Quadratic Functions
A Quadratic Functions is a parabola whose axis of symmetry is parallel to the y - axis.
U - Shaped
Parabola
Concave up
Vertex
- If a graph is concave up, then the vertex is minimum value. (lowest point on graph)
- If the graph is concave down the vertex has maximum value.
- All graphs of quadratic functions hav
e vertical symmetry
e vertical symmetry
-Standard Form:
f(x) = ax2 + bx + c
a, b, c are constants
-Vertex Form:
g(x) = a(x - h)2
where (h, k) is the vertex
-Factoral form Form:
h(x) = a(x - r) (x - s)
where r and s are x- intercepts
- If the leading coefficent (first number of the function) is negative then the graph is concve down and there is a max value.
- If the leading coefficent is positive then the graph is concave up and there is a minimum value.
Ex 1.
F(x) = x2 - x - 6
Find x and y intercept
y-int:
when x=0 , y=-6
(0,-6)
x-int:
0= x2 - x - 6
(x - 3) (x + 2)
x = 3
x = 2
x = 2
(3,0)(-2,0)
-When the quadratic formula is not factorable we can use the quadratic function
you did a good job of explaining the concept through your examples, i also can appreciate that you posted all the formulas as that is very important to the quadratic functions
ReplyDeleteI thought you did a great job explaining your concepts! The organization was easy to follow, and the pictures were a nice addition to see what you mean when you were writing it out. The examples also help to further understand the concepts
ReplyDeletecamila,
ReplyDeletenice job. your examples were nice, it would have added a little more to have a real life connection, but other than that good job.
professor little