FlexFile3 INPUT --- proc title Lab 5 Solution; Time in seconds for last procedure was 0.06 INPUT --- proc chmatrix occasions=7 groups=2 etype=live NoHist INPUT --- hist=300; INPUT --- glabel(1)=Males; INPUT --- glabel(2)=Females; INPUT --- time interval 1 1 1 1 1 1; * * WARNING * * At least a pair of the encounter histories are duplicates. Number of unique encounter histories read was 32. Number of individual covariates read was 0. Time interval lengths are all equal to 1. Data type is live recaptures. Time in seconds for last procedure was 0.66 INPUT --- proc estimate link=Identity NOLOOP varest=2ndPart ; INPUT --- model={Phi(.) p(.) identity}; INPUT --- group=1 Phi; INPUT --- 1 1 1 1 1 1; INPUT --- 1 1 1 1 1; INPUT --- 1 1 1 1; INPUT --- 1 1 1; INPUT --- 1 1; INPUT --- 1; INPUT --- group=2 Phi; INPUT --- 1 1 1 1 1 1; INPUT --- 1 1 1 1 1; INPUT --- 1 1 1 1; INPUT --- 1 1 1; INPUT --- 1 1; INPUT --- 1; INPUT --- group=1 p; INPUT --- 2 2 2 2 2 2; INPUT --- 2 2 2 2 2; INPUT --- 2 2 2 2; INPUT --- 2 2 2; INPUT --- 2 2; INPUT --- 2; INPUT --- group=2 p; INPUT --- 2 2 2 2 2 2; INPUT --- 2 2 2 2 2; INPUT --- 2 2 2 2; INPUT --- 2 2 2; INPUT --- 2 2; INPUT --- 2; INPUT --- design matrix constraints=2 covariates=2 identity; Link Function Used is Identity Variance Estimation Procedure Used is 2ndPart -2logL(saturated) = 582.47711 Effective Sample Size = 426 Number of function evaluations was 1 for 2 parameters. Time for numerical optimzation was 0.06 seconds. -2logL {Phi(.) p(.) identity} = 666.83766 Penalty {Phi(.) p(.) identity} = 0.0000000 Gradient {Phi(.) p(.) identity}: -0.1457297E-04-0.5975393E-05 S Vector {Phi(.) p(.) identity}: 1930.135 1074.448 Time to compute number of parameters was 0.05 seconds. Threshold = 0.6000000E-07 Condition index = 0.5566698 Conditioned S Vector {Phi(.) p(.) identity}: 1.000000 0.5566698 Number of Estimated Parameters {Phi(.) p(.) identity} = 2 DEVIANCE {Phi(.) p(.) identity} = 84.360551 DEVIANCE Degrees of Freedom {Phi(.) p(.) identity} = 39 c-hat {Phi(.) p(.) identity} = 2.1630911 AIC {Phi(.) p(.) identity} = 670.83766 AICc {Phi(.) p(.) identity} = 670.86603 Identity Function Parameters of {Phi(.) p(.) identity} 95% Confidence Interval Parameter Beta Standard Error Lower Upper --------- -------------- -------------- -------------- -------------- 1 0.5602430 0.0251330 0.5109824 0.6095036 2 0.9025835 0.0285857 0.8465555 0.9586116 Real Function Parameters of {Phi(.) p(.) identity} 95% Confidence Interval Parameter Estimate Standard Error Lower Upper --------- -------------- -------------- -------------- -------------- 1 0.5602430 0.0251330 0.5105493 0.6087577 2 0.9025835 0.0285857 0.8304826 0.9460113 Time in seconds for last procedure was 0.33 INPUT --- proc stop; Time in minutes for this job was 0.02 E X E C U T I O N S U C C E S S F U L BINARY BETA PAR1bB?Q?BETA SE mns?+:ړE?BETA LCIѰY??BETA UCI ?%?ROW 0˲D?_1w'(ROW 3a1w'(CJ?REAL PAR1bB?Q?REAL SE mns?+:ړE?REAL LCI>xvkV?IP?REAL UCIrz?E?ROW 3˲D?a1w'(ROW 3a1w'(CJ? 1111110 1.0 0.1961 0.0 0.1634 1111100 0.0 0.3662 1.0 0.3052 1111000 1.0 0.7218 1.0 0.6015 1101110 0.0 0.0212 1.0 0.0176 1100000 4.0 2.8225 2.0 2.3521 1010000 1.0 0.1540 1.0 0.1284 1000000 5.0 5.5817 4.0 4.6514 0111111 0.0 0.6612 2.0 0.9588 0111110 0.0 0.6464 1.0 0.9373 0111100 1.0 1.2070 2.0 1.7501 0111000 1.0 2.3792 1.0 3.4498 0110110 0.0 0.0698 1.0 0.1012 0110000 7.0 4.7042 4.0 6.8211 0100000 11.0 9.3029 18.0 13.4892 0011111 0.0 1.6345 2.0 1.7653 0011110 1.0 1.5979 1.0 1.7257 0011100 4.0 2.9836 2.0 3.2223 0011000 8.0 5.8813 4.0 6.3518 0010110 1.0 0.1725 0.0 0.1863 0010000 11.0 11.6287 18.0 12.5590 0001111 6.0 2.8446 2.0 2.9739 0001110 3.0 2.7808 4.0 2.9072 0001100 6.0 5.1923 5.0 5.4283 0001011 0.0 0.3070 1.0 0.3210 0001001 1.0 0.0331 1.0 0.0346 0001000 6.0 10.2351 10.0 10.7003 0000111 10.0 5.6254 6.0 4.8583 0000110 3.0 5.4993 6.0 4.7494 0000100 9.0 10.2682 7.0 8.8680 0000011 12.0 11.6303 11.0 11.6303 0000010 11.0 11.3697 12.0 11.3697 0000001 17.0 17.0000 22.0 22.0000  INPUT --- proc title Lab 5 Solution; Time in seconds for last procedure was 0.06 INPUT --- proc chmatrix occasions=7 groups=2 etype=live NoHist INPUT --- hist=300; INPUT --- glabel(1)=Males; INPUT --- glabel(2)=Females; INPUT --- time interval 1 1 1 1 1 1; * * WARNING * * At least a pair of the encounter histories are duplicates. Number of unique encounter histories read was 32. Number of individual covariates read was 0. Time interval lengths are all equal to 1. Data type is live recaptures. Time in seconds for last procedure was 0.65 INPUT --- proc estimate link=Identity NOLOOP varest=2ndPart ; INPUT --- model={Phi(t)p(.) identity}; INPUT --- group=1 Phi; INPUT --- 1 2 3 4 5 6; INPUT --- 2 3 4 5 6; INPUT --- 3 4 5 6; INPUT --- 4 5 6; INPUT --- 5 6; INPUT --- 6; INPUT --- group=2 Phi; INPUT --- 2 2 3 4 5 6; INPUT --- 2 3 4 5 6; INPUT --- 3 4 5 6; INPUT --- 4 5 6; INPUT --- 5 6; INPUT --- 6; INPUT --- group=1 p; INPUT --- 7 7 7 7 7 7; INPUT --- 7 7 7 7 7; INPUT --- 7 7 7 7; INPUT --- 7 7 7; INPUT --- 7 7; INPUT --- 7; INPUT --- group=2 p; INPUT --- 7 7 7 7 7 7; INPUT --- 7 7 7 7 7; INPUT --- 7 7 7 7; INPUT --- 7 7 7; INPUT --- 7 7; INPUT --- 7; INPUT --- design matrix constraints=7 covariates=7 identity; Link Function Used is Identity Variance Estimation Procedure Used is 2ndPart -2logL(saturated) = 582.47711 Effective Sample Size = 426 Number of function evaluations was 1 for 7 parameters. Time for numerical optimzation was 0.17 seconds. -2logL {Phi(t)p(.) identity} = 660.72620 Penalty {Phi(t)p(.) identity} = 0.0000000 Gradient {Phi(t)p(.) identity}: 0.7034461E-05-0.2304378E-04-0.7694809E-05 0.6998877E-05 0.7070521E-05 0.2872404E-04 0.5976112E-04 S Vector {Phi(t)p(.) identity}: 1349.430 341.2684 318.9026 293.0331 287.5662 254.8238 44.00463 Time to compute number of parameters was 0.05 seconds. Threshold = 0.1600000E-06 Condition index = 0.3260978E-01 Conditioned S Vector {Phi(t)p(.) identity}: 1.000000 0.2528981 0.2363238 0.2171531 0.2131019 0.1888380 0.3260978E-01 Number of Estimated Parameters {Phi(t)p(.) identity} = 7 DEVIANCE {Phi(t)p(.) identity} = 78.249092 DEVIANCE Degrees of Freedom {Phi(t)p(.) identity} = 34 c-hat {Phi(t)p(.) identity} = 2.3014439 AIC {Phi(t)p(.) identity} = 674.72620 AICc {Phi(t)p(.) identity} = 674.99415 Identity Function Parameters of {Phi(t)p(.) identity} 95% Confidence Interval Parameter Beta Standard Error Lower Upper --------- -------------- -------------- -------------- -------------- 1 0.6161415 0.1507251 0.3207202 0.9115628 2 0.4800543 0.0620634 0.3584101 0.6016986 3 0.4774485 0.0584067 0.3629712 0.5919257 4 0.6243584 0.0570172 0.5126047 0.7361121 5 0.6078990 0.0548127 0.5004661 0.7153318 6 0.5831593 0.0571827 0.4710813 0.6952373 7 0.9023546 0.0289781 0.8455575 0.9591517 Real Function Parameters of {Phi(t)p(.) identity} 95% Confidence Interval Parameter Estimate Standard Error Lower Upper --------- -------------- -------------- -------------- -------------- 1 0.6161415 0.1507251 0.3152092 0.8484226 2 0.4800543 0.0620634 0.3618883 0.6004949 3 0.4774485 0.0584067 0.3660710 0.5911146 4 0.6243584 0.0570172 0.5078990 0.7280159 5 0.6078990 0.0548127 0.4969421 0.7087272 6 0.5831593 0.0571827 0.4687135 0.6892943 7 0.9023546 0.0289781 0.8290706 0.9462557 Time in seconds for last procedure was 0.88 INPUT --- proc stop; Time in minutes for this job was 0.03 E X E C U T I O N S U C C E S S F U L x@BINARY @@BETA PAR٤dn?+n5?1?^l?D s? =?t?@@BETA SE SJ?nƯ?e̗)}?zz.[1?ff>h? G?2nup?@@BETA LCIQ*?r0?C:?Ag?+tt?{2&?-;Q?@@BETA UCI)+?A?͡$?p:?]?o[b??ɑ^?@@ROW 09gC?>k Lޛ$\ORv>zNر^ ?9R? KB"?|O=3@@ROW 8l Lޛ$載o?',f 6qש?tƁ9Xn?!k1?TpweP)*@@ROW 8\]ORv>',f 6/Utk?4 !tJ>e91?59+\@@ROW 8Nر^ ?7qש?P !&dj?5$t* ?Ɔ!@@ROW 8:R?Ɓ9Xn?K>5$!־h?Ulz2H!@@ROW 8 KB"?k1?91?ư* ?U^'cj?G,!:@@ROW 8dO=3npweP)*59+\Ɔ!rz2H!F,!:ETQ-K?@@REAL PAR٤dn?+n5?1?^l?D s? =?t?@@REAL SE SJ?nƯ?e̗)}?zz.[1?ff>h? G?2nup?@@REAL LCIwc,?#-)?{!m?K[@?R[?r'f?̈́?@@REAL UCISG&?x)#A7?A7#i?9i K?#j?`?.G?@@ROW 89gC?l Lޛ$\]ORv>Nر^ ?:R? KB"?dO=3@@ROW 8l Lޛ$載o?',f 7qש?Ɓ9Xn?k1?npweP)*@@ROW 8\]ORv>',f 6/Utk?P !K>91?59+\@@ROW 8Nر^ ?7qש?P !&dj?5$ư* ?Ɔ!@@ROW 8:R?Ɓ9Xn?K>5$!־h?Urz2H!@@ROW 8 KB"?k1?91?ư* ?U^'cj?F,!:@@ROW 8dO=3npweP)*59+\Ɔ!rz2H!F,!:ETQ-K?@ 1111110 1.0 0.1823 0.0 0.1184 1111100 0.0 0.2948 1.0 0.1914 1111000 1.0 0.4996 1.0 0.3244 1101110 0.0 0.0197 1.0 0.0128 1100000 4.0 3.6382 2.0 2.3622 1010000 1.0 0.1693 1.0 0.1099 1000000 5.0 5.0000 4.0 5.4551 0111111 0.0 0.6070 2.0 0.8801 0111110 0.0 0.5465 1.0 0.7924 0111100 1.0 0.8837 2.0 1.2813 0111000 1.0 1.4977 1.0 2.1717 0110110 0.0 0.0591 1.0 0.0858 0110000 7.0 4.6892 4.0 6.7994 0100000 11.0 10.9063 18.0 15.8142 0011111 0.0 1.7516 2.0 1.8917 0011110 1.0 1.5770 1.0 1.7032 0011100 4.0 2.5500 2.0 2.7540 0011000 8.0 4.3219 4.0 4.6676 0010110 1.0 0.1707 0.0 0.1843 0010000 11.0 13.5315 18.0 14.6140 0001111 6.0 3.5777 2.0 3.7403 0001110 3.0 3.2212 4.0 3.3677 0001100 6.0 5.2085 5.0 5.4453 0001011 0.0 0.3872 1.0 0.4047 0001001 1.0 0.0419 1.0 0.0438 0001000 6.0 8.8277 10.0 9.2290 0000111 10.0 6.3503 6.0 5.4844 0000110 3.0 5.7176 6.0 4.9379 0000100 9.0 9.2449 7.0 7.9843 0000011 12.0 12.1030 11.0 12.1030 0000010 11.0 10.8970 12.0 10.8970 0000001 17.0 17.0000 22.0 22.0000 /* GLABEL(1)=MALES ; GLABEL(2)=FEMALES ; */ 1111110 1 0 ; 1111100 0 1 ; 1111000 1 0 ; 1111000 0 1 ; 1101110 0 1 ; 1100000 1 0 ; 1100000 1 0 ; 1100000 1 0 ; 1100000 1 0 ; 1100000 0 1 ; 1100000 0 1 ; 1010000 1 0 ; 1010000 0 1 ; 1000000 1 0 ; 1000000 1 0 ; 1000000 1 0 ; 1000000 1 0 ; 1000000 1 0 ; 1000000 0 1 ; 1000000 0 1 ; 1000000 0 1 ; 1000000 0 1 ; 0111111 0 1 ; 0111111 0 1 ; 0111110 0 1 ; 0111100 1 0 ; 0111100 0 1 ; 0111100 0 1 ; 0111000 1 0 ; 0111000 0 1 ; 0110110 0 1 ; 0110000 1 0 ; 0110000 1 0 ; 0110000 1 0 ; 0110000 1 0 ; 0110000 1 0 ; 0110000 1 0 ; 0110000 1 0 ; 0110000 0 1 ; 0110000 0 1 ; 0110000 0 1 ; 0110000 0 1 ; 0100000 1 0 ; 0100000 1 0 ; 0100000 1 0 ; 0100000 1 0 ; 0100000 1 0 ; 0100000 1 0 ; 0100000 1 0 ; 0100000 1 0 ; 0100000 1 0 ; 0100000 1 0 ; 0100000 1 0 ; 0100000 0 1 ; 0100000 0 1 ; 0100000 0 1 ; 0100000 0 1 ; 0100000 0 1 ; 0100000 0 1 ; 0100000 0 1 ; 0100000 0 1 ; 0100000 0 1 ; 0100000 0 1 ; 0100000 0 1 ; 0100000 0 1 ; 0100000 0 1 ; 0100000 0 1 ; 0100000 0 1 ; 0100000 0 1 ; 0100000 0 1 ; 0100000 0 1 ; 0011111 0 1 ; 0011111 0 1 ; 0011110 1 0 ; 0011110 0 1 ; 0011100 1 0 ; 0011100 1 0 ; 0011100 1 0 ; 0011100 1 0 ; 0011100 0 1 ; 0011100 0 1 ; 0011000 1 0 ; 0011000 1 0 ; 0011000 1 0 ; 0011000 1 0 ; 0011000 1 0 ; 0011000 1 0 ; 0011000 1 0 ; 0011000 1 0 ; 0011000 0 1 ; 0011000 0 1 ; 0011000 0 1 ; 0011000 0 1 ; 0010110 1 0 ; 0010000 1 0 ; 0010000 1 0 ; 0010000 1 0 ; 0010000 1 0 ; 0010000 1 0 ; 0010000 1 0 ; 0010000 1 0 ; 0010000 1 0 ; 0010000 1 0 ; 0010000 1 0 ; 0010000 1 0 ; 0010000 0 1 ; 0010000 0 1 ; 0010000 0 1 ; 0010000 0 1 ; 0010000 0 1 ; 0010000 0 1 ; 0010000 0 1 ; 0010000 0 1 ; 0010000 0 1 ; 0010000 0 1 ; 0010000 0 1 ; 0010000 0 1 ; 0010000 0 1 ; 0010000 0 1 ; 0010000 0 1 ; 0010000 0 1 ; 0010000 0 1 ; 0010000 0 1 ; 0001111 1 0 ; 0001111 1 0 ; 0001111 1 0 ; 0001111 1 0 ; 0001111 1 0 ; 0001111 1 0 ; 0001111 0 1 ; 0001111 0 1 ; 0001110 1 0 ; 0001110 1 0 ; 0001110 1 0 ; 0001110 0 1 ; 0001110 0 1 ; 0001110 0 1 ; 0001110 0 1 ; 0001100 1 0 ; 0001100 1 0 ; 0001100 1 0 ; 0001100 1 0 ; 0001100 1 0 ; 0001100 1 0 ; 0001100 0 1 ; 0001100 0 1 ; 0001100 0 1 ; 0001100 0 1 ; 0001100 0 1 ; 0001011 0 1 ; 0001001 1 0 ; 0001001 0 1 ; 0001000 1 0 ; 0001000 1 0 ; 0001000 1 0 ; 0001000 1 0 ; 0001000 1 0 ; 0001000 1 0 ; 0001000 0 1 ; 0001000 0 1 ; 0001000 0 1 ; 0001000 0 1 ; 0001000 0 1 ; 0001000 0 1 ; 0001000 0 1 ; 0001000 0 1 ; 0001000 0 1 ; 0001000 0 1 ; 0000111 1 0 ; 0000111 1 0 ; 0000111 1 0 ; 0000111 1 0 ; 0000111 1 0 ; 0000111 1 0 ; 0000111 1 0 ; 0000111 1 0 ; 0000111 1 0 ; 0000111 1 0 ; 0000111 0 1 ; 0000111 0 1 ; 0000111 0 1 ; 0000111 0 1 ; 0000111 0 1 ; 0000111 0 1 ; 0000110 1 0 ; 0000110 1 0 ; 0000110 1 0 ; 0000110 0 1 ; 0000110 0 1 ; 0000110 0 1 ; 0000110 0 1 ; 0000110 0 1 ; 0000110 0 1 ; 0000100 1 0 ; 0000100 1 0 ; 0000100 1 0 ; 0000100 1 0 ; 0000100 1 0 ; 0000100 1 0 ; 0000100 1 0 ; 0000100 1 0 ; 0000100 1 0 ; 0000100 0 1 ; 0000100 0 1 ; 0000100 0 1 ; 0000100 0 1 ; 0000100 0 1 ; 0000100 0 1 ; 0000100 0 1 ; 0000011 1 0 ; 0000011 1 0 ; 0000011 1 0 ; 0000011 1 0 ; 0000011 1 0 ; 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0000001 0 1 ; 0000001 0 1 ; 0000001 0 1 ; 0000001 0 1 ; 0000001 0 1 ; 0000001 0 1 ; 0000001 0 1 ; 0000001 0 1 ;    1 1 1 1 1 1 MalesFemales , ?Lab 5 Solution  1 - Strata 1 2 - Strata 2L glabel(1)=Males; glabel(2)=Females; time interval 1 1 1 1 1 1;