If surface area of a cube is changing at a rate of 6m2/s , find the rate (in m/s) at which length of the body diagonal changes, at a moment when side length is 1m.
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Solution
Surface area of a cube is S=6a2 (where a = side of cube)
Body diagonal length l is l=√3a
∴S=2l2
Differentiating S w.r.t. time, dSdt=2(2l)dldt ⇒dldt=14(√3a)dSdt(∵dSdt=6m2s,a=1m)