1. types of measurements 37

MEASUREMENT THEORY FUNDAMENTALS. 361-1-3151

Eugene Paperno, 2006 ©

MEASUREMENT THEORY FUNDAMENTALS

361-1-3151

Eugene Papernohttp://www.ee.bgu.ac.il/~paperno/

MEASUREMENT THEORY FUNDAMENTALS. Recommended literature

Recommended literature[1] K. B. Klaassen, Electronic measurement and instrumentation, Cambridge University Press, 1996.

[2] H. O. Ott, Noise reduction techniques in electronic systems, second edition, John Wiley & Sons, 1988.

[3] P. Horowitz and W. Hill, The art of electronics, Second Edition, Cambridge University Press, 1989.

[4] R. B. Northrop, Introduction to instrumentation and measurements, second edition, CRC Press,2005.

[5] D. A. Jones and K. Martin, Analog integrated circuit design, John Wiley & Sons, 1997.

[6] A. B. Carlson, Communication systems: an introduction to signals and noise in electrical communication, McGraw-Hill, 2004.

[7] W. M. Leach, Jr., “Fundamentals of low-noise analog circuit design,” Proc. IEEE, vol. 82, pp. 1514–1538, 1994.

[8] Y. Netzer, “The design of low-noise amplifiers,” Proc. IEEE, vol. 69, pp. 728–741, 1981.

[9] C. D. Motchenbacher and J. A. Connelly, Low-noise electronic system design, John Wiley & Sons, 1993.

[10] L. Cohen, “The history of noise: on the 100th anniversary of its birth,” IEEE Signal Processing Magazine, vol. 20, 2005.

[11] National Instruments, Inc., www.ni.com

[12] IEEE Transactions on Instrumentation and Measurements.

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CONTENTS1. Basic principles of measurements

1.1. Definition of measurement1.2. Definition of instrumentation 1.3. Why measuring?1.4. Types of measurements1.5. Scaling of measurement results

2. Measurement of physical quantities2.1. Acquisition of information2.2. Units, systems of units, standards

2.2.1. Units2.2.1. Systems of units2.2.1. Standards

2.3. Primary standards2.3.1. Primary voltage standards2.3.2. Primary current standards2.3.3. Primary resistance standards2.3.4. Primary capacitance standards

MEASUREMENT THEORY FUNDAMENTALS. Contents

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2.3.5. Primary inductance standards2.3.6. Primary frequency standards2.3.7. Primary temperature standards

3. Measurement methods3.1. Deflection, difference, and null methods3.2. Interchange method and substitution method 3.3. Compensation method and bridge method3.4. Analogy method 3.5. Repetition method

4. Measurement errors4.1. Systematic errors

4.2. Random errors

4.2.1. Uncertainty and inaccuracy4.2.2. Crest factor

4.3. Error sensitivity analysis4.2.1. Systematic errors4.2.1. Random errors


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5. Sources of errors5.1. Impedance matching

5.4.1. Anenergetic matching5.4.2. Energic matching5.4.3. Non-reflective matching5.4.4. To match or not to match?

5.2. Noise types 5.2.1. Thermal noise5.2.2. Shot noise5.2.3. 1/f noise

5.3. Noise characteristics

5.3.1. Signal-to-noise ratio, SNR5.3.2. Noise factor, F, and noise figure, NF5.3.3. Calculating SNR and input noise voltage from NF

5.3.4. VnIn noise model

5.4. Noise matching5.4.1. Optimum source resistance5.4.2. Methods for the increasing of SNR

5.4.3. SNR of cascaded noisy amplifiers


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5.5. Fundamentals of low-noise design5.5.1. Junction-diode noise model5.5.2. BJT noise model5.5.3. JFET noise model 5.5.4. MOSFET noise model5.5.5. Frequency response effect5.5.6. Comparison of the BJT, JFET, and MOSFET5.5.7. Example circuit: noise analysis of a CE amplifier

5.6. Disturbances: interference noise5.6.1. Reduction of the influence of disturbances5.6.2. Sources of disturbances

5.7 Observer influence: matching6. Measurement system characteristics

6.1. General structure of a measurement system 6.2. Measurement system characteristics

6.2.1. Sensitivity6.2.2. Sensitivity threshold 6.2.3. Resolution

6.2.4. Inaccuracy, accuracy, and precision


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Lectures:

1. Types of measurements2. Units, system of units,

standards3. Measurement methods4. Measurement errors5. Impedance matching6. Types of noise7. Noise characteristics8. Low-noise design: noise

matching9. Low-noise design: noise

matching10. Low-noise design:

examples11. Low-noise design:

examples12. Disturbances: interference

noise13. Measurement system

characteristics


8MEASUREMENT THEORY FUNDAMENTALS. Grading policy

GRADING POLICY100% exam

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1. BASIC PRINCIPLES OF MEASUREMENTS

1.1. Definition of measurement

Measurement is the acquisition of information about a state or phenomenon (object of measurement)

in the world around us.

