

Translating Conic Sections
Jeopardy CirclesParabolasEllipsesHyperbolasVocabulary Q $100 Q $200 Q $300 Q $400 Q $500 Q $100 Q $200 Q $300 Q $400 Q $500 Final Jeopardy Source:

Jeopardy CirclesParabolasEllipsesHyperbolasVocabulary Q $100 Q $200 Q $300 Q $400 Q $500 Q $100 Q $200 Q $300 Q $400 Q $500 Final Jeopardy Source:
EXAMPLE 1 Graph the equation of a translated circle Graph (x – 2) 2 + (y + 3) 2 = 9. SOLUTION STEP 1 Compare the given equation to the standard form of.

EXAMPLE 1 Graph the equation of a translated circle Graph (x – 2) 2 + (y + 3) 2 = 9. SOLUTION STEP 1 Compare the given equation to the standard form of.
Conic Sections Advanced Geometry Conic Sections Lesson 2.

Conic Sections Advanced Geometry Conic Sections Lesson 2.

Similar presentations

Ads by Google