Describe the graph of each equation as a circle, a point, or nonexistent. If it is a circle, give the center and radius. If it is a point, give the coordinates. See Examples 3–5. x^2+y^2+4x+4y+8=0

The standard form of a circle's equation is (x - h)² + (y - k)² = r², where (h, k) is the center and r is the radius. To identify a circle from a general equation, one must rearrange it into this form. This involves completing the square for both x and y terms, which reveals the center and radius directly.

Completing the square is a method used to transform a quadratic expression into a perfect square trinomial. This technique is essential for rewriting equations of circles and parabolas. By adding and subtracting the same value, one can create a squared term that simplifies the equation, making it easier to identify the geometric properties of the graph.

In the context of conic sections, the graph of an equation can represent a circle, a single point, or may not exist at all. A circle has a positive radius, a point occurs when the radius is zero, and nonexistence arises when the equation leads to a contradiction, such as a negative radius squared. Understanding these distinctions is crucial for accurately describing the graph of the given equation.