Learn on PengienVision, Mathematics, Grade 5Chapter 11: Understand Volume Concepts

Lesson 2: Develop a Volume Formula

In this Grade 5 lesson from enVision Mathematics Chapter 11, students learn how to find the volume of rectangular prisms using the formulas V = l × w × h and V = b × h, where b represents the area of the base. Students apply these formulas to solve real-world problems involving cubic units, building on their understanding of volume as the number of unit cubes needed to fill a solid figure without gaps or overlaps.

Section 1

Volume

Property

We use cubic units to measure the volume or amount of space inside a three-dimensional object. For a box with dimensions length ll, width ww, and height hh, the volume is found by multiplying the three dimensions.

V=l×w×hV = l \times w \times h

Examples

  • An aquarium is 3 feet long, 1.5 feet wide, and 2 feet tall. Its volume is 3×1.5×2=93 \times 1.5 \times 2 = 9 cubic feet.
  • A shoebox has dimensions of 14 inches by 8 inches by 5 inches. Its volume is 14×8×5=56014 \times 8 \times 5 = 560 cubic inches.

Section 2

Volume of a Prism Using Base Area

Property

The volume of a prism is the product of the height by the area of the base.
That is, if the area of the base is BB and the height is hh, volume is V=BhV = Bh.

Examples

  • A rectangular prism with a base of 5 cm×6 cm5 \text{ cm} \times 6 \text{ cm} and a height of 12 cm12 \text{ cm} has a volume of V=(5×6)×12=360 cm3V = (5 \times 6) \times 12 = 360 \text{ cm}^3.
  • A triangular prism has a base area of 30 in230 \text{ in}^2 and a height of 7 in7 \text{ in}. Its volume is V=30×7=210 in3V = 30 \times 7 = 210 \text{ in}^3.

Book overview

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Chapter 11: Understand Volume Concepts

  1. Lesson 1

    Lesson 1: Model Volume

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  2. Lesson 2Current

    Lesson 2: Develop a Volume Formula

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  3. Lesson 3

    Lesson 3: Combine Volumes of Prisms

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  4. Lesson 4

    Lesson 4: Solve Word Problems Using Volume

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Lesson overview

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Section 1

Volume

Property

We use cubic units to measure the volume or amount of space inside a three-dimensional object. For a box with dimensions length ll, width ww, and height hh, the volume is found by multiplying the three dimensions.

V=l×w×hV = l \times w \times h

Examples

  • An aquarium is 3 feet long, 1.5 feet wide, and 2 feet tall. Its volume is 3×1.5×2=93 \times 1.5 \times 2 = 9 cubic feet.
  • A shoebox has dimensions of 14 inches by 8 inches by 5 inches. Its volume is 14×8×5=56014 \times 8 \times 5 = 560 cubic inches.

Section 2

Volume of a Prism Using Base Area

Property

The volume of a prism is the product of the height by the area of the base.
That is, if the area of the base is BB and the height is hh, volume is V=BhV = Bh.

Examples

  • A rectangular prism with a base of 5 cm×6 cm5 \text{ cm} \times 6 \text{ cm} and a height of 12 cm12 \text{ cm} has a volume of V=(5×6)×12=360 cm3V = (5 \times 6) \times 12 = 360 \text{ cm}^3.
  • A triangular prism has a base area of 30 in230 \text{ in}^2 and a height of 7 in7 \text{ in}. Its volume is V=30×7=210 in3V = 30 \times 7 = 210 \text{ in}^3.

Book overview

Jump across lessons in the current chapter without opening the full course modal.

Continue this chapter

Chapter 11: Understand Volume Concepts

  1. Lesson 1

    Lesson 1: Model Volume

    LearnPractice
  2. Lesson 2Current

    Lesson 2: Develop a Volume Formula

    LearnPractice
  3. Lesson 3

    Lesson 3: Combine Volumes of Prisms

    LearnPractice
  4. Lesson 4

    Lesson 4: Solve Word Problems Using Volume

    LearnPractice