4 Ways to Find Scale Factor - wikiHow (2024)

  • Categories
  • Education and Communications
  • Studying
  • Mathematics

Download Article

Explore this Article

methods

1Finding the Scale Factor of Similar Figures

2Finding a Similar Figure Using the Scale Factor

3Completing Sample Problems

4Finding the Scale Factor in Chemistry

+Show 1 more...

-Show less...

Other Sections

Video

Related Articles

References

Article Summary

Co-authored byMario Banuelos, PhD

Last Updated: January 26, 2024References

Download Article

The scale factor, or linear scale factor, is the ratio of two corresponding side lengths of similar figures. Similar figures have the same shape but are of different sizes. The scale factor is used to solve geometric problems.[1] You can use the scale factor to find the missing side lengths of a figure. Conversely, you can use the side lengths of two similar figures to calculate the scale factor. These problems involve multiplication or require you to simplify fractions.

Method 1

Method 1 of 4:

Finding the Scale Factor of Similar Figures

Download Article

  1. 1

    Verify that the figures are similar. Similar figures, or shapes, are ones in which the angles are congruent, and the side lengths are in proportion. Similar figures are the same shape, only one figure is bigger than the other.[2]

    • The problem should tell you that the shapes are similar, or it might show you that the angles are the same, and otherwise indicate that the side lengths are proportional, to scale, or that they correspond to each other.
  2. 2

    Find a corresponding side length on each figure. You may need to rotate or flip the figure so that the two shapes align and you can identify the corresponding side lengths. You should be given the length of these two sides, or should be able to measure them.[3] If you do not know at least one side length of each figure, you cannot find the scale factor.

    • For example, you might have a triangle with a base that is 15 cm long, and a similar triangle with a base that is 10 cm long.

    Advertisement

  3. 3

    Set up a ratio. For each pair of similar figures, there are two scale factors: one you use when scaling up, and one you use when scaling down. If you are scaling up from a smaller figure to a larger one, use the ratio 4 Ways to Find Scale Factor - wikiHow (7). If you are scaling down from a larger figure to a smaller one, use the ratio 4 Ways to Find Scale Factor - wikiHow (8).[4]

    • For example if you are scaling down from a triangle with a 15 cm base to one with a 10 cm base, you would use the ratio 4 Ways to Find Scale Factor - wikiHow (9).
      Filling in the appropriate values, it becomes 4 Ways to Find Scale Factor - wikiHow (10).
  4. 4

    Simplify the ratio. The simplified ratio, or fraction, will give you your scale factor.[5] If you are scaling down, your scale factor will be a proper fraction.[6] If you are scaling up, it will be a whole number or improper fraction, which you can convert to a decimal.

    • For example, the ratio 4 Ways to Find Scale Factor - wikiHow (12) simplifies to 4 Ways to Find Scale Factor - wikiHow (13). So the scale factor of two triangles, one with a base of 15 cm and one with a base of 10 cm, is 4 Ways to Find Scale Factor - wikiHow (14).
  5. Advertisement

Method 2

Method 2 of 4:

Finding a Similar Figure Using the Scale Factor

Download Article

  1. 1

    Find the side lengths of the figure. You should have one figure of which the side lengths are given or measurable. If you cannot determine the side lengths of the figure, you cannot make a similar figure.[7]

    • For example, you might have a right triangle with sides measuring 4 cm and 3 cm, and a hypotenuse 5 cm long.
  2. 2

    Determine whether you are scaling up or down. If you are scaling up, your missing figure will be larger, and the scale factor will be a whole number, improper fraction, or decimal.[8] If you are scaling down your missing figure will be smaller, and your scale factor will most likely be a proper fraction.

    • For example, if the scale factor is 2, then you are scaling up, and a similar figure will be larger than the one you have.
  3. 3

    Multiply one side length by the scale factor. The scale factor should be given to you. When you multiply the side length by the scale factor, this gives you the missing corresponding side length on the similar figure.[9]

    • For example, if the hypotenuse of a right triangle is 5 cm long, and the scale factor is 2, to find the hypotenuse of the similar triangle, you would calculate 4 Ways to Find Scale Factor - wikiHow (19). So the similar triangle has a hypotenuse that is 10 cm long.
  4. 4

    Find the remaining side lengths of the figure. Continue to multiply each side length by the scale factor. This will give you the corresponding side lengths of the missing figure.

