bernardwest Posted August 5, 2013 Share Posted August 5, 2013 Hi all. I'm looking to upgrade/change/renew/etc some of my equipment later in the year or early next year. I would like to get a wide angle prime for my 5D (or hopefully 6D at the end of the year), somewhere in the range 14-17mm. I can't afford the Canon 14mm, so I'm wondering what other options I might have. It will be for landscapes, so manual focus is ok, but I would prefer it to be able to meter through the camera/lens. So essentially, it doesn't matter what brand or age it is, as long as it can fit the EOS digital (via adapter if necessary). I'm after the best quality I can afford (aren't we all? ;) ), so I'd like something that is sharp across the frame either wide open or, more likely, within a stop or 2 of wide. Any good lenses you can recommend? Link to comment Share on other sites More sharing options...
denisgermain Posted August 5, 2013 Share Posted August 5, 2013 <p>Tokina offers great alternatives - Cheaper but not necessarly "worst quality"</p> Link to comment Share on other sites More sharing options...
bernardwest Posted August 5, 2013 Author Share Posted August 5, 2013 What I'm hoping to get is high quality, but cheaper because it is an old lens that will require manual operation. I'm willing to sacrifice newness and lightness and ease of operation etc for a cheaper alternative for a high IQ lens. Link to comment Share on other sites More sharing options...
sgust Posted August 5, 2013 Share Posted August 5, 2013 <p>Have you checked KEH camera for a used lens to fit the bill? I would imagine that if you don't mind doing without AF and image stabilization that you could find something with excellent IQ at a reasonable price.<br> Also saying Tokina's wide angle lenses are, "not necessarily 'worst quality'" doesn't do them justice. By every account I've come across, my own experience included, they are offer great image quality.</p> Link to comment Share on other sites More sharing options...
bernardwest Posted August 5, 2013 Author Share Posted August 5, 2013 Hi Siegfried... Do you know some examples of good older primes I could use? I've got no idea what was and wasn't good IQ. I'm assuming that a canon FD wide might be ok? Link to comment Share on other sites More sharing options...
david_john_appleton Posted August 5, 2013 Share Posted August 5, 2013 <p>Most lenses that are sharp across the frame wide open are expensive especially wide angels <br> my canon 17-35 F2.8 L needs to be stopped down at 17-19mm this doesn't bother me as most wide angel zooms are not as fast as this one so when i stop down to their max F stop my IQ has come up to at least theirs <br> most lenses are at their sharpest closed down 2 stops <br> I tend to look for second hand L glass rather than new 3ed party lenses but 3ed parties often do excellent lenses, like my Tokina ATX 28-70 F2.6-2.8 pro11 is optically better than the canon 24 - 70 F2.8L but a lot of googling is needed as tokina made at least anther 4 very simula lenses but nowhere near as good<br> When i as doing my research for a wide angel zoom, one affordable but excellent lens that sticks in my mind was the tokina 19-35 f3.5-4.5 its a bit plasticy unlike the tokina 20-35 but optically better i think only available second hand now </p> Link to comment Share on other sites More sharing options...
bernardwest Posted August 5, 2013 Author Share Posted August 5, 2013 I want a prime. And it has to be in the 14-17mm range. I already have a 17-35mm Tamron SP, which is ok, but too much distortion at 17mm. I just had a look around at KEH, B&H, and ebay (in Australia), and none have any Canon 14mmL FD's. But ebay has a fairly cheap Canon 17mm f4 FD. Does anyone know what its edge to edge quality was like? Link to comment Share on other sites More sharing options...
h._p. Posted August 5, 2013 Share Posted August 5, 2013 <p>The FD lens won't fit the 5D without an expensive adapter. Even then, it probably won't work that well, because the adapter has an optical element that may not match with the ultrawide's optical design.</p> <p>Have you looked at the Samyang 14mm? I've had one of these for a couple of years and it works rather nicely on my 5D.</p><div></div> Link to comment Share on other sites More sharing options...
sgust Posted August 5, 2013 Share Posted August 5, 2013 <p>No, I can't say I'm familiar with Canon's lenses or even their lens/body compatibility. I shoot Sony, so I'm lucky to have a lot of old Minolta glass out there that fits my camera.</p> Link to comment Share on other sites More sharing options...
