|
|
|
| Measurement Uncertainty Evaluation for the Laser Small Angle Primary Standard |
| WANG Han-bin1,HUANG Yao2,XUE Zi2,HOU Jia2,3,WANG Chao-yang1 |
1. Fujian Metrology Institute, Fuzhou, Fujian 350003, China
2. National Institute of Metrology, Beijing 100029, China
3. China Jiliang University, Hangzhou, Zhejiang 310018, China |
|
|
|
|
Abstract Based on transparent box model, using the Monte Carlo method, the measurement uncertainty of the laser small angle measurement system was evaluated. According to the measuring principle, the evaluation model for the measurement uncertainty was built, the sources of uncertainty were analyzed. The influence of the zero-angle positionand the measured angle on the measurement uncertainty was emphatically analyzed. The analysis results show that the measurement uncertainty is mainly affected by the random error when the measured angle is small. The measurement uncertainty increases with the increasing of the measured angle. When the zero-angle position is not accurately adjusted, the measurement uncertainty is no longer subject to the normal distribution, and its influence increases with the increase of the measured angle.
|
|
Received: 17 September 2018
Published: 10 October 2019
|
|
|
|
|
|
[1]黄垚, 薛梓, 王鹤岩. 基于LabVIEW的小角度基准装置测控系统软件设计 [J]. 计量学报, 2014, 35(z1): 63-66.
Huang Y, Xue Z, Wang H Y. The design of measuring and control system software of small angle primary standard based on LabVIEW [J]. Acta Metrologica Sinica, 2014, 35(z1): 63-66.
[2]Chen X H, Cheng Y B, Wang H B, et al. Calculation of misjudgment probability for product inspection based on measurement uncertainty [J]. Mathematical Problems in Engineering, 2017, 2017: 1-11.
[3]程银宝, 陈晓怀, 王汉斌, 等. 基于精度理论的测量不确定度评定与分析 [J]. 电子测量与仪器学报, 2016, 30(8): 1175-1182.
Cheng Y B, Chen X H, Wang H B, et al. Measurement uncertainty estimation and analysis based on accuracy theory [J]. Journal of Electronic Measurement And Instrumentation, 2016, 30(8): 1175-1182.
[4]FarranceI, Badrick T, FrenkelR. Uncertainty in measurement: a review of the procedures for determining uncertainty in measurement and its use in deriving the biological variation of the estimated glomerular filtration rate [J]. Practical Laboratory Medicine, 2018, (12): 1-13.
[5]刘园园,杨健,赵希勇, 等. GUM法和MCM法评定测量不确定度对比分析[J]. 计量学报, 2018, 39(1): 135-139.
Liu Y Y,Yang J, Zhao X Y, et al. Comparative Analysis of Uncertainty Measurement Evaluation with GUM and MCM [J]. Acta Metrologica Sinica, 2018, 39(1): 135-139.
[6]严玲玲, 程银宝, 陈晓怀, 等. 蒙特卡洛法验证不确定度A类评定方法 [J]. 河南科技大学学报(自然科学版), 2018, 39(5): 17-20.
Yan L L, Cheng Y B, Chen X H, et al. Verification of type A evaluation methods of uncertainty based on Monte Carlo method [J]. Journal of Henan University of Science and Technology (Natural Science), 2018, 39(5): 17-20.
[7]Xue Z, Huang Y, Wang H Y, et al. Calibration of invar angular interferometer optics with multi-step method [J]. International Journal of Automation Technology, 2015, 9(5): 502-507.
[8]刘雯, 沈妮, 李天初. 用多齿分度台标定激光小角度干涉仪 [J]. 计量学报, 2004, 25(4): 298-301.
Liu W, Shen N, Li T C. Calibration of small-angle laser interferometer by means of multi-teeth table [J]. Acta Metrologica Sinica, 2004, 25(4): 298-301.
[9]黄健, 鲜浩, 姜文汉, 等. 角锥棱镜的误差引起的反射光束相位误差分析 [J]. 光学学报, 2009, 29(7): 1951-1955.
Huang J, Xian H, Jiang W H, et al. The reflected beams phase aberration induced by the fabrication errors of conerretroreflector [J]. Acta Optica Sinica, 2009, 29(7): 1951-1955.
[10]何川, 林家明, 邹桂兰, 等. 双频激光干涉测角中角锥镜的不对称性对测角精度影响的分析 [J]. 光学技术, 2007, 33(S1): 289-290.
He C, Lin J M, Zou G L, et al. Effect of optical corner cubes asymmetry on angle measurement [J]. Optical Technique, 2007, 33(S1): 289-290.
[11]张大军, 刘合朋, 刘军, 等. 基于双频激光干涉仪的角速率检测系统精度分析 [J]. 导航与控制, 2017, 16(4): 65-71.
Zhang D J, Liu H P, Liu J, et al. Precision analysison angular rate measurement system based on dual-frequency laser interferometer [J]. Navigation and control, 2017, 16(4): 65-71.
[12]JJF 1059.2-2012 用蒙特卡洛法评定测量不确定度 [S]. |
|
|
|
2019, Vol. 40 
