rawad_hamwi

<p>Thanks Wouter!!<br>

I know that the G version is better than the D version but I I can't spend more right now :(<br>

I think I can deal with photos taken below f/2.8 by post processing regarding sharpness and constrast</p>

<p>Exactly Peter I am planning to use it especially for portraits mainly and I should be sure before buying it that it can function normally like a modern Nikon lens, I know autofocus won't work but this isn't a problem. The most important thing is that all the exposure modes will function normally on the D60.</p>

<p>Yeah Peter I am aware that the AF system won't work due to the lack of the AF motor in the Nikon D60 body...actually that isn't a problem for me</p>

<p>Gerard, Ronald, Andrew..thanks a lot for your replies, you helped me so much!!<br>

Now I have a clear idea how aperture works on this lens with the Nikon D60</p>

<p> </p>

<p>Hello everybody!!</p>

<p>I have a question regarding the aperture in the Nikon AF Nikkor 50mm f/1.8D<br>

It has an aperture ring and these full stops are written on it "1.8-2.8-4-5.6-8-11-16-22"<br>

<img src="data:image/jpeg;base64,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" alt="" width="297" height="300" /><br>

If I want to connect it to Nikon D60 for example, I should lock it to the minimum aperture "22"<br>

My question is...If I connect this lens to the Nikon D60, can I choose f-stops other than what is written on the lens? for example can I select 2.2, or 3.5 or 5.0, etc or I am obligated to choose a one from this list "1.8-2.8-4-5.6-8-11-16-22"<br>

And thanks a lot for helping me</p>