Ian Taylor Posted August 5, 2013 Share Posted August 5, 2013 <p>I've been looking as well. The Samyang is one of the only options.<br> I don't like my 17-40....</p> Link to comment Share on other sites More sharing options...
JDMvW Posted August 5, 2013 Share Posted August 5, 2013 <p>There are some really lovely prime, wide-angle, lenses out there. In Nikon mount, for example.</p> <p><em><strong>However</strong></em>, it is particularly with wide-angle lenses that the problem of the rear of the lens interfering with the mirror arises on the "full-frame" cameras. Before you invest in something sight unseen, check the relatively up-to-date list at http://www.panoramaplanet.de/comp/ of lenses that do or don't work with the 5D family. Although the list title still refers to "M42-mount" lenses, the list in its present form covers the whole range of known issues for many mounts.</p> Link to comment Share on other sites More sharing options...
Robin Smith Posted August 5, 2013 Share Posted August 5, 2013 <p>Zeiss ZE 18mm Distagon (good to excellent). 20mm Voigtlander f3.5 (not great wide open but good stopped down + very small). 14mm Samyang (good resolution, great value, poor/uncontrolled distortion). Have you considered full frame fisheyes? Sigma and Canon 15mm are both excellent. Nikon 14-24mm zoom is great (huge and expensive) you could fit that on a Canon with an adapter. </p> Robin Smith Link to comment Share on other sites More sharing options...
fmueller Posted August 5, 2013 Share Posted August 5, 2013 <blockquote> <p>Have you considered full frame fisheyes? Sigma and Canon 15mm are both excellent.</p> </blockquote> <p>And there is always the Canon 8-15mm/4 L, which I would save up for if I was shooting a 5D and in need of anything wider than a 17-40mm/4 L.</p> <p>In the manual focus days 24mm was considered ultra wide; 20mm tended to be expensive specialty lenses; and 17mm was pushing the boundaries of the known universe - unless you were willing to go fish-eye. If there is a rectilinear manual focus lens wider than 17mm, it will be rare and certainly not cheap. I also doubt that it would be "sharp across the frame" even within a stop or two of wide.</p> Link to comment Share on other sites More sharing options...
ed_k__north_carolina_ Posted August 5, 2013 Share Posted August 5, 2013 The Canon 17-40 f4 L is hard to beat, it is sharp across the entire zoom range and it is one of Canon's least expensive L series lenses. I very happy with mine, it is my go to wide angle. Ed Link to comment Share on other sites More sharing options...
h._p. Posted August 5, 2013 Share Posted August 5, 2013 <blockquote> <p>14mm Samyang (good resolution, great value, poor/uncontrolled distortion)</p> </blockquote> <p>I've yet to notice any distortion in my sample, Robin. Could you post an image from yours that illustrates the distortion you've found?</p><div></div> Link to comment Share on other sites More sharing options...
mark_pierlot Posted August 5, 2013 Share Posted August 5, 2013 <p>The Samyang 14/2.8 apparently exhibits so-called mustache distortion, which may make the lens less than ideal for architecture but has no demonstrable effect on landscape or nature photography. It is one helluva lens, though, with resolution figures that exceed those of the EF 14/2.8 L, which costs almost <em>five times </em>as much<em>. </em>Check out <a href="http://www.photozone.de/canon_eos_ff/532-samyang14f28eosff">this review</a>.</p> <p>By the way, those are fine examples, H.P.</p> Link to comment Share on other sites More sharing options...
