A box was measured with a degree of accuracy to the nearest 2cm; 24cm x 24cm x 20cm. what is the largest possible volume of the box to the nearest cm3

For any value, e. g. a, to the nearest x units, the upper and lower bounds are:

(a + x/2) and (a - x/2)

For your question, there are three dimensions so:

Dealing with the first one, we have 24 cm to the nearest 2 cm so the boundaries are:

Upper boundary: 24 + 2/2 = 25

Lower boundary: 24 - 2/2 = 23

The second dimension is the same as the first in value and is also given to the nearest 2 cm so the boundaries are the same as for the first.

The third dimension is 20 cm to the nearest 2 cm so the boundaries are:

Upper boundary: 20 + 2/2 = 21

Lower boundary: 20 - 2/2 = 19

To get the largest possible area, we take the upper bounds of all the dimensions and multiply them so:

25 * 25 * 21 = 13125 cm³