Metode Numerik - Josiah Enrico S (1906356286)
Contents
- 1 Intro - Metode Numerik/11 November 2020
- 2 Aplikasi Modelica - Metode Numerik/18 November 2020
- 3 Fungsi Panggil dalam Modelica - Metode Numerik/18 November 2020
- 4 Finite Element Method for Trusses - Metode Numerik/2 Desember 2020
- 5 Kuis Membuat Class FLowchart - Metode Numerik/18 November 2020
- 6 3D Trusses - Metode Numerik/18 November 2020
- 7 Optimization - Metode Numerik/16 November 2020
- 8 Tugas Besar Metode Numerik - Metode Numerik/23 Desember 2020
Intro - Metode Numerik/11 November 2020
Tujuan belajar metode numerik yaitu agar penulis dapat:
1) Memahami konsep dan prinsip dasar metode numerik.
2) Memahami aplikasi metode numerik
3) Menyelesaikan persoalan teknik dengan metoda numerik
4) Mendapat nilai tambah sebagai manusia yang lebih beradab
Aplikasi Modelica - Metode Numerik/18 November 2020
Berikut ini adalah contoh penerapan aplikasi OpenModelica untuk membuat 4 algoritma metode numerik dalam mencari roots of equation (akar persamaan) dari:
f(x) = exp^(-x)-(x)
f'(x) = -exp^(-x)-1
error maksimum = 0.0000001
1) Newton Raphson (Terbuka)
model Newton_Raphson_Algorithm parameter Real g=1; //guess parameter Integer N=20; //max iteration parameter Real er=0.0000001; //error maximum Real a[N]; Real y[N];//function Real ER[N]; //error Real sol; //solution algorithm a[1]:=g; y[1]:=a[1]-(exp(-a[1])-a[1])/(-exp(-a[1])-1); ER[1]:=abs(1-a[1]/y[1]); for i in 2:N loop a[i]:=y[i-1]; y[i]:=a[i]-(exp(-a[i])-a[i])/(-exp(-a[i])-1); ER[i]:=abs(1-y[i-1]/y[i]); if ER[i]<er then sol:=y[i]; break; end if; end for; end Newton_Raphson_Algorithm;
2) Secant (Terbuka)
model Secant_Algorithm parameter Real a=0; //guess parameter Real b=1; //guess parameter Integer N=10; //max iteration parameter Real er=0.0000001; //error maximum Real A[N]; Real B[N]; Real y[N]; Real ER[N]; Real sol; //solution algorithm A[1]:=a; B[1]:=b; y[1]:=B[1]-(exp(-B[1])-B[1])*(A[1]-B[1])/((exp(-A[1])-A[1])-(exp(-B[1])-B[1])); ER[1]:=abs(1-B[1]/y[1]); for i in 2:N loop A[i]:=B[i-1]; B[i]:=y[i-1]; y[i]:=B[i]-(exp(-B[i])-B[i])*(A[i]-B[i])/((exp(-A[i])-A[i])-(exp(-B[i])-B[i])); ER[i]:=abs(1-y[i-1]/y[i]); if ER[i]<er then sol:=y[i]; break; end if; end for; end Secant_Algorithm;
3) Bisection (Tertutup)
model Bisection_Algorithm parameter Real a=0; //guess bawah parameter Real b=1; //guess atas parameter Integer N=50; //max iteration parameter Real er=0.0000001; //error maximum Real fa=(exp(-a)-a); Real fb=(exp(-b)-b); Real A[N]; Real B[N]; Real fy[N]; Real y[N]; Real ER[N]; Real sol; //solution algorithm if fa*fb<0 then A[1]:=a; B[1]:=b; y[1]:=(A[1]+B[1])/2; fy[1]:=exp(-y[1])-y[1]; ER[1]:=1; for i in 2:N loop if fy[i-1]>0 then A[i]:=y[i-1]; B[i]:=B[i-1]; else A[i]:=A[i-1]; B[i]:=y[i-1]; end if; y[i]:=(A[i]+ B[i])/2; fy[i]:=exp(-y[i])-y[i]; ER[i]:=abs(1-y[i-1]/y[i]); if ER[i]<er then sol:=y[i]; break; end if; end for; end if; end Bisection_Algorithm;
