ACTUARIAL NOTE

SOCIAL SECURITY ADMINISTRATION
Number 2010.3
February 2011
Office of the Chief Actuary
Baltimore, Maryland

Scaled Factors for Hypothetical Earnings Examples under the 2010 Trustees Report Assumptions

by Michael Clingman and Kyle Burkhalter

1. Introduction

Hypothetical earnings histories have traditionally been used by the Office of the Chief Actuary to illustrate a range of benefit levels, replacement rates, money's worth measures, and internal rates of return under the Social Security program. These illustrations have long been used to evaluate the program under present law, but have increasingly been used to evaluate the effects of possible program changes.1

Prior to the development of scaled factors, hypothetical steady workers were generally used. Such steady workers are assumed to earn a constant percentage of SSA's national average wage index (AWI)2 throughout their careers. These hypothetical steady earnings patterns tend to over-represent the proportion of actual lifetime earnings received at younger ages and under-represent the proportion received at prime working ages for most workers. Over-representing early earnings tends to bias downward estimates of the internal rate of return of the present-law program. To avoid this bias, the Office of the Chief Actuary developed scaled worker hypothetical earnings patterns in 2001. These patterns express earnings at levels relative to the AWI by age. These earnings levels reflect the average patterns of work and earnings of actual insured workers over their careers.

This note presents the three sets of scaled worker factors recently updated for the hypothetical low, medium, and high lifetime earnings examples used in table VI.F10 of the 2010 Trustees Report. In addition, this note presents a set of scaled worker factors for a hypothetical worker with "very low" lifetime earnings. Final scaled factors are presented in table 6.

In developing these four sets of factors, one set of raw scaled factors is initially developed using earnings from the Continuous Work History Sample (CWHS). A preliminary adjustment is made to these raw factors for ages 62 and over to account for the select nature of these workers who continue working at such ages. Then, these preliminary adjusted scaled factors are further adjusted so that the resulting career-average earnings levels3 are 25 percent, 45 percent, 100 percent, and 160 percent of the AWI for the very low, low, medium, and high hypothetical workers, respectively. These career-average earnings levels have been selected in order to provide both a useful range of examples and continuity with previous estimates for hypothetical workers. A final hypothetical "maximum" earner with earnings equal to the OASDI maximum taxable earnings level for each year is also included in order to provide a fuller range of career taxable earnings levels under the Social Security program.

It is useful to see how overall earnings for these hypothetical workers compare to those of actual retiring workers. The Average Indexed Monthly Earnings4 (AIME), which is calculated based on a worker's earnings, is a convenient measure of this. Table 1 shows the distribution of actual workers retiring in 2009 relative to the AIMEs of hypothetical scaled workers, based on a 1-percent sample of records from SSA's administrative records.

Table 1.—Distribution of AIMEs of Actual Workers Retiring in 2009, Relative to AIMEs
for Hypothetical Workers Retiring in 2009
Hypothetical worker1
(Career-average earnings)2
Percent with AIME less than AIME
for hypothetical case
Percent with AIME closest to AIME
for hypothetical case3
All
males
All
females
Total,
all
workers
All
males
All
females
Total,
all
workers
Very Low ($10,333)
6.5
18.6
12.2
10.5
28.4
18.9
Low ($18,600)
14.3
37.9
25.4
14.0
32.1
22.5
Medium ($41,334)
37.3
76.6
55.8
28.6
28.0
28.3
High ($66,135)
68.9
95.2
81.3
31.2
10.1
21.3
Maximum ($94,276)
100
100
100
15.7
1.4
9.0

1See text for definition of hypothetical workers.

2Career-average earnings of hypothetical scaled workers retiring at age 62 in 2009. Earnings are wage indexed to 2008 in this calculation.

3Rounded values do not necessarily sum to 100 percent.

Note: Worker distributions include individuals who are dually entitled, or may become dually entitled to a higher benefit in the future, based on another worker's account. See text for further discussion.

Table 1 shows that 37.9 percent of female workers retiring in 2009 have AIMEs below that of a hypothetical low wage scaled worker and that about 41 percent of all workers retiring in 2009 have AIMEs closest to that of hypothetical low or very low wage scaled workers. The level of earnings corresponding to the very low scaled factors was first included in 2004 and was initially chosen so that approximately half the retirees who were previously best represented by the hypothetical low scaled worker would now be best represented by the hypothetical very low scaled worker.

