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Polynomial root-finding algorithm
In numerical analysis, Bernoulli's method, named after Daniel Bernoulli, is a root-finding algorithm which calculates the root of largest absolute value
Bernoulli's_method
Swiss mathematician and physicist (1700–1782)
Niklaus and Johann II. Daniel Bernoulli was described by W. W. Rouse Ball as "by far the ablest of the younger Bernoullis". He is said to have had a bad
Daniel_Bernoulli
Numerical analysis series acceleration method
Aitken, who introduced this method in 1926 as part of an extension to Bernoulli's method. It is most useful for accelerating the convergence of a sequence
Aitken's delta-squared process
Aitken's_delta-squared_process
official name to Bernoulli in 2003 French submarine Bernouilli Bernoulli Box Bernoulli grip Bernoulli's method Bernoulli principle Euler—Bernoulli beam equation
List of things named after the Bernoulli family
List_of_things_named_after_the_Bernoulli_family
Swiss mathematician (1655–1705)
the calculus were very obscure to mathematicians of that time and the Bernoullis were among the first to try to understand and apply Leibniz's theories
Jacob_Bernoulli
Fastest curve descent without friction
concealing his method. In addition to his indirect method, he published the five other replies to the problem he had received. Bernoulli's direct method is historically
Brachistochrone_curve
Probabilistic problem-solving algorithm
Monte Carlo methods, also called the Monte Carlo experiments or Monte Carlo simulations, are a broad class of computational algorithms based on repeated
Monte_Carlo_method
Swiss mathematician (1667–1748)
(September 2005). Worlds of Flow: A History of Hydrodynamics from the Bernoullis to Prandtl. OUP Oxford. p. 9. ISBN 9780198568438. Speiser, David; Williams
Johann_Bernoulli
Family of implicit and explicit iterative methods
Runge–Kutta methods (English: /ˈrʊŋəˈkʊtɑː/ RUUNG-ə-KUUT-tah) are a family of implicit and explicit iterative methods, which include the Euler method, used
Runge–Kutta_methods
Mathematical technique
Macaulay's method (the double integration method) is a technique used in structural analysis to determine the deflection of Euler-Bernoulli beams. Use
Macaulay's_method
Rational number sequence
in 1712. However, Seki did not present his method as a formula based on a sequence of constants. Bernoulli's formula for sums of powers is the most useful
Bernoulli_number
Sampling technique
not fixed but rather follows a binomial distribution. The most basic Bernoulli method generates n random variates to extract a sample from a population of
Bernoulli_sampling
Approach to finding numerical solutions of ordinary differential equations
In mathematics and computational science, the Euler method (also called the forward Euler method) is a first-order numerical procedure for solving ordinary
Euler_method
Method for load calculation in construction
the Euler–Bernoulli equation using techniques such as "direct integration", "Macaulay's method", "moment area method", "conjugate beam method", "the principle
Euler–Bernoulli_beam_theory
Type of ordinary differential equation
who published his result in the same year and whose method is the one still used today. Bernoulli equations are special because they are nonlinear differential
Bernoulli differential equation
Bernoulli_differential_equation
Numerical method for solving physical or engineering problems
Finite element method (FEM) is a popular method for numerically solving differential equations arising in engineering and mathematical modeling. Typical
Finite_element_method
companion matrix is the classical Bernoulli's method to find the root of greatest modulus. The inverse power method with shifts, which finds some smallest
Polynomial_root-finding
Method for solving continuous operator problems (such as differential equations)
In mathematics, in the area of numerical analysis, Galerkin methods are a family of methods for converting a continuous operator problem, such as a differential
Galerkin_method
of the results to the calculation of trajectories according to J. Bernoulli's method, Cambridge University Press Bashforth, Francis (1895), Supplement
Francis_Bashforth
Tool used to measure projectile speed
of the results to the calculation of trajectories according to J. Bernoulli's method, Cambridge University Press Bashforth, Francis (1903), A Historical
Gun_chronograph
Class of numerical techniques
In numerical analysis, finite-difference methods (FDM) are a class of numerical techniques for solving differential equations by approximating derivatives
Finite_difference_method
New Zealand mathematician (1895–1967)
known as Aitken delta-squared process as part of an extension to Bernoulli's method. Aitken was awarded the Makdougall-Brisbane Prize for 1930–32, and
