Underwood Equations – (L/D) min

1. Underwood Equations – (L/D)min • We have looked at one limiting condition, Nmin, determined using the Fenske method at total reflux conditions. • The other limiting condition for multi-component systems is the solution for the minimum reflux ratio, (L/D)min, which gives us an infinite number of stages. • This method is known as the Underwood method or the Underwood equations. Lecture 18

2. Underwood Equations – (L/D)min Lecture 18

3. 1st Underwood Equation – φ Roots Lecture 18

4. Underwood Equations – Cases Lecture 18

5. Underwood Equations – Case A Methodology Lecture 18

6. Underwood Equations – Case A Methodology (continued) Lecture 18

7. Underwood Equations – Case A Methodology (continued) Lecture 18

8. Underwood Equations – Case B Methodology Lecture 18

9. Underwood Equations – Case B Methodology (continued) Lecture 18

10. Underwood Equations – Case B Methodology (continued) Lecture 18

11. Underwood Equations – Case C Methodology Lecture 18

12. Underwood Equations – Case C Methodology (continued) Lecture 18

13. Underwood Equations – Case C Methodology (continued) Lecture 18

14. Gilliland Correlation – N and NF • Empirical relationship which relates the number of stages, N, at finite reflux ratio, (L/D)actual to the Nmin and (L/D)min. • Nmin is determined from the Fenske equation. • (L/D)min is determined from the Underwood equations. Lecture 18

15. Gilliland Correlation Lecture 18

16. Gilliland Correlation – Curve Fits Lecture 18

17. Gilliland Correlation – NF Lecture 18