Archived posting to the Leica Users Group, 2000/11/17
[Author Prev] [Author Next] [Thread Prev] [Thread Next] [Author Index] [Topic Index] [Home] [Search]Tina wrote in part: "In room light, without the UV filter in front of the meter I get an f number of 2.89. With the UV filter, I get an f number of 2.86. Not much difference, it's true, but enough to matter when you are taking pictures in the dark!" Let us first present some general principles. Most consumer measuring instruments have an accuracy within 5% as does the mechanical tolerance of the aperture stop. Restricting ourselves to the Minolta exposure meter, we should allow for a tolerance of 5%. The calibration of the Minolta meter is for the 2800 Kelvin range.(tungsten light) The B&W data sheets show that for the red part of the spectrum (around 600 nanometers) the UV filter has a transmission efficiency of 97 to 98%. Theortically then the transmission loss of about 2% would be within the 5% margin of tolerance and thus be not detectible with reliability. Further to be sure one should do a series of readings to see if there is statistical validity. I did some tests myself with a UV filter and noted In tungsten light and without the UV filter, my Minolta Autometer V gave a consistent reading of 2.8 + 9/10 with 10 readings.With the filter on the measuring dome and without my hands around the filter (to avoid shadows from my hand) I noticed a drop of only 1/10. When I held the filter in my hand and positioned it in front of the measuring cell, I noticed a wider range of readings, within 1/3 stop, that changed a bit depending on the distance from filter to measuring dome and the angle at which the reading was done. Here we should find at first a very clear and repeatable lab situation. With a Minolta soptmeter, I did not notice any difference! I am not inclined, based on this evidence and the theory, to assume that a UV filter will drop the transmission by 1/3 of a stop when photographing in ambient light with a higher than normal proportion of the red spectrum. Even if this were the case, consider the effect of it on the density of the negative. On the assumption that a true 1/3 stop difference in exposure is real, we note that a full stop difference would change the density of the negative by a value of Log 0.3. A third stop would be a change in density of 0.1 (log scale). BUT this assumes a characteristic curve of inclination 1. Generally we develop to an inclination of 0.6. The density change would become 0.6 x 0.1 = 0.06. Such a density difference cannot be accounted for in normal consitions for developing and printing. Erwin