** Mx startup successful ** **MX-Linux version 1.52b** The following MX script lines were read for group 1 G1 ALTERNATE FORMS MODEL ! ! If you are above threshold on L, you get disorder A with prob p ! If you are above threshold on L, you get disorder B with prob r ! Note: (q=1-p and s=1-r). ! If you are below threshold on L you are immune to A&B ! ! control group correlation matrix DA CALC NG=4 MATRICES A LO 1 1 FIXED C LO 1 1 FREE H FU 1 1 I ID 1 1 BEGIN ALGEBRA; X = A*A' ; Y = C*C' ; END ALGEBRA; COMPUTE I|H@X+Y_ H@X+Y|I; MATRIX H .5 MATRIX A 0 OPTION RS SE STANDARD ERRORS withdrawn in this version Please use interval command instead END The following MX script lines were read for group 2 G2 CALCULATION GROUP CLINICAL GROUP CORRELATION MATRIX A FACTOR DA CALC MATRICES A LO 1 1 =A1 C LO 1 1 =C1 H FU 1 1 I ID 1 1 BEGIN ALGEBRA; X = A*A' ; Y = C*C' ; END ALGEBRA ; COMPUTE I|H@X+Y_ H@X+Y|I ; MATRIX H .5 OPTION RS END The following MX script lines were read for group 3 G3 EVALUATE MODEL CONTROL GROUP DATA NI=6 ORDINAL FI=CONTROL.DAT Ordinal data read initiated NOTE: Rectangular file contained 422 records with data that contained a total of 2532 observations LABELS AGE1 AGE2 SEX1 SEX2 TYPE DUMMY DEFINITION_VARIABLES AGE1 AGE2 SEX1 SEX2 TYPE / NOTE: Definition yields 422 data vectors for analysis NOTE: Vectors contain a total of 422 observations MATRICES A FULL 2 2 = %E1 ! CORR BETWEEN A FACTORS I IDEN 1 1 P FULL 1 1 FREE! PROBABILITY OF GETTING A IF ABOVE THRESH R FULL 1 1 FREE! PROBABILITY OF GETTING B IF ABOVE THRESH H FULL 1 2 ! MATRIX FOR AGE DEFINITION VARIABLE Y FULL 1 2 ! MATRIX FOR SEX DEFINITION VARIABLE L FULL 1 2 ! ESTIMATED THRESHOLD FOR A O FULL 1 2 ! AGE DIFFERENCE IN THRESHOLD N FULL 1 2 ! SEX DIFFERENCE IN THRESHOLD M FULL 1 1 ! MEAN OF DUMMY VARIABLE V FULL 1 1 ! VARIANCE OF DUMMY VARIABLE J FULL 4 1 ! FOR EXTRACTING RIGHT PART OF K W FULL 1 1 ! 0 + + THESE ARE TO CONTROL INTEGRAL TYPE Z FULL 1 1 ! 1 - - BEGIN ALGEBRA; T = L+(H.O)+(Y.N); D = \MULN((A_T_T_Z|Z)) ; !LOWER/LOWER Problem with correlation between variables 2 and 1 It is supplied as 1.000000000000000 which has absolute value > .99 E = \MULN((A_T_T_Z|W)) ; !LOWER/UPPER Problem with correlation between variables 2 and 1 It is supplied as 1.000000000000000 which has absolute value > .99 F = \MULN((A_T_T_W|Z)) ; !UPPER/LOWER Problem with correlation between variables 2 and 1 It is supplied as 1.000000000000000 which has absolute value > .99 G = \MULN((A_T_T_W|W)) ; !UPPER/UPPER Problem with correlation between variables 2 and 1 It is supplied as 1.000000000000000 which has absolute value > .99 Q = I - P; S = I - R; K = D + F.Q.S + E.Q.S + G.Q.Q.S.S_ ! 1 F.R.Q + G.R.Q.Q.S_ ! 2 E.R.Q + G.R.Q.Q.S_ ! 3 F.P.S + G.P.Q.S.S_ ! 4 E.P.S + G.P.Q.S.S_ ! 5 F.P.R + G.P.R.Q.S_ ! 6 E.P.R + G.P.R.Q.S_ ! 7 G.R.R.Q.Q_ ! 8 G.P.R.Q.S_ ! 9 G.P.R.Q.S_ ! 10 G.P.R.R.Q_ ! 11 G.P.R.R.Q_ ! 12 G.P.P.S.S_ ! 13 G.P.P.R.S_ ! 14 G.P.P.R.S_ ! 15 G.P.P.R.R; ! 16 END ALGEBRA; MATRIX J 1 1 1 1 MATRIX M 0 MATRIX V .159154943 MATRIX P .5 MATRIX R .5 MATRIX W 0 MATRIX Z 1 SPECIFY L 100 100 SPECIFY O 101 101 SPECIFY N 102 102 MATRIX L 1.5 1.5 SP H AGE1 AGE2; SP Y SEX1 SEX2; SP J -5 0 -5 0; MEANS M; COVARIANCE V; WEIGHT (\PART(K,J)) / !Option user-defined RS OPTION RS END The following MX script lines were read for group 4 G4 EVALUATE MODEL SYNERGY GROUP DATA NI=6 ORDINAL FI=CLINICAL.DAT Ordinal data read initiated NOTE: Rectangular file contained 253 records with data that contained a total of 1518 observations LABELS AGE1 AGE2 SEX1 SEX2 TYPE DUMMY DEFINITION_VARIABLES AGE1 AGE2 SEX1 SEX2 TYPE / Note: Global variable previously defined. Updating AGE1 Note: Global variable previously defined. Updating AGE2 Note: Global variable previously defined. Updating SEX1 Note: Global variable previously defined. Updating SEX2 Note: Global variable previously defined. Updating TYPE NOTE: Definition yields 253 data vectors for analysis NOTE: Vectors contain a total of 253 observations MATRICES A FULL 2 2 = %E2 ! CORR BETWEEN A FACTORS, DZ I IDEN 1 1 P FULL 1 1 =P3! PROBABILITY OF GETTING A IF ABOVE THRESH R FULL 1 1 =R3! PROBABILITY OF GETTING B IF ABOVE THRESH H FULL 1 2 ! MATRIX FOR AGE DEFINITION VARIABLE Y FULL 1 2 ! MATRIX FOR SEX DEFINITION VARIABLE L FULL 1 2 =L3! ESTIMATED THRESHOLD FOR A O FULL 1 2 =O3! AGE DIFFERENCE IN THRESHOLD N FULL 1 2 =N3! SEX DIFFERENCE IN THRESHOLD M FULL 1 1 ! MEAN OF DUMMY VARIABLE V FULL 1 1 ! VARIANCE OF DUMMY VARIABLE J FULL 4 1 ! FOR EXTRACTING RIGHT PART OF K W FULL 1 1 ! 0 + + THESE ARE TO CONTROL INTEGRAL TYPE Z FULL 1 1 ! 