Alexander_Aitken
Approximation method in statistics
In regression analysis, least squares is a method to determine the best-fit model by minimizing the sum of the squared residuals—the differences between
Least_squares
Method of estimating the parameters of a statistical model, given observations
In statistics, maximum likelihood estimation (MLE) is a method of estimating the parameters of an assumed probability distribution, given some observed
Maximum_likelihood_estimation
Calculation of complex statistical distributions
sample matches the actual desired distribution. Markov chain Monte Carlo methods are used to study probability distributions that are too complex or too
Markov_chain_Monte_Carlo
Swiss mathematician (1707–1783)
calculus was at the forefront of 18th-century mathematical research, and the Bernoullis—family friends of Euler—were responsible for much of the early progress
Leonhard_Euler
Probability distribution
success/failure experiment is also called a Bernoulli trial or Bernoulli experiment, and a sequence of outcomes is called a Bernoulli process. For a single trial, that
Binomial_distribution
Method of solution for inhomogeneous ODEs
In mathematics, the method of undetermined coefficients is an approach to finding a particular solution to certain nonhomogeneous ordinary differential
Method of undetermined coefficients
Method_of_undetermined_coefficients
Averages of repeated trials converge to the expected value
Large sample methods in statistics. Chapman & Hall. Seneta, Eugene (2013). "A Tricentenary history of the Law of Large Numbers". Bernoulli. 19 (4): 1088–1121
Law_of_large_numbers
Periodicity computation method
strictly least-squares LSSA method was developed in 1969 and 1971, and is known as the Vaníček method or the Gauss–Vaniček method, after its inventor Petr
Least-squares spectral analysis
Least-squares_spectral_analysis
Method for representing and evaluating partial differential equations
The finite volume method (FVM) is a method for representing and evaluating partial differential equations in the form of algebraic equations. In the finite
Finite_volume_method
Computational technique
The standard step method (STM) is a computational technique utilized to estimate one-dimensional surface water profiles in open channels with gradually
Standard_step_method
Finite difference method for numerically solving parabolic differential equations
In numerical analysis, the Crank–Nicolson method is a finite difference method used for numerically solving the heat equation and similar partial differential
Crank–Nicolson_method
1713 book on probability and combinatorics by Jacob Bernoulli
Maseres, Bernoulli & Wallis 1798, p. 115 Hald 2003, p. 254 Shafer 1996, pp. 18 Dunham 1994, pp. 17–18 Polasek, Wolfgang (August 2000), "The Bernoullis and
Ars_Conjectandi
Technique for solving hyperbolic partial differential equations
In mathematics, the method of characteristics is a technique for solving particular partial differential equations. Typically, it applies to first-order
Method_of_characteristics
Analysis and solving of problems that involve fluid flows
numerical methods to simulate transient two-dimensional fluid flows, such as particle-in-cell method, fluid-in-cell method, vorticity stream function method, and
Computational_fluid_dynamics
Historical term in mathematics
derived by more complicated methods that can be taken literally without logical difficulty. An example involves the Bernoulli polynomials. Consider, for
Umbral_calculus
Computer algorithm
equation to calculate Bernoulli numbers, wherein it used the previous values in an equation to generate the next one. The method ran thus: B n = − ∑ k
Note_G
Infinite series that is not convergent
to make meaning of the divergence of the series. A summability method or summation method is a partial function from the set of series to values. For example
Divergent_series
Solution method for linear differential equations
In mathematical physics, the WKB approximation or WKB method is a technique for finding approximate solutions to linear differential equations with spatially
WKB_approximation
2.71828…, base of natural logarithms
called Napier's constant after John Napier. The Swiss mathematician Jacob Bernoulli discovered the constant while studying compound interest. The number e
E_(mathematical_constant)
Component of internal combustion engines which mixes air and fuel in a controlled ratio
entering the engine. The primary method of adding fuel to the intake air is through the Venturi effect or Bernoulli's principle or with a pitot tube in
Carburetor
Method for solving differential equations
In mathematics, the power series method is used to seek a power series solution to certain differential equations. In general, such a solution assumes
