To operate the instrument, read the manual: If you play a bit with the boxes of the link you include as 'here', one at a time, start with #1:1 and the rest 0, then #1:0 #2:1 rest zero and so on, you realize that #1 #2 #3 ... are the indices the indexes of Zernike equations as listed in http://fp.optics.arizona.edu/jcwyant/Zernikes/ZernikeEquations.htm PSF and MTF are just 3D plots, the term 'Irradiance' shows up, but you just have to solve each equation reading the numeral #I on the left of the table for [ro theta_x and theta_y]. Mind the gap the previous link showing the equations names theta, both theta_x and theta_y, but the far right column helps tell. Copied the table that shows x and y, as theta_x and theta_y below these lines, Courtesy of ZernikePolynomialsForTheWeb.nbJames C. Wyant, 20035.
Hope it helps
John
#nmPolynomial 0001 111x 211y 310 −1+2Hx2+y2L 422x 2−y2 5222xy 621 −2x+3xHx2+y2L 721 −2y+3yHx2+y2L 8201 −6Hx2+y2L+6Hx2+y2L2 933x 3−3xy 2 10333x2y−y3 1132−3x 2+3y 2+4x 2Hx2+y2L−4y 2Hx2+y2L 1232 −6xy+8xyHx2+y2L 13313x −12xHx2+y2L+10xHx2+y2L2 14313y −12yHx2+y2L+10yHx2+y2L2 1530 −1+12Hx2+y2L−30Hx2+y2L2+20Hx2+y2L3 1644x 4−6x 2y2+y4 17444x3y−4xy 3 1843−4x 3+12xy2+5x 3Hx2+y2L−15xy2Hx2+y2L 1943 −12x2y+4y 3+15x2yHx2+y2L−5y 3Hx2+y2L 20426x 2−6y 2−20x2Hx2+y2L+20y2Hx2+y2L+15x2Hx2+y2L2−15y2Hx2+y2L2 214212xy −40xyHx2+y2L+30xyHx2+y2L2 2241 −4x+30xHx2+y2L−60xHx2+y2L2+35xHx2+y2L3 2341 −4y+30yHx2+y2L−60yHx2+y2L2+35yHx2+y2L3 24401 −20Hx2+y2L+90Hx2+y2L2−140Hx2+y2L3+70Hx2+y2L4 2555x 5−10x3y2+5xy 4 26555x4y−10x2y3+y5 2754−5x 4+30x2y2−5y 4+6x 4Hx2+y2L−36x2y2Hx2+y2L+6y 4Hx2+y2L 2854 −20x3y+20xy3+24x3yHx2+y2L−24xy3Hx2+y2L 295310x 3−30xy2−30x3Hx2+y2L+90xy2Hx2+y2L+21x3Hx2+y2L2−63xy2Hx2+y2L2 305330x 2y−10y3−90x2yHx2+y2L+30y3Hx2+y2L+63x2yHx2+y2L2−21y3Hx2+y2L2 3152 −10x2+10y2+60x2Hx2+y2L−60y2Hx2+y2L−105x2Hx2+y2L2+105y2Hx2+y2L2+56x2Hx2+y2L3−56y2Hx2+y2L3 3252 −20xy+120xyHx2+y2L−210xyHx2+y2L2+112xyHx2+y2L3 33515x −60xHx2+y2L+210xHx2+y2L2−280xHx2+y2L3+126xHx2+y2L4 34515y −60yHx2+y2L+210yHx2+y2L2−280yHx2+y2L3+126yHx2+y2L4 3550 −1+30Hx2+y2L−210Hx2+y2L2+560Hx2+y2L3−630Hx2+y2L4+252Hx2+y2L5 3666x 6−15x4y2+15x2y4−y6 37666x5y−20x3y3+6xy 5 3865−6x 5+60x3y2−30xy4+7x 5Hx2+y2L−70x3y2Hx2+y2L+35xy4Hx2+y2L 3965 −30x4y+60x2y3−6y 5+35x4yHx2+y2L−70x2y3Hx2+y2L+7y 5Hx2+y2L 406415x 4−90x2y2+15y4−42x4Hx2+y2L+252x2y2Hx2+y2L−42y4Hx2+y2L+28x4Hx2+y2L2−168x2y2Hx2+y2L2+28y4Hx2+y2L2
416460x3y−60xy3−168x3yHx2+y2L+168xy3Hx2+y2L+112x3yHx2+y2L2−112xy3Hx2+y2L2 4263−20x3+60xy2+105x3Hx2+y2L−315xy2Hx2+y2L−168x3Hx2+y2L2+504xy2Hx2+y2L2+84x3Hx2+y2L3−252xy2Hx2+y2L3 4363−60x2y+20y3+315x2yHx2+y2L−105y3Hx2+y2L−504x2yHx2+y2L2+168y3Hx2+y2L2+252x2yHx2+y2L3−84y3Hx2+y2L3 446215x2−15y2−140x2Hx2+y2L+140y2Hx2+y2L+420x2Hx2+y2L2−420y2Hx2+y2L2−504x2Hx2+y2L3+504y2Hx2+y2L3+210x2Hx2+y2L4−210y2Hx2+y2L4 456230xy−280xyHx2+y2L+840xyHx2+y2L2−1008xyHx2+y2L3+420xyHx2+y2L4 4661−6x+105xHx2+y2L−560xHx2+y2L2+1260xHx2+y2L3−1260xHx2+y2L4+462xHx2+y2L5 4761−6y+105yHx2+y2L−560yHx2+y2L2+1260yHx2+y2L3−1260yHx2+y2L4+462yHx2+y2L5 48601−42Hx2+y2L+420Hx2+y2L2−1680Hx2+y2L3+3150Hx2+y2L4−2772Hx2+y2L5+924Hx2+y2L6
