8. Conic Sections

Parabolas

8. Conic Sections

Parabolas

4:14 minutes

Blitzer - 8th Edition

Textbook Question

Find the vertex, focus, and directrix of the parabola with the given equation. Then graph the parabola. (x-4)^2 = 4(y+1)

Verified step by step guidance

Identify the standard form of the parabola equation. The given equation

(x - 4)^{2} = 4 (y + 1)

is in the form

(x - h)^{2} = 4 p (y - k)

, which represents a vertical parabola.

Determine the vertex

(h, k)

of the parabola. From the equation

(x - 4)^{2} = 4 (y + 1)

, we can see that

h = 4

and

k = - 1

. Therefore, the vertex is

(4, - 1)

Find the value of

p

from the equation

(x - 4)^{2} = 4 (y + 1)

. Here,

4 p = 4

, so

p = 1

Calculate the focus of the parabola. Since the parabola opens upwards, the focus is

(h, k + p)

. Substituting the values, the focus is

(4, - 1 + 1) = (4, 0)

Determine the equation of the directrix. The directrix is a horizontal line given by

y = k - p

. Substituting the values, the directrix is

y = - 1 - 1 = - 2

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Key Concepts

Here are the essential concepts you must grasp in order to answer the question correctly.

Parabola Definition

A parabola is a symmetric curve formed by the intersection of a cone with a plane parallel to its side. It can be represented by a quadratic equation in the form (x-h)² = 4p(y-k) or (y-k)² = 4p(x-h), where (h, k) is the vertex. Understanding the standard form of a parabola is essential for identifying its key features.

Vertex of a Parabola

The vertex of a parabola is the point where it changes direction, representing either the maximum or minimum point of the curve. For the equation (x-4)² = 4(y+1), the vertex can be found at the point (h, k), which corresponds to (4, -1) in this case. This point is crucial for graphing the parabola accurately.

Focus and Directrix

The focus and directrix are key components that define a parabola's shape. The focus is a fixed point located at (h, k+p), while the directrix is a line given by y = k - p for vertical parabolas. In the given equation, identifying these elements helps in sketching the parabola and understanding its geometric properties.

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