1 / 27

GODFREY HODGSON HOLMES TARCA

GODFREY HODGSON HOLMES TARCA. CHAPTER 5 MEASUREMENT THEORY. Importance of measurement. Campbell: The assignment of numerals to represent properties of material systems other than numbers. Assignment of numerals to objects or events according to rules. ( Stevens).

cwoodward
Download Presentation

GODFREY HODGSON HOLMES TARCA

An Image/Link below is provided (as is) to download presentation Download Policy: Content on the Website is provided to you AS IS for your information and personal use and may not be sold / licensed / shared on other websites without getting consent from its author. Content is provided to you AS IS for your information and personal use only. Download presentation by click this link. While downloading, if for some reason you are not able to download a presentation, the publisher may have deleted the file from their server. During download, if you can't get a presentation, the file might be deleted by the publisher.

E N D

Presentation Transcript

  1. GODFREYHODGSONHOLMESTARCA CHAPTER 5 MEASUREMENT THEORY

  2. Importance of measurement Campbell: The assignment of numerals to represent properties of material systems other than numbers Assignment of numerals to objects or events according to rules. (Stevens)

  3. Importance of measurement • Involves linking the formal number system to some property of objects or events by means of semantic rules • e.g. semantic rules in accounting are represented by transactions • In accounting we measure profit by: • first assigning a value to capital • then calculating profit as the change in capital over the period

  4. Scales • Every measurement is made on a scale • Created when a semantic rule is used to relate the mathematical statement to objects or events • The scale shows what information the numbers represent

  5. Nominal scale • In this scale, numbers used only as labels • Numbers represent classification • e.g. numbering footballers • e.g. the classification of assets and liabilities into different classes

  6. Ordinal scale • In this scale, rank orders objects with respect to a given property • e.g. tallest to shortest person • e.g. investment alternatives that are ranked 1, 2, 3 according to the size of their net present values • Intervals between the numbers are not necessarily equal

  7. Interval scale • In this scale, rank orders objects with respect to a given property • The distance between each interval is equal and known • An arbitrarily selected zero point exists on the scale • e.g. celsius temperature scale • e.g. standard cost accounting

  8. Ratio scale • In this scale, rank orders objects with respect to a given property • Intervals between objects are known and equal • A unique origin exists • e.g. measurement of length • e.g. use of dollars to measure assets and liabilities

  9. Permissible operations of scales • Invariance of a scale means that the measurement system will provide the same general form of the variables, and the decision maker will make the same decisions • This is not the case in accounting – there is more than one accounting system • The information they provide will differ and different decisions will be made

  10. Permissible operations of scales • Nominal and ordinal scales • no arithmetic operations • Interval scale • addition and subtraction • Ratio scale • all arithmetic operations

  11. Types of measurement • There must be a rule to assign numbers before there can be measurement • The formulation of the rules gives rise to a scale • Measurement can be made only on a scale

  12. Fundamental measurements • Numbers are assigned by reference to natural laws • Fundamental properties are additive • e.g. length, number and volume • In accounting there is considerable debate over the nature of fundamental value

  13. Derived measurements • Is one that depends on the measurement of two or more other quantities • Depends on known relationships to fundamental properties • e.g. the measurement of density depends on the measurement of both mass and volume • e.g. the measurement of profit depends on the measurement of both income and expenses

  14. Fiat measurements • Typical in social sciences including accounting • Based on arbitrary definitions - e.g. of profit • Numerous ways in which scales can be constructed • May lead to poor levels of confidence in the scale – e.g. there are hundreds of ways to measure profit

  15. Reliability and accuracy • No measurement is free of error except counting • e.g. we can count the chairs in a room and be exactly correct

  16. Sources of error The sources of error include the following: • Measurement operations stated imprecisely • Measurer • Instrument • Environment • Attribute unclear • Risk and uncertainty We need to establish limits of acceptable error

  17. Reliable measurement • What is reliable measurement? • proven consistency • repeatable or reproducible • precision • Reliability incorporates two aspects • accuracy and certainty of measurement • representative faithfulness

  18. Accurate measurement • Consistency of results, precision and reliability do not necessarily lead to accuracy • Accuracy has to do with how close the measurement is to the ‘true value’ of the attribute measure - representation • ‘True value’ may not be known • e.g. in accounting accuracy relates to the pragmatic notion of usefulness

  19. Accurate measurement • Many accounting measurements are on a ratio scale • This is the most informative scale • Weakest theoretical foundation as they are fiat measurements

  20. Measurement in accounting • Two fundamental measures • capital & profit • Capital and profit can be defined & derived in various ways • Concepts of capital & profit have changed over time • number of concepts of fundamental measurement

  21. Measurement in accounting • Two notable developments in international standards (2005, IASB) • profit measurement and revenue recognition should be linked to timely recognition • the fair value approach should be adopted as the working measurement principle At no stage has the principle of capital maintenance been explicitly discussed

  22. Measurement issues for auditors • The focus of profit measurement has shifted from matching revenues and expenses to assessing the changes in the fair value of net assets • e.g. immediate recognition of impairment losses

  23. Measurement issues for auditors • Auditors must determine whether management has made appropriate and reasonable valuations • e.g. at least 12 methods of valuing intangibles

  24. Measurement issues for auditors • It is possible for several different but reasonable measurements and impairment losses to be recognised by management • These would all be acceptable to an auditor if management have • applied the valuation models correctly • used appropriate data • made appropriate assumptions • acted in a consistent manner

  25. Summary • Measurement involves the formal linking of numbers to some property or event via semantic rules • Rules used to assign numbers are determined according to four scales • Invariance of a scale means the measurement system will provide the same general form of the variables and the decision maker will make the same decisions • There are three different types of measurement • Reliability refers to consistency, and accuracy refers to the representation of a fundamental value • The two fundamental measures in accounting are capital and profit and they are both derived measures • The existence of alternative valuation methods creates auditing issues

  26. Key terms and concepts • Measurement • Nominal scale • Ordinal scale • Interval scale • Ratio scale • Invariance of a scale • Fundamental measurements • Derived measurements • Fiat measurements • Reliability in measurement • Accuracy in measurement • Capital and profit as derived measurements • Appropriate measurement in an auditing context

More Related