# How would i down-sample a .wav file then reconstruct it using nyquist? - in MATLAB

Facebook and Stack Exchange are now working together to support the Facebook developer community. Facebook engineers participate here along with the best Facebook developers in the world. If you have a technical question about Facebook, this is the best place to ask.

This is all done in MATLAB 2010

My objective is to show the results of: undersampling, nyquist rate/ oversampling

First i need to downsample the .wav file to get an incomplete/ or impartial data stream that i can then reconstuct.

Heres the flow chart of what im going to be doing So the flow is analog signal -> sampling analog filter -> ADC -> resample down -> resample up -> DAC -> reconstruction analog filter

what needs to be achieved:

F= Frequency

F(Hz=1/s) E.x. 100Hz = 1000 (Cyc/sec) F(s)= 1/(2f)

Example problem: 1000 hz = Highest frequency 1/2(1000hz) = 1/2000 = 5x10(-3) sec/cyc or a sampling rate of 5ms

This is my first signal processing project using matlab.

what i have so far.

``````% Fs = frequency sampled (44100hz or the sampling frequency of a cd)

left=test(:,1);

% Plot of the .wav signal time vs. strength

time=(1/44100)*length(left);
t=linspace(0,time,length(left));
plot(t,left)
xlabel('time (sec)');
ylabel('relative signal strength')

**%this is were i would need to sample it at the different frequecys (both above and below and at) nyquist frequency.*I think.***

soundsc(left,fs) % shows the resaultant audio file , which is the same as original ( only at or above nyquist frequency however)
``````

Can anyone tell me how to make it better, and how to do the sampling at verious frequencies?

heres the .wav file http://www.4shared.com/audio/11xvNmkd/piano.html

EDIT:

``````%Play decimated file ( soundsc(y,fs) )
%Play Original file ( soundsc(play,fs ) )
%Play reconstucted File ( soundsc(final,fs) )

play=piano(:,1); % Renames the file as "play"

t = linspace(0,time,length(play));          % Time vector
x = play;
y = decimate(x,25);

stem(x(1:30)), axis([0 30 -2 2])   % Original signal
title('Original Signal')
figure
stem(y(1:30))                        % Decimated signal
title('Decimated Signal')

%changes the sampling rate

fs1 = fs/2;
fs2 = fs/3;
fs3 = fs/4;
fs4 = fs*2;
fs5 = fs*3;
fs6 = fs*4;

wavwrite(y,fs/25,'PianoDecimation');

%------------------------------------------------------------------

%Downsampled version of piano is now upsampled to the original
play2=PianoDecimation(:,1); % Renames the file as "play

%upsampling
UpSampleRatio = 2;  % 2*fs = nyquist rate sampling
play2Up=zeros(length(PianoDecimation)*UpSampleRatio, 1);
play2Up(1:UpSampleRatio:end) = play2; % fill in every N'th sample

%low pass filter

ResampFilt = firpm(44, [0 0.39625 0.60938 1], [1 1 0 0]);

fsUp = (fs*UpSampleRatio)*1;
wavwrite(play2Up,fsUp,'PianoUpsampled');

%Plot2
%data vs time plot
time=(1/44100)*length(play2);
t=linspace(0,time,length(play2));
stem(t,play2)
title('Upsampled graph of piano')
xlabel('time(sec)');
ylabel('relative signal strength')

final=PianoUpsampled(:,1); % Renames the file as "play"

%-------------------------------------------------------------
%resampleing
x=piano(:,1); % Renames the file as "play"
m = resample(x,3,2);
``````
-
Consider accepting answers in case they provide a solution to your question. You haven't so far accepted any given answer. – zellus Dec 28 '10 at 2:05
what do you mean, from my previous questions ive asked about nyquist sampling using a msp430 micro controller, this has nothing to do with that. – Andrew Dec 28 '10 at 2:56
It means you click the green checkmark on an answer for one of your previous questions, as done in this question. It awards the author extra points and allows future users & searchers to see which answer was most helpful. – tyblu Dec 28 '10 at 5:25
Most helpful for my question about the msp430 board yea. . . – Andrew Dec 28 '10 at 14:16

The easiest thing to do is change sample rates by an integer factor. Downsampling consists of running the data through a low-pass filter followed by discarding samples, while upsampling consists of inserting samples then running the data through a low pass filter (also known as a reconstruction filter or interpolating filter). Aliasing occurs when the filtering steps are skipped or poorly done. So, to show the effect of aliasing, I suggest you simply discard or insert samples as required, then create a new WAV file at the new sample rate. To discard samples, you can do:

``````DownSampleRatio = 2;
%# Normally apply a low pass filter here
leftDown = left(1:DownSampleRatio:end); %# extract every N'th sample
fsDown = fs/DownSampleRatio;
wavwrite(leftDown, fsDown, filename);
``````

To create samples you can do:

``````UpSampleRatio = 2;
leftUp = zeros(length(left)*UpSampleRatio, 1);
leftUp(1:UpSampleRatio:end) = left; %# fill in every N'th sample
%# Normally apply a low pass filter here
fsUp = fs*UpSampleRatio;
wavwrite(leftUp, fsUp, filename);
``````

You can just play back the written WAV files to hear the effects.

As an aside, you asked for improvements to your code - I prefer to initialize the `t` vector as `t = (0:(length(left)-1))/fs;`.

-
 Shouldnt they sound the same once this is done, when i tried it , it doesn't sound the same at all. – Andrew Dec 28 '10 at 15:11 Both processes introduce aliasing, so no, they shouldn't sound the same. You would have to (a) ensure that the original signal didn't have energy above fsDown/2 and (b) include the low-pass filtering steps I mentioned above for them to sound the same. – mtrw Dec 28 '10 at 15:18 yea i added a low pass filter, ill edit the code uptop so you can see it. – Andrew Dec 28 '10 at 15:30 First, that low pass filter is weak. You need to make sure it attenuates everything above fsDown/2. Second, in upsampling, you need to apply it to the upsampled data. – mtrw Dec 28 '10 at 15:50 The low pass filter? its applied to both, but what would a better low lass filter be instead of the current one? and instead of downsampling decimation would be better as Clifford said. mathworks.com/help/toolbox/signal/decimate.html i need to find a way to implement it to a audio file rather then a sine wave. – Andrew Dec 28 '10 at 15:59