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TAT t CENTRAL I BUREAU ST ICS COMPLETE LIFE TABLES OF ISRAEL 2004-2008 Jerusalem, February 2010 EFTA01125935
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Copyright © 2010 The State of Israel ISSN 1565 - 9143 EFTA01125936
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PREFACE The Complete Life Tables of Israel presents complete life tables for 2004-2008. This publication is part of an annual series of publications on that topic. Complete life tables are produced for periods of five calendar years. The tables include information on the probability of death and on life expectancy, including standard deviation and confidence intervals. Pnina Zadka Deputy Director General and Senior Department Director Demography and Census Jerusalem, 2010 - IX - EFTA01125937
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This publication was prepared by Oriya Khademifar Other Staff of the Central Bureau of Statistics who participated in preparing this publication: Department of Demography and Census: Ari Paltiel Health and Vital Statistics Sector: Naama Rotem Publication Sector: Orit Penso Tamar Ben Yishai Miriam Schneiderman To receive more information about this publication, please call Ms. Oriya Khademifar, Tel. 02-659-3081. To purchase data of this publication on Cd-Rom (Word, Excel, and PDF), please contact the Central Bureau of Statistics, Tel. 02-659-2032 or 03-568-1932. - x - EFTA01125938
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CONTENTS Page INTRODUCTION 1. General XIII 2. Main Findings XIII 3. Methods of Computations XIV A. Types of Life Tables XIV B. Confidence Intervals XIV C. Smoothing Techniques XV 4. Components of a Life Table XVII TABLES 1. Complete Life Table of Israel: Total Population - Males 20 2. Complete Life Table of Israel: Total Population - Females 22 3. Complete Life Table of Israel: Jews and Others - Males 24 4. Complete Life Table of Israel: Jews and Others - Females 26 5. Complete Life Table of Israel: Jews - Males 28 6. Complete Life Table of Israel: Jews - Females 30 7. Complete Life Table of Israel: Arabs - Males 32 8. Complete Life Table of Israel: Arabs - Females 34 - Xl - EFTA01125939
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SE
CBS. COMPLETE LIFE TABLES OF ISRAEL 7Iney 7e, olnel nninn mm7 ,0"12 INTRODUCTION 1. GENERAL This publication presents complete life tables of Israel for 2004-2008. The tables contain information on probabilities of death and life expectancy, including standard deviation and confidence intervals. Data are presented by population group, sex, and age. The Central Bureau of Statistics produces two series of life tables — abridged' and complete — on a regular basis. The abridged life tables (by five-year age groups) are produced for every calendar year, and the complete life tables (for single years of age) are produced for periods of five calendar years (average). Data in the complete life tables may differ from those in the abridged tables, especially in older age groups, owing to differences in the methods of calculation (see Section 3, "Methods of Computation"). 2. MAIN FINDINGS The life expectancy at birth in 2004-2008 of the total population was 82.2 years for females and 78.3 years for males. For Jews and Others, life expectancy was 82.7 years for females and 78.8 years for males. In addition, life expectancy of female Jews was 82.6, and that of male Jews was 79.1. For Arabs life expectancy was 79.0 for females and 75.3 for males. Based on the age-specific mortality rates in 2004-2008, more than half of the females born these years are expected to live more than 84 years, and more than half of the males born in the same period are expected to live more than 81 years. Assuming that mortality rates will remain unchanged, 27.8% of the females and 19.2% of the males born between 2004-2008 are expected to live at least 90 years. Women aged 65 in this period can expect to live an additional 20 years on the average, whereas women aged 80 are expected to live another 8.9 years on the average. Men aged 65 are expected to live 17.9 more years on average, and men aged 80 are expected to live another 8.2 years on average. Israeli males rank among the group of countries with the highest life expectancy in comparison with other countries. According to the World Health Report 20092, which presents data for the year 2007, the life expectancy of Israeli males equals (rounded figure) that of the leading countries, (Japan, Sweden, Italy, Australia and Switzerland) in which it is 79 years. Israeli women rank lower, and their life expectancy is four years less than that of the leading country, Japan (86 years). Women in Ireland, Belgium, Germany, United Kingdom, Netherlands, Greece and Portugal have a life expectancy similar to that of Israeli women — 82 years. 1 See Statistical Abstract of Israel No. 60, 2009 Central Bureau of Statistics, Chapter 3 — Vital Statistics. 2 World Health Organization, World Health Statistics, 2009. - XIII - EFTA01125941
