Tempestt recently graphed a function that has a maximum located at (–4, 2). This article will discuss her graph and how it was created.
Tempestt’s Graph
Tempestt’s graph is a parabola that has been shifted four units to the left and two units up. The vertex of the parabola is at (–4, 2), which is the maximum of the function. The parabola opens up, so it is a minimum at the vertex. The graph is symmetric around the vertical axis, so it has an even degree.
Maximum at (–4, 2).
The maximum of the function is located at (–4, 2). This is the point where the parabola has its highest point, so it is the vertex of the parabola. The maximum of the function is 2, which is the y-coordinate of the vertex. The x-coordinate of the vertex is –4, which is the point where the parabola reaches its maximum.
Tempestt’s graph is a useful tool for understanding how functions can have maximum and minimum points. By understanding her graph, we can better understand how to identify and graph functions with maxima and minima.
In conclusion, Tempestt’s graph is a useful tool for learning how functions can have maximum and minimum points. It is a parabola that has been shifted four units to the left and two units up. The maximum of the function is located at (–4, 2). By understanding her graph, we can better understand how to identify and graph functions with maxima and minima.