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Statistical test for multiple comparisons
Tukey's range test, also known as Tukey's test, Tukey method, Tukey's honest significance test, or Tukey's HSD (honestly significant difference) test
Tukey's_range_test
Topics referred to by the same term
non-parametric test used to test whether two samples come from the same population Tukey's range test, also called Tukey method, Tukey's honest significance test, Tukey's
Tukey's_test
American mathematician (1915–2000)
exploratory data analysis. The Tukey range test, the Tukey lambda distribution, the Tukey test of additivity, and the Teichmüller–Tukey lemma all bear his name
John_Tukey
Concept in statistics
In statistics, Tukey's test of additivity, named for John Tukey, is an approach used in two-way ANOVA (regression analysis involving two qualitative factors)
Tukey's_test_of_additivity
Convention for reporting statistical results
multiple hypothesis testing when using the ANOVA and Tukey's range tests. CLD can also be applied following the Duncan's new multiple range test (which is similar
Compact_letter_display
Post-hoc statistical test for pairwise comparisons
recommend more modern procedures like the Holm–Bonferroni method or Tukey's range test. Fisher, Ronald A. (1935). The Design of Experiments. Edinburgh: Oliver
Fisher's least significant difference
Fisher's_least_significant_difference
Statistical test for multiple comparisons
Newman–Keuls method is similar to Tukey's range test as both procedures use studentized range statistics. Unlike Tukey's range test, the Newman–Keuls method uses
Newman–Keuls_method
Statistical technique
"Wilcoxon–Nemenyi–McDonald–Thompson test", when regarding two-sided multiple comparisons of "treatments" versus "treatments". Tukey's range test Nemenyi, P.B. (1963)
Nemenyi_test
hypothesis testing Student's t-test Tukey's range test Tukey's test of additivity Welch's t test Student assessment test Scantron test Bourdon–Wiersma test Graduate
List_of_tests
Multiple comparison procedure
In statistics, Duncan's new multiple range test (MRT) is a multiple comparison procedure developed by David B. Duncan in 1955. Duncan's MRT belongs to
Duncan's new multiple range test
Duncan's_new_multiple_range_test
Statistical post-hoc test for multiple comparisons
multiple comparison procedures: Tukey's range test and the Newman-Keuls method. The primary purpose of post-hoc tests like Tukey's B is to control the family-wise
Tukey's_B_method
(z)} Critical values of the studentized range distribution are used in Tukey's range test. The studentized range is used to calculate significance levels
Studentized range distribution
Studentized_range_distribution
multiple comparison procedures, such as the single step procedure Tukey's range test, the Newman–Keuls method, and the Duncan's step down procedure, and
Studentized_range
Statistical hypothesis test
pairing Tukey's test of additivity The portmanteau test in time-series analysis, testing for the presence of autocorrelation Likelihood-ratio tests in general
Chi-squared_test
Study of collection and analysis of data
correlation coefficient, Mann-Whitney U test, Kruskal-Wallis test, Shannon's diversity index, Tukey's range test, cluster analysis, Spearman's rank correlation
Statistics
Data visualization
making any assumptions of the underlying statistical distribution (though Tukey's box plot assumes symmetry for the whiskers and normality for their length)
Box_plot
Collection of statistical models
Follow-up tests to identify which specific groups, variables, or factors have statistically different means include the Tukey's range test, and Duncan's
Analysis_of_variance
Theorem that any three objects in space can be simultaneously bisected by a plane
n-dimensional case), and also years later called the Stone–Tukey theorem after Arthur H. Stone and John Tukey. The ham sandwich theorem takes its name from the
Ham_sandwich_theorem
Fast Fourier Transform algorithm
The Cooley–Tukey algorithm, named after J. W. Cooley and John Tukey, is the most common fast Fourier transform (FFT) algorithm. It re-expresses the discrete
Cooley–Tukey_FFT_algorithm
Method of statistical inference
statistical hypothesis test typically involves a calculation of a test statistic. Then a decision is made, either by comparing the test statistic to a critical
Statistical_hypothesis_test
Statistical hypothesis test
significant difference (LSD) test, Tukey's honestly significant difference (HSD) test, Newman Keuls test, Ducan's test "a posteriori comparisons"/ "post
F-test
Non-parametric method for testing whether samples originate from the same distribution
The Kruskal–Wallis test by ranks, Kruskal–Wallis H {\displaystyle H} test (named after William Kruskal and W. Allen Wallis), or one-way ANOVA on ranks
Kruskal–Wallis_test
Approach in data analysis
of the distribution are then considered anomalies. Z-score, Tukey's range test Grubbs's test Density-based techniques (k-nearest neighbor, local outlier
Anomaly_detection
decomposition Tukey's range test – multiple comparisons Tukey's test of additivity – interaction in two-way anova Tukey–Duckworth test Tukey–Kramer method Tukey lambda
List_of_statistics_articles
