portal 7 frame 2d metode kekakuan
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PENYELESAIAN UAS "MEKANIKA REKAYASA V" (reguler)
Semester Gasal 2005/200 ! gl# 2$ %a&uar' 200
SEP $ 's*ret'+e a&, Gl-.al egrees - ree,-m (1)
Defined DOF
after boundary condit
PENYELESAIAN
Pr-ert'es e&ama&g
Bahan / material :
E = 2.00E+06
Batang 1 :
0.30m
0.50m
0.15m2
E = 2.00E+06t/m2
3.13E-03m4
t/m2
b1 =
h1 =
A1 =
I1 =
versi le
45o
6m
3m
Rigid !nneti!n
P2 = 5 tP1 (ton)
45o
3mA
B
C
D
fixed
fixed
fixed
q = 3t/m
"
#
gl!bal a$i%
&1
&2
A '
B
''"
R'(
&3
)
''#
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6 m
0 degree%
Batang 3 :
0.30m
0.50m
0.15m2
E = 2.00E+06t/m2
3.13E-03m4
4.242641m
315degree%
Re3a Eleme& ,alam Matr'3s Ke3a3ua& 4ata&g
Batang EA / L 4.EI / L 2.EI / L 6.EI / L^2 12.EI / L^3 Sudut (deg) )$1 5.00E+04 4.1*E+03 2.0E+03 1.04E+03 3.4*E+02 0 1
2 *.0*E+04 5.,E+03 2.,5E+03 2.0E+03 ,.2E+02 45 0.*0*10*
3 *.0*E+04 5.,E+03 2.,5E+03 2.0E+03 ,.2E+02 315 0.*0*10*
ata .e.a&
1 = 1 !n
2 = 5 !n
= 3 !n/m
= 0 !n.m
Gaa ,a& M-me& U6u&g a,a Eleme&t 7$
a = 0 b = 0
a = , b = ,
a = , .m b = -, .m
Gaa ,a& M-me& U6u&g a,a Eleme&t 72
a = 0 b = 0
a = 0 b = 0
a = 0 .m b = 0 .m
Gaa ,a& M-me& U6u&g a,a Eleme&t 78
a = 0 b = 0
a = 0 b = 0
a = 0 .m b = 0 .m
Re3a Gaa U6u&g 4ata&g (Sum.u L-3al)
!. Btgng 7iri 8i9 ng 7anan 89
Beban FX(i) Beban FY(i) Beban MZ(i) Beban FX() Beban FY() Beban MZ()
1 0 , , 0 , -,
2 0 0 0 0 0 0
3 0 0 0 0 0 0
1 =
theta1 =
b3 =
h3 =
A3 =
I3 =
3 =
theta3 =
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4e.a& atau M-me& a,a 't'3 %-'&t Stru3tur ,alam Ara9 Sum.u Gl-.al/Sum.u S
!. iti7 : 1 2
'i%. ;b ? %e%ai %mb gl!bal %tr7tr
. @e%e%aian %b l!7al element dengan '>? arah gl!bal
d.
