A rectangular piece of cardboard is 3 ft 11 in long and 2 ft 4 in wide. What the maximum number of 5 in by 8 in rectangles that can be cut from it?

To solve this puzzle, let's first convert the dimensions of the cardboard into inches. The length of the cardboard is 3 feet 11 inches, which converts to 47 inches (3 ft * 12 in/ft = 36 in + 11 in = 47 in). The width is 2 feet 4 inches, which converts to 28 inches (2 ft * 12 in/ft = 24 in + 4 in = 28 in). Now, we calculate how many 5 in by 8 in rectangles can fit within the dimensions of 47 inches by 28 inches. For the orientation where the 5 inch side is along the length and the 8 inch side along the width: - Length: 47 in / 5 in = 9.4 → 9 rectangles (we can only take a whole number) - Width: 28 in / 8 in = 3.5 → 3 rectangles So, in this orientation, we can fit 9 * 3 = 27 rectangles. For the orientation where the 8 inch side is along the length and the 5 inch side along the width: - Length: 47 in / 8 in = 5.875 → 5 rectangles - Width: 28 in / 5 in = 5.6 → 5 rectangles In this case, we can fit 5 * 5 = 25 rectangles. The maximum number of 5 in by 8 in rectangles that can be cut from the cardboard is therefore 27 rectangles! Happy crafting!