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.

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Presentation transcript:

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 a limited amount of time for each question - When time is called you must have written down your answer on your white board & everyone will show their answers. - When X has dibs: - and answer is correct  mark an X on the grid - and answer wrong  but O answer correct  mark an O - When O has dibs: - and answer is correct  mark an O on the grid - and answer wrong  but X answer correct  mark an X - We are not doing the problems in order, so you cannot work ahead!

Question #7 Write an equation in standard form for the parabola with focus (4, 10) and directrix y = –6.. Dibs: O

Question #2 Find the equation of the circle in standard form equation. Identify the type of circle the equation represents. Dibs: X

Question #3 Find the equation of the ellipse (by using a picture, not by definition) with foci (6, 2) and (–2, 2) and major axis of length 10. Dibs: O

Question #10 Identify the types of conics and solve. circle and line (3, 4) and (4, 3) Dibs: X

Question #5 Write the equation of the hyperbola in standard form Dibs: O

Question #8 For the parabola, find the vertex, the equation of the axis of symmetry, the focus, the equation of the directrix and which way it opens. Dibs: X V: (–5, –1) A of S: y = –1 F: (–7, –1) D: x = –3 opens: left

Question #4 For the ellipse, find the length of the major and minor axes, the coordinates of the foci and the eccentricity. major axis: 16; minor axis: 14; foci: Dibs: O

Question #9 Determine the type of conic represented by the equation Dibs: X ellipse

Question #6 For the hyperbola, find the length of the transverse and conjugate axes, the coordinates of the foci and the equations of the asymptotes. Dibs: O transverse axis: 20; conjugate axis: 8; foci:

Question #1 Find the equation of the circle whose center is (2, 8) and passes through (–1, 7). Dibs: X

Homework #1109 Pg 592 Chapter Test # 1-6, 8, 9