Statistical analyses that were not specified before the data were seen
post hoc tests include: Fisher's least significant difference Holm-Bonferroni Procedure Newman-Keuls Rodger's Method Scheffé's Method Tukey's Test and Honestly
Post_hoc_analysis
Generalization of the one-dimensional normal distribution to higher dimensions
data. Multivariate normality tests include the Cox–Small test and Smith and Jain's adaptation of the Friedman–Rafsky test created by Larry Rafsky and Jerome
Multivariate normal distribution
Multivariate_normal_distribution
Statistical test
developed by Page. Cochran–Armitage test for trend Tukey's trend test Jonckheere, A. R. (1954). "A distribution-free k-sample test against ordered alternatives"
Jonckheere's_trend_test
Statistical test of variance
Tukey's test only if an alpha-level F-test rejects the complete null. It is possible for the complete null to be rejected but for the widest ranging means
Omnibus_test
tests are used to test the fit between a hypothesis and the data. Choosing the right statistical test is not a trivial task. The choice of the test depends
List_of_statistical_tests
Statistical interpretation with many tests
multiplicity or multiple testing problem occurs when many statistical tests are performed on the same dataset. Each test has its own chance of a Type
Multiple_comparisons_problem
(2003) Section 9.7 Bliss, C.I., Cochran, W.G., Tukey, T.W. (1956) A Rejection Criterion Based upon the Range. Biometrika, 43, 418–422. Cochran, W.G. (1941)
Hartley's_test
Family of statistical methods based on sampling of available data
Permutation tests (also re-randomization tests) for generating counterfactual samples Bootstrapping Cross validation Jackknife Permutation tests rely on resampling
Resampling_(statistics)
Multiple comparison method in statistics
factor level means, not just the pairwise differences considered by the Tukey–Kramer method. It works on similar principles as the Working–Hotelling procedure
Scheffé's_method
Distinction between nominal, ordinal, interval and ratio variables
(1960) and independently by Luce & Tukey (1964). However, Stevens's reaction was not to conduct experiments to test for the presence of additive structure
Level_of_measurement
Probability of making type I errors when performing multiple hypotheses tests
corrections) is a way to address the problem created with multiple testing. John Tukey developed in 1953 the concept of a familywise error rate as the probability
Family-wise_error_rate
Discrete Fourier transform algorithm
with Tukey, Richard Garwin recognized the general applicability of the algorithm not just to national security problems, but also to a wide range of problems
Fast_Fourier_transform
Position that there is no relationship between two phenomena
One sided tests should never be used simply as a device to make a conventionally non-significant difference significant." Jones, Lyle V.; Tukey, John W
Null_hypothesis
Observation far apart from others in statistics and data science
]}} for some nonnegative constant k {\displaystyle k} . John Tukey proposed this test, where k = 1.5 {\displaystyle k=1.5} indicates an "outlier", and
Outlier
statistical tests require normally distributed data, so the plotted values provide a convenient visual check for validity of later tests, simply by scanning
Seven-number_summary
error of the data. This statistic is the basis for Tukey's HSD (Honestly Significant Difference) test, which allows researchers to compare the means of
Studentization
Comparison of two distributions
John Wiley and Sons Chambers, John; Cleveland, William; Kleiner, Beat; Tukey, Paul (1983), Graphical methods for data analysis, Wadsworth Cleveland,
Q–Q_plot
American engineer, author, and professor (1914–2000)
statistical confidence. John Tukey, a proponent of simple statistical techniques, was another influence of Shainin's. As a result of Tukey's work, Shainin developed
Dorian_Shainin
Scatterplot diagnostics measures
point cloud in a scatter plot. The term and idea was coined by John Tukey and Paul Tukey, though they didn't publish it; later it was elaborated by Wilkinson
Scagnostics
Middle quantile of a data set or probability distribution
proposed the idea of using the medians of two subsamples rather the means. Tukey combined these ideas and recommended dividing the sample into three equal
Median
Statistic which divides data into four same-sized parts for analysis
upper half of the data. The values found by this method are also known as "Tukey's hinges"; see also midhinge. Use the median to divide the ordered data set
Quartile
Instructions a computer can execute
to describe computer programs is credited to mathematician John Wilder Tukey in 1958. The first programmable computers, which appeared at the end of
Software
Statistical measure of how far values spread from their average
parametric tests have been proposed: these include the Barton–David–Ansari–Freund–Siegel–Tukey test, the Capon test, Mood test, the Klotz test and the Sukhatme
Variance
Symmetric probability distribution
Formalized by John Tukey, the Tukey lambda distribution is a continuous, symmetric probability distribution defined in terms of its quantile function.
