The point [math]B[/math] is directly underneath point [math]E[/math], and the following lengths are known:[br][list][*]From [math]A[/math] to [math]B[/math]: 2 mm[/*][*]From [math]B[/math] to [math]C[/math]: 3 mm[/*][*]From [math]A[/math] to [math]F[/math]: 6 mm[/*][*]From [math]B[/math] to [math]E[/math]: 10 mm[/*][*]From [math]C[/math] to [math]D[/math]: 7 mm[/*][*]From [math]A[/math] to [math]G[/math]: 4 mm[/*][/list]

What is the volume of this piece?

What is the volume of the other piece not pictured?

Explain how you can tell the triangles in the last two applets are not identical.

Select [b]all [/b]equations that represent a relationship between angles in the figure.[br][img]data:image/png;base64,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[/img]

A mixture of punch contains 1 quart of lemonade, 2 cups of grape juice, 4 tablespoons of honey, and [math]\frac{1}{2}[/math] gallon of sparkling water. Find the percentage of the punch mixture that comes from each ingredient. Round your answers to the nearest tenth of a percent. (Hint: 1 cup = 16 tablespoons)