By using differentials the error in the volume estimation is 7.29 cubic centimeters.
The volume of a cube (V), in cubic centimeters, is equal to the cube of the side length (L), in centimeters, whose formulas are:
V = L³
Now we proceed to estimate the volume differential by using first derivatives:
dV = 3 · L² · dL
Where dL is the length differential, in centimeters.
If we know that L = 9 cm and dL = 0.03 cm, then the error in the computed volume of the cube is:
dV = 3 · (9 cm)² · (0.03 cm)
dV = 7.29 cm³
The error in the volume estimation is 7.29 cubic centimeters.
To learn more on total differentials: https://brainly.com/question/16967227
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