Volume Scaling

\( V' = k^{3}V \)
Geometry GCSE
Question 3 of 20
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Two similar cuboids have scale factor 0.5. What is the ratio of their volumes?

Hint (H)
\( Volume ratio=k^3. \)

Explanation

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Statement

When a solid is enlarged or reduced by a scale factor \(k\), its volume scales by the cube of that factor:

\[ V' = k^3 V \]

where \(V\) is the original volume and \(V'\) is the new volume.

Why it’s true

  • Scaling multiplies every linear dimension by \(k\).
  • Area scales by \(k^2\).
  • Volume scales by \(k^3\), because it involves three dimensions (length × width × height).

Recipe (how to use it)

  1. Identify the scale factor \(k\).
  2. Cube it to get \(k^3\).
  3. Multiply the original volume by \(k^3\).
  4. This gives the new volume.

Spotting it

Look for enlargement or reduction problems where two similar 3D shapes are compared, often cones, spheres, pyramids, or cuboids.

Common pairings

  • Similar shapes problems (ratios of lengths, areas, and volumes).
  • Density and mass problems linked with enlargement.

Mini examples

  1. Cube enlarged by scale factor 2: original volume 27 → new volume \(2^3×27=216\).
  2. Sphere reduced by scale factor 0.5: original volume 288π → new volume \(0.5^3×288π=36π\).

Pitfalls

  • Using \(k\) instead of \(k^3\).
  • Mixing up area and volume scaling (area uses \(k^2\)).
  • Forgetting that reduction uses a scale factor less than 1.

Exam strategy

  • Always write the relation \(V' = k^3V\).
  • Check whether the question gives linear scale or volume ratio.
  • If given volume ratio, cube root it to get scale factor.

Summary

Volume scales by the cube of the scale factor. Double the scale factor, volume increases eightfold; halve it, volume reduces to one-eighth.

Worked examples

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  1. A cube of volume 27 cm³ is enlarged by scale factor 2. Find the new volume.
    1. \( k=2, k^3=8 \)
    2. \( V'=8×27=216 \)
    Answer: 216 cm³
  2. Sphere of volume 288π cm³ reduced by scale factor 0.5. Find new volume.
    1. \( k=0.5, k^3=0.125 \)
    2. \( V'=0.125×288π=36π \)
    Answer: 36π cm³
  3. Cuboid volume 100 cm³, enlarged by scale factor 3. Find new volume.
    1. \( k=3, k^3=27 \)
    2. \( V'=27×100=2700 \)
    Answer: 2700 cm³
  4. Cone volume 40 cm³, reduced by scale factor 0.2. Find new volume.
    1. \( k=0.2, k^3=0.008 \)
    2. \( V'=0.008×40=0.32 \)
    Answer: 0.32 cm³
  5. Pyramid volume 250 cm³ enlarged by scale factor 1.5. Find new volume.
    1. \( k=1.5, k^3=3.375 \)
    2. \( V'=3.375×250=843.75 \)
    Answer: 843.75 cm³
  6. A shape with volume 64 cm³ is enlarged by scale factor 4. Find new volume.
    1. \( k=4, k^3=64 \)
    2. \( V'=64×64=4096 \)
    Answer: 4096 cm³
  7. Two similar spheres have volumes in ratio 1:27. Find scale factor.
    1. \( V ratio=1:27 \)
    2. \( k^3=27 \)
    3. \( k=3 \)
    Answer: 3
  8. Two cones are similar. Larger has volume 500 cm³, smaller 40 cm³. Find scale factor.
    1. \( V ratio=500:40=12.5 \)
    2. \( k^3=12.5 \)
    3. k≈2.3
    Answer: ≈2.3
  9. A cuboid’s dimensions are halved. Volume reduced by what factor?
    1. \( k=0.5 \)
    2. \( Volume scales by k^3=0.125 \)
    Answer: 1/8
  10. General case: original volume V, scale factor k. New volume?
    1. \( V'=k^3V \)
    Answer: \( k^3V \)