5.4: Distinguishing Between Surface Area and Volume (2024)

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    Lesson

    Let's contrast surface area and volume.

    Exercise \(\PageIndex{1}\): Attributes and Their Measures

    For each quantity, choose one or more appropriate units of measurement.

    For the last two, think of a quantity that could be appropriately measured with the given units.

    Quantities

    1. Perimeter of a parking lot:
    2. Volume of a semi truck:
    3. Surface area of a refrigerator:
    4. Length of an eyelash:
    5. Area of a state:
    6. Volume of an ocean:
    7. ________________________: miles
    8. ________________________: cubic meters

    Units

    • millimeters (mm)
    • feet (ft)
    • meters (m)
    • square inches (sq in)
    • square feet (sq ft)
    • square miles (sq mi)
    • cubic kilometers (cu km)
    • cubic yards (cu yd)

    Exercise \(\PageIndex{2}\): Building with 8 Cubes

    This applet has 16 cubes in its hidden stack. Build two different shapes using 8 cubes for each.

    For each shape, determine the following information and write it on a sticky note.

    • Give a name or a label (e.g., Mae’s First Shape or Eric’s Steps).
    • Determine its volume.
    • Determine its surface area.

    Exercise \(\PageIndex{3}\): Comparing Prisms Without Building Them

    Three rectangular prisms each have a height of 1 cm.

    • Prism A has a base that is 1 cm by 11 cm.
    • Prism B has a base that is 2 cm by 7 cm.
    • Prism C has a base that is 3 cm by 5 cm.
    1. Find the surface area and volume of each prism. Use the dot paper to draw the prisms, if needed.
    5.4: Distinguishing Between Surface Area and Volume (2)
    1. Analyze the volumes and surface areas of the prisms. What do you notice? Write 1 or 2 observations about them.

    Are you ready for more?

    Can you find more examples of prisms that have the same surface areas but different volumes? How many can you find?

    Summary

    Length is a one-dimensional attribute of a geometric figure. We measure lengths using units like millimeters, centimeters, meters, kilometers, inches, feet, yards, and miles.

    5.4: Distinguishing Between Surface Area and Volume (3)

    Area is a two-dimensional attribute. We measure area in square units. For example, a square that is 1 centimeter on each side has an area of 1 square centimeter.

    5.4: Distinguishing Between Surface Area and Volume (4)

    Volume is a three-dimensional attribute. We measure volume in cubic units. For example, a cube that is 1 kilometer on each side has a volume of 1 cubic kilometer.

    5.4: Distinguishing Between Surface Area and Volume (5)

    Surface area and volume are different attributes of three-dimensional figures. Surface area is a two-dimensional measure, while volume is a three-dimensional measure.

    Two figures can have the same volume but different surface areas. For example:

    • A rectangular prism with side lengths of 1 cm, 2 cm, and 2 cm has a volume of 4 cu cm and a surface area of 16 sq cm.
    • A rectangular prism with side lengths of 1 cm, 1 cm, and 4 cm has the same volume but a surface area of 18 sq cm.
    5.4: Distinguishing Between Surface Area and Volume (6)

    Similarly, two figures can have the same surface area but different volumes.

    • A rectangular prism with side lengths of 1 cm, 1 cm, and 5 cm has a surface area of 22 sq cm and a volume of 5 cu cm.
    • A rectangular prism with side lengths of 1 cm, 2 cm, and 3 cm has the same surface area but a volume of 6 cu cm.
    5.4: Distinguishing Between Surface Area and Volume (7)

    Glossary Entries

    Definition: Base (of a Prism or Pyramid)

    The word base can also refer to a face of a polyhedron.

    A prism has two identical bases that are parallel. A pyramid has one base.

    A prism or pyramid is named for the shape of its base.

    5.4: Distinguishing Between Surface Area and Volume (8)

    Definition: Face

    Each flat side of a polyhedron is called a face. For example, a cube has 6 faces, and they are all squares.

    Definition: Net

    A net is a two-dimensional figure that can be folded to make a polyhedron.

    Here is a net for a cube.

    5.4: Distinguishing Between Surface Area and Volume (9)

    Definition: Polyhedron

    A polyhedron is a closed, three-dimensional shape with flat sides. When we have more than one polyhedron, we call them polyhedra.

    Here are some drawings of polyhedra.

    5.4: Distinguishing Between Surface Area and Volume (10)

    Definition: Prism

    A prism is a type of polyhedron that has two bases that are identical copies of each other. The bases are connected by rectangles or parallelograms.

    Here are some drawings of prisms.

    5.4: Distinguishing Between Surface Area and Volume (11)

    Definition: Pyramid

    A pyramid is a type of polyhedron that has one base. All the other faces are triangles, and they all meet at a single vertex.

    Here are some drawings of pyramids.

    5.4: Distinguishing Between Surface Area and Volume (12)

    Definition: Surface Area

    The surface area of a polyhedron is the number of square units that covers all the faces of the polyhedron, without any gaps or overlaps.

    For example, if the faces of a cube each have an area of 9 cm2, then the surface area of the cube is \(6\cdot 9\), or 54 cm2.

    Definition: Volume

    Volume is the number of cubic units that fill a three-dimensional region, without any gaps or overlaps.

    For example, the volume of this rectangular prism is 60 units3, because it is composed of 3 layers that are each 20 units3.

    5.4: Distinguishing Between Surface Area and Volume (13)

    Practice

    Exercise \(\PageIndex{4}\)

    Match each quantity with an appropriate unit of measurement.