4) Regula Falsi (Tertutup)
model Regula_Falsi_Algorithm parameter Real a=0; //guess bawah parameter Real b=1; //guess atas parameter Integer N=20; //max iteration parameter Real er=0.0000001; //error maximum Real A[N]; Real B[N]; Real fa[N]; Real fb[N]; Real fy[N]; Real y[N]; Real ER[N]; Real sol; //solution algorithm A[1]:=a; B[1]:=b; fa[1]:=exp(-A[1])-A[1]; fb[1]:=exp(-B[1])-B[1]; if fa[1]*fb[1]<0 then y[1]:=(A[1]*fb[1]-B[1]*fa[1])/(fb[1]-fa[1]); fy[1]:=exp(-y[1])-y[1]; ER[1]:=1; for i in 2:N loop if fy[i-1]>0 then A[i]:=y[i-1]; B[i]:=B[i-1]; else A[i]:=A[i-1]; B[i]:=y[i-1]; end if; fa[i]:=exp(-A[i])-A[i]; fb[i]:=exp(-B[i])-B[i]; y[i]:=(A[i]*fb[i]-B[i]*fa[i])/(fb[i]-fa[i]); fy[i]:=exp(-y[i])-y[i]; ER[i]:=abs(1-y[i-1]/y[i]); if ER[i]<er then sol:=y[i]; break; end if; end for; end if; end Regula_Falsi_Algorithm;
Berikut link Youtube yang berisi penjelasan tentang algoritma dan penulisan kode OpenModelica keempat metode diatas:
Fungsi Panggil dalam Modelica - Metode Numerik/18 November 2020
Fungsi panggil dalam aplikasi Modelica adalah metode membuat fungsi numerik dalam kelas function yang akan digunakan di dalam permodelan numerik utama (tipe 'class'). metode ini biasanya dipakai untuk menyederhanakan persoalan matematika yang kompleks, seperti persamaan aljabar simultan, sehingga lebih mudah diselesaikan. Dalam artikel ini akan ditampilkan 3 contoh persoalan numerik dengan solusi array atau lebih dari satu anggota:
1) Root of Equation (Newton Raphson dan Regula Falsi)
Newton Raphson ... algorithm a[1]:=g; y[1]:=a[1]-(Fungsi(a[1]))/(Der_Fungsi(a[1])); ER[1]:=abs(1-a[1]/y[1]); for i in 2:N loop a[i]:=y[i-1]; y[i]:=a[i]-(Fungsi(a[i]))/(Der_Fungsi(a[1])); ER[i]:=abs(1-y[i-1]/y[i]); if ER[i]<er then sol:=y[i]; break; end if; Regula Falsi ... fa[1]:=Fungsi(A[1]); fb[1]:=Fungsi(B[1]); if fa[1]*fb[1]<0 then y[1]:=(A[1]*fb[1]-B[1]*fa[1])/(fb[1]-fa[1]); fy[1]:=Fungsi(y[1]); ER[1]:=1; ... fa[i]:=Fungsi(A[i]); fb[i]:=Fungsi(B[i]); y[i]:=(A[i]*fb[i]-B[i]*fa[i])/(fb[i]-fa[i]); fy[i]:=Fungsi(y[i]); ER[i]:=abs(1-y[i-1]/y[i]); ... |
fungsi function Fungsi input Real X; output Real Y; algorithm Y:=exp(-X)-X; end Fungsi; fungsi turunan function Der_Fungsi input Real X; output Real Y; algorithm Y:=-exp(-X)-1; end Der_Fungsi; |
2) Heat Diffusion
Referensi: Versteeg, H. K., Malalasekera, W. (2007). An Introduction to Computational Fluid Dynamics. 2nd Edition. Harlow: Pearson (Example 4.2)
