Real-World Applicationshard
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A city's power grid demand is D(t)=1000+200sin(πt12)D(t) = 1000 + 200 \sin(\frac{\pi t}{12}). The storage capacity is S(t)=0t(G(u)D(u))duS(t) = \int_0^t (G(u) - D(u)) du where G(t)=1100G(t) = 1100. At what time t[0,24]t \in [0, 24] is the storage at a local maximum?