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13 Nov 2019
My teacher is not very helpful, so please write cleanly and explain your steps so I can learn.
Please answer all 4 parts and draw a square around each answer.
Consider two interconnected tanks as shown in the figure above. Tank 1 initial contains 50 L (liters) of water and 455 g of salt, while tank 2 initially contains 10 L of water and 415 g of salt. Water containing 10 g/L of salt is poured into tank1 at a rate of 2 L/min while the mixture flowing into tank 2 contains a salt concentration of 30 g/L of salt and is flowing at the rate of 3 L/min. The two connecting tubes have a flow rate of 4.5 L/min from tank 1 to tank 2; and of 2.5 L/min from tank 2 back to tank 1. Tank 2 is drained at the rate of 5 L/min. You may assume that the solutions in each tank are thoroughly mixed so that the concentration of the mixture leaving any tank along any of the tubes has the same concentration of salt as the tank as a whole. (This is not completely realistic, but as in real physics, we are going to work with the approximate, rather than exact description. The 'real' equations of physics are often too complicated to even write down precisely, much less solve.) How does the water in each tank change over time? Let plt) and g(t) be the amount of salt in g at time t in tanks 1 and 2 respectively. Write differential equations for p and q. (As usual, use the symbols p and q rather than p(t) and q(t).) Give the initial values: p(0) q(0)
My teacher is not very helpful, so please write cleanly and explain your steps so I can learn.
Please answer all 4 parts and draw a square around each answer.
Consider two interconnected tanks as shown in the figure above. Tank 1 initial contains 50 L (liters) of water and 455 g of salt, while tank 2 initially contains 10 L of water and 415 g of salt. Water containing 10 g/L of salt is poured into tank1 at a rate of 2 L/min while the mixture flowing into tank 2 contains a salt concentration of 30 g/L of salt and is flowing at the rate of 3 L/min. The two connecting tubes have a flow rate of 4.5 L/min from tank 1 to tank 2; and of 2.5 L/min from tank 2 back to tank 1. Tank 2 is drained at the rate of 5 L/min. You may assume that the solutions in each tank are thoroughly mixed so that the concentration of the mixture leaving any tank along any of the tubes has the same concentration of salt as the tank as a whole. (This is not completely realistic, but as in real physics, we are going to work with the approximate, rather than exact description. The 'real' equations of physics are often too complicated to even write down precisely, much less solve.) How does the water in each tank change over time? Let plt) and g(t) be the amount of salt in g at time t in tanks 1 and 2 respectively. Write differential equations for p and q. (As usual, use the symbols p and q rather than p(t) and q(t).) Give the initial values: p(0) q(0)
Elin HesselLv2
13 Jun 2019