A box was measured with a degree of accuracy to the nearest 2cm; 24cm × 24cm × 20cm. What is the smallest possible volume of the box to the nearest cm3?

Each measurement is accurate to 2cm so they can each be “off” by 2. Since we want the smallest possible volume let’s assume each is actually 2 less than what is given.

The sides would then measure: 22, 22 and 18cm respectively. We obtain the volume by multiplying length, width and height...the three values given.

Thus the smallest volume is 22x22x18=8,712 cm^3

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batolisis batolisis · Answer 2 · 2020-04-29T03:20:01+02:00

batolisis batolisis

29-04-2020

Answer:

8712 [tex]cm^{3}[/tex]

Step-by-step explanation:

since the box was measured to the nearest 2 cm

we will assume its dimensions would be ( + or - ) 2cm each

hence for the smallest possible volume of the box the dimensions would be

= (24 - 2 ) cm * ( 24 - 2 ) cm * ( 20 - 2 ) cm

= 22 * 22 * 18 = 8712 [tex]cm^{3}[/tex]

this would be the smallest possible volume of the box to the nearest cm3

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