14.8 $f _ { 1 } = f _ { 3 } = 5 \mathrm { i n } ^ { 3 } / \mathrm { s } , \quad f _ { 2 } = 0$ 14.9 $p _ { 2 } = p _ { 3 } = 1 2 ~ \mathrm { m } , ~ p _ { 5 } = 1 1 ~ \mathrm { m }$ # Chapter 15 15.1 d2x ¼ 0:021 in., d3x ¼ 0:042 in., sx ¼ 0 15.2 $d _ { 2 x } = 0 , ~ \sigma _ { x } = 5 0 . 4 ~ \mathrm { M P a }$ 15.3 $d _ { 1 x } = d _ { 1 y } = - 0 . 0 1 7 5 \mathrm { ~ i n . , } \quad \sigma ^ { ( 1 ) } = 4 3 5 0 \mathrm { ~ p s i \ : ( T ) }$ $$ \sigma^ {(2)} = - 6 1 5 0 \text { psi (C) }, \quad \sigma^ {(3)} = 4 3 5 0 \text { psi (T) } $$ 15.4 $d _ { 1 x } = - 0 . 0 2 9 1 \ \mathrm { i n . , } \quad d _ { 1 y } = - 0 . 0 0 9 5 \ \mathrm { i n . }$ $$ \sigma^ {(1)} = - 1 3 7 0 \text { psi (C) }, \quad \sigma^ {(2)} = 2 3 7 5 \text { psi (T) }, \quad \sigma^ {(3)} = - 1 3 7 0 \text { psi (C) } $$ 15.5 $d _ { 2 x } = 1 . 4 4 \times 1 0 ^ { - 4 } \mathrm { m } , ~ \sigma ^ { ( 1 ) } = - 2 0 . 2 \mathrm { M P a } \left( \mathrm { C } \right) , ~ \sigma ^ { ( 2 ) } = \sigma ^ { ( 3 ) } = - 1 0 . 1 \mathrm { M P a } \left( \mathrm { C } \right)$ 15.6 $\begin{array} { r } { d _ { 1 x } = 0 , d _ { 1 y } = 6 . 0 \times 1 0 ^ { - 4 } \mathrm { m } , \sigma ^ { ( 1 ) } = \sigma ^ { ( 3 ) } = - 1 0 . 5 \mathrm { M P a } ( \mathrm { C } ) } \end{array}$ $$ \sigma^ {(2)} = 1 8. 2 \mathrm{MPa(T)} $$ 15.7 $d _ { 1 x } = 0 , d _ { 1 y } = - 3 . 6 \times 1 0 ^ { - 4 } \mathrm { m } , \sigma ^ { ( 1 ) } = \sigma ^ { ( 2 ) } = 0$ 15.8 $d _ { 2 x } = 0 . 0 1 7 3 \ \mathrm { i n . , } \quad \sigma _ { s t } = 8 4 0 \ \mathrm { p s i } \ ( \mathrm { T } ) , \quad \sigma _ { b r } = 1 6 8 0 \ \mathrm { p s i } \ ( \mathrm { C } )$ 15.12 $\mathbf { a } . \ - 0 . 0 0 1 9 0 7 \ \mathrm { i n } . \quad \mathbf { b } . \ \sigma _ { b r } = - 2 8 , 6 0 0 \ \mathrm { p s i } , \quad \sigma _ { m g } = - 1 9 , 0 6 7 \ \mathrm { p s i }$ 15.13 fT1x ¼ -4464 lb, fT1y ¼ -8929 lb, fT2x ¼ 4464 lb $$ f _ {T 2 y} = - 8 9 2 9 \mathrm{lb}, \quad f _ {T 3 x} = 0, \quad f _ {T 3 y} = 1 7, 8 5 7 \mathrm{lb} $$ 15.14 $f _ { T 1 x } = - 4 3 . 1 2 5 ~ \mathrm { k N } , f _ { T 1 y } = 0 , f _ { T 2 x } = 4 3 . 1 2 5 ~ \mathrm { k N } , f _ { T 2 y } = - 8 6 . 2 5 0 ~ \mathrm { k N }$ $$ f _ {T 3 x} = 0, \quad f _ {T 3 y} = 8 6. 2 5 0 \mathrm{kN} $$ 15.15 $f _ { T 1 x } = - 6 0 . 0 \mathrm { ~ k i p } , f _ { T 1 y } = - 9 0 \mathrm { ~ k i p } , f _ { T 2 x } = 6 0 \mathrm { ~ k i p } , f _ { T 2 y } = 0 ,$ $$ f _ {T 3 x} = 0, \quad f _ {T 3 y} = 9 0 \mathrm{kip} $$ 15.16 $f _ { T 1 x } = 1 3 4 \ \mathrm { k N } , f _ { T 1 y } = 1 3 4 \ \mathrm { k N } , f _ { T 2 x } = - 1 3 4 \ \mathrm { k N } , f _ { T 2 y } = 0$ $$ f _ {T 3 x} = 0, \quad f _ {T 3 y} = - 1 3 4 \mathrm{kN} $$ 15.17 $\sigma _ { x } = \sigma _ { y } = - 8 9 2 9 \mathrm { p s i } ( \mathrm { C } ) , \tau _ { x y } = 0$ 15.18 $\sigma _ { x } = 6 7 . 2 ~ \mathrm { M P a } , \sigma _ { y } = 6 7 . 