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Intro to Spectral Analysis and Matlab. Q: How Could you quantify how much lower the tone of a race car is after it passes you compared to as it is coming towards you? How would you set the experiment up?. Running the Experiment . - PowerPoint PPT Presentation
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Intro to Spectral Analysis and Matlab
Q: How Could you quantify how much lower the tone of a race car is after it passes you compared to as it is coming towards you? How would you set the experiment up?
Running the Experiment .
Data is often recorded in the time domain. The stored dataset is called a timeseries. It is a set of time and amplitude pairs.
Frequency Domain (Do a Fourier Transform on Timeseries)
We have converted to the Frequency Domain. This dataset is called a Spectra. It is a set of frequency and Amplitude pairs.
Time Domain
What’s the Frequency?What’s the Period?What will this look like in the Frequency Domain?
What’s the new (red) period?How Does its amplitude Compare to the 1 s signal?
Power Spectral Densities
Secondary Microseism (~8 s)
Primary Microseism (~ 16 s)
QSPA PSD PDF
The Mysterious Case of HOWD
Sampling Frequency
• Digital signals aren’t continuous– Sampled at discrete times
• How often to sample?– Big effect on data volume
How many samples/second are needed?
Are red points enough?
AliasingFFT will give wrong frequency
Nyquist frequency1/2 sampling frequency
Nyquist frequency
• Can only accurately measure frequencies <1/2 of the sampling frequency– For example, if sampling frequency is 200
Hz, the highest theoretically measurable frequency is 100 Hz
• How to deal with higher frequencies?– Filter before taking spectra
Summary• Infinite sine wave is spike in frequency
domain• Can create arbitrary seismogram by adding
up enough sine waves of differing amplitude, frequency and phase
• Both time and frequency domains are complete representations– Can transform back and forth – FFT and iFFT
• Must be careful about aliasing– Always sample at least 2X highest frequency
of interest
To create arbitrary seismogram
• Becomes integral in the limit • Fourier Transform
– Computer: Fast Fourier Transform - FFT
Exercise plots
Sine_wave column 2
Sine_wave column 2
Sine_wave column 2 and 3
Sine_wave column 2 and 3 sum
Spectra, column 2
Spectra, columns 2, 3
Spectra, column 2, 3, 2 and 3 sum
Multi_sine, individual columns
Multi_sine, individual columns
Multi_sine spectra
Spike in time
Spike in time, frequency
Rock, sed, bog time series
Rock spectra
Rock (black), Sed (red), bog (blue)
Spectral ratio sed/rock
Basin Thickness
• Sediment site• 110 m/s /2.5 Hz = 44 m wavelength• Basin thickness = 11 m
• Peat Bog• 80 m/s /1 Hz = 80 m• Basin thickness = 20 m
Station LKWY, Utah
raw
Filtered2-19 Hz
Filtered twice
Station LKWY, Utah
raw
Filtered2-19 Hz
Filtered twice
Zoomed in once
Zoomed in once
Zoomed in again
Triggered earthquakes
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