M6: Graphing Quadratic Functions Flashcards
What is a quadratic function?
f(x) = ax^2+bx+c where a,b,c are not equal to 0
What is a parabola?
The graph of a quadratic function that shapes to be a curve.
What is the vertex?
The point at which the graph starts at.
What is the axis of symmetry
It is a dashed line that goes through the middle of the graph.
What is the domain?:
Domain is all the x values on the graph.
What is the range?:
Range is all the y values on the graph.
What is the maximum value of a parabola?
The biggest y value on the graph.
What is the minimum value of a parabola?
The smallest y value on the graph.
find the domain and range:
g (x) = −3 x ^2
Domain: (−∞,∞)
Range:[0,-∞)
What variable in a quadratic function has to change how wide the graph goes?
a
Graph and find the domain and range:
g(x) = -4x^2 - 12x - 8
Points: (-4, -24) (-3, -8) (-3/2, 1) (-1, 0) (0,-8)
Domain:(−∞,∞)
Range:(−∞,1)
What is the vertex form of a quadratic function?
y = a(x - h)^2 + k
What are the purposes of the variables h and k?
h and k are used for the horizontal and vertical shift of the graph. They both are also points of the vertex.
What are the difference between h and k.
h is the horizontal shift and the x value of the vertex and k is the vertical shift and the y value of the vertex.
What would happen if the variable a was negative? If it was positive?
if it was negative the graph would be facing down, and if it was positive it would be facing up.
