It seems the signal power is 3dB higher than actual power. Does anyone can explain me why?
For example, I have f(t)=A*sin(2*pi*f*t), its power is f(t)^2 integrated over a cycle then divide the cycle period, (1/T*int(f(t)^2)) which is equal to A^2/2 as expected. (match with RMS calculation as well =(A/sqrt(2))^2)
However, both Cadence Virtuoso dft and Matlab FFT give me signal power = A^2.
The way how I calculate the power is as below: I assume the amplitude of the single tone in one bin of FFT results (coherent sampling) is magx. I calculate the power as magx^2.
I have to calculate the power in this way instead of (magx/sqrt(2))^2 because the noise from all other bins are calculated as sum squared. Otherwise, my SNR will be wrong.
From another perspective, it means the noise is also 3dB higher than actual gaussion noise variance value. So the final SNR is correct if I calculate the signal power as magx^2, which is 3dB higher than actual signal power.
I just wonder why there is 3dB difference in fft results compared with actual power, especially for noise? It seems to me the FFT report peak magnitude instead of rms magnitude.
I have the code attached.
clear;close all;
rng default
FlagTwoTone = false;
tone1 = 53/128*800e6;
Amp = 0.532 * 10^(1.37/20);
fs = 800e6;
N = 128;
t = (0:N-1)*1/fs;
freq = fs*(0:(N/2))/N;
noisestd = 300e-6;
sig = Amp*sin(2*pi*tone1*t);
noise = noisestd*randn(size(sig));
myx = sig + noise;
Tone1dB = 20*log10(Amp/sqrt(2))
noisedB = 20*log10(noisestd)
mySNRviasnr = snr(sig, noise)
Y = fft(myx, N);
P2 = abs(Y/N);
P1 = P2(1:N/2+1);
P1(2:end-1) = 2*P1(2:end-1);
modP1 = P1;
figure(1);
plot(freq,P1)
title('Single-Sided Amplitude Spectrum of myx(t)')
xlabel('f (Hz)')
ylabel('|P1(f)|')
grid on;
simTone1amp = 0;
simTone1index = 0;
simTone1freq = 0;
for i = 1:length(modP1)
if simTone1amp < modP1(i)
simTone1amp = modP1(i);
simTone1index = i;
end
end
simTone1freq = freq(simTone1index);
modP1(simTone1index) = 0;
simTone1dB = 20*log10(simTone1amp)
if FlagTwoTone
simTone2amp = 0;
simTone2index = 0;
simTone2freq = 0;
for i = 1:length(modP1)
if simTone2amp < modP1(i)
simTone2amp = modP1(i);
simTone2index = i;
end
end
simTone2freq = freq(simTone2index);
modP1(simTone2index) = 0;
end
simHarmonicAmp = 0;
simHarmonicIndex = 0;
simHarmonicFreq = 0;
for i = 1:length(modP1)
if simHarmonicAmp < modP1(i)
simHarmonicAmp = modP1(i);
simHarmonicIndex = i;
end
end
simHarmonicFreq = freq(simHarmonicIndex);
fftTotalNoise = sum(modP1.^2);
simNoisedB = 10*log10(fftTotalNoise)
if FlagTwoTone
else
SNDR = 10*log10(simTone1amp^2/fftTotalNoise)
end
