The smaller rectangular piece Ryan cuts from an 8x6 fabric, with a scale factor of 1/4, has a top-left vertex at A'(-2, 4.5) compared to A(-4, 3).
Ryan's original piece of fabric is 8 feet long and 6 feet wide. The scale factor for the smaller, similar rectangular piece he wants to cut is k = 1/4. To find the dimensions of the smaller piece, we multiply the dimensions of the original piece by the scale factor.
The length of the smaller piece will be 8 * (1/4) = 2 feet, and the width will be 6 * (1/4) = 1.5 feet.
Now, let's consider the coordinates of the top-left vertex A(-4,3) for both pieces. Since the scale factor applies uniformly to all dimensions, we can use it to find the new coordinates. The x-coordinate will be shifted by 8 * (1/4) = 2 units, and the y-coordinate will be shifted by 6 * (1/4) = 1.5 units.
Therefore, the coordinates of the top-left vertex for the smaller piece will be A'(-2, 4.5).