1 - - B FULL 1 1 C FULL 1 1 FREE BEGIN ALGEBRA; T = L+(H.O)+(Y.N); D = \MULN((A_T_T_Z|Z)) ; !LOWER/LOWER Problem with correlation between variables 2 and 1 It is supplied as 1.000000000000000 which has absolute value > .99 E = \MULN((A_T_T_Z|W)) ; !LOWER/UPPER Problem with correlation between variables 2 and 1 It is supplied as 1.000000000000000 which has absolute value > .99 F = \MULN((A_T_T_W|Z)) ; !UPPER/LOWER Problem with correlation between variables 2 and 1 It is supplied as 1.000000000000000 which has absolute value > .99 G = \MULN((A_T_T_W|W)) ; !UPPER/UPPER Problem with correlation between variables 2 and 1 It is supplied as 1.000000000000000 which has absolute value > .99 Q = I - P; S = I - R; K = B.(F.R.Q + G.R.Q.Q.S)_ ! 2 C.(F.P.S + G.P.Q.S.S)_ ! 4 (B+C).(F.P.R + G.P.R.Q.S)_ ! 6 B.(G.R.R.Q.Q)_ ! 8 C.(G.P.R.Q.S)_ ! 9 B.(G.P.R.Q.S)_ ! 10 (B+C).(G.P.R.R.Q)_ ! 11 B.(G.P.R.R.Q)_ ! 12 C.(G.P.P.S.S)_ ! 13 (B+C).(G.P.P.R.S)_ ! 14 C.(G.P.P.R.S)_ ! 15 (B+C).(G.P.P.R.R); ! 16 END ALGEBRA; MATRIX J 1 1 1 1 MATRIX M 0 MATRIX V .159154943 MATRIX W 0 MATRIX Z 1 MATRIX B 1 MATRIX C .5 SP H AGE1 AGE2; SP Y SEX1 SEX2; SP J -5 0 -5 0; MEANS M; COVARIANCE V; WEIGHT (\PART((K%(\SUM(K)_ \SUM(K)_ \SUM(K)_ \SUM(K)_ \SUM(K)_ \SUM(K)_ \SUM(K)_ \SUM(K)_ \SUM(K)_ \SUM(K)_ \SUM(K)_ \SUM(K))),J)) / !Option user-defined RS OPTION RS OPTION TH=-3 END Summary of VL file data for group 3 TYPE SEX2 SEX1 AGE2 AGE1 Code -5.0000E+00 -4.0000E+00 -3.0000E+00 -2.0000E+00 -1.0000E+00 Number 4.2200E+02 4.2200E+02 4.2200E+02 4.2200E+02 4.2200E+02 Mean 1.6303E+00 5.4976E-01 9.1943E-01 1.6690E+01 1.6478E+01 Variance 3.8017E+00 2.4752E-01 7.4077E-02 1.1376E+01 2.2599E+00 Minimum 1.0000E+00 0.0000E+00 0.0000E+00 1.0960E+01 1.1960E+01 Maximum 1.6000E+01 1.0000E+00 1.0000E+00 2.4950E+01 2.1050E+01 DUMMY Code 1.0000E+00 Number 4.2200E+02 Mean 1.0000E+00 Variance 2.6940E-16 Minimum 1.0000E+00 Maximum 1.0000E+00 Summary of VL file data for group 4 TYPE SEX2 SEX1 AGE2 AGE1 DUMMY Code -5.0000 -4.0000 -3.0000 -2.0000 -1.0000 1.0000 Number 253.0000 253.0000 253.0000 253.0000 253.0000 253.0000 Mean 3.1779 0.5375 0.9289 17.0966 16.4344 1.0000 Variance 7.7826 0.2486 0.0661 10.7495 1.4494 0.0000 Minimum 1.0000 0.0000 0.0000 11.1500 13.0900 1.0000 Maximum 12.0000 1.0000 1.0000 24.5500 19.7100 1.0000 PARAMETER SPECIFICATIONS GROUP NUMBER: 1 G1 Alternate forms model MATRIX A This is a LOWER TRIANGULAR matrix of order 1 by 1 It has no free parameters specified MATRIX C This is a LOWER TRIANGULAR matrix of order 1 by 1 1 1 1 MATRIX H This is a FULL matrix of order 1 by 1 It has no free parameters specified MATRIX I This is an IDENTITY matrix of order 1 by 1 MATRIX X This is a computed FULL matrix of order 1 by 1 It has no free parameters specified MATRIX Y This is a computed FULL matrix of order 1 by 1 It has no free parameters specified GROUP NUMBER: 2 G2 CALCULATION GROUP Clinical group Correlation matrix A factor MATRIX A This is a LOWER TRIANGULAR matrix of order 1 by 1 It has no free parameters specified MATRIX C This is a LOWER TRIANGULAR matrix of order 1 by 1 1 1 1 MATRIX H This is a FULL matrix of order 1 by 1 It has no free parameters specified MATRIX I This is an IDENTITY matrix of order 1 by 1 MATRIX X This is a computed FULL matrix of order 1 by 1 It has no free parameters specified MATRIX Y This is a computed FULL matrix of order 1 by 1 It has no free parameters specified GROUP NUMBER: 3 G3 Evaluate model control group MATRIX A This is a constrained FULL matrix of order 2 by 2 It has no free parameters specified MATRIX D This is a computed FULL matrix of order 1 by 1 It has no free parameters specified MATRIX E This is a computed FULL matrix of order 1 by 1 It has no free parameters specified MATRIX F This is a computed FULL matrix of order 1 by 1 It has no free parameters specified MATRIX G This is a computed FULL matrix of order 1 by 1 It has no free parameters specified MATRIX H This is a FULL matrix of order 1 by 2 1 2 1 -1 -2 MATRIX I This is an IDENTITY matrix of order 1 by 1 MATRIX J This is a FULL matrix of order 4 by 1 1 1 -5 2 0 3 -5 4 0 MATRIX K This is a computed FULL matrix of order 16 by 1 It has no free parameters specified MATRIX L This is a FULL matrix of order 1 by 2 1 2 1 100 100 MATRIX M This is a FULL matrix of order 1 by 1 It has no free parameters specified MATRIX N This is a FULL matrix of order 1 by 2 1 2 1 102 102 MATRIX O This is a FULL matrix of order 1 by 2 1 2 1 101 101 MATRIX P This is a FULL matrix of order 1 by 1 1 1 2 MATRIX Q This is a computed FULL matrix