About this application: This application provides summary profiles showing frequently requested data items from various US Census Bureau programs. Profiles are available for the nation, states, and counties.
Per capita income in past 12 months (in 2018 dollars), 2014-2018 - (US Dollars)
County
Value
Adams
25,591
Ashland
23,505
Barron
28,326
Bayfield
29,886
Brown
31,213
Buffalo
29,613
Burnett
28,424
Calumet
34,015
Chippewa
28,277
Clark
24,114
Columbia
33,012
Crawford
26,038
Dane
38,757
Dodge
28,543
Door
36,155
Douglas
28,888
Dunn
27,107
Eau Claire
29,524
Florence
30,674
Fond du Lac
30,454
Forest
24,808
Grant
24,974
Green
31,959
Green Lake
27,915
Iowa
33,674
Iron
28,550
Jackson
26,037
Jefferson
30,329
Juneau
26,137
Kenosha
30,740
Kewaunee
30,098
La Crosse
31,001
Lafayette
28,198
Langlade
26,212
Lincoln
29,642
Manitowoc
28,803
Marathon
31,879
Marinette
26,959
Marquette
26,068
Menominee
20,538
Milwaukee
28,121
Monroe
27,729
Oconto
29,392
Oneida
32,784
Outagamie
32,098
Ozaukee
47,980
Pepin
29,227
Pierce
32,525
Polk
29,489
Portage
29,742
Price
27,569
Racine
30,386
Richland
26,379
Rock
28,103
Rusk
24,731
Sauk
29,608
Sawyer
30,094
Shawano
28,051
Sheboygan
30,151
St. Croix
37,419
Taylor
26,881
Trempealeau
27,733
Vernon
26,726
Vilas
31,206
Walworth
30,593
Washburn
29,336
Washington
37,631
Waukesha
44,301
Waupaca
30,627
Waushara
27,347
Winnebago
33,000
Wood
30,006
Value for Wisconsin (US Dollars): $32,018
Sources: U.S. Census Bureau, American Community Survey (ACS) and Puerto Rico Community Survey (PRCS), 5-Year Estimates. The PRCS is part of the Census Bureau's ACS, customized for Puerto Rico. Both Surveys are updated every year.
Definition
Per capita income is the mean income computed for every man, woman, and child in a particular group including those living in group quarters. It is derived by dividing the aggregate income of a particular group by the total population in that group. This measure is rounded to the nearest whole dollar. For the complete definition, go to ACS subject definitions "Income in the Past 12 Months, Per Capita Income."
Source and Accuracy
This Fact is based on data collected in the American Community Survey (ACS) and the Puerto Rico Community Survey (PRCS) conducted annually by the U.S. Census Bureau. A sample of over 3.5 million housing unit addresses is interviewed each year over a 12 month period. This Fact (estimate) is based on five years of ACS and PRCS sample data and describes the average value of person, household and housing unit characteristics over this period of collection.
Statistics from all surveys are subject to sampling and nonsampling error. Sampling error is the uncertainty between an estimate based on a sample and the corresponding value that would be obtained if the estimate were based on the entire population (as from a census). Measures of sampling error are provided in the form of margins of error for all estimates included with ACS and PRCS published products. The Census Bureau recommends that data users incorporate this information into their analyses, as sampling error in survey estimates could impact the conclusions drawn from the results. The data for each geographic area are presented together with margins of error at Using margins of error. A more detailed explanation of margins of error and a demonstration of how to use them is provided below.
For more information on sampling and estimation methodology, confidentiality, and sampling and nonsampling errors, please see the Multiyear Accuracy (US) and the Multiyear Accuracy (Puerto Rico) documents at "Documentation - Accuracy of the data."
Margin of Error
As mentioned above, ACS estimates are based on a sample and are subject to sampling error. The margin of error measures the degree of uncertainty caused by sampling error. The margin of error is used with an ACS estimate to construct a confidence interval about the estimate. The interval is formed by adding the margin of error to the estimate (the upper bound) and subtracting the margin of error from the estimate (the lower bound). It is expected with 90 percent confidence that the interval will contain the full population value of the estimate. The following example is for demonstrating purposes only. Suppose the ACS reported that the percentage of people in a state who were 25 years and older with a bachelor's degree was 21.3 percent and that the margin of error associated with this estimate was 0.7 percent. By adding and subtracting the margin of error from the estimate, we calculate the 90-percent confidence interval for this estimate:
Therefore, we can be 90 percent confident that the percent of the population 25 years and older having a bachelor's degree in a state falls somewhere between 20.6 percent and 22.0 percent.