Tukey_lambda_distribution
Misuse of data analysis
the risk of false positives. This is done by performing many statistical tests on the data and only reporting those that come back with significant results
Data_dredging
Type of statistics
different standard deviations; under this model, non-robust methods like a t-test work poorly. Robust statistics seek to provide methods that emulate popular
Robust_statistics
Non-parametric statistic used to estimate the survival function
Journal of the American Statistical Association. The journal editor, John Tukey, convinced them to combine their work into one paper, which has been cited
Kaplan–Meier_estimator
Method of plotting numeric data
display even more information than box plots, which were created by John Tukey in 1977. The name comes from the plot's alleged resemblance to a violin
Violin_plot
Statistical measure of variability
Wilkins Co. pp. 24–25. Hoaglin, David C.; Frederick Mosteller; John W. Tukey (1983). Understanding Robust and Exploratory Data Analysis. John Wiley &
Median_absolute_deviation
States National Academy of Sciences. Mccullagh, Peter (2003). "John Wilder Tukey. 16 June 1915 – 26 July 2000". Biographical Memoirs of Fellows of the Royal
Founders_of_statistics
was formulated within the Neyman-Pearson hypothesis-testing framework [...] and required that the test of each contrast Ψi (i = 1, ... , J − 1) should result
Rodger's_method
Statistical method
Society, Series B. 11 (1): 68–84. doi:10.1111/j.2517-6161.1949.tb00023.x. Tukey JW. "Bias and confidence in not-quite large samples". Annals of Mathematical
Bootstrapping_(statistics)
robust exploratory data analysis procedure proposed by the statistician John Tukey. The purpose of median polish is to find an additively-fit model for data
Median_polish
Secret history conspiracy theory game
Audible/BBC documentary about the Ong's Hat legend An interview with John Tukey at Princeton University on 11 April 1984 Includes references to an origin
Ong's_Hat
Multidimensional data visualization
"loop". The inner polygon, called the bag, is constructed on the basis of Tukey depth, the smallest number of observations that can be contained by a half-plane
Bagplot
Probability distribution with more than one mode
mass test, the MAP test, the mode existence test, the runt test, the span test, and the saddle test. An implementation of the dip test is available for
Multimodal_distribution
computing. A number of statistical concepts have an important impact on a wide range of sciences. These include the design of experiments and approaches to statistical
History_of_statistics
Topics referred to by the same term
Box-Pierce test which provides better small sample properties The Tukey-Kramer test outputs a q-statistic (lowercase), also called the studentized range statistic
Q-statistic
Graph that displays observed data in a time sequencer
Standards and Technology Chambers, John; William Cleveland; Beat Kleiner; Paul Tukey (1983). Graphical Methods for Data Analysis. Duxbury. ISBN 0-534-98052-X
Run_chart
Statistical method for resampling
developed by Maurice Quenouille (1924–1973) from 1949 and refined in 1956. John Tukey expanded on the technique in 1958 and proposed the name "jackknife" because
Jackknife_resampling
Pattern that has no predecessors
configuration of the automaton but cannot arise in any other way. John Tukey named these configurations after the Garden of Eden in Abrahamic religions
Garden of Eden (cellular automaton)
Garden_of_Eden_(cellular_automaton)
Type of chart
(Date created) Chambers, John, William S. Cleveland, Beat Kleiner, and Paul Tukey, (1983). Graphical Methods for Data Analysis. Wadsworth. pp. 158–162 Mayr
Radar_chart
Statistical value representing the center or average of a distribution
with vertices from the given distribution will contain the given center Tukey median a point with the property that every halfspace containing it also
Central_tendency
into information useful for decision-making by users. Statistician John Tukey, defined data analysis in 1961, as: "Procedures for analyzing data, techniques
Data_analysis
Causal or moderating relationship between statistical variables
Generalized randomized block design Intersectionality Linear model Main effect Tukey's test of additivity Dodge, Y. (2003). The Oxford Dictionary of Statistical
Interaction_(statistics)
Two books on human sexual behavior by Alfred Kinsey and others