Dually entitled workers, though still insured for worker benefits, receive a larger benefit as a dependent on another worker's account (generally as a spouse or widow(er)) than they would as a worker beneficiary only. A significant proportion of entitled female workers, especially those with lower earnings, will receive higher benefits as aged spouse or aged widow beneficiaries. If such dually entitled workers were excluded from this analysis, the distributions would be concentrated more toward the higher-level hypothetical workers.

2. Developing Raw Scaled Factors from Earnings in the CWHS

Development of the raw scaled factors occurs in three steps:

a. Select workers in the CWHS for computing the factors,

b. Tabulate the earnings for these workers, and

c. Develop the raw scaled factors from the tabulated earnings.

a. Select Workers in the CWHS for Computing the Factors

The CWHS is a 1-percent sample of workers with some OASDI taxable earnings during their lifetime. It is updated annually by the Office of Systems based on specifications from the Office of Research, Evaluation, and Statistics. The factors in this actuarial note are developed using the CWHS containing earnings data through 2007. The CWHS contains earnings for all persons who have paid any Social Security taxes during their lifetime. It is important to limit analysis only to workers who are likely either to be eligible for retirement or disability benefits, or to have dependents eligible for survivors benefits. To include only those workers, we used the status of fully insured. A worker is considered fully insured if he or she has a total number of quarters of coverage (QCs)5 at least equal to the number of years after attainment of age 21 through the last year considered in the analysis (in this case 2006). A further requirement is that the worker has a minimum of 6 QCs. Since permanent insured status is achieved with 40 QCs, any worker with 40 QCs is fully insured no matter how many years have elapsed since age 21. Any worker who is classified as fully insured is likely to become eligible for a Social Security retirement benefit if he or she survives to eligibility age.

b. Tabulate Earnings for These Workers

The updated CWHS file contains taxable earnings for years 1951 through 2007. Due to posting delays, the earnings for 2007 in this file are less complete than for earlier years and were not used in our analysis. For each of the workers classified as fully insured as of 2006 (based on all earnings after 1950), our analysis includes earnings for the most recent 16-year period (1991 through 2006) for ages 21 and over. Each year of earnings is classified by age of worker, and is expressed as the ratio of the earnings to the AWI for the year.

Scaled factors were developed taking into account both the variations in earnings by age and the probabilities that workers may have years with zero earnings. Years with zero earnings are included among the earnings records selected. However, years in which the worker was deceased6 or receiving a retired worker or disabled worker Social Security benefit are not included.

c. Develop Raw Scaled Factors from the Tabulated Earnings

To normalize earnings from different years, annual earnings amounts for each year are divided by the AWI for that year. For each fully insured worker, normalized earnings are tabulated by age for each age 21 and over for years 1991-2006, as described in the preceding paragraph. The normalized earnings are summed by age and a corresponding worker count is kept. The raw scaled factors are determined by dividing the tabulated sum for each age, including years at zero earnings, by the corresponding numbers of workers. The results are shown in table 2.

Table 2.—Raw Scaled Worker Factors
for the 2010 Trustees Report
Age
Factor
21
0.277
22
0.331
23
0.408
24
0.480
25
0.538
26
0.588
27
0.634
28
0.674
29
0.708
30
0.736
31
0.761
32
0.782
33
0.799
34
0.815
35
0.830
36
0.843
37
0.855
38
0.865
39
0.876
40
0.885
41
0.894
42
0.903
43
0.911
44
0.920
45
0.926
46
0.931
47
0.935
48
0.936
49
0.936
50
0.934
51
0.927
52
0.918
53
0.907
54
0.893
55
0.874
56
0.845
57
0.815
58
0.785
59
0.752
60
0.710
61
0.660
62
0.842
63
0.862
64
0.840

