In statistics, an indicator expressed in relative terms. Absolute and relative values ​​in economic analysis

ABSOLUTE AND RELATIVE STATISTICAL INDICATORS (VALUES)

Statistical indicators - it is a generalizing quantitative and qualitative value that characterizes socio-economic phenomena and processes in specific conditions of place and time.

They are used to express:

Absolute

relative

Average values

Absolute indicators- these are quantities that characterize the size, volume and levels of phenomena and processes public life, i.e. express them in certain units of measurement. Therefore, all absolute indicators are numbers. They can be individual, group, general.

Individual absolute values ​​express the size of quantitative characteristics in individual units of the studied population, they are obtained as a result statistical observation, for example, the number of employees at each enterprise in the industry, the volume of production of the firm, etc.

Group absolute indicators are obtained by summing up the statistical units included in each specific group, for example, the number of enterprises by type of ownership, the population of the region by age groups.

General absolute indicators (total, final) characterize the quantitative characteristics in total for the entire population, for example, the volume of production, the number of personnel, material costs for all enterprises in the industry, the retail turnover of all stores in the area.

Absolute values ​​can be measured in various units: natural, conditionally natural, cost.

natural units measurements of physical quantities are units for determining volume, mass, length, area (tons, kilometers, cubic meters, pieces, etc.), for example, the area of ​​\u200b\u200bthe lake is measured in square meters, the length of the line is in kilometers

Conditionally natural units absolute indicators are used in cases of measuring homogeneous, but different-quality products, while units of physical quantities are converted into conventional units using special coefficients.

Conditionally natural units take into account the total number of livestock, the availability of feed, the use of fuel, canned food of all kinds (fruit, vegetables, fish, dairy, meat) in conditional jars.

To summarize accounting data for an enterprise, industry, and the national economy as a whole, use cost (monetary) units measurements. The cost volume of production is obtained as the sum of the products of the number of units of specific types of products and the price of these same types.

For comparison, comparison of absolute values ​​among themselves in time, space and other relations, relative values ​​are used.

Relative value - it is a generalizing indicator expressing the quantitative ratio of two absolute values ​​to each other.

Relative values ​​characterize the ratio of phenomena and processes of the socio-economic life of society. Since they are obtained by dividing one absolute value by another, the relative value is a fraction that has a numerator and a denominator.

The denominator is the base of comparison (baseline).

The numerator is the value that is compared (reporting).

There are two ways to calculate relative values ​​- as a ratio:

    two absolute values ​​of the same name;

    two different absolute values.

In the case of a ratio of two indicators of the same name, the result is obtained in the form:

Coefficients, if the denominator is taken as one;

Percentage if the denominator is taken as 100%.

The relative value, expressed by coefficients or as a percentage, shows how many times the compared indicator is more or less than the base one or how many percent it is to the base one.

Relative quantities of the same name - this is the value of the planned task, the implementation of the plan, dynamics, structure, coordination, comparison.

Relative value of the planned target shows how many times or by how many percent the value of the indicator according to the plan should increase (decrease) in comparison with its level in the previous period.

Relative values ​​of the implementation of the planned task - the ratio of the actual level of the indicator in the reporting (current) period to the planned target of the same period.

Relative magnitude of dynamics characterizes changes in the indicator over time, i.e. how many times the level of the indicator has increased (decreased) compared to any previous period.

There is an interrelation between the relative values ​​of the planned task, the fulfillment of the plan and the dynamics.

Y o - the actual level of the indicator of the base (previous) period;

U pl - the planned level of the indicator for the reporting period;

Y 1 - the actual level of the indicator of the reporting period;

RH is a relative value.

Calculation formulas:

OB of the planned target \u003d U pl / U o;

OB plan implementation \u003d Y 1 / Y pl;

OB dynamics \u003d Y 1 / Y o.

