Back to Exercise: Use volume formulas to solve

Exercises: Use Volume Formulas to Solve Problems

Grade 10·22 problems·~40 min·Common Core Math - HS Geometry·standard·hsg-gmd-a-3
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A

Recall / Warm-Up

1.

Which formula gives the volume of a cone with base radius rr and height hh?

2.

A square pyramid has a square base with side length ss and height hh. Which expression correctly represents the base area BB to use in the volume formula V=13BhV = \frac{1}{3}Bh?

3.

A container holds 2 m³ of liquid. How many liters is this? (Use: 1 m³ = 1,000 L)

B

Fluency Practice

1.

A cylinder has radius 4 cm and height 11 cm. Find its volume. Express your answer in terms of π\pi (e.g., write "176π cm³").

2.

A cylindrical water tank has a diameter of 6 m and a height of 5 m. Find its volume in cubic meters, then convert to liters. Round to the nearest liter. (Use: 1 m³ = 1,000 L)

3.

A square pyramid has a base side length of 9 cm and a height of 8 cm. What is its volume in cm³?

4.

A sphere has a radius of 6 cm. Find its volume. Express your answer in terms of π\pi.

A grain silo made of a cylinder (height 12 m, radius 5 m) topped by a cone (height 3 m, same radius). Dimension labels mark each component.
5.

A grain silo consists of a cylinder topped with a cone. The cylinder has radius 5 m and height 12 m. The cone has the same radius and a height of 3 m. Find the total volume of the silo in terms of π\pi.

6.

A cone with radius 6 cm and height 10 cm is carved out of the top of a cylinder with the same radius and height. What volume of material remains? Express your answer in terms of π\pi.

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