a. 'i%laement titi7 %mb gl!bal %tr7tr ada tia element
Eleme&t ' 6
1 1 2 3 10 11 122 10 11 12 4 5 6
3 10 11 12 * ,
b. '>? %e%ai %mb gl!bal %tr7tr
? 0 0 0 d1 0 d2
Element &2!al a$i% 1 2 3 4 5 6
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0 0 1 0 0 0
0 0 0 0
0 0 0 0
0 0 0 0 0 1
Element 2:
R = 0 0 0 0
0 0 0 0
0 0 1 0 0 0
0 0 0 0
0 0 0 0
0 0 0 0 0 1
Element 3:
R = 0 0 0 00 0 0 0
0 0 1 0 0 0
0 0 0 0
0 0 0 0
0 0 0 0 0 1
:::; ALAM SUM4U L1KAL
Batang = 1
Elemen dalam matri7% 7e7a7an batang :
EA / 4.EI / 2.EI / 6.EI / D2 12.EI / D3
5.00E+04 4.1*E+03 2.0E+03 1.04E+03 3.4*E+02
)$ = !% theta = 1
) = %in theta = 0
!al a$i% 1 2 3 4 5 6
1 50000 0 0 -50000 0 0
2 0 34*.2222 1041.66* 0 -34*.2222 1041.66*
3 0 1041.66* 4166.66* 0 -1041.66* 203.3334 -50000 0 0 50000 0 0
5 0 -34*.2222 -1041.66* 0 34*.2222 -1041.66*
6 0 1041.66* 203.333 0 -1041.66* 4166.66*
:::; ALAM SUM4U L1KAL
Batang = 2
Elemen dalam matri7% 7e7a7an batang :
EA / 4.EI / 2.EI / 6.EI / D2 12.EI / D3
*.0*E+04 5.,E+03 2.,5E+03 2.0E+03 ,.2E+02
)$ = !% theta = 0.*0*10*
) = %in theta = 0.*0*10*
!% α1
%in α1
- %in α1
!% α1
!% α1
%in α1
- %in α1
!% α1
!% α1
%in α1
- %in α1
!% α1
!% α1
%in α1
- %in α1
!% α1
!% α1
%in α1
- %in α1
!% α1
;1C =
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N-,al -r*es
a# ! A3'.at .e.a& ,' sea&6a&g .e&ta&g (3e,ua u6u&g ,'3e3a&g)
Eleme&t $ ran%!rm
!al a$i%
0 1
, 2
= , 3
0 4
, 5
-, 6
Eleme&t 2 ran%!rm
!al a$i%
0 1
0 2
= 0 30 4
0 5
0 6
Eleme&t 8 ran%!rm
!al a$i%
0 1
0 2
= 0 3
0 40 5
0 6
Susu& matr'3s .e.a& e3'?ale&
G!int ;b
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1 2 0 2
1 3 0 3
2 4 0 4
A = 2 5 0 5
2 6 0 6
3 * 0 *
3 0 3 , 0 ,
4 10 0 d1
4 11 -5 d2
4 12 0 d3
*# ! 4e.a& 3-m.'&as' atau ga.u&ga& (Ae @ A6)
G!int ;b
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0 *0*10.6 0 0 -*0*10.6
0 0 ,2.0,2 203.333 0
0 + 0 203.333 5,2.55* 0
0 -*0*10.6 0 0 *0*10.6
0 0 -,2.0,2 -203.333 0
0 0 203.333 2,46.2* 0
SELESAI A4LE Eleme&t -r*es ! ra
rame Stat'-& ututas
?rame 1 l!al a$i% !int e$t m e$t
0 1 1 1 0 'EA'
B#CD 2 1 1 6 'EA'
$0#8 3 1 2 0 'EA'
0 4 2 2 4.24264 'EA'
C#8$88 5 2 3 0 'EA'
!#820D2 6 2 3 4.24264 'EA'
?rame 2 l!al a$i% !int
!$0#B5C 1 2 A4LE Eleme&t %-'&t -r*es
$#0C$B 2 2 rame %-'&t ututas
8#$80 3 2 e$t e$t e$t
$0#B5C 4 3 1 1 'EA'
!$#0C$B 5 3 1 2 'EA'
$#2B 6 3 2 2 'EA'
2 3 'EA'
?rame 3 l!al a$i% !int 3 2 'EA'
$0#B5C 1 2 3 4 'EA'
$#0C$B 2 2
8#$80 3 2
!$0#B5C 4 4
!$#0C$B 5 4
$#2B 6 4
*.42163*
0.*64,,
.166 6.6566
A3C =
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ons
Batang 2 :
0.30m
0.50m
0.15m2
E = 2.00E+06t/m2
3.13E-03m4
b2 =
h2 =
A2 =
I2 =
gkap
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4.242641m
45 degree%
)0
0.*0*10*
-0.*0*10*
2 =
theta2 =
45o
6m
Rigid !nneti!n
P2 = 5 tP1 (ton)
45o
A
Dfixed
fixed
q = 3 t/m
#
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ru3tur
3 4
, 10 11 12
0 0 0 -5 0
==F ? %e%ai %b gl!bal
, === '>? %e%ai %b gl!bal
raian %b gl!bal :
raian %b 4 = 1.)$ + 2.)
raian %b 5 = 1.) + 2.)$
raian %b * = 4.)$ + 5.)
