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What else can I help you with?
How do you write a congruence statement for polygons?
You have to see it both the polygons measures to the same degree's & the same shape then that make's it congruent.
How are a pentagon and a octagon alike?
One similarity is that they are both polygons, and they are both geometric shapes.
All polygons can be constructed entirely from the repetition of a single length of line segment?
This is false. The statement would be true for regular polygons, but not all polygons are regular.
What is a similarity statement?
Δ ABC ~ Δ DEF, because ~ is the similarity symbol. Hope this helped!
What is an example of a false statement that has a true converse?
All four-sided polygons are squares. (False) Squares are all four-sided polygons. (True)
How do you write a congruence statement for polygons?
You have to see it both the polygons measures to the same degree's & the same shape then that make's it congruent.
Are these polygons similar?
these polygons arent similar one is turned sideways... * * * * * Don't know which polygons but turning sideways does not affect similarity
Which polygons in the diagram are images of polygon 1 under similarity transformations?
To determine which polygons in the diagram are images of polygon 1 under similarity transformations, look for polygons that maintain the same shape but may differ in size or orientation. Similarity transformations include scaling, rotation, and translation. Identify polygons that have corresponding angles equal and side lengths that are proportional to those of polygon 1. Without the diagram, it's not possible to specify which polygons meet these criteria.
Which statement is good generalization about all polygons?
Polygons are flat shapes with many sides
If a statement is true is it converse also true?
Not necessarily. If the statement is "All rectangles are polygons", the converse is "All polygons are rectangles." This converse is not true.
Write a statement describes regular polygons that can tessellate by themselves?
Each interior angle of a regular polygon that tessellates by itself is a factor of 360°.
How are a pentagon and a octagon alike?
One similarity is that they are both polygons, and they are both geometric shapes.
All polygons can be constructed entirely from the repetition of a single length of line segment?
This is false. The statement would be true for regular polygons, but not all polygons are regular.
What is a similarity statement?
Δ ABC ~ Δ DEF, because ~ is the similarity symbol. Hope this helped!
Which polygons in the diagram are images of polygon ABCD under similarity transformations?
To determine which polygons in the diagram are images of polygon ABCD under similarity transformations, look for shapes that maintain the same angles and have proportional side lengths compared to ABCD. Similarity transformations include translations, rotations, reflections, and dilations. Any polygon that matches these criteria will be a valid image of ABCD. Without the specific diagram, I cannot identify the exact polygons, but those that have these properties are the images.
Polygons abcd and efgh are similar. find the perimeter of abcd how many units?
To find the perimeter of polygon abcd, we need to know the lengths of its sides or the ratio of similarity between the two polygons. Since polygons abcd and efgh are similar, their perimeters are proportional to the corresponding sides. If you provide the perimeter of efgh and the ratio of similarity, I can help you calculate the perimeter of abcd.
What are som facts about similarity in math?
The 2 polygons must have corresponding angles. They also must have equivalent ratios.
