Reflections as Functions Practice Complete this assessment to review what you’ve learned. It will not count toward your grade. 4 of 54 of 5 Items Question Use the image to answer the question. The left parabola is a reflection of the right parabola. Enter the coordinate on the left parabola that corresponds to the identified coordinate on the right parabola. (1 point) (,) Remaining Attempts : 3 Skip to navigation page 13 of 14 Formula keypad has been closed. Press Control + Backslash to open it again.Formula keypad has been closed. Press Control + Backslash to open it again.Formula keypad has been closed. Press Control + Backslash to open it again.

To provide an accurate answer, I'll need a bit more information about the specific coordinates of the parabolas in the provided image. However, I can explain how to find the corresponding coordinates of a reflection between two parabolas if they are reflections across a line, commonly the y-axis or x-axis.

General Steps to Find Corresponding Coordinates:

1. Identify the Axis of Reflection:

   • If the reflection is across the y-axis, the coordinates (x, y) on the right parabola will correspond to (-x, y) on the left parabola.
   • If the reflection is across the x-axis, the coordinates will correspond to (x, -y).

2. Apply the Reflection:

   • Depending upon the identified reflection axis:
     • For y-axis reflection: If you have a point (x, y) on the right parabola, the corresponding point on the left will be (-x, y).
     • For x-axis reflection: If you have a point (x, y) on the right parabola, the corresponding point on the left will be (x, -y).

3. Enter the Result:

   • Write the new coordinates as instructed.

If you have the specific coordinates of the identified point on the right parabola (e.g., (x, y)), please provide those details, and I can give the exact reflection point on the left parabola!