if you used the rule (6x, 6y) to transform Mug into a new figure, how would the angles of the new figure compare to Mugs angles
To determine how the angles of the new figure compare to Mug's angles after applying the transformation rule (6x, 6y), we need to understand what the rule implies. The rule (6x, 6y) suggests that each point in Mug is transformed by multiplying its x-coordinate by 6 and its y-coordinate by 6.
The transformation rule (6x, 6y) is a scalar multiplication, where both the x and y coordinates of a point are multiplied by the same factor of 6. This will result in the new figure being six times larger in both the horizontal and vertical directions.
When a shape is scaled uniformly (in this case, by a factor of 6), its angles remain the same. So, after applying the transformation rule (6x, 6y), the angles of the new figure will be congruent to the angles of Mug. They will retain the same measures as the angles of the original figure.
Therefore, the angles of the new figure will have the same measures as the angles of Mug.