    • For example, if the base of a right triangle is 3 cm long, with a scale factor of 2, you would calculate 4 Ways to Find Scale Factor - wikiHow (21) to find the base of the similar triangle. If the height of a right triangle is 4 cm long, with a scale factor of 2 you would calculate 4 Ways to Find Scale Factor - wikiHow (22) to find the height of the similar triangle.
  5. Advertisement

Method 3

Method 3 of 4:

Completing Sample Problems

Download Article

  1. 1

    Find the scale factor of these similar figures: a rectangle with a height of 6 cm, and a rectangle with a height of 54 cm.

    • Create a ratio comparing the two heights. Scaling up, the ratio is 4 Ways to Find Scale Factor - wikiHow (25). Scaling down, the ratio is 4 Ways to Find Scale Factor - wikiHow (26).
    • Simplify the ratio. The ratio 4 Ways to Find Scale Factor - wikiHow (27) simplifies to 4 Ways to Find Scale Factor - wikiHow (28). The ratio 4 Ways to Find Scale Factor - wikiHow (29) simplifies to 4 Ways to Find Scale Factor - wikiHow (30). So the two rectangles have a scale factor of 4 Ways to Find Scale Factor - wikiHow (31) or 4 Ways to Find Scale Factor - wikiHow (32).
  2. 2

    Try this problem. An irregular polygon is 14 cm long at its widest point. A similar irregular polygon is 8 inches at its widest point. What is the scale factor?

    • Irregular figures can be similar if all of their sides are in proportion. Thus, you can calculate a scale factor using any dimension you are given.[10]
    • Since you know the width of each polygon, you can set up a ratio comparing them. Scaling up, the ratio is 4 Ways to Find Scale Factor - wikiHow (34). Scaling down, the ratio is 4 Ways to Find Scale Factor - wikiHow (35).
    • Simplify the ratio. The ratio 4 Ways to Find Scale Factor - wikiHow (36) simplifies to 4 Ways to Find Scale Factor - wikiHow (37). The ratio 4 Ways to Find Scale Factor - wikiHow (38) simplifies to 4 Ways to Find Scale Factor - wikiHow (39). So the two irregular polygons have a scale factor of 4 Ways to Find Scale Factor - wikiHow (40) or 4 Ways to Find Scale Factor - wikiHow (41).
  3. 3

    Use the scale factor to answer this problem. Rectangle ABCD is 8cm x 3cm. Rectangle EFGH is a larger, similar rectangle. Using a scale factor of 2.5, what is the area of Rectangle EFGH?

    • Multiply the height of Rectangle ABCD by the scale factor. This will give you the height of Rectangle EFGH: 4 Ways to Find Scale Factor - wikiHow (43).
    • Multiply the width of Rectangle ABCD by the scale factor. This will give you the width of Rectangle EFGH: 4 Ways to Find Scale Factor - wikiHow (44).
    • Multiply the height and width of Rectangle EFGH to find the area: 4 Ways to Find Scale Factor - wikiHow (45). So, the area of Rectangle EFGH is 150 square centimeters.
  4. Advertisement

Method 4

Method 4 of 4:

Finding the Scale Factor in Chemistry

Download Article

  1. 1

    Divide the molar mass of the compound by that of the empirical formula. When you have the empirical formula of a chemical compound and you need to find the molecular formula of that same chemical compound, you can find the scaling factor you need by dividing the molar mass of the compound by the molar mass of the empirical formula.

    • For example, you might need to find the molar mass of an H2O compound with a molar mass of 54.05 g/mol.
      • The molar mass of H2O is 18.0152 g/mol.
      • Find the scaling factor by dividing the molar mass of the compound by the molar mass of the empirical formula:
      • Scaling factor = 54.05 / 18.0152 = 3
  2. 2

    Multiply the empirical formula by the scaling factor. Multiply the subscripts of each element within the empirical formula by the scaling factor you just calculated. This will give you the molecular formula of the chemical compound sample involved in the problem.

    • For example, to find the molecular formula of the compound in question, multiply the subscripts of H20 by the scaling factor of 3.
      • H2O * 3 = H6O3
  3. 3

    Write the answer. With this answer, you have successfully found the answer to the empirical formula as well as the molecular formula of the chemical compound involved in the problem.

    • For example, the scaling factor for the compound is 3. The molecular formula of the compound is H6O3.
  4. Advertisement

Community Q&A

Search

Add New Question

  • Question

    Once I have found the scale factor how do I enlarge by the scale factor?

    4 Ways to Find Scale Factor - wikiHow (50)

    Community Answer

    Enlarge the figure by multiplying each side by the scale factor.

    Thanks! We're glad this was helpful.
    Thank you for your feedback.
    If wikiHow has helped you, please consider a small contribution to support us in helping more readers like you. We’re committed to providing the world with free how-to resources, and even $1 helps us in our mission.Support wikiHow

    YesNo

    Not Helpful 20Helpful 44

  • Question

    How do you find the linear scale factor of an irregular shape?

