Question 1181820
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With the given margins of measurements, the upper bound of the calculated volume is


    {{{V[max]}}} = (10 + 0.1)*(5 + 0.06)*(4 + 0.04) = 206.46824  cm^3,

or  {{{V[max]}}} - {{{10*5*4}}} = 6.46824 cm^3  more than the "precise" value of the volume V = 10*5*4 = 200 cm^3.




With the given margins of measurements, the lower bound of the calculated volume is


    {{{V[min]}}} = (10 - 0.1)*(5 - 0.06)*(4 - 0.04) = 193.66776  cm^3,

or  {{{10*5*4}}} - {{{V[min]}}} = 6.33224 cm^3  less than the "precise" value of the volume V = 10*5*4 = 200 cm^3.



So, you can write THIS INEQUALITY


    {{{V[min]}}} = 193.66776 = 200-6.33224 <= V <= 206.46824 = {{{V[max]}}} = V + 6.46824  cubic centimeters


and this inequality COVERS BOTH questions in your post.
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Solved, answered and explained.