3. Adjust Raw Scaled Factors to Match Selected Career-Average Earnings Levels

Adjustment of the raw scaled factors occurs in three steps:

a. Calculate preliminary adjusted scaled factors from the raw scaled factors by overriding the scaled factors at ages 62-64;

b. Construct the earnings pattern and calculate the career-average earnings for a hypothetical scaled worker using the preliminary adjusted scaled factors; and

c. Calculate very low, low, medium, and high final scaled factors from the preliminary adjusted scaled factors such that the career-average earnings for these hypothetical workers match the selected percentages of the AWI in the year prior to entitlement (25, 45, 100 and 160 percent).

a. Calculate Preliminary Adjusted Scaled Factors from Raw Scaled Factors

The following values, based on table 2, show that there is an accelerating decline in raw factors at ages 60 and 61, followed by increases at ages 62 and 63:

Age
Raw Scaled Factor
Difference
55
0.874
---
56
0.845
-0.029
57
0.815
-0.030
58
0.785
-0.030
59
0.752
-0.033
60
0.710
-0.042
61
0.660
-0.050
62
0.842
+0.182
63
0.862
+0.020
64
0.840
-0.022

We do not have definitive information on the reasons for these changes after age 59. However, it seems reasonable to assume that some of the decline in the raw factors at ages 60 and 61 is due to the retirement (total or partial) of some workers before they became entitled to their OASDI retirement benefits at age 62. The increases in the raw factors at ages 62 and 63 may reasonably be attributed to the fact that healthier, higher-wage workers, and workers who have maintained consistent employment at older ages, are more likely to delay entitlement to OASDI benefits until after age 62. The earnings of many non-workers, low-wage workers, or less-healthy workers have been removed from the tabulated group starting at age 62 because they have started to receive retirement benefits under Social Security.

Due to the differences between the groups of workers represented in data for ages just-before versus just-after reaching age 62, a smoother set of "adjusted" raw factors is developed for ages 62-64. The factors are developed assuming that earnings for workers over age 61 will stay constant in nominal dollars, thus decreasing in dollars that are indexed by changes in the AWI.

The preliminary adjusted scaled factors are set equal to the raw scaled factors for ages up to 61. Factors for ages 62 and over are calculated so that earnings in nominal dollars stay constant at the level for age 61. For example, the preliminary adjusted factor for age 62 is calculated by dividing the factor for age 61 by the ultimate assumed annual increase in average wages under the intermediate assumptions of the 2010 Trustees Report. The calculation of the preliminary adjusted scaled factors for ages 62-64 is shown in table 3.

This approach, while providing an imperfect approximation for all types of workers, was adopted in order to avoid having different scales for workers who become entitled to OASDI benefits at different ages.

Table 3.—Scaled Factor Adjustments
Made for Ages After 61
Age
61
62
63
64
Raw scaled factor
0.660
0.842
0.862
0.840
Ultimate AWI increase since age 61, based on
2010 Trustees Report, Intermediate Assumptions
1.000
1.040
(1.040)2
(1.040)3
Preliminary adjusted scaled factor
(age 61 raw scaled factor) / (Ultimate AWI increase)
0.660
0.635
0.610
0.587

b. Construct the Earnings Pattern and Calculate the Career-Average Earnings for a Selected Hypothetical Scaled Worker Using the Preliminary Adjusted Scaled Factors

The hypothetical scaled worker that is selected (referred to as the 1960-born preliminary scaled worker) is assumed to have been born on January 2, 1960, to have earnings from age 21 through 64, and to retire at age 65. Earnings for each year are calculated by multiplying the preliminary adjusted scaled factor for that age by the AWI value for the corresponding year. This worker turns age 22 in 1982. So the age 22 preliminary adjusted factor of 0.331 is multiplied by the 1982 AWI of $14,531.34 to obtain annual earnings of $4,809,87. Table 4 shows the preliminary adjusted scaled factors, AWI amounts, and corresponding hypothetical earnings for the 1960-born preliminary scaled worker.

The last line of table 4 shows career-average earnings of $63,956 (wage indexed to 2024) for the 1960-born preliminary scaled worker. This is a slightly different calculation than the AIME because (1) earnings are indexed to the year prior to entitlement rather than to two years prior to eligibility, and (2) earnings are averaged on an annual basis instead of a monthly one. For the 1960-born preliminary scaled worker, who retires at age 65 in 2025, the indexing year in computing career-average earnings is 2024.