    4 Ways to Find Scale Factor - wikiHow (51)

    Community Answer

    You can find the scale factor of an irregular shape just as you would find the scale factor of a regular shape. As long as you know that the two shapes are similar, you can use one dimension on both figures to calculate the scale factor. For example, if you know the width of the shape, divide one width by the other to find the scale factor.

    Thanks! We're glad this was helpful.
    Thank you for your feedback.
    If wikiHow has helped you, please consider a small contribution to support us in helping more readers like you. We’re committed to providing the world with free how-to resources, and even $1 helps us in our mission.Support wikiHow

    YesNo

    Not Helpful 19Helpful 26

  • Question

    Are scale factors always fractions?

    4 Ways to Find Scale Factor - wikiHow (52)

    Donagan

    Top Answerer

    Yes, although the fraction could be either less than or greater than 1.

    Thanks! We're glad this was helpful.
    Thank you for your feedback.
    If wikiHow has helped you, please consider a small contribution to support us in helping more readers like you. We’re committed to providing the world with free how-to resources, and even $1 helps us in our mission.Support wikiHow

    YesNo

    Not Helpful 14Helpful 32

See more answers

Ask a Question

200 characters left

Include your email address to get a message when this question is answered.

Submit

      Advertisement

      Video

      Tips

      Submit a Tip

      All tip submissions are carefully reviewed before being published

      Name

      Please provide your name and last initial

      Submit

      Thanks for submitting a tip for review!

      You Might Also Like

      How toCalculate PercentagesHow toUse an Abacus
      The Trachtenberg Method: Learn to Calculate Multi-Digit Numbers Quickly How to Use the Percent Change FormulaHow toCalculate RatiosHow toMeasure CentimetersHow toCalculate Percentage IncreaseHow toFind the Y InterceptHow toWrite Numbers in WordsHow to Calculate Percentages on a CalculatorHow toFind the Domain of a FunctionHow toMeasure GramsHow toInterpolateHow toCalculate Pi

      Advertisement

      More References (1)

      About This Article

      4 Ways to Find Scale Factor - wikiHow (67)

      Co-authored by:

      Mario Banuelos, PhD

      Associate Professor of Mathematics

      This article was co-authored by Mario Banuelos, PhD. Mario Banuelos is an Associate Professor of Mathematics at California State University, Fresno. With over eight years of teaching experience, Mario specializes in mathematical biology, optimization, statistical models for genome evolution, and data science. Mario holds a BA in Mathematics from California State University, Fresno, and a Ph.D. in Applied Mathematics from the University of California, Merced. Mario has taught at both the high school and collegiate levels. This article has been viewed 916,761 times.

      11 votes - 60%

      Co-authors: 40

      Updated: January 26, 2024

      Views:916,761

      Categories: Mathematics

      Article SummaryX

      To find scale factor, start by finding the length of a corresponding side on each figure. If you're scaling up from a smaller figure to a larger one, plug the lengths into the equation scale factor = larger length over smaller length. If you're scaling down from a larger figure to a smaller one, use the equation scale factor = smaller length over larger length. Plug in the lengths and simplify the fraction to find the scale factor. If you want to learn how to find the scale factor in chemistry, keep reading the article!

      Did this summary help you?

      In other languages

      German

      Spanish

      Russian

      French

      Indonesian

      Dutch

      Chinese

      Arabic

      Turkish

      • Print
      • Send fan mail to authors

      Thanks to all authors for creating a page that has been read 916,761 times.

      Reader Success Stories

      • 4 Ways to Find Scale Factor - wikiHow (68)

        Talyn Jilka

        Sep 28, 2018

        "I liked the examples of how to do the problem."

        Rated this article:

      More reader storiesHide reader stories

      Did this article help you?

      Advertisement

      4 Ways to Find Scale Factor - wikiHow (2024)

      References

      Top Articles
      Latest Posts
      Recommended Articles
      Article information

      Author: Edwin Metz

      Last Updated:

      Views: 6297

      Rating: 4.8 / 5 (78 voted)

      Reviews: 85% of readers found this page helpful

      Author information

      Name: Edwin Metz

      Birthday: 1997-04-16

      Address: 51593 Leanne Light, Kuphalmouth, DE 50012-5183

      Phone: +639107620957

      Job: Corporate Banking Technician

      Hobby: Reading, scrapbook, role-playing games, Fishing, Fishing, Scuba diving, Beekeeping

      Introduction: My name is Edwin Metz, I am a fair, energetic, helpful, brave, outstanding, nice, helpful person who loves writing and wants to share my knowledge and understanding with you.