Relative value of dynamics (U 1 /U 0 ) can be obtained as the product of the relative values ​​of the planned task and the implementation of the plan:

Y 1 / Y o \u003d Y pl / Y o * Y 1 / Y pl

The relative size of the structure(OB structure) is the relation of the part to the whole, i.e. the share (specific gravity) of a separate part in the aggregate as a whole. The formula for calculating the relative values ​​of the structure is as follows:

OB structure = n/∑n

where n is the number of units or the volume of the feature in separate parts of the population;

∑n - the total number of units or the volume of the population as a whole

Relative indicators of the structure characterize the internal content of the totality (process, phenomenon).

Relative values ​​of coordination (OB coordination) is the ratio between the parts of one whole.

Relative comparison values ​​(comparison OV) are the ratio of the same indicator for the same period (moment) of time, but for different objects or different territories. They characterize changes in phenomena by regions and countries. One object is taken as the base of comparison.

Relative intensity value (RH intensity) shows the degree of distribution of the phenomenon in a certain environment, the level of its development, for example, indicators of capital productivity, capital-labor ratio, labor intensity characterize the level of use of fixed assets, human labor. Some intensity indicators are calculated per 100, 1000 or other base of comparison.

Relative values ​​of the level of economic development , as intensities, show the ratio of two different-quality (opposite) indicators, the relationship of which is significant. These include indicators of the socio-economic development of society: production of consumer goods (food, non-food, services) per capita; retail turnover per person; consumption of potatoes, bread, milk and other products per capita; provision of the population with cars (per 100 families, units).

statistic - quantitative characteristic socio-economic phenomena and processes in conditions of qualitative certainty.

According to the form, statistical indicators are distinguished:

Absolute

Relative

Medium

Absolute value- the volume or size of the studied event or phenomenon, process, expressed in appropriate units of measurement in specific conditions of place and time.

Types of absolute values:

Individual absolute value - characterizes the unit of the population

Total absolute value - characterizes a group of units or the entire population

The result of statistical observation are indicators that characterize the absolute dimensions or properties of the phenomenon under study for each unit of observation. They are called individual absolute indicators. If the indicators characterize the entire population as a whole, they are called generalizing absolute indicators. Statistical indicators in the form of absolute values ​​always have units of measurement: natural or cost.

Forms of accounting for absolute values:

Natural - physical units (pieces, person)

· Conditionally natural - used when calculating the totals for products of the same consumer quality but a wide range. The conversion to a conditional measurement is carried out using the conversion factor:
To recalculation \u003d actual consumer quality / standard (predetermined quality)

Cost accounting - monetary units

Absolute indicators should also be divided into momentary and interval.

Momentary absolute indicators characterize the fact of the presence of a phenomenon or process, its size (volume) at a certain date in time.

Interval absolute indicators characterize the final volume of a phenomenon for a given period of time (for example, output for a quarter or a year, etc.), while allowing subsequent summation.

Natural units of measurement are simple, compound and conditional.

Simple natural units measurements are tons, kilometers, pieces, liters, miles, inches, etc. In simple natural units, the volume of the statistical population is also measured, that is, the number of its constituent units, or the volume of its individual part.

Composite natural units measurements have calculated indicators obtained as the product of two or more indicators that have simple units of measurement. For example, accounting for labor costs in enterprises is expressed in man-days worked (the number of employees of the enterprise is multiplied by the number of days worked for the period) or man-hours (the number of employees of the enterprise is multiplied by the average duration of one working day and the number of working days in the period); the turnover of transport is expressed in ton-kilometers (the mass of the transported cargo is multiplied by the distance of transportation), etc.

Conditionally natural units measurements are widely used in analysis production activities, when you want to find the final value of the same type of indicators that are not directly comparable, but characterize the same properties of the object.

Natural units are recalculated into conditionally natural ones by expressing the varieties of the phenomenon in units of some standard.

