“Pure yaw”:  The model travels through the tank while it performs a pure yaw motion, where it is forced to follow the tangent of the oscillating path. In terms of velocities this means that  v=0, while  r and  u oscillate harmonically.  u oscillates, since the carriage speed in the present set-up is constant.  “Yaw and rudder”:  Same as “Pure yaw” but the rudder is deflected.  “Yaw and drift”:  The model travels through the tank, while it performs a pure yaw motion as described in “Pure yaw”. However, a fixed and preset drift angle is overlaid on the motion in order to obtain a drift angle relative to the tangent of the oscillating path. In terms of velocities this means that v≠0, but constant, while r and u oscillate harmonically.   For all of the above conditions, the tests were conducted according to  FORCE’s standard PMM testing procedures. This means that the model was constrained in all degrees of freedom except for heave and pitch to account for dynamic sinkage and trim. The PMM setup is shown in Figure 1. During the test the model is equipped with propeller and rudder. The propeller RPMs are kept constant at the model’s self propulsion point. The model is shown in Figure 2 and Figure 3, where the sand strips used for turbulence stimulation can also be seen. The PMM test program is carried out for speeds down to 0.35U0 corresponding to a Froude number of 0.091. The test program carried out  including the repeat tests for the uncertainty assessment are shown in Table 2.  During the test the instantaneous operatingconditions for the ship like speeds, positions etc. aremeasured together with the  resultant forces. All forcesare measured in a coordinate system following the ship,meaning that  X-components act in the longitudinaldirection of the ship (positive forward) and  Y-components perpendicular to this direction (positivestarboard). The yaw moment is taken with respect tothe mid-ship position at  ܮ௣௣/2. All hydrodynamicforces and moments presented in the present work arenon-dimensionalized by the data reduction equationsshown below. It should be mentioned that for the staticconditions, the hydro dynamic forces and moments areequal to the measured quantities, i.e.            (6)  ܺᇱ, ܻԢ and ܰԢ are the longitudinal force, the transverse force and the yaw moment, respectively. ߩ is the water density. ܷൌ √ݑଶ ൅ݒଶ is the ship speed, where u and v are the surge and sway velocities respectively.  r  is the yaw rate. Finally, the dots above the velocity quantities indicate the corresponding accelerations. See Figure 4. ܶ௠ and ܮ௣௣ are the mean draft and the length between perpendiculars. ܯ and ܫ௓ are the mass and moment of inertia of the model, i.e. of the model itself, the gauges and the ballast weights. ܺீ and  ܻீ are the  X- and  Y-distances from the center of gravity of the model to the point, which the model rotates around.    A part of the experimental work also covered assessment of the experimental uncertainty. Following the approach in ITTC 1999a and b and Simonsen 2004 the uncertainty assessment, which covers both precision and bias limits, is based on the data reduction equations for the forces and moments listed above. The uncertainties are expressed as  2 2 2' ' 'X X X P B U          (7)   2 2 2' ' 'Y Y YP B U          (8)  2 2 2' ' 'N N N P B U          (9)  B and P are the bias (systematic errors) and precision (random errors) limits, respectively. The bias contributions are found by sensitivity analysis of the data reduction equations and error estimates related to the inpidual components of the measurement system,  The bias limits are assessed based on a study of the measuring system. According  to ITTC 1999a they can be estimated on the basis of     JiJiJi kik k i i i r B B B11112 2 22        (10)  where  ߠ௜   is the influence coefficient defined by  iiXr               (11)   ܤ௜ is the bias limits in  ܺ௜  and  ܤ௜௞  is the correlated bias limits in  ܺ௜  and  ܺ௞ .   Lk i ik B B B1) ( ) (        (12) where ܮ  is the number of correlated bias error sources that are common for measurement of variables  ܺ௜  and  ܺ௞. The bias error for each variable in the data reduction equation may consist of a number of bias errors, so in order to calculate the combined bias error the root-sum-square is used   Jkk i iB B12 2) (        (13)  ݅ is the number of the considered variable in the data reduction equation.  The precision limits are assessed through repeated tests, which are built into the test program. The model has not been dismounted from the carriage during the test, so in order to “disturb” the system the repeat tests has been mixed with the other test configurations. According to ITTC 1999a the precision limit is estimated from  MSP rr2            (14)   where ܯ is the number of repeats and the factor of 2 is applied for  ܯ൒10.  ܵ௣ is the standard deviation defined as  ½121) (  MkkrMr rS       (15)  Here ݎ௞ is the value from each repeat test and ݎ is the mean value of all the quantities from the repeat tests.  ݎ  is defined as   Mkk rM r11        (16) Table 3. Uncertainties for “static drift”, β=8°, Fr=0.201.  X’ Y’ N’ ܤ஽´0.000736 0.000798 0.000285 ܲ஽´  0.000214 0.000246 0.000047 ܷ஽´  0.000766 0.000836 0.000289 ܦ´ 0.0180 0.0397 0.0127 ܷ݅݊%ܦ´ 4.26 2.10 2.28 
上一篇:船舶设计多维问题的元建模技术英文文献和中文翻译
下一篇:知识管理及其对隐性知识共享和感知学习英文文献和中文翻译

数控机床制造过程的碳排...

新的数控车床加工机制英文文献和中文翻译

抗震性能的无粘结后张法...

锈蚀钢筋的力学性能英文文献和中文翻译

未加筋的低屈服点钢板剪...

汽车内燃机连杆载荷和应...

审计的优化管理英文文献和中文翻译

老年2型糖尿病患者运动疗...

新課改下小學语文洧效阅...

安康汉江网讯

网络语言“XX体”研究

互联网教育”变革路径研究进展【7972字】

张洁小说《无字》中的女性意识

LiMn1-xFexPO4正极材料合成及充放电性能研究

ASP.net+sqlserver企业设备管理系统设计与开发

麦秸秆还田和沼液灌溉对...

我国风险投资的发展现状问题及对策分析