Problems 373qFigure 6.22 Two-bar truss.(b)Find the steepest descent direction,S 1 , offat the trial vectorX 1 ={ 0
0}
.
(c)Derive the one-dimensional minimization problem,f (λ), atX 1 along the direction
S 1.
(d)Find the optimal step lengthλ∗using the calculus method and find the new design
vectorX 2.6.7 Three carts, interconnected by springs, are subjected to the loadsP 1 , P 2 , andP 3 as shown
in Fig. 6.23. The displacements of the carts can be found by minimizing the potential
energy of the system(f ):
f (X)=^12 XT[K]X−XTPwhere[K]=
k 1 +k 4 +k 5 −k 4 −k 5
−k 4 k 2 +k 4 +k 6 −k 6
−k 5 −k 6 k 3 +k 5 +k 6 +k 7 +k 8
P=
P 1
P 2
P 3
and X=
x 1
x 2
x 3
Derive the functionf (x 1 , x 2 , x 3 )for the following data:k 1 =5000 N/m ,k 2 =1500 N/m,
k 3 =2000 N/m,k 4 =1000 N/m,k 5 =2500 N/m,k 6 =500 N/m,k 7 =3000 N/m,k 8 =
3500 N/m,P 1 =1000 N,P 2 =2000 N, andP 3 =3000 N. Complete one iteration of
Newton’s method and find the equilibrium configuration of the carts. UseX 1 = {0 0 0}T.6.8 Plot the contours of the following function over the region (− 5 ≤x 1 ≤ 5 ,− 3 ≤x 2 ≤6)
and identify the optimum point:
f (x 1 , x 2 )=(x 1 + 2 x 2 − 7 )^2 +( 2 x 1 +x 2 − 5 )^2