For example:

soap of different grades - in conditional soap with 40% content of fatty acids

canned food of various sizes - in conditional cans with a volume of 353.4 cm3,

Translation into conventional units is carried out using special coefficients. For example, if there are 200 tons of soap with a fatty acid content of 40% and 100 tons with a fatty acid content of 60%, then in terms of 40%, we get a total volume of 350 tons of conditional soap (the conversion factor is defined as the ratio 60: 40 = 1 .5 and, consequently, 100 t 1.5 = 150 t conventional soap).

Example

Find conditional natural value:

Let's say we produce notebooks:

12 sheets - 1000 pcs;

24 sheets - 200 pcs;

48 sheets - 50 pieces;

96 sheets - 100 pcs.

Solution:
We set the standard - 12 sheets.
We calculate the conversion factor:

Answer: Conditionally natural value \u003d 1000 * 1 + 200 * 2 + 50 * 4 + 100 * 8 \u003d 2400 notebooks of 12 sheets.

relative

Relative values ​​are different ratios or percentages.

Relative statistics- these are indicators that give a numerical measure of the ratio of two compared values.

The main condition for the correct calculation of relative values ​​is the comparability of the compared values ​​and the presence of real connections between the phenomena under study.

Relative value = compared value / basis

The value in the numerator of the ratio is called the current or compared.

The value in the denominator of the ratio is called the base or base of comparison.

According to the method of obtaining, relative values ​​are always derivative (secondary) values.

They can be expressed:

· in odds, if the base of comparison is taken as one (AbsValue / Basis) * 1

· in percents, if the comparison base is taken as 100 (AbsValue / Basis) * 100

· ppm, if the comparison base is taken as 1000 (AbsValue / Basis) * 1000
For example, the birth rate in the form of a relative value, calculated in ppm, shows the number of births per year per 1000 people.

· in decimille, if the comparison base is taken as 10000 (AbsValue / Basis) * 10000

There are the following types of relative statistical values:

The relative magnitude of the dynamics

Relative value of the planned target

Relative value of plan implementation

The relative size of the structure

Relative value of coordination

The relative magnitude of the intensity

Relative comparison value

Along with absolute values, one of the most important forms of generalizing indicators in statistics are relative values ​​- these are generalizing indicators that express a measure of the quantitative ratios inherent in specific phenomena or statistical objects. When calculating a relative value, the ratio of two interrelated quantities (mainly absolute) is measured, which is very important in statistical analysis. Relative values ​​are widely used in statistical research, because they make it possible to compare different indicators and make such a comparison visual.

Relative values ​​are calculated as the ratio of two numbers. In this case, the numerator is called the compared value, and the denominator is the base of the relative comparison. Depending on the nature of the phenomenon under study and the objectives of the study, the basic value can take on different values, which leads to various forms expressions of relative values. Relative quantities are measured in:

Coefficients: if the base of comparison is taken as 1, then the relative value is expressed as an integer or fractional number, showing how many times one value is greater than the other or what part of it is;

Percentage, if the base of comparison is taken as 100;

ppm, if the comparison base is taken as 1000;

Prodecimille, if the comparison base is taken as 10000;

Named numbers (km, kg, Ha), etc.

Relative values ​​are divided into two groups:

Relative values ​​obtained as a result of the ratio of the same statistical indicators;

Relative values ​​representing the result of a comparison of dissimilar statistical indicators.

The relative values ​​of the first group include: the relative values ​​of the dynamics, the relative values ​​of the planned task and the implementation of the plan, the relative values ​​of the structure, coordination and visibility.

The result of comparing similar indicators is a short ratio (coefficient) showing how many times the compared value is greater (or less) than the base value. The result can be expressed as a percentage, showing what percentage of the compared value is from the base.

Relative values ​​of dynamics characterize the change of the phenomenon in time. They show how many times the volume of the phenomenon has increased (or decreased) over a certain period of time, they are called growth factors. Growth factors can be calculated as a percentage. To do this, the ratios are multiplied by 100. They are called growth rates, which can be determined with a variable or constant base.