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CBS. COMPLETE LIFE TABLES OF ISRAEL Noel 7e, olnel anion runt, ,0"12 3. METHODS OF COMPUTATION A. Types of Life Tables There are two types of life tables: period life tables, and cohort life tables. The life tables presented in this publication are complete period life tables for single years of age from birth (age 0) until age 100. Period life tables. Period life tables are meant to describe patterns of mortality for a specific period. A period life table reflects the mortality of a hypothetical cohort born in a given year, assuming that this generation will experience at each age the mortality rates existing during that year for each age group. For example, the life table for 1990 assumes that survivors of the generation born in 1990 will be exposed at every age from 0 to 100 to the mortality rates that prevailed at every age from birth up to age 100 in 1990. Thus, the calculation resembles a projection, on the assumption that mortality rates will remain constant. Cohort life tables. In a cohort (generational) life table, mortality rates in a particular birth cohort are observed until all individuals in that cohort die. For example, the annual probabilities of deaths of persons born in 1900 can be tracked until 2000, and their mortality rates can be obtained at every age, from birth to age 100. With this data, a life table can be compiled for the entire cohort, assuming that most of them died by 2000. In order to produce a cohort life table, mortality and immigration data have to be collected over a long period of time. This follow-up is practical only among "closed" populations with no migration, which is far from the case in Israel. Moreover, the value of a cohort table is mainly historical, because it reflects mortality rates of individuals born long ago, who lived under different conditions from those prevailing at the time the table was prepared. B. Confidence Intervals Mortality rates in Israel, as in all countries, are subject to stochastic variation (statistical errors) and to a variety of non-stochastic errors, such as those that arise from errors in reported year of birth or age at death. Due to both kinds of error, calculated mortality rates may differ from the "true" mortality rate, which would have been obtained if it were possible to overcome these errors. Stochastic variations are more significant when the number of deaths is smaller, for example among small population groups or in a single year of age or over a short period of time. This publication presents both standard deviation and confidence intervals for the probability of death and for life expectancy. The confidence intervals are symmetric, reflect only stochastic variation, and are based on the assumption that age-specific deaths follow a binomial distribution'. A confidence interval of 95% represents a range in which the true value of the parameter will be found in 95% of the cases. Whenever the confidence intervals of two probabilities or expected years of life overlap between different ages or different groups, the difference is not statistically significant (at a confidence level of 95%). Chiang, C. L. "Statistical Inference Regarding Life Table Functions". In: C.L. Chiang, The Life Table and its Applications, Malabar, FL: Robert E. Krieger Publishers, pp. 153-167, 1984. - XIV - EFTA01125942
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CBS. COMPLETE LIFE TABLES OF ISRAEL 7Iney 7e, olnel nninn ,0"12 The confidence interval of the probability of death (Q) is dependent on the number of deaths in the reference group. Accordingly, there are differences in the relative width of the confidence interval at different ages. At younger ages, in which there are fewer deaths, the confidence interval is wider than at older ages, where there are more deaths. Similarly, the relative width of the confidence interval differs among different population groups. Because there are fewer deaths in the Arab population than in the Jewish population, the relative width of the confidence intervals is greater among the Arabs. The confidence interval of life expectancy is a function of the confidence interval of the probability of death, and is therefore narrower for the Jewish population than for the Arab population. For example, among Jewish females the confidence interval for life expectancy at birth is (±) 0.1 years, compared with (±) 0.25 years for Arab females. Confidence intervals for life expectancy and for probabilities of death were calculated using the methods developed by Chiang', where the significance level a=0.05 corresponds to a standardized normal distribution value of z=1.96. The confidence interval was calculated for the estimated probability of death, which was obtained from the smoothed model (see Section C - "Smoothing Techniques" below). Standard Deviation of the probability of death: Sq — I n ;( 4 D‘ Confidence interval: Cl = 2*1.96* Sq. Standard Deviation of life expectancy: r S = t2 D, - Absolute number of deaths at age x. 7', - The total number of person-years lived by cohort survivors after reaching age x. /, -The number of survivors at exact age x out of 100,000 infants born. C. Smoothing Techniques Stochastic variation is not the only source of "error" in life table functions. Therefore, in order to overcome irregularities from all sources, it is customary to use a "smoothing" technique of some kind. An "abridged" life table, which is based on mortality rates among broad age groups and not on single years of age, is less exposed to stochastic variations and other errors. The problems are more serious when calculating a "complete" life table based on single years of age. Complete life tables in Israel for 1986-1990 until 1995-1999 were computed using the MORTPAK2 software package, which was provided by the United Nations. The software allows for calculation of complete life tables by estimating a Heligman-Pollard (H-P) Chiang, C.L. 1984. 2 MORTPAK: for Windows Version 4.0. The United Nation Software Package for Demographic Measurement. - XV - EFTA01125943