raian %b = 4.) + 5.)$
RC = 1 0 0 0 0 0
0 1 0 0 0 0
l
"
gl!bal a$i%
&1 A
R'(
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0 0 1 0 0 0
0 0 0 1 0 0
0 0 0 0 1 0
0 0 0 0 0 1
RC = 0.*0*10* 0.*0*10* 0 0 0 0
-0.*0*10* 0.*0*10* 0 0 0 0
0 0 1 0 0 0
0 0 0 0.*0*10* 0.*0*10* 0
0 0 0 -0.*0*10* 0.*0*10* 0
0 0 0 0 0 1
RC = 0.*0*10* -0.*0*10* 0 0 0 00.*0*10* 0.*0*10* 0 0 0 0
0 0 1 0 0 0
0 0 0 0.*0*10* -0.*0*10* 0
0 0 0 0.*0*10* 0.*0*10* 0
0 0 0 0 0 1
1 2 3 d1 d2
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%i %b l!7al 7e gl!bal ==F
1 0 0 0 0 0 0
0 1 0 0 0 0 ,
= 0 0 1 0 0 0 $ ,
0 0 0 1 0 0 0
0 0 0 0 1 0 ,
0 0 0 0 0 1 -,
%i %b l!7al 7e gl!bal ==F
0.*0*10* -0.*0*10* 0 0 0 0 0
0.*0*10* 0.*0*10* 0 0 0 0 0
= 0 0 1 0 0 0 $ 00 0 0 0.*0*10* -0.*0*10* 0 0
0 0 0 0.*0*10* 0.*0*10* 0 0
0 0 0 0 0 1 0
%i %b l!7al 7e gl!bal ==F
-0.*0*10* 0.*0*10* 0 0 0 0 0
0 0 1 0 0 0 0
= 0 0 0 0.*0*10* 0.*0*10* 0 $ 0
0 0 0 -0.*0*10* 0.*0*10* 0 00 0 0 0 0 1 0
0 0 0 0 0 0 0
Element 3
0 0 0 1 1
0 , -, 2 2
0 , -, 3 3
0 0 0 4 40 = 0 Ae = 0 5 5
0 0 0 6 6
0 0 0 * *
0 0 0
0 0 0 , ,
0 0 0 10 d1
0 , -, 11 d2
0 -, , 12 d3
AMS 1 & . AM
L 1
AMS 2 & . AM
L 2
AMS 3 & . AM
L 3
# B
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ata lang A :
0 d1 0
-, d2 -14
-, d3 ,
0 1 0
= 0 A = 2 -,
0 3 -,
0 4 0
0 5 0
0 6 0
0 * 0
-14 0
, , 0
A4LE %-'&t 'sla*eme&ts
%-'&t ututas asee U$ U2 U8 R$ R2 R8
e$t e$t e$t m m m Radian% Radian% Radian%
1 'EA' in;tati 0 0 0 0 0 0
2 'EA' in;tati 0 0 -0.00021 0 -0.0005, 0
3 'EA' in;tati 0 0 0 0 0 0
4 'EA' in;tati 0 0 0 0 0 0
'e!rma%i %tr7tr dalam arah ;B >@A di batang 1H %bb :
1 0 0 0 0 0 0
0 1 0 0 0 0 0
0 0 1 0 0 0 $ 0
0 0 0 1 0 0 0
0 0 0 0 1 0 -0.00021
0 0 0 0 0 1 0.0005,
∆M 1 & . %MS 1
∆M 1 &
"
gl!bal a$i%
&1
&2
A '
''"
R'(
&3
)
'#
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0 0 0 0 0
-34*.2222 1041.66* 0 , 0.66*03,1
-1041.66* 203.333 $ 0 = , + 1.4462,51, =
0 0 0 0 0
34*.2222 -1041.66* -0.00021 , -0.66*03,
-1041.66* 4166.66* 0.0005, -, 2.6*3,22
'e!rma%i %tr7tr dalam arah ;B >@A di batang 2H %bb :
0.*0*10* 0.*0*10* 0 0 0 0 0-0.*0*10* 0.*0*10* 0 0 0 0 -0.00021
0 0 1 0 0 0 $ 0.0005,
0 0 0 0.*0*10* 0.*0*10* 0 0
0 0 0 -0.*0*10* 0.*0*10* 0 0
0 0 0 0 0 1 0
0 0 -0.00014 0 -10.4,5*
-,2.0,2 203.333 -0.00014 0 1.0153*
-203.333 2,46.2* $ 0.0005, = 0 + 3.1630356 =
0 0 0 0 10.4,5*03
,2.0,2 -203.333 0 0 -1.0154
-203.333 5,2.55* 0 0 1.426,004
'e!rma%i %tr7tr dalam arah ;B >@A di batang 3H %bb :