Growth rates (T p) with a variable base are obtained by comparing the level of the phenomenon of each period with the level of the previous period. Growth rates with a constant base of comparison are obtained by comparing the level of the phenomenon in each individual period with the level of one period taken as the base.

Percentage growth rate with variable base (chain growth rate):

where at 1 ; at 2 ; at 3; at 4;- levels of the phenomenon for the same consecutive periods (for example, output by quarters of the year).

Constant base growth rate (base growth rate):

; ; . (4.2)

where at k is a constant base of comparison.

Relative value of the planned task- the ratio of the value of the indicator according to the plan ( y pl) to its actual value in the previous period ( at o) , i.e. u pl / u o.(4.3)

Relative value of plan execution is the ratio of the actual (reported) value of the indicator ( 1) to its planned value for the same period ( at pl), i.e. y 1 / y pl. (4.4)

The relative values ​​of the planned task, the implementation of the plan and the dynamics are interconnected.

So, or ; . (4.5)

Relative values ​​of the structure characterize the share of individual parts in the total volume of the population and are expressed in fractions of a unit or as a percentage.

Each relative value of the structure, expressed as a percentage, is called the specific gravity. This value has one feature - the sum of the relative values ​​of the studied population is always equal to 100%, or 1 (depending on how it is expressed). Relative values ​​of the structure are used in the study of complex phenomena that fall into a number of groups or parts, to characterize the specific gravity (share) of each group in the overall total.

Relative values ​​of coordination reflect the ratio of the number of two parts of the whole, i.e. show how many units of one group account for an average of one, ten or one hundred units of another group of the studied population (for example, how many employees are there for 100 workers). Relative values ​​of coordination characterize the ratio of individual parts of the population with one of them, taken as the basis for comparison. When determining this value, one of the parts of the whole is taken as the basis for comparison. With this value, you can observe the proportions between the components of the population. Coordination indicators are, for example, the number of urban residents per 100 rural; the number of women per 100 men, etc. Characterizing the relationship between the individual parts of the whole, the relative values ​​of coordination give them visibility and allow, if possible, to control the observance of optimal proportions.

Relative visibility values ​​(comparisons) reflect the results of a comparison of indicators of the same name relating to the same period (or moment) of time, but to different objects or territories (for example, the annual labor productivity for two enterprises is compared). They are also calculated in coefficients or percentages and show how many times one comparable value is greater or less than another.

Relative comparison values ​​are widely used in the comparative assessment of various performance indicators of individual enterprises, cities, regions, countries. In this case, for example, the results of a particular enterprise, etc. are taken as a basis for comparison and consistently correlated with the results of similar enterprises in other industries, regions, countries, etc.

The second group of relative values, which is the result of a comparison of opposite statistical indicators, is called relative intensity values.

They are named numbers and show the total of the numerator per one, ten, one hundred units of the denominator.

This group of relative values ​​includes indicators of production per capita; indicators of food consumption and non-food items per capita; indicators reflecting the provision of the population with material and cultural benefits; indicators characterizing the technical equipment of production, the rationality of spending resources.

Relative intensity values ​​are indicators that determine the prevalence of a given phenomenon in any environment. They are calculated as the ratio of the absolute value of a given phenomenon to the size of the environment in which it develops. Relative intensity values ​​are widely used in the practice of statistics. An example of this value can be the ratio of the population to the area on which it lives, capital productivity, the provision of the population with medical care (the number of doctors per 10,000 population), the level of labor productivity (output per worker or per unit of working time), etc.

Thus, the relative values ​​of intensity characterize the efficiency of the use of various kinds of resources (material, financial, labor), the social and cultural standard of living of the country's population, and many other aspects of public life.

Relative intensity values ​​are calculated by comparing opposite absolute values ​​that are in a certain relationship with each other, and unlike other types of relative values, they are usually named numbers and have the dimension of those absolute values ​​whose ratio they express. However, in some cases, when the calculated results are too small, they are multiplied for clarity by 1000 or 10,000, obtaining characteristics in ppm and decimille.

