Notice how the values 'clump' together towards the left end of the scale (nearer f/1) and grow further and further apart towards the right. The scale is linear and there's a dot for each of the f-numbers separated by 1-stop (1, 1.4, 2, 2.8, 4, 5.6. This is just a characteristic of logarithmic functions (or exponential functions, depending of how you look at it). The fact of the matter is that, for smaller f-stop numbers (faster lenses), the difference between consecutive stops is much smaller than it is for larger f-stop numbers. However, once you do the calculation, you realize it is one stop difference! This is twice the light (and, theoretically, twice as fast the shutter-speed for the same ISO and lighting conditions). As a practical matter tough, I usually don't bother doing this and just round the number Let's look at a few more examples.Įxample 2: how much faster is a f/1.2 lens versus a f/1.8 lens?Īt first glance, 1.2 and 1.8 doesn't seem like much of a difference. If you repeat the calculations above with more precise f-numbers, you will get something closer to 3. Figure 2 shows the f-stop calculated with two digit precision and you can tell that, except for the powers of 2, the other numbers are actually rounded. This is done for practical reasons of course (how useful would it be to have three or four digit precision anyway?). Why the small difference? Well the reality that many people don't realize is that the f-stop numbers manufacturers assign are rounded to one decimal point. Which is close enough to 3-stops as we predicted. But let's look at is using the formula above: Examples Example 1: how much faster is a f/5.6 lens versus a f/2 lens?Īn experienced photographer will tell you immediatelly this is a 3-stop difference. In fact, provided you use the same type of logarithm in the numerator and denominator the formula is still valid. Notice that in Figure 1, I used natural logarithms (usually marked as 'ln' in most scientific calculators), but you can also use base 10 logarithms (usually 'log' in a calculator) and the formula will still work. With that in mind, it's simply a matter of applying logarithms to boths sides and solving for 'n' to get the number of f-stops as a function of 'a' and 'b': To put this mathematically, if 'b' and 'a' are two apertures separated by 'n' stops then the relation in Figure 1 must hold. The key point is that every element in this sequence of numbers equals the preceding element times the square root of 2 (see the article for more details). I've written before in this site about the logic behind the f-number sequence we see in lenses (1, 1.4, 2, 2.8, 4. For example, how much faster is a f/1.2 lens versus a f/1.4 lens? I decided to write this short article to hopefully clarify this topic and offer a simple formula that anyone with a scientific calculator can use. There is considerable confusion in internet forums about the topic of f-stops, more precisely, of how many stops are there between two given lens apertures. This is a short article explaining how to calculate the number of f-stops between two apertures.
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