This means that a measurement must be descriptivewith regard to that state or object we are measuring:

there must be a relationship between the object of measurement and the measurement result.

The descriptiveness is necessary but not sufficient aspect of measurement: when one reads a book, one

gathers information, but does not perform a measurement.

1 .BASIC PRINCIPLES OF MEASUREMENTS. 1.1. Definition of measurement

Reference: [1]

10

This aspect too is a necessary but not sufficient aspect of measurement. Admiring a painting inside an otherwise empty room will provide information about only the painting, but does not constitute a measurement.

A third and sufficient aspect of measurement is that it must be objective. The outcome of measurement must be independent of an arbitrary observer.


A second aspect of measurement is that it must be selective:it may only provide information about what we wish to

measure (the measurand) and not about any other of the many states or phenomena around us.

Reference: [1]

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Image space

Abstract ,well-definedsymbols

In accordance with the three above aspects: descriptiveness, selectivity, and objectiveness, a measurement can be described as the mapping of elements from an empirical source set

with the help of a particular transformation (measurement model).

Empirical space

Source set S

si

States ,phenomena


Source set and image set are isomorphic if the transformation does copy the source set structure (relationship between the elements).

Reference: [1]

onto elements of an abstract image set

אבסטרקטי מרחב

Image set I

ii

Transformation

מרחב אמפירי

12

Image space

Example: Measurement as mapping

Empirical space

State (phenomenon):Static magnetic field

VR

Instrumentation

Abstract symbolTransformation

B= f (R, V )

Measurement model


מרחב אמפירי אבסטרקטי מרחב

13

The field of designing measurement instruments and systems is called instrumentation.

Instrumentation systems must guarantee the required descriptiveness, the selectivity, and the objectivity of the measurement.

1.2. Definition of instrumentation

1 .BASIC PRINCIPLES OF MEASUREMENTS. 1.2. Definition of instrumentation

In order to guarantee the objectivity of a measurement, we must use artifacts (tools or instruments). The task of these instruments is to convert the state or phenomenon into a different state or phenomenon that cannot be misinterpreted by an observer.

Reference: [1]

141 .BASIC PRINCIPLES OF MEASUREMENTS. 1.3. Why measuring?

1.3. Why measuring?

Let us define ‘pure’ science as science that has sole purpose of describing the world around us and therefore is responsible for our perception of the world.

In ‘pure’ science, we can form a better, more coherent, and objective picture of the world, based on the information measurement provides. In other words, the information allows us to create models of (parts of) the world and formulate laws and theorems.

We must then determine (again) by measuring whether this models, hypotheses, theorems, and laws are a valid representation of the world. This is done by performing tests (measurements) to compare the theory with reality.

Reference: [1]

15

2) perform measurement;

3) alter the pressure if it was abnormal.

We consider ‘applied’ science as science intended to change the world: it uses the methods, laws, and theorems of ‘pure’ science to modify the world around us.


In this context, the purpose of measurements is to regulate, control, or alter the surrounding world, directly or indirectly.

The results of this regulating control can then be tested and compared to the desired results and any further corrections can be made.

Even a relatively simple measurement such as checking the tire pressure can be described in the above terms:

1) a hypothesis: we fear that the tire pressure is abnormal;

Reference: [1]

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REAL WORLDempirical statesphenomena, etc.

IMAGEabstract numbers

symbols, labels, etc.

SCIENCE

)processing, interpretation(measurement results

PureApplied


Measurement

Verification (measurement)Control/change

Control/change

Hypotheses laws

theories

Illustration: Measurement in pure and applied science

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These five characteristics are used to determine the five types (levels) of measurements.

Distinctiveness: A B, A B.

Ordering in magnitude: A B, A B, A B.

Equal/unequal intervals: ABCD,ABCDABCD.