Persamaan class TesAljabar parameter Real A[5,5]=[375,-125,0,0,0; -125,250,-125,0,0; 0,-125,250,-125,0; 0,0,-125,250,-125; 0,0,0,-125,375]; parameter Real B[5]={29000,4000,4000,4000,54000}; Real X[5]; equation X=matriks5(A,B); end TesAljabar; |
fungsi function matriks5 input Real A[5,5]; input Real B[5]; output Real X[5]; algorithm X:=Modelica.Math.Matrices.solve(A,B); end matriks5; |
3) Combined Spring Stiffness
Referensi: http://www.sharetechnote.com/html/EngMath_Matrix_FEM_ComplicatedSpring.html
Persamaan class Latihan_Matriks parameter Real c1=1; //spring 1 parameter Real c2=2; //spring 2 parameter Real c3=3; //spring 3 parameter Real c4=4; //spring 4 parameter Real c5=5; //spring 5 parameter Real k1[3,3]=c1*[1,0,0; 0,0,0; 0,0,0]; parameter Real k2[3,3]=c2*[1,-1,0; -1,1,0; 0,0,0]; parameter Real k3[3,3]=c3*[1,-1,0; -1,1,0; 0,0,0]; parameter Real k4[3,3]=c4*[1,0,-1; 0,0,1; -1,0,1]; parameter Real k5[3,3]=c5*[0,0,0; 0,1,-1; 0,-1,1]; parameter Real B[3]={100,200,300}; Real K[3,3]; Real s[3]; algorithm K:=k1+k2+k3+k4+k5; s:=matriks3(K,B); end Latihan_Matriks; |
fungsi function matriks3 input Real A[3,3]; input Real B[3]; output Real X[3]; algorithm X:=Modelica.Math.Matrices.solve(A,B); end matriks3; |
Berikut link Youtube yang berisi penjelasan tentang algoritma dan penulisan kode OpenModelica latihan diatas:
Berikut juga adalah pemodelan Modelica untuk metode Naive Gauss:
Finite Element Method for Trusses - Metode Numerik/2 Desember 2020
Berikut 2 contoh penggunaan aplikasi Modelica untuk menyelesaikan perhitungan displacement dan reaction force pada trusses:
Trusses Problem 1 (Example 3.1)
Persamaan model Trusses parameter Integer N=10; //Global matrice = 2*points connected parameter Real A=8; parameter Real E=1.9e6; Real G[N,N]; //global Real Ginitial[N,N]; //global Real Sol[N]; //global dispplacement Real X[N]={0,0,0,0,0,0,0,-500,0,-500}; Real R[N]; //global reaction force Real SolMat[N,1]; Real XMat[N,1]; //boundary coundition Integer b1=1; Integer b2=3; //truss 1 parameter Real X1=0; //degree between truss Real k1=A*E/36; Real K1[4,4]; //stiffness matrice Integer p1a=1; Integer p1b=2; Real G1[N,N]; //truss 2 parameter Real X2=135; //degree between truss Real k2=A*E/50.912; Real K2[4,4]; //stiffness matrice Integer p2a=2; Integer p2b=3; Real G2[N,N]; //truss 3 parameter Real X3=0; //degree between truss Real k3=A*E/36; Real K3[4,4]; //stiffness matrice Integer p3a=3; Integer p3b=4; Real G3[N,N]; //truss 4 parameter Real X4=90; //degree between truss Real k4=A*E/36; Real K4[4,4]; //stiffness matrice Integer p4a=2; Integer p4b=4; Real G4[N,N]; //truss 5 parameter Real X5=45; //degree between truss Real k5=A*E/50.912; Real K5[4,4]; //stiffness matrice Integer p5a=2; Integer p5b=5; Real G5[N,N]; //truss 6 parameter Real X6=0; //degree between truss Real