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CBS. COMPLETE LIFE TABLES OF ISRAEL 7?ney 7e, olnel nninn rum, ,0"12 mortality model', by the least-squares method. Since 2000, it was found that this program does not produce reasonable results for Israeli data. The fit between the model and the empirical data is not statistically significant, and it was found that the H-P model raises life expectancy at birth for all population groups (at least by 0.2 years and sometimes more then a single year) as compared to the abridged life table. Moreover, it was found that the curve of the model crosses the boundaries of the confidence interval for empirical probabilities of death (qx). Furthermore, although the parameters of the H-P model can be estimated, the statistical tools (standard deviation and significance) of the parameter estimates cannot be calculated. Thus, the overall statistical significance of the model is not known. Finally, this smoothing procedure does not take into account the distinct features of the Israeli data: at certain ages, the smoothing procedure greatly reduces the probability of death (for example, the ages of compulsory military service) and at other ages (particularly at older ages), it increases the probability. For these reasons, a new method of smoothing was developed by means of a two-stage polynomial function2, and is used as the basis for the complete life tables since 1996-2000. The model is based on the Local Maximum Likelihood method3, as well as on a technique for estimating change points's. This method has four advantages: A. The differences between the smoothed values of life expectancy and the original data are not statistically significant. B. Statistical parameters of the model can be estimated, such as variance, confidence intervals, and statistical significance. C. The model provides a good basis for smoothing qx (the specific probability of death at a certain age) while taking account of the distinct features of the Israeli data. D. The method is easy and convenient to use. In the new method, life expectancy is calculated in four stages: A. Calculation of the q, values based on mortality rates (mx) by singles years of age for each population group and each sex, averaged for the five-year period (2004200-8). B. The hypothesis that there is a change point in the model is tested. If the hypothesis is not rejected we move on to the next stage. C. The q, values are smoothed by estimating one or two models of the qx function, depending on whether or not a change point was found, one for the younger ages (up to the change point) and one for the older ages (after the change point). D. All the parameters of the life table based on the model qx estimates are calculated. Heligman L. and Pollard J.H., "The Age Pattern of Mortality', Journal of the Institute of Actuaries, no. 107, pp. 49-75, 1980. 2 Vexler A., Flaks N. and Paltiel A., "A Method for Smoothing Mortality Functions using a segmented regression model: an application to Israeli data', Working paper series No. 15. Central Bureau of Statistics, 2005 (Hebrew only). 3 Fan J., Farmen M. and Gijbels I., 'Local Maximum Likelihood Estimation and Inference", J.R. Statist. Soc., B. Vol. 60, pp. 591-608, 1998. 4 Koul H.L., Lianfen Q. and Surgailis D., "Asymptotic of M-estimators in Two-phase Linear Regression Models", Stochastic Processes and Their Applications, Vol. 103, pp. 123-154, 2003. - XVI - EFTA01125944
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CBS. COMPLETE LIFE TABLES OF ISRAEL 7Iney 7e, olnel nninn rum, ,0"12 4. COMPONENTS OF A LIFE TABLE The life table is based on sex- and age-specific mortality rates, and consists of the following functions: D„ - Absolute number of deaths at age x. mx - Average mortality rates at age x, i.e., the number of people who died at age x divided by the average population at age x. For example: the rn,, values for computing the life table for 2004-2008 is based on average mortality rates for 2004200-8. The probability of death between age x and age x+1. The column presents the proportion of people who died between age x and age x+1 of those living at age x. The qx values are derived from mx values as follows: qx - my q, = , 2 1+ M Ix - The number of survivors at exact age x out of 100,000 infants born (radix of the table = to = 100,000). The Ix values are based on the qx values, which allow for calculation of the number of survivors since age x-1. Ix = Ixa (1- qx., ) Lx - The number of person-years lived by the cohort that reached exact age x, between age x and age x+1. Lx = (I, + lx.,)/2 Lo - The number of person-years lived by the cohort between birth and its first birthday. - The number of person-years lived by the cohort from age 100 until the last one has died. Lo and L100. are calculated differently for two reasons: Lo is affected by the non-linear distribution of deaths in the first year of life. L100. requires an estimate of the number of years that will be lived until the last member of the cohort has died. Thus: Lo=0.3lo+0.7 L,00.=1000 (hoo/ Tx - The total number of person-years lived by cohort survivors after reaching age x; Tx is the sum of Lx for all ages after x. ex- The life expectancy at age x. This is the average number of years a person may expect to live after age x, assuming that he survived to age x, and assuming that mortality rates are unchanging. The complete life tables presented here show the Ix, qx and ex functions for single ages, from birth to age 100. - XVII - EFTA01125945