Robin Smith Posted August 5, 2013 Share Posted August 5, 2013 <p>It has pretty severe distortion in the middle of the field and it is rather difficult to correct I would suggest - basically check any review you can find and you will see it. This does not mean the lens is bad. In fact resolution is superb. It all depends whether you find the distortion worrying. For landscapes no problem really, just watch out for anything with straight lines in it. I decided not to buy it after trying it out- but it might well be for the OP. Personally, I also think 14mm is a specialized focal length anyway suitable for c. 0.5% of shots a year. The sort of place where it could be really useful such as interiors is precisely where it performs poorly. It all depends how wide you see, but 14 mm is too wide for most people most of the time.</p> Robin Smith Link to comment Share on other sites More sharing options...
arie_vandervelden1 Posted August 5, 2013 Share Posted August 5, 2013 Save up for a Canon 17/4 L tilt-shift Link to comment Share on other sites More sharing options...
h._p. Posted August 5, 2013 Share Posted August 5, 2013 <p>It would be helpful if you could post an image showing the distortion, Robin. I can't detect it on my shots, so I'd very much like to see what it is you've found on your sample of this lens.</p><div></div> Link to comment Share on other sites More sharing options...
dcstep Posted August 5, 2013 Share Posted August 5, 2013 <p>The Sigma 15mm f/2.8 EX DG diagonal fisheye is an exceptional wide-angle prime at a very reasonable price. Here's a shot of a very large space, with lots of straight lines. I "de-fished" it with DxO Optics Pro:</p> <p><a title="De-fished Image by dcstep, on Flickr" href=" src="http://farm6.staticflickr.com/5524/9375674332_7590d25ece_c.jpg" alt="De-fished Image" width="800" height="534" /></a></p> Link to comment Share on other sites More sharing options...
bernardwest Posted August 6, 2013 Author Share Posted August 6, 2013 So if I went with a fisheye, how easy is it to "un-fisheye" it? Can I do that in lightroom? And does it retain high IQ and resolution after being un-fisheyed? Thanks for the tip on the Samyang. I'll check it out. It's mainly going to be for landscape, but if possible I'd like to use it for interiors too. Link to comment Share on other sites More sharing options...
paul_mullins Posted August 6, 2013 Share Posted August 6, 2013 <p>I use the Samyang 14mm for landscapes quite a bit and have found it to be quite good.<br> <img src="http://farm8.staticflickr.com/7303/8719341274_d32fb605ae_o.jpg" alt="" /></p> Link to comment Share on other sites More sharing options...
dcstep Posted August 6, 2013 Share Posted August 6, 2013 <p ><a name="00bt73"></a><a href="/photodb/user?user_id=1501968">Bernie West</a>, Aug 06, 2013; 01:58 a.m. said:</p> <blockquote> <p>So if I went with a fisheye, how easy is it to "un-fisheye" it? Can I do that in lightroom? And does it retain high IQ and resolution after being un-fisheyed?</p> </blockquote> <p>I use DxO Optics Pro to de-fish my Sigma. It is totally automatic if you use a body/lens combination that they support (see their site). Another thing that I like about DxO is that they have a slider to determine what percentage correction is applie, from 0 to 100%.</p> <p>Here's a landscape from last night, with the 15mm Sigma and my full-frame Canon 5D MkIII:</p> <p> </p> <p><a title="High water in our pond by dcstep, on Flickr" href=" src="http://farm4.staticflickr.com/3726/9445995433_df4c9c35b6_c.jpg" alt="High water in our pond" width="800" height="534" /></a></p> Link to comment Share on other sites More sharing options...
joel_p Posted August 7, 2013 Share Posted August 7, 2013 <p>I also own the Samyang, and while the sharpness is very good, I don't love the color rendition. When I really need an excellent wide angle prime, I rent the Canon 17 TS. </p> Link to comment Share on other sites More sharing options...
andy_van_eynde Posted August 10, 2013 Share Posted August 10, 2013 <p>Hi Bernie,<br> Wanted a very wide angle lens that was not a fisheye. <br />But also wanted to buy a cheap one so if I did not like having such a wide lens it would not harm my budget. <br />So I a also bought the Samyang 14mm f1,4 a few months ago during my vacation in Washington DC.<br> Did not mind it was manual focus. <br />But I was also aware that focusing with it will be a learning curve.<br />A good tip I found on a forum was to use live view and zoom in 10x, it really helps a lot.<br> For the picture quality I am very pleased so far and can live with the manual focus.<br />It has distortion but all lenses in that range do. <br> Am adding a couple of pictures that where treates with a lens profile for this lens (via lightroom).<br> <img 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<div></div> 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