Difference between revisions of "Kelompok 16"
Eric Delbert (talk | contribs) (→Sistem Pegas) |
Eric Delbert (talk | contribs) (→Sistem Pegas) |
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== Sistem Pegas == | == Sistem Pegas == | ||
| − | Video Teori | + | |
| + | '''Video Teori''' | ||
[[File:Fem 1-1.mp4]] | [[File:Fem 1-1.mp4]] | ||
| Line 38: | Line 39: | ||
[[File:Fem 2-1.mp4]] | [[File:Fem 2-1.mp4]] | ||
| − | Video Programming | + | '''Video Programming''' |
[[File:Coding FEM.mp4]] | [[File:Coding FEM.mp4]] | ||
| + | |||
| + | import numpy as np | ||
| + | from numpy import array, zeros | ||
| + | |||
| + | #tentukan jumlah k | ||
| + | N=eval(input('jumlah k pada sistem?')) | ||
| + | |||
| + | node = N + 1 | ||
| + | |||
| + | k = np.zeros((node,node), float) | ||
| + | |||
| + | # define array berisi konstanta pegas | ||
| + | |||
| + | m_k = np.zeros(N) | ||
| + | |||
| + | for i in range(0,N): | ||
| + | print('K',i+1,'?') | ||
| + | m_k[i]=eval(input()) | ||
| + | |||
| + | # membangun matriks global stiffness | ||
| + | k[0,0] = m_k[0] | ||
| + | k[N,N]= m_k[N-1] | ||
| + | |||
| + | #pola 1 | ||
| + | a = 0 | ||
| + | for b in range (0,N): | ||
| + | a += 1 | ||
| + | k[b,a]= -(m_k[b]) | ||
| + | |||
| + | #pola 2 | ||
| + | c = 0 | ||
| + | for d in range (0,N): | ||
| + | c += 1 | ||
| + | k[c,d]=-(m_k[d]) | ||
| + | |||
| + | #pola 3 | ||
| + | e = 0 | ||
| + | for f in range (1,N): | ||
| + | e +=1 | ||
| + | k[f,e]=m_k[f]+m_k[f-1] | ||
| + | |||
| + | print (k) | ||
| + | |||
| + | #gaya yang bekerja | ||
| + | Fn = eval(input('jumlah force?')) | ||
| + | |||
| + | #=============================================== | ||
| + | |||
| + | J = k[1:node,1:node] | ||
| + | |||
| + | n=len(J) | ||
| + | B=np.zeros(n,float) | ||
| + | B[n-1]=Fn | ||
| + | |||
| + | # eliminasi gauss | ||
| + | |||
| + | for k in range (0,n-1): | ||
| + | for i in range (k+1, n): | ||
| + | if J[i,k]!=0 : | ||
| + | z= J[i,k]/J[k,k] | ||
| + | J[i,k:n]=J[i,k:n]-(J[k,k:n]*z) | ||
| + | B[i]=B[i]-(B[k]*z) | ||
| + | |||
| + | print(J) | ||
| + | |||
| + | u=np.zeros(n,float) | ||
| + | for m in range (n-1 , -1, -1): | ||
| + | u[m]=(B[m]-np.dot(J[m,m+1:n], u[m+1:n]))/J[m,m] | ||
| + | print('nilai U',m+2,u[m]) | ||
| + | |||
| + | F1=-m_k[0]*u[0] | ||
| + | |||
| + | print(F1) | ||
Revision as of 01:47, 16 October 2019
Anggota Kelompok 16 :
- Eric Delbert
- Gabriella E.
- Gidion M. H.
- Sumardi
Eliminasi Gauss
Eliminasi gauss merupakan sebuah metode penyelesaian aljabar dengan memanfaatkan mmatriks sebagai variabel dalam operasi.
Contoh matriks
Matriks diatas dapat kita selesaikan dengan menggunakan python dengan algoritma dibawah ini
.JPG)
Hasil dari run file seperti ini
.JPG)
Untuk rincian cara muncul algoritma seperti diatas, Anda dapat lihat pada file PDF yang telah kami buat [1]
Untuk lebih lengkap inilah video tutorialnya.
Sistem Pegas
Video Teori
Video Programming
import numpy as np from numpy import array, zeros
#tentukan jumlah k
N=eval(input('jumlah k pada sistem?'))
node = N + 1
k = np.zeros((node,node), float)
# define array berisi konstanta pegas
m_k = np.zeros(N)
for i in range(0,N):
print('K',i+1,'?')
m_k[i]=eval(input())
# membangun matriks global stiffness k[0,0] = m_k[0] k[N,N]= m_k[N-1]
#pola 1
a = 0
for b in range (0,N):
a += 1
k[b,a]= -(m_k[b])
#pola 2
c = 0
for d in range (0,N):
c += 1
k[c,d]=-(m_k[d])
#pola 3
e = 0
for f in range (1,N):
e +=1
k[f,e]=m_k[f]+m_k[f-1]
print (k)
#gaya yang bekerja
Fn = eval(input('jumlah force?'))
#===============================================
J = k[1:node,1:node]
n=len(J) B=np.zeros(n,float) B[n-1]=Fn
# eliminasi gauss
for k in range (0,n-1):
for i in range (k+1, n):
if J[i,k]!=0 :
z= J[i,k]/J[k,k]
J[i,k:n]=J[i,k:n]-(J[k,k:n]*z)
B[i]=B[i]-(B[k]*z)
print(J)
u=np.zeros(n,float)
for m in range (n-1 , -1, -1):
u[m]=(B[m]-np.dot(J[m,m+1:n], u[m+1:n]))/J[m,m]
print('nilai U',m+2,u[m])
F1=-m_k[0]*u[0]
print(F1)
