The reflection of Figure A across a line results in an inverted image where each point maintains an equal distance to the horizontal line. The correct answer is Figure B in box 2.
The reflection of Figure A across a given line results in an inversion of the figure, meaning that each point in the reflected figure has an equal distance to the horizontal line as its corresponding point in Figure A.
This geometric transformation essentially flips Figure A across the line, maintaining a symmetrical relationship with respect to the line of reflection. Consequently, the reflection ensures that corresponding points maintain a consistent distance from the line, creating a mirrored image.
In this context, the answer is identified as "Figure B in box 2." The description suggests that Figure B, representing the reflected image, is correctly positioned in the designated region denoted as box 2.
This transformation adheres to the principles of reflection, emphasizing the symmetrical arrangement of points relative to the specified line.