of order 1 by 1 It has no free parameters specified MATRIX R This is a FULL matrix of order 1 by 1 1 1 3 MATRIX S This is a computed FULL matrix of order 1 by 1 It has no free parameters specified MATRIX T This is a computed FULL matrix of order 1 by 2 It has no free parameters specified MATRIX V This is a FULL matrix of order 1 by 1 It has no free parameters specified MATRIX W This is a FULL matrix of order 1 by 1 It has no free parameters specified MATRIX Y This is a FULL matrix of order 1 by 2 1 2 1 -3 -4 MATRIX Z This is a FULL matrix of order 1 by 1 It has no free parameters specified GROUP NUMBER: 4 G4 Evaluate model Synergy group MATRIX A This is a constrained FULL matrix of order 2 by 2 It has no free parameters specified MATRIX B This is a FULL matrix of order 1 by 1 It has no free parameters specified MATRIX C This is a FULL matrix of order 1 by 1 1 1 103 MATRIX D This is a computed FULL matrix of order 1 by 1 It has no free parameters specified MATRIX E This is a computed FULL matrix of order 1 by 1 It has no free parameters specified MATRIX F This is a computed FULL matrix of order 1 by 1 It has no free parameters specified MATRIX G This is a computed FULL matrix of order 1 by 1 It has no free parameters specified MATRIX H This is a FULL matrix of order 1 by 2 1 2 1 -1 -2 MATRIX I This is an IDENTITY matrix of order 1 by 1 MATRIX J This is a FULL matrix of order 4 by 1 1 1 -5 2 0 3 -5 4 0 MATRIX K This is a computed FULL matrix of order 12 by 1 It has no free parameters specified MATRIX L This is a FULL matrix of order 1 by 2 1 2 1 100 100 MATRIX M This is a FULL matrix of order 1 by 1 It has no free parameters specified MATRIX N This is a FULL matrix of order 1 by 2 1 2 1 102 102 MATRIX O This is a FULL matrix of order 1 by 2 1 2 1 101 101 MATRIX P This is a FULL matrix of order 1 by 1 1 1 2 MATRIX Q This is a computed FULL matrix of order 1 by 1 It has no free parameters specified MATRIX R This is a FULL matrix of order 1 by 1 1 1 3 MATRIX S This is a computed FULL matrix of order 1 by 1 It has no free parameters specified MATRIX T This is a computed FULL matrix of order 1 by 2 It has no free parameters specified MATRIX V This is a FULL matrix of order 1 by 1 It has no free parameters specified MATRIX W This is a FULL matrix of order 1 by 1 It has no free parameters specified MATRIX Y This is a FULL matrix of order 1 by 2 1 2 1 -3 -4 MATRIX Z This is a FULL matrix of order 1 by 1 It has no free parameters specified Mx starting optimization; number of parameters = 7 *** WARNING! *** I am not sure I have found a solution that satisfies Kuhn-Tucker conditions for a minimum. NAG's IFAIL parameter is 1 We probably have a minimum here, but you might consider trying different starting values. You can randomize these with TH=n on the OU line, where n is the number of times you wish to do this. I STRONGLY recommend BOundaries to be set if you use TH MX PARAMETER ESTIMATES GROUP NUMBER: 1 G1 Alternate forms model MATRIX A This is a LOWER TRIANGULAR matrix of order 1 by 1 1 1 0.0000 MATRIX C This is a LOWER TRIANGULAR matrix of order 1 by 1 1 1 0.6055 MATRIX H This is a FULL matrix of order 1 by 1 1 1 0.5000 MATRIX I This is an IDENTITY matrix of order 1 by 1 MATRIX X This is a computed FULL matrix of order 1 by 1 [=A*A'] 1 1 0.0000 MATRIX Y This is a computed FULL matrix of order 1 by 1 [=C*C'] 1 1 0.3666 EXPECTED MATRIX of this CALCULATION group 1 2 1 1.0000 0.3666 2 0.3666 1.0000 GROUP NUMBER: 2 G2 CALCULATION GROUP Clinical group Correlation matrix A factor MATRIX A This is a LOWER TRIANGULAR matrix of order 1 by 1 1 1 0.0000 MATRIX C This is a LOWER TRIANGULAR matrix of order 1 by 1 1 1 0.6055 MATRIX H This is a FULL matrix of order 1 by 1 1 1 0.5000 MATRIX I This is an IDENTITY matrix of order 1 by 1 MATRIX X This is a computed FULL matrix of order 1 by 1 [=A*A'] 1 1 0.0000 MATRIX Y This is a computed FULL matrix of order 1 by 1 [=C*C'] 1 1 0.3666 EXPECTED MATRIX of this CALCULATION group 1 2 1 1.0000 0.3666 2 0.3666 1.0000 GROUP NUMBER: 3 G3 Evaluate model control group MATRIX A This is a constrained FULL matrix of order 2 by 2 1 2 1 1.0000 0.3666 2 0.3666 1.0000 MATRIX D This is a computed FULL matrix of order 1 by 1 [=\MULN((A_T_T_Z|Z))] 1 1 0.9053 MATRIX E This is a computed FULL matrix of order 1 by 1 [=\MULN((A_T_T_Z|W))] 1 1 0.0586 MATRIX F This is a computed FULL matrix of order 1 by 1 [=\MULN((A_T_T_W|Z))] 1 1 0.0278 MATRIX G This is a computed FULL matrix of order 1 by 1 [=\MULN((A_T_T_W|W))] 1 1 0.0083 MATRIX H This is a FULL matrix of order 1 