A tank has 30 liters of water in it at time t, equals, 0t=0 minutes. Water begins to be pumped into the tank at time t, equals, 0, .t=0. A different pipe is draining water from the tank starting at t, equals, 0t=0. Water is being pumped into a tank at a rate modeled by the function G, of, t, equals, 17, left bracket, 0, point, 8, 7, right bracket, to the power t , commaG(t)=17(0.87) t , where G, of, tG(t) is measured in liters per minute. Water is being removed from the tank at a rate modeled by the function N, left bracket, t, right bracket, equals, minus, 3, left bracket, 1, point, 1, 4, right bracket, to the power t , plus, 16, commaN(t)=−3(1.14) t 16, where N, left bracket, t, right bracketN(t) is measured in liters per minute. What is the minimum amount of water in the tank from t, equals, 0t=0 to t, equals, 12, question markt=12? You may use a calculator and round to the nearest thousandth. Use proper units and show how you got your answer.