Table 4.—Computation of the Earnings Record and the Career-Average Earnings for the 1960-Born Preliminary Scaled Worker Based on the Preliminary Adjusted Scaled Factors and the AWI Series 
Year
Age
Preliminary adjusted
scaled factors
AWI for
current year
Estimated earnings
for current year
(1)*(2)
Earnings wage
indexed to
2024
(1)
(2)
(3)
(4)
1981
21
0.277
$13,773.10
$3,815.15
$21,108.01
1982
22
0.331
14,531.34
4,809.87
25,222.90
1983
23
0.408
15,239.24
6,217.61
31,090.49
1984
24
0.480
16,135.07
7,744.83
36,577.03
1985
25
0.538
16,822.51
9,050.51
40,996.77
1986
26
0.588
17,321.82
10,185.23
44,806.88
1987
27
0.634
18,426.51
11,682.41
48,312.19
1988
28
0.674
19,334.04
13,031.14
51,360.26
1989
29
0.708
20,099.55
14,230.48
53,951.14
1990
30
0.736
21,027.98
15,476.59
56,084.79
1991
31
0.761
21,811.60
16,598.63
57,989.87
1992
32
0.782
22,935.42
17,935.50
59,590.11
1993
33
0.799
23,132.67
18,483.00
60,885.53
1994
34
0.815
23,753.53
19,359.13
62,104.79
1995
35
0.830
24,705.66
20,505.70
63,247.82
1996
36
0.843
25,913.90
21,845.42
64,238.44
1997
37
0.855
27,426.00
23,449.23
65,152.86
1998
38
0.865
28,861.44
24,965.15
65,914.90
1999
39
0.876
30,469.84
26,691.58
66,753.11
2000
40
0.885
32,154.82
28,457.02
67,438.94
2001
41
0.894
32,921.92
29,432.20
68,124.76
2002
42
0.903
33,252.09
30,026.64
68,810.57
2003
43
0.911
34,064.95
31,033.17
69,420.19
2004
44
0.920
35,648.55
32,796.67
70,106.01
2005
45
0.926
36,952.94
34,218.42
70,563.21
2006
46
0.931
38,651.41
35,984.46
70,944.22
2007
47
0.935
40,405.48
37,779.12
71,249.03
2008
48
0.936
41,334.97
38,689.53
71,325.24
2009
49
0.936
41,067.93
38,439.58
71,325.24
2010
50
0.934
43,083.76
40,240.23
71,172.83
2011
51
0.927
44,686.82
41,424.68
70,639.42
2012
52
0.918
46,758.30
42,924.12
69,953.60
2013
53
0.907
48,977.62
44,422.70
69,115.38
2014
54
0.893
51,215.47
45,735.41
68,048.54
2015
55
0.874
53,396.92
46,668.91
66,600.71
2016
56
0.845
55,737.60
47,098.27
64,390.84
2017
57
0.815
58,103.49
47,354.34
62,104.77
2018
58
0.785
60,522.33
47,510.03
59,818.71
2019
59
0.752
63,017.19
47,388.93
57,304.04
2020
60
0.710
65,464.98
46,480.14
54,103.55
2021
61
0.660
68,003.41
44,882.25
50,293.44
2022
62
0.635
70,638.78
44,828.46
48,359.08
2023
63
0.610
73,363.75
44,767.08
46,499.11
2024
64
0.587
76,202.18
44,710.68
44,710.68
Career-Average Earnings
$63,956.00

Note: Career-average earnings is calculated from the highest 35 years of indexed earnings (column 4). Years 1981-87 and 2023-2024 are excluded because they are not among the highest 35 years of indexed earnings.

c. Calculate Very Low, Low, Medium, and High Final Scaled Factors from the Preliminary Adjusted Scaled Factors such that Selected Hypothetical Scaled Workers with Earnings Based on These Factors Would Have Career-Average Earnings Equal to Selected Percentages of the AWI in the Year Prior to Entitlement.

