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July 6 Math 2306 sec 52 Summer 2016
Section 11: Linear Mechanical Equations
Here we consider linear mechanical systems which will berepresented by a spring-mass-damper-driving force system. We’ll buildup the level of complexity in stages considering
I Simple Harmonic Motion (spring force, but no damping or driving)
I Spring-mass-damper (spring force w/damping, no driving)
I Spring-mass-damper with driving
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Position: Equilibrium
Figure: In the absence of any displacement, the system is at equilibrium.Displacement—i.e. position—x(t), at time t , is measured from equilibriumx = 0.
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Building an Equation: Hooke’s LawNewton’s Second Law: F = ma Force = mass times acceleration
a =d2xdt2 =⇒ F = m
d2xdt2
Hooke’s Law: F = kx Force exerted by the spring is proportional todisplacementThe force imparted by the spring opposes the direction of motion.
md2xdt2 = −kx =⇒ x ′′ + ω2x = 0 where ω =
√km
Convention We’ll Use: Up will be positive (x > 0), and down will benegative (x < 0). This orientation is arbitrary and follows theconvention in Trench.
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Displacement in Equilibrium
Figure: (i) a spring with no mass, (ii) a mass stretches the spring δx units inequilibrium to create a new equilibrium for the spring-mass system, (iii)displacement x(t) is then measured from this new equilibrium position.
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Obtaining the Spring Constant (US Customary Units)
If an object with weight W pounds stretches a spring δx feet inequilibrium, the by Hooke’s law we compute the spring constant via theequation
W = kδx .
The units for k in this system of measure are lb/ft.
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Obtaining the Mass (US Customary Units)
Note also that Weight = mass × acceleration due to gravity. Hence ifwe know the weight of an object, we can obtain the mass via
W = mg.
We typically take the approximation g = 32 ft/sec2. The units for massare lb sec2/ft which are called slugs.
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Obtaining the Parameters (SI Units)
In SI units, the weight would be expressed in Newtons (N). Theappropriate units for displacement would be meters (m). In these units,the spring constant would have units of N/m. Where again
k =Wδx
where δx is displacement in equilibrium.
It is customary to describe an object by its mass in kilograms. Whenwe encounter such a description, we deduce the weight in Newtons
W = mg taking the approximation g = 9.8 m/sec2.
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Obtaining ω from Displacment in Equilibrium withoutWeight
If we know that an object displaces a spring δx units in equilibrium,then we can equate weight (mg) with spring force (kδx) by Hooke’slaw:
mg = kδx .
Without knowing the weight or the spring constant, the value ω can bededuced from δx by
ω2 =km
=gδx.
Provided that values for δx and g are used in appropriate units, ω is inunits of per second.
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Simple Harmonic Motion
x ′′ + ω2x = 0, x(0) = x0, x ′(0) = x1
Here, x0 and x1 are the initial position (relative to equilibrium) andvelocity, respectively.
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Simple Harmonic Motion (no damping or driving)
The IVP governing displacement is
x ′′ + ω2x = 0, x(0) = x0, x ′(0) = x1 (1)
The solution isx(t) = x0 cos(ωt) +
x1
ωsin(ωt) (2)
called the equation of motion*.
Caution: The phrase equation of motion is used differently by differentauthors. Some, including Trench, use this phrase to refer to the ODEof which (1) would be the example here. Others use it to refer to thesolution to the associated IVP which is given by (2).
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x(t) = x0 cos(ωt) + x1ω sin(ωt)
Characteristics of the system include
I the period T = 2πω ,
I the frequency f = 1T = ω
2π∗
I the circular (or angular) frequency ω, and
I the amplitude or maximum displacement A =√
x20 + (x1/ω)2
∗Various authors call f the natural frequency and others use this term for ω.July 5, 2016 13 / 105
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Amplitude and Phase Shift
We can formulate the solution in terms of a single sine (or cosine)function. Letting
x(t) = x0 cos(ωt) +x1
ωsin(ωt) = A sin(ωt + φ)
requires
A =√
x20 + (x1/ω)2,
and the phase shift φ must be defined by
sinφ =x0
A, with cosφ =
x1
ωA.
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ExampleAn object stretches a spring 4 inches in equilibrium. Assuming nodriving force and no damping, set up the differential equationdescribing this system.
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ExampleA 4 pound weight stretches a spring 6 inches. The mass is releasedfrom a position 4 feet above equilibrium with an initial downwardvelocity of 24 ft/sec. Find the equation of motion, the period, amplitude,phase shift, and frequency of the motion. (Take g = 32 ft/sec2.)
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Initial Conditions
To determine the future position, initial position and velocity must begiven.
I In this course, we’ll use the convention that up is positive anddown is negative.
I If we’re told that an object starts at equilibrium, then x(0) = 0.
I If we’re told that an object starts from rest, then this means thatx ′(0) = 0.
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Free Damped Motion
Figure: If a damping force is added, we’ll assume that this force isproportional to the instantaneous velocity.
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Free Damped MotionNow we wish to consider an added force corresponding todamping—friction, a dashpot, air resistance.
Total Force = Force of spring + Force of damping
md2xdt2 = −βdx
dt− kx =⇒ d2x
dt2 + 2λdxdt
+ ω2x = 0
where
2λ =β
mand ω =
√km.
Three qualitatively different solutions can occur depending on thenature of the roots of the characteristic equation
r2 + 2λr + ω2 = 0 with roots r1,2 = −λ±√λ2 − ω2.
