This instrument supports mathematical combination and functional transformations of waveforms it acquires. The next figure shows this
concept:
You create math waveforms to support the analysis of your channel and reference waveforms. By combining and transforming source
waveforms and other data into math waveforms, you can derive the data view that your application requires. Create math waveforms that
result from:
•
Mathematical operations on one or several waveforms: add, subtract, multiply, and divide.
• Functional transformations of waveforms, such as integration, differentiation, and so on.
Math waveform elements
You can create Math waveforms from the following:
• Channel waveforms
• Reference waveforms
• Measurement scalars (automated measurements) that measure channel, reference, or math waveforms, or histograms.
• Other math waveforms
Measurement concepts
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