square method वाक्य
उदाहरण वाक्य
मोबाइल
- It is common to make the additional hypothesis that the ordinary least squares method should be used to minimize the " residuals ".
- The idea behind the Quasi-Newton Least Squares Method is to build up an approximate Jacobian based on known input-output pairs of the function.
- Least squares applied to linear regression is called ordinary least squares method and least squares applied to nonlinear regression is called non-linear least squares.
- The idea behind the Quasi-Newton Inverse Least Squares Method is to build up an approximate Jacobian based on known input-output pairs of the function.
- The mathematician John Von Neumann suggested one of the first rather imperfect pseudorandom number generators _ a simple procedure, or algorithm, called the middle square method.
- Using lists of " truly random " random numbers was extremely slow, but von Neumann developed a way to calculate pseudorandom numbers, using the middle-square method.
- In ( Tiwari et al . 2001 ), this method has been applied to a grid free framework with the help of the weighted least squares method.
- Also, by iteratively applying local quadratic approximation to the likelihood ( through the Fisher information ), the least-squares method may be used to fit a generalized linear model.
- Other methods that can be used are the Column Updating Method, the Inverse Column Updating Method, the Quasi-Newton Least Squares Method and the Quasi-Newton Inverse Least Squares Method.
- Using more than four involves an over-determined system of equations with no unique solution; such a system can be solved by a least-squares or weighted least squares method.
- Other methods that can be used are the Column Updating Method, the Inverse Column Updating Method, the Quasi-Newton Least Squares Method and the Quasi-Newton Inverse Least Squares Method.
- These proofs are simpler than the standard completing the square method, represent interesting applications of other frequently used techniques in algebra, or offer insight into other areas of mathematics.
- Many common statistics, including t-tests, regression models, design of experiments, and much else, use least squares methods applied using linear regression theory, which is based on the quadratric loss function.
- The method of iteratively re-weighted least squares ( IRLS ) is a numerical algorithm for minimizing any specified objective function using a standard weighted least squares method such as Gaussian elimination.
- Two common applications of polynomial least squares methods are approximating a low-degree polynomial that approximates a complicated function and estimating an assumed underlying polynomial from corrupted ( also known as " noisy " ) observations.
- This is applied, e . g ., in the Kalman filter and recursive least squares methods, to replace the parametric solution, requiring inversion of a state vector sized matrix, with a condition equations based solution.
- When both steric and polar effects influence the reaction rate the Taft equation can be solved for both ? * and ? through the use of standard least squares methods for determining a bivariant regression plane.
- :: I think I understand linear least squares method but in my understanding one requies a set of x and y data points from which the matrix and its inverse are derived as well as the vector.
- It is a variant of the biconjugate gradient method ( BiCG ) and has faster and smoother convergence than the original BiCG as well as other variants such as the conjugate gradient squared method ( CGS ).
- Classical objective functions include the sum of squared deviations between experimental and numerical data, as in the least squares methods, the sum of the magnitude of the difference between field and numerical data, or some variant of these definitions.
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