2 ~ \mathrm { M P a } , \tau _ { x y } = 0$ 15.19 $\{ f _ { T } \} = \frac { A E \alpha _ { 0 } } { 6 } \left\{ \begin{array} { r } { - 4 t _ { 1 } - 5 t _ { 2 } } \\ { 4 t _ { 1 } + 5 t _ { 2 } } \end{array} \right\}$ 15.20 $\frac { A E \alpha } { 2 } \bigg \{ { - t _ { 1 } - t _ { 2 } } \bigg \}$ 15.21 $\{f_{T}\}=\frac{2\pi\bar{r}AE\alpha(\Delta T)[\bar{B}]^{T}}{1-2\nu}\left\{\begin{array}{l}1\\ 1\\ 1\\ 0\end{array}\right\}$ 15.22 $d_{2x} = 0.8 \times 10^{-3}$ in., $d_{3x} = 0$ , $d_{3y} = 0.8 \times 10^{-3}$ in. $d_{4x} = d_{4y} = 0.8 \times 10^{-3}$ in.; stresses are zero 15.23 $d_{2x} = 0.989 \times 10^{-3}$ in., $d_{3x} = -0.756 \times 10^{-3}$ in., $$ d _ {3 y} = 0. 9 8 9 \times 1 0 ^ {- 3} \text { in. }, \quad d _ {4 x} = 0. 1 3 2 \times 1 0 ^ {- 2} \text { in. }, $$ $$ d _ {4 y} = 0. 2 0 4 5 \times 1 0 ^ {- 2} \text {in.}, \quad \sigma_ {1} ^ {(1)} = 1 7 \mathrm{ksi}, \quad \sigma_ {2} ^ {(2)} = - 1 7 \mathrm{ksi} $$ # Chapter 16 16.1 $[M] = \frac{\rho AL}{6}\left[ \begin{array}{ccc}2 & 1 & 0\\ 1 & 4 & 1\\ 0 & 1 & 2 \end{array} \right]$ 16.2 a. $[M] = \frac{\rho AL}{2}\left[ \begin{array}{cccc}1 & 0 & 0 & 0\\ 0 & 2 & 0 & 0\\ 0 & 0 & 2 & 0\\ 0 & 0 & 0 & 1 \end{array} \right]$ $\mathbf{b.}[M] = \frac{\rho AL}{6}\left[ \begin{array}{cccc}2 & 1 & 0 & 0\\ 1 & 4 & 1 & 0\\ 0 & 1 & 4 & 1\\ 0 & 0 & 1 & 2 \end{array} \right]$ 16.3 $\omega_{1} = 0.806\sqrt{u},\omega_{2} = 2.81\sqrt{\mu}$ 16.4 $\omega_{1} = 5.368\times 10^{3}\mathrm{rad / s},\quad \omega_{2} = 17.556\times 10^{3}\mathrm{rad / s}$ 16.5 a. $t(\mathrm{s})$ $d_{i}(\mathrm{ft})$ $\dot{d}_i(\mathrm{ft / s})$ $\ddot{d}_i(\mathrm{ft / s^2})$
00025
0.030.011250.7122.09
0.060.042381.03-0.715
0.090.072870.67-22.87
0.120.08278-0.35-45.28
0.150.05194-1.43-26.94
16.6 a. t ðsÞ $d _ { i }$ ðftÞ $\dot { d } _ { i } \left( \mathrm { f t } / \mathrm { s } \right)$ $\ddot { d } _ { i } \ ( \mathrm { f t } / \mathrm { s } ^ { 2 } )$
00010.00
0.020.00200.1686.80
0.040.006720.2561.968
0.060.012230.242-3.338
0.080.016400.130-7.84
0.100.01743-0.053-10.46
b. $t$ (s) $d_{i}$ (ft) $\dot{d}_{i}$ (ft/s) $\ddot{d}_{i}$ (ft/s2) $F(t)$ (lb)
0.000.000000.00010.00020.0
0.020.001790.1696.92316.0
0.040.006250.2632.24812.0
0.060.01150.254-2.9458.0
0.080.01570.150-7.4584.0
0.100.0169-0.0147-10.2510.0
16.7 Node t ðsÞ di ðin:Þ $\dot { d } _ { i } \ ( \mathrm { i n . / s } )$ $\ddot { d } _ { i } \ ( \mathrm { i n } . / \mathrm { s } ^ { 2 } )$
20000
0.000252.6E-60.031249.6
0.000503.4E-50.2841768.9
0.000751.9E-41.0854641.9
0.00106.36E-42.6057519.3
30000
0.000256.59E-50.7916328.8
0.000504.99E-42.8179881.2
0.000751.51E-35.2659701.7
0.00103.10E-37.3697128.3
16.8 Using Newmark’s method with $\begin{array} { r } { \gamma = \frac { 1 } { 2 } , \beta = \frac { 1 } { 6 } } \end{array}$
Nodet (s) $d_i$ (in.) $\dot{d}_i$ (in./s) $\ddot{d}_i$ (in./s2)F(t) (lb)
200000
0.050.001720.1034.1310
0.100.015440.51312.270
300040.02000
0.050.04481.68527.391800
0.100.15362.4794.371600
$\begin{array} { l l l } { { { \bf 1 6 . 1 1 } } } & { { { \bf a . } { \ \omega } \omega _ { 1 } = \displaystyle \frac { 3 . 1 5 } { L ^ { 2 } } \left( \frac { E I } { \rho A } \right) ^ { 1 / 2 } , } } & { { \omega _ { 2 } = \displaystyle \frac { 1 6 . 2 4 } { L ^ { 2 } } \left( \frac { E I } { \rho A } \right) ^ { 1 / 2 } , } } & { { { \bf c . } { \omega } \omega _ { 1 } = \displaystyle \frac { 9 . 8 } { L ^ { 2 } } \left( \frac { E I } { \rho A } \right) ^ { 1 / 2 } } } \\ { { } } & { { { \bf d . } { \omega } = \displaystyle \frac { 1 4 . 8 } { L ^ { 2 } } \left( \frac { E I } { \rho A } \right) ^ { 1 / 2 } } } & { { } } & { { { \bf d . } } } \end{array}$ EI 1=2 EI 1=2 EI 1=2
