statistics - meaning and definition. What is statistics
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What (who) is statistics - definition

STUDY OF THE COLLECTION, ANALYSIS, INTERPRETATION, AND PRESENTATION OF DATA
AppliedStatistics; Applied statistics; Business statistics; Statistical; Stats; R-test; Statistically; Statistical method; Statistical methods; Statistical Analysis; Political arithmetic; Statistical sciences; Statistical Sciences; Business Statistics; Statistics/Applied; Applied Statistics; Statistik; Statistical description; Statiststics; Statistical analyses; Statistical reasoning; Statistcs; Applications of statistics; Statistical methodology
  • open source statistical package]]
  • [[Scatter plot]]s and [[line chart]]s are used in [[descriptive statistics]] to show the observed relationships between different variables, here using the [[Iris flower data set]].
  • Bernoulli's ''[[Ars Conjectandi]]'' was the first work that dealt with [[probability theory]] as currently understood.
  • [[Karl Pearson]], a founder of mathematical statistics.
  • A least squares fit: in red the points to be fitted, in blue the fitted line.
  • [[Confidence intervals]]: the red line is true value for the mean in this example, the blue lines are random confidence intervals for 100 realizations.
  • critical region]] is the set of values to the right of the observed data point (observed value of the test statistic) and the [[p-value]] is represented by the green area.
  • The [[confounding variable]] problem: ''X'' and ''Y'' may be correlated, not because there is causal relationship between them, but because both depend on a third variable ''Z''. ''Z'' is called a confounding factor.
  • probability density]], is used extensively in [[inferential statistics]].

statistics         
<statistics, mathematics> The practice, study or result of the application of mathematical functions to collections of data in order to summarise or extrapolate that data. The subject of statistics can be divided into descriptive statistics - describing data, and analytical statistics - drawing conclusions from data. (1997-07-16)
Statistics         
·noun The branch of mathematics which studies methods for the calculation of probabilities.
II. Statistics ·noun The science which has to do with the collection and classification of certain facts respecting the condition of the people in a state.
III. Statistics ·noun Classified facts respecting the condition of the people in a state, their health, their longevity, domestic economy, arts, property, and political strength, their resources, the state of the country, ·etc., or respecting any particular class or interest; especially, those facts which can be stated in numbers, or in tables of numbers, or in any tabular and classified arrangement.
statistics         
n.
1) to collect, gather; tabulate statistics
2) to bandy statistics (about)
3) cold, hard statistics
4) vital statistics ("essential data about a population')
5) statistics indicate, show

Wikipedia

Statistics

Statistics (from German: Statistik, orig. "description of a state, a country") is the discipline that concerns the collection, organization, analysis, interpretation, and presentation of data. In applying statistics to a scientific, industrial, or social problem, it is conventional to begin with a statistical population or a statistical model to be studied. Populations can be diverse groups of people or objects such as "all people living in a country" or "every atom composing a crystal". Statistics deals with every aspect of data, including the planning of data collection in terms of the design of surveys and experiments.

When census data cannot be collected, statisticians collect data by developing specific experiment designs and survey samples. Representative sampling assures that inferences and conclusions can reasonably extend from the sample to the population as a whole. An experimental study involves taking measurements of the system under study, manipulating the system, and then taking additional measurements using the same procedure to determine if the manipulation has modified the values of the measurements. In contrast, an observational study does not involve experimental manipulation.

Two main statistical methods are used in data analysis: descriptive statistics, which summarize data from a sample using indexes such as the mean or standard deviation, and inferential statistics, which draw conclusions from data that are subject to random variation (e.g., observational errors, sampling variation). Descriptive statistics are most often concerned with two sets of properties of a distribution (sample or population): central tendency (or location) seeks to characterize the distribution's central or typical value, while dispersion (or variability) characterizes the extent to which members of the distribution depart from its center and each other. Inferences on mathematical statistics are made under the framework of probability theory, which deals with the analysis of random phenomena.

A standard statistical procedure involves the collection of data leading to a test of the relationship between two statistical data sets, or a data set and synthetic data drawn from an idealized model. A hypothesis is proposed for the statistical relationship between the two data sets, and this is compared as an alternative to an idealized null hypothesis of no relationship between two data sets. Rejecting or disproving the null hypothesis is done using statistical tests that quantify the sense in which the null can be proven false, given the data that are used in the test. Working from a null hypothesis, two basic forms of error are recognized: Type I errors (null hypothesis is falsely rejected giving a "false positive") and Type II errors (null hypothesis fails to be rejected and an actual relationship between populations is missed giving a "false negative"). Multiple problems have come to be associated with this framework, ranging from obtaining a sufficient sample size to specifying an adequate null hypothesis.

Statistical measurement processes are also prone to error in regards to the data that they generate. Many of these errors are classified as random (noise) or systematic (bias), but other types of errors (e.g., blunder, such as when an analyst reports incorrect units) can also occur. The presence of missing data or censoring may result in biased estimates and specific techniques have been developed to address these problems.

Examples of use of statistics
1. FRIGHTENING STATISTICS The statistics are frightening.
2. There are statistics and more damn statistics, but some still have the power to shock.
3. The way these statistics have been treated is no less interesting than the statistics themselves.
4. Government statistics Proposals to be published for the independent statistics board.
5. Statistics Latest statistics show the highest proportion of Britain‘s 185,000 abortions last year fell in the 20–30 age group.