In this paper errors in variables methods for fitting straight lines to data are reviewed. In these methods the x and y variables are both assumed to be subject to measurement error and not, as in simple least squares linear regression, just one of them. The methods are described in a unified context using the statistical principle of the method of moments. Guidance is given on the choice of an appropriate method of estimating the slope and intercept of the fitted line. Formulas for the approximate standard errors of the estimators are provided in a technical appendix. A numerical example from biochemical studies is included to illustrate the methodology
Abstract. Fitting the \best " straight line to a scatter plot of data D f(x1;y1):::(xn;yn)g...
In method comparison studies, the measurements taken by two methods are compared to assess whether t...
This paper proposes a new instrumental variable to estimate the parameters of a simple linear regres...
In this paper errors in variables methods for fitting straight lines to data are reviewed. In these ...
A solution for the least-squares fit of a straight line to measurements in two dimensions is present...
The fitting of a straight line to bivariate data (x,y) is a common procedure. Standard linear regres...
Fitting a line to a bivariate dataset can be a deceptively complex problem, and there has been much ...
Fitting a line to a bivariate dataset can be a deceptively complex problem, and there has been much ...
The Ordinary Least Squares (OLS) method is the most widely used method to estimate the parameters o...
This expository note discusses the problem of fitting a straight line when both variables are subjec...
Moment estimation of measurement errors.The slope of the best-fit line from minimizing a function of...
This paper summarizes and confronts the relationships between six well-known regressions applied in ...
This paper summarizes and confronts the relationships between six well-known regressions applied in ...
Least‐squares fitting is reviewed, in tutorial form, when both variables contain significant errors....
There has been increasing acknowledgment of the importance of measurement error in epidemiology and ...
Abstract. Fitting the \best " straight line to a scatter plot of data D f(x1;y1):::(xn;yn)g...
In method comparison studies, the measurements taken by two methods are compared to assess whether t...
This paper proposes a new instrumental variable to estimate the parameters of a simple linear regres...
In this paper errors in variables methods for fitting straight lines to data are reviewed. In these ...
A solution for the least-squares fit of a straight line to measurements in two dimensions is present...
The fitting of a straight line to bivariate data (x,y) is a common procedure. Standard linear regres...
Fitting a line to a bivariate dataset can be a deceptively complex problem, and there has been much ...
Fitting a line to a bivariate dataset can be a deceptively complex problem, and there has been much ...
The Ordinary Least Squares (OLS) method is the most widely used method to estimate the parameters o...
This expository note discusses the problem of fitting a straight line when both variables are subjec...
Moment estimation of measurement errors.The slope of the best-fit line from minimizing a function of...
This paper summarizes and confronts the relationships between six well-known regressions applied in ...
This paper summarizes and confronts the relationships between six well-known regressions applied in ...
Least‐squares fitting is reviewed, in tutorial form, when both variables contain significant errors....
There has been increasing acknowledgment of the importance of measurement error in epidemiology and ...
Abstract. Fitting the \best " straight line to a scatter plot of data D f(x1;y1):::(xn;yn)g...
In method comparison studies, the measurements taken by two methods are compared to assess whether t...
This paper proposes a new instrumental variable to estimate the parameters of a simple linear regres...