Power series solution of differential equations
Power_series_solution_of_differential_equations
Study of collection and analysis of data
several methods have been proposed: the method of moments, the maximum likelihood method, the least squares method and the more recent method of estimating
Statistics
Class of statistical models
Bernoulli distributions. The maximum likelihood estimates can be found using an iteratively reweighted least squares algorithm or a Newton's method with
Generalized_linear_model
Numerical integration method
\end{aligned}}} Gaussian quadrature Newton–Cotes formulas Rectangle method Romberg's method Simpson's rule Clenshaw–Curtis quadrature Tai's model Volterra
Trapezoidal_rule
Paradigm in machine learning that uses no classification labels
modified for downstream applications. For example, the generative pretraining method trains a model to generate a textual dataset, before finetuning it for other
Unsupervised_learning
Rational fractions as sums of simple terms
transforms. The concept was discovered independently in 1702 by both Johann Bernoulli and Gottfried Leibniz. In symbols, the partial fraction decomposition
Partial fraction decomposition
Partial_fraction_decomposition
Expression for sums of powers
(1988). "Sums of Powers by matrix method". Semantic scholar. S2CID 2656552. Helmes, Gottfried (2006). "Accessing Bernoulli-Numbers by Matrix-Operations" (PDF)
Faulhaber's_formula
Collection of random variables
this problem without detailing their methods, and then more detailed solutions were presented by Jakob Bernoulli and Abraham de Moivre. For random walks
Stochastic_process
Public dispute between Isaac Newton and Gottfried Leibniz (beginning 1699)
Archimedes." Newton begun working on a form of calculus (which he called "The Method of Fluxions and Infinite Series") in 1666, at the age of 23, but the work
Leibniz–Newton calculus controversy
Leibniz–Newton_calculus_controversy
Statistical technique correcting sampling bias
relationships as a specification error. He suggests a two-stage estimation method to correct the bias. The correction uses a control function idea and is
Heckman_correction
Family of iterative methods
Stochastic approximation methods are a family of iterative methods typically used for root-finding problems or for optimization problems. The recursive
Stochastic_approximation
Differential calculus on function spaces
variational methods prior to the twentieth century. This problem was followed by the brachistochrone curve problem raised by Johann Bernoulli (1696), which
Calculus_of_variations
Procedure for solving differential equations
variation of parameters, also known as variation of constants, is a general method to solve inhomogeneous linear ordinary differential equations. For first-order
Variation_of_parameters
Computer simulation with random inputs
reaction method requires more complex data structures than either direct simulation or the first reaction method. Published 2004 and 2005. These methods sort
Stochastic_simulation
Type of data measuring one attribute
to describe patterns found in univariate data, which include graphical methods, measures of central tendency and measures of variability. Like other forms
Univariate_(statistics)
roughly the point in the development of the calculus that Leibniz, the two Bernoullis, L’Hospital, Hermann and others had by joint efforts reached in print
History_of_calculus
Calculation of structural loads
method of sections and method of joints for truss analysis, moment distribution method for small rigid frames, and portal frame and cantilever method
Structural_analysis
Method for numerical differential equations
In numerical mathematics, the gradient discretisation method (GDM) is a framework which contains classical and recent numerical schemes for diffusion problems
Gradient discretisation method
Gradient_discretisation_method
Type of functional equation (mathematics)
Serierum Infinitarum (The Method of Fluxions and Infinite Series), published in 1736 [Opuscula, 1744, Vol. I. p. 66]. Bernoulli, Jacob (1695), "Explicationes
Differential_equation
Initial estimate or framework to the solution of a mathematical problem
ansatz in Wiktionary, the free dictionary. Mathematics portal Physics portal Method of undetermined coefficients Bayesian inference Bethe ansatz Coupled cluster
Ansatz
Property of differential equations describing physical phenomena
well-posedness problem, and it is the foundation of many estimate methods, for example the energy method below. There are many results on this topic. For example
Well-posed_problem
Statistical method
is the favorable performance of bootstrap methods using sampling with replacement compared to prior methods like the jackknife that sample without replacement
Bootstrapping_(statistics)
Visual representation used in non-linear control system analysis