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TABLES (PRINTED IN HEBREW ORDER - FROM RIGHT TO LEFT) - XIX - EFTA01125947
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CBS. COMPLETE LIFE TABLES OF ISRAEL 7x~vr 7e, oin7er nninn ntnt7 ,en7 Dr13T - neicutixn 673 : I7X-MI IM DIM nrunn ni17 -.1 nu', 2004-2008 nnolininn 53 011)T Olin ri'murt Life expectancy ino nil, Confidence interval DOW '1121 Upper boundary linnn '711.1 Lower boundary rpn 111430 Standard deviation ex DrIXW3 Duna Survivors at age x Ix nun't nnarton Probability of death run Confidence interval von Upper boundary imnn Lower boundary I p 11"130 Standard deviation 78.4 77.7 76.8 75.8 74.8 73.8 72.8 71.9 70.9 69.9 68.9 67.9 66.9 65.9 64.9 63.9 63.0 62.0 61.0 60.0 59.1 58.1 57.2 56.2 55.3 54.3 53.3 52.4 51.4 50.4 49.5 48.5 47.5 46.6 45.6 44.6 43.7 42.7 41.8 40.8 39.9 38.9 38.0 37.0 36.1 35.2 34.3 33.3 32.4 31.5 30.6 78.3 77.6 76.6 75.7 74.7 73.7 72.7 71.7 70.7 69.7 68.7 67.7 66.8 65.8 64.8 63.8 62.8 61.8 60.9 59.9 58.9 58.0 57.0 56.1 55.1 54.1 53.2 52.2 51.3 50.3 49.3 48.4 47.4 46.4 45.5 44.5 43.6 42.6 41.6 40.7 39.7 38.8 37.9 36.9 36.0 35.0 34.1 33.2 32.3 31.4 30.5 0.03703 0.03638 0.03621 0.03616 0.03614 0.03610 0.03607 0.03604 0.03601 0.03599 0.03596 0.03595 0.03592 0.03590 0.03587 0.03584 0.03580 0.03574 0.03567 0.03560 0.03552 0.03540 0.03527 0.03520 0.03512 0.03504 0.03496 0.03490 0.03482 0.03474 0.03469 0.03463 0.03455 0.03447 0.03440 0.03433 0.03425 0.03416 0.03405 0.03395 0.03384 0.03371 0.03361 0.03350 0.03337 0.03325 0.03312 0.03299 0.03286 0.03272 0.03258 78.3 77.7 76.7 75.7 74.7 73.8 72.8 71.8 70.8 69.8 68.8 67.8 66.8 65.8 64.8 63.9 62.9 61.9 60.9 60.0 59.0 58.1 57.1 56.1 55.2 54.2 53.3 52.3 51.3 50.4 49.4 48.4 47.5 46.5 45.5 44.6 43.6 42.7 41.7 40.8 39.8 38.9 37.9 37.0 36.0 35.1 34.2 33.3 32.3 31.4 30.5 100.000 99.597 99.529 99.501 99.481 99.463 99.446 99.429 99.413 99.399 99.386 99.373 99.360 99.346 99.329 99.308 99.280 99.244 99.199 99.143 99.077 98.993 98.914 98.841 98.771 98.703 98.637 98.572 98.506 98.439 98.370 98.300 98.226 98.149 98.068 97.981 97.889 97.791 97.686 97.572 97.449 97.316 97.171 97.014 96.843 96.656 96.452 96.230 95.987 95.721 95.430 0.00423 0.00077 0.00034 0.00024 0.00023 0.00022 0.00021 0.00020 0.00019 0.00017 0.00016 0.00017 0.00018 0.00022 0.00026 0.00034 0.00044 0.00054 0.00064 0.00076 0.00096 0.00091 0.00084 0.00080 0.00078 0.00077 0.00076 0.00077 0.00078 0.00079 0.00082 0.00086 0.00090 0.00094 0.00099 0.00106 0.00114 0.00122 0.00131 0.00142 0.00154 0.00165 0.00179 0.00195 0.00212 0.00231 0.00252 0.00276 0.00301 0.00329 0.00360 0.00384 0.00058 0.00023 0.00016 0.00013 0.00013 0.00012 0.00012 0.00010 0.00009 0.00009 0.00009 0.00010 0.00012 0.00016 0.00022 0.00029 0.00038 0.00047 0.00058 0.00074 0.00068 0.00065 0.00061 0.00059 0.00057 0.00057 0.00057 0.00058 0.00060 0.00062 0.00064 0.00067 0.00072 0.00077 0.00081 0.00087 0.00094 0.00102 0.00110 0.00120 0.00132 0.00144 0.00158 0.00173 0.00190 0.00210 0.00230 0.00254 0.00279 0.00307 0.00010 0.00005 0.00003 0.00002 0.00002 0.00002 0.00002 0.00002 0.00002 0.00002 0.00002 0.00002 0.00002 0.00002 0.00003 0.00003 0.00004 0.00004 0.00004 0.00005 0.00006 0.00006 0.00005 0.00005 0.00005 0.00005 0.00005 0.00005 0.00005 0.00005 0.00005 0.00006 0.00006 0.00006 0.00006 0.00006 0.00007 0.00007 0.00008 0.00008 0.00009 0.00008 0.00009 0.00010 0.00010 0.00010 0.00011 0.00012 0.00012 0.00013 0.00014 IPA Age q. 0.00403 0 0.00068 1 0.00029 2 0.00020 3 0.00018 4 0.00017 5 0.00017 6 0.00016 7 0.00014 8 0.00013 9 0.00013 10 0.00013 11 0.00014 12 0.00017 13 0.00021 14 0.00028 15 0.00036 16 0.00046 17 0.00056 18 0.00067 19 0.00085 20 0.00079 21 0.00074 22 0.00071 23 0.00068 24 0.00067 25 0.00067 26 0.00067 27 0.00068 28 0.00070 29 0.00072 30 0.00075 31 0.00079 32 0.00083 33 0.00088 34 0.00094 35 0.00100 36 0.00108 37 0.00116 38 0.00126 39 0.00137 40 0.00149 41 0.00162 42 0.00176 43 0.00193 44 0.00211 45 0.00231 46 0.00253 47 0.00277 48 0.00304 49 0.00334 50 - 20 - EFTA01125948
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CBS. COMPLETE LIFE TABLES OF ISRAEL 7x1rr 't CPDE/ nninn nms, ,c(n, TABLE 1.- COMPLETE LIFE TABLE OF ISRAEL: TOTAL POPULATION - MALES Total population 2004-2008 Males Olin thrum Life expectancy ino nin Confidence interval DOW '2111 Upper boundary linnn'7111 Lower boundary 11 130 Standard deviation ex DrIXW3 Duna Survivors at age x Ix nlny ninartoa Probability of death ono nin Confidence interval pon) Upper boundary iinnn Lower boundary I pri T1"00 Standard deviation 29.7 28.8 27.9 27.0 26.2 25.3 24.4 23.6 22.8 21.9 21.1 20.3 19.5 18.7 18.0 17.2 16.5 15.7 15.0 14.3 13.6 13.0 12.3 11.7 11.1 10.5 9.9 9.3 8.8 8.2 7.7 7.2 6.8 6.3 5.9 5.5 5.1 4.7 4.4 4.0 3.7 3.4 3.2 2.9 2.7 2.6 2.4 2.4 2.4 29.6 28.7 27.8 26.9 26.0 25.2 24.3 23.5 22.6 21.8 21.0 20.2 19.4 18.6 17.9 17.1 16.4 15.6 14.9 14.2 13.5 12.9 12.2 11.6 11.0 10.4 9.8 9.2 8.7 8.1 7.6 7.1 6.7 6.2 5.8 5.4 5.0 4.6 4.3 3.9 3.6 3.3 3.0 2.8 2.6 2.4 2.2 2.2 2.2 0.03243 0.03228 0.03214 