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Абсорбция. 2- Абсорбция. Закон Генри
L) мало меняются по высоте аппарата, их принимают постоянными;
2. при растворении плохо растворимых газов выделяется небольшое количество тепла, поэтому изменение температуры (t) по высоте колонны не учитывается;
3. абсорбция проводится при повышенном давлении, по сравнению с которым гидравлическое сопротивление тарелок невелико, поэтому давление (P) в колонне принимается постоянным;
4. при неизменных Р и t константы равновесия ( ) углеводородных компонентов для всех тарелок колонны одинаковы;
5. поглотитель, поступающий в абсорбер, не содержит извлекаемых компонентов, т.е. ;
6. с учетом пунктов 1-4 неизменным по высоте колонны является фактор абсорбции i-ого компонента
;
7. на тарелках достигается равновесие между газом и поглотителем, т.е. тарелки являются теоретическими.
Уравнение материального баланса по i-ому компоненту для тарелок - первой, второй,... N - ой:
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)
Изменение концентрации извлекаемого компонента в газе и жидкости в противоточном абсорбере
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