Use the graph to answer the question.

To determine the coordinates of point C after the transformations, we first need to understand how reflection across the y-axis and then the x-axis affects the point's coordinates.

1. **Reflecting across the y-axis**:
- This transformation changes the x-coordinate of the point to its opposite. Therefore, if point C has coordinates \((x, y)\), after reflecting it across the y-axis, the new coordinates will be \((-x, y)\).

2. **Reflecting across the x-axis**:
- This transformation changes the y-coordinate of the point to its opposite. So, if the coordinates after the first reflection are \((-x, y)\), after reflecting across the x-axis, the coordinates will become \((-x, -y)\).

If you provide the original coordinates of point C, I can help you calculate the final coordinates after both transformations.

1 y 1 x

It appears that you provided the coordinates of point C as \( (1, 1) \). Let's apply the reflections:

1. **Reflect across the y-axis**:
- The original coordinates of point C are \( (1, 1) \).
- Reflecting across the y-axis gives us \( (-1, 1) \).

2. **Reflect across the x-axis**:
- Taking the coordinates after the first reflection, \( (-1, 1) \).
- Reflecting this point across the x-axis gives us \( (-1, -1) \).

Thus, after both transformations, the coordinates of the image of point C are \( (-1, -1) \).