| 迭代法求算精馏塔的理论塔板数 |
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| 引用本文: | 彭小平,颜清.迭代法求算精馏塔的理论塔板数[J].上饶师范学院学报,2001,21(6):62-64. |
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| 作者姓名: | 彭小平 颜清 |
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| 作者单位: | 1. 上饶师范学院化学系,江西,上饶,334001
2. 上饶师范学院数学系,江西,上饶,334001 |
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| 摘 要: | 在解析法和图解法求算精馏塔理论塔板数的基础上,提出了迭代法求算理论塔板数.本方法概念清晰,过程简练,结果准确,避免了解析法计算过程繁杂、手算工作量大和图解法在塔板数较多时误差过大的缺点,若利用计算机求算,其算法十分简便.
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| 关 键 词: | 迭代法 精馏塔 理论塔板数 |
| 文章编号: | 1004-2237(2001)06-0062-03 |
| 修稿时间: | 2001年8月10日 |
How to Solve the Number of Tower Tray with the Iterative Method |
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| PENG Xiao-ping ,YIAN Qing.How to Solve the Number of Tower Tray with the Iterative Method[J].Journal of Shangrao Normal College,2001,21(6):62-64. |
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| Authors: | PENG Xiao-ping YIAN Qing |
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| Institution: | PENG Xiao-ping 1,YIAN Qing 2 |
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| Abstract: | This article describes how to solve the number of rectification tower by using the graphic method and analytic one method. It also tells us how to solve the number of tower tray with the iterative method. This method gives a the number of clear conception, a process concision and an accurate result, which avoids the complex analytic process, the workload of hand computation and the disadvantage of the deviation in great pluralities. It is simple for you to work out the problem with the help of the computer. |
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| Keywords: | Iterative method Rectification tower Number of tower tray |
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