let and be the amount of salt in the respective

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Unformatted text preview: ge drops, around each loop, satisfy , and . Applying Kirchhoff's first law to the upper-right node, Likewise, in the remaining nodes, ________________________________________________________________________ page 340 —————————————————————————— CHAPTER 7. —— and . That is, , and . Using the current-voltage relations, , , , . Combining these equations, and Now set and . , to obtain the system of equations and 22 . . Let and be the amount of salt in the respective tanks at time . Note that the volume of each tank remains constant. Based on conservation of mass, the rate of increase of salt, in any given tank, is given by . For Tank , the rate of salt flowing into Tank is ________________________________________________________________________ page 341 —————————————————————————— CHAPTER 7. —— The rate at which salt flow out of Tank is Hence . Similarly, for Tank , . The process is modeled by...
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This note was uploaded on 03/11/2014 for the course MA 303 taught by Professor Staff during the Spring '08 term at Purdue University-West Lafayette.

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