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,

Slides:

Advertisements

Similar presentations

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

Advertisements

10.1 Parabolas.

Section 11.6 – Conic Sections

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

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

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

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.

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.

Algebra II Honors Problem of the Day Homework: p , 9, 13, 15, odds and worksheet Paper folding activity is the problem of the day.

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.

Circles – An Introduction SPI Graph conic sections (circles, parabolas, ellipses and hyperbolas) and understand the relationship between the.

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.

Algebra 2 Chapter 12 section 1-3 Review. Section 1  Review.

Conic Sections & Rational Functions MATHO Algebra 5/Trig.

Jeopardy CirclesParabolasEllipsesHyperbolas Mixed Conics Q $100 Q $200 Q $300 Q $400 Q $500 Q $100 Q $200 Q $300 Q $400 Q $500 Final Jeopardy.

Conic Sections Curves with second degree Equations.

Barnett/Ziegler/Byleen College Algebra, 6th Edition

What is a hyperbola? Do Now: Define the literary term hyperbole.

Circles Ellipse Parabolas Hyperbolas

EXAMPLE 3 Write an equation of a translated parabola

Conics Conics Review. Graph It! Write the Equation?

Conics Review Study Hard!. Name the Conic without graphing and write it in standard form X 2 + Y 2 -4Y-12=0.

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

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).

Unit 5: Conics Feb. 3, What is Conics? This is the short term for conic sections. -Conic Sections include circles, parabolas, ellipses, and hyperbolas.

Equation of a Circle. Equation Where the center of the circle is (h, k) and r is the radius.

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.

Distance The distance between any two points P and Q is written PQ. Find PQ if P is (9, 1) and Q is (2, -1)

Hyperbolas Objective: graph hyperbolas from standard form.

  Where the center of the circle is (h, k) and r is the radius. Equation.

Chapter 10 – Conic Sections 1) Circles 2) Parabolas 3) Ellipses 4) Hyperbolas.

10.1 Identifying the Conics. Ex 1) Graph xy = 4 Solve for y: Make a table: xy ½ ½ Doesn’t touch y -axis Doesn’t touch x -axis.

Conic Sections Practice. Find the equation of the conic section using the given information.

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

10.1 Conics and Calculus.

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,

EXAMPLE 1 Graph the equation of a translated circle

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

PC 11.4 Translations & Rotations of Conics

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.

Translate and Classify Conic Sections

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

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

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.

Section 11.6 – Conic Sections

Chapter 10 Algebra II Review JEOPARDY Jeopardy Review.

Chapter 10 Conic Sections.

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

Presentation transcript:

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, and will have the chance to answer it first. Every other team should be working on the problem though, as you have the chance to steal it if they get the wrong answer. To steal, have your answer written down and raise your hand before the other teams do!

Round Things Curvy Things What am I? Potpourri

Classify the equation as a circle, ellipse, parabola, or hyperbola and put it in standard form.

1, $100 The center and radius of the following circle.

2, $100 The equation in standard form of this parabola.

3, $100 The standard form equation and shape of the given conic section.

4, $100 The equation of this ellipse in standard form.

1, $200 The equation of a circle with center (0, -1) and radius of 8.

2, $200 The equation of the parabola in standard form with focus (6, -5) and directrix x=2.

3, $200 The graph and equation in standard form of the circle whose center is (4, -4) that passes through the point (7, 0).

4, $200 The equation in standard form of the given hyperbola.

1, $300 The equation of this circle in standard form.

2, $300 The equation in standard form of the given hyperbola.

3, $300 The standard form equation and shape of the given conic section.

4, $300 The standard form equation and all important qualities of the given conic section.

1, $400 Daily Double! The equation in standard form for the given ellipse.

2, $400 The equation of a hyperbola in standard form with vertices (0, 0) and (8, 0) and asymptotes y = 2(x - 4) and y = -2(x - 4).

3, $400 The graph of the following parabola.

4, $400 The equation of an ellipse with e=4/5 and foci (5, -3) and (5, -2).

1, $500 The equation of an ellipse with foci (-2, 5) and (-2, -1) and a major axis length of 10.

2, $500 The equation of this hyperbola in standard form.

3, $500 The equation in standard form of the given conic section.

4, $500 The standard form equation and shape of the given conic section.