Final answer:
Without the image of polygons ABCD and EFGH, it's impossible to determine their similarity. For Mya to prove similarity, corresponding angles must be equal, and the side ratios must be consistent, in which case ABCD would be similar to EFGH.
Step-by-step explanation:
To determine if two polygons are similar, we need to check if they have the same shape, which means their corresponding angles are equal, and if their sides are proportional to each other.
Unfortunately, since there is no image provided for polygons ABCD and EFGH, I cannot visually compare them. However, to check for similarity, Mya would typically:
- Verify that each pair of corresponding angles between ABCD and EFGH are congruent.
- Confirm that the ratio of the lengths of any two corresponding sides of ABCD is equal to the ratio of the lengths of the corresponding sides in EFGH.
If all corresponding angles are equal and the side length ratios are constant, then polygon ABCD is similar to polygon EFGH. Otherwise, polygon ABCD is not similar to EFGH.
The complete question is: Mya’s teacher asked her to draw a polygon similar to polygon ABCD. Here is her work. Is polygon ABCD similar to polygon EFGH?
a) Yes
b) No is: