21 0 INTRODUCTION TO SURVIVAL ANALYSISTable 14.1 Patient Data for a Clinical Life Table
Patient Days Status Patient Days Status Patient Days Status
1 2 3 4 5 6 7 8 910
11
12
13
1421 1
39 1
77 1
133 1
141 2
152 1
153 1
161 1
179 1
184 1
197 1
199 1
214 1
228 115
16
17
18
19
20
21
22
23
24
25
26
27
28256
260
26 1
266
269
287
295
308
311
321
326
355
361
3742 29
1 30
1 31
1 32
1 33
3 34
1 35
1 36
1 37
2 38
1 39
1 40
1
1398
414
420
468
483
489
505
539
5 65
618
193
7941 1 1 2 1 1 1 1 3 1 1 1Table 14.2 Computations for a Clinical Life TableInterval nent c nexp d ?j 3(t) j(t) L(t)
.O to < .5 40 1 39.5 8 ,203 .797 1.000 .406 451
.5 to <1.0 31 3 29.5 15 .508 ,492 .797 ,810 1.364
1.0to <1.5 13 1 12.5 8 .640 .360 .392 .502 1.882
1.5 to <2.0 1 .5 1 ,286 ,714 .141 .081 667
2.0 to <2.5 0 .O 2 1.000 ,000 .lo1 ,202 4.000The remaining columns in the clinical life table are obtained by performing cal-
culations on the columns previously filled in. The column labeled nexp gives the
number exposed to risk. It is computed as
If there are no censored patients, the number exposed to risk is the number entering the
interval. If there is censoring, it is assumed that the censoring occurs evenly distributed
throughout the interval. Thus, on average, the censored patients are assumed to be
censored from the study for one-half of the total interval. Hence, the number censored
in each interval is divided by 2 in estimating the number exposed to risk. The number
exposed to risk decreases in a clinical life table with successive intervals as long as at
least one patient dies or is censored. For the first interval, nexp = 40 - 112 = 39.5
since one patient is censored. For the second interval, neXp = 31 - 312 = 29.5, and
so on. Note in the last row or two of Table 14.2 that very few patients are left in the
sample. The estimates obtained from the final row may be quite variable.
In survival analysis, the number of patients exposed to risk decreases as patients
either die or are censored. In Table 4.5, all the percents or proportions are computed