Back to Exercise: Explain volume formulas

Exercises: Informal Arguments for Sphere Volume Using Cavalieri's Principle

Grade 10·22 problems·~35 min·Common Core Math - HS Geometry·standard·hsg-gmd-a-2
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A

Recall / Warm-Up

1.

A cylinder has radius r=4r = 4 cm and height h=5h = 5 cm. What is its volume?

2.

A cone has radius r=3r = 3 cm and height h=6h = 6 cm. What is its volume?

3.

A right triangle has legs a=5a = 5 and h=12h = 12. Which expression gives the length of the hypotenuse?

B

Fluency Practice

1.

Two solids each have height 8 cm. At every height hh between 0 and 8 cm, the cross-sectional area of Solid A equals the cross-sectional area of Solid B. By Cavalieri's principle, if Solid A has volume 320π320\pi cm³, what is the volume of Solid B in cm³?

2.

A hemisphere of radius r=6r = 6 cm is compared to a cylinder-minus-cone solid, where both the cylinder and the cone have radius 6 cm and height 6 cm. What is the volume of the cylinder-minus-cone solid in terms of π\pi?

Hemisphere cross-section showing the right triangle formed by radius r = 5, height h = 3, and cross-sectional radius x
3.

A hemisphere of radius r=5r = 5 cm is sliced horizontally at height h=3h = 3 cm above its flat base. Using the Pythagorean Theorem, find the cross-sectional area at that height. Express your answer in terms of π\pi.

4.

For a hemisphere of radius rr, at height hh above the flat base, the cross-sectional radius xx satisfies   ̲ ̲ ̲ ̲ ̲ ̲ ̲ ̲ ̲ ̲ ̲ ̲ ̲ ̲ ̲ ̲ ̲ ̲ ̲ ̲ ̲ ̲   . So the cross-sectional area is Ahemisphere(h)=A_{\text{hemisphere}}(h) =   ̲ ̲ ̲ ̲ ̲ ̲ ̲ ̲ ̲ ̲ ̲ ̲ ̲ ̲ ̲ ̲ ̲ ̲ ̲ ̲ ̲ ̲   .

equation relating x, h, r:
area formula in terms of r and h:
5.

For the cylinder-minus-cone comparison solid (cylinder radius rr, height rr; cone apex at base, base radius rr at top), at height hh the cone's inner radius equals   ̲ ̲ ̲ ̲ ̲ ̲ ̲ ̲ ̲ ̲ ̲ ̲ ̲ ̲ ̲ ̲ ̲ ̲ ̲ ̲ ̲ ̲   . The annular cross-sectional area is Aannulus(h)=A_{\text{annulus}}(h) =   ̲ ̲ ̲ ̲ ̲ ̲ ̲ ̲ ̲ ̲ ̲ ̲ ̲ ̲ ̲ ̲ ̲ ̲ ̲ ̲ ̲ ̲   .

cone's inner radius at height h:
annular area formula:
6.

Using the hemisphere argument: a hemisphere of radius rr has the same volume as a cylinder-minus-cone (both with radius rr and height rr). Compute the hemisphere volume when r=3r = 3 cm. Express your answer in terms of π\pi.

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