J. Peraire
16.07 Dynamics
Fall 2004
Version 1.5
Lecture D14 - Accelerometers. Newtonian Relativity
Accelerometers
An accelerometer is a device used to measure linear acceleration without an external reference. The main
idea has already been illustrated in the previous lecture with the example of the boy in the elevator. Clearly,
if we know the weight of the boy when the acceleration is zero, we can determine from the reading on the
scale the value of the acceleration. In summary, the acceleration will produce an inertial force on a test
mass, and this force can be nulled and measured with precision. Below we have a sketch of a very simple
one axis accelerometer.
SCALE
ELASTIC RESTRAINT
DAMPER
MASS ELEMENT
POINTER
ACCELEROMETER
AXIS CASE
In addition to the restraining spring, the accelerometer has a damper which quickly eliminates the oscillations
that would otherwise occur due to rapid changes in acceleration. The force of the damper is proportional
to the velocity and opposes the direction of motion, so that when the mass settles to a fixed position, the
effect of the damper force disappears.
If we are able to obtain the value of the acceleration at every instant, then, given the initial conditions,
two time integrations can be done in real time to yield the position. This is the basis of inertial navigation,
a topic of enormous technical significance in aerospace. The problem with this simple strategy is that the
test mass is also acted upon by gravity, in addition to the inertial force. The navigation problem can be
resolved if we know our location exactly, and the direction in which the accelerometer’s measurement axis is
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pointing (in practice one would use a combination of accelerometers to obtain readings in three orthogonal
directions). The direction is measured independently using gyroscopes, which we will study in future lectures;
the location (required to extract the value of the gravity force) is tracked by integrating the acceleration.
The final ingredient is an accurate map, or model, for the gravity field as a function of position.
Let us consider an accelerometer, or system of accelerometers, capable of providing readings along two (or
three, when we consider a 3D space) orthogonal directions x′y′.
The external force on the test mass, m, will be F = R + mg, where R is the total force exerted by the
springs, and g is the gravity acceleration vector. If the mass has an acceleration a, the inertial force for an
observer B moving with the mass will be simply Finertial = ?ma. Thus,
F +Finertial = R+ mg ?ma = 0 ,
or,
R
m = ?(g?a) = (a?g) .
The quantity (a?g) is called the specific force and is the actual measurement that we will obtain from the
accelerometer. Note that if we are dealing with a single axis accelerometer, with the axis parallel to the unit
vector ea, then the accelerometer will only provide the component of R along that axis, i.e. Ra = ea ·R.
Thus, from the above equation, we have
Ra
m = ea ·(a?g) = (aa ?ga) .
Newtonian Relativity (from Hollister)
Although relativistic corrections are not necessary for most aerospace engineering applications (with the
possible exception of the very large scale GPS systems), one concept of Einstein’s General Relativity is
helpful in understanding gravity. It is called the Principle of Equivalence. The concept is that, since the
specific force (a?g) is the only quantity that can be measured, gravity and inertial acceleration cannot be
distinguished by measurement only. Once again, this can be illustrated with the example of the boy in the
elevator. If the boy did not know his weight before getting into the elevator, once inside the elevator he
would not be able to tell the difference between gravitational acceleration and inertial acceleration. That
is, for an accelerated observer, inertial forces and gravity appear to be of exactly the same form. It is then
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appropriate to think that the effect of being accelerated is equivalent to that of modifying the gravity field
to an effective gravitational acceleration given by,
geff = g?a . (1)
We will illustrate this idea in the example below.
Example Pendulum
We now consider a simple pendulum consisting of a mass, m, suspended from a string of length l and
negligible mass.
We can formulate the problem in polar coordinates, and, noting that r = l (constant), write for the r and θ
components,
mgcosθ ?T = ?ml˙θ2
?mgsinθ = ml¨θ , (2)
where T is the tension on the string. If we restrict the example to the small oscillations case, then sinθ ≈ θ,
and the θ-equation
¨θ + g
l θ = 0 ,
can be integrated to yield
θ(t) = C1 cos(
radicalbiggg
l t)+ C2 sin(
radicalbiggg
l t) ,
where the constants C1 and C2 are determined by the initial conditions.
Let us now consider a non inertial observer who is rigidly attached to the oscillating mass, and try to
determine the effective gravity that this observer will experience. One possible way to do this would be to
install a small accelerometer capable of providing specific forces in the local r and θ directions. You could
try to compute the forces that the springs exert on the test mass, using both, the inertial and the accelerated
reference frames.
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Using the expression (1) for the effective acceleration, we have,
geff = g ?a = (gcosθer ?gsinθeθ)?(?l˙θ2er + l¨θeθ) = (gcosθ + l˙θ2)er ,
where we have used the fact that gsinθ + l¨θ = 0, from (2). Thus, we see that the effective gravity points
in the radial direction. This explains why when we swing a bottle with fluid inside, the surface of the fluid
remains normal to the string.
Example Plumb and balloon on an aircraft
Inside an aircraft there is a plumb suspended from the ceiling and a helium filled balloon attached to the
floor as shown in the sketch. When the aircraft is flying at a horizontal constant velocity, the tension in the
string holding the plumb is 2 N, and the tension in the string holding the balloon is 1 N.
We want to calculate the angle that the strings form with the vertical and the tension in the strings when:
a) the aircraft is at the bottom of a vertical circular loop of radius R, and is flying at a constant speed of
v = √gR.
b) the aircraft is at the top of a vertical circular loop of radius R, and is flying at a constant speed of
v = √gR.
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c) the aircraft is doing a horizontal loop of radius R, at a constant speed of v = √gR. During the loop,
the aircraft is in an unbanked position (zero roll).
We will also neglect dynamic effects. That is, we will consider that the plumb and the balloon are at rest
relative to the aircraft and in equilibrium under the instantaneous forces.
Solution:
The mass of the plumb is mP = (2/g) kg. For the balloon, we have that the weight of the volume of air
displaced is ρairVBg, and the weight of the helium inside the balloon is ρheliumVBg, where VB is the volume
of the balloon. If we neglect the weight of the balloon itself, we have ?(ρhelium ?ρair)VB = (1/g) kg.
a) At the bottom of the vertical loop, the acceleration will be ac = v2/R = g. Therefore, a vertical
axis accelerometer will show an acceleration of 2g. The effective gravity will be geff = ?2gj. The
strings for the plumb and for the balloon will remain vertical. The tension in the plumb line will be
TP = mP(2g) = 4 N, and for the balloon TB = ?(ρhelium ?ρair)VB(2g) = 2 N.
b) At the top of the loop, a vertical axis accelerometer will show a zero reading (i.e. a = g). Therefore,
the effective gravity will be zero, and we will have, TP = 0 and TB = 0.
c) In this case, the centripetal acceleration, ac = v2/R = g, is in the horizontal direction.
The vector geff = g ?a = ?√2g(i+ j) has a magnitude of √2g and forms an angle of 45o with the
vertical. Therefore, the tension in the plumb line will be TP = mP(√2g) = 2√2 N,
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and for the balloon TB = ?(ρhelium ?ρair)VB(√2g) = √2 N.
The plumb and balloon strings will form an angle of φ = 45o with the vertical.
References
[1] W.H. Hollister, Unified Engineering Notes, Course 93-94.
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