k6=A*E/36; Real K6[4,4]; //stiffness matrice Integer p6a=4; Integer p6b=5; Real G6[N,N]; /* for each truss, please ensure pXa is lower then pXb (X represents truss element number) */ algorithm //creating global matrice K1:=Stiffness_Matrices(X1); G1:=k1*Local_Global(K1,N,p1a,p1b); K2:=Stiffness_Matrices(X2); G2:=k2*Local_Global(K2,N,p2a,p2b); K3:=Stiffness_Matrices(X3); G3:=k3*Local_Global(K3,N,p3a,p3b); K4:=Stiffness_Matrices(X4); G4:=k4*Local_Global(K4,N,p4a,p4b); K5:=Stiffness_Matrices(X5); G5:=k5*Local_Global(K5,N,p5a,p5b); K6:=Stiffness_Matrices(X6); G6:=k6*Local_Global(K6,N,p6a,p6b); G:=G1+G2+G3+G4+G5+G6; Ginitial:=G; //implementing boundary condition for i in 1:N loop G[2*b1-1,i]:=0; G[2*b1,i]:=0; G[2*b2-1,i]:=0; G[2*b2,i]:=0; end for; G[2*b1-1,2*b1-1]:=1; G[2*b1,2*b1]:=1; G[2*b2-1,2*b2-1]:=1; G[2*b2,2*b2]:=1; //solving displacement Sol:=Gauss_Jordan(N,G,X); //solving reaction force SolMat:=matrix(Sol); XMat:=matrix(X); R:=Reaction_Trusses(N,Ginitial,SolMat,XMat); end Trusses; |
Trusses Problem 2 (Homework)
Persamaan class Trusses_HW parameter Integer N=8; //Global matrice = 2*points connected parameter Real A=0.001; //Area m2 parameter Real E=200e9; //Pa Real G[N,N]; //global Real Ginitial[N,N]; //global Real Sol[N]; //global dispplacement Real X[N]={0,0,-1035.2762,-3863.7033,0,0,-1035.2762,-3863.7033}; Real R[N]; //global reaction force Real SolMat[N,1]; Real XMat[N,1]; //boundary condition Integer b1=1; Integer b2=3; //truss 1 parameter Real X1=0; //degree between truss Real k1=A*E/1; Real K1[4,4]; //stiffness matrice Integer p1a=1; Integer p1b=2; Real G1[N,N]; //truss 2 parameter Real X2=0; //degree between truss Real k2=A*E/1; Real K2[4,4]; //stiffness matrice Integer p2a=2; Integer p2b=3; Real G2[N,N]; //truss 3 parameter Real X3=90; //degree between truss Real k3=A*E/1.25; Real K3[4,4]; //stiffness matrice Integer p3a=2; Integer p3b=4; Real G3[N,N]; //truss 4 parameter Real X4=90+38.6598; //degree between truss Real k4=A*E/1.6; Real K4[4,4]; //stiffness matrice Integer p4a=1; Integer p4b=4; Real G4[N,N]; //truss 5 parameter Real X5=90-38.6598; //degree between truss Real k5=A*E/1.6; Real K5[4,4]; //stiffness matrice Integer p5a=3; Integer p5b=4; Real G5[N,N]; /* for each truss, please ensure pXa is lower then pXb (X represents truss element number) */ algorithm //creating global matrice K1:=Stiffness_Matrices(X1); G1:=k1*Local_Global(K1,N,p1a,p1b); K2:=Stiffness_Matrices(X2); G2:=k2*Local_Global(K2,N,p2a,p2b); K3:=Stiffness_Matrices(X3); G3:=k3*Local_Global(K3,N,p3a,p3b); K4:=Stiffness_Matrices(X4); G4:=k4*Local_Global(K4,N,p4a,p4b); K5:=Stiffness_Matrices(X5); G5:=k5*Local_Global(K5,N,p5a,p5b); G:=G1+G2+G3+G4+G5; Ginitial:=G; //implementing boundary condition for i in 1:N loop G[2*b1-1,i]:=0; G[2*b1,i]:=0; G[2*b2-1,i]:=0; G[2*b2,i]:=0; end for; G[2*b1-1,2*b1-1]:=1; G[2*b1,2*b1]:=1; G[2*b2-1,2*b2-1]:=1; G[2*b2,2*b2]:=1; //solving displacement Sol:=Gauss_Jordan(N,G,X); //solving reaction force SolMat:=matrix(Sol); XMat:=matrix(X); R:=Reaction_Trusses(N,Ginitial,SolMat,XMat); end Trusses_HW; |