notable statisticians such as John Tukey, condemned the sampling procedure. In a tense meeting with Kinsey, Tukey supposedly declared that even a sample
Kinsey_Reports
Format for presentation of quantitative data
Stemplots became more commonly used in the 1980s after the publication of John Tukey's book on exploratory data analysis in 1977. The popularity during those
Stem-and-leaf_display
least squares. The Tukey lambda distribution is either supported on the whole real line, or on a bounded interval, depending on what range the value of one
List of probability distributions
List_of_probability_distributions
Probability distribution
useful in Bayesian parameter estimation. For example, one may administer a test to a number of individuals. If it is assumed that each person's score (0
Beta_distribution
Probability distribution used in multivariate hypothesis testing
distribution used in multivariate hypothesis testing, especially with regard to the likelihood-ratio test and multivariate analysis of variance (MANOVA)
Wilks's_lambda_distribution
Decision-making framework
Planning (1973), Douglas John White's Decision Methodology (1975), John Tukey's Exploratory data analysis (1977), Mike Pidd's Tools for Thinking: Modelling
Cynefin_framework
Class of statistical estimators
ISBN 978-0-470-12990-6. Hoaglin, David C.; Frederick Mosteller; John W. Tukey (1983). Understanding Robust and Exploratory Data Analysis. Hoboken, NJ:
M-estimator
Class of statistics in estimation theory
average’. Fisher's k-statistics and Tukey's polykays are examples of homogeneous polynomial U-statistics (Fisher, 1929; Tukey, 1950). For a simple random sample
U-statistic
Most populous city in Maine, United States
devices." East End Treatment Plant, established in 1979, is located near Tukey's Bridge. Portland is accessible from I-95 (the Maine Turnpike), I-295, and
Portland,_Maine
Axiom of set theory
{\mathcal {A}}} has at least one element maximal with respect to inclusion. Tukey's lemma: If A {\displaystyle {\mathcal {A}}} is any family of subsets of
Axiom_of_choice
Analysis of math functions with respect to time
frequency domain. Frequency domain Fourier transform Laplace transform Blackman–Tukey transform "Time Domain Analysis vs Frequency Domain Analysis: A Guide and
Time_domain
Family of distributions that generalize the multivariate normal distribution
multivariate analysis, in which most methods for estimation and hypothesis-testing are motivated for the normal distribution. In contrast to classical multivariate
Elliptical_distribution
Kind of numerical parameter of a parametric family of probability distributions
Skew normal distribution Lognormal distribution Student's t-distribution Tukey lambda distribution Weibull distribution By contrast, the following continuous
Shape_parameter
Images used to represent statistical data visually
techniques. They can also provide insight into a data set to help with testing assumptions, model selection and regression model validation, estimator
Statistical_graphics
1849 murder case
Marshal Tukey. By the time Tukey arrived, word had spread, and a whole party of men was waiting for the official report on the bones' identity. Tukey first
Parkman–Webster_murder_case
Signal representation
in 1953. See time domain: origin of term for details. Bandwidth Blackman–Tukey transformation Fourier analysis for computing periodicity in evenly spaced
Frequency_domain
1 minus the cosine of an angle
shape of a pulse or a window function (including Hann, Hann–Poisson and Tukey windows), because it smoothly (continuous in value and slope) "turns on"
Versine
Structure that repeats in time; a novel type or phase of non-equilibrium matter
shape of the pulse controlled by an acousto-optic modulator, using the Tukey window to avoid too much energy at the wrong optical frequency. The hyperfine
Time_crystal
Graphical technique for data sets
ASICs or microprocessors. The plot usually shows the range of conditions in which the device under test will operate. Spaghetti plots are a method of viewing
Plot_(graphics)
Statistical sequence characterizing probability distributions
parameters of distributions expressable in inverse form such as the Gumbel, the Tukey lambda, and the Wakeby distributions. There are two common ways that L-moments
L-moment
Research and scientific development company
radio communications development facilities were developed. In 1925, the test plot studies were established at Gulfport, Mississippi, where there were
