Water is flowing into and out of two vats, Vat A and Vat B. The amount of water, in gallons, in Vat A at time t hours is given by a function Aft) and the amount in Vat B is given by B(t). The two vats contain the same amount of water at t=0. You have a formula for the rate of flow for Vat A and the amount in Vat B: Vat A rate of flow: A'(t)=-312+24t-21 Vat B amount: B(t)=-272 +16t+40 (a) Find all times at which the graph of A(t) has a horizontal tangent and determine whether each gives a local maximum or a local minimum of A(t). smaller t= 1 gives a local minimum larger t= 7 gives a local maximum (b) Let D(t)=B(t)-A(t). Determine all times at which D(t) has a horizontal tangent and determine whether each gives a local maximum or a local minimum. (Round your times to two digits after the decimal.) smaller t= 1.59 gives a local maximum larger t= 7.74 gives a local minimum (c) Use the fact that the vats contain the same amount of water at t=0 to find the formula for Aft), the amount in Vat A at time t. A(t) = -23 + 1272 – 21t+ 40 (d) At what time is the water level in Vat A rising most rapidly? t= 4 hours (e) What is the highest water level in Vat A during the interval from t=0 to t=10 hours? 7 X gallons (f) What is the highest rate at which water flows into Vat B during the interval from t=0 to t=10 hours? X gallons per hour 4 (g) How much water flows into Vat A during the interval from t=1 to t=8 hours? 98 gallons