Here's what I really mean:
I am using test scripts on groups of devices looking different 'soft-failure' type conditions.
For example: Test a group of radios for signal strength on different frequencies.
I want to find the test condition (frequency in my example) that yields the best result
for all devices (radios).
I'm having trouble clearly identifying a mathematical model for this.
Please tell me I'm overthinking this and there's some obvious method I'm missing!
At first glance, you might think I just want the average, but that's not really any good. 7 out of 8 radios might have great signal strength on one frequency, but the last radio may not work well. This scenario may have a good average value, but doesn't measure the distribution of the values. The median value may be closer to what I need, but it still doesn't work.
The end goal is a metric that can be used to measure a group's results for how well the group's combined performance compares on each setting- Taking into account the distribution of the values. Does anyone know if this be done without using thresholds?
Random data example for 3 different frequencies (Higher values are better):
F1 F2 F3 Radio 1 -55 -65 -40 Radio 2 -60 -66 -99 Radio 3 -65 -67 -70 Radio 4 -70 -68 -80 Radio 5 -99 -69 -50 Radio 6 -50 -68 -60 Radio 7 -65 -69 -60 Radio 8 -70 -68 -70 Median -65 -68 -65 Average -66.75 -67.5 -66.13
Based on the condition that higher values are better, F2 is the best choice here, despite it having a poorer Median and Average.