0.03200 0.03185 0.03170 0.03155 0.03139 0.03121 0.03099 0.03078 0.03049 0.03011 0.02972 0.02930 0.02890 0.02852 0.02819 0.02787 0.02754 0.02721 0.02687 0.02652 0.02617 0.02592 0.02568 0.02544 0.02525 0.02510 0.02502 0.02498 0.02508 0.02526 0.02554 0.02595 0.02649 0.02701 0.02768 0.02814 0.02870 0.02959 0.03090 0.03289 0.03538 0.03878 0.04354 0.04893 0.05576 0.05891 29.6 28.7 27.9 27.0 26.1 25.2 24.4 23.5 22.7 21.9 21.1 20.3 19.5 18.7 17.9 17.2 16.4 15.7 15.0 14.3 13.6 12.9 12.3 11.6 11.0 10.4 9.8 9.3 8.7 8.2 7.7 7.2 6.7 6.3 5.8 5.4 5.0 4.7 4.3 4.0 3.7 3.4 3.1 2.9 2.7 2.5 2.3 2.3 2.3 2.6 95.111 94.763 94.382 93.965 93.509 93.010 92.464 91.868 91.217 90.506 89.731 88.885 87.963 86.959 85.868 84.681 83.393 81.996 80.484 78.848 77.083 75.181 73.136 70.942 68.594 66.090 63.426 60.605 57.627 54.499 51.229 47.832 44.325 40.730 37.075 33.393 29.721 26.102 22.582 19.209 16.029 13.090 10.431 8.084 6.070 4.397 3.057 2.028 1.276 755 0.00394 0.00431 0.00472 0.00518 0.00568 0.00623 0.00684 0.00751 0.00826 0.00906 0.00999 0.01100 0.01208 0.01328 0.01457 0.01600 0.01756 0.01931 0.02125 0.02338 0.02574 0.02836 0.03124 0.03437 0.03790 0.04181 0.04611 0.05089 0.05617 0.06206 0.06853 0.07576 0.08381 0.09275 0.10270 0.11390 0.12623 0.14022 0.15551 0.17239 0.19118 0.21204 0.23557 0.26162 0.29053 0.32353 0.35919 0.40005 0.44591 0.00338 0.00374 0.00411 0.00453 0.00499 0.00550 0.00605 0.00666 0.00733 0.00808 0.00887 0.00974 0.01073 0.01183 0.01306 0.01442 0.01593 0.01758 0.01939 0.02140 0.02361 0.02605 0.02876 0.03181 0.03512 0.03879 0.04287 0.04738 0.05240 0.05792 0.06409 0.07089 0.07840 0.08673 0.09595 0.10601 0.11729 0.12949 0.14326 0.15862 0.17556 0.19425 0.21444 0.23662 0.26079 0.28599 0.31387 0.34201 0.37057 0.00014 0.00015 0.00016 0.00016 0.00017 0.00019 0.00020 0.00022 0.00024 0.00025 0.00029 0.00032 0.00034 0.00037 0.00038 0.00040 0.00042 0.00044 0.00047 0.00050 0.00055 0.00059 0.00063 0.00065 0.00071 0.00077 0.00083 0.00090 0.00096 0.00106 0.00113 0.00124 0.00138 0.00154 0.00172 0.00201 0.00228 0.00274 0.00312 0.00351 0.00399 0.00454 0.00539 0.00638 0.00759 0.00958 0.01156 0.01481 0.01922 '71 q. Age 0.00366 51 0.00402 52 0.00442 53 0.00485 54 0.00534 55 0.00586 56 0.00645 57 0.00709 58 0.00779 59 0.00857 60 0.00943 61 0.01037 62 0.01141 63 0.01256 64 0.01382 65 0.01521 66 0.01675 67 0.01845 68 0.02032 69 0.02239 70 0.02468 71 0.02720 72 0.03000 73 0.03309 74 0.03651 75 0.04030 76 0.04449 77 0.04914 78 0.05428 79 0.05999 80 0.06631 81 0.07333 82 0.08111 83 0.08974 84 0.09932 85 0.10995 86 0.12176 87 0.13486 88 0.14939 89 0.16551 90 0.18337 91 0.20314 92 0.22500 93 0.24912 94 0.27566 95 0.30476 96 0.33653 97 0.37103 98 0.40824 99 0.44805 100+ - 21 - EFTA01125949
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CBS. COMPLETE LIFE TABLES OF ISRAEL 7x7vr 7e, oin7er nninn ntnt7 ,en7 ruap3 - neicutixn 673 :11/41W IM n5W nrunn nei -.2 ne, 2004-2008 nnolininn 53 Olin n imin Life expectancy ono nin Confidence interval 'FIN 17111 Upper boundary prinn .7ta.1 Lower boundary hn 111430 Standard deviation ex 13,1XW3 trona Survivors at age x Ix nun't nnanon Probability of death ono nin Confidence interval pon Upper boundary pnnn Lower boundary WI) 11"130 Standard deviation 82.3 81.6 80.6 79.7 78.7 77.7 76.7 75.7 74.7 73.7 72.7 71.7 70.7 69.7 68.7 67.8 66.8 65.8 64.8 63.8 62.8 61.8 60.8 59.9 58.9 57.9 56.9 55.9 54.9 53.9 52.9 52.0 51.0 50.0 49.0 48.0 47.1 46.1 45.1 44.1 43.2 42.2 41.2 40.3 39.3 38.3 37.4 36.4 35.5 34.5 33.6 82.2 81.5 80.5 79.5 78.5 77.6 76.6 75.6 74.6 73.6 72.6 71.6 70.6 69.6 68.6 67.6 66.6 65.6 64.7 63.7 62.7 61.7 60.7 59.7 58.7 57.8 56.8 55.8 54.8 53.8 52.8 51.8 50.9 49.9 48.9 47.9 46.9 46.0 45.0 44.0 43.0 42.1 41.1 40.1 39.2 38.2 37.3 36.3 35.4 34.4 33.5 0.03234 82.2 0.03158 81.5 0.03138 80.6 0.03132 79.6 0.03129 78.6 0.03126 77.6 0.03123 76.6 0.03119 75.6 0.03116 74.6 0.03114 73.6 0.03111 72.7 0.03110 71.7 0.03107 70.7 0.03105 69.7 0.03103 68.7 0.03100 67.7 0.03096 66.7 0.03093 65.7 0.03089 64.7 0.03086 63.7 0.03081 62.7 0.03075 61.8 0.03071 60.8 0.03067 59.8 0.03062 58.8 0.03059 57.8 0.03055 56.8 0.03051 55.8 0.03047 54.9 0.03043 53.9 0.03038 52.9 0.03034 51.9 0.03030 50.9 0.03025 49.9 0.03020 49.0 0.03015 48.0 0.03009 47.0 0.03003 46.0 0.02995 45.0 0.02988 44.1 0.02980 43.1 0.02971 42.1 0.02963 41.2 0.02953 40.2 0.02942 39.2 0.02931 38.3 0.02920 37.3 0.02909 36.4 0.02899 35.4 0.02886 34.5 0.02874 33.5 100.000 99.663 99.609 99.586 99.570 99.557 99.544 99.532 99.521 99.511 99.502 99.493 99.484 99.475 99.464 99.452 99.438 99.422 99.406 99.389 99.364 99.338 99.314 99.291 99.268 99.245 99.222 99.198 99.173 99.147 99.120 99.090 99.058 99.023 98.985 98.944 98.899 98.850 98.796 98.736 98.671 98.599 98.520 98.433 98.337 98.232 98.117 97.991 97.852 97.700 97.534 0.00355 0.00063 0.00028 0.00020 0.00018 0.00017 0.00016 0.00015 0.00013 0.00013 0.00011 0.00012 0.00013 0.00015 0.00017 0.00018 0.00020 0.00021 0.00022 0.00030 0.00032 0.00030 0.00029 0.00029 0.00028 0.00029 0.00030 0.00031 0.00033 0.00035 0.00036 0.00039 0.00042 0.00046 0.00050 0.00054 0.00059 0.00065 0.00071 0.00077 0.00084 0.00092 0.00101 0.00111 0.00122 0.00132 0.00144 0.00157 0.00173 0.00189 0.00207 0.00319 0.00045 0.00018 0.00012 0.00010 0.00009 0.00008 0.00007 0.00007 0.00005 0.00006 0.00005 0.00006 0.00007 0.00008 0.00010 0.00010 0.00011 0.00013 0.00018 0.00020 0.00019 0.00018 0.00017 0.00018 0.00018 0.00018 0.00019 0.00020 0.00021 0.00023 0.00026 0.00028 0.00030 0.00033 