Salary Documentation - C# - Developer - USA
Competitive Position® Salary Report
Web Site Want Ads
The Salary Report is based on a sample of Want Ads listed in the career web sites:
- USA Jobs.
Duplicate Want ads found in the same month were eliminated.
Please Note: The career web sites only act as venues for job postings and are not responsible for the content of the want ads. They are not associated with and do not endorse this Salary Report.
Microsoft - C# - Developer
Collected Past 3 Years
The sample was collected in the 158 weeks between:
- Tuesday April 1, 2008
- Thursday March 31, 2011.
Large Number of Want Ads
8,576 Want Ads were collected.
Each want ad listed:
- Required Experience
- Qualifications for a Microsoft - C# - Developer
- Location in a US City.
Microsoft - C# - Developer
The regression equation of the average salary is derived.
The regression equation minimizes the variance of the salaries across the sample of want ads.
The Regression Equation
Salary for Microsoft - C# - Developer is lowest at entry level, increases rapidly with the first years of experience and approaches a ceiling as experience matures.
When Health Care Industry is required Salary is Lower.
$35,921 Entry Level Salary average
- $3,794 with Health Care Industry required
+ ( $25,808 ∗ ln(Number of Years of Experience) )
= Salary Average.
Note: Since the natural logarithm, 'ln', is not defined at zero, +1 is always added to the number of years of required experience.
The variables of the regression equation are determined to be independent by a 95% one-tailed t-distribution test.
Many want ads state a salary that is either greater or less than the Salary Average.
A residual is equal to the difference between the salary offered in a want ad and the salary as calculated by the regression equation for the want ad.
The variance is the sum of the squared residuals for the entire sample of want ads.
R Squared Statistic
The R Squared statistic is a measure of the 'goodness of fit' of the regression equation.
It states the percent of the sum of the squared salaries in the sample of want ads calculated by the regression equation:
- 18.51% = R Squared.
The remaining percentage is explained by the variance:
- 81.49% = Sum of Squared Residuals.
An R Squared statistic of 100% would indicate that all want ads offered the average salary. A reasonable degree of variability should be expected due to the many factors influencing individual want ads.
t-Distribution Statistical Tests
The t-Distribution is applied to test if a variable within the salary regression equation is equal to zero.
A variable can be insignificant if its standard deviation is too large.
The t-Distribution multilpied by a variable's standard deviation determines the 95% Confidence Interval and the probability the variable is equal to zero salary.
Significant confidence is placed in a regression equation variable when the low point of the 95% Confidence Interval is above zero. Even more confidence is placed when there is little probability that the variable is equal to zero salary.
1.9602 is the factor of the t-Distribution where only 2.5% of the sample of 8,576 want ads have higher values.
The Salary Average, Standard Deviation, 95% Probability Range and Probability of zero salary for each variable:
- Entry Level Salary Average = $35,921
- Standard Deviation = $920
- 95% Probability Range = $34,117 to $37,726
- there is less than a one-hundredth of one percent ( < 00.01 % ) probability that the Entry Level salary is equal to zero
- Health Care Industry = - $3,794
- Standard Deviation = $683
- 95% Probability Range = - $5,133 to - $2,456
- there is less than a one-hundredth of one percent ( < 00.01 % ) probability that the Health Care Industry qualification determines zero salary
- Experience = $25,808 ∗ ln(Number of Years of Experience + 1)
- Standard Deviation = $543
- 95% Probability Range = $24,744 to $26,872
- there is less than a one-hundredth of one percent ( < 00.01 % ) probability that Experience determines zero salary.
F-Distribution Statistical Test
The F-Distribution probability considers whether the Salary Average regression equation is statistically equivalent to an equation set to zero.
The regression equation can be insignificant if its standard deviation is too large.>
The lower the F-Distribution probability the more confidence is given to the regression equation:
- The Microsoft - C# - Developer Salary Average equation has less than a one-hundredth of one percent ( < 00.01 % ) probability that it is equal to zero.
The Salary Average regression equation required a correction for Heteroscedasticity.
The residuals are not uniform for all job characteristics:
- the residuals are smaller when XML is required
- the residuals are smaller when Health Care Industry is required
- the residuals are larger when New York-Northern New Jersey-Long Island, NY-NJ-CT-PA is required
This additional information was factored into the analysis by dividing each want ad by its level of variance found in the heteroscedasticity regression equation:
- (e^(4.4445 - 0.2252XML - 0.4223HealthInd + 1.2093NewYork))^.5.
The heteroscedasticity regression equation is verified to have an F-Distribution probability of less than 1 tenth of 1 percent chance ( < 00.10 % ) of not existing.
Each job characteristic of the heteroscedasticity regression equation is verified to have a t-Distribution probability of less than a 1 percent chance of not existing.
The Standard Deviation is the average residual found in a want ad.
$21,121 = Standard Deviation.
The Salary Ranges are calculated by adding ±(Standard Deviation ∗ t-Distribution Statistic) to the Salary Average.
The Salary Range factors are:
- $21,121 = Standard Deviation
- t-Distribution Statistics for the 8,576 want ads of the sample =
- 0.1257 for 10% Salary Range
- 0.3187 for 25% Salary Range
- 0.4307 for 33% Salary Range
- 0.6745 for 50% Salary Range
- 0.9675 for 67% Salary Range
- 1.2817 for 80% Salary Range
- 1.645 for 90% Salary Range
- 1.9602 for 95% Salary Range
The 95% range of Experience is calculated by adding ±(Standard Deviation ∗ t-Distribution Statistic) to the Experience Average:
- 2 Years = Standard Deviation of Experience
- 1.9602 = t-Distribution statistic for 95% Experience Range.