16.17Node:123456
it (s)Temperature (°C)
00200200200200200200
180159.0095191.4441198.2110199.6110199.8444
2160135.5852178.1491193.6620198.2112199.1445
3240120.2309165.7003187.3485195.5379197.5152
4320109.1993154.9587180.4038191.7446194.8115
5400100.7600145.7784173.4129187.1268191.1242
648094.00311137.8529166.6182181.9599186.6590
756088.39929130.9034160.1012176.4598181.6395
864083.61745124.7101153.8759170.7856176.2620
972079.43935119.1075147.9316165.0508170.6822
1080075.71603113.9733142.2502159.3352165.0171
16.18
Time (s)1Node(using consistent capacitance matrix)
23
Temperature (°C)
0252525
0.18518.5361126.36189
0.28529.6130321.63526
0.38536.1843522.42717
0.48540.7249125.30428
0.58544.2783428.85201
0.68547.2907232.49614
0.78549.9580936.01157
0.88552.3715239.31761
0.98554.5775642.39278
16.18
Time (s)1Node(using consistent capacitance matrix)
23
Temperature (°C)
18556.6035345.23933
1.18558.4681447.86852
1.28560.185950.29457
1.38561.7690852.53218
1.48563.2285254.59557
1.58564.57456.49814
1.68565.8144858.25235
1.78566.9581859.86974
16.18
Time (s)Node
123
Temperature (°C)
0252525
1.88568.0126561.36096
1.98568.9848562.73586
28569.8812164.0035
2.18570.7076565.17226
2.28571.4696166.24984
2.38572.1721467.24336
2.48572.8198668.15938
2.58573.4170569.00393
2.68573.9676669.78261
2.78574.4753170.50053
2.88574.9433671.16246
2.98575.374971.77274
38575.7727772.33542
# Appendix A A1. a. $\left[ { \begin{array} { r r } { 3 } & { 0 } \\ { - 3 } & { 1 2 } \end{array} } \right]$ b. Nonsense c. Nonsense $\left\{ { \begin{array} { l } { 1 1 } \\ { 9 } \\ { 1 1 } \end{array} } \right\}$ e. Nonsense f. $\left[ { \begin{array} { r r r } { 1 0 } & { 7 } & { 6 } \\ { 3 } & { - 1 } & { 7 } \end{array} } \right]$ $\left[ \begin{array} { l l } { 1 } & { 0 } \\ { { \frac { 1 } { 4 } } } & { { \frac { 1 } { 4 } } } \end{array} \right]$ A3. ${ \frac { 1 } { 1 7 } } \left[ { \begin{array} { r r r } { 1 2 } & { - 3 } & { - 8 } \\ { - 3 } & { 5 } & { 2 } \\ { - 8 } & { 2 } & { 1 1 } \end{array} } \right]$ A4. Nonsense A5. $\left[ \begin{array} { l l } { { \frac { 1 } { 2 } } } & { 0 } \\ { { \frac { 1 } { 8 } } } & { { \frac { 1 } { 8 } } } \end{array} \right]$ A6. Same as A3 A8. $\left[ \begin{array} { c c } { \cos \theta } & { - \sin \theta } \\ { \sin \theta } & { \cos \theta } \end{array} \right]$ # Appendix B B1. $x _ { 1 } = 3 . 1 5 , x _ { 2 } = 0 . 6 2$ B2. $x _ { 1 } = 3 . 1 5 , x _ { 2 } = 0 . 6 2$ B3. $x_{1} = 2.5, x_{2} = -1, x_{3} = 0.5$ B4. $x_{1} = 3, x_{2} = -1, x_{3} = -2$ B5. a. $\left\{ \begin{array}{l}x_{1}\\ x_{2} \end{array} \right\} = \left[ \begin{array}{ll}2 & -1\\ 1 & -1 \end{array} \right]\left\{ \begin{array}{l}y_{1}\\ y_{2} \end{array} \right\}$ b. $\left\{ \begin{array}{l}z_1\\ z_2 \end{array} \right\} = \left[ \begin{array}{ll} - 3 & 2\\ 5 & -3 \end{array} \right]\left\{ \begin{array}{l}y_{1}\\ y_{2} \end{array} \right\}$ B6. $x_{1} = 0, x_{2} = 1, x_{3} = 2, x_{4} = 2, x_{5} = 0$ B7. $x_{1} = 3.15, x_{2} = 0.62$ B8. a. Unique b. Nonexistent c. Unique d. Nonunique # Appendix D D1. a. $f_{1y} = f_{2y} = -5 \mathrm{kip}$ , $m_{1} = -m_{2} = -100 \mathrm{k-ft}$ b. $f_{1v} = f_{2v} = -5 \mathrm{kip}, \quad m_1 = -m_2 = -18.75 \mathrm{k-ft}$ c. $f_{1y} = f_{2y} = -15 \mathrm{kip}, \quad m_1 = -m_2 = -75 \mathrm{k-ft}$ d. $f_{1v} = -18.75 \text{ kip}, \quad f_{2v} = -6.25 \text{ kip}, \quad m_1 = -58.3 \text{ k-ft}, \quad m_2 = 33.3 \text{ k-ft}$ e. $f_{1v} = -6$ kip, $f_{2v} = -14$ kip, $m_{1} = -26.67$ k-ft, $m_{2} = 40$ k-ft f. $f_{1y} = -0.99 \, kN$ , $f_{2y} = -4.0 \, kN$ , $m_{1} = -2.04 \, kN \cdot m$ , $m_{2} = 5.10 \, kN \cdot m$ g. $f_{1y} = f_{2y} = -6 \, kN$ , $m_{1} = -m_{2} = -7.5 \, kN \cdot m$ h. $f_{1y} = f_{2y} = -10 \, kN$ , $m_{1} = -m_{2} = -6.67 \, kN \cdot m$ # Index # A Adaptive refinement, 355 Adjoint method, 718 Admissible variation, 55 Aluminum shapes, properties of, 759–772 Amplitude, defined, 649 Approximation functions, 72–74 compatible, 73 complete, 73–74 conforming, 73 displacement, 72–74 interpolation, 74 Aspect ratio (AR), 351, 352–353 Axial symmetry, 100 Axis of revolution, 412 Axis of symmetry, 412 Axisymmetric element, 9, 412–442, 684–685 applications of, 428–433 body forces, 419–420 consistent-mass matrix, 684–685 defined, 9, 412 discretization, 423 displacement functions, 415–417 element type, selection of, 415 equations, 419–421 introduction to, 412 pressure vessel, solution of, 422–428 sti¤ness matrix, 412–422, 423–428 strain/displacement relationships, 417–419 stress/strain relationships, 417–419 surface forces, 420–421 # B Banded-symmetric method, 735–741 Bar elements, 67–72, 92–100, 109–120, 120–124, 124–127, 127–131, 444–449, 665–669, 669–674. See also Truss equations analysis of, 665–669, 669–674 collocation method, 129 consistent-mass matrix, 651–653 displacement function, 68, 446, 650 dynamic analysis of, 649–653, 665–669, 669–674 equations, 124–127, 447–449, 649–653 exact solution, 120–124 finite element solution, 120–124 Galerkin’s residual method, 124–127, 131 isoparametric formulation, 444–449 least squares method, 130 local coordinates for, 66–72 lumped-mass matrix, 651 mass matrix, 650–653 natural frequencies, 665–669 one-dimensional problems, 127–131, 665–669, 669–674 potential energy approach, 109–120 residual methods, 124–127, 127–131 selection of, 67, 444–446, 650 sti¤ness matrix, 66–72, 92–100, 444–449, 650–653 strain/displacement relationships, 69, 446–447, 650 stress, computation of, 82–83 stress/strain relationships, 69, 446–447, 650 subdomain method, 129–130 three-dimensional space, 92–100 time-dependent (dynamic) stress analysis, 649–653 time-dependent problem, 669–674 transformation matrix, 92–100 Beam element, 152–161, 161–163, 194–199, 214–218, 218–236, 255–269, 674–681 arbitrarily oriented, 214–218, 255–269 bending, 153–158, 255–260 boundary conditions, 161–163 defined, 152 deformations, 153–158 displacement function, 155–156 equations, 157–158, 161–163 mass matrices, 674–681 natural frequencies, 674–681 nodal hinge, 194–199 rigid plane frames, 218–236 selection of, 154 shape functions, 155–156 sign conventions, 152, 256–257 space, arbitrarily oriented in, 255–269 sti¤ness, 152–161 sti¤ness matrix, 153–158, 158–161 strain/displacement relationships, 156–157 stress/strain relationships, 156–157 