Bell_Labs
Statistical techniques analyzing facts to make predictions about unknown events
Tom (1997). Machine Learning. New York: McGraw-Hill. ISBN 0-07-042807-7. Tukey, John (1977). Exploratory Data Analysis. New York: Addison-Wesley. ISBN 0-201-07616-0
Predictive_analytics
American mathematician and information theorist (1915–1998)
Claude Shannon. The Mathematical Research Department also included John Tukey and Los Alamos veterans Donald Ling and Brockway McMillan. Shannon, Ling
Richard_Hamming
Visual representation of data
clearly, accurately, and efficiently". John Tukey and Edward Tufte pushed the bounds of data visualization; Tukey with his new statistical approach of exploratory
Data and information visualization
Data_and_information_visualization
Feature of some statistical distributions
MathSciNet yielded 81 hits, the earliest being a 1946 paper by Brown and Tukey in the Annals of Mathematical Statistics (volume 17, pages 1–12). Bessis
Long_tail
Quality of zero being an even number
integer data types used by some computer algorithms, such as the Cooley–Tukey fast Fourier transform. This ordering has the property that the farther
Parity_of_zero
Probability distribution
independently could be derived e.g. by using X = IH/χ[clarification needed]. The Tukey g- and h-distribution also allows for a deviation from normality, both through
Generalized normal distribution
Generalized_normal_distribution
Study of evolutionary relationships between organisms
Maurice Quenouille (foreshadowed in '46 by Mahalanobis and extended in '58 by Tukey), precursor concept. 1950, Willi Hennig's classic formalization. Hennig
Phylogenetics
Primality tests: determining whether a given number is prime AKS primality test Baillie–PSW primality test Fermat primality test Lucas primality test Miller–Rabin
List_of_algorithms
Statistical experiment designs
3109/00016484709123756. Anderson, TW; McCarthy, PJ; Tukey, JW (1946). 'Staircase' method of sensitivity testing (Technical report). Naval Ordnance Report. 65-46
Up-and-down_design
Study of the development of economic thought
modeling, receiving the 1980 Nobel Economics Prize. In 1963–1964 as John Tukey of Princeton University was developing the revolutionary fast Fourier transform
History_of_economic_thought
TUKEYS RANGE-TEST
TUKEYS RANGE-TEST
Surname or Lastname
English and French
English and French : topographic name for someone who lived by a granary, from Middle English, Old French grange (Latin granica ‘granary’, ‘barn’, from granum ‘grain’). In some cases, the surname has arisen from places named with this word, for example in Dorset and West Yorkshire in England, and in Ardèche and Jura in France. The Marquis de Lafayette owned a property named Lagrange, and there used to be a place in VT so named in his honor.
Boy/Male
Hindu, Indian
Mountain Range
Girl/Female
Arabic
Range; Opportunity
Female
English
English short form of Latin Angela, ANGE means "angel, messenger." Compare with masculine Ange.
Boy/Male
French, Hindu, Indian
Ward of the Forest
Surname or Lastname
English
English : of uncertain origin. A certain William de Orenge mentioned in Domesday Book probably derives his name from Orange in Mayenne. Later medieval examples probably come from a female personal , Orenge, of obscure derivation.French : habitational name from a place in Vaucluse.
Boy/Male
American, British, English
From Raven's Island
Boy/Male
Muslim
Mountain range
Boy/Male
Bengali, Hindu, Indian, Punjabi, Sikh, Tamil
Colourful
Boy/Male
American, British, English
From Raven's Island
Male
French
French name ANGE means "angel, messenger." Compare with feminine Ange.
Surname or Lastname
English (of Norman origin)
English (of Norman origin) : of uncertain derivation. It may be a habitational name, perhaps from a place called Ganges in southern France. This is recorded in the 12th century as Agange and Aganthicum, perhaps from a derivative of Latin acanthus ‘bear’s-foot’. On the other hand, it may be from the Old Norse personal name Gangi, a cognate of Old English Gegn.German (Gänge) : from Middle High German genge ‘common’, ‘circulating (among the people)’, ‘sprightly’, hence an occupational name for a hawker or peddler; perhaps also a nickname for an energetic person (see Genge 2).German (Gange or Gänge) : from a short form of the personal names Wolfgang or Gangulf, both formed with Old High German gang- ‘gait’, ‘walk’ (+ wolf ‘wolf’).
