Similar Figures 7th Grade Worksheets

📆 Updated: 1 Jan 1970
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🔖 Category: 7th Grade

Are you a 7th grade math teacher or a parent assisting your child with their math studies? If so, you're likely in search of worksheets that will help reinforce the concept of similar figures. Look no further! In this blog post, we will explore a variety of worksheets designed specifically for 7th graders to solidify their understanding of similar figures.



Table of Images 👆

  1. 6th Grade Math Ratio Word Problems
  2. Surface Area and Volume Worksheets Grade 6
  3. Perimeter and Area Worksheets Grade 3
  4. Equations Creative Publications
  5. 8th Grade Scale Factor Dilations Worksheet
  6. Algebra with Pizzazz Page
  7. 4th Grade Math Word Problems
  8. Types of Quadrilaterals Worksheet
6th Grade Math Ratio Word Problems
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Surface Area and Volume Worksheets Grade 6
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Perimeter and Area Worksheets Grade 3
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Equations Creative Publications
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8th Grade Scale Factor Dilations Worksheet
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Algebra with Pizzazz Page
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4th Grade Math Word Problems
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Types of Quadrilaterals Worksheet
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Types of Quadrilaterals Worksheet
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Types of Quadrilaterals Worksheet
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Types of Quadrilaterals Worksheet
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Types of Quadrilaterals Worksheet
Pin It!   Types of Quadrilaterals WorksheetdownloadDownload PDF

Types of Quadrilaterals Worksheet
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Types of Quadrilaterals Worksheet
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Types of Quadrilaterals Worksheet
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Types of Quadrilaterals Worksheet
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Types of Quadrilaterals Worksheet
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Types of Quadrilaterals Worksheet
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What are similar figures?

Similar figures are geometric figures that have the same shape but not necessarily the same size. They have corresponding angles that are equal and corresponding sides that are proportional. This means that if you were to scale one figure by a certain factor, you would get the other figure. Examples of similar figures include rectangles, circles, triangles, and hexagons.

How can you determine if two figures are similar?

Two figures are considered similar if their corresponding angles are congruent and their corresponding sides are in proportion. This means that the ratios of the lengths of corresponding sides in the two figures are equal. To determine if two figures are similar, you can compare the angles to see if they are congruent and compare the lengths of the sides to see if they are in the same ratio.

What is the corresponding side length ratio in similar figures?

The corresponding side length ratio in similar figures is when the lengths of corresponding sides of two similar figures are in proportional relationship. This means that if two figures are similar, then the ratio of the length of a side in one figure to the length of the corresponding side in the other figure remains constant.

What is the corresponding angle measure ratio in similar figures?

The corresponding angle measure ratio in similar figures is equal, meaning that the corresponding angles in two similar figures are congruent and have the same measure.

How do you find the missing side length in a pair of similar figures?

To find the missing side length in a pair of similar figures, you can set up a proportion by comparing the lengths of the corresponding sides in each figure. Then, cross multiply to solve for the missing side length. This method works because corresponding sides of similar figures are in proportion to each other.

How do you find the missing angle measure in a pair of similar figures?

To find the missing angle measure in a pair of similar figures, you can use the property that corresponding angles of similar figures are congruent. Identify the corresponding angles in the two similar figures and set up a proportion using the known angle measures. Then, solve for the missing angle measure by cross-multiplying and dividing. By applying this method, you can determine the value of the missing angle in the pair of similar figures.

What is the scale factor between two similar figures?

The scale factor between two similar figures is the ratio of the lengths of corresponding sides of the figures. It is calculated by dividing the length of a side of one figure by the length of the corresponding side of the other figure. This scale factor remains constant as long as the figures are similar, meaning they have the same shape but possibly different sizes.

How does the area of similar figures relate to their side length ratio?

The ratio of the areas of similar figures is equal to the square of the ratio of their corresponding side lengths. This is known as the scale factor. Therefore, if the side length ratio between two similar figures is \(a:b\), then the ratio of their areas is \((a/b)^2\). This means that if the side length ratio is doubled, the area ratio will be quadrupled, and if the side length ratio is halved, the area ratio will be one-fourth.

Can similar figures have different orientations?

Yes, similar figures can have different orientations. Similar figures have the same shape but can be scaled, flipped, rotated, or translated in any direction without changing their similarity. This means that the orientation or direction in which the figures are positioned can differ while still maintaining their similarity.

How do you use similar figures to find unknown measurements in real-world situations?

To use similar figures to find unknown measurements in real-world situations, you can set up proportions with corresponding sides of the similar figures. By comparing these proportions, you can solve for the unknown measurements. For example, if you have two similar triangles and know the length of one side in one triangle, you can use the corresponding sides to set up a proportion and find the length of an unknown side in the other triangle. This concept can be applied in various situations such as calculating heights of buildings or trees, determining distances in maps, or estimating sizes of objects in photographs.

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