two-dimensional case of the general n-dimensional phase space. The phase plane method refers to graphically determining the existence of limit cycles in the solutions
Phase_plane
Mathematical function of two positive real arguments
Frequentist inference Point estimation Estimating equations Maximum likelihood Method of moments M-estimator Minimum distance Unbiased estimators Mean-unbiased
Arithmetic–geometric_mean
Field of engineering
significantly. Whereas optimization methods are nearly as old as calculus, dating back to Isaac Newton, Leonhard Euler, Daniel Bernoulli, and Joseph Louis Lagrange
Multidisciplinary design optimization
Multidisciplinary_design_optimization
Technique for solving differential equations
an implicit solution which involves a nonelementary integral. This same method is used to solve the period of a simple pendulum. Integrating factors are
Integrating_factor
Newton. Bernoulli’s original uses the French word "comme" and not the Latin "tanquam". In his June 1697 "Lettre de Mr. Bernoulli à l’Auteur" Bernoulli writes
Later_life_of_Isaac_Newton
Optimization algorithm
algorithmic method for optimizing systems with multiple unknown parameters. It is a type of stochastic approximation algorithm. As an optimization method, it
Simultaneous perturbation stochastic approximation
Simultaneous_perturbation_stochastic_approximation
Branch of mechanics concerned with solid materials and their behaviors
Timoshenko corrects the Euler–Bernoulli beam equation 1936: Hardy Cross' publication of the moment distribution method, an important innovation in the
Solid_mechanics
Automatic mechanical calculator
created by Charles Babbage. The name difference engine is derived from the method of finite differences, a way to interpolate or tabulate functions by using
Difference_engine
Cyclic algorithm to solve indeterminate quadratic equations
The chakravala method (Sanskrit: चक्रवाल विधि) is a cyclic algorithm to solve indeterminate quadratic equations, including Pell's equation. It is commonly
Chakravala_method
Probability distribution
distribution is the conjugate prior probability distribution for the Bernoulli, binomial, negative binomial, and geometric distributions. The formulation
Beta_distribution
Natural number
the proof in a letter to Daniel Bernoulli written in 1772. Euler used trial division, improving on Pietro Cataldi's method, so that at most 372 divisions
2,147,483,647
Overview of and topical guide to machine learning
reasoning Gaussian process regression Gene expression programming Group method of data handling (GMDH) Inductive logic programming Instance-based learning
Outline_of_machine_learning
Markov Chain Monte Carlo algorithm
(MALA) or Langevin Monte Carlo (LMC) is a Markov chain Monte Carlo (MCMC) method for obtaining random samples – sequences of random observations – from a
Metropolis-adjusted Langevin algorithm
Metropolis-adjusted_Langevin_algorithm
Method of statistical inference
Bayesian inference (/ˈbeɪziən/ BAY-zee-ən or /ˈbeɪʒən/ BAY-zhən) is a method of statistical inference in which Bayes' theorem is used to calculate a probability
Bayesian_inference
Existence and uniqueness of solutions to initial value problems
successive approximations. In this context, this fixed-point iteration method is known as Picard iteration. Set φ 0 ( t ) = y 0 {\displaystyle \varphi
Picard–Lindelöf_theorem
Splitting a triangle by perpendicular lines
Aditya Joshi and Aditya Kumar using metaheuristic methods to find numerical solutions to the Bernoulli quadrisection problem. Eberhart, Carl (2018), "Revisiting
Bernoulli quadrisection problem
Bernoulli_quadrisection_problem
computational methods. Significant theoretical contributions were made by notables figures like Archimedes, Johann Bernoulli and his son Daniel Bernoulli, Leonhard
History_of_fluid_mechanics
Statistic which divides a data set into 100 parts and analyzes it as a percentage
Glivenko–Cantelli theorem. Some methods for calculating the percentiles are given below. The methods given in the calculation methods section (below) are approximations
Percentile
Discrete probability distribution
when the probability of success in each of a fixed or known number of Bernoulli trials is either unknown or random. The beta-binomial distribution is
Beta-binomial_distribution
Divergent series
using one of the aforementioned methods and not as the sum of an infinite series in its usual meaning. These methods have applications in other fields
1_+_2_+_3_+_4_+_⋯
method is a numerical method for solving problems of engineering and mathematical physics. It is a modification of finite element method. The method divides
Infinite_element_method
Survey methodology process
ISBN 978-0-387-97528-3. Ghosh, Dhiren, and Andrew Vogt. "Sampling methods related to Bernoulli and Poisson Sampling." Proceedings of the Joint Statistical Meetings
