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View Full Version : Re: Moments about C of R?

unknown user
05-30-1991, 10:26 PM

The posting on joint centers of rotation by Ian Stokes is interesting;
a (literal) shift of perspective from the center of rotation can be useful.
I tend to disagree however, with his final conclusion that "...neither
biomechanical theory, nor practical considerations support it (the use
of joint centers as reference points)". If you do not make assumptions
about the line of action of the joint force (JF), the JF must be described
by 3 variables (2D) instead of 2: two components of force, and one for
the line of action. This introduces one extra unknown variable into the moment
equilibrium equation, and typically there are too many unknowns already.

So you must make an assumption about the line of action of the JF. But there
instantaneous center of rotation (ICR).

This can be proved using the principle of virtual work. A joint is defined
as a 'kinematic' connection, i.e. the force associated with this connection
generates or absorbs no power at any time. Picture one body (bone) as stationary
while the other is moving. All points on the line of action of the joint force
must have velocities perpendicular to this force (power is the dot product
of force and velocity). In a moving rigid body, every line on which all
velocities have the same direction *must* pass through the ICR. Please take
a few seconds to verify this statement...
So, the joint force also passes through the ICR. Incidentally, this also
proves that the ICR of the knee joint during the swing phase coincides with
the intersection of the cruciate ligaments. The joint force is in that case
the resultant of ligament forces only.

Note that this only applies to true kinematic connections, without frictional
losses or energy storage in elastic cartilage or joint ligaments. Neglecting
these small amounts of energy is probably allowed. Also note that in this
definition, 'joint force' is taken to mean the total 'constraint reaction
force' in mechanical terms, sometimes called 'net joint force'. If you
only want the contact force, without ligaments, the ligament forces become
additional unknowns in the equilibrium equations and that is not what you
want.

A joint, defined as a kinematic connection between two bodies, is more than
just the bone-to-bone contact surfaces. It also includes the structures
that guide the movement without exchanging energy with the system. I.e.
ligaments that can be considered inextensible for the purpose of dynamic
analysis.

Remains the problem that the ICR has (in general) no fixed position on either
bone, and that the ICR is not easily determined during actual movements.
That is exactly why the ICR is taken as the reference point in the moment
equation. That way you do not have to know it! Of course, this implies that
all other moments must alse be calculated about the ICR. For muscular
forces this is no problem: the moment arm with respect to the ICR is the
partial derivative of origin-insertion length with respect to the joint
angle (also to be proved by the principle of virtual work). Using this
definition, moment arms of muscles are easily determined from
cadaver measurements or a rigid-body model incorporating the line of action.
Only for calculation of external (ground reaction force) moments is an
estimated location of the ICR required. Hopefully, moment arms of ground
reaction forces are large enough (or the moments small enough) to be
insensitive to errors in the ICR.

So, my opinion is that moments should be calculated about the ICR. I would
like to hear Ian's reply, or other opinions.

-- Ton van den Bogert
University of Utrecht, Netherlands.