[b][color=#38761d][size=150]Select and move the vertices of the triangle above.[br]Take note of how the side lengths and angle measures change and how they are related.[br]Then answer the questions below.[/size][/color][/b]
1. When side length [i]b[/i] is the shortest, which angle is the smallest?
2. When side length [i]c[/i] is the longest, which angle is the largest?
3. When [math]\angle\beta[/math] is the largest angle, which side length is the longest?
4. When [math]\angle\alpha[/math] is the smallest angle, which side length is the shortest?
[img]https://media.edgenuity.com/contentengine/frames/e627b3f4-96b3-11e4-969e-bc764e043e0c/8101-04-03-10-04-image1.png[/img][br]What is the order of the angles from largest to smallest?
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[/img][br]What is the order of the side lengths from shortest to longest?