transformation matrix, 216, 259–260 Beam element (Continued ) transverse shear deformations, 158–161 two-dimensional, arbitrarily oriented, 214–218 Beam equations, 151–213 bending deformations, 153–158 boundary conditions, 161–163 direct sti¤ness method, 163–175 displacement functions, 155–156 distributed loading, 175–188 Euler-Bernouli theory, 153–158 exact solution, 188–194 finite element solution, 188–194 fixed-end reactions, 175 Galerkin’s method, 201–203 introduction to, 151–152 load replacement, 177–178 nodal hinge, element with a, 194–199 potential energy approach, 199–201 sign conventions, 152 sti¤ness matrix, 153–158, 158–161, 161–163 sti¤ness of element, 152–161 strain/displacement relationships, 156–157 stress/strain relationships, 156–157 Timoshenko theory, 158–161 transverse shear deformations, 158–161 work-equivalence method, 176–177 Bending, 153–158, 255–260, 514–518 beam elements in arbitrary space, 255–260 deformations in beam elements, 153–158 plate element, 514–518 rigidity of a plate, 517 Body forces, 324–326, 419–420, 448, 460, 497–498 axisymmetric elements, 419–420 bar element, 448 centrifugal, 325 natural coordinate system, 448 plane element, 460 tetrahedral element, 497–498 treatment of, 324–326 Boundary conditions, 13–14, 34, 39–52, 103–109, 161–163, 320–322, 601 beam elements, 161–163 constant-strain triangular (CST) element, 320–322 fluid flow, 601 homogeneous, 39–40 inclined supports, 103–109 introduction to, 13–14, 34 nonhomogeneous, 39, 40–41 penalty method, 50–52 skewed supports, 103–109 sti¤ness method, 39–52 # Castigliano’s theorem, 12 Central di¤erence method, 653, 654–659 Centrifugal body force, 325 Circular frequency, natural, 649 Coarse-mesh generation, 310 Coe‰cient matrix, inversion of, 726 Coe‰cient of thermal expansion, 618 Cofactor method, 716–717 Collocation method, 129 Column matrices, 4, 708 Compatibility, 35, 363–367, 746–748 condition of, 748 equations, 746–748 finite element results, 363–367 requirement, 35 Compatible displacements, 755 Compatible functions, 73 Complete, approximation functions, 73–74 Computer programs, 6–7, 23–24, 374–380, 524–528, 693–701 finite element method, 23–24 plate bending element, solution for, 524–528 role of, 6–7 step-by-step solutions, 374–380 structural dynamics, 693–701 Concentrated loads, 360–361 Condensation, see Static condensation Conduction,535–538,542–546,557–558 element conduction matrix, 542–546, 557–558 heat, one-dimensional, 535–537 heat, two-dimensional, 537–538 Conforming functions, 73 Connecting (mixing) di¤erent kinds of elements, 361–362 Consistent-mass matrix, 651–653, 682–685 Constant-strain triangular (CST) element, 304–305, 310–324, 324–329, 342, 406–408 body forces, 324–326 boundary conditions, 320–322 coarse-mesh generation, 310 defects, 342 displacement function, 311–315 equations, 310–324 forces (stresses), 322–324 global equations, 320–322 introduction to, 304–305 LST elements, comparison of, 406–408 matrix, 310–324, 329–331 nodal displacements, 322 penalty formulation, 331 selection of, 310–311 strain/displacement relationships, 315–320 stress/strain relationships, 315–320 surface forces, 326–329 Constitutive law, 11 Constitutive