Scale Factor | Definition, Formula & How To Find (2024)

Written by

Malcolm McKinsey

January 11, 2023

Fact-checked by

Paul Mazzola

Scale factor definition

Ascale factorin math is the ratio between corresponding measurements of an object and a representation of that object. If the scale factor is a whole number, the copy will be larger. If the scale factor is a fraction, the copy will be smaller.

A scale factor ratio can be expressed as a fraction, $\frac{1}{2}$ 21, or a colon, 1:2.

Scale Factor | Definition, Formula & How To Find (1)

Aratiomeasures the relationship between two things. You could create a ratio of left-handed students to all students, but that ratio isnota scale factor.

Get free estimates from geometry tutors near you.

How to find scale factor

To find the scale factor, you first decide which direction you are scaling:

Finding scale factor of similar figures

Here are two similar triangles. What is the scale factor used to create the second, larger figure?

Scale Factor | Definition, Formula & How To Find (4)

Since we are scalingup, we divide the larger number by the smaller number:

$\frac{36}{12}=\frac{3}{1}=3$ 1236=13=3

Thescale factor is3. To go from legs of12cmto legs of36cm, we needed to multiply12cmtimes3.

Now, let's try to scale down. Here are two similar pentagons. What is the scale factor used to create the second, smaller figure?

Scale Factor | Definition, Formula & How To Find (5)

Because we are scaling down, we divide corresponding side lengths (smaller number by larger number):

$\frac{3}{21}=\frac{1}{7}$ 213=71

Thescale factor is $\frac{1}{7}$ 71. To get the second, smaller figure, we multiply $21\times \frac{1}{7}$ 21×71; the figure on the right uses a scale factor of1:7, $\frac{1}{7}$ 71, orone−seventh.

Let's look at one more example and scale both up and down. Consider these two similar right triangles with labeled sides.

Scale Factor | Definition, Formula & How To Find (6)

If we have the little right triangle above and want to scale it up to the larger triangle, we write this:

$\frac{185}{37}=\frac{5}{1}$ 37185=15

The scale factor of the right triangle is 5:1. So every other linear measure is multiplied by 5 to scale them up.

If we have the big right triangle and want to scale it down to make the smaller one, we write this:

Scale factor in geometry

Scale is used in geometry to make accurate reproductions of figures; they are different sizes but not proportion. Figures are similar but to scale.

Scale factor is used on similar geometric figures. You can find the scale factor of corresponding angles, sides, and even diagonals.

How to reduce a shape by a scale factor?

Suppose you are given a figure and told toreduce it by25%. Think in steps:

Are you making a larger or smaller dilation?
You are shrinking the original, so your scale factor will be less than a whole number.
Next, measure (or read) any side of the figure and do some math.

Suppose we have a rectangle that is16in.wide and we need to reduce it by25%, or one-quarter ( $\frac{1}{4}$ 41).

That means it will be75%of the original (100%−25%=75%). We will use or3:4as our scale factor.

Multiply16× $\frac{3}{4}$ 43:

$\frac{16}{1}\times \frac{3}{4}=\frac{48}{4}$ 116×43=448

Now, we simplify our answer:

$\frac{48}{4}=\frac{12}{1}=\mathbf{12}in\mathbf{.}$ 448=112=12in.

The width of our smaller new shape must be12in.. We repeat these steps with the other dimension,6in.:

$\frac{6}{1}\times \frac{3}{4}=\frac{18}{4}$ 16×43=418

Simplify:

$\frac{18}{4}\times \frac{4.5}{1}=\mathbf{4.5}in\mathbf{.}$ 418×14.5=4.5in.

The height of our smaller rectangle must be4.5 inches.

How to make a scale model

Ascale modelis a model accurate to a scale factor. If the copy of the actual object is not made to scale, it will look unrealistic, like a little child's toy.

Scale Factor | Definition, Formula & How To Find (7)

One object can have different scales too. The greater the difference between the two numbers of the ratio, the smaller the model will be. A model that is1:87is generally going to be a lot smaller than a model with a ratio of1:12.

To make scale models, you need accurate plans of the original item, like ascale drawing. A scale drawing is an accurate plan of the real object, drawn using a scale factor to make the drawing small enough to handle.

Get free estimates from geometry tutors near you.

You multiply every printed dimension on the scale drawing by your scale factor to get the right sizes for model parts. If, for instance, you wanted to build a simple shed for your model railroad scene, you would use the ratio $\frac{1}{87}$ 871, so a32-footlong shed would come out4.4incheslong!