Fungsi Panggil
Matrice Transformation function Stiffness_Matrices input Real A; Real Y; output Real X[4,4]; Real float_error = 10e-10; final constant Real pi=2*Modelica.Math.asin(1.0); algorithm Y:=A/180*pi; X:=[(Modelica.Math.cos(Y))^2,Modelica.Math.cos(Y)*Modelica.Math.sin(Y),-(Modelica.Math.cos(Y))^2,-Modelica.Math.cos(Y)*Modelica.Math.sin(Y); Modelica.Math.cos(Y)*Modelica.Math.sin(Y),(Modelica.Math.sin(Y))^2,-Modelica.Math.cos(Y)*Modelica.Math.sin(Y),-(Modelica.Math.sin(Y))^2; -(Modelica.Math.cos(Y))^2,-Modelica.Math.cos(Y)*Modelica.Math.sin(Y),(Modelica.Math.cos(Y))^2,Modelica.Math.cos(Y)*Modelica.Math.sin(Y); -Modelica.Math.cos(Y)*Modelica.Math.sin(Y),-(Modelica.Math.sin(Y))^2,Modelica.Math.cos(Y)*Modelica.Math.sin(Y),(Modelica.Math.sin(Y))^2]; for i in 1:4 loop for j in 1:4 loop if abs(X[i,j]) <= float_error then X[i,j] := 0; end if; end for; end for; end Stiffness_Matrices; |
Global Element Matrice function Local_Global input Real Y[4,4]; input Integer B; input Integer p1; input Integer p2; output Real G[B,B]; algorithm for i in 1:B loop for j in 1:B loop G[i,j]:=0; end for; end for; G[2*p1,2*p1]:=Y[2,2]; G[2*p1-1,2*p1-1]:=Y[1,1]; G[2*p1,2*p1-1]:=Y[2,1]; G[2*p1-1,2*p1]:=Y[1,2]; G[2*p2,2*p2]:=Y[4,4]; G[2*p2-1,2*p2-1]:=Y[3,3]; G[2*p2,2*p2-1]:=Y[4,3]; G[2*p2-1,2*p2]:=Y[3,4]; G[2*p2,2*p1]:=Y[4,2]; G[2*p2-1,2*p1-1]:=Y[3,1]; G[2*p2,2*p1-1]:=Y[4,1]; G[2*p2-1,2*p1]:=Y[3,2]; G[2*p1,2*p2]:=Y[2,4]; G[2*p1-1,2*p2-1]:=Y[1,3]; G[2*p1,2*p2-1]:=Y[2,3]; G[2*p1-1,2*p2]:=Y[1,4]; end Local_Global; |
Reaction Matrice Equation function Reaction_Trusses input Integer N; input Real A[N,N]; input Real B[N,1]; input Real C[N,1]; Real X[N,1]; output Real Sol[N]; Real float_error = 10e-10; algorithm X:=A*B-C; for i in 1:N loop if abs(X[i,1]) <= float_error then X[i,1] := 0; end if; end for; for i in 1:N loop Sol[i]:=X[i,1]; end for; end Reaction_Trusses; Gauss Jordan function Gauss_Jordan input Integer N; input Real A[N,N]; input Real B[N]; output Real X[N]; Real float_error = 10e-10; algorithm X:=Modelica.Math.Matrices.solve(A,B); for i in 1:N loop if abs(X[i]) <= float_error then X[i] := 0; end if; end for; end Gauss_Jordan; |
Kuis Membuat Class FLowchart - Metode Numerik/18 November 2020
3D Trusses - Metode Numerik/18 November 2020
