Given: a volume of cube increasing at a constant rate
To prove: the increase in its surface area varies inversely as the length of the side
Explanation: Let the length of the side of the cube be ‘a’.
Let V be the volume of the cube,
Then V = a3……..(i)
As per the given criteria the volume is increasing at a uniform rate, then
Now substituting the value from equation (i) in above equation, we get
Now let S be the surface area of the cube, then
S = 6a2
Now differentiating surface area with respect to t, we get
Now substituting value from equation (ii) in the above equation we get
Hence the surface area of the cube with given condition varies inversely as the length of the side of the cube.
Hence Proved
