Therefore, the resulting pressure fluctuation is represented by t

Therefore, the resulting pressure fluctuation is represented by the summation of the pressure fluctuation induced by each blade, which all have phase differences. The pressure fluctuation induced by sheet cavitation represents the summation of the near-field term and the far-field term. The extent to which each term affects the total pressure fluctuation is analyzed, as shown in Fig. 4. Fig. 4 shows the pressure fluctuation of the near-field and the far-field terms induced at point ‘C’. To find the attenuation effect of each term according to the distance of the tip clearance, the near-field and the far-field terms are calculated at point ‘C  ’ of the plate. The distance

from the blade tip to the plate is assumed buy Trichostatin A to be 0.5, 1.0, 3.0, 10.0, and 20.0 times the radius of the propeller. Fig. 5 shows the result of the computation. Because the near-field term is proportional to 1/2r1/r2 and the far-field term is to 1/r1/r, the near-field term is sharply reduced as it remains away from the source. Therefore, the far-field term is

dominant at a distance. In general, the tip clearance between the hull and the propeller is less than 1.0, so the near-field term cannot be ignored, as shown in Fig. 5. As specified above, if the relative velocity is not considered, the same pressure fluctuation values are expected at the same distance between the source and the observer point. However, if the relative velocity is considered, buy BMS-354825 the results are somewhat different. Although the observer point is the same distance from the source, the induced pressure fluctuation results are stronger when the source becomes closer than when the source moves away from the observer. Therefore, the pressure Rucaparib cell line fluctuation at position ‘S’ is greater than the pressure fluctuation of position ‘P’. The maximum value of the pressure fluctuation is predicted to occur at a slightly starboard side of the propeller because the sources

rotate to the right-hand side. These results are shown in Fig. 6. To validate the newly developed time domain prediction method, the results are compared with the experimental results and the results of potential-based numerical prediction methods for the various operating conditions and propellers. The propeller cavitation flow results are obtained using a vortex lattice method developed by MOERI. The results of this method are used as the input for the numerical pressure fluctuation prediction methods, the potential-based prediction method (Kim et al., 1995), and the developed time domain prediction method. Details of the time domain prediction method are described in the section above. A comparison between the computations and the experimental results can be made for the three cases shown in Table 2 and Table 3. These cases show the principal geometric parameters of the propellers and the operating conditions.

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