The selected career-average earnings level for the medium scaled worker is the AWI in the year prior to entitlement. Similarly, the selected career-average earnings levels for the very low, low, and high scaled workers are 25 percent, 45 percent and 160 percent of the AWI in the year prior to entitlement, respectively. As noted earlier, the career-average earnings for the 1960-born preliminary scaled worker is shown in table 4 as $63,956, wage indexed to 2024. By comparison, the average wage index for 2024 is $76,202.187. Corresponding career-average earnings levels for a very low, low, and high earner are $19,051, $34,291, and $121,923, respectively. Table 5 summarizes this information, and also provides the ratio of the selected career-average earnings levels to the career-average earnings for the 1960-born preliminary scaled worker.

Two primary reasons for choosing the year prior to entitlement as the indexing year in computing the career-average earnings are:

Furthermore, career-average earnings provide a reasonable denominator for replacement rate calculations that allow hypothetical scaled worker replacement rates to maintain consistency with the prior hypothetical steady worker replacement rates.

Table 5.—Table of Key Ratios Used to Finalize Scaled Worker Calculations
Case
Selected career-average
earnings levels for hypothetical
scaled workers
(1)
Career-average earnings of
the 1950-born preliminary
selected scaled worker
(2)
Ratio
(1) / (2)
(3)
Very low earner
$19,051
$63,956
0.298
Low earner
34,291
63,956
0.536
Medium earner
76,202
63,956
1.191
High earner
121,923
63,956
1.906

The last step is to apply the ratios from table 5 to the preliminary adjusted scaled factors. This requires four separate calculations, one each for the very low, low, medium, and high scaled worker cases. For example, the scaled factors for the hypothetical medium scaled worker are determined by multiplying:

Table 6 shows the calculation of the final scaled factors, combining the preliminary adjusted scaled factors with the adjustment factors.

Table 6.—Calculation of Final Scaled Factors 
Adjustment factors
Final Scaled Factors by Earnings level
Very low
Low
Medium
High
Age
Preliminary adjusted
scaled factors
0.298
0.536
1.191
1.906
21
0.277
0.083
0.149
0.330
0.528
22
0.331
0.099
0.177
0.394
0.631
23
0.408
0.122
0.219
0.486
0.778
24
0.480
0.143
0.257
0.572
0.915
25
0.538
0.160
0.288
0.641
1.026
26
0.588
0.175
0.315
0.701
1.121
27
0.634
0.189
0.340
0.755
1.209
28
0.674
0.201
0.361
0.803
1.285
29
0.708
0.211
0.380
0.844
1.350
30
0.736
0.219
0.395
0.877
1.403
31
0.761
0.227
0.408
0.907
1.451
32
0.782
0.233
0.419
0.932
1.491
33
0.799
0.238
0.428
0.952
1.523
34
0.815
0.243
0.437
0.971
1.554
35
0.830
0.247
0.445
0.989
1.582
36
0.843
0.251
0.452
1.004
1.607
37
0.855
0.255
0.458
1.019
1.630
38
0.865
0.258
0.464
1.031
1.649
39
0.876
0.261
0.470
1.044
1.670
40
0.885
0.264
0.475
1.054
1.687
41
0.894
0.266
0.479
1.065
1.704
42
0.903
0.269
0.484
1.076
1.721
43
0.911
0.271
0.488
1.085
1.737
44
0.920
0.274
0.493
1.096
1.754
45
0.926
0.276
0.496
1.103
1.765
46
0.931
0.277
0.499
1.109
1.775
47
0.935
0.279
0.501
1.114
1.782
48
0.936
0.279
0.502
1.115
1.784
49
0.936
0.279
0.502
1.115
1.784
50
0.934
0.278
0.501
1.113
1.781
51
0.927
0.276
0.497
1.105
1.767
52
0.918
0.273
0.492
1.094
1.750
53
0.907
0.270
0.486
1.081
1.729
54
0.893
0.266
0.479
1.064
1.702
55
0.874
0.260
0.469
1.041
1.666
56
0.845
0.252
0.453
1.007
1.611
57
0.815
0.243
0.437
0.971
1.554
58
0.785
0.234
0.421
0.935
1.496
59
0.752
0.224
0.403
0.896
1.434
60
0.710
0.211
0.381
0.846
1.354
61
0.660
0.197
0.354
0.786
1.258
62
0.635
0.189
0.340
0.756
1.210
63
0.610
0.182
0.327
0.727
1.163
64
0.587
0.175
0.315
0.699
1.119