by 2 1 2 1 12.8900 13.9100 MATRIX I This is an IDENTITY matrix of order 1 by 1 MATRIX J This is a FULL matrix of order 4 by 1 1 1 1.0000 2 1.0000 3 1.0000 4 1.0000 MATRIX K This is a computed FULL matrix of order 16 by 1 [=D+F.Q.S+E.Q.S+G.Q.Q.S.S_F.R.Q+G.R.Q.Q.S_E.R.Q+G.R.Q.Q.S_F.P.S+G.P.Q.S.S_E.P.S+G.P.Q.S.S_F.P.R+G.P.R.Q.S_E.P.R+G.P.R.Q.S_G.R.R.Q.Q_G.P.R.Q.S_G.P.R.Q.S_G.P.R.R.Q_G.P.R.R.Q_G.P.P.S.S_G.P.P.R.S_G.P.P.R.S_G.P.P.R.R] 1 1 9.2657E-01 2 1.0103E-02 3 2.0512E-02 4 5.2155E-03 5 1.0589E-02 6 7.3345E-03 7 1.4891E-02 8 9.5187E-04 9 4.9138E-04 10 4.9138E-04 11 6.9103E-04 12 6.9103E-04 13 2.5367E-04 14 3.5673E-04 15 3.5673E-04 16 5.0166E-04 MATRIX L This is a FULL matrix of order 1 by 2 1 2 1 3.3053 3.3053 MATRIX M This is a FULL matrix of order 1 by 1 1 1 0.0000 MATRIX N This is a FULL matrix of order 1 by 2 1 2 1 -0.1786 -0.1786 MATRIX O This is a FULL matrix of order 1 by 2 1 2 1 -0.1170 -0.1170 MATRIX P This is a FULL matrix of order 1 by 1 1 1 0.4206 MATRIX Q This is a computed FULL matrix of order 1 by 1 [=I-P] 1 1 0.5794 MATRIX R This is a FULL matrix of order 1 by 1 1 1 0.5844 MATRIX S This is a computed FULL matrix of order 1 by 1 [=I-R] 1 1 0.4156 MATRIX T This is a computed FULL matrix of order 1 by 2 [=L+(H.O)+(Y.N)] 1 2 1 1.7973 1.4994 MATRIX V This is a FULL matrix of order 1 by 1 1 1 0.1592 MATRIX W This is a FULL matrix of order 1 by 1 1 1 0.0000 MATRIX Y This is a FULL matrix of order 1 by 2 1 2 1 0.0000 1.0000 MATRIX Z This is a FULL matrix of order 1 by 1 1 1 1.0000 Matrix of EXPECTED thresholds DUMMY Threshold 1 0.0000 (OBSERVED MATRIX is nonexistent for raw data) EXPECTED COVARIANCE MATRIX DUMMY DUMMY 0.1592 Function value of this group: 1230.9220 Where the fit function is -2 * Log-likelihood of raw ordinal GROUP NUMBER: 4 G4 Evaluate model Synergy group MATRIX A This is a constrained FULL matrix of order 2 by 2 1 2 1 1.0000 0.3666 2 0.3666 1.0000 MATRIX B This is a FULL matrix of order 1 by 1 1 1 1.0000 MATRIX C This is a FULL matrix of order 1 by 1 1 1 0.2166 MATRIX D This is a computed FULL matrix of order 1 by 1 [=\MULN((A_T_T_Z|Z))] 1 1 0.8194 MATRIX E This is a computed FULL matrix of order 1 by 1 [=\MULN((A_T_T_Z|W))] 1 1 0.0941 MATRIX F This is a computed FULL matrix of order 1 by 1 [=\MULN((A_T_T_W|Z))] 1 1 0.0611 MATRIX G This is a computed FULL matrix of order 1 by 1 [=\MULN((A_T_T_W|W))] 1 1 0.0255 MATRIX H This is a FULL matrix of order 1 by 2 1 2 1 15.0800 18.1900 MATRIX I This is an IDENTITY matrix of order 1 by 1 MATRIX J This is a FULL matrix of order 4 by 1 1 1 1.0000 2 1.0000 3 1.0000 4 1.0000 MATRIX K This is a computed FULL matrix of order 12 by 1 [=B.(F.R.Q+G.R.Q.Q.S)_C.(F.P.S+G.P.Q.S.S)_(B+C).(F.P.R+G.P.R.Q.S)_B.(G.R.R.Q.Q)_C.(G.P.R.Q.S)_B.(G.P.R.Q.S)_(B+C).(G.P.R.R.Q)_B.(G.P.R.R.Q)_C.(G.P.P.S.S)_(B+C).(G.P.P.R.S)_C.(G.P.P.R.S)_(B+C).(G.P.P.R.R)] 1 1 2.2750E-02 2 2.5432E-03 3 2.0092E-02 4 2.9181E-03 5 3.2622E-04 6 1.5064E-03 7 2.5772E-03 8 2.1185E-03 9 1.6841E-04 10 1.3304E-03 11 2.3683E-04 12 1.8710E-03 MATRIX L This is a FULL matrix of order 1 by 2 1 2 1 3.3053 3.3053 MATRIX M This is a FULL matrix of order 1 by 1 1 1 0.0000 MATRIX N This is a FULL matrix of order 1 by 2 1 2 1 -0.1786 -0.1786 MATRIX O This is a FULL matrix of order 1 by 2 1 2 1 -0.1170 -0.1170 MATRIX P This is a FULL matrix of order 1 by 1 1 1 0.4206 MATRIX Q This is a computed FULL matrix of order 1 by 1 [=I-P] 1 1 0.5794 MATRIX R This is a FULL matrix of order 1 by 1 1 1 0.5844 MATRIX S This is a computed FULL matrix of order 1 by 1 [=I-R] 1 1 0.4156 MATRIX T This is a computed FULL matrix of order 1 by 2 [=L+(H.O)+(Y.N)] 1 2 1 1.3626 1.1773 MATRIX V This is a FULL matrix of order 1 by 1 1 1 0.1592 MATRIX W This is a FULL matrix of order 1 by 1 1 1 0.0000 MATRIX Y This is a FULL matrix of order 1 by 2 1 2 1 1.0000 0.0000 MATRIX Z This is a FULL matrix of order 1 by 1 1 1 1.0000 Matrix of EXPECTED thresholds DUMMY Threshold 1 0.0000 (OBSERVED MATRIX is nonexistent for raw data) EXPECTED COVARIANCE MATRIX DUMMY DUMMY 0.1592 Function value of this group: 1157.6665 Where the fit function is -2 * Log-likelihood of raw ordinal *** WARNING! *** Minimization may not be successful. See above CODE GREEN - it probably was OK Your model has 7 estimated parameters and 675 Observed statistics -2 times log-likelihood of data >>> 2388.589 Degrees of freedom >>>>>>>>>>>>>>>> 668 Now I'm trying to improve on the current solution for you... Mx starting optimization; number of parameters = 7 MX PARAMETER ESTIMATES GROUP NUMBER: 1 G1 Alternate forms model MATRIX A This