0.*0*10* -0.*0*10* 0 0 0 0 0
0.*0*10* 0.*0*10* 0 0 0 0 -0.00021
0 0 1 0 0 0 $ 0.0005,
0 0 0 0.*0*10* -0.*0*10* 0 0
0 0 0 0.*0*10* 0.*0*10* 0 0
0 0 0 0 0 1 0
∆M 2 & . %MS 2
∆M 2 &
∆M 3 & . %MS 3
∆M 3 &
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0 0 0.00014 0 10.4,5*03
-,2.0,2 203.333 -0.00014 0 1.0153*
-203.333 2,46.2* $ 0.0005, = 0 + 3.1630356 =
0 0 0 0 -10.4,5*
,2.0,2 -203.333 0 0 -1.0154
-203.333 5,2.55* 0 0 1.426,004
es
asee P V2 V8 M2 M8 rameElem lemStat'-
e$t !n !n !n !n-m !n-m !n-m e$t m
in;tati 0 -,.66* 0 0 0 -10.4463 1-1 0
in;tati 0 .3133 0 0 0 -6.3260* 1-1 6
in;tati 10.4,5 -1.01, 0 0 0 -3.16304 2-1 0
in;tati 10.4,5 -1.01, 0 0 0 1.426, 2-1 4.24264
in;tati -10.4,5 -1.01, 0 0 0 -3.16304 3-1 0
in;tati -10.4,5 -1.01, 0 0 0 1.426, 3-1 4.24264
! rames
asee $ 2 8 M$ M2 M8 rameElem
e$t !n !n !n !n-m !n-m !n-m e$t
in;tati 0 0 ,.66* 0 -10.4463 0 1
in;tati 0 0 .3133 0 6.3260* 0 1
in;tati -.166 0 -6.6566 0 -3.16304 0 2
in;tati .166 0 6.6566 0 -1.426, 0 2
in;tati .166 0 -6.6566 0 -3.16304 0 3
in;tati -.166 0 6.6566 0 -1.426, 0 3
-*.42163*
0.*64,,
-.166 -6.6566
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3m
3m
B
C
fixed
B
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1 0 0 0 0 0
0 1 0 0 0 0
RC =
&2
'
''"
&3
)
''#
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0 0 1 0 0 0
0 0 0 1 0 0
0 0 0 0 1 0
0 0 0 0 0 1
0.*0*106*12 -0.*0*10* 0 0 0 0
0.*0*106*12 0.*0*10* 0 0 0 0
0 0 1 0 0 0
0 0 0 0.*0*10* -0.*0*10* 0
0 0 0 0.*0*10* 0.*0*10* 0
0 0 0 0 0 1
0.*0*106*12 0.*0*10* 0 0 0 0-0.*0*106*12 0.*0*10* 0 0 0 0
0 0 1 0 0 0
0 0 0 0.*0*10* 0.*0*10* 0
0 0 0 -0.*0*10* 0.*0*10* 0
0 0 0 0 0 1
d3
12
0 - - - - - -
1041.666* - - - - - -
203.3333 - - - - - -0 - - - - - -
-1041.66* - - - - - -
4166.666* - - - - - -
6
RC =
RC
=
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6
-14*3.13, 80.339 80.329 0.01 0.33 0.32 0.01
14*3.13,1 80.329 80.339 80.019 0.32 0.33 80.019
2,46.2*3 0.01 80.019 - 80.019 0.01 -
14*3.13,1 0.33 0.32 80.019 80.339 80.329 80.019
-14*3.13, 0.32 0.33 0.01 80.329 80.339 0.015,2.5565 0.01 80.019 - 80.019 0.01 -
,
,
14*3.13,1
14*3.13,1
2,46.2*3
-14*3.13,
-14*3.13,
5,2.5565
)e7: >@
1216,3.42 0.00 0.00 80.659 - -
0.00 *2040.65 1,04.63 - 80.659 80.0190.00 1,04.63 15,51.* - 80.019 -
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0 -
-14 -
, -
- ===F 0
0.00 ===F .44E-00
0.00 ===F 2.64E-00*
%b l!7al '>?
