Listing of Zernike Standard Coefficient Data

File : C:\Users\meyers18\Desktop\HSC Zemax\HSC_S402C.ZMX
Title: Subaru HSC S402C

Date : 9/19/2018
Configuration 1 of 2

Note that RMS (to chief) is the RMS of the OPD after subtracting out piston.
The RMS (to centroid) is the RMS after subtracting out both piston and tilt.
The RMS (to centroid) is most physically significant and is generally what
is meant by 'the RMS'. Although OpticStudio uses the term 'centroid' for brevity,
the reference point is not the diffraction intensity centroid, but the reference
point which minimizes the variance of the wavefront.

Using Zernike Standard polynomials.
OPD referenced to chief ray.

Surface                      :	Image
Field                        :	0.7500 (deg)
Wavelength                   :	0.7500 µm
Peak to Valley (to chief)    :	    1.94926163 waves
Peak to Valley (to centroid) :	    1.28214041 waves

From integration of the rays:
RMS (to chief)               :	    0.31073614 waves
RMS (to centroid)            :	    0.20357417 waves
Variance                     :	    0.04144244 waves squared
Strehl Ratio (Est)           :	    0.19474154

From integration of the fitted coefficients:
RMS (to chief)               :	    2.71021829 waves
RMS (to centroid)            :	    2.13410936 waves
Variance                     :	    4.55442274 waves squared
Strehl Ratio (Est)           :	    0.00000000

RMS fit error                :	    0.00858620 waves
Maximum fit error            :	    0.02681410 waves

Z   1	    0.89223784	:	  1
Z   2	    0.00000000	:	   4^(1/2) (p) * COS (A)
Z   3	    1.67058685	:	   4^(1/2) (p) * SIN (A)
Z   4	    0.91250287	:	   3^(1/2) (2p^2 - 1)
Z   5	    0.00000000	:	   6^(1/2) (p^2) * SIN (2A)
Z   6	   -1.20791077	:	   6^(1/2) (p^2) * COS (2A)
Z   7	    0.83643515	:	   8^(1/2) (3p^3 - 2p) * SIN (A)
Z   8	    0.00000000	:	   8^(1/2) (3p^3 - 2p) * COS (A)
Z   9	   -0.96014361	:	   8^(1/2) (p^3) * SIN (3A)
Z  10	    0.00000000	:	   8^(1/2) (p^3) * COS (3A)
Z  11	    0.30965429	:	   5^(1/2) (6p^4 - 6p^2 + 1)
Z  12	   -0.51446031	:	  10^(1/2) (4p^4 - 3p^2) * COS (2A)
Z  13	    0.00000000	:	  10^(1/2) (4p^4 - 3p^2) * SIN (2A)
Z  14	    0.46945658	:	  10^(1/2) (p^4) * COS (4A)
Z  15	    0.00000000	:	  10^(1/2) (p^4) * SIN (4A)
Z  16	    0.00000000	:	  12^(1/2) (10p^5 - 12p^3 + 3p) * COS (A)
Z  17	    0.16195980	:	  12^(1/2) (10p^5 - 12p^3 + 3p) * SIN (A)
Z  18	    0.00000000	:	  12^(1/2) (5p^5 - 4p^3) * COS (3A)
Z  19	   -0.15165554	:	  12^(1/2) (5p^5 - 4p^3) * SIN (3A)
Z  20	    0.00000000	:	  12^(1/2) (p^5) * COS (5A)
Z  21	    0.07773591	:	  12^(1/2) (p^5) * SIN (5A)
Z  22	    0.01016674	:	   7^(1/2) (20p^6 - 30p^4 + 12p^2 - 1)
Z  23	    0.00000000	:	  14^(1/2) (15p^6 - 20p^4 + 6p^2) * SIN (2A)
Z  24	   -0.03681184	:	  14^(1/2) (15p^6 - 20p^4 + 6p^2) * COS (2A)
Z  25	    0.00000000	:	  14^(1/2) (6p^6 - 5p^4) * SIN (4A)
Z  26	    0.03493160	:	  14^(1/2) (6p^6 - 5p^4) * COS (4A)
Z  27	    0.00000000	:	  14^(1/2) (p^6) * SIN (6A)
Z  28	   -0.03908316	:	  14^(1/2) (p^6) * COS (6A)
Z  29	    0.01354325	:	  16^(1/2) (35p^7 - 60p^5 + 30p^3 - 4p) * SIN (A)
Z  30	    0.00000000	:	  16^(1/2) (35p^7 - 60p^5 + 30p^3 - 4p) * COS (A)
Z  31	   -0.01164154	:	  16^(1/2) (21p^7 - 30p^5 + 10p^3) * SIN (3A)
Z  32	    0.00000000	:	  16^(1/2) (21p^7 - 30p^5 + 10p^3) * COS (3A)
Z  33	    0.01933385	:	  16^(1/2) (7p^7 - 6p^5) * SIN (5A)
Z  34	    0.00000000	:	  16^(1/2) (7p^7 - 6p^5) * COS (5A)
Z  35	   -0.00881075	:	  16^(1/2) (p^7) * SIN (7A)
Z  36	    0.00000000	:	  16^(1/2) (p^7) * COS (7A)
Z  37	    0.00434181	:	   9^(1/2) (70p^8 - 140p^6 + 90p^4 - 20p^2 + 1)
