Summary: Review

Key Concepts

Quadratic functions of form $f(x)=ax^2+bx+c$ may be graphed by evaluating the function at various values of the input variable $x$ to find each coordinating output $f(x)$ . Plot enough points to obtain the shape of the graph, then draw a smooth curve between them.
The vertex (the turning point) of the graph of a parabola may be obtained using the formula $\left( -\dfrac{b}{2a}, f\left(-\dfrac{b}{2a}\right)\right)$
The graph of a quadratic function opens up if the leading coefficient $a$ is positive, and opens down if $a$ is negative.
Quadratic functions may be used to model various real-life situations such as projectile motion, and used to determine inputs required to maximize or minimize certain outputs in cost or revenue models.

Glossary

projectile motion: (also called parabolic trajectory) a projectile launched or thrown into the air will follow a curved path in the shape of a parabola
quadratic function: a function of form $f(x)=ax^2+bx+c$ whose graph forms a parabola in the real plane
vertex: the turning point of the graph of quadratic function