0 1 1 - 0
0 2 2 - 0
= 0 3 3 - 0
0 4 d1 - 0
-0.00020,,156 5 d2 - -0.00021
0.0005,263, 6 d3 - 0.0005,
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%b l!7al '>? / %b gl!bal )e7 :
0 1 1 0 -
B#CD08B 2 2 ,.66*03 0.00
$0#2B5 3 3 10.4462, 0.00
0 4 d1 0 -
C#8$82B$ 5 d2 .3132,* 80.009
!#820D2 6 d3 -6.3260*4 0.00
%b l!7al '>?
-0.00014432* 1 $)+d2)$) 80.009 0-0.00014432* 2 $)+d2)$) 0.00 0
= 0.0005,263, 3 d3 - 0
0 4 4 - 0
0 5 5 - 0
0 6 6 - 0
%b l!7al '>? / %b gl!bal )e7 :!$0#B5DC 1 $)+d2)$) 0 810.509
$#0C$C5C 2 $)+d2)$) 0 1.0
8#$8085B 3 d3 0 3.16
$0#B5DC 4 4 0 10.50
!$#0C$C5C 5 5 0 81.09
$#2B005 6 6 0 1.43
%b l!7al '>?
0.00014432* 1 d1 80.009 0
-0.00014432* 2 d2 0.00 0
= 0.0005,263, 3 d3 - 0
0 4 * - 0
0 5 - 0
0 6 , - 0
%b l!7al '>? / %b gl!bal )e7 :
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$0#B5DC 1 d1 0 10.50
$#0C$C5C 2 d2 0 1.0
8#$8085B 3 d3 0 3.16
!$0#B5DC 4 * 0 810.509
!$#0C$C5C 5 0 81.09
$#2B005 6 , 0 1.43
- ===F 0
0.0000 ===F 3.,1E-006
0.0000 ===F -5E-006
- ===F 0
0.0000 ===F -4E-006
0.0000 ===F -2E-006
0.0000 ===F 1.,*E-005
0.0000 ===F -4E-005
0.0000 ===F -4E-006
0.0000 ===F -2E-005
0.0000 ===F 4.16E-005
0.0000 ===F 4.2E-00*
0.0000 ===F -2E-005
0.0000 ===F -4E-005
0.0000 ===F -4E-006
0.0000 ===F 1.,*E-005
0.0000 ===F 4.16E-005
0.0000 ===F 4.2E-00*
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1 0 0 0 0 0 50000 0
0 1 0 0 0 0 0 34*.2222
0 0 1 0 0 0 0 1041.66*0 0 0 1 0 0 -50000 0
0 0 0 0 1 0 0 -34*.2222
0 0 0 0 0 1 0 1041.66*
50000 0 0 -50000 0 0 1 0
0 34*.2222 1041.66* 0 -34*.2222 1041.66* 0 1
0 1041.66* 4166.66* 0 -1041.66* 203.333 0 0
-50000 0 0 50000 0 0 0 0
0 -34*.2222 -1041.66* 0 34*.2222 -1041.66* 0 0
0 1041.66* 203.333 0 -1041.66* 4166.66* 0 0
=R> =SM> =R>
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0.*0*10* -0.*0*10* 0 0 0 0 *0*10.6 0
0.*0*10* 0.*0*10* 0 0 0 0 0 ,2.0,2
0 0 1 0 0 0 0 203.333
0 0 0 0.*0*10* -0.*0*10* 0 -*0*10.6 00 0 0 0.*0*10* 0.*0*10* 0 0 -,2.0,2
0 0 0 0 0 1 0 203.333
0.*0*10* 0.*0*10* 0 0 0 0 *0*10.6 0
-0.*0*10* 0.*0*10* 0 0 0 0 0 ,2.0,2
0 0 1 0 0 0 0 203.333
0 0 0 0.*0*10* 0.*0*10* 0 -*0*10.6 0
0 0 0 -0.*0*10* 0.*0*10* 0 0 -,2.0,2
0 0 0 0 0 1 0 203.333
=R> =SM> =R>
=R> =SM> =R>
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- >@
- >@
- >@
- >@
80.009 ida7 >@...)e7 agi..
0.00 ida7 >@...)e7 agi..