is a LOWER TRIANGULAR matrix of order 1 by 1 1 1 0.0000 MATRIX C This is a LOWER TRIANGULAR matrix of order 1 by 1 1 1 0.6055 MATRIX H This is a FULL matrix of order 1 by 1 1 1 0.5000 MATRIX I This is an IDENTITY matrix of order 1 by 1 MATRIX X This is a computed FULL matrix of order 1 by 1 [=A*A'] 1 1 0.0000 MATRIX Y This is a computed FULL matrix of order 1 by 1 [=C*C'] 1 1 0.3666 EXPECTED MATRIX of this CALCULATION group 1 2 1 1.0000 0.3666 2 0.3666 1.0000 GROUP NUMBER: 2 G2 CALCULATION GROUP Clinical group Correlation matrix A factor MATRIX A This is a LOWER TRIANGULAR matrix of order 1 by 1 1 1 0.0000 MATRIX C This is a LOWER TRIANGULAR matrix of order 1 by 1 1 1 0.6055 MATRIX H This is a FULL matrix of order 1 by 1 1 1 0.5000 MATRIX I This is an IDENTITY matrix of order 1 by 1 MATRIX X This is a computed FULL matrix of order 1 by 1 [=A*A'] 1 1 0.0000 MATRIX Y This is a computed FULL matrix of order 1 by 1 [=C*C'] 1 1 0.3666 EXPECTED MATRIX of this CALCULATION group 1 2 1 1.0000 0.3666 2 0.3666 1.0000 GROUP NUMBER: 3 G3 Evaluate model control group MATRIX A This is a constrained FULL matrix of order 2 by 2 1 2 1 1.0000 0.3666 2 0.3666 1.0000 MATRIX D This is a computed FULL matrix of order 1 by 1 [=\MULN((A_T_T_Z|Z))] 1 1 0.9053 MATRIX E This is a computed FULL matrix of order 1 by 1 [=\MULN((A_T_T_Z|W))] 1 1 0.0586 MATRIX F This is a computed FULL matrix of order 1 by 1 [=\MULN((A_T_T_W|Z))] 1 1 0.0278 MATRIX G This is a computed FULL matrix of order 1 by 1 [=\MULN((A_T_T_W|W))] 1 1 0.0083 MATRIX H This is a FULL matrix of order 1 by 2 1 2 1 12.8900 13.9100 MATRIX I This is an IDENTITY matrix of order 1 by 1 MATRIX J This is a FULL matrix of order 4 by 1 1 1 1.0000 2 1.0000 3 1.0000 4 1.0000 MATRIX K This is a computed FULL matrix of order 16 by 1 [=D+F.Q.S+E.Q.S+G.Q.Q.S.S_F.R.Q+G.R.Q.Q.S_E.R.Q+G.R.Q.Q.S_F.P.S+G.P.Q.S.S_E.P.S+G.P.Q.S.S_F.P.R+G.P.R.Q.S_E.P.R+G.P.R.Q.S_G.R.R.Q.Q_G.P.R.Q.S_G.P.R.Q.S_G.P.R.R.Q_G.P.R.R.Q_G.P.P.S.S_G.P.P.R.S_G.P.P.R.S_G.P.P.R.R] 1 1 9.2657E-01 2 1.0103E-02 3 2.0512E-02 4 5.2155E-03 5 1.0589E-02 6 7.3345E-03 7 1.4891E-02 8 9.5186E-04 9 4.9138E-04 10 4.9138E-04 11 6.9102E-04 12 6.9102E-04 13 2.5367E-04 14 3.5673E-04 15 3.5673E-04 16 5.0166E-04 MATRIX L This is a FULL matrix of order 1 by 2 1 2 1 3.3053 3.3053 MATRIX M This is a FULL matrix of order 1 by 1 1 1 0.0000 MATRIX N This is a FULL matrix of order 1 by 2 1 2 1 -0.1786 -0.1786 MATRIX O This is a FULL matrix of order 1 by 2 1 2 1 -0.1170 -0.1170 MATRIX P This is a FULL matrix of order 1 by 1 1 1 0.4206 MATRIX Q This is a computed FULL matrix of order 1 by 1 [=I-P] 1 1 0.5794 MATRIX R This is a FULL matrix of order 1 by 1 1 1 0.5844 MATRIX S This is a computed FULL matrix of order 1 by 1 [=I-R] 1 1 0.4156 MATRIX T This is a computed FULL matrix of order 1 by 2 [=L+(H.O)+(Y.N)] 1 2 1 1.7973 1.4994 MATRIX V This is a FULL matrix of order 1 by 1 1 1 0.1592 MATRIX W This is a FULL matrix of order 1 by 1 1 1 0.0000 MATRIX Y This is a FULL matrix of order 1 by 2 1 2 1 0.0000 1.0000 MATRIX Z This is a FULL matrix of order 1 by 1 1 1 1.0000 Matrix of EXPECTED thresholds DUMMY Threshold 1 0.0000 (OBSERVED MATRIX is nonexistent for raw data) EXPECTED COVARIANCE MATRIX DUMMY DUMMY 0.1592 Function value of this group: 1230.9220 Where the fit function is -2 * Log-likelihood of raw ordinal GROUP NUMBER: 4 G4 Evaluate model Synergy group MATRIX A This is a constrained FULL matrix of order 2 by 2 1 2 1 1.0000 0.3666 2 0.3666 1.0000 MATRIX B This is a FULL matrix of order 1 by 1 1 1 1.0000 MATRIX C This is a FULL matrix of order 1 by 1 1 1 0.2166 MATRIX D This is a computed FULL matrix of order 1 by 1 [=\MULN((A_T_T_Z|Z))] 1 1 0.8194 MATRIX E This is a computed FULL matrix of order 1 by 1 [=\MULN((A_T_T_Z|W))] 1 1 0.0941 MATRIX F This is a computed FULL matrix of order 1 by 1 [=\MULN((A_T_T_W|Z))] 1 1 0.0611 MATRIX G This is a computed FULL matrix of order 1 by 1 [=\MULN((A_T_T_W|W))] 1 1 0.0255 MATRIX H This is a FULL matrix of order 1 by 2 1 2 1 15.0800 18.1900 MATRIX I This is an IDENTITY matrix of order 1 by 1 MATRIX J This is a FULL matrix of order 4 by 1 1 1 1.0000 2 1.0000 3 1.0000 4 1.0000 MATRIX K This is a computed FULL matrix of order 12 by 1 [=B.(F.R.Q+G.R.Q.Q.S)_C.(F.P.S+G.P.Q.S.S)_(B+C).(F.P.R+G.P.R.Q.S)_B.(G.R.R.Q.Q)_C.(G.P.R.Q.S)_B.(G.P.R.Q.S)_(B+C).(G.P.R.R.Q)_B.(G.P.R.R.Q)_C.(G.P.P.S.S)_(B+C).(G.P.P.R.S)_C.(G.P.P.R.S)_(B+C).