If two parallelograms are similar,what do you know about the ratios of the two side lengths within one parallelogram and the ratios of the corresponding side lengths in the other parallelogram?
the aswer is the scale factor is the ratios would be the side length of the corresponding side lengths
can anybody help me what is the similar parallelogram ratio two adjacent side length.
If two parallelograms are similar, it means that their corresponding angles are congruent and the ratios of their corresponding side lengths are equal.
In other words, for one parallelogram, if the ratio of the lengths of two corresponding sides is, for example, 3:5, then the ratio of the lengths of the corresponding sides in the other parallelogram will also be 3:5.
This ratio is called the scale factor, and it represents how the size of one parallelogram compares to the other. So, if the scale factor is 2, it means that the corresponding side lengths in one parallelogram are twice as long as the corresponding side lengths in the other parallelogram.
To understand the ratios of side lengths in similar parallelograms, it's helpful to know what it means for two parallelograms to be similar. Similarity in geometry means that the two shapes have the same shape, but not necessarily the same size. In other words, the angles of the two parallelograms are congruent, and the corresponding sides are proportional.
For two similar parallelograms, the ratio of any two corresponding side lengths in one parallelogram will be equal to the ratio of the corresponding side lengths in the other parallelogram. This ratio is known as the scale factor.
Let's say we have two similar parallelograms, parallelogram A and parallelogram B. If we choose a pair of corresponding sides, such as side AB in parallelogram A and side DE in parallelogram B, and we determine that the length of side AB is twice the length of side DE, then the scale factor between the two parallelograms is 2:1. This means that all corresponding side lengths in parallelogram A are twice the length of the corresponding side lengths in parallelogram B.
In summary, if two parallelograms are similar, the ratios of the corresponding side lengths within one parallelogram are equal to the ratios of the corresponding side lengths in the other parallelogram.