nicholas_s._marco Posted February 28, 2015 Share Posted February 28, 2015 <p>These are 'stereo' shots using twin Hasselblads w 80mm lenses at f22 and exposed for several seconds. The cameras are mounted about five inches apart (to center of lenses) on a strip of aluminum flat stock and locked down on a sturdy tripod. </p><div></div> Link to comment Share on other sites More sharing options...
nicholas_s._marco Posted February 28, 2015 Author Share Posted February 28, 2015 <p>Sorry. Having trouble uploading dual-negative shots that are wide enough to view acceptable in 'stereo' while still meeting the Forum requirements for size. Will try again tomorrow. NSM</p><div></div> Link to comment Share on other sites More sharing options...
JDMvW Posted February 28, 2015 Share Posted February 28, 2015 <p>The problem is that you are just over the 700 pixel width requirement. And you also need to put a caption on the image for it to display in line.</p> Link to comment Share on other sites More sharing options...
JDMvW Posted February 28, 2015 Share Posted February 28, 2015 <p>As so:</p> <div></div> Link to comment Share on other sites More sharing options...
ondebanks Posted February 28, 2015 Share Posted February 28, 2015 <p>This answers the question "What's better than a Hasselblad?" -- <em>two</em> Hasselblads!</p> <p>...or one Mamiya :-D</p> Link to comment Share on other sites More sharing options...
Mark Z Posted March 3, 2015 Share Posted March 3, 2015 <p>The photos on the left side were taken by the camera that was on the right side, and vice versa, which means that to see the pair in stereo, the right eye needs to look at the left photo, and the left eye needs to look at the right photo. You should cross your eyes to get the images to pop into 3D. This is opposite than the old-time stereo photos, so if you try looking through the photos (as if to a distant object), or use a stereo viewer, it won't work.</p> Link to comment Share on other sites More sharing options...
JDMvW Posted March 3, 2015 Share Posted March 3, 2015 <p>Actually, most people find cross-eyed viewing easier than viewerless parallel viewing:<br> but it is relatively easy to train yourself to do either at need:<br> http://www.vision3d.com/3views.html </p> Link to comment Share on other sites More sharing options...
art_thomas1 Posted March 3, 2015 Share Posted March 3, 2015 <p>I reversed the motorcycle view for side by side. It has good depth of field. Did you use F:16? </p> Link to comment Share on other sites More sharing options...
nicholas_s._marco Posted March 5, 2015 Author Share Posted March 5, 2015 <p>Art<br> If I remember correctly, I used f22 on all of these shots. I will try to post a couple more in the next few hours tonight (Thailand time). <br> <br />Question for you guys that know more about this than I do: Does it make a difference whether you scan and align the Left Negative (from the LH Camera) and Right Negative (from the RH Camera), or not. I tried it both ways when I was originally scanning and viewing the shots, and it seemed to display better (using the cross-eyed method) when I placed the negative from the RH Camera on the Left Side, and the negative from the LH Camera on the Right Side. <br> Your comments / criticisms will be appreciated. <br> <br />Thanks for viewing<br> NSM /Hua Hin</p><div></div> Link to comment Share on other sites More sharing options...
nicholas_s._marco Posted March 5, 2015 Author Share Posted March 5, 2015 <p>The stereo photos of the Pa La U Stream are intentionally 1200 pixels wide, in order to provide a better (well, in my view anyway) perspective for the 'stereo' effect. This set is also displayed such that the RH Camera shot the LH Negative, and the LH Camera shot the RH Negative (as viewed on the screen). <br> I've done some shots with twin Minolta Autocords (75mm, at F22). They work pretty well too. However, the best arrangement seems to be twin Hasselblads with 50mm lenses at f22, and exposed for several seconds (using ISO 100 B&W film). The Hassy shots I've displayed thus far are all with 80mm lenses. I will try to dig up one of the 50mm shots for comparison. <br> My thanks to JDM for his constructive and helpful comments and explanations. Thanks to Mark Zell also for his explanation of the cross-eyed method. Hope that method works for everyone, as I know it is difficult for some people. <br> <br />Regards<br> NSM / Hua Hin</p> <p> </p> Link to comment Share on other sites More sharing options...
nicholas_s._marco Posted March 5, 2015 Author Share Posted March 5, 2015 <p>Here's another twin Hasselblad 80mm f22 set of negatives. Picture of the front yard under rather intense midday sunlight. (Again, posted at 1200 pixels to hopefully achieve a better 'stereo' perspective). <br> <br />Regards, NSM / Hua Hin</p><div></div> Link to comment Share on other sites More sharing options...
