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| set | problems | |
| P-01 | no problems | |
| P-02 |
a. Verify equation 1-9 in White. b. Given the principal stress/strain models and the coordinate transformation laws, verify tauzz and tauzy |
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| P-03 |
a. Expand equation 2-30 and compare with equation 2-29a b. Verify the substantial derivative of et c. Verify the non-dimensional form of the continuity equation. |
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| P-04 |
a. Take the curl of the 2-d momentum equation (2-111,112) and verify (2-114). b. Verify the velocity solution obtained in class for the steady flat plate Coutte flow problem. c. Revaluate the steady axial Coutte flow problem for both cylinders moving. d. Solve the steady axial Coutte flow problem to obtain the temperature variation if the inner cylinder is held at To and the outter cylinder is held at T1. |
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| P-05 | no homework | |
| P-06 |
a. For the combined Coutte-Poiseuille flow between two infinite plates, derive the presented values of u, umax, Q, ubar, and tauwall b. For the thermal circular duct flow, derive the presented temperature distribution. Be clear on how you handle the constants of integration. |
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| P-07 |
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| P-08 |
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| P-09 |
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| P-10 |
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| TOP | ||
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Prof. Zac Chambers Last modified: Tue Apr 16 11:04:00 US Eastern Standard Time 2002 |