matrix, 309, 522 Continuity, 35, 73 requirement, 35 symbol, 73 Convection, heat transfer with, 538–539, 540 Convergence of finite element solution, 367–368 Coordinates, 66–72, 444–446 bar elements, 67–72, 444–446 intrinsic system, 444 natural system, 444 Coulomb-Mohr theory, 342 Cramer’s rule, 724–725 CST, see Constant-strain triangular (CST) element Cubic elements, 9 Curvature matrix, 521–522 # D D’Alembert’s principle, 755–756 Defects, CST elements, 342 Deformation, 33, 153–158, 158–161, 514–518 bending in beams, 153–158 bending rigidity of a plate, 517 defined, 33 Kirchho¤ assumptions, 515–516 plate bending, 514–518 potential energy, 518 stress/strain relationships, 517–518 transverse shear in beams, 158–161 Degrees of freedom, 14, 15, 29 defined, 15 spring element, 29 unknown, 14 Determinant, defined, 716 Di¤erential equations, 535–538, 594–596, 744–746 elasticity theory, 744–746 equilibrium, 744–746 fluid flow, 594–598 heat transfer, 535–538 Direct equilibrium method, 11 Direct integration, 653 Direct sti¤ness method, 2–4, 13–14, 28, 37–39, 163–175. See also Superposition beam analysis using, 163–175 history of, 2–4, 28 total sti¤ness matrix, assembly by, 37–39 use of, 13–14 Direction cosines, 85, 95–96 Directional sti¤ness bias, 371 Discontinuities, natural subdivisions at, 354, 357 Discretization, 1, 8–10, 331–332, 423 axisymmetric element, 423 finite element method, 1, 8–10, 331–332 plane stress, 331–332 Displacement function, 11, 31–32, 68, 155–156, 311–315, 399–401, 446, 450–451, 455–456, 494–496, 519–521 bar element, 68, 446 beam element, 155–156 constant-strain triangular (CST) element, 311–315 Hermite cubic interpolation, 155–156 interpolation, 32 isoparametric function, 446, 450–451, 455–456 linear-strain triangle (LST), 399–401 plane element, 455–456 plane stress element, 450–451 plate bending element, 519–521 selection of, 11 shape, 32, 155–156 spring element, 31–32 tetrahedral element, 494–496 Displacement method, 7, 28–64. See also Sti¤ness method introduction to, 28–64 use of, 7 Displacements, 34, 70, 72–74, 755–758. See also Strain/ displacement relationships approximation functions for, 72–74 compatible, 755 nodal, 34, 70 virtual work, principles of, 755–758 Distributed loading, 175–188 beams, 175–188 e¤ective global nodal forces, 181–182 fixed-end reactions, 175 general formulation of, 178–179 load replacement, 177–178 work-equivalence method, 176–177 Dynamics, 647–707 axisymmetric element, analysis of, 684–685 bar element equations, 649–653 beam element mass matrices, 674–681 central di¤erence method, 653, 654–659 computer program example solutions, 693–701 introduction to, 647 mass matrices, 650–653, 674–681, 681–685 natural frequencies, 649, 665–669, 674–681 Newmark’s method, 659–663 numerical integration in time, 653–665, 687–693 one-dimensional bar analysis, 665–669, 669–674 plane frame element, analysis of, 682–683 plane stress/strain element, analysis of, 683–684 spring-mass system, 647–649 structural, 647–707 tetrahedral (solid) element mass matrices, analysis of, 685 time, numerical integration in, 653–665, 687–693 time-dependent heat transfer, 686–693 time-dependent stress analysis, 649–653, 669–674 