Solve each problem. See Example 7. A baseball is hit so that its height, s, in feet after t seconds is s=-16t^2+44t+4. For what time period is the ball at least 32 ft above the ground?

A quadratic function is a polynomial function of degree two, typically expressed in the form s = at^2 + bt + c. In this context, the function describes the height of the baseball over time, where 'a' represents the acceleration due to gravity, 'b' is the initial velocity, and 'c' is the initial height. Understanding the shape of the parabola formed by this function is crucial for analyzing the ball's trajectory.

The vertex of a parabola is the highest or lowest point of the graph, depending on its orientation. For the function s = -16t^2 + 44t + 4, the vertex can be found using the formula t = -b/(2a). This point is significant as it indicates the maximum height of the baseball, which helps in determining the time intervals when the ball is above a certain height, such as 32 feet.

Inequalities are mathematical expressions that show the relationship between two values when they are not equal. In this problem, we need to solve the inequality s ≥ 32 to find the time periods when the baseball is at least 32 feet above the ground. This involves finding the roots of the corresponding equation and analyzing the intervals on the number line to determine where the height condition is satisfied.