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- Method_of_mean_weighted_residuals abstract "In applied mathematics, methods of mean weighted residuals (MWR) are methods for solving differential equations of which the solution is assumed to be well approximated by a function of a particular form having a finite set of degrees of freedom that it depends on (for instance if said form is a linear combination of a particular basis function set in which each basis function is multiplied by a corresponding expansion coefficient and i is summed over then the degrees of freedom are the expansion coefficients ) and then any one of a theoretically infinite set of methods of weighted residuals are applied in an attempt to find which precise value each of these degrees of freedom should take in order to minimise in some sense (this 'sense' depends on the precise method used) the residue function (the residue function is explained in detail below).".
- Method_of_mean_weighted_residuals wikiPageID "34661561".
- Method_of_mean_weighted_residuals wikiPageRevisionID "597858862".
- Method_of_mean_weighted_residuals hasPhotoCollection Method_of_mean_weighted_residuals.
- Method_of_mean_weighted_residuals subject Category:Differential_equations.
- Method_of_mean_weighted_residuals type Abstraction100002137.
- Method_of_mean_weighted_residuals type Communication100033020.
- Method_of_mean_weighted_residuals type DifferentialEquation106670521.
- Method_of_mean_weighted_residuals type DifferentialEquations.
- Method_of_mean_weighted_residuals type Equation106669864.
- Method_of_mean_weighted_residuals type MathematicalStatement106732169.
- Method_of_mean_weighted_residuals type Message106598915.
- Method_of_mean_weighted_residuals type Statement106722453.
- Method_of_mean_weighted_residuals comment "In applied mathematics, methods of mean weighted residuals (MWR) are methods for solving differential equations of which the solution is assumed to be well approximated by a function of a particular form having a finite set of degrees of freedom that it depends on (for instance if said form is a linear combination of a particular basis function set in which each basis function is multiplied by a corresponding expansion coefficient and i is summed over then the degrees of freedom are the expansion coefficients ) and then any one of a theoretically infinite set of methods of weighted residuals are applied in an attempt to find which precise value each of these degrees of freedom should take in order to minimise in some sense (this 'sense' depends on the precise method used) the residue function (the residue function is explained in detail below).".
- Method_of_mean_weighted_residuals label "Method of mean weighted residuals".
- Method_of_mean_weighted_residuals label "重み付き残差法".
- Method_of_mean_weighted_residuals sameAs 重み付き残差法.
- Method_of_mean_weighted_residuals sameAs m.0j24w7t.
- Method_of_mean_weighted_residuals sameAs Q6823718.
- Method_of_mean_weighted_residuals sameAs Q6823718.
- Method_of_mean_weighted_residuals sameAs Method_of_mean_weighted_residuals.
- Method_of_mean_weighted_residuals wasDerivedFrom Method_of_mean_weighted_residuals?oldid=597858862.
- Method_of_mean_weighted_residuals isPrimaryTopicOf Method_of_mean_weighted_residuals.