(G.P.P.R.R)] 1 1 2.2750E-02 2 2.5432E-03 3 2.0092E-02 4 2.9181E-03 5 3.2622E-04 6 1.5064E-03 7 2.5772E-03 8 2.1184E-03 9 1.6840E-04 10 1.3304E-03 11 2.3683E-04 12 1.8710E-03 MATRIX L This is a FULL matrix of order 1 by 2 1 2 1 3.3053 3.3053 MATRIX M This is a FULL matrix of order 1 by 1 1 1 0.0000 MATRIX N This is a FULL matrix of order 1 by 2 1 2 1 -0.1786 -0.1786 MATRIX O This is a FULL matrix of order 1 by 2 1 2 1 -0.1170 -0.1170 MATRIX P This is a FULL matrix of order 1 by 1 1 1 0.4206 MATRIX Q This is a computed FULL matrix of order 1 by 1 [=I-P] 1 1 0.5794 MATRIX R This is a FULL matrix of order 1 by 1 1 1 0.5844 MATRIX S This is a computed FULL matrix of order 1 by 1 [=I-R] 1 1 0.4156 MATRIX T This is a computed FULL matrix of order 1 by 2 [=L+(H.O)+(Y.N)] 1 2 1 1.3626 1.1773 MATRIX V This is a FULL matrix of order 1 by 1 1 1 0.1592 MATRIX W This is a FULL matrix of order 1 by 1 1 1 0.0000 MATRIX Y This is a FULL matrix of order 1 by 2 1 2 1 1.0000 0.0000 MATRIX Z This is a FULL matrix of order 1 by 1 1 1 1.0000 Matrix of EXPECTED thresholds DUMMY Threshold 1 0.0000 (OBSERVED MATRIX is nonexistent for raw data) EXPECTED COVARIANCE MATRIX DUMMY DUMMY 0.1592 Function value of this group: 1157.6665 Where the fit function is -2 * Log-likelihood of raw ordinal Your model has 7 estimated parameters and 675 Observed statistics -2 times log-likelihood of data >>> 2388.589 Degrees of freedom >>>>>>>>>>>>>>>> 668 Now I'm trying to improve on the current solution for you... Mx starting optimization; number of parameters = 7 MX PARAMETER ESTIMATES GROUP NUMBER: 1 G1 Alternate forms model MATRIX A This is a LOWER TRIANGULAR matrix of order 1 by 1 1 1 0.0000 MATRIX C This is a LOWER TRIANGULAR matrix of order 1 by 1 1 1 0.6055 MATRIX H This is a FULL matrix of order 1 by 1 1 1 0.5000 MATRIX I This is an IDENTITY matrix of order 1 by 1 MATRIX X This is a computed FULL matrix of order 1 by 1 [=A*A'] 1 1 0.0000 MATRIX Y This is a computed FULL matrix of order 1 by 1 [=C*C'] 1 1 0.3666 EXPECTED MATRIX of this CALCULATION group 1 2 1 1.0000 0.3666 2 0.3666 1.0000 GROUP NUMBER: 2 G2 CALCULATION GROUP Clinical group Correlation matrix A factor MATRIX A This is a LOWER TRIANGULAR matrix of order 1 by 1 1 1 0.0000 MATRIX C This is a LOWER TRIANGULAR matrix of order 1 by 1 1 1 0.6055 MATRIX H This is a FULL matrix of order 1 by 1 1 1 0.5000 MATRIX I This is an IDENTITY matrix of order 1 by 1 MATRIX X This is a computed FULL matrix of order 1 by 1 [=A*A'] 1 1 0.0000 MATRIX Y This is a computed FULL matrix of order 1 by 1 [=C*C'] 1 1 0.3666 EXPECTED MATRIX of this CALCULATION group 1 2 1 1.0000 0.3666 2 0.3666 1.0000 GROUP NUMBER: 3 G3 Evaluate model control group MATRIX A This is a constrained FULL matrix of order 2 by 2 1 2 1 1.0000 0.3666 2 0.3666 1.0000 MATRIX D This is a computed FULL matrix of order 1 by 1 [=\MULN((A_T_T_Z|Z))] 1 1 0.9053 MATRIX E This is a computed FULL matrix of order 1 by 1 [=\MULN((A_T_T_Z|W))] 1 1 0.0586 MATRIX F This is a computed FULL matrix of order 1 by 1 [=\MULN((A_T_T_W|Z))] 1 1 0.0278 MATRIX G This is a computed FULL matrix of order 1 by 1 [=\MULN((A_T_T_W|W))] 1 1 0.0083 MATRIX H This is a FULL matrix of order 1 by 2 1 2 1 12.8900 13.9100 MATRIX I This is an IDENTITY matrix of order 1 by 1 MATRIX J This is a FULL matrix of order 4 by 1 1 1 1.0000 2 1.0000 3 1.0000 4 1.0000 MATRIX K This is a computed FULL matrix of order 16 by 1 [=D+F.Q.S+E.Q.S+G.Q.Q.S.S_F.R.Q+G.R.Q.Q.S_E.R.Q+G.R.Q.Q.S_F.P.S+G.P.Q.S.S_E.P.S+G.P.Q.S.S_F.P.R+G.P.R.Q.S_E.P.R+G.P.R.Q.S_G.R.R.Q.Q_G.P.R.Q.S_G.P.R.Q.S_G.P.R.R.Q_G.P.R.R.Q_G.P.P.S.S_G.P.P.R.S_G.P.P.R.S_G.P.P.R.R] 1 1 9.2657E-01 2 1.0103E-02 3 2.0512E-02 4 5.2155E-03 5 1.0589E-02 6 7.3345E-03 7 1.4891E-02 8 9.5186E-04 9 4.9138E-04 10 4.9138E-04 11 6.9103E-04 12 6.9103E-04 13 2.5367E-04 14 3.5673E-04 15 3.5673E-04 16 5.0166E-04 MATRIX L This is a FULL matrix of order 1 by 2 1 2 1 3.3053 3.3053 MATRIX M This is a FULL matrix of order 1 by 1 1 1 0.0000 MATRIX N This is a FULL matrix of order 1 by 2 1 2 1 -0.1786 -0.1786 MATRIX O This is a FULL matrix of order 1 by 2 1 2 1 -0.1170 -0.1170 MATRIX P This is a FULL matrix of order 1 by 1 1 1 0.4206 MATRIX Q This is a computed FULL matrix of order 1 by 1 [=I-P] 1 1 0.5794 MATRIX R This is a FULL matrix of order 1 by 1 1 1 0.5844 MATRIX S This is a computed FULL matrix of order 1 by 1 [=I-R] 1 1 0.4156 MATRIX T This is a computed FULL matrix of order 1 by 2 [=L+(H.O)+(Y.N)] 1 2 1 1.7973 1.4994 MATRIX V This is a FULL matrix of order 1 by 1 1 1 0.1592 MATRIX W This is a FULL matrix of order 1 by 1 1 1 0.0000 MATRIX Y This is a FULL matrix of order 1 by 2 1 2 1 0.0000 1.0000 MATRIX Z This is a FULL matrix of order 1 by 1 1 1 1.0000 Matrix of