4. Developing Hypothetical Worker Earnings from Factors

Given a year of birth, and an earnings level for scaled workers, classified as either very low, low, medium, or high, annual earnings can be obtained by taking the relevant set of scaled factors and multiplying them by the AWIs in the corresponding years. Consider as an example a low earnings worker born in 1970. To determine earnings for this worker at age 22, the scaled factor for the low worker at age 22 would be multiplied by the AWI in 1992, the year in which the worker turns 22. Because the hypothetical workers are born in January, a year of age corresponds to a calendar year. Therefore, a worker born on January 2, 1970 would be age 22 throughout 1992. Earnings for other ages are determined in the same manner. In this manner, a series of very low, low, medium, and high scaled earnings can be developed for any hypothetical year of birth. Table 7 carries out the calculation of hypothetical scaled worker earnings for high earnings workers for the selected years of birth 1930, 1949, and 1997.

Table 7.—Example: Developing Earnings for the Hypothetical High Earners Born in 1930, 1949, and 1997
Year of birth
1930
1949
1997
Age
Final scaled
factors for
high earner
(1)
AWI
(2)
Age-scaled
earnings
(1)*(2)
(3)
AWI
(4)
Age-scaled
earnings
(1)*(4)
(5)


AWI
(6)
Age-scaled
earnings
(1)*(6)
(7)
21
0.528
$2,799.16
$1,478.13
$6,186.24
$3,266.73
$60,522.33
$31,959.61
22
0.631
2,973.32
1,876.19
6,497.08
4,099.70
63,017.19
39,764.28
23
0.778
3,139.44
2,441.85
7,133.80
5,548.65
65,464.98
50,918.46
24
0.915
3,155.64
2,887.58
7,580.16
6,936.27
68,003.41
62,226.88
25
1.026
3,301.44
3,386.04
8,030.76
8,236.54
70,638.78
72,448.86
26
1.121
3,532.36
3,959.57
8,630.92
9,674.77
73,363.75
82,236.56
27
1.209
3,641.72
4,401.51
9,226.48
11,151.45
76,202.18
92,100.66
28
1.285
3,673.80
4,720.43
9,779.44
12,565.51
79,200.41
101,763.82
29
1.350
3,855.80
5,204.20
10,556.03
14,247.54
82,338.20
111,132.40
30
1.403
4,007.12
5,622.33
11,479.46
16,106.66
85,616.74
120,127.54
31
1.451
4,086.76
5,928.84
12,513.46
18,153.83
89,037.40
129,170.46
32
1.491
4,291.40
6,397.52
13,773.10
20,532.63
92,596.11
138,040.20
33
1.523
4,396.64
6,696.90
14,531.34
22,133.93
96,312.61
146,701.99
34
1.554
4,576.32
7,110.17
15,239.24
23,677.02
100,184.50
155,655.41
35
1.582
4,658.72
7,371.41
16,135.07
25,530.25
104,218.46
164,903.10
36
1.607
4,938.36
7,936.27
16,822.51
27,034.88
108,430.60
174,255.11
37
1.630
5,213.44
8,497.61
17,321.82
28,233.57
112,808.29
183,870.99
38
1.649
5,571.76
9,187.86
18,426.51
30,385.42
117,373.41
193,549.44
39
1.670
5,893.76
9,842.44
19,334.04
32,287.38
122,116.89
203,932.26
40
1.687
6,186.24
10,437.01
20,099.55
33,910.62
127,051.17
214,352.24
41
1.704
6,497.08
11,072.91
21,027.98
35,837.78
132,192.78
225,294.89
42
1.721
7,133.80
12,280.46
21,811.60
37,547.53
137,524.24
236,740.79
43
1.737
7,580.16
13,164.45
22,935.42
39,831.91
143,066.89
248,464.07
44
1.754
8,030.76
14,084.80
23,132.67
40,571.37
148,822.96
261,014.03
45
1.765
8,630.92
15,236.11
23,753.53
41,931.97
154,790.70
273,251.11
46
1.775
9,226.48
16,375.40
24,705.66
43,848.25
160,989.35
285,728.07
47
1.782
9,779.44
17,431.38
25,913.90
46,190.27
167,415.15
298,409.37
48
1.784
10,556.03
18,835.73
27,426.00
48,937.80
174,083.99
310,628.12
49
1.784
11,479.46
20,483.46
28,861.44
51,499.13
181,007.18
322,981.57
50
1.781
12,513.46
22,280.78
30,469.84
54,252.92
188,201.76
335,101.71
51
1.767
13,773.10
24,339.83
32,154.82
56,824.01
195,685.80
345,816.04
52
1.750
14,531.34
25,430.47
32,921.92
57,614.78
203,456.99
356,058.52
53
1.729
15,239.24
26,349.76
33,252.09
57,495.30
211,536.51
365,762.10
54
1.702
16,135.07
27,468.09
34,064.95
57,991.63
219,934.16
374,412.41
55
1.666
16,822.51
28,029.05
35,648.55
59,396.30
228,652.20
380,971.86
56
1.611
17,321.82
27,903.35
36,952.94
59,526.70
237,702.92
382,910.53
57
1.554
18,426.51
28,629.04
38,651.41
60,052.22
247,096.86
383,911.32
58
1.496
19,334.04
28,933.33
40,405.48
60,466.66
256,839.61
384,359.61
59
1.434
20,099.55
28,814.45
41,334.97
59,257.26
266,958.71
382,708.42
60
1.354
21,027.98
28,461.78
41,067.93
55,586.23
277,485.19
375,581.54
61
1.258
21,811.60
27,443.38
43,083.76
54,208.03
288,436.96
362,911.67
62
1.210
22,935.42
27,747.47
44,686.82
54,062.50
299,835.40
362,743.46
63
1.163
23,132.67
26,909.72
46,758.30
54,392.88
311,681.52
362,572.11
64
1.119
23,753.53
26,569.18
48,977.62
54,783.24
323,993.60
362,398.54