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1K
',a3 1K###e3 Lag'##
',a3 1K###e3 Lag'##
1K
',a3 1K###e3 Lag'##
',a3 1K###e3 Lag'##
80.009 ida7 >@...)e7 agi.. 80.009 ida7 >@...)e7 agi..
0.00 ida7 >@...)e7 agi..
- >@
- >@
- >@
',a3 1K###e3 Lag'##
',a3 1K###e3 Lag'##
',a3 1K###e3 Lag'##
',a3 1K###e3 Lag'##
',a3 1K###e3 Lag'##
',a3 1K###e3 Lag'##
0.00 ida7 >@...)e7 agi..
80.009 ida7 >@...)e7 agi..
0.00 ida7 >@...)e7 agi..
- >@
- >@
- >@
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',a3 1K###e3 Lag'##
',a3 1K###e3 Lag'##
',a3 1K###e3 Lag'##
',a3 1K###e3 Lag'##
',a3 1K###e3 Lag'##
',a3 1K###e3 Lag'##
-
8/18/2019 Portal 7 Frame 2d Metode Kekakuan
37/81
-
8/18/2019 Portal 7 Frame 2d Metode Kekakuan
38/81
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8/18/2019 Portal 7 Frame 2d Metode Kekakuan
39/81
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8/18/2019 Portal 7 Frame 2d Metode Kekakuan
40/81
0 -50000 0 0 1 0 0 0
1041.66* 0 -34*.2222 1041.66* 0 1 0 0
4166.66* 0 -1041.66* 203.333 0 0 1 00 50000 0 0 0 0 0 1
-1041.66* 0 34*.2222 -1041.66* 0 0 0 0
203.333 0 -1041.66* 4166.66* 0 0 0 0
0 0 0 0 50000 0 0 -50000
0 0 0 0 0 34*.2222 1041.66* 0
1 0 0 0 = 0 1041.66* 4166.66* 0
0 1 0 0 -50000 0 0 50000
0 0 1 0 0 -34*.2222 -1041.66* 0
0 0 0 1 0 1041.66* 203.333 0
-
8/18/2019 Portal 7 Frame 2d Metode Kekakuan
41/81
0 -*0*10.6 0 0 1 1 0 0
203.333 0 -,2.0,2 203.333 -1 1 0 0
5,2.55* 0 -203.333 2,46.2* 0 0 1 0
0 *0*10.6 0 0 0 0 0 1-203.333 0 ,2.0,2 -203.333 0 0 0 -1
2,46.2* 0 -203.333 5,2.55* 0 0 0 0
0 -*0*10.6 0 0 1 -1 0 0
203.333 0 -,2.0,2 203.333 1 1 0 0
5,2.55* 0 -203.333 2,46.2* 0 0 1 0
0 *0*10.6 0 0 0 0 0 1
-203.333 0 ,2.0,2 -203.333 0 0 0 1
2,46.2* 0 -203.333 5,2.55* 0 0 0 0
-
8/18/2019 Portal 7 Frame 2d Metode Kekakuan
42/81
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8/18/2019 Portal 7 Frame 2d Metode Kekakuan
43/81
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8/18/2019 Portal 7 Frame 2d Metode Kekakuan
44/81
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8/18/2019 Portal 7 Frame 2d Metode Kekakuan
45/81
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8/18/2019 Portal 7 Frame 2d Metode Kekakuan
46/81
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8/18/2019 Portal 7 Frame 2d Metode Kekakuan
47/81
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8/18/2019 Portal 7 Frame 2d Metode Kekakuan
48/81
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8/18/2019 Portal 7 Frame 2d Metode Kekakuan
49/81
0 0
0 0
0 00 0
1 0
0 1
0 0 - - - - - -
-34*.2222 1041.66* - - - - - -
-1041.66* 203.333 - - - - - -
0 0 - - - - - -
34*.2222 -1041.66* - - - - - -
-1041.66* 4166.66* - - - - - -
-
8/18/2019 Portal 7 Frame 2d Metode Kekakuan
50/81
0 0 50000 -6,4.4444 -14*3.13, -50000 6,4.4444 -14*3.13,
0 0 50000 6,4.4444 14*3.13, -50000 -6,4.4444 14*3.13,
0 0 0 203.333 5,2.55* 0 -203.333 2,46.2*
1 0 -50000 6,4.4444 14*3.13, 50000 -6,4.4444 14*3.13,1 0 -50000 -6,4.4444 -14*3.13, 50000 6,4.4444 -14*3.13,
0 1 0 203.333 2,46.2* 0 -203.333 5,2.55*
0 0 50000 6,4.4444 14*3.13, -50000 -6,4.4444 14*3.13,
0 0 -50000 6,4.4444 14*3.13, 50000 -6,4.4444 14*3.13,
0 0 0 203.333 5,2.55* 0 -203.333 2,46.2*
-1 0 -50000 -6,4.4444 -14*3.13, 50000 6,4.4444 -14*3.13,
1 0 50000 -6,4.4444 -14*3.13, -50000 6,4.4444 -14*3.13,
0 1 0 203.333 2,46.2* 0 -203.333 5,2.55*
-
8/18/2019 Portal 7 Frame 2d Metode Kekakuan
51/81
-