EXPECTED thresholds DUMMY Threshold 1 0.0000 (OBSERVED MATRIX is nonexistent for raw data) EXPECTED COVARIANCE MATRIX DUMMY DUMMY 0.1592 Function value of this group: 1230.9220 Where the fit function is -2 * Log-likelihood of raw ordinal GROUP NUMBER: 4 G4 Evaluate model Synergy group MATRIX A This is a constrained FULL matrix of order 2 by 2 1 2 1 1.0000 0.3666 2 0.3666 1.0000 MATRIX B This is a FULL matrix of order 1 by 1 1 1 1.0000 MATRIX C This is a FULL matrix of order 1 by 1 1 1 0.2166 MATRIX D This is a computed FULL matrix of order 1 by 1 [=\MULN((A_T_T_Z|Z))] 1 1 0.8194 MATRIX E This is a computed FULL matrix of order 1 by 1 [=\MULN((A_T_T_Z|W))] 1 1 0.0941 MATRIX F This is a computed FULL matrix of order 1 by 1 [=\MULN((A_T_T_W|Z))] 1 1 0.0611 MATRIX G This is a computed FULL matrix of order 1 by 1 [=\MULN((A_T_T_W|W))] 1 1 0.0255 MATRIX H This is a FULL matrix of order 1 by 2 1 2 1 15.0800 18.1900 MATRIX I This is an IDENTITY matrix of order 1 by 1 MATRIX J This is a FULL matrix of order 4 by 1 1 1 1.0000 2 1.0000 3 1.0000 4 1.0000 MATRIX K This is a computed FULL matrix of order 12 by 1 [=B.(F.R.Q+G.R.Q.Q.S)_C.(F.P.S+G.P.Q.S.S)_(B+C).(F.P.R+G.P.R.Q.S)_B.(G.R.R.Q.Q)_C.(G.P.R.Q.S)_B.(G.P.R.Q.S)_(B+C).(G.P.R.R.Q)_B.(G.P.R.R.Q)_C.(G.P.P.S.S)_(B+C).(G.P.P.R.S)_C.(G.P.P.R.S)_(B+C).(G.P.P.R.R)] 1 1 2.2750E-02 2 2.5432E-03 3 2.0092E-02 4 2.9181E-03 5 3.2622E-04 6 1.5064E-03 7 2.5772E-03 8 2.1185E-03 9 1.6841E-04 10 1.3304E-03 11 2.3683E-04 12 1.8710E-03 MATRIX L This is a FULL matrix of order 1 by 2 1 2 1 3.3053 3.3053 MATRIX M This is a FULL matrix of order 1 by 1 1 1 0.0000 MATRIX N This is a FULL matrix of order 1 by 2 1 2 1 -0.1786 -0.1786 MATRIX O This is a FULL matrix of order 1 by 2 1 2 1 -0.1170 -0.1170 MATRIX P This is a FULL matrix of order 1 by 1 1 1 0.4206 MATRIX Q This is a computed FULL matrix of order 1 by 1 [=I-P] 1 1 0.5794 MATRIX R This is a FULL matrix of order 1 by 1 1 1 0.5844 MATRIX S This is a computed FULL matrix of order 1 by 1 [=I-R] 1 1 0.4156 MATRIX T This is a computed FULL matrix of order 1 by 2 [=L+(H.O)+(Y.N)] 1 2 1 1.3626 1.1773 MATRIX V This is a FULL matrix of order 1 by 1 1 1 0.1592 MATRIX W This is a FULL matrix of order 1 by 1 1 1 0.0000 MATRIX Y This is a FULL matrix of order 1 by 2 1 2 1 1.0000 0.0000 MATRIX Z This is a FULL matrix of order 1 by 1 1 1 1.0000 Matrix of EXPECTED thresholds DUMMY Threshold 1 0.0000 (OBSERVED MATRIX is nonexistent for raw data) EXPECTED COVARIANCE MATRIX DUMMY DUMMY 0.1592 Function value of this group: 1157.6665 Where the fit function is -2 * Log-likelihood of raw ordinal Your model has 7 estimated parameters and 675 Observed statistics -2 times log-likelihood of data >>> 2388.589 Degrees of freedom >>>>>>>>>>>>>>>> 668 Now I'm trying to improve on the current solution for you... Mx starting optimization; number of parameters = 7 MX PARAMETER ESTIMATES GROUP NUMBER: 1 G1 Alternate forms model MATRIX A This is a LOWER TRIANGULAR matrix of order 1 by 1 1 1 0.0000 MATRIX C This is a LOWER TRIANGULAR matrix of order 1 by 1 1 1 0.6055 MATRIX H This is a FULL matrix of order 1 by 1 1 1 0.5000 MATRIX I This is an IDENTITY matrix of order 1 by 1 MATRIX X This is a computed FULL matrix of order 1 by 1 [=A*A'] 1 1 0.0000 MATRIX Y This is a computed FULL matrix of order 1 by 1 [=C*C'] 1 1 0.3666 EXPECTED MATRIX of this CALCULATION group 1 2 1 1.0000 0.3666 2 0.3666 1.0000 GROUP NUMBER: 2 G2 CALCULATION GROUP Clinical group Correlation matrix A factor MATRIX A This is a LOWER TRIANGULAR matrix of order 1 by 1 1 1 0.0000 MATRIX C This is a LOWER TRIANGULAR matrix of order 1 by 1 1 1 0.6055 MATRIX H This is a FULL matrix of order 1 by 1 1 1 0.5000 MATRIX I This is an IDENTITY matrix of order 1 by 1 MATRIX X This is a computed FULL matrix of order 1 by 1 [=A*A'] 1 1 0.0000 MATRIX Y This is a computed FULL matrix of order 1 by 1 [=C*C'] 1 1 0.3666 EXPECTED MATRIX of this CALCULATION group 1 2 1 1.0000 0.3666 2 0.3666 1.0000 GROUP NUMBER: 3 G3 Evaluate model control group MATRIX A This is a constrained FULL matrix of order 2 by 2 1 2 1 1.0000 0.3666 2 0.3666 1.0000 MATRIX D This is a computed FULL matrix of order 1 by 1 [=\MULN((A_T_T_Z|Z))] 1 1 0.9053 MATRIX E This is a computed FULL matrix of order 1 by 1 [=\MULN((A_T_T_Z|W))] 1 1 0.0586 MATRIX F This is a computed FULL matrix of order 1 by 1 [=\MULN((A_T_T_W|Z))] 1 1 0.0278 MATRIX G This is a computed FULL matrix of order 1 by 1 [=\MULN((A_T_T_W|W))] 1 1 0.0083 MATRIX H This is a FULL matrix of order 1 by 2 1 2 1 12.8900 13.9100 MATRIX I This is an IDENTITY