A four-sided figure is resized to create a scaled copy. The proportional relationship between any given side length in the original figure, f, and the corresponding side length in the scaled copy, s, can be represented by the equation s, equals, one sixth, fs=
6
1
f. What is the scale factor from the original figure to the scaled copy?
The equation s = (1/6)f represents the proportional relationship between the side lengths of the original figure and the scaled copy. The scale factor is the ratio of the corresponding side lengths in the original figure and the scaled copy.
From the equation, we can see that the scale factor is 1/6.
To find the scale factor from the original figure to the scaled copy, we compare the corresponding side lengths.
According to the given equation s = (1/6)f, we know that the corresponding side length in the scaled copy, s, is equal to one sixth of the corresponding side length in the original figure, f.
This means that the scale factor from the original figure to the scaled copy is 1/6.
The equation given to represent the proportional relationship between the side lengths of the original figure and the scaled copy is:
s = (1/6)f
The scale factor represents the ratio of the corresponding side lengths between the original figure and the scaled copy. By comparing the equation with the standard form for a proportional relationship, y = kx, we can determine that the scale factor is 1/6.