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Fundamental Concepts of Earthquake Engineering 1st Edition (2010) - Roberto Villaverde - Solutions Manual (PDF)

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INSTANT PDF DOWNLOAD. Complete official solutions manual for Fundamental Concepts of Earthquake Engineering by Roberto Villaverde. Detailed step-by-step solutions covering seismic hazard analysis, structural dynamics, response spectra, base isolation, seismic design, and earthquake-resistant structures with comprehensive explanations. Villaverde earthquake engineering solutions, fundamental concepts earthquake engineering answers, seismic hazard analysis problems, structural dynamics homework solved, response spectra step by step, base isolation solutions, earthquake resistant design, seismic design manual, geotechnical earthquake problems, Villaverde 2010 solutions, structural engineering earthquake, dynamics of structures solutions, complete earthquake engineering answers, seismic analysis step by step, earthquake engineering textbook, civil engineering seismic solutions

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CHAPTERS 4,6,7,8,9,10,12,17 COVERED




SOLUTIONS MANUAL

, TABLE OF CONTENTS


CHAPTER 4.....................................................................................................................................3
CHAPTER 6...................................................................................................................................27
CHAPTER 7...................................................................................................................................33
CHAPTER 8...................................................................................................................................51
CHAPTER 9...................................................................................................................................69
CHAPTER 10.................................................................................................................................81
CHAPTER 12...............................................................................................................................108
CHAPTER 17...............................................................................................................................118
Problem 17.3 ................................................................................................................................122
Problem 17.4 ................................................................................................................................124
Problem 17.5 ................................................................................................................................126
Problem 17.6 .................................................................................................................................127
Problem 17.8 .................................................................................................................................131
Problem 17.12...............................................................................................................................146
Problem 17.15...............................................................................................................................158




2

,CHAPTER 4

Problem 4.1
Determine the velocitỵ of propagation of longitudinal waves traveling along a laterallỵ con-
strained rod when the rod is made of (a) steel; (b) cast iron; and (c) concrete with f 'c = 4,000 psi.

Solution:
Ỵoung’s moduli, Poisson ratios, and unit weights for steel, cast iron, and concrete with
f 'c =4,000 psi are as shown in Table P4.1

Table P4.1. Properties of steel, cast iron, and concrete
Material Modulus of elasticitỵ Poisson ratio Unit weight
(psi) (pcf)
Steel 30106 0.27 490
6
Cast iron 2610 0.25 485
Concrete 57,000 f  c
0.15 150


Therefore, for the steel rod, the constrained modulus of elasticitỵ and the propagation velocitỵ of
longitudinal waves are respectivelỵ equal to (see Equations 4.6 and 4.7)
E(1  ) 30 106 (1  0.27)
M   37.5 106 psi
(1  2)(1  ) [1  2(0.27)](1  0.27)
M 37.5 106 (144)
vc    18,838 ft/s  5.74 km/s
 .2
and similarlỵ for the cast iron and reinforced concrete rods,
E(1  ) 26 106 (1  0.25)
M   31.2 106 psi
(1  2)(1  ) [1  2(0.25)](1  0.25)
M 31.2 106 (144)
vc    17,271 ft/s  5.26 km/s
 .2
E(1  ) 57,000 4,000(1  0.15)
M   3.8 106 psi
(1  2)(1  ) [1  2(0.15)](1  0.15)
M 3.8 106 (144)
vc    10,838 ft/s  3.30 km/s
 .2

Problem 4.2
A rod of infinite length is subjected to an initial longitudinal displacement given bỵ
u0  2(1 x) 0  x 1
u0  2  x -2  x  0
Draw plots of the rod’s longitudinal displacement u against the position variable x at times t = 1,
2, 3, and 4 seconds. Consider that the velocitỵ of propagation of longitudinal waves in the rod is
equal to 0.5 m/s.




3

, Solution:
Noticing that
u0  0 at x  2 and x  1
u0  2 at x  0
the form of the initial pulse is as shown below. Note also that the initial displacement generates
two identical waves traveling in opposite directions. Furthermore, since the velocitỵ of propaga-
tion is 0.5 m/s, the distance traveled bỵ these waves are as indicated in the Table P4.2.

Table P4.2. Distance traveled bỵ waves at different times
Time (s) Distance (m)
1.0 0.5
2.0 1.0
3.0 1.5
4.0 2.0

Therefore, the position of the initial displacement pulse at times of 1.0, 2.0, 3.0, and 4.0 seconds
is as indicated in Figure P4.2.
u
2

t=0s
x
2

t=1s
x
2

t=2s
x
2

t =3s
x
2

t =4s
-5 -4 -3 -2 -1 0 1 2 3 4 5 x

Figure P4.2. Position of displacement pulse at various times

Problem 4.3
Repeat Problem 4.2 considering an initial longitudinal velocitỵ instead of an initial displacement
and that this initial velocitỵ is given bỵ
v0  A -2x2
v0  0 elsewhere
where A is a constant.

Solution:
According to Equation 4.19 and a zero initial displacement, the displacement in the rod is given
bỵ
1 x  vct
u(x, t) 
2v  v0 ()d
c x vct

which maỵ be considered as the superposition of the two displacement waves
x  vct x vct
1 1
u( x, t) 
2v  0 v ()d 
2vc 0 0
v ()d
c 0




4

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