
Similar Figures (Online Tutorial #21)
Presentation
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Mathematics
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8th Grade
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Medium
Standards-aligned
Robert Dohnal
Used 6+ times
FREE Resource
22 Slides • 2 Questions
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Similar Figures and their Proportionality
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Multiple Choice
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Multiple Choice
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During translations, reflections, and rotations, the pre image and image are congruent
During a dilation, the pre image and image are similar. Let's talk about the difference...
Congruent vs Similar
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Congruent figures are both the same size and the same shape. Therefore all the side lenghts of the image are the same as the pre image.
Congruent
SImilar figures are the same shape but different sizes. What's special about them is their proportionality.
Similar
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We can set up proportions of corresponding sides of similar figures to solve for a missing side length.
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Similar Figures
same shape, different size
think blowing up or shrinking an image on a copier
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Congruence
Figures are congruent if all corresponding parts are congruent or equal.
Transformations that maintain congruence (do not change size of the figure):
- translations
- rotations
- reflections
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Corresponding parts of congruent shapes are congruent.
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Similar Figures
Figures are similar if the corresponding parts are proportional. In other words, there is a common ratio between the corresponding parts of the figures (scale factor of the dilation)
Similar figures are the same shape but different sizes. Dilations can be used to map one similar figure onto another
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Similar Figures
These two triangles are similar because DEF can be mapped to ABC through a dilation, rotation, and translation
Note the symbol to indicate two figures are similar
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Using Similarity to solve problems
To find missing sides using similarity, you must first find the scale factor or common ratio between the corresponding sides
As you see in the example, all of the sides have a ratio of 1/2 comparing the small triangle to the large triangle
All of the angle are the same as is true in all similar figures.
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Using Similarity to solve problems
To find the value for x, the ratio must be the same as the other sides shown.
The scale factor is 2 so 2x8=16. 16 would be the value for x.
You try to find the value for y and enter it on the next slide
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Visual:
Subject | Subject
Some text here about the topic of discussion
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Similar Shapes
Have equal angles and proportional sides
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Equal Angles
Triangles have interior angles that add up to 180 degress
Remember
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All the sides use the same rule
Similar if...
Similarity
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Multiply or divide by the scale factor to find the missing length
Find the missing side
Divide the known corresponding lengths to find the scale factor
Tips: make sure you are comparing matching sides
Double check if you should be multiplying or dividing
First, identify the rule
Finding Missing Side Lengths
Similar Figures and their Proportionality
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