8/18/2019 Portal 7 Frame 2d Metode Kekakuan
52/81
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8/18/2019 Portal 7 Frame 2d Metode Kekakuan
53/81
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8/18/2019 Portal 7 Frame 2d Metode Kekakuan
54/81
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8/18/2019 Portal 7 Frame 2d Metode Kekakuan
55/81
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8/18/2019 Portal 7 Frame 2d Metode Kekakuan
56/81
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8/18/2019 Portal 7 Frame 2d Metode Kekakuan
57/81
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8/18/2019 Portal 7 Frame 2d Metode Kekakuan
58/81
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8/18/2019 Portal 7 Frame 2d Metode Kekakuan
59/81
0.*0*10* 0.*0*10* 0 0 0 0 3546.3,
-0.*0*10* 0.*0*10* 0 0 0 0 3464.2,
0 0 1 0 0 0 = -14*3.13,
0 0 0 0.*0*10* 0.*0*10* 0 -3546.3,0 0 0 -0.*0*10* 0.*0*10* 0 -3464.2,
0 0 0 0 0 1 -14*3.13,
0.*0*10* -0.*0*10* 0 0 0 0 3546.3,
0.*0*10* 0.*0*10* 0 0 0 0 -3464.2,
0 0 1 0 0 0 = 14*3.13,
0 0 0 0.*0*10* -0.*0*10* 0 -3546.3,
0 0 0 0.*0*10* 0.*0*10* 0 3464.2,
0 0 0 0 0 1 14*3.13,
-
8/18/2019 Portal 7 Frame 2d Metode Kekakuan
60/81
-
8/18/2019 Portal 7 Frame 2d Metode Kekakuan
61/81
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8/18/2019 Portal 7 Frame 2d Metode Kekakuan
62/81
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8/18/2019 Portal 7 Frame 2d Metode Kekakuan
63/81
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8/18/2019 Portal 7 Frame 2d Metode Kekakuan
64/81
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8/18/2019 Portal 7 Frame 2d Metode Kekakuan
65/81
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8/18/2019 Portal 7 Frame 2d Metode Kekakuan
66/81
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8/18/2019 Portal 7 Frame 2d Metode Kekakuan
67/81
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8/18/2019 Portal 7 Frame 2d Metode Kekakuan
68/81
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8/18/2019 Portal 7 Frame 2d Metode Kekakuan
69/81
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8/18/2019 Portal 7 Frame 2d Metode Kekakuan
70/81
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8/18/2019 Portal 7 Frame 2d Metode Kekakuan
71/81
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8/18/2019 Portal 7 Frame 2d Metode Kekakuan
72/81
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8/18/2019 Portal 7 Frame 2d Metode Kekakuan
73/81
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8/18/2019 Portal 7 Frame 2d Metode Kekakuan
74/81
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8/18/2019 Portal 7 Frame 2d Metode Kekakuan
75/81
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8/18/2019 Portal 7 Frame 2d Metode Kekakuan
76/81
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8/18/2019 Portal 7 Frame 2d Metode Kekakuan
77/81
- - -
- - -
- - -
- - -- - -
- - -
- - -
- - -
- - -
- - -
- - -
- - -
-
8/18/2019 Portal 7 Frame 2d Metode Kekakuan
78/81
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8/18/2019 Portal 7 Frame 2d Metode Kekakuan
79/81
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8/18/2019 Portal 7 Frame 2d Metode Kekakuan
80/81
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8/18/2019 Portal 7 Frame 2d Metode Kekakuan
81/81
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