Boy/Male
Dutch Anglo Saxon
Tall.
Surname or Lastname
English
English : patronymic from the personal name Rand(e) (see Rand 1).
Boy/Male
Indian
Mountain range
Surname or Lastname
English
English : occupational name for a gamekeeper or warden, from Middle English ranger, an agent derivative of range(n) ‘to arrange or dispose’.German : variant of Rang 2, 3.German : habitational name for someone from any of the places named Rangen, in Alsace, Bavaria, and Hesse.French : from a Germanic personal name formed with rang, rank ‘curved’, ‘bent’; ‘slender’.A person called Ranger from La Rochelle, France, is documented in Quebec City in 1684 with the secondary surname
Boy/Male
Hindu, Indian, Sanskrit
In the Company
Boy/Male
Hindu, Indian, Marathi
A Mountain Range
Boy/Male
Tamil
Mountain range
Girl/Female
Hindu, Indian, Tamil
Queen
TUKEYS RANGE-TEST
TUKEYS RANGE-TEST
Girl/Female
Hindu, Indian
Heaven
Boy/Male
American, Australian, British, Christian, English, German, Hebrew, Spanish
Wolf Counsellor; Shield Wolf; Form of Raphael; Form of Rafael God has Healed; Wise Wolf; Healer
Boy/Male
Hindu
Resplendent, The venus planet, Friday, Bright
Girl/Female
Tamil
Divine
Male
Native American
Native American Cheyenne name MANTOTOHPA means "four bears."
Boy/Male
Greek
Arrow.
Girl/Female
Indian, Sanskrit
The Consort of Nateshwara
Male
English
English surname transferred to forename use, from the Norman French baronial name d'Araines, DAREN means "from Araines."
Boy/Male
Hindu, Indian, Kannada, Malayalam, Marathi, Sanskrit
Bird
Biblical
that blots out; that suppresses
TUKEYS RANGE-TEST
TUKEYS RANGE-TEST
TUKEYS RANGE-TEST
TUKEYS RANGE-TEST
TUKEYS RANGE-TEST
v.
A series of things in a line; a row; a rank; as, a range of buildings; a range of mountains.
a.
Of or pertaining to an orange; of the color of an orange; reddish yellow; as, an orange ribbon.
n.
To sail or pass in a direction parallel to or near; as, to range the coast.
n.
One of a body of mounted troops, formerly armed with short muskets, who range over the country, and often fight on foot.
n.
To dispose in a classified or in systematic order; to arrange regularly; as, to range plants and animals in genera and species.
pl.
of Turkey
v. i.
To be native to, or live in, a certain district or region; as, the peba ranges from Texas to Paraguay.
n.
Any large American gallinaceous bird belonging to the genus Meleagris, especially the North American wild turkey (Meleagris gallopavo), and the domestic turkey, which was probably derived from the Mexican wild turkey, but had been domesticated by the Indians long before the discovery of America.
v. i.
To have range; to change or differ within limits; to be capable of projecting, or to admit of being projected, especially as to horizontal distance; as, the temperature ranged through seventy degrees Fahrenheit; the gun ranges three miles; the shot ranged four miles.
n.
The color of an orange; reddish yellow.
n.
One who ranges; a rover; sometimes, one who ranges for plunder; a roving robber.
v.
Extent or space taken in by anything excursive; compass or extent of excursion; reach; scope; discursive power; as, the range of one's voice, or authority.
n.
To set in a row, or in rows; to place in a regular line or lines, or in ranks; to dispose in the proper order; to rank; as, to range soldiers in line.
v. i.
To have a certain direction; to correspond in direction; to be or keep in a corresponding line; to trend or run; -- often followed by with; as, the front of a house ranges with the street; to range along the coast.
v. i.
To range about in an irregular manner.
v.
That which may be ranged over; place or room for excursion; especially, a region of country in which cattle or sheep may wander and pasture.
n.
To rove over or through; as, to range the fields.
v.
See Range of cable, below.
n.
The tree that bears oranges; the orange tree.
imp. & p. p.
of Range