Master class Trusses3D_Tes //define initial variable parameter Integer Points=4; //Number of Points parameter Integer Trusses=3; //Number of Trusses parameter Real Area=0.0015; //Area parameter Real Elas=70e9; //Elasticity //define connection parameter Integer C[Trusses,2]=[1,2; 1,3; 1,4]; //define coordinates (please put orderly) parameter Real P[Points,3]=[2,0,0; 0,0,1.5; 0,0,-1.5; 0,1.5,0]; //define external force (please put orderly) parameter Real F[Points*3]={0,-5000,0, 0,0,0, 0,0,0, 0,0,0}; //define boundary parameter Integer b[:]={2,3,4}; //solution Real displacement[N], reaction[N]; protected parameter Integer N=3*Points; Integer boundary[3*size(b,1)]=cat(1,(3*b).-2,(3*b).-1,3*b); Real q1[3], q2[3], g[N,N], G[N,N], G_star[N,N], id[N,N]=identity(N), err=10e-10, cx, cy, cz, L, X[3,3]; algorithm //Creating Global Matrix G:=id; for i in 1:Trusses loop for j in 1:3 loop q1[j]:=P[C[i,1],j]; q2[j]:=P[C[i,2],j]; end for; //Solving Matrix L:=Modelica.Math.Vectors.length(q2-q1); cx:=(q2[1]-q1[1])/L; cy:=(q2[2]-q1[2])/L; cz:=(q2[3]-q1[3])/L; X:=(Area*Elas/L)*[cx^2,cx*cy,cx*cz; cy*cx,cy^2,cy*cz; cz*cx,cz*cy,cz^2]; //Transforming to global matrix g:=zeros(N,N); for m,n in 1:3 loop g[3*(C[i,1]-1)+m,3*(C[i,1]-1)+n]:=X[m,n]; g[3*(C[i,2]-1)+m,3*(C[i,2]-1)+n]:=X[m,n]; g[3*(C[i,2]-1)+m,3*(C[i,1]-1)+n]:=-X[m,n]; g[3*(C[i,1]-1)+m,3*(C[i,2]-1)+n]:=-X[m,n]; end for; G_star:=G+g; G:=G_star; end for; //Implementing boundary for i in boundary loop for j in 1:N loop G[i,j]:=id[i,j]; end for; end for; //Solving displacement displacement:=Modelica.Math.Matrices.solve(G,F); //Solving reaction reaction:=(G_star*displacement)-F; //Eliminating float error for i in 1:N loop reaction[i]:=if abs(reaction[i])<=err then 0 else reaction[i]; displacement[i]:=if abs(displacement[i])<=err then 0 else displacement[i]; end for; end Trusses3D_Tes; |
Berikut adalah hasil simulasi yang dilakukan:
Berikut link Youtube yang berisi penjelasan tentang algoritma dan penulisan kode OpenModelica metode diatas:
Optimization - Metode Numerik/16 November 2020
Function to be solved
function Func_Optimization input Real x; import Modelica.Math; output Real y; algorithm y:=2*sin(x)-x^2/10; end Func_Optimization;
Optimization - Golden Section
model Opt_Gold parameter Real xlo=0; parameter Real xhi=4; parameter Integer N=8; // maximum iteration parameter Real es=0.0001; // maximum error Real f1[N], f2[N], x1[N], x2[N], ea[N]; Real xopt, fx; protected Real d, xl, xu, xint, R=(5^(1/2)-1)/2; algorithm xl := xlo; xu := xhi; for i in 1:N loop d:= R*(xu-xl); x1[i]:=xl+d; x2[i]:=xu-d; f1[i]:=Func_Optimization(x1[i]); f2[i]:=Func_Optimization(x2[i]); xint:=xu-xl; if f1[i]>f2[i] then xl:=x2[i]; xopt:=x1[i]; fx:=f1[i]; else xu:=x1[i]; xopt:=x2[i]; fx:=f2[i]; end if; ea[i]:=(1-R)*abs((xint)/xopt); if ea[i]<es then break; end if; end for; end Opt_Gold;