0.00037 0.00041 0.00045 0.00050 0.00055 0.00061 0.00068 0.00075 0.00083 0.00092 0.00102 0.00113 0.00126 0.00138 0.00152 0.00167 0.00009 0.00005 0.00002 0.00002 0.00002 0.00002 0.00002 0.00002 0.00002 0.00002 0.00001 0.00002 0.00002 0.00002 0.00002 0.00002 0.00002 0.00002 0.00002 0.00003 0.00003 0.00003 0.00003 0.00003 0.00003 0.00003 0.00003 0.00003 0.00003 0.00003 0.00003 0.00003 0.00004 0.00004 0.00004 0.00004 0.00005 0.00005 0.00005 0.00006 0.00006 0.00006 0.00007 0.00007 0.00008 0.00008 0.00008 0.00008 0.00009 0.00009 0.00010 map) 'PA Age q. 0.00337 0 0.00054 1 0.00023 2 0.00016 3 0.00014 4 0.00013 5 0.00012 6 0.00011 7 0.00010 8 0.00009 9 0.00009 10 0.00009 11 0.00010 12 0.00011 13 0.00012 14 0.00014 15 0.00015 16 0.00016 17 0.00018 18 0.00024 19 0.00026 20 0.00024 21 0.00023 22 0.00023 23 0.00023 24 0.00023 25 0.00024 26 0.00025 27 0.00026 28 0.00028 29 0.00030 30 0.00032 31 0.00035 32 0.00038 33 0.00042 34 0.00045 35 0.00050 36 0.00055 37 0.00060 38 0.00066 39 0.00073 40 0.00080 41 0.00088 42 0.00097 43 0.00107 44 0.00117 45 0.00129 46 0.00141 47 0.00155 48 0.00170 49 0.00187 50 - 22 - EFTA01125950
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CBS. COMPLETE LIFE TABLES OF ISRAEL a't7E/' yeu CPDE/ an inn nms, ,c(n, TABLE 2.- COMPLETE LIFE TABLE OF ISRAEL: TOTAL POPULATION - FEMALES Total population 2004-2008 Females Olin thrum Life expectancy ino nil, Confidence interval Ir r>70.1 llnnn .7ta.1 Upper Lower boundary boundary hn 111 30 Standard deviation ex DrIXW3 Duna Survivors at age x Ix nlny ninartoa Probability of death ono ui Confidence interval IP.71.1 'MA Upper boundary imnn Lower boundary 11"130 Standard deviation 32.7 31.7 30.8 29.9 28.9 28.0 27.1 26.2 25.3 24.4 23.5 22.7 21.8 20.9 20.1 19.2 18.4 17.6 16.8 16.0 15.2 14.4 13.7 12.9 12.2 11.5 10.8 10.2 9.5 8.9 8.3 7.7 7.2 6.7 6.1 5.7 5.2 4.8 4.4 4.0 3.6 3.3 3.0 2.7 2.5 2.3 2.1 2.0 2.1 32.5 31.6 30.7 29.8 28.8 27.9 27.0 26.1 25.2 24.3 23.4 22.6 21.7 20.8 20.0 19.1 18.3 17.5 16.7 15.9 15.1 14.3 13.6 12.9 12.1 11.4 10.8 10.1 9.5 8.8 8.2 7.7 7.1 6.6 6.1 5.6 5.1 4.7 4.3 3.9 3.5 3.2 2.9 2.6 2.4 2.1 2.0 1.9 1.9 0.02860 32.6 0.02846 31.7 0.02832 30.7 0.02818 29.8 0.02804 28.9 0.02790 28.0 0.02774 27.1 0.02759 26.2 0.02742 25.3 0.02725 24.4 0.02703 23.5 0.02677 22.6 0.02643 21.7 0.02609 20.9 0.02572 20.0 0.02532 19.2 0.02494 18.4 0.02459 17.5 0.02425 16.7 0.02390 15.9 0.02355 15.2 0.02320 14.4 0.02281 13.6 0.02243 12.9 0.02206 12.2 0.02170 11.5 0.02136 10.8 0.02107 10.1 0.02083 9.5 0.02063 8.9 0.02051 8.3 0.02049 7.7 0.02051 7.1 0.02060 6.6 0.02074 6.1 0.02089 5.6 0.02098 5.2 0.02104 4.7 0.02105 4.3 0.02107 3.9 0.02125 3.6 0.02189 3.3 0.02298 2.9 0.02452 2.7 0.02685 2.4 0.03008 2.2 0.03512 2.0 0.04072 1.9 0.04420 2.0 2.3 97.351 97.151 96.933 96.693 96.431 96.143 95.828 95.483 95.104 94.688 94.231 93.728 93.175 92.566 91.895 91.154 90.337 89.435 88.438 87.337 86.119 84.774 83.288 81.648 79.839 77.848 75.660 73.262 70.641 67.786 64.690 61.350 57.767 53.950 49.917 45.693 41.317 36.838 32.318 27.828 23.453 19.279 15.396 11.887 8.824 6.255 4.199 2.644 1.544 824 0.00226 0.00185 0.00010 0.00246 0.00204 0.00011 0.00269 0.00225 0.00011 0.00295 0.00248 0.00012 0.00323 0.00274 0.00012 0.00354 0.00301 0.00013 0.00388 0.00333 0.00014 0.00426 0.00367 0.00015 0.00469 0.00406 0.00016 0.00519 0.00447 0.00018 0.00573 0.00494 0.00020 0.00635 0.00545 0.00023 0.00701 0.00606 0.00024 0.00776 0.00674 0.00026 0.00861 0.00750 0.00028 0.00954 0.00839 0.00029 0.01058 0.00940 0.00030 0.01176 0.01053 0.00031 0.01312 0.01179 0.00034 0.01465 0.01323 0.00036 0.01638 0.01486 0.00039 0.01836 0.01670 0.00042 0.02058 0.01881 0.00045 0.02310 0.02120 0.00049 0.02596 0.02392 0.00052 0.02920 0.02701 0.00056 0.03286 0.03054 0.00059 0.03703 0.03453 0.00064 0.04176 0.03906 0.00069 0.04713 0.04421 0.00074 0.05321 0.05006 0.00080 0.06016 0.05665 0.00090 0.06802 0.06411 0.00100 0.07699 0.07254 0.00113 0.08718 0.08204 0.00131 0.09879 0.09274 0.00154 0.11193 0.10488 0.00180 0.12681 0.11861 0.00209 0.14363 0.13420 0.00241 0.16257 0.15192 0.00272 0.18389 0.17207 0.00301 0.20820 0.19463 0.00346 0.23594 0.21981 0.00411 0.26728 0.24809 0.00489 0.30300 0.27935 0.00603 0.34304 0.31422 0.00735 0.38950 0.35104 0.00981 0.44107 0.39125 0.01271 0.49746 0.43487 0.01597 12 Age q. 0.00205 51 0.00225 52 0.00247 53 0.00271 54 0.00298 55 0.00328 56 0.00360 57 0.00397 58 0.00437 59 0.00483 60 0.00533 61 0.00590 62 0.00654 63 0.00725 64 0.00806 65 0.00896 66 0.00999 67 0.01115 68 0.01246 69 0.01394 70 0.01562 71 0.01753 72 0.01969 73 0.02215 74 0.02494 75 0.02810 76 0.03170 77 0.03578 78 0.04041 79 0.04567 80 0.05164 81 0.05840 82 0.06607 83 0.07476 84 0.08461 85 0.09577 86 0.10841 87 0.12271 88 0.13891 89 0.15724 90 0.17798 91 0.20142 92 0.22787 93 0.25769 94 0.29118 95 0.32863 96 0.37027 97 0.41616 98 0.46616 99 0.51984 100+ - 23 - EFTA01125951