truss element, analysis of, 681–682 Wilson’s (Wilson-Theta) method, 664–665 # E E¤ective stress, 341 Elasticity theory, 744–751 compatibility equations, 746–748 condition of compatibility, 748 di¤erential equations of equilibrium, 744–746 equilibrium, di¤erential equations of, 744–746 introduction to, 744 modulus of elasticity, 748 strain/displacement, 746–748 stress/strain relationships, 748–751 Elements, 8–10, 11, 13–14, 30–34, 65–150, 151–213, 304–305, 310–324, 342, 351–362, 398–403, 444–449, 449–452, 480–482, 493–500, 501–508, 514–533 aspect ratio (AR), 351 axisymmetric, 9 bar, 65–150, 444–449 beam, 151–213 coarse-mesh generation, 310 connecting (mixing), modeling, 361–362 constant-strain triangular (CST), 304–305, 310–324, 342 cubic, 9 defects, CST, 324 equations, 11, 13–14, 34, 69–70, 402–403, 451–452, 522–523 finite, 8 forces, 34, 70 heterosis, 523 isoparametric, 446 LaGrange, 482 linear hexahedral, 501–504 linear-strain triangle (LST), 398–403 plane stress, 449–452 plate bending, 514–533 Q8, 480 Q9, 482 quadratic, 9 quadratic hexahedral, 504–508 refinement, methods of, 355–356, 358–359 selection of, 8–10, 30–31, 310–311, 399, 444–446, 449, 519 serendipity, 481 shapes, modeling, 351 sizing, 355–356, 358–359 spring, 30–34 sti¤ness matrix, 11, 33–34, 66–72, 402–403, 447–449, 451–452, 522–523 tetrahedral, 493–500 transition triangles, 359–360 Energy method, 12 Equations, 11, 13–14, 34, 52–60, 65–149, 151–213, 214–237, 238–255, 310–324, 398–411, 419–422, 447–449, 451–452, 459–460, 497–498, 522–523, 535–538, 542–546, 557–558, 594–596, 599–601, 608, 659–661, 664–665, 722–743, 744–751. See also Elasticity theory; Simultaneous linear equations axisymmetric element, 419–422 bar element, 124–127, 447–449 beam, 151–213 beam element, 199–201, 201–203 compatibility, 746–748 constant-strain triangular (CST) element, 310–324 di¤erential, 535–538, 594–596, 744–745 element, 11, 13–14, 69–70 element conduction, 542–546, 557–558 finite element, 111 fluid flow, 599–601, 608 frame, 214–237 global, 13–14, 34, 70, 161–163, 546, 601 grid, 214, 238–255 heat transfer, 535–538 isoparametric formulation, 447–449, 459–460 Jacobian function, 447 Equations (Continued ) linear-strain triangle (LST), 398–411 Newmark’s, 659–661 one-dimensional, 124–127, 131, 542–546 plane element, 459–460 plane stress element, 451–452 plate bending element, 522–523 simultaneous linear, 722–743 spring element, 52–60 tetrahedral element, 497–498 total, 13–14, 70 truss, 65–149 two-dimensional, 557–558 Wilson’s, 664–665 Equilibrium, 363–367, 744–746 compatibility and, 363–367 di¤erential equations 744–746 finite element results, 363–367 Equivalent stress, 341 Euler-Bernouli theory, 153–158 Exact solution, 120–124, 188–194 bar element, 120–124 beams, 188–194 finite element solution, comparison to, 120–124, 188–194 Explicit numerical integration method, 689 F Field problems, 52 Finite element, defined, 8 Finite element method, 1–26, 120–124, 350–363, 540–555, 555–564, 566–568, 569–574, 598–606, 606–610. See also Modeling advantages of, 19–22 applications of, 15–19 boundary conditions, 13–14 computer, role of, 6–7 computer programs for, 23–24 constitutive law, 11 defined, 1, 8 degrees