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mary_castner

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  1. mary_castner
    <p>Thanks for your responses. I contacted FijiFilm's Sensitive Product Hotline and learned a few things. I am also interested in the difference between fp-3000b vs Polaroid t-107 (old B&W). http://www.everythingretek.com/PRDLibrary/LIBRARY8/LIBRARY/FILM/107FDS.PDF The old film has 14-17 lp/mm resolution while fp-3000b has 20 lines/mm. Convert to lp/mm so you have 28-34 lines/mm for the old film compared to 20 lines/mm for fp-3000b. This would give the appearance the fp-3000b had poor resolving power, but not the case.<br> 1) Fp-3000b has less grain and is more smooth.<br> 2) Resolving power of fp-3000b is 20 lines/mm, but Rob told me FujiFilm is quite conservative with its estimates and not only will the lines/mm vary with lot but with the randomize of the coupling of the silver halide. The resolving power of the film can be higher and 25-30 lines/mm or higher would not be unusual and similar to T-107 (28-34 lines/mm)<br> 3) Apparent resolution with the fp-3000b over the T-107 is higher because of finer grain. So the fp-3000b photo will look smoother then the T-107 film.<br> Once the difference between lines/mm and lp/mm became clear I check my photo test again. The Koren 2003 is a lp/mm test. I counted 9 lp/mm and a friend 10 lp/mm. Convert and you have 18 lines/mm and 20 lines/mm respectively. Therefore if we read the chart correctly my results are within the parameters of the fp-3000b resolving power. I also noticed my print chart looks fainter then when viewing the chart on my monitor. I suspect if I had printed out with semigloss or luster paper and used an inkjet printer my results might have been better. </p>
  2. mary_castner
    <p>Thank you A.T. and Glen for your responses. First, I thought lp/mm and lines/mm were one and the same, but a quick check seems to indicate lp/mm means line pairs per mm and I take it lines/mm is just one line? The Koren chart is based on line pairs/mm. My photo analyst, Andres, emailed it it was around 20 lp/mm or less on the Koren 2003 chart that I should see in the test photo. I assumed that counting each black vertical line counts as a pair with the white line next to it. I should have said 10 lp/mm not 10 lines/mm earlier to be clear. The specs on Fujifilm says the resolving power is 20 lines/mm. How do I read this? As I read lines/mm was an old standard for TV resolution. "All MTF charts and <strong><em>most</em></strong> resolution charts display spatial frequency in <strong><em>cycles</em></strong> or <strong><em>line pairs </em>per unit length</strong> (mm or inch). " http://www.normankoren.com/Tutorials/MTF.html So when the FujiFilm states resolving power do they really mean 20 lp/mm or do they mean 20 lines/mm? If that statement really means 20 lines/mm then that would translate to 10 lp/mm if I am counting correctly. A.T. your statement that the 100 should get about 25-30 lp/mm is that for FujiFlim or the old Type 107? The Polaroid 100 series at the time I am dealing with only had the Type 107 film so there wasn't really any other choices except color and that's not my interest. <br> Yes, we tried to get the FujiFilm MTF graph, but according to FuijFilm's corporate headquarters in Japan it was never done. Technical rep for FujiFilm in US call them for us. Andres says he can do work arounds without this focus test, but he really want's a ground lens test. We did get the specs for Type 107 including the MTF graph. Somewhere lost among my documents is the 107 specs, however, I can't find it, but I sent to Andres.<br> Yes, I know the old film had a steel backed case. It's lack can cause a problem with the fp3000-b with the extra two prints in pulling the film out. You may or may not have to adjust the spring on the door. After I got a camera from Landcameras.com I no longer had that problem. I didn't realize the fp3000-b film sets at a different focus because of the plastic back, but wouldn't FujiFilm compensate for the lens focus? I do know the chemical composition of the two films are a bit different for the dye diffusion process . Supposedly the fp3000-b is finer grained. I think there is another one or two things, but can't recall off hand.<br> I am still back to finding someone who is willing to do a ground glass test. Is this asking too much? It can't be done? Nobody knows how to do it with a Polaroid or it's too complicated?</p> <p>Best <br> Mary</p>
  3. mary_castner
    <p>Sorry, I should have added I had to reduce the file size to be under 100k. The scan itself was a 35 MB tiff file.</p>
  4. mary_castner
    <p>Thanks for your responses. What my photo analyst really wants is a ground lens test which is beyond me. He did inform me that I missed the part were he said the 20 lp/mm could be less. As I said I would be happy to pay someone to do this test as he is not confident the Koren 2003 test is valid. The whole point is to make sure the camera is in focus. Even if the lens is good the rangefinder could be off. The photos look decent, but that's not good enough.<br> Michael you gave the suggestion of a flat target at a slight angle. Sorry, but in the area of cameras I am a dummy. However, I am not sure this would give the results he is after nor can I get a good visual on what your suggesting. As is my eyesight isn't that good. If someone can do the ground lens test that's what we really need and willing to pay someone to do this. <br> This probably won't help, but going to attach my last test photo using FujiFilm FP-3000b, Polaroid 100 set at f/8.8, distance 5.7 meters. The chart used<br> <a href="http://www.normankoren.com/Tutorials/Lenstarg_50_5906p_15g_0is.png">http://www.normankoren.com/Tutorials/Lenstarg_50_5906p_15g_0is.png</a> printed at 600 dpi exactly 25 cm long.<br> The photo was scanned in grayscale at 1200 dpi. <br> Because of the high speed film at the f/8.8 setting I had to do this on a cloudy day as the shutter couldn't keep up and I got a dark vertical area on the left when sunny. At least that's what I was told why I got a dark area by Landcameras.com. The camera can't resolve more then around 20 lp/mm, but should I be getting better then I have. The only way to really prove it is a ground lens test. The lens maybe fine, but the rangefinder off. How that is done with a Polaroid 100 I have zero idea and I really don't need to know. It just needs to be done and my photo analyst really won't except anything else unless a better test if there is one. Thank you and I hope someone can help me out here. </p> <p> </p><div></div>
