An important thing to know when we decide on which equipment to use is how it impact the picture, DOF, AOV etc.
I think that all agree that there are difference in noise performance on different sensor sizes, and that this changes with time due to development in the IC technology.
I will not go into the discussion on the PDR, but I would like to throw a couple of pictures into this thread 
I took my D800, which has a DX mode, and found a 24mm and a 35mm as they have nearly the AOV in the two modes.
I placed three objects to see the DOF in the two modes.
The result was that the background blur was less in DX mode, but it also seems that the exposure was different even though the D800 was in manual mode?
Maybe there is an explanation in some of this discussion.
First of all, thanks for running the test shots and providing an example.
Let me analyse what we see. I encourage anyone to point out any flaws in my reasoning or other kinds of mistakes!
- First of all, you resized both shots to the same final resolution of ~1200x800px. I think this is good, as it gives us an apples-to-apples comparison.
- You framed the shots the same or very close, by having almost the same perspective and choosing appropriate focal lengths of roughly f2/f1=1.5, which is the ratio
of the linear dimensions of FX/DX.
- You chose the same relative aperture f/5.6
- You shot both at base ISO 100 and 1/200s
- There is, as you point out, a very minor brightness difference. Let's ignore that here, because it is very small and probably within the tolerance of the stop-down lever of the camera
So, according to Joseph James' definitions, the two shots are equivalent in terms of perspective, framing, exposure time, brightness, and display dimensions.
They are not equivalent in terms of DOF, diffraction, and total light on the sensor.
You stated that you want the same DOF for the two shots. You did not achieve that in my opinion. Also, the distant background is not blurred to the same extent. Do you agree with my observations?
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Regardless of what you wanted, let us do a little calculation, using standard photographic theory, AKA geometrical optics, to see what kind of blur circles we would expect from the distant background. Using elementary geometry, we find that the diameter of the blur circles from a light source at infinity in the image plane is equal to
d=M*f/N,
where M is the magnification, f is the focal length and N is the aperture number. The size on the final image is given by
dfinal= m*M*f/N, where m is the secondary magnification.
Now, since the two images are displayed at the same size, the product of primary and secondary magnification are the same:
m1*M1=m2*M2.
Therefore, we obtain that
dfinal2/dfinal1 = f2/f1 * N1/N2.
Now, since you chose the same aperture number, but different focal lengths, we obtain
dfinal2/dfinal1 = 35/24 * 5.6/5.6 = 1.46.
Thus, from optics, we expect the blur circles of the distant background to be roughly 50% bigger in diameter on the FX image compared to the DX image.
Can you verify this?
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If you had wanted to get the
same background blur (double emphasis on the if, since I'm not saying that this is in any way desirable in general, but a hypothetical situation), you would have needed to choose either f/8 on the FX shot and f/5.6 on the DX, or f/5.6 on the FX shot and f/4 on the DX. Indeed,
dfinal2/dfinal1 = 35/24 * 5.6/8 = 1.02, and
dfinal2/dfinal1 = 35/24 * 4/5.6 = 1.04,
which are both close enough to 1.
The same would be predicted by equivalence, where it is stated that the aperture that is equivalent to f/5.6 on FX is f/4 on DX, and the aperture that is equivalent to f/8 on FX is f/5.6 on DX.
Note that the exposure
will be different by doing this, so we have to change something else to compensate and get back the equal brightness.
There is no normative aspect to any of this discussion. I merely explained how to get the same background blur on both formats, and explained that equivalence and geometrical optics are fully consistent in that regard.
Next up will be exposure and noise. But let's first see whether this is understandable.