Poisson_sampling
Force perpendicular to flow of surrounding fluid
two basic approaches, based either on Newton's laws of motion or on Bernoulli's principle. An airfoil generates lift by exerting a downward force on
Lift_(force)
Paradox involving a game with repeated coin flipping
to continue the game indefinitely. The problem was invented by Nicolas Bernoulli, who stated it in a letter to Pierre Raymond de Montmort on September
St._Petersburg_paradox
Process of using data analysis for predicting population data from sample data
the two different aspects of the representative method: The method of stratified sampling and the method of purposive selection", Journal of the Royal Statistical
Statistical_inference
Selection of data points in statistics
the element. Panel sampling is the method of first selecting a group of participants through a random sampling method and then asking that group for (potentially
Sampling_(statistics)
Probability distribution
i={\sqrt {-1}}} . Still other methods are described in "Statistical Applications of the Poisson-Binomial and conditional Bernoulli distributions" by Chen and
Poisson_binomial_distribution
English mathematician
Isaac Newton and Roger Cotes, who was capable of holding his own with the Bernoullis, but a lack of clarity affected a great part of his demonstrations and
Brook_Taylor
Type of study based on universal sampling
Journal) Publishing, 1997 Research Methods Knowledge Base by William M. K. Trochim, Web Center for Social Research Methods, copyright 2006 Cross-Sectional
Cross-sectional_study
Physical measure of overcoming air resistance
how theoretical trajectories might be calculated using his method as applied to the Bernoulli equation, but only for resistance varying as the square of
Ballistic_coefficient
Method in probability theory
In mathematics, the second moment method is a technique used in probability theory and analysis to show that a random variable has positive probability
Second_moment_method
Mechanical test for materials
characterize fatigue and flexural stiffness of asphalt mixtures. The test method for conducting the test usually involves a specified test fixture on a universal
Four-point_flexural_test
Method of logical reasoning
Inductive reasoning refers to a variety of methods of reasoning in which the conclusion of an argument is supported not with deductive certainty, but
Inductive_reasoning
ideas from Thoralf Skolem's method for an algebraic torus. (Other older methods for Diophantine problems include Runge's method.) Coates–Wiles theorem The
Glossary of arithmetic and diophantine geometry
Glossary_of_arithmetic_and_diophantine_geometry
Type of differential equation
there is a vast amount of modern mathematical and scientific research on methods to numerically approximate solutions of partial differential equations
Partial_differential_equation
Technique for solving differential equations
mathematics, separation of variables (also known as the Fourier method) is any of several methods for solving ordinary and partial differential equations, in
Separation_of_variables
BERNOULLIS METHOD
BERNOULLIS METHOD
Boy/Male
Tamil
Vedhanth | வேதாநà¯à®¤
The scriptures, Vedic method of self realization, Knower of the Vedas, One who knows all, Hindu philosophy or ultimate wisdom, King of all
Vedhanth | வேதாநà¯à®¤
Boy/Male
Tamil
The scriptures, Vedic method of self realization, Knower of the Vedas, One who knows all, Hindu philosophy or ultimate wisdom, King of all
Boy/Male
Tamil
The scriptures, Vedic method of self realization, Knower of the Vedas, One who knows all, Hindu philosophy or ultimate wisdom, King of all
Girl/Female
Tamil
Method, Wealth, Protection, Conduct, Auspiciousness, Memory, Well being
Boy/Male
English American
From the west meadow. John and Charles Wesley were the founders of Methodism.
Girl/Female
Tamil
Method, Wealth, Protection, Conduct, Auspiciousness, Memory, Well being
Boy/Male
Indian
Method, Way, Mode, Manner, One who crosses the river of life, Morning star
Surname or Lastname
English (of Norman origin) and French
English (of Norman origin) and French : status name for a professional champion, especially an agent employed to represent one of the parties in a trial by combat, a method of settling disputes current in the Middle Ages. The word comes from Old French champion, campion (Late Latin campio, genitive campionis, a derivative of campus ‘plain’, ‘field of battle’). Compare Campion, Kemp.
Surname or Lastname
Americanized form of German Albrecht.English
Americanized form of German Albrecht.English : from a medieval variant of the personal name Albert.Jacob Albright (1759–1808), a prominent Methodist preacher, was born in Pottstown, PA, the son of a German immigrant called Johann Albrecht.