nicholas_s._marco Posted March 5, 2015 Author Share Posted March 5, 2015 <p>Here's a picture of Adam Urbanos at the Sugarburg Bar in Brooklyn, shot with twin Minolta Autocords, 75mm at f22 for about 5 seconds.<br> NSM / Hua Hin</p> <div></div> Link to comment Share on other sites More sharing options...
nicholas_s._marco Posted March 5, 2015 Author Share Posted March 5, 2015 <p>This one is shot with the twin Hasselblads again, but with 50mm lenses, again at f22 for about 8 seconds (using dim ambient lighting). Tough to hold a pose like that for 8 seconds, but they did a good job of it. I like the perspective and coverage of the 50mm lenses more than the 80mm's, so plan to set up a few more shots using the 50's. </p> <p>NSM / Hua Hin</p><div></div> Link to comment Share on other sites More sharing options...
Mark Z Posted March 7, 2015 Share Posted March 7, 2015 <p>Nicholas, your photos look good with the cross-eyed method. I can easily get all of them to appear in 3D. With stereopairs that are meant for viewing with the parallel-viewing method, it helps (for me) if the same objects in the photos are spaced at or near the interpupillary distance (around 65 mm). On my monitor, your pictures come up larger than that (although I can shrink them), so the cross-eyed method is not only the correct method, it is easiest.<br> <br />The separation of your cameras at five inches won't be optimal for every situation. It depends on the distance to the subject, the focal length of the lens, and how much apparent depth you want to have. For close-up subjects, five inches will be too much, but for distant landscapes, the 3D effect will be diminished. With too much separation, a scene will have an exaggerated depth, which gets uncomfortable for the viewer.</p> Link to comment Share on other sites More sharing options...
nicholas_s._marco Posted March 8, 2015 Author Share Posted March 8, 2015 <p>Thanks Mark. Good constructive comments. After doing a bit more reading on Photo.Net, it appears that landscapes can be photo'd in 'stereo' very effectively by setting the cameras several feet apart. I'm going to try shooting some short-range landscapes with the twin Hasselblads set around 3 feet apart. And then also some much longer-range landscapes with the cameras set about 6 feet apart (which will require something like transporting a 2x4 out to the site, strapped to my motorcycle, but this will take some planning). So this is a work in process.<br> Thanks again for your comments and continued interest. <br> NSM / Hua Hin</p> <p> </p> Link to comment Share on other sites More sharing options...
Mark Z Posted March 8, 2015 Share Posted March 8, 2015 <p>Nicholas, if the landscape you are photographing is fairly static, you might reduce your equipment needs by using just one camera. Shoot one of the photos, take a step or two to the side, aim at the same spot, and take the second shot. I've used that method with good results. It also makes it easy to 'bracket' your baseline by, say, taking a second shot with a three-foot separation, and a third with a six-foot separation. Then you can decide later what separation works best. If you are just experimenting, it would speed things up and take a lot less equipment.</p> Link to comment Share on other sites More sharing options...
gerber_van_der_graaf Posted April 7, 2015 Share Posted April 7, 2015 <blockquote> <p>What's better than a Hasselblad?" -- <em>two</em> Hasselblads<br> Well, I use two Rolleiflexes 6008, mounted on a 20cm long aluminium profile strip from Arca Swiss that fits on their P0 ball head. The left camera is the 'slave': it is fired by the flash connector of the right one. All together it is quite a heavy rig, but it works fine, also because the film transport is motorized.<br> Apart from the distance between the cameras (in my case about 11 cm, the closest I can get) also the converging of the cameras is important. Some people will get headaches when the focussing point when viewing the projected stereo slides, is different then the coverging. So, I converge the cameas at about 3 to 5 m, which is the distance of the audience from the projection screen. From my personal experience, looking the slides through a viewer (eyes are looking at infinitiy / onaccomodaed) the converging of the cameras at 3 to 5 m do not bother.</p> </blockquote> Link to comment Share on other sites More sharing options...
jack_colbran Posted July 2, 2015 Share Posted July 2, 2015 <p>Cool! There's someone else out there doing 3D with Hasselblad.<br> <img src="data:image/png;base64,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<div></div> 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jack_colbran Posted July 2, 2015 Share Posted July 2, 2015 <p>Another Hassy stereo pair. 80mm C lenses; looks much better as a slide!</p><div></div> Link to comment Share on other sites More sharing options...
jack_colbran Posted July 2, 2015 Share Posted July 2, 2015 <p>Last one - Motorcycle Show 2013 using flash. 80mm C lenses again.</p><div></div> Link to comment Share on other sites More sharing options...
jack_colbran Posted July 2, 2015 Share Posted July 2, 2015 <p>Seeing these colour slides in a good MF 3D slide viewer (3D World for example) is life-changing.</p> Link to comment Share on other sites More sharing options...
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