Ratio: A kB(absolute zero is required).

Absolute magnitude: A ka REF, B kb REF (absolute reference or unit is required).

1 .BASIC PRINCIPLES OF MEASUREMENTS. 1.4. Types of measurements

1.4. Types of measurements

To represent a state, we would like our measurements to have some of the following characteristics.

Reference: [1]

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States are only namedNOMINAL

1 .BASIC PRINCIPLES OF MEASUREMENTS. 1.4. Types of measurements

States can be orderedORDINAL

Distance is meaningfulINTERVAL

Abs. zeroRATIO

Abs. unitABSOLUTE

Illustration: Levels of measurements (S. S. Stevens, 1946)

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The types of scales reflect the types of measurements:

1. nominal scale,

2. ordinal scale,

3. interval scale,

4. ratio scale,

5. absolute scale.

1.5. Scaling of measurement results

1 .BASIC PRINCIPLES OF MEASUREMENTS. 1.5. Scaling of measurement results

A scale is an organized set of measurements, all of which measure one property.


A scale is not always unique; it can be changed without loss of isomorphism.

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Image1

1 1

0 0

State orthogonality

1. Nominal scale


Examples:

numbering of

football

players,

detection

and alarm

systems,

etc.

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1 1

0 0

Image2=(Image1+1)State orthogonality

1. Nominal scale


Examples:

numbering of

football

players,

detection

and alarm

systems,

etc.

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Image3=Cos(Image2)

1 1

1 1

State orthogonality

1. Nominal scale


Examples:

numbering of

football

players,

detection

and alarm

systems,

etc.

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1 1

1 1

Image4=Image32

2 2

2 2

State orthogonality

1. Nominal scale


Examples:

numbering of

football

players,

detection

and alarm

systems,

etc.

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2 2

2 2

Image5=Cos(Image4)

1 1

1 1

State orthogonality

1. Nominal scale


The structure is lost!

Any one-to-one transformation can be used to change the scale.

Examples:

numbering of

football

players,

detection

and alarm

systems,

etc.

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A 11

A 21

A 21

A 12

Image1


State order

2. Ordinal scale

Examples:

IQ test,

competition

results,

etc.

10

0

10

0

27

A 11

A 21

A 21

A 12

A 11

A 41

A 41

A 14


State order

2. Ordinal scale

Image2 Image12

Examples:

IQ test,

competition

results,

etc.

10

0

10

0

28

A 11

A 41

A 41

A 14

A 11

A 41

A 41

A 14


State order

2. Ordinal scale

Image3 Image2

The structure is lost!

Any monotonically increasing transformation, either linear or nonlinear, can be used to change the scale.

Examples:

IQ test,

competition

results,

etc.

10

0

10

0

29

Image1

A 44

A0

A 67

A1

A 84

A4

A 54

A1


State interval

Interval scale

Examples:

time scales,

temperature

scales, etc.,

where the

origin or zero

is not fixed

(floating).

10

0

10

0

30

A 44

A0

A 67

A1

A 84

A4

A 54

A1


State interval

Interval scale

Image210Image12

A 4242

A0

A 6272

A10

A 8242

A40

A 5242

A10

Any increasing linear transformation can be used to change the scale.

Examples:

time scales,

temperature

scales, etc.,

where the

origin or zero

is not fixed

(floating).

10

0

10

0

31

Image1

A 44

A1

A 67

A6/7

A 84

A2

A 54

A5/4


State ratio

4. Ratio scale

Examples:

measurement

of any physical

quantities

having fixed

(absolute)

origin.

10

0

10

0

32

A 44

A1

A 67

A6/7

A 84

A2

A 54

A5/4


State ratio

4. Ratio scale

Image210Image1

The only transformation that can be used to change the scale is the multiplication by any positive real number.

A 4040

A1

A 6070

A6/7

A 8040

A2

A 5040

A5/4

Examples:

measurement

of any physical

quantities

having fixed

(absolute)

origin.

10

0

10

0

33

Image

A 1

A 3/2

A 2

A 5/4


State absolute value

5. Absolute scale

Examples:

measurement

of any physical

quantities by

comparison

against an

absolute unit

(reference).

Ref . Ref .

Ref . Ref .

No transformation can be used to change the scale

10

0

10

0

1. types of measurements 37

Documents

noise matching5

noise types

noise design5

noise figure

noise factor

noise amplifiers

noise ratio

noise analys