    1. The surface area of a tissue box
    2. The amount of soil in a planter box
    3. The area of a parking lot
    4. The length of a soccer field
    5. The volume of a fish tank
    1. Square meters
    2. Yards
    3. Cubic inches
    4. Cubic feet
    5. Square centimeters

    Exercise \(\PageIndex{5}\)

    Here is a figure built from snap cubes.

    5.4: Distinguishing Between Surface Area and Volume (14)
    1. Find the volume of the figure in cubic units.
    2. Find the surface area of the figure in square units.
    3. True or false: If we double the number of cubes being stacked, both the volume and surface area will double. Explain or show how you know.

    Exercise \(\PageIndex{6}\)

    Lin said, “Two figures with the same volume also have the same surface area.”

    1. Which two figures suggest that her statement is true?
    2. Which two figures could show that her statement is not true?
    5.4: Distinguishing Between Surface Area and Volume (15)

    Exercise \(\PageIndex{7}\)

    Draw a pentagon (five-sided polygon) that has an area of 32 square units. Label all relevant sides or segments with their measurements, and show that the area is 32 square units.

    (From Unit 1.4.1)

    Exercise \(\PageIndex{8}\)

    1. Draw a net for this rectangular prism.
    5.4: Distinguishing Between Surface Area and Volume (16)
    1. Find the surface area of the rectangular prism.

    (From Unit 1.5.4)

    5.4: Distinguishing Between Surface Area and Volume (2024)

    FAQs

    What is the difference between surface area and volume? ›

    The surface area of any given object is the area or region occupied by the surface of the object. Whereas volume is the amount of space available in an object. In geometry, there are different shapes and sizes such as sphere, cube, cuboid, cone, cylinder, etc. Each shape has its surface area as well as volume.

    What is the difference between surface area and surface area to volume ratio? ›

    Surface area is how much area of the object is exposed to the outside. The volume is how much space is inside the shape. The surface-area-to-volume ratio tells you how much surface area there is per unit of volume.

    What should be bigger surface area or volume? ›

    A larger surface area to volume ratio is more efficient than a smaller ratio. This is due to the amount of plasma membrane relative to the volume of the cell. The more plasma membrane available to transport materials in and out of the cell, the more efficient the cell will be in completing its specific functions.

    What is the difference between finding the area and finding the volume? ›

    Area is the amount of space a two-dimensional shape takes up, whereas volume is the amount of space a three-dimensional shape takes up. Area is notated with units squared, and volume is notated with units cubed.

    What is the difference between surface and surface area? ›

    The area is the measurement of the size of flat-surface in a plane (two-dimensional), whereas surface area is the measurement of the exposed surface of a solid shape (three-dimensional). This is the key difference between area and surface area. The unit for both the quantities is the same, though, i.e. square units.

    How do you explain surface area? ›

    Surface area measures the space needed to cover the outside of a three-dimensional shape. Surface area is the sum of the areas of the individual sides of a solid shape. Surface area is measured in square units. There are formulas to find the surface area of different solid shapes.

    What is an example of surface area and volume? ›

    Surface area is a two-dimensional measure, while volume is a three-dimensional measure. Two figures can have the same volume but different surface areas. For example: A rectangular prism with side lengths of 1 cm, 2 cm, and 2 cm has a volume of 4 cu cm and a surface area of 16 sq cm.

    Can surface area be bigger than volume? ›

    The surface area can never be greater than the volume of any shape. Neither can the volume ever be greater than the surface area. Why? Because they have different units, saying one is greater than the other does not make much sense.

    What is the relationship between area and volume? ›

    An Area is a two-dimensional object whereas Volume is a three-dimensional object. The Area is a plain figure while Volume is a solid figure. The Area covers the outer space and Volume covers the inner capacity. The Area is measured in square units and Volume is measured in cubic units.

    Do you get the surface area if you differentiate the volume? ›

    This explains why the derivative (rate of change) of the volume is the surface area (SA). In 4-dimensional space, the SA analogue is the derivative of the Volume analogue of a 4D sphere.

    How do you work out surface area and volume? ›

    How to find the volume of a cube with the surface area? We can rearrange the equation for the surface area of a cube. SA = side of a cube x side of a cube x 6 sides. Since we know the length of the side of the cube, we can use that to calculate volume: Volume = length x width x height (of a side of a cube).

    What is the important formula for surface area and volume? ›

    Surface Area and Volume Class 10 Formulas Examples

    The volume of a cube = a3, where the length of the edge is 'a'. Using the formula for the surface area of a cuboid = 2(lb + bh + lh), where l, b, and h are length, breadth, and height respectively. Thus, the surface area of the resulting cuboid is 90 cm2.

    What is the surface area and volume in science? ›

    The surface area to volume ratio impacts the function of exchange surfaces in different organisms by determining the efficiency of exchange. For example, the lungs of mammals have a large surface area to volume ratio, allowing them to exchange oxygen and carbon dioxide efficiently.

    Can surface area and volume be equal? ›

    For example: a cube of side 6 inches has a surface area of 216 square inches and a volume of 216 cubic inches - the same numeric value. Of course they can.

    Why is surface area more important than volume? ›

    Materials with high surface area to volume ratio (e.g. very small diameter, very porous, or otherwise not compact) react at much faster rates than monolithic materials, because more surface is available to react.

    Can you find surface area from volume? ›

    Answer: To calculate the surface area of the sphere with the volume, we use the formula: S = (π)1/3 × (6V)2/3. Let's go through the steps to understand the solution.

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