1Refer to Actuarial Note #2009.5 titled, Internal Real Rates of Return under the OASDI Program for Hypothetical Workers, for details. This note is located at the following internet site:
http://www.socialsecurity.gov/OACT/NOTES/ran5/an2009-5.html
.

2For more information on the national average wage index, including historical values, see the following internet site:
http://www.socialsecurity.gov/OACT/COLA/AWI.html.

3Career-average earnings levels are defined as specified percentages of the AWI for the hypothetical workers described in this note. Career-average earnings are defined as the highest 35 years of earnings, indexed for growth in average wages to the year prior to benefit entitlement. See further discussion under the subsection 3.b. This revision was introduced with the 2003 Trustees Report.

4The AIME is used in the computation of Social Security benefits.
See http://www.socialsecurity.gov/OACT/COLA/Benefits.html#aime for more details on how the AIME is calculated.

5The QC is the basic unit for determining whether a worker is insured for Social Security benefits. In 2009, for example, a worker needed to have $1,090 in covered earnings to obtain a QC. Workers can earn up to 4 QCs per calendar year. Since 1978 the amount of covered earnings required to obtain a QC has been automatically indexed each year with the growth in SSA's national average wage index.
See http://www.socialsecurity.gov/OACT/COLA/QC.html for more information, including a list of historical QC amounts.

6Data concerning worker deaths appears in the CWHS. However, death data in the CWHS does not include all state-reported death data. Therefore, we also used Social Security's NUMIDENT file to identify deaths of individuals in the CWHS. The NUMIDENT file contains, among other things, death data including state-reported deaths.

7The projected AWI value for 2024 is taken from the 2010 Trustees Report. See http://www.socialsecurity.gov/OACT/TR/2010/lr6f6.html.

8Prior to 2001, the hypothetical workers used were all "steady" workers. Today, only the "steady maximum" worker has been retained. "Steady" workers were assumed to work steadily beginning at age 22, until retirement, death, or disability, and to have a steady amount of earnings relative to the AWI each year. For example, the "steady average" worker was assumed to earn the AWI for every working year. Similarly, the "steady low" worker was assumed to earn 45 percent of the AWI for every working year, and the "steady high" worker was assumed to earn 160 percent of the AWI for every working year.