If the rule (x, y) ¡ú (x + 3, y ¨C 3) is applied to the original triangle, give the coordinates of and draw the image. Show your work for calculating the coordinates of the resulting image.

To apply the transformation rule (x, y) ¡ú (x + 3, y ¨C 3) to the original triangle, you need to apply the rule to each vertex of the triangle.

Let's assume the original triangle has vertices A, B, and C, with coordinates (x1, y1), (x2, y2), and (x3, y3) respectively.

To find the coordinates of the resulting image, we will apply the transformation rule to each vertex. Here's how:

1. Apply the rule to vertex A:
New x-coordinate of A = x1 + 3
New y-coordinate of A = y1 - 3

2. Apply the rule to vertex B:
New x-coordinate of B = x2 + 3
New y-coordinate of B = y2 - 3

3. Apply the rule to vertex C:
New x-coordinate of C = x3 + 3
New y-coordinate of C = y3 - 3

These new coordinates will give you the vertices of the resulting image. Now, you can draw the new triangle using these coordinates.

Please note that to complete the calculation and provide the coordinates and drawing of the resulting image, you would need to know the actual coordinates of the original triangle.