Suggesting that the empirical data -- that a 170mm crank is the correct length for a cyclist with a 31-inch inseam -- must be flawed is an easy attack. An incorrect correlation here would mean that the 5.48 constant is off; presuming that a 170mm crank were a perfect fit for a cyclist with a 30-inch inseam, for example, would result in a constant of 5.67. This could, in fact, be the case; in the discussion, I point out that it may actually be between 5.48 and 5.6, and I'm sure there could even be arguments for it being somewhere beyond that range. But arguing about this value -- or the empirical data it is based on -- won't address the objections most cyclists have to this formula. Even if this value is increased to 6 or decreased to 5, we are still talking about crank lengths that change by 5mm or more for every inch of inseam change! And that is what people find objectionable.
The third assumption, that the formula can be based on inseam length, also comes under attack often. People have suggested all sorts of body measurements that they feel would be more accurate or more representative than inseam length. There's actually no arguing this point; basing the formula on the length of the upper leg alone would be better -- if it were possible to conveniently and consistently obtain accurate measurements of the upper leg. Unfortunately, it is not, and even if it were, the difference in the results would be minor. The resulting formula would still call for crank lengths varying from 150mm to 200mm and beyond for adult human beings of different sizes, which would still appear extreme and unreasonable to those whose minds are bound by current tradition.
The second assumption, that crank length should be proportional to some bodily measurement, is also often a source of doubts. Some have suggested that crank length should perhaps have some non-proportional relation to leg length; a formula of the form
L = A + (B x I)
for example, where A is some fixed base crank length and B
is
multiplied by the inseam measurement to provide some "adjustment" to
the base length to correct for differing leg lengths. This
general formula is actually nearly universally agreed to; only the
values of A and B are in question. In the formula I have
proposed, A is zero and B is 5.48, while the status quo is that A is
170 and B is zero. Could the true answer lie somewhere in
between? Perhaps. People with long legs don't move exactly
the same way as people with short legs, so simply scaling up crank
lengths may not be perfectly valid. This would mean the true
answer would involve some non-zero values for both A and B.
But when applying such a formula to extremes such as small
children,
one quickly realizes that the fixed basic length A must be quite small
while the (B x I) component must be the dominating part of this formula
-- which will still result in crank lengths that vary by several mm for each inch of inseam
length.
Those who insist that 170mm must be pretty close to correct for
everyone are thinking the other way around, that A is large (nearly
170mm) and B must be tiny and insignificant, resulting in only a couple
of mm variation from the shortest cyclist to the tallest.
In other words, their objection isn't really with the second assumption; it's with the first assumption.
The first assumption -- that crank length should vary with the leg length of the cyclist -- is the real cause of consternation among cyclists objecting to my formula. If you steadfastly believe that the current practices of crank length selection are correct or nearly correct, what you are saying is that you disagree with this first assumption, and feel that all cyclists should be using the same size crank. Pointing out that there are 170mm, 172.5mm, and 175mm cranks available says nothing, since these variations are less than 2% - less than an eighth of an inch each. This is simply insignificant; if you put a 170mm crank on one side of your bike and a 172.5mm on the other, you'd be hard pressed to tell which side was longer when riding.
The concept that all riders should be using the same
length
crank has
the strength of being the status quo, but I fail to see any logic
whatsoever
behind it. Some have suggested that all cranks should be the same
length because of something to do with the nature of the sport, the
same way that baseball players all use the same length bat and tennis
players all use the same length racket. But those are artificial
limitations intended to force all players to compete on equal terms,
not personal fit issues. Golfers use different length clubs
depending on how tall they are, and runners use shoes that fit their
feet -- and take whatever length stride suits them, with taller runners
generally taking longer strides than shorter runners. Cyclists
choose shoes, frames, and clothing that fits their bodies -- why not
cranks as well?
If anyone can provide rational arguments that all cyclists should be using the same length cranks, I'd love to hear them.
There is the inevitable argument that if this formula was
correct and
crank lengths should vary with leg length, surely that would have been
discovered long ago. Such arguments must necessarily be based on
the idea that the cycling community was more open to new ideas at some
time in the past than they are today, since the vast majority of
cyclists
today are totally unwilling to even consider this formula much
less buy a crank and try it out. I find the entire concept of an
enlightened era of cycling questionable; I've been involved with
cycling
since the 1970's, and during that time there has never been
more
willingness to try new ideas than there is today. In fact, in the
70's it was all but impossible to convince a competitive cyclist to use
a component that didn't have "Campagnolo" written on it, regardless of
the technical advances being offered by other companies. It would
not surprise me at all to learn that the cycling community has always
been
resistant to new ideas such as crank length variations based on leg
length, and that they
simply have never been seriously tested. The few times they have
been tried
-- such as tall Miguel Indurain's use of longer cranks, revealed only
after
his retirement -- the results seem to have been encouraging.
After all, Indurain did win the Tour de France five times, and didn't
seem to suffer any adverse effects from his use of long cranks for
competition.
The only real problem with the formula is that it results
in crank length
numbers that just don't sound right. So, allow me to
suggest
this: instead of talking about crank lengths in mm, start talking about
them in cm. The standard crank length is 17cm, and if you shop
around
you can find cranks with 17-1/4 or 17-1/2 cm lengths. These are
silly
variations; it would make more sense if cranks were commonly available
in lengths from 15 to 19 cm in 1/2 cm increments, with custom cranks
available
even longer for unusually tall riders and shorter versions available
for
children. There, does that sound better?
Return to Kirby Palm's home page.
Of course, if you have questions or comments, you are welcome to send e-mail to me at "palmk at nettally dot com".