The curve remains accurate while small points move along it, and the mouse can trace precise values! These moving points help to visualize the dynamic behavior of the function, showing how the y-value changes as the x-value continuously moves along the curve. They turn a static graph into a dynamic, engaging tool for understanding function relationships.
Using the sliders, which values for **A** and **B** will make the sine wave have an amplitude of **2** and complete **3** full cycles within the bounding box ($x=-10$ to $x=10$)?