In order to graph a circle one must graph all the points that are equidistant from:
Question 2
2.
A type of Conic where the plane is tilted and intersects only on one cone to form a bounded curve.
Question 3
3.
Give the standard equation of the circle satisfying the given condition in Figure 1.7
Question 4
4.
What is the standard form of the equation of the circle,
Question 5
5.
Determine the focus of the parabola with the equation
Enclose your answers in parentheses.
For example: (7, 8)
Question 6
6.
Find the standard equation of the parabola which satisfies the given condition:
Vertex (-8, 3), directrix x = -10.5.
Question 7
7.
Determine the axis of symmetry of the parabola with the equation
Answer in complete equation.
(For example: x = -4.3)
Question 8
8.
Determine the vertex, focus, directrix, and axis of symmetry of the parabola with the given equations:
Remember to enclose vertices and focus in parentheses, i.e. (8, 5); (5, 10). For directrix and axis of symmetry, put your answer in a complete equation, i.e. y = 4.7; x = 0
Question 9
9.
Determine the vertex, focus, directrix, and axis of symmetry of the parabola with the given equations:
Remember to enclose vertices and focus in parentheses, i.e. (8, 5); (5, 10). For directrix and axis of symmetry, put your answer in a complete equation, i.e. y = 4.7; x = 0
Question 10
10.
Determine the vertex, focus, directrix, and axis of symmetry of the parabola with the given equations:
Remember to enclose vertices and focus in parentheses, i.e. (8, 5); (5, 10). For directrix and axis of symmetry, put your answer in a complete equation, i.e. y = 4.7; x = 0