Key features of a parabola
x = #
An "x = ..." equation is how to write the line of symmetry and it should match the x-coordinate of the vertex
maximum point
If the parabola is facing downward then the vertex is the highest point, which is refereed to as a maximum point.
minimum point
If the parabola is facing upward then the vertex is the lowest point, which is refereed to as a minimum point.
vertex
The highest or lowest point of the parabola. This point lies on the line of symmetry.
Decreasing Interval
The part of the parabola that goes down from left to right
Increasing interval
The part of the parabola that goes up from left to right
Domain
The x values. For a parabola, this is always All Real Numbers
Range
The y values. For a parabola, this will start or end at the y value of the vertex.
direction (positive smile or negative frown)
open up or open down
line/ axis of symmetry
the "fold line" of the parabola. The invisible line that cuts the parabola in half vertically. The vertex is on this line. Drawn in with a dashed line.
y-intercept
the point where the parabola crosses the y-axis
x - intercept(s)
the point(s) where the parabola crosses the x - axis
(0, y)
this is how to write the coordinate point of a y-intercept
(x, 0)
this is how to write the coordinate point of an x-intercept
