The applet below illustrates properties that involve the [b]angles [/b]and[b] arcs[/b] [b]of circles [/b]that must always hold true.
Write a conjecture (in sentence form) that summarizes your observations.
As you move these points, observe what happens to the size of the inscribed angles.[br][br]What relationship is ALWAYS true regarding the measures of the [b][color=#00ff00]green[/color][/b], [b][color=#ff0000]red[/color][/b], and [b][color=#0000ff]blue[/color][/b] angles?