Stop Bugging Me!!!! Conic Section Project.

Slides:

Advertisements

Similar presentations

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

Advertisements

Section 11.6 – Conic Sections

Parabolas $ $300 $300 $ $ $ $ $ $ $ $ $ $ $ $ $ $100.

Conic Sections Parabola Ellipse Hyperbola

10.3 Hyperbolas. Circle Ellipse Parabola Hyperbola Conic Sections See video!

Advanced Geometry Conic Sections Lesson 4

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.

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,

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

& & & Formulas.

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

Translating Conic Sections

Conics can be formed by the intersection

Circles Ellipse Parabolas Hyperbolas

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.

Algebra Conic Section Review. Review Conic Section 1. Why is this section called conic section? 2. Review equation of each conic section A summary of.

EXAMPLE 3 Write an equation of a translated parabola Write an equation of the parabola whose vertex is at (–2, 3) and whose focus is at (–4, 3). SOLUTION.

Conic Sections Curves with second degree Equations.

Circles Ellipse Parabolas Hyperbolas

EXAMPLE 3 Write an equation of a translated parabola

What am I?. x 2 + y 2 – 6x + 4y + 9 = 0 Circle.

Conic Sections The Parabola. Introduction Consider a ___________ being intersected with a __________.

Conics This presentation was written by Rebecca Hoffman.

10-5 Parabola. Parabola – “u” shape formed by quadratics. Created but all points equal distance from a focus and a given line called the directrix. Every.

Find the distance between (-4, 2) and (6, -3). Find the midpoint of the segment connecting (3, -2) and (4, 5).

More Conic Sections. Objective Given a translation, I can graph an equation for a conic section.

Chapter 11 Review. RULES: - Groups of 4 – your partner is to your left/right - One partner team will be X and the other partner team will be O - You have.

Fri 4/22 Lesson 10 – 6 Learning Objective: To translate conics Hw: Worksheet (Graphs)

G. Anthony Streamwood HS Algebra 3-4 Find the midpoint of (-9, 1.7) and (-11,1.3). A.) (1, 1.5) B.) (-10, 3) C.) (-10, 1.5)D.) (1, 3) LW Extra help.

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

CONIC SECTIONS.

An Ellipse is the set of all points P in a plane such that the sum of the distances from P and two fixed points, called the foci, is constant. 1. Write.

Short Subject: Conics - circles, ellipses, parabolas, and hyperbolas

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.

Chapter 11 Review HW: Pg 592 Chapter Test # 1-8,

Solving Quadratic Systems Distance and Midpoint Formula

EXAMPLE 1 Graph the equation of a translated circle

Translating Conic Sections

Homework Log Wed 4/27 Lesson Rev Learning Objective:

Asymptotes are drawn thru the box corners

Conic sections Review.

6.2 Equations of Circles +9+4 Completing the square when a=1

PC 11.4 Translations & Rotations of Conics

Circles, Ellipses, Hyperbolas & Parabolas

12.5 Ellipses and Hyperbolas.

Vertices {image} , Foci {image} Vertices (0, 0), Foci {image}

Eccentricity Notes.

Writing Equations of Conics

This presentation was written by Rebecca Hoffman

Review Circles: 1. Find the center and radius of the circle.

Today in Pre-Calculus Go over homework Chapter 8 – need a calculator

Parabolas Mystery Circles & Ellipses Hyperbolas What am I? $100 $100

Unit 1 – Conic Sections Section 1.4 – The Ellipse Calculator Required

Test Dates Thursday, January 4 Chapter 6 Team Test

Warm-up Write the equation of an ellipse centered at (0,0) with major axis length of 10 and minor axis length Write equation of a hyperbola centered.

Stop Bugging Me!!!! Conic Section Project.

Section 11.6 – Conic Sections

Chapter 10 Algebra II Review JEOPARDY Jeopardy Review.

Chapter 10 Conic Sections.

10.6 – Translating Conic Sections

Applications of Trigonometric Functions

Jeopardy Solving for y Q $100 Q $100 Q $100 Q $100 Q $100 Q $200

Chapter 7 Analyzing Conic Sections

Presentation transcript:

Stop Bugging Me!!!! Conic Section Project

Stop Bugging Me!!! Rules: Must use at least one of each Conic Section. You must give your bug a unique Insect name. Must write an equation for each piece in Standard Form. Must write all the important pieces for each shape. Parabolas: vertex, axis of symmetry, directrix Circles: center, radius Ellipses: center, foci, length of major/minor axis Hyperbolas: vertices, foci, asymptotes Must be neat, accurate, and in color. Must be hand drawn. Turn in a Desmos printout of the equations/inequalities and drawing with your work

Stop Bugging Me!! Grading Rubric Total points is 75. Points will be subtracted for sloppy work or lack of effort along with incorrect mathematics. Due February 22, 2017 Work in groups of 1 to 3 Worth 1.5 Quizzes

SANDBERG Radius = 3, C(6,4) C(6,7) V:(2,7) and (10, 7) C(6,5) Foci: (6,10) and (6,0) F(6,6) Directrix: y = 4