In the statistical study of social phenomena, absolute and relative values ​​complement each other. If absolute values ​​characterize, as it were, the statics of phenomena, then relative values ​​make it possible to study the degree, dynamics, and intensity of the development of phenomena. For the correct application and use of absolute and relative values ​​in economic and statistical analysis, it is necessary:

Take into account the specifics of phenomena when choosing and calculating one or another type of absolute and relative values ​​(since the quantitative side of the phenomena characterized by these values ​​is inextricably linked with their qualitative side);

To ensure the comparability of the compared and the basic absolute value in terms of the volume and composition of the phenomena they represent, the correctness of the methods for obtaining the absolute values ​​themselves;

It is complex to use relative and absolute values ​​in the analysis process and not to separate them from each other (because the use of relative values ​​alone in isolation from absolute ones can lead to inaccurate and even erroneous conclusions).

Absolute values are the results of statistical observations. In statistics, unlike mathematics, all absolute values ​​have a dimension (a unit of measurement), and can also be positive and negative.

Units absolute values ​​reflect the properties of units of the statistical population and can be simple, reflecting 1 property (for example, the mass of cargo is measured in tons) or complex, reflecting several interrelated properties (for example, ton-kilometer or kilowatt-hour).

Units absolute values ​​can be 3 types:

  1. natural- are used to calculate quantities with homogeneous properties (for example, pieces, tons, meters, etc.). Their disadvantage is that they do not allow summing dissimilar quantities.
  2. Conditionally natural- apply to absolute values ​​with homogeneous properties, but exhibiting them in different ways. For example, the total mass of energy carriers (firewood, peat, coal, oil products, natural gas) is measured in toe. - tons of reference fuel, since each of its types has a different calorific value, and 29.3 mJ / kg is taken as the standard. Similarly total amount school notebooks is measured in us.sh.t. - conditional school notebooks 12 sheets in size. Similarly, canning products are measured in a.c.b. - conditional cans with a capacity of 1/3 liter. Similarly, the production of detergents is reduced to a conditional fat content of 40%.
  3. Cost units of measurement are expressed in rubles or in another currency, representing a measure of the value of an absolute value. They make it possible to summarize even heterogeneous values, but their disadvantage is that it is necessary to take into account the inflation factor, so statistics always recalculates cost values ​​in comparable prices.

Absolute values ​​can be momentary or interval. Momentary absolute values ​​show the level of the studied phenomenon or process at a certain point in time or date (for example, the amount of money in your pocket or the value of fixed assets on the first day of the month). Interval absolute values ​​are the final accumulated result for a certain period (interval) of time (for example, salary for a month, quarter or year). Interval absolute values, unlike moment ones, allow subsequent summation.

The absolute statistic is denoted X, and their total number in the statistical population is N.

The number of quantities with the same feature value is denoted f and called frequency(recurrence, occurrence).

By themselves, absolute statistical values ​​do not give a complete picture of the phenomenon under study, since they do not show its dynamics, structure, and the relationship between parts. For these purposes, relative statistical values ​​are used.

The concept and types of relative values

Relative statistic is the result of the ratio of two absolute statistical values.

If absolute values ​​with the same dimension are related, then the resulting relative value will be dimensionless (the dimension will be reduced) and is called coefficient.

Often applied artificial dimension of coefficients. It is obtained by multiplying them:

  • for 100 - receive interest (%);
  • per 1000 - receive ppm (‰);
  • per 10000 - receive decimille(‰O).

The artificial dimension of the coefficients is used, as a rule, in colloquial speech and when formulating the results, but in the calculations themselves, it is not used. Most often, percentages are used, in which it is customary to express the obtained values ​​of relative values.

More often instead of the name relative statistic a shorter synonym is used - index(from lat. index- indicator, coefficient).

Depending on the types of correlated absolute values, when calculating relative values, different types of indices: dynamics, plan task, plan fulfillment, structure, coordination, comparison, intensity.