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Case 1: λ2 > ω2 Overdamped
x(t) = e−λt(
c1et√λ2−ω2
+ c2e−t√λ2−ω2
)
Figure: (The red curve is ”critical damping” and is only shown as areference.) Two distinct real roots. No oscillations. Approach to equilibriummay be slow. (Blue and Green curves are overdamped.)
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Case 2: λ2 = ω2 Critically Damped
x(t) = e−λt (c1 + c2t)
Figure: One real root. No oscillations. Fastest approach to equilibrium.
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Case 3: λ2 < ω2 Underdamped
x(t) = e−λt (c1 cos(ω1t) + c2 sin(ω1t)) , ω1 =√ω2 − λ2
Figure: Complex conjugate roots. Oscillations occur as the systemapproaches (resting) equilibrium.
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Comparison of Damping
Figure: Comparison of motion for the three damping types.
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ExampleA 2 kg mass is attached to a spring whose spring constant is 12 N/m.The surrounding medium offers a damping force numerically equal to10 times the instantaneous velocity. Write the differential equationdescribing this system. Determine if the motion is underdamped,overdamped or critically damped.
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ExampleA 3 kg mass is attached to a spring whose spring constant is 12 N/m.The surrounding medium offers a damping force numerically equal to12 times the instantaneous velocity. Write the differential equationdescribing this system. Determine if the motion is underdamped,overdamped or critically damped. If the mass is released from theequilibrium position with an upward velocity of 1 m/sec, solve theresulting initial value problem.
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Driven Motion
We can consider the application of an external driving force (with orwithout damping). Assume a time dependent force f (t) is applied tothe system. The ODE governing displacement becomes
md2xdt2 = −βdx
dt− kx + f (t), β ≥ 0.
Divide out m and let F (t) = f (t)/m to obtain the nonhomogeneousequation
d2xdt2 + 2λ
dxdt
+ ω2x = F (t)
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Forced Undamped Motion and Resonance
Consider the case F (t) = F0 cos(γt) or F (t) = F0 sin(γt), and λ = 0.Two cases arise
(1) γ 6= ω, and (2) γ = ω.
Taking the sine case, the DE is
x ′′ + ω2x = F0 sin(γt)
with complementary solution
xc = c1 cos(ωt) + c2 sin(ωt).
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x ′′ + ω2x = F0 sin(γt)
Note that
xc = c1 cos(ωt) + c2 sin(ωt).
Using the method of undetermined coefficients, the first guess to theparticular solution is
xp = A cos(γt)+B sin(γt)
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x ′′ + ω2x = F0 sin(γt)
Note that
xc = c1 cos(ωt) + c2 sin(ωt).
Using the method of undetermined coefficients, the first guess to theparticular solution is
xp = A cos(γt)+B sin(γt)
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Forced Undamped Motion and Resonance
For F (t) = F0 sin(γt) starting from rest at equilibrium:
Case (1): x ′′ + ω2x = F0 sin(γt), x(0) = 0, x ′(0) = 0
x(t) =F0
ω2 − γ2
(sin(γt)− γ
ωsin(ωt)
)If γ ≈ ω, the amplitude of motion could be rather large!
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Pure Resonance
Case (2): x ′′ + ω2x = F0 sin(ωt), x(0) = 0, x ′(0) = 0
x(t) =F0
2ω2 sin(ωt)− F0
2ωt cos(ωt)
Note that the amplitude, α, of the second term is a function of t:
α(t) =F0t2ω
which grows without bound!
Forced Motion and Resonance Applet
Choose ”Elongation diagram” to see a plot of displacement. Try exciterfrequencies close to ω.
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Section 12: LRC Series Circuits
Figure: Kirchhoff’s Law: The charge q on the capacitor satisfiesLq′′ + Rq′ + 1
C q = E(t).
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LRC Series Circuit (Free Electrical Vibrations)
Ld2qdt2 + R
dqdt
+1C
q = 0
If the applied force E(t) = 0, then the electrical vibrations of thecircuit are said to be free. These are categorized as
overdamped if R2 − 4L/C > 0,critically damped if R2 − 4L/C = 0,underdamped if R2 − 4L/C < 0.
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Steady and Transient States
Given a nonzero applied voltage E(t), we obtain an IVP withnonhomogeneous ODE for the charge q
Lq′′ + Rq′ +1C
q = E(t), q(0) = q0, q′(0) = i0.
From our basic theory of linear equations we know that the solution willtake the form
q(t) = qc(t) + qp(t).
The function of qc is influenced by the initial state (q0 and i0) and willdecay exponentially as t →∞. Hence qc is called the transient statecharge of the system.
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Steady and Transient States
Given a nonzero applied voltage E(t), we obtain an IVP withnonhomogeneous ODE for the charge q
Lq′′ + Rq′ +1C
q = E(t), q(0) = q0, q′(0) = i0.
From our basic theory of linear equations we know that the solution willtake the form
q(t) = qc(t) + qp(t).
The function qp is independent of the initial state but depends on thecharacteristics of the circuit (L, R, and C) and the applied voltage E .qp is called the steady state charge of the system.
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ExampleAn LRC series circuit has inductance 0.5 h, resistance 10 ohms, andcapacitance 4 · 10−3 f. Find the steady state current of the system ifthe applied force is E(t) = 5 cos(10t).
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