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blushtoad10Lv1
6 Nov 2019
A tank contains 1760 L of pure water A solution that contains 0.02 kg of sugar per liter enters tank at the rate 7L/min The solution is mixed and drains from the tank at the same rate Let .S(t) representing the amount of sugar (in kg) in the tank at time t (in minutes) after the solution starts being pumped in How much sugar (in kg) is in the tank at the beginning S(0) = Write the differential equation which models this situation dS/dt Note: Make sure you use a capital S (Don't use S(t). it confuses the computer) The units of ds/dt are kg/min, but don't enter the units for this answer. Now. factor out the coefficient of S in your answer above, and fill in the constants in the two blanks ds/dt Find the amount of sugar (in kg) alter t minutes S(t) = (This answer is a function of t ) Find the amount of sugar (in kg) after a very long time That is. lim S(t) = Show transcribed image text
A tank contains 1760 L of pure water A solution that contains 0.02 kg of sugar per liter enters tank at the rate 7L/min The solution is mixed and drains from the tank at the same rate Let .S(t) representing the amount of sugar (in kg) in the tank at time t (in minutes) after the solution starts being pumped in How much sugar (in kg) is in the tank at the beginning S(0) = Write the differential equation which models this situation dS/dt Note: Make sure you use a capital S (Don't use S(t). it confuses the computer) The units of ds/dt are kg/min, but don't enter the units for this answer. Now. factor out the coefficient of S in your answer above, and fill in the constants in the two blanks ds/dt Find the amount of sugar (in kg) alter t minutes S(t) = (This answer is a function of t ) Find the amount of sugar (in kg) after a very long time That is. lim S(t) =
Show transcribed image text Jamar FerryLv2
17 Apr 2019