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CBS. COMPLETE LIFE TABLES OF ISRAEL 7x~vr 7e, oin7er nninn ntnt7 ,en7 13.13T - ovum no-nno :`/X1VP CII/W nrunn nn -.3 nu' 2004-2008 onnxt orrini Olin nimin Life expectancy n'-men Irma Survivors at age x Ix ino nil, Confidence interval 111 30 Standard deviation ex 7111 Upper boundary linnn .7ta.1 Lower boundary 78.9 78.7 0.03901 78.8 100.000 78.1 78.0 0.03835 78.1 99.699 77.2 77.0 0.03822 77.1 99.662 76.2 76.0 0.03819 76.1 99.647 75.2 75.0 0.03817 75.1 99.636 74.2 74.0 0.03813 74.1 99.626 73.2 73.0 0.03811 73.1 99.615 72.2 72.1 0.03808 72.1 99.604 71.2 71.1 0.03806 71.1 99.594 70.2 70.1 0.03803 70.1 99.584 69.2 69.1 0.03801 69.1 99.575 68.2 68.1 0.03799 68.2 99.566 67.2 67.1 0.03796 67.2 99.556 66.2 66.1 0.03794 66.2 99.544 65.3 65.1 0.03791 65.2 99.530 64.3 64.1 0.03787 64.2 99.511 63.3 63.1 0.03782 63.2 99.488 62.3 62.1 0.03775 62.2 99.459 61.3 61.2 0.03769 61.2 99.423 60.3 60.2 0.03762 60.3 99.379 59.4 59.2 0.03749 59.3 99.310 58.4 58.3 0.03737 58.4 99.237 57.5 57.3 0.03724 57.4 99.169 56.5 56.4 0.03716 56.4 99.104 55.5 55.4 0.03707 55.5 99.042 54.6 54.4 0.03698 54.5 98.981 53.6 53.5 0.03688 53.5 98.921 52.6 52.5 0.03682 52.6 98.860 51.7 51.5 0.03672 51.6 98.798 50.7 50.6 0.03663 50.6 98.735 49.7 49.6 0.03657 49.7 98.670 48.8 48.6 0.03649 48.7 98.602 47.8 47.7 0.03639 47.7 98.531 46.8 46.7 0.03631 46.8 98.456 45.9 45.7 0.03621 45.8 98.376 44.9 44.8 0.03613 44.8 98.292 44.0 43.8 0.03602 43.9 98.201 43.0 42.9 0.03591 42.9 98.104 42.0 41.9 0.03578 42.0 97.999 41.1 41.0 0.03566 41.0 97.886 40.1 40.0 0.03553 40.1 97.764 39.2 39.1 0.03536 39.1 97.632 38.3 38.1 0.03522 38.2 97.488 37.3 37.2 0.03508 37.2 97.332 36.4 36.2 0.03492 36.3 97.162 35.4 35.3 0.03476 35.4 96.978 34.5 34.4 0.03461 34.5 96.777 33.6 33.5 0.03446 33.5 96.557 32.7 32.5 0.03428 32.6 96.318 31.8 31.6 0.03412 31.7 96.058 30.9 30.7 0.03394 30.8 95.774 nun runanon Probability of death ono flit, Confidence interval pot, Upper boundary pnnn Lower boundary I prl T1"130 Standard deviation 0.00320 0.00282 0.00010 0.00046 0.00029 0.00004 0.00019 0.00010 0.00002 0.00014 0.00007 0.00002 0.00015 0.00006 0.00002 0.00014 0.00007 0.00002 0.00015 0.00006 0.00002 0.00014 0.00007 0.00002 0.00014 0.00005 0.00002 0.00013 0.00005 0.00002 0.00013 0.00006 0.00002 0.00015 0.00005 0.00002 0.00015 0.00008 0.00002 0.00020 0.00009 0.00003 0.00024 0.00013 0.00003 0.00030 0.00017 0.00003 0.00037 0.00022 0.00004 0.00043 0.00028 0.00004 0.00053 0.00037 0.00004 0.00080 0.00058 0.00006 0.00085 0.00062 0.00006 0.00080 0.00057 0.00006 0.00075 0.00056 0.00005 0.00073 0.00052 0.00005 0.00072 0.00051 0.00005 0.00072 0.00050 0.00005 0.00071 0.00052 0.00005 0.00073 0.00051 0.00006 0.00075 0.00053 0.00006 0.00076 0.00056 0.00005 0.00080 0.00058 0.00006 0.00084 0.00060 0.00006 0.00088 0.00064 0.00006 0.00093 0.00068 0.00006 0.00099 0.00074 0.00006 0.00106 0.00078 0.00007 0.00114 0.00084 0.00008 0.00123 0.00091 0.00008 0.00131 0.00099 0.00008 0.00142 0.00108 0.00009 0.00154 0.00116 0.00010 0.00166 0.00128 0.00010 0.00180 0.00140 0.00010 0.00195 0.00153 0.00011 0.00212 0.00169 0.00011 0.00229 0.00185 0.00011 0.00250 0.00203 0.00012 0.00273 0.00222 0.00013 0.00296 0.00245 0.00013 0.00323 0.00269 0.00014 0.00352 0.00296 0.00014 IPA Age q. 0.00301 0.00038 1 0.00015 2 0.00011 3 0.00010 4 0.00011 5 0.00011 6 0.00010 7 0.00010 8 0.00009 9 0.00009 10 0.00010 11 0.00012 12 0.00014 13 0.00018 14 0.00024 15 0.00029 16 0.00036 17 0.00045 18 0.00069 19 0.00074 20 0.00069 21 0.00065 22 0.00063 23 0.00062 24 0.00061 25 0.00061 26 0.00062 27 0.00064 28 0.00066 29 0.00069 30 0.00072 31 0.00076 32 0.00081 33 0.00086 34 0.00092 35 0.00099 36 0.00107 37 0.00115 38 0.00125 39 0.00135 40 0.00147 41 0.00160 42 0.00174 43 0.00190 44 0.00207 45 0.00226 46 0.00247 47 0.00271 48 0.00296 49 0.00324 50 - 24 - EFTA01125952
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CBS. COMPLETE LIFE TABLES OF ISRAEL X1E/' ye, CPDE/ an inn nms, ,c(n, TABLE 3.- COMPLETE LIFE TABLE OF ISRAEL: JEWS AND OTHERS - MALES Jews and others 2004-2008 Males Olin thrum Life expectancy 1:101X W3 On r12 Survivors at age x Ix ino nin Confidence interval hn 111 30 Standard deviation ex pow 70.1 Upper boundary Iinnn .7ta.1 Lower boundary 30.0 29.8 0.03377 29.9 95.463 29.1 28.9 0.03360 29.0 95.125 28.2 28.0 0.03344 28.1 94.756 27.3 27.2 0.03328 27.2 94.353 26.4 26.3 0.03312 26.3 93.913 25.5 25.4 0.03296 25.5 93.434 24.7 24.6 0.03281 24.6 92.910 23.8 23.7 0.03264 23.8 92.339 23.0 22.9 0.03246 22.9 91.717 22.2 22.0 0.03223 22.1 91.038 21.3 21.2 0.03200 21.3 90.297 20.5 20.4 0.03166 20.5 89.490 19.7 19.6 0.03121 19.7 88.611 18.9 18.8 0.03074 18.9 87.653 18.1 18.0 0.03027 18.1 86.611 17.4 17.3 0.02982 17.3 85.477 16.6 16.5 0.02938 16.6 84.244 15.9 15.8 0.02901 15.8 82.904 15.2 15.0 0.02865 15.1 81.451 14.4 14.3 0.02827 14.4 79.875 13.7 13.6 0.02790 13.7 78.169 13.1 13.0 0.02754 13.0 76.324 12.4 12.3 0.02714 12.3 74.335 11.7 11.6 0.02673 11.7 72.192 11.1 11.0 0.02645 11.1 69.891 10.5 10.4 0.02618 10.5 67.425 9.9 9.8 0.02590 9.9 64.792 9.3 9.2 0.02569 9.3 61.989 8.8 8.7 0.02550 8.7 59.018 8.2 8.1 0.02540 8.2 55.884 7.7 7.6 0.02534 7.7 52.593 7.2 7.1 0.02542 7.2 49.158 6.7 6.6 0.02558 6.7 45.596 6.3 6.2 0.02586 6.2 41.930 5.8 5.7 0.02627 5.8 38.188 5.4 5.3 0.02681 5.4 34.404 5.0 4.9 0.02733 5.0 30.618 4.6 4.5 0.02801 4.6 26.875 4.3 4.2 0.02845 4.2 23.226 4.0 3.8 0.02899 3.9 19.721 3.6 3.5 0.02987 3.6 16.413 3.4 3.2 0.03117 3.3 13.354 3.1 3.0 0.03318 3.0 10.588 2.8 2.7 0.03571 2.8 8.150 2.6 2.5 0.03927 2.6 6.066 2.5 2.3 0.04427 2.4 4.344 2.3 2.1 0.04994 2.2 2.975 2.3 2.1 0.05790 2.2 1.937 2.3 2.1 0.06250 2.2 1.189 2.5 682 n nranoa Probability of death ono nin Confidence interval IP.71.1 'MA Upper boundary ionnn Lower boundary [On n"UO Standard deviation 0.00384 0.00325 0.00015 0.00418 0.00358 0.00015 0.00457 0.00394 0.00016 0.00499 0.00433 0.00017 0.00546 0.00476 0.00018 0.00597 0.00523 0.00019 0.00654 0.00575 0.00020 0.00717 0.00632 0.00022 0.00788 0.00693 0.00024 0.00864 0.00763 0.00026 