Opening up, the vertex is a minimum.
Is a parabola whose directrix is below its vertex.
This is the coordinate of the vertex for a parabola that opens up, defined by a positive value of x^2.
Finding the vertex of the parabola is important because it tells you where the bottom (or the top, for a parabola that 'opens' downward), and thus where you can begin graphing.
Interpreting that function as y=x2+2x+1, the graph of this function would be a parabola that opens upward. It would be equivalent to y=(x+1)2. Its vertex would be at (-1,0) and this vertex would be the parabola's only zero.
y = x2 + 2x + 8 a = 1 > 0 the parabola opens upward, b = 2, c = 8 the y-intercept is (0, 8). axis of symmetry: x = -b/2a = -1 The axis of symmetry passes through x = -1, so we have the point (-2, 8) which is symmetrical to (0, 8). Let f(x) = y, and evaluate f(-1) to find the y-coordinate of the vertex. f(-1) = (-1)2 + 2(-1) + 8 = 7; vertex = (-1, 7). Since the parabola opens upward and the vertex lies on the second quadrant, there are no x-intercepts. Evaluate f(1) = (1)2 + 2(1) + 8 = 11; (1, 11) symmetrical to (-3, 11). Just plot the points and draw the parabola.
Is a parabola whose directrix is below its vertex.
maximum point :)
maximum point :)
This is the coordinate of the vertex for a parabola that opens up, defined by a positive value of x^2.
The standard equation for a Parabola with is vertex at the origin (0,0) is, x2 = 4cy if the parabola opens vertically upwards/downwards, or y2 = 4cx when the parabola opens sideways. As the focus is at (0,6) then the focus is vertically above the vertex and we have an upward opening parabola. Note that c is the distance from the vertex to the focus and in this case has a value of 6 (a positive number). The equation is thus, x2 = 4*6y = 24y
The maximum.
Vertex
If the value of the variable is negative then the parabola opens downwards and when the value of variable is positive the parabola opens upward.
The maximum point.
The vertex is not affected by the direction that the parabola is facing. The vertex is the place where the two sides of the parabola meet. It is in the middle divides the shape in half. If you picture yourself looking at a bowl from the side and then imagining it as two dimensional, it would look like a parabola but for all of the filled in parts of the graph and the fact that the sides of the bowl don't continue on forever. The vertex is the bottom of the bowl, where the sides meet. You measure a vertex as you would a point; with a coordinate.
Finding the vertex of the parabola is important because it tells you where the bottom (or the top, for a parabola that 'opens' downward), and thus where you can begin graphing.
If a is greater than zero then the parabola opens upward.