Proportional.
Yes, similar figures always have congruent corresponding angles and proportional corresponding side lengths.
Yes, similar figures always have congruent corresponding angles and proportional corresponding side lengths.
ratio
Corresponding
It's when a figure is rotated, reflected , translated etc but the corresponding angles and side lengths stay the same.
The scale factor is the number that the side lengths of one figure can be multiplied by to give the corresponding side lengths of the other figure.
The scale factor is the number that the side lengths of one figure can be multiplied by to give the corresponding side lengths of the other figure.
They are the same for pairs of corresponding sides.
Corresponding sides of similar figures are proportional.
To find the scale factor of a figure to a similar figure, you can compare corresponding linear dimensions, such as side lengths or heights. Divide the length of a side of the original figure by the length of the corresponding side of the similar figure. The resulting value is the scale factor, which indicates how much larger or smaller one figure is compared to the other. Ensure that both figures are oriented similarly for an accurate comparison.
If and when two parallelograms are similar, you know that the ratio of two side lengths within one parallelogram will describe the relationship between the corresponding side lengths in a similar parallelogram. If and when two parallelograms are similar, you know that the ratio of corresponding side lengths in the other parallelogram will give you the scale factor that relates each side length in one parallelogram to the corresponding side length in a similar parallelogram.
The number used to multiply the lengths of a figure to stretch or shrink it to a similar image. If we use a scale factor of 3, all the corresponding lengths in the original side lengths will be multiplied by three.
The ratio of corresponding side lengths in similar figures is proportional, meaning that if two shapes are similar, the lengths of their corresponding sides will maintain a constant ratio. This ratio is consistent regardless of the size of the shapes, allowing for the comparison of their dimensions. For example, if one triangle has side lengths of 3, 4, and 5, and another similar triangle has side lengths of 6, 8, and 10, the ratio of corresponding sides is 1:2. This proportionality is fundamental in geometry for solving problems involving similar shapes.
Yes, similar figures always have congruent corresponding angles and proportional corresponding side lengths.
Yes, similar figures always have congruent corresponding angles and proportional corresponding side lengths.
False. The statement should be: If the corresponding side lengths of two triangles are congruent, and the triangles are similar, then the corresponding angles are also congruent.
ratio