Product Insights: The Sources of Uncertainty in Radiated Emissions Tests

Introduction

Radiated emissions tests are crucial for ensuring that electronic devices comply with electromagnetic compatibility (EMC) standards. However, several sources of uncertainty can affect the accuracy and reliability of these tests. These sources of uncertainty are described briefly in this article.

Measurement Equipment

Variations in the performance of antennas, receivers, and other test equipment can introduce uncertainty. Calibration and maintenance of these instruments are essential to minimize this uncertainty.

Test Environment

The physical environment where the test is conducted, such as an anechoic chamber or open area test site, can impact results. Factors like reflections from nearby objects, ambient electromagnetic noise, and temperature fluctuations contribute to uncertainty.

Test Setup

The positioning and orientation of the device under test (DUT) and the test equipment can affect measurements. Consistency in setup is crucial to reduce variability.

Operator Skill

The experience and skill of the test operator can influence the outcome. Proper training and adherence to standardized procedures help mitigate this source of uncertainty.

Device Variability

Differences in the equipment under test (EUT or DUT) itself, such as manufacturing tolerances and component variations, can lead to inconsistent emissions.

External Interference

Uncontrolled external electromagnetic interference from other devices or sources can affect the test results.

Uncertainty versus Error

Uncertainty is not the same as error. Uncertainty is the upper limit for expected measurement error (error < uncertainty), as shown in the figure below.

Measurement Uncertainty Budget

Professional test laboratories document the sources of uncertainty in their radiated emissions test setups in what is called an uncertainty budget. The data is usually input into a spreadsheet or other similar program, which not only helps keep things organized but also allows for easy computation of values. The measurement uncertainty budget includes a list of contributors or sources of uncertainty (as described above), measurement system repeatability, the value of uncertainty, the probability distribution (rectangular, normal, triangular, U-shaped, etc.), the divisor associated with the probability distribution, the result of dividing the value by the divisor (μ_i) – this is called the ”standard uncertainty” and it is uncertainty of an individual measurement result, expressed as a standard deviation, and the result of the division squared (μ_i^2).

All the m_i’s are root-sum-squared to obtain a “combined standard uncertainty” (μ_c). This is the uncertainty that results from combining all individual uncertainties (μ_i’s).

An “expanded uncertainty” (U) is then calculated using a coverage factor (k), which is typically set equal to 2. The result of the uncertainty calculation is reported in terms of a confidence interval.

If you’re already familiar with the normal distribution and standard deviations, then the coverage factor (k) is the same as the Z-score. A Z-score of 2 means there is a 95.45% probability that the true value obtained lies within the limits. In the metrology world, since calculating measurement uncertainty is just an estimate anyway, we just round down to 95% when we specify k = 2. U = k * μ_c.

Here are some other values for k:

• k = 2 results in a 95% (or more precisely 95.45%) confidence interval
• k = 2.6 results in a 99% confidence interval
• k = 3 results in a 99.7 % confidence interval

Side Note: The most useful distributions in uncertainty analysis

From personal experience, the two distributions listed below are the most widely used in measurement uncertainty analysis:

Note: Probability density refers to the shape of the distribution or, more precisely, the change in probability as we move away from the mean value. With a normal distribution, the probability decreases with deviation from the mean, while with a uniform distribution, the probability remains constant up to the limit, where it sharply falls to zero.

Expanded uncertainty (U) Visualized

Here is what the expanded uncertainty (U) looks like with the coverage factor k included:

Expanded uncertainty (U): Often written with ± sign in front so it takes the same form as a tolerance or specification. Use divisor k to yield a quantity expressed as equal to one standard deviation (μ_c  = U / k).

Measurement Uncertainty Notes Section

Some say that the most important part of the uncertainty budget is the notes section. This is where you document your thought process and how you made the decision to include or exclude certain sources of uncertainty. If you’re going through an audit, the assessor will likely ask you about how you developed your uncertainty budget and the notes section is a good way to remind yourself why you decided to do certain things the way that you did.

Measurement Uncertainty Training

Figuring out all the sources of uncertainty and then calculating the total measurement uncertainty for any type of measurement is a complex topic, too deep to fully cover in this brief article. If you’re interested in learning more, the following entities provide some excellent in-depth training:

Rick Hogan at https://www.isobudgets.com/ (highly recommended)

HN Metrology Consulting, Inc. https://www.hn-metrology.com/

A2LA Workplace Training https://a2lawpt.org/training?gad_source=1

Quametec^TM  Institute of Measurement Technology https://www.qimtonline.com/

See also the references and further reading for more information.

Summary

Understanding and controlling sources of uncertainty is vital for obtaining reliable and repeatable results in radiated emissions testing. Calculating measurement uncertainty is an important skill that most compliance professionals should carefully consider adding to your bag of tricks.

References and Further Reading

1. Williams, T., EMC for Product Designers, 5^th Edition, Newnes, 2017.
2. Calibration: Philosophy in Practice by Fluke Corporation.
3. Certified Calibration Technician Primer by Quality Council of Indiana.
4. Measurement Uncertainty Analysis Fundamentals by James D. Jenkins.
5. The Metrology Handbook, 2nd or 3^rd