Scale factor examples

Try your hand at these questions to see if you understand the concept of scale factor in mathematics. Don’t shrink from it! Make an outsized effort!

What is the definition of scale factor?
How do you find the scale factor of similar figures?
What information does a scale factor give?
Define a scale drawing.

Please do not peek ahead until you try your best to find the answers.

The definition of scale factor is that it is a number that multiplies times a given quantity to produce a smaller or larger version of the original number. It is the ratio of a drawing, map, model, or blueprint to the actual object or distance.
You calculate the scale factor of similar figures by taking the ratio of corresponding parts of the two figures. When enlarging the shape, the larger measurement is the numerator, and the smaller measurement is the denominator. When shrinking the shape, the smaller measurement is the numerator, and the larger measurement is the denominator.
A scale factor gives the ratio of the representation to the actual object.
A scale drawing is an accurate drawing of an object done using a scale factor to shrink the original object's dimensions.

How to use scale factor

Scaling an object helps you visualize large real-world objects in small spaces or enlarge a small object for better viewing. Scale factor is how we ensure the representation of the object differs only in size from the original object.

We use scale to:

Draw similar figures in geometry
Make scale models
Draw scale blueprints of architecture and machinery

A common real-world use of scale factor is to bring vast areas of land down to small pieces of paper, like on a map.

Scale is used to allow designers, architects, and machinists to handle models of objects that would be too big to keep on a if they were actual size.

FAQs

Scale Factor | Definition, Formula & How To Find? ›

The scale factor can be calculated when the new dimensions and the original dimensions are given. The basic formula to find the scale factor of a figure is: Scale factor = Dimension of the new shape ÷ Dimension of the original shape.

Tell Me More ›

How to find scale factor formula? ›

To find the scale factor, first find the corresponding sides on the two figures. Then, divide the measurement of the new figure by the measurement of the original figure. The resulting value is your scale factor, or how many times larger or smaller your new figure is compared to the original.

Learn More ›

How do you scale by factor? ›

A scale factor describes how much a shape has been scaled up or down. To do this, you multiply every side length of a shape by the scale factor to increase or decrease the size. The sizes of the angles do not change. Changing a shape by a scale factor greater than 1 will make the shape a larger figure.

Show Me More ›

What is the formula for calculating the scale factor of a map? ›

To find the scale factor, you would take the measurement of one block on the map (2 inches) and divide it by the measurement of one block in real life (200 feet). This would give you a scale factor of 1:12,000 (or 1/12,000). Now that you know how to find the scale factor, let's look at some examples.

See Details ›

What is an example of a scale in math? ›

Scale is the ratio that defines the relation between the actual figure and its model. It is used in maps to represent the actual figures in smaller units. For example, a scale of 1:5 means 1 on the map represents the size of 5 in the real world.

Get More Info ›

What does it mean to find the scale factor? ›

A scale factor in math is the ratio between corresponding measurements of an object and a representation of that object. If the scale factor is a whole number, the copy will be larger. If the scale factor is a fraction, the copy will be smaller.

Know More ›

What is a scale factor in math in 7th grade? ›

VOCABULARY. ● Scale Factor: The ratio of any two corresponding lengths in two similar. geometric figures.

Find Out More ›

How do you find the scale factor with coordinates? ›

(x,y) → (kx,ky). In this case, if we divide the coordinates of the new vertices by the coordinates of the original vertices, we can get the scale factor.

Keep Reading ›

What is an example of a map scale factor? ›

It is given as a ratio of inches on the map corresponding to inches, feet, or miles on the ground. For example, a map scale indicating a ratio of 1:24,000 (in/in), means that for every 1 inch on the map, 24,000 inches have been covered on the ground. Ground distances on maps are usually given in feet or miles.

Learn More Now ›

How do you find the scale factor and perimeter? ›

The perimeter of a scaled object can be determined by multiplying the scale factor by its original perimeter. For example, if the scale factor is three, the new object's perimeter will be three times the original. Similarly, the area of a scaled object is equal to the square of its scale factor.

Find Out More ›

What is a scale factor in math for kids? ›

A scale factor is defined as the ratio between the scale of a given original object and a new object, which is its representation but of a different size (bigger or smaller). For example, if we have a rectangle of sides 2 cm and 4 cm, we can enlarge it by multiplying each side by a number, say 2.

How to figure out a scaled copy? ›

A scaled copy is a copy of an figure where every length in the original figure is multiplied by the same number. For example, triangle DEF is a scaled copy of triangle ABC. Each side length on triangle ABC was multiplied by 1.5 to get the corresponding side length on triangle DEF.