Find the vertex, focus, and directrix of the parabola. Then graph the parabola.
(x-4)2 = 12(y + 2)

The vertex of the parabola is _______ (Type an ordered pair)
The focus of the parabola is _______ (Type an ordered pair.)
The directrix of the parabola is _______ (Type an equation. Simplify your answer.)
Use the graphing tool to graph the parabola only.
Find the vertex, focus, and directrix of the parabola. Then graph the parabola.
Find the vertex, focus, and directrix of the following parabola. Graph the equation. y? - 2y +x=0 The vertex is (Type an ordered pair.) The focus is (Type an ordered pair.) The equation of the directrix is (Type an equation.) Use the graphing tool to graph the equation. Click to enlarge graph
Find the vertex, focus, and directrix of the parabola. 28y = x2 vertex (X,Y) = _______ focus (X,Y) = _______ directrix _______ Sketch its graph, showing the focus and the directrix.
Find the focus and directrix of the parabola with the equation 8x2 + 8y = 0. Then choose the correct graph of the parabola. What are the coordinates for the focus of the parabola? (Type an ordered pair.) What is the equation for the directrix? Choose the correct graph for 8x² + 8y = 0 below. O N4
Find the focus, directrix, vertex and axis of symmetry for the parabola -8(y + 3) - (-3) Focus = Directrix Vertex = Be sure to enter each answer in the appropriate format. Hint: What is the appropriate notation for a line or a point? Graph the parabola. Include the directrix and focus with your graph. 0 5 4 3 2 0.5 .4.9.2 2 97 5 0 2 -2 9 . - 5 - 0 7+ Clear All Draw: : /...
Determine the coordinates of the vertex, coordinates of the focus, and equation of the directrix for the parabola (y - 2)2 = 12 (2+3) (n) Coordinates of the Focus (type your answer a) Coordinates of the Vertex type your answer D (0Equation of the Directric type your answer
Find the vertex, focus, and directrix for the following parabolas. (a) (y - 2) = 2002 - 2) vertex : focus : directrix: (b) y2 - 4y = 20% - 22 Vertex focus : directrix (c) (z - 6) = 20(4-5) vertex focus directric (d) 22 + 402 = 4y - 8 vertex focus: directrix An arch is in the shape of a parabola. It has a span of 440 meters and a maximum height of 22 meters. Find the...
1. Find the vertex, the focus and the directrix of the parabola y2 + 4y - 8r. Make a sketch of the parabola, the directrix and the focus.
Find an equation of a parabola satisfying the given information. Focus (8,0), directrix x= - 8 An equation for a parabola satisfying these conditions is (Type an equation. Simplify your answer.) .
This Question: 1 pt 1 of 15 (0 Find the equation of the parabola described below. Find the two points that define the latus rectum, and graph the equation. Focus at (-3,-4); directrix the line x=5 The equation of the parabola in the standard form is I. (Type an equation.) The two points that define the latus rectum are (Type ordered pairs. Use a comma to separate answers as needed.) Use the graphing tool to graph the parabola. Click to...
Find the focus, directrix, focal diameter, vertex and axis of symmetry for the parabola: 12.8y = x2 The focus is _______ The directrix is _______ The focal diameter is _______ The vertex is _______ The axis of symmetry is _______ Be sure to enter each answer in the appropriate format. Hint: What is the appropriate notation for a line or a point?