Answer :
Final answer:
To determine the size of the box required to fit all three items, we identify the longest length, the widest width, and the highest height among all the items. The items can fit in a box with the dimensions 14x12x6 (lxwxh).
Explanation:
To find the smallest box that can fit all three items, we need to consider the dimensions of the items and make sure that the box can accommodate the longest length, the widest width, and the highest height among all three items. The first item’s dimensions are 2x2x1 (lxwxh), the second item’s dimensions are 6x6x2 (lxwxh), and the third item’s dimensions are 13x1x1 (lxwxh).
From these box dimensions, the longest length is 13, the widest width is 6, and the highest height is 2. Therefore, the smallest box these three items will fit into would need to be 14x12x6 (lxwxh), option C. This computation assumes the items are rigid and cannot be bent or reshaped, and that they must lay flat on a single layer with no stacking other than the inherent height of each item.
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