Optimization - Newton
model Opt_Newton parameter Real g=2.5; //initial guess parameter Integer N=8; // maximum iteration parameter Real es=0.0001; // maximum error Real X[N]; Real xopt, fx, ea[N]; algorithm X[1]:=g; ea[1]:=1; for i in 2:N loop X[i]:=X[i-1]-Func_Optimization_Der(X[i-1])/Func_Optimization_Der_Der(X[i-1]); xopt:=X[i]; ea[i]:=abs(1-X[i-1]/X[i]); if ea[i]<es then break; end if; end for; fx:=Func_Optimization(xopt); end Opt_Newton;
Optimization - Parabolic
model Opt_Parabolic parameter Real g1=0; //initial guess parameter Real g2=1; //initial guess parameter Real g3=4; //initial guess parameter Integer N=5; // maximum iteration parameter Real es=0.0001; // maximum error Real x1, x2, x3, xopt, xp[N], ea[N]; //Real xl, xm, xu; Real fx1, fx2, fx3, fx, A[4], A_star[4]; algorithm x1:=g1; x2:=g2; x3:=g3; for i in 1:N loop fx1:=Func_Optimization(x1); fx2:=Func_Optimization(x2); fx3:=Func_Optimization(x3); xp[i]:=(fx1*(x2^2-x3^2)+fx2*(x3^2-x1^2)+fx3*(x1^2-x2^2))/(2*fx1*(x2-x3)+2*fx2*(x3-x1)+2*fx3*(x1-x2)); xopt:=xp[i]; fx:=Func_Optimization(xp[i]); A:={x1,x2,x3,xp[i]}; A_star:=Modelica.Math.Vectors.sort(A); if xp[i]>x2 then x1:=A_star[2]; x2:=A_star[3]; x3:=A_star[4]; else x1:=A_star[1]; x2:=A_star[2]; x3:=A_star[3]; end if; end for; ea[1]:=1; for i in 2:N loop ea[i]:=abs(1-xp[i-1]/xp[i]); if ea[i]<es then break; end if; end for; end Opt_Parabolic;
Tugas Besar Metode Numerik - Metode Numerik/23 Desember 2020
Objektif:
- Mengoptimasi harga pembuatan rangka truss sederhana dengan memvariasi dimensi dan elastisitas material.
Geometri dan Load
Constraint:
- Spesifikasi L (Panjang) dan geometri rangka truss
- Gaya beban terhadap struktur (1000 N dan 2000 N)
Asumsi:
- Variasi Stiffness terikat dengan variabel area. Memvariasikan Elastisitas tergolong sulit karena setiap material memiliki range yang tidak teratur dan dalam satu material yang sejenis (struktur biaya tetap) tidak terjadi perubahan nilai elastisitas yang berbanding lurus dengan perubahan biaya.
- Beban akan terdistribusi hanya pada point penghubung (karena bersifat truss)
- Safety factor bernilai 2.
- Batas displacement 0,001 m sebelum buckling(pada kolom paling atas)
Koleksi Data:
[[File:Tugas Besar Metnum AverageCostSS304 Jos.jpg|700px|left]
Using Trusses Model (Modellica):
Displacement limit=0,0005 m
Stiffness Constant (A*E) = 3777777,778
Total Length=15,3 m
Resources:
http://www.matweb.com/search/DataSheet.aspx?MatGUID=1748ca73d11e4353b2aa700bfb119dfb
http://www.matweb.com/search/datasheet.aspx?matguid=d1844977c5c8440cb9a3a967f8909c3a
https://mitarcahyaabadai.wordpress.com/daftar-harga-besi-siku-2018/
https://duniabahanbangunanbandung.blogspot.com/p/harga-besi-siku-stainless-steel.html