No.
You could, for example, have a square and a rhombus with sides twice as large.
true
Yes, the corresponding sides of similar triangles have proportional lengths. This means that the ratios of the lengths of corresponding sides are equal. For example, if two triangles are similar, the ratio of the lengths of one triangle's sides to the lengths of the other triangle's corresponding sides will be the same across all three pairs of sides. This property is fundamental in solving problems related to similar triangles.
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.
i dont kno but qwamane is cool looking though
To determine which pair of rectangles contains similar polygons, you need to check if their corresponding angles are equal and their sides are proportional. Rectangles are inherently similar to each other since all angles are 90 degrees and the lengths of sides can vary while maintaining the ratio. Thus, any pair of rectangles will contain similar polygons, as they share the same shape but can differ in size.
True
Yes, the corresponding sides of two similar regular polygons must have equal lengths. This is because both the polygons are similar, which means that since they are also polygons, they must have equal lengths.
It is a statement about the relationship of the lengths of corresponding sides of some unspecified figures.
It is a statement about the relationship of the lengths of corresponding sides of some unspecified figures.
It is a statement about the relationship of the lengths of corresponding sides of some unspecified figures.
Proportional.
similar
Two polygons are similar if:the ratio of the lengths of their corresponding sides is the same, andtheir corresponding angles are equal.
Yes, similar figures always have congruent corresponding angles and proportional corresponding side lengths.
a double triangle
true
1:1