Want this question answered?
ratio
In order to find their ratio, we need to know the two lengths.
If the ratio of side lengths is 49 (that is 49 to 1) then the ratio of their volumes is 493 to 1, which is 117,649 to 1.
18:32
Measure the length of a side in the first figure = L1. Measure the length of the corresponding side in the second figure = L2. Then, provided L1 and L2 are in the same units, the relevant ratio is L1/L2.
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.
You call it similarity.
Proportional.
Yes, similar figures always have congruent corresponding angles and proportional corresponding side lengths.
Corresponding sides of similar figures are proportional.
ratio
ratio
Yes, similar figures always have congruent corresponding angles and proportional corresponding side lengths.
Proportional side lengths refer to the relationship between the sides of two similar shapes. If two shapes have proportional side lengths, it means that corresponding sides of the shapes are in the same ratio. For example, if one shape has sides of lengths 2, 4, and 6, and a similar shape has sides of lengths 4, 8, and 12, the sides are in proportion since the ratios 2:4, 4:8, and 6:12 are all equal.
It is the same.