Dynamic index

Dynamic index(growth factor, growth rate) shows how many times the studied phenomenon or process has changed over time. It is calculated as the ratio of the value of the absolute value in the reporting (analyzed) period or point in time to the base (previous):

The criterion value of the index of dynamics is "1", that is: if iД>1 - there is an increase in the phenomenon in time; if iД =1 - stability; if iD

If we subtract its criterion value "1" from the dynamics index and express the resulting value as a percentage, then we get with the criterion value "1":

If T>0, then the growth of the phenomenon takes place; T=0 - stability, T In some textbooks, the dynamics index is called growth factor or growth rategrowth rate, regardless of the result obtained, which can show not only growth, but also stability or decline. Therefore, the more logical and more commonly used names are precisely And .

For example, a car dealership sold 100 cars in January and 110 cars in February. Then the dynamics index will be iD = 110/100 = 1.1, which means an increase in car sales by a car dealership by 1.1 times or 10%

Scheduled Job Index

Scheduled Job Index is the ratio of the planned value of the absolute value to the base value:

For example, a car dealership sold 100 cars in January and planned to sell 120 cars in February. Then the target target index will be ipz = 120/100 = 1.2, which means planning for sales growth of 1.2 times or 20%

Plan execution index

Plan execution index is the ratio of the actually obtained value of the absolute value in reporting period to the planned

For example, a car dealership sold 110 cars in February when it was scheduled to sell 120 cars in February. Then the plan execution index will be ivp = 110/120 = 0.917, which means the plan is fulfilled by 91.7%, that is, the plan is underfulfilled by (100% -91.7%) = 8.3%.

Multiplying the indices of the planned task and the execution of the plan, we obtain the dynamics index:

In the previously discussed example about a car dealership, if we multiply the obtained values ​​of the indices of the planned target and the execution of the plan, we will get the value of the dynamics index: 1.2 * 0.917 = 1.1.

Structure index

Structure index(share, share) is the ratio of any part of the statistical population to the sum of all its parts:

The structure index shows what proportion is a separate part of the population from the entire population.

For example, if there are 20 girls and 10 young people in the considered group of students, then the structuration index (share) of girls will be 20/(20+10) = 0.667, that is, the share of girls in the group is 66.7%.

Coordination index

Coordination index- this is the ratio of one part of the statistical population to its other part, taken as the basis for comparison:

The coordination index shows how many times more or how many percent is one part of the statistical population compared to the other part, taken as the basis for comparison.

For example, if in a group of students of 20 girls and 10 young people, the number of girls is taken as the comparison base, then the index of coordination of the number of young people will be 10/20 = 0.5, that is, the number of young people is 50% of the number of girls in the group.

Comparison Index

Comparison Index- this is the ratio of the values ​​of the same absolute value in the same period or point in time, but for different objects or territories:

Where A, B - signs of compared objects or territories.

For example, in January 2009, the number of inhabitants in Nizhny Novgorod was approximately 1280 thousand people, and in Moscow - 10527 thousand people. We will take Moscow as object A (since it is customary to put a larger number in the numerator when calculating the comparison index), and Nizhny Novgorod- for object B, then the index of comparison of the number of inhabitants of these cities will be 10527/1280 = 8.22 times, that is, in Moscow the number of inhabitants is 8.22 times more than in Nizhny Novgorod.

Intensity index

Intensity index- this is the ratio of the values ​​of two interconnected absolute quantities with different dimensions, related to the same object or phenomenon.

For example, a bakery shop sold 500 loaves of bread and earned 10,000 rubles from it, then the intensity index would be 10,000/500 = 20 [rubles/loaf of bread], that is, the selling price of bread was 20 rubles. for a loaf

Most fractional quantities are intensity indices.