0.00952 0.00835 0.00030 0.01049 0.00916 0.00034 0.01152 0.01009 0.00036 0.01264 0.01115 0.00038 0.01388 0.01231 0.00040 0.01524 0.01361 0.00042 0.01674 0.01507 0.00043 0.01842 0.01665 0.00045 0.02030 0.01840 0.00049 0.02237 0.02035 0.00051 0.02468 0.02251 0.00055 0.02725 0.02489 0.00060 0.03009 0.02755 0.00065 0.03318 0.03058 0.00066 0.03669 0.03387 0.00072 0.04059 0.03752 0.00078 0.04490 0.04161 0.00084 0.04971 0.04614 0.00091 0.05502 0.05120 0.00097 0.06099 0.05679 0.00107 0.06756 0.06305 0.00115 0.07494 0.06997 0.00127 0.08315 0.07766 0.00140 0.09231 0.08618 0.00156 0.10253 0.09565 0.00176 0.11409 0.10600 0.00206 0.12683 0.11764 0.00234 0.14136 0.13025 0.00283 0.15726 0.14456 0.00324 0.17486 0.16055 0.00365 0.19455 0.17824 0.00416 0.21645 0.19786 0.00474 0.24131 0.21908 0.00567 0.26886 0.24258 0.00670 0.29972 0.26815 0.00805 0.33512 0.29491 0.01026 0.37313 0.32508 0.01226 0.41745 0.35510 0.01590 0.46720 0.38581 0.02076 12 Age q. 0.00354 51 0.00388 52 0.00425 53 0.00466 54 0.00511 55 0.00560 56 0.00614 57 0.00674 58 0.00740 59 0.00813 60 0.00894 61 0.00982 62 0.01081 63 0.01189 64 0.01309 65 0.01443 66 0.01590 67 0.01754 68 0.01935 69 0.02136 70 0.02359 71 0.02607 72 0.02882 73 0.03188 74 0.03528 75 0.03906 76 0.04325 77 0.04792 78 0.05311 79 0.05889 80 0.06531 81 0.07245 82 0.08040 83 0.08925 84 0.09909 85 0.11004 86 0.12224 87 0.13581 88 0.15091 89 0.16771 90 0.18639 91 0.20715 92 0.23019 93 0.25572 94 0.28394 95 0.31502 96 0.34911 97 0.38627 98 0.42650 99 0.46964 100+ - 25 - EFTA01125953
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CBS. COMPLETE LIFE TABLES OF ISRAEL 7x~vr 7e, oin7er nninn ntnt7 ,en7 map - arum of-nn. :'nnlu' 'Mr 05w nninn nth -.4 nuip 2004-2008 onnmi orrun. Olin nimin Life expectancy ono nin Confidence interval 'FIN 17111 Upper boundary prinn .7ta.1 Lower boundary hn 111430 Standard deviation ex DrIXW3 On r12 Survivors at age x Ix nun't nnanon Probability of death ono nin Confidence interval pon 7i Upper boundary pnnn Lower boundary WI) 11"130 Standard deviation 82.7 81.9 81.0 80.0 79.0 78.0 77.0 76.0 75.0 74.0 73.0 72.0 71.0 70.0 69.0 68.1 67.1 66.1 65.1 64.1 63.1 62.1 61.1 60.1 59.2 58.2 57.2 56.2 55.2 54.2 53.2 52.3 51.3 50.3 49.3 48.3 47.3 46.4 45.4 44.4 43.4 42.5 41.5 40.5 39.6 38.6 37.7 36.7 35.7 34.8 33.9 82.6 81.8 80.8 79.8 78.9 77.9 76.9 75.9 74.9 73.9 72.9 71.9 70.9 69.9 68.9 67.9 66.9 65.9 65.0 64.0 63.0 62.0 61.0 60.0 59.0 58.0 57.1 56.1 55.1 54.1 53.1 52.1 51.1 50.2 49.2 48.2 47.2 46.2 45.3 44.3 43.3 42.4 41.4 40.4 39.5 38.5 37.5 36.6 35.6 34.7 33.7 0.03405 0.03307 0.03300 0.03296 0.03291 0.03287 0.03284 0.03282 0.03279 0.03276 0.03274 0.03272 0.03269 0.03267 0.03263 0.03259 0.03255 0.03251 0.03246 0.03243 0.03240 0.03236 0.03232 0.03228 0.03222 0.03218 0.03213 0.03208 0.03202 0.03196 0.03189 0.03183 0.03177 0.03169 0.03163 0.03156 0.03149 0.03141 0.03132 0.03124 0.03115 0.03106 0.03097 0.03088 0.03077 0.03064 0.03054 0.03043 0.03033 0.03021 0.03009 82.7 81.9 80.9 79.9 78.9 77.9 76.9 75.9 74.9 74.0 73.0 72.0 71.0 70.0 69.0 68.0 67.0 66.0 65.0 64.0 63.0 62.1 61.1 60.1 59.1 58.1 57.1 56.1 55.1 54.2 53.2 52.2 51.2 50.2 49.2 48.3 47.3 46.3 45.3 44.4 43.4 42.4 41.4 40.5 39.5 38.6 37.6 36.6 35.7 34.7 33.8 100.000 99.722 99.702 99.690 99.678 99.667 99.657 99.649 99.643 99.636 99.628 99.620 99.613 99.607 99.596 99.584 99.571 99.556 99.541 99.525 99.508 99.489 99.470 99.450 99.429 99.406 99.382 99.357 99.331 99.303 99.273 99.242 99.208 99.173 99.134 99.093 99.049 99.001 98.949 98.892 98.831 98.764 98.691 98.611 98.523 98.427 98.321 98.204 98.075 97.934 97.777 0.00298 0.00026 0.00016 0.00016 0.00016 0.00013 0.00011 0.00011 0.00010 0.00011 0.00011 0.00011 0.00010 0.00016 0.00017 0.00018 0.00019 0.00021 0.00021 0.00022 0.00024 0.00025 0.00026 0.00028 0.00029 0.00030 0.00032 0.00034 0.00036 0.00038 0.00039 0.00042 0.00045 0.00047 0.00051 0.00054 0.00059 0.00064 0.00068 0.00074 0.00080 0.00086 0.00094 0.00103 0.00113 0.00123 0.00134 0.00147 0.00162 0.00178 0.00197 0.00258 0.00015 0.00008 0.00007 0.00007 0.00006 0.00004 0.00003 0.00003 0.00004 0.00004 0.00003 0.00003 0.00006 0.00007 0.00008 0.00009 0.00010 0.00011 0.00012 0.00013 0.00014 0.00015 0.00015 0.00017 0.00017 0.00018 0.00019 0.00020 0.00022 0.00024 0.00026 0.00027 0.00030 0.00032 0.00036 0.00038 0.00041 0.00046 0.00050 0.00056 0.00062 0.00068 0.00075 0.00082 0.00093 0.00103 0.00115 0.00127 0.00141 0.00156 0.00010 0.00003 0.00002 0.00002 0.00002 0.00002 0.00002 0.00002 0.00002 0.00002 0.00002 0.00002 0.00002 0.00002 0.00003 0.00002 0.00003 0.00003 0.00002 0.00003 0.00003 0.00003 0.00003 0.00003 0.00003 0.00003 0.00004 0.00004 0.00004 0.00004 0.00004 0.00004 0.00005 0.00004 0.00005 0.00005 0.00005 0.00006 0.00006 0.00006 0.00006 0.00006 0.00007 0.00007 0.00008 0.00008 0.00008 0.00008 0.00009 0.00009 0.00010 map) 'PA Age q. 0.00278 0 0.00021 1 0.00012 2 0.00012 3 0.00012 4 0.00010 5 0.00008 6 0.00007 7 0.00007 8 0.00008 9 0.00008 10 0.00007 11 0.00007 12 0.00011 13 0.00012 14 0.00013 15 0.00014 16 0.00015 17 0.00016 18 0.00017 19 0.00018 20 0.00019 21 0.00020 22 0.00021 23 0.00023 24 0.00024 25 0.00025 26 0.00027 27 0.00028 28 0.00030 29 0.00032 30 0.00034 31 0.00036 32 0.00039 33 0.00042 34 0.00045 35 0.00048 36 0.00052 37 0.00057 38 0.00062 39 0.00068 40 0.00074 41 0.00081 42 0.00089 43 0.00098 44 0.00108 45 0.00119 46 0.00131 47 0.00145 48 0.00160 49 0.00176 50 - 26 - EFTA01125954
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