Note: See Probability Plot with Normal Reference Line in the SAS/QC Sample Library.
Measurements of the distance between two holes cut into 50 steel sheets are saved as values of the variable Distance
in the following data set:
data Sheets; input Distance @@; label Distance='Hole Distance in cm'; datalines; 9.80 10.20 10.27 9.70 9.76 10.11 10.24 10.20 10.24 9.63 9.99 9.78 10.10 10.21 10.00 9.96 9.79 10.08 9.79 10.06 10.10 9.95 9.84 10.11 9.93 10.56 10.47 9.42 10.44 10.16 10.11 10.36 9.94 9.77 9.36 9.89 9.62 10.05 9.72 9.82 9.99 10.16 10.58 10.70 9.54 10.31 10.07 10.33 9.98 10.15 ;
The cutting process is in control, and you decide to check whether the process distribution is normal. The following statements
create a normal probability plot for Distance
with lower and upper specification lines at 9.5 cm and 10.5 cm:
title 'Normal Probability Plot for Hole Distance'; proc capability data=Sheets noprint; spec lsl=9.5 usl=10.5; probplot Distance / normal(mu=est sigma=est) square odstitle=title nospeclegend; run;
The plot is shown in Output 5.19.1. The MU= and SIGMA= normal-options request the diagonal reference line that corresponds to the normal distribution with estimated parameters and . The LSL= and USL= SPEC statement options request the lower and upper specification lines. The SYMBOL statement specifies the symbol marker for the plotted points.
Output 5.19.1: Normal Reference Line