  • 4. The role of statistical observation. Organizational forms of statistical observation: reporting and specially organized statistical observation.
  • 5. Types of statistical observation (on the basis of time, completeness of coverage of population units).
  • 6. Main stages of statistical observation data processing: grouping and summary. Their relationship.
  • 7. Tasks and meaning of the summary. Statistical indicators as a summary tool.
  • 8. Statistical tables. Their meaning. Types of tables. The order of registration of statistical tables.
  • 9. The concept of statistical graphics. The role of graphic representation in statistics. Elements of a statistical graph of the rules for its construction. The main types of graphic images.
  • 10. The concept of absolute statistical values. Types of absolute values, their meaning. Units of measurement of absolute values.
  • 11. The concept of relative statistical values. Types of relative values. Ways of their calculation and forms of expression.
  • 12. Averages as typical characteristics of a population unit. Power averages.
  • 13. Arithmetic and chronological average. Rules for choosing the middle form.
  • 14. Structural averages.
  • 15. Variation as an integral feature of aggregates.
  • 16. Indicators of the size of the variation: range, mean linear deviation, variance and standard deviation, coefficient of variation.
  • 17. Selective observation as the main type of non-continuous observation.
  • 18. The concept of interrelated features as a subject of statistical study of communication. Problems of statistical study of communication.
  • 19. Regression equation as a form of analytical expression of statistical relationship. Calculation of the parameters of the regression equation and interpretation.
  • 20. Statistical characteristics of the closeness of connection: empirical correlation ratio, linear correlation ratio.
  • 21. Concept and classification of series of dynamics.
  • 22. Rules for constructing a series of dynamics.
  • 23. Analytical indicators of dynamics: indicators of the level of absolute and relative growth, the absolute content of 1% growth.
  • 24. Dynamic averages, their distinctive abilities. Rising dynamic averages.
  • 25. The main trend of the series (trend) and methods for its detection. The concept of dynamic series alignment, alignment methods.
  • 26. The concept of indices. The value of indices in the analysis of socio-economic phenomena.
  • 27. Individual indices.
  • 28. Aggregate index.
  • 29. Indices of average values ​​(index of variable composition, index of constant composition, index of structural shifts). Their relationship, order of construction, socio-economic meaning.
  • 30. Using the index method in economic analysis.
  • 10. The concept of absolute statistical values. Types of absolute values, their meaning. Units of measurement of absolute values.

    Statistical data obtained during observation, as a result of a summary, grouping, are almost always absolute values, that is, values ​​that are expressed in physical units and obtained as a result of counting or direct measurement. Absolute values ​​reflect the number of units of the studied populations, the sizes or levels of traits registered in individual units of the population, and the total amount of a quantitatively expressed trait as a result of summing up all its individual values.

    Absolute values ​​are of great cognitive importance.

    Absolute values ​​express the dimensions (levels, volumes) of socio-economic phenomena and processes, they are obtained as a result of statistical observation and summaries of initial information. Absolute values ​​are used in the practice of trade, used in the analysis and forecasting of commercial activities. Based on these values, business contracts are drawn up in commercial activities, the volume of demand for specific products is estimated, etc.

    Absolute values ​​measure all aspects of social life.

    Absolute values ​​according to the way of expressing the sizes of the studied processes are divided into: individual and total, they in turn belong to one of the types of generalizing quantities. The sizes of quantitative features for each statistical unit characterize individual absolute values, and they are also the basis for a statistical summary for connecting individual units of a statistical object into groups. On their basis, absolute values ​​are obtained, in which it is possible to distinguish indicators of the volume of signs of the population and indicators of the population size. If we study the development of trade and its condition in a certain area, then a certain number of firms can be attributed to individual values, and the volume of trade and the number of employees working in the firm are classified as total.

    Absolute values ​​are economically simple (the number of stores, employees) and economically complex (the volume of trade, the size of fixed assets).

    Absolute values- always named numbers, have a certain dimension, units of measurement. In statistical science, natural, monetary (value) and labor units of measurement are used.

