XYZ has coordinates X(12,9), Y(-1,4), and Z(8,16). After a dialation with a center at 0, X' is (3,1.8). What is the scale factor? What coordinate is Y' & Z'?

Hi, Courtney.

I can see why you are confused by this problem! But first, let's review dilations.

A dilation is a transformation that stretches or shrinks the original figure to produce a similar figure; the new figure is the same shape as the original, but a different size. 

The firgure is enlarged or reduced with respect to a fixed point called the center of dilation.

Remember ratios of similar figures? The scale factor is the ratio of the length of a side of the new figure to the corresponding side length of the original figure. For example, if the scale factor is 1/2, each side of the new figure will be 1/2 the size of the original. Also, when the scale factor is between 0 and 1, the dilation is a reduction. A scale factor greater than one would result in an enlargement.

Further, the scale factor is also the ratio of the distances from the center of dilation to the corresponding points of the figure (new distance to original distance).

If the center of dilation is the origin, then the coordinates are multiplied by the scale factor: (x,y) -> (kx, ky) where k is the scale factor.

To solve a problem like the one you presented, determine the scale factor by dividing the coordinates of X' by the corresponding coordinates of X. Then, multiply the other coordinates by that scale factor.

What is confusing about the problem you presented is that the scale factor is not consistent: 3/12 = .25, 1.8/9 = .2. If you plot them on the coordinate plane, they do not line up with the origin.  I'm guessing that there is a typo in either your original problem or the way that you entered it here.

Hope the explanation helps!