Quadratic equations: Parabola
Parabola
Graph
The graph of a quadratic \[y=\blue ax^2+\green bx+\purple c\] is called a parabola.
If #\blue a \gt 0# the graph is an upward opening parabola.
If #\blue a \lt 0# the graph is a downward opening parabola.
An upward opening parabola has a minimum and downward opening parabola has a maximum. In both cases, this point is referred to as the vertex of the graph.
The parabola is symmetrical about the vertical line through the top of the graph. Such a line is also called a #\orange{\textbf{line of symmetry}}#.
geogebra picture
Take a look at the formula #y=6\cdot \left(x-4\right)\cdot \left(x+3\right)#. Does the point #\rv{-1, -60}# lie on the graph of this formula?
Yes
We substitute #x=-1# in the formula. This is done in the following way:
\[y=6\cdot \left((-1)-4\right)\cdot \left((-1)+3\right)=-60\]
Hence #\rv{-1, -60}# does lie on the graph.
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