matrix of order 1 by 1 MATRIX J This is a FULL matrix of order 4 by 1 1 1 1.0000 2 1.0000 3 1.0000 4 1.0000 MATRIX K This is a computed FULL matrix of order 16 by 1 [=D+F.Q.S+E.Q.S+G.Q.Q.S.S_F.R.Q+G.R.Q.Q.S_E.R.Q+G.R.Q.Q.S_F.P.S+G.P.Q.S.S_E.P.S+G.P.Q.S.S_F.P.R+G.P.R.Q.S_E.P.R+G.P.R.Q.S_G.R.R.Q.Q_G.P.R.Q.S_G.P.R.Q.S_G.P.R.R.Q_G.P.R.R.Q_G.P.P.S.S_G.P.P.R.S_G.P.P.R.S_G.P.P.R.R] 1 1 9.2657E-01 2 1.0103E-02 3 2.0511E-02 4 5.2155E-03 5 1.0589E-02 6 7.3345E-03 7 1.4891E-02 8 9.5186E-04 9 4.9138E-04 10 4.9138E-04 11 6.9102E-04 12 6.9102E-04 13 2.5367E-04 14 3.5673E-04 15 3.5673E-04 16 5.0166E-04 MATRIX L This is a FULL matrix of order 1 by 2 1 2 1 3.3053 3.3053 MATRIX M This is a FULL matrix of order 1 by 1 1 1 0.0000 MATRIX N This is a FULL matrix of order 1 by 2 1 2 1 -0.1786 -0.1786 MATRIX O This is a FULL matrix of order 1 by 2 1 2 1 -0.1170 -0.1170 MATRIX P This is a FULL matrix of order 1 by 1 1 1 0.4206 MATRIX Q This is a computed FULL matrix of order 1 by 1 [=I-P] 1 1 0.5794 MATRIX R This is a FULL matrix of order 1 by 1 1 1 0.5844 MATRIX S This is a computed FULL matrix of order 1 by 1 [=I-R] 1 1 0.4156 MATRIX T This is a computed FULL matrix of order 1 by 2 [=L+(H.O)+(Y.N)] 1 2 1 1.7973 1.4994 MATRIX V This is a FULL matrix of order 1 by 1 1 1 0.1592 MATRIX W This is a FULL matrix of order 1 by 1 1 1 0.0000 MATRIX Y This is a FULL matrix of order 1 by 2 1 2 1 0.0000 1.0000 MATRIX Z This is a FULL matrix of order 1 by 1 1 1 1.0000 Matrix of EXPECTED thresholds DUMMY Threshold 1 0.0000 (OBSERVED MATRIX is nonexistent for raw data) EXPECTED COVARIANCE MATRIX DUMMY DUMMY 0.1592 Function value of this group: 1230.9220 Where the fit function is -2 * Log-likelihood of raw ordinal GROUP NUMBER: 4 G4 Evaluate model Synergy group MATRIX A This is a constrained FULL matrix of order 2 by 2 1 2 1 1.0000 0.3666 2 0.3666 1.0000 MATRIX B This is a FULL matrix of order 1 by 1 1 1 1.0000 MATRIX C This is a FULL matrix of order 1 by 1 1 1 0.2166 MATRIX D This is a computed FULL matrix of order 1 by 1 [=\MULN((A_T_T_Z|Z))] 1 1 0.8194 MATRIX E This is a computed FULL matrix of order 1 by 1 [=\MULN((A_T_T_Z|W))] 1 1 0.0941 MATRIX F This is a computed FULL matrix of order 1 by 1 [=\MULN((A_T_T_W|Z))] 1 1 0.0611 MATRIX G This is a computed FULL matrix of order 1 by 1 [=\MULN((A_T_T_W|W))] 1 1 0.0255 MATRIX H This is a FULL matrix of order 1 by 2 1 2 1 15.0800 18.1900 MATRIX I This is an IDENTITY matrix of order 1 by 1 MATRIX J This is a FULL matrix of order 4 by 1 1 1 1.0000 2 1.0000 3 1.0000 4 1.0000 MATRIX K This is a computed FULL matrix of order 12 by 1 [=B.(F.R.Q+G.R.Q.Q.S)_C.(F.P.S+G.P.Q.S.S)_(B+C).(F.P.R+G.P.R.Q.S)_B.(G.R.R.Q.Q)_C.(G.P.R.Q.S)_B.(G.P.R.Q.S)_(B+C).(G.P.R.R.Q)_B.(G.P.R.R.Q)_C.(G.P.P.S.S)_(B+C).(G.P.P.R.S)_C.(G.P.P.R.S)_(B+C).(G.P.P.R.R)] 1 1 2.2750E-02 2 2.5432E-03 3 2.0092E-02 4 2.9181E-03 5 3.2622E-04 6 1.5064E-03 7 2.5772E-03 8 2.1184E-03 9 1.6841E-04 10 1.3304E-03 11 2.3683E-04 12 1.8710E-03 MATRIX L This is a FULL matrix of order 1 by 2 1 2 1 3.3053 3.3053 MATRIX M This is a FULL matrix of order 1 by 1 1 1 0.0000 MATRIX N This is a FULL matrix of order 1 by 2 1 2 1 -0.1786 -0.1786 MATRIX O This is a FULL matrix of order 1 by 2 1 2 1 -0.1170 -0.1170 MATRIX P This is a FULL matrix of order 1 by 1 1 1 0.4206 MATRIX Q This is a computed FULL matrix of order 1 by 1 [=I-P] 1 1 0.5794 MATRIX R This is a FULL matrix of order 1 by 1 1 1 0.5844 MATRIX S This is a computed FULL matrix of order 1 by 1 [=I-R] 1 1 0.4156 MATRIX T This is a computed FULL matrix of order 1 by 2 [=L+(H.O)+(Y.N)] 1 2 1 1.3626 1.1773 MATRIX V This is a FULL matrix of order 1 by 1 1 1 0.1592 MATRIX W This is a FULL matrix of order 1 by 1 1 1 0.0000 MATRIX Y This is a FULL matrix of order 1 by 2 1 2 1 1.0000 0.0000 MATRIX Z This is a FULL matrix of order 1 by 1 1 1 1.0000 Matrix of EXPECTED thresholds DUMMY Threshold 1 0.0000 (OBSERVED MATRIX is nonexistent for raw data) EXPECTED COVARIANCE MATRIX DUMMY DUMMY 0.1592 Function value of this group: 1157.6665 Where the fit function is -2 * Log-likelihood of raw ordinal Your model has 7 estimated parameters and 675 Observed statistics -2 times log-likelihood of data >>> 2388.589 Degrees of freedom >>>>>>>>>>>>>>>> 668 This problem used 0.7% of my workspace Task Time elapsed (DD:HH:MM:SS) Reading script & data 0: 0: 0: 0.12 Execution 0: 0: 0:21.16 TOTAL 0: 0: 0:21.28 Total number of warnings issued: 2 ______________________________________________________________________________ ______________________________________________________________________________