create a video the solve the problem.---Problem In the figure below, $ABCD$ is a rectangle with sides of length $AB = 5$ inches and $AD = 3$ inches. Rectangle $ABCD$ is rotated $90^\circ$ clockwise around the midpoint of side $DC$ to give a second rectangle. What is the total area, in square inches, covered by the two overlapping rectangles? Image Description: The image shows two overlapping rectangles. The first rectangle, labeled $ABCD$, is partially shaded gray. Its vertices are labeled A (top-left), B (top-right), C (bottom-right), and D (bottom-left). Side $AB$ is horizontal and side $AD$ is vertical. The length of $AB$ is 5 and the length of $AD$ is 3. A point is marked on the side $DC$, approximately at its midpoint. This point is indicated as the center of rotation by a circular arrow showing a 90 degree clockwise rotation. The second rectangle is the result of rotating the first rectangle $90^\circ$ clockwise around this midpoint of $DC$. The second rectangle is outlined but not shaded. Vertex C of the original rectangle coincides with the center of rotation (the midpoint of DC) in the resulting configuration. The side originally corresponding to DC (length 5) is now oriented vertically downwards from the center of rotation, and the side originally corresponding to BC (length 3) is now oriented horizontally to the left from the center of rotation. The two rectangles overlap. Options: (A) 21 (B) 22.25 (C) 23 (D) 23.75 (E) 25