Reflection Accuracy on Low-Loss 2-Port Devices


To make accurate reflection measurements that have a 1-port calibration, you should terminate the unmeasured port.

Other topics about Optimizing Measurements

Why Terminate the Unmeasured Port

A 2-port calibration corrects for all 12 twelve error terms. A 1-port calibration corrects for directivity, source match and frequency response, but not load match. Therefore, for highest accuracy, you must make the load match error as small as possible. This especially applies for low-loss, bi-directional devices such as filter passbands and cables. You do not need to be concerned with load match when you are measuring a device with high reverse isolation, such as an amplifier.

How to Terminate the Unmeasured Port

Use one of the following methods:

Resulting Measurement Uncertainty

The following graph illustrates the measurement uncertainty that results from terminating with and without a precision 10 dB attenuator on the output of the test device.

 

 

 

 

 

 

Legend

 


Filter Reflection

-------------

Uncertainty with attenuator

................

Uncertainty without attenuator

 

The calculations below show how adding a high-quality 10 dB attenuator improves the load match of the analyzer.

Note: The corresponding linear value is shown in parentheses.

Network Analyzer:

 

Load match (NALM)

 = 18 dB (.126)

Directivity (NAD)

 = 40 db (.010)

Filter:

 

Insertion loss (FIL)

 = 1dB (.891)

Return loss (FRL)

 = 16 dB (.158)

Attenuator:

 

Insertion loss (AIL)

 = 10 dB (.316)

SWR (ASWR)

 = 1.05 (.024)
32.26 dB Return Loss


Calculations:

 

Without Attenuator

With Attenuator

rNA

 

= (FIL)*(NALM)*(FIL)
= (.891)*(.126)*(.891)

=.100

= (FIL)*(AIL)*(NALM)*(AIL)*(FIL)
= (.891)*(.316)*(.126)*(.316)*(.891)

= .010

rAttenuator

NA

= (FIL)*(ASWR)*(FIL)
= (.891)*(.024)*(.891)
= .019

Worst Case Error (EWC)

= rNA
=.1

= rNA + rAttn.
=.01+.019
=.029

Uncertainty Adds

= -20log(FRL)+(EWC)+(NAD)
= -20log
(.158)+(.100)+(.010)
=
11.4 dB

= -20log(FRL)+(EWC)+(NAD)
= -20log
(.158)+(.029)+(.010)
=
14.1 dB

Uncertainty Subtracts

= -20log(FRL)-(EWC)-(NAD)
=-20log(.158)-(.100)-(.010)

= 26.4 dB

= -20log(FRL)-(EWC)-(NAD)
= -20log
(.158)-(.029)-(.010)
=
18.5 dB