of freedom, 14, 15 direct equilibrium method, 11 direct sti¤ness method, 2–3, 13–14 discretization, 1, 8–10 displacement function, selection of, 11 displacement method, 7 element conduction matrix, 542–546, 557–558 element types, selection of, 8–10, 541, 555, 598 energy method, 12 exact solution, comparison to, 120–124 flexibility method, 7 fluid flow, 598–606, 606–610 force method, 7 functional, 12 generalized displacements, 14 global equations, 13–14 gradient/potential relationship, 599, 607 heat flux/temperature gradient relationship, 542, 556–557 heat transfer, 540–555, 555–564, 566–568, 569–574 history of, 2–4 introduction to, 1–26 matrix notation, 4–6 modeling, 350–363 one-dimensional, 540–555, 569, 598–606 potential function, 598–599, 607 primary unknowns, 14 results, interpretation of, 14 steps of, 7–14 sti¤ness method, 7 strain/displacement relationships, 11 stress/strain relationships, 11, 14 temperature function, 541, 556 temperature gradient/temperature relationships, 542, 556–557 three-dimensional, 566–568 total equations, 13–14 truss equations, 120–124 two-dimensional, 555–564, 606–610 variational method, 540–555 velocity/gradient relationship, 599, 607 weighted residuals, methods of, 12–13 work method, 12 Finite element solution, 120–124, 188–194, 331–342, 363–367, 367–369 approximations in, 364–367 bar element, 120–124 beams, 188–194 compatibility of results, 363–367 convergence of, 367–368 CST defects, 342 discretization, 331–332 equilibrium of results, 363–367 exact solution, comparison to, 120–124, 188–194 plane stress, 305–309 sti¤ness matrix, assemblage of, 332–342 Fixed-end forces, 229–230 Fixed-end reactions, 175 Flexibility method, 7 Flowcharts, 374, 574, 611, 656, 661 central di¤erence method, 656 fluid flow, 611 heat transfer, 574 Newmark’s equations, 661 numerical integration, 656 plane stress/strain, 374 Fluid flow, 593–616 boundary conditions, 601 di¤erential equations, 594–598 equations, 599–601, 608 finite element formulation, 598–606, 606–610 flowchart for, 611 global equations, 601 gradient/potential relationship, 599, 607 introduction to, 593 nodal potentials, 601 one-dimensional, 598–601 pipes, 596–598 porous medium, 594–596 potential function, 589 program, example of, 611–612 solid bodies, around, 596–598 sti¤ness matrix, 599–601, 608 two-dimensional, 606–610 velocities, 602 velocity/gradient relationship, 599, 607 volumetric flow rates, 602 Force, 7, 34, 36, 70, 178–182, 229–230, 232–233, 322–324, 324–329, 419–421, 448–449, 460, 497–498, 752–754 axisymmetric elements, 419–421 bar element, 70, 448–449 body, 324–326, 419–420, 448, 460, 497–498 centrifugal body, 325 constant-strain triangular (CST) element, 322–324, 324–329 equivalent nodal, 178–180, 752–754 fixed-end, 229–230 global nodal matrix, 36 method, 7 nodal, 178–182, 232–233 plane element, 460 rigid plane frames, 229–230, 232–233 spring element, 34 stresses, 322–324 surface, 326–329, 420–421, 448–449, 460, 498 tetrahedral element, 497–498 Forced convection, 538, 540 Frame equations, 214–237 e¤ective nodal forces, 232–233 fixed-end forces, 229–230 inclined supports, 237 introduction to, 214 rigid plane frames, 218–236 skewed supports, 237