  5. mary_castner
    <p>Correct this is not a normal test for the normal use of the camera. I am trying to do blur tests. In reality my photo consultant is attempting to get these tests done. However, he is out of the country and unable to do them so he relys on me. He is trying to determine focus errors and aberrations, which the f/8.8 setting is more sensitive too. Other tests will be done at the f/42 setting.<br> We are trying to apply deblurring methods to a old Polaroid photo. It is difficult to predict the accuracy of the results because they are depend on how each algorithm reacts to grandulation, nonlinearties and other image features and flaws. Then the best way to test accuracy is by means of focus shots. We have the film specifications for the old Type 107 film including the MTF curve, but FujiFilm never did the this test for FP-3000b (confirmed by FujiFilm). There is a difference between the two films, but he has that information. Since this is over my pay grade I don't always understand what he tells me. I just attempt to do what he asks. It is interesting that I might only get 10 lines/mm as that's near what I was getting. I was told with this Koren 2003 test that I should be able to get a resolution of around 20 lp/mm. So perhaps this expectation is in error and needs to be explained.<br> At this point all I can do is email my consultant and ask him to explain exactly what he wants done and why which could take up to a week to get a response. I really don't know how he came up with 20 lp/mm except from the FP-3000b specifications. I maybe in error in what I am saying. <br> If you would be patient and stay tuned I'll get back to you.</p>
  6. mary_castner
    <p>I have a Polaroid 100 that's been refurbished by landcameras.net. It works well and the photos using FP-3000b look OK.<br> However, I need a bit more then that as I need to do a lens test to prove the camera is in focus. I require a Polaroid 100 camera to be in manufacture focus for for a project I am doing. According to the Polaroid manual this is <br />40 lines/mm. Since collimators don't exist any longer it needs another type of lens test. I do not have the skill or familiarity to do the ground glass method. I tried using a Korean 2003 lens chart printed at 25 cm using f/8.8 and FP-3000b film (in the shade) at a distance of 5.7 meters. Supposedly, I should be able to see about 20 vertical lines on the chart at that distance. No luck. I can't tell if the rangefinder is off or something with the optics. Quite possibly it's me and I am doing something incorrectly. Since this is for a project and not for me to specifically learn photography I have come to the conclusion I am a complete dunce and need someone more skilled then me to test the camera. <br />Therefore, I am looking for someone in the Chicago area that would be kind enough to assist me. I can also mail out the camera and happy to pay a reasonable fee. I have been told there are other reliable focusing methods and tests, but require someone more skilled them me. <br />Thank you.<br /><br /></p>
  7. mary_castner
    <p>I guess you can't do a link. In google use the search terms: repair manual 100 200 300 series pack land camera 1970</p> <p>You'll see a pdf 'Repair Manual - Ning'</p>
  8. mary_castner
    <p>Sorry I missed your response. My apologies.</p> <p>You can find a free download of the Polaroid repair manual:<br> http://www.google.com/url?sa=t&rct=j&q=&esrc=s&source=web&cd=3&ved=0CCsQFjAC&url=http%3A%2F%2Fapi.ning.com%2Ffiles%2FsnDsyKy4JNix6FsnW5CnxZIuRSiZ8MDEkhzDRPyPCMeels0ZJeqTTQekHDStJbc1vLJK2BMunlpQm3Sc09m0WsOi7oShi7TZ%2F51423135RepairManual100200300SeriesAutomaticPackLandCameraMarch1970.pdf&ei=gsyVU8aAEIWg8gGJiICQBQ&usg=AFQjCNGFrl0LOl_LFSersjU445LnBPxWUA&bvm=bv.68445247,d.b2U&cad=rja<br> I also see if for sale at $9.99 on one site and on scribd.com is your a member.<br> <cite ><cite ><a href="http://www.scribd.com/doc/51423135/Repair-Manual-100-200-300-Series-Automatic-Pack-Land-Camera-March-1970">http://www.scribd.com/doc/51423135/Repair-Manual-100-200-300-Series-Automatic-Pack-Land-Camera-March-1970</a><br /></cite></cite></p>
  9. mary_castner
    <p>I need a definitive answer. I have found a number of places where it says it does especially the Polaroid 100. Then I see where it's doesn't. I am trying to find out the FOV for the rangefinder, which I need for something.<br> I have done a grid test and it appears that the viewfinder is pointed directly ahead about 3 inches above the center of the lens to the center of the viewfinder. I have been trying to find out the DOF for the viewfinder with no luck. My tests are dubious because it seems my eyes get tired after a few seconds and the area size thru the viewfinder on the grid changes. <br> However, when viewing a grid dead center thru the viewfinder at 24" my center on the grid is 3" above the lens and that 3" is the distance between the center of the lens and center of the viewfinder. If auto correcting parallex would have have that much of a displacement looking thru the viewfinder???<br> The repair manual shows me a diagram of how the viewfinder works, but it's not clear enough for me to understand. I need something simple like yes, no or partly. In the repair manual for the Polaroid 100-200-300 series for the RF/VF (that's the viewfinder type for the 101). There is also a section on page 77 there are instructions on how to adjust the parallax in the viewfinder. I can read this but it doesn't translate into yes this is auto parallax compensation or no it's not. Any help would be appreciated. </p> <p><img src="data:image/png;base64,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" 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