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.
Their corresponding angles are equal, or the ratio of the lengths of their corresponding sides is the same.
The ratio of the lengths of their corresponding sides.
Assuming you are already sure that the two objects are, indeed, similar: You measure corresponding lengths of the two objects, and divide.You measure the lengths of a pair of corresponding sides. The scale factor is the ratio of the two measures.
Any triangle whose sides are in the same ratio with the corresponding sides of ABC.
i dont kno but qwamane is cool looking though
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.
Scale factor.
Their corresponding angles are equal, or the ratio of the lengths of their corresponding sides is the same.
1:1
They are the same for pairs of corresponding sides.
You either show that the corresponding angles are equal or that the lengths of corresponding sides are in the same ratio.
It can be any number that you like, but once chosen, it remains the same for each pair of corresponding sides.
The scale or scaling factor.
The ratio of the lengths of their corresponding sides.
scale factor