Boy/Male
Tamil
The scriptures, Vedic method of self realization, Knower of the Vedas, One who knows all, Hindu philosophy or ultimate wisdom, King of all
Boy/Male
Tamil
The scriptures, Vedic method of self realization, Knower of the Vedas, One who knows all, Hindu philosophy or ultimate wisdom, King of all
Surname or Lastname
English (Devon)
English (Devon) : habitational name from a place so called in Hatherleigh, Devon.The Methodist Robert Strawbridge was born in Drummersnave (now Drumsna), near Carrick-on-Shannon, Co. Leitrim, Ireland. Some time between 1759 and 1766 he emigrated to MD and settled on Sam’s Creek, Frederick Co.
Male
Greek
(Μεθόδιος) Greek name derived from methodos, METHODIOS means "method."
Boy/Male
Indian
Method, Way, Mode, Manner, One who crosses the river of life, Morning star
Boy/Male
Muslim
Method, Way, Mode, Manner, One who crosses the river of life, Morning star
Boy/Male
Tamil
The scriptures, Vedic method of self realization, Knower of the Vedas, One who knows all, Hindu philosophy or ultimate wisdom, King of all
Boy/Male
Muslim
Method, Way, Mode, Manner, One who crosses the river of life, Morning star
Boy/Male
Tamil
Method, Way, Mode, Manner, One who crosses the river of life, Morning star
Boy/Male
Tamil
The scriptures, Vedic method of self realization, Knower of the Vedas, One who knows all, Hindu philosophy or ultimate wisdom, King of all
Surname or Lastname
English
English : topographic name from Middle English lang, long ‘long’ + strete ‘road’.Translation of Dutch Langestraet, cognate with 1.The confederate general James Longstreet (1821–1904), was born in SC, came from an old Dutch family in New Netherland with the name Langestraet; he was the nephew of Augustus B. Longstreet, a Methodist clergyman born in Augusta, GA, in 1790.
BERNOULLIS METHOD
BERNOULLIS METHOD
Boy/Male
Arabic, Muslim
Servant of the All-forgiving (Allah)
Biblical
God's work
Female
Hindi/Indian
(চনà§à¦¦à§à¦°) Hindi unisex name CHANDRA means "moon." In mythology, this is the name of a lunar and fertility god.
Boy/Male
Arabic
Companionship; Society
Boy/Male
Muslim
Great ones
Girl/Female
Armenian, Australian, British, Christian, Danish, English, French, German, Greek, Latin, Swedish
Prophetess; Seer; Oracle
Boy/Male
Hindu, Indian, Marathi, Tamil
Lord Shiva
Boy/Male
Muslim
Sword of the creator
Boy/Male
Latin
Go!den.
Male
German
Variant spelling of Old High German Albirich, ALBERICH means "elf ruler." In Germanic mythology, this was the name of a sorcerer king of elves.
BERNOULLIS METHOD
BERNOULLIS METHOD
BERNOULLIS METHOD
BERNOULLIS METHOD
BERNOULLIS METHOD
n.
One of a sect of Christians, the outgrowth of a small association called the "Holy Club," formed at Oxford University, A.D. 1729, of which the most conspicuous members were John Wesley and his brother Charles; -- originally so called from the methodical strictness of members of the club in all religious duties.
n.
One who methodizes.
a.
Arranged with regard to method; disposed in a suitable manner, or in a manner to illustrate a subject, or to facilitate practical observation; as, the methodical arrangement of arguments; a methodical treatise.
n.
The science of method or arrangement; a treatise on method.
n.
One who observes method.
n.
Classification; a mode or system of classifying natural objects according to certain common characteristics; as, the method of Theophrastus; the method of Ray; the Linnaean method.
a.
Of or pertaining to the ancient school of physicians called methodists.
n.
The system of doctrines, polity, and worship, of the sect called Methodists.
n.
The act or process of methodizing, or the state of being methodized.
n.
An orderly procedure or process; regular manner of doing anything; hence, manner; way; mode; as, a method of teaching languages; a method of improving the mind.
a.
Of or pertaining to methodists, or to the Methodists.
a.
Alt. of Methodistical
a.
Of or pertaining to the sect of Methodists; as, Methodist hymns; a Methodist elder.
n.
The art and principles of method.
a.
Of or pertaining to methodology.
p. pr. & vb. n.
of Methodize
imp. & p. p.
of Methodize
a.
Proceeding with regard to method; systematic.
a.
Alt. of Methodical
v. t.
To reduce to method; to dispose in due order; to arrange in a convenient manner; as, to methodize one's work or thoughts.