Question
Download Solution PDFFind the rate of change of volume of the cube when the side of the cube is 10 cm. It is known that the side changes at the rate of 4 cm/s.
Answer (Detailed Solution Below)
Detailed Solution
Download Solution PDFConcept:
The rate of change of the value of a function f(x) with respect to a variable t, is given by: \(\rm \frac {df(x)}{dt}\)
Calculation:
Given the side of the cube L = 10cm and \(\rm dL\over dt\) = 4 cm/s
Now volume of the cube V = L3
\(\rm dV\over dt\) = \(\rm dV\over dL\) × \(\rm dL\over dt\)
\(\rm dV\over dt\) = \(\rm dL^3\over dL\) × 4
\(\rm dV\over dt\) = 3L2 × 4
\(\rm dV\over dt\) = 12 × 102
\(\rm dV\over dt\) = 1200 cm3/s
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