Answer:
- positive leading coefficient: upward
- negative leading coefficient: downward
Step-by-step explanation:
A parabola is defined by a quadratic equation, which can be written generically as ...
y = ax² +bx +c
The graph of this equation will have a ∪ or ∩ shape. That is, it will open upward or downward.
Direction of opening
The direction the parabola opens depends on the sign of y when values of x get large. The term x² always has a positive sign, so the sign of y for large x will depend on the sign of the leading coefficient, a.
When a is positive, y-values are large positive values when x gets large, so the graph of the parabola opens upward.
When a is negative, y-values are large negative values when x gets large, so the graph of the parabola opens downward.
The parabola opens upward when the leading coefficient is positive; downward otherwise.
Additional comment
This dependence on the sign of the leading coefficient is true for the graph of any even-degree polynomial.
