The graph of Jenna's daily net income on the interval (0,63) will start from below the x-axis, rise to a peak, and then fall back down to below the x-axis. This is because the function g(x)=-x^2+72x-567 is a quadratic function with a negative coefficient for the x^2 term, indicating a downward opening parabola.
Therefore, the graph will show a peak at some point between x=0 and x=63, and will be below the x-axis for most of the interval. The maximum value of the function occurs at x=36, where g(36) = 396.
So, the graph of Jenna's daily net income on the interval (0,63) will be a downward opening parabola, with a peak at x=36 and a maximum value of 396.
the daily net income of jenna's floral buisness, based on x bouquets made, is represented by function below
g(x)=-x2+72x-567
which of the following describes the graph of jenna's daily net income on interval (0,63)?
1 answer
1 answer