Top-rated ScreenCasts
Text Section | Link to original post | Rating (out of 100) | Number of votes | Copy of rated post |
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04.02 The Microscopic View of Entropy | Click here. | 50 | 2 |
Molecular Nature of S: Thermal Entropy (uakron.edu, 20min) We can explain configurational entropy by studying particles in boxes, but only at constant temperature. How does the entropy change if we change the temperature? Why should it change if we change the temperature? The key is to recognize that energy is quantized, as best exemplified in the Einstein Solid model. We learned in Chapter 1 that energy increases when temperature increases. If we have a constant number of particles confined to lattice locations, then the only way for the energy to increase is if some of the molecules are in higher energy states. These "higher energy states" correspond to faster (higher frequency) vibrations that stretch the bonds (Hookean springs) to larger amplitudes. We can count the number of molecules in each energy state similar to the way we counted the number of molecules in boxes. Then we supplement the formula for configurational entropy changes to arrive at the following simple relation for all changes in entropy for ideal gases: ΔS = Cv ln(T2/T1) + R ln(V2/V1). Note that we have related the entropy to changes in state variables. This observation has two significant implications: (1) entropy must also be a state function (2) we can characterize the entropy by specifying any two variables. For example, substituting V = RT/P into the above equation leads to: ΔS = Cp ln(T2/T1) - R ln(P2/P1). Comprehension Questions: |
07.02 Corresponding States | Click here. | 50 | 8 |
Principles of Corresponding States (10:02) (msu.edu) Comprehension Questions: 1. What is the value of the reduced vapor pressure for Krypton at a reduced temperature of 0.7? How does this help us to characterize the vapor pressure curve? 2. Sketch the graph of vapor pressure vs. temperature as presented in this screencast for the compounds: Krypton and Ethanol. Be sure to label your axes completely and accurately. Draw a vertical line to indicate the condition that defines the acentric factor. |
10.03 - Binary VLE using Raoult's Law | Click here. | 50 | 2 |
This screencast shows binary bubble, dew, and flash sample calculations (uakron, 19min) for methanol and ethanol. It complements the previous video by showing how the bubble and dew pressures relate to the Pxy diagram. It supplements the previous video with examples of numerical results for the bubble and dew temperatures. An isothermal flash calculation requires a different approach, but it also encompasses the bubble and dew temperature and pressure calculations. In a flash calculation, the bubble result is recovered when V/F = 0. The dew result is recovered when V/F=1. Comprehension Questions (Assume the ideal solution SCVP model.): 1. Estimate the bubble pressure (mmHg) and vapor composition of methanol+ethanol at 50 C and xM = 0.4. (Note that the SCVP model should be used now.) |
04.09 Turbine calculations | Click here. | 50 | 10 |
General procedure to solve for steam turbine efficiency. (LearnChemE.com, 5min) This video outlines the procedure without actually solving any specific problem. It shows how inefficiency affects the T-S diagram and how to compute the actual temperature at the turbine outlet. |
03.6 - Energy Balance for Reacting Systems | Click here. | 50 | 2 |
Heat Removal from a Chemical Reactor (uakron, 8min) determines heat removal so that a chemical reactor is isothermal following the pathway of Figure 3.5b using the pathway of Figure 2.6c if a heat of vaporization is involved. The reaction is: N2 + 3H2 = 2NH3 at 350C and 1 bar. The pathway to go from products to the reference condition is to correct for any liquid formation at the conditions of the product stream then cool/heat the products to 25C (the reference temperature), then "unreact" them back to their elements of formation. Summing up the enthalpy changes over these steps gives the overall enthalpy of the reactor outlet stream. The same procedure applied to the reactor inlet gives the overall enthalpy of reactor inlet stream. Then the heat duty of the reactor is simply the difference between the two stream enthalpies. Comprehension Questions: |
05.4 - Refrigeration | Click here. | 50 | 8 |
Refrigeration Cycle Introduction (LearnChemE.com, 3min) explains each step in an ordinary vapor compression (OVC) refrigeration cycle and the energy balance for the step. You might also enjoy the more classical introduction (USAF, 11min) representing your tax dollars at work. The musical introduction is quite impressive and several common misconceptions are addressed near the end of the video. |
13.02 - Wilson's Equation | Click here. | 49.2308 | 13 |
Wilson's model concepts (2:44) (msu.edu) The background on the assumptions and development of Wilson's activity coefficient model. Comprehension Questions: 1. What value is assumed by Wilson's model for the coordination number (z)? |
08.01 - The Departure Function Pathway | Click here. | 49.2308 | 13 |
Departure Function Overview (11:22) (msu.edu) |
06.2 Derivative Relations | Click here. | 49.0909 | 11 |
Exact Differentials and Partial Derivatives (LearnChemE.com, 5min) This math review puts into context the discussion of exact differentials in Section 6.2 of the textbook using an example related to the volume of a cylinder. Comprehension Questions: 1. Given that dU = TdS - PdV, what derivative relation comes from setting ∂2U/(∂S∂P) = ∂2U/(∂P∂S)? 2. Given that dA = -SdT - PdV, what derivative relation comes from setting ∂2A/(∂T∂V) = ∂2A/(∂V∂T)? 3. Given that dG = -SdT + VdP, what derivative relation comes from setting ∂2G/(∂T∂P) = ∂2G/(∂P∂T)? |
01.5 Real Fluids and Tabulated Properties | Click here. | 49.0909 | 11 |
P-V and P-T diagrams (LearnChemE.com) (5:52) Describes distinctions and trends between solid, vapor, liquid, gas. |