    Units of measurement are called natural if they correspond to the consumer or natural properties of an object, product and are expressed in physical weights, measures of length, etc. In statistical practice, natural units of measurement can be composite. Conditionally natural units of measure are used when summing up the number of dissimilar goods, products.

    11. The concept of relative statistical values. Types of relative values. Ways of their calculation and forms of expression.

    The relative statistic is the ratio of two absolute values ​​and, if the latter are homogeneous, having the same dimension, then the relative value is dimensionless, taking the status of a coefficient. For example, capital productivity (turnover) as the ratio of the cost of output to the value of fixed assets is a coefficient.

    The most common is the relative value, coefficient or index of dynamics, which characterizes the change in a phenomenon over time, representing the ratio of the values ​​of the same absolute value in different periods of time. I.e

    The criterion value of the dynamics index is one. If it is greater than it, there is an increase in the phenomenon; equal to one - stability; if it is less than unity, a decrease in the phenomenon is observed.

    Another name for the index of dynamics is the index of change, subtracting one from which the rate of change with a criterion value of zero is obtained. If it is greater than zero, there is an increase in the phenomenon; zero- stability; if less than zero, a decline is observed.

    In some textbooks on Statistics, the index of change is called the rate of growth, and the rate of change is called the rate of growth, regardless of the result obtained, which may show stability or decline.

    If the analyzed and base periods are not adjacent in the time series (for example, the year preceding the five-year period and its Last year), then the index of dynamics or change found by formula (1.1) will be general, therefore, the average index is additionally determined by the formula

    where t is the number of periods in the time series (for example, in a five-year period t = 5).

    As with the general index, the criterion value for the average index is one with the same conclusions about the nature of the change. By subtracting from the average index, the units obtain the average rate of change with a criterion value of zero and similar conclusions about the nature of the change in the phenomenon.

    In production, relative values, coefficients or indices of the planned task and the implementation of the plan are used. The first is defined as the ratio of the values ​​of the same absolute value according to the plan of the analyzed period and in fact the base one. I.e

    where X'1 - plan of the analyzed period; X0 - fact of the base period.

    The plan execution index is the ratio of the values ​​of the same absolute value in fact and according to the plan of the analyzed period, determined by the formula

    Multiplying the indices of the planned task and the execution of the plan, we obtain the dynamics index. I.e

    The relative value, coefficient or index of the structure is also widely used in the form of the ratio of any part of the absolute value to its entire value. In essence, this is the share mentioned above, specific gravity, frequency, determined by the formula

    For example, if the number of females (fws) in a group of students is divided by the size of the entire group, then the fsw structure index will be obtained.

    Similar is the relative value, coefficient or index of coordination as the ratio of any part of the absolute value to its other part, taken as a basis. Determined by the formula

    For example, if we take as a basis the number of LSP in a group of students and divide by this number the number of males (LMP) in it, then we get the LMP coordination index relative to the LBP.

    The next is the relative value, coefficient or index of comparison in the form of the ratio of the values ​​of the same absolute value in one period or point in time, but for different objects or territories. Determined by the formula

    where A, B are features of the compared objects or territories.

    Another type of relative comparison values ​​is obtained by comparing the dynamics indices different phenomena. As a result, indexes of advance or lag in the development of one phenomenon in comparison with another are formed. So, if at the enterprise labor productivity increased by 12%, and the average salary only by 7.5%, then the growth in labor productivity outstrips the growth in wages by the index of change by 112/107.5=1.042 or by 4.2%, and in terms of the rate changes by 12/7.5=1.6 or 60%. These are the corresponding lead indexes. The index of wage growth lagging behind labor productivity growth will be the reciprocal.

    The listed indices are dimensionless relative values, and the indicator having dimension is the relative value of intensity in the form of the ratio of the values ​​of two heterogeneous absolute values ​​for one period of time and one territory or object. To determine it, the formula is used

    The indicators of intensity include the above-mentioned cost, price, energy intensity of products and other relative values ​​with a fractional dimension.