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609fd308ff1b4abe5e00de68afd5a05a4d4b07f0 | 449d555969bfd7befe906877abab098c6e63a0e8 | /3665/CH6/EX6.7/Ex6_7.sce | 122d7f6424601bce243e89dbb87d42dd5ccc0172 | [] | no_license | FOSSEE/Scilab-TBC-Uploads | 948e5d1126d46bdd2f89a44c54ba62b0f0a1f5e1 | 7bc77cb1ed33745c720952c92b3b2747c5cbf2df | refs/heads/master | 2020-04-09T02:43:26.499817 | 2018-02-03T05:31:52 | 2018-02-03T05:31:52 | 37,975,407 | 3 | 12 | null | null | null | null | UTF-8 | Scilab | false | false | 736 | sce | Ex6_7.sce | clc//
//
//
//Variable declaration
n1=1;n2=1;n3=1;
h=6.62*10^-34; //planck's constant
m=8.5*10^-31; //mass(kg)
L=10^-11; //side(m)
//Calculation
E111=h^2*(n1^2+n2^2+n3^2)/(8*m*1.6*10^-19*L^2); //lowest energy of electron(eV)
E112=6*h^2/(8*m*1.6*10^-19*L^2); //value of E112(eV)
E121=E112; //value of E121(eV)
E211=E112; //value of E211(eV)
E122=9*h^2/(8*m*1.6*10^-19*L^2); //value of E122(eV)
E212=E122; //value of E212(eV)
E221=E122; //value of E221(eV)
//Result
printf("\n lowest energy of electron is %0.3f *10^4 eV",E111/10^4)
printf("\n value of E112, E121, E211 is %0.4f *10^4 eV",E121/10^4)
printf("\n value of E122, E212, E221 is %0.3f *10^4 eV",E122/10^4)
|
3125ca48f7c449a823a37a86315fa74b34f42dbb | 1b969fbb81566edd3ef2887c98b61d98b380afd4 | /Rez/bivariate-lcmsr-post_mi/bfi_c_hrz_ind_d/~BivLCM-SR-bfi_c_hrz_ind_d-PLin-VLin.tst | 8904e20aa36ab0148a70c740d19fd9d61d06beac | [] | no_license | psdlab/life-in-time-values-and-personality | 35fbf5bbe4edd54b429a934caf289fbb0edfefee | 7f6f8e9a6c24f29faa02ee9baffbe8ae556e227e | refs/heads/master | 2020-03-24T22:08:27.964205 | 2019-03-04T17:03:26 | 2019-03-04T17:03:26 | 143,070,821 | 1 | 0 | null | null | null | null | UTF-8 | Scilab | false | false | 11,974 | tst | ~BivLCM-SR-bfi_c_hrz_ind_d-PLin-VLin.tst |
THE OPTIMIZATION ALGORITHM HAS CHANGED TO THE EM ALGORITHM.
ESTIMATED COVARIANCE MATRIX FOR PARAMETER ESTIMATES
1 2 3 4 5
________ ________ ________ ________ ________
1 0.302237D+00
2 -0.245528D-02 0.232444D-02
3 0.361244D-01 -0.651147D-03 0.270894D+00
4 -0.165720D-03 0.673557D-04 -0.249563D-02 0.229678D-02
5 -0.459639D-03 0.115669D-03 0.895125D-03 0.636905D-04 0.357689D-02
6 0.218838D-03 -0.780657D-04 0.365550D-03 -0.665999D-04 -0.234519D-03
7 0.867740D-03 0.254897D-04 0.887011D-04 0.142557D-03 0.834647D-03
8 -0.981576D-04 0.115250D-03 -0.329261D-03 -0.759834D-04 0.146915D-03
9 -0.317896D+00 0.883734D-02 -0.536698D-01 -0.157076D-01 0.422682D-01
10 -0.163611D+00 -0.864271D-02 0.634887D-01 -0.778937D-02 0.114537D+00
11 0.320027D-01 -0.631790D-02 0.882909D-01 0.390059D-03 0.607577D-01
12 0.290000D+00 0.174303D-01 -0.740391D+00 0.646421D-01 -0.256602D-01
13 -0.847452D-01 -0.293636D-02 0.198777D-01 -0.292567D-02 0.699806D-02
14 -0.224596D+00 0.242750D-01 -0.701095D+00 -0.521236D-02 0.292052D-01
15 -0.229349D+01 -0.247032D-01 -0.625002D+00 0.173510D-01 -0.125779D+00
16 -0.615272D-01 -0.255818D-02 0.614882D-02 -0.764420D-03 -0.985877D-03
17 0.995340D-02 -0.520050D-03 0.329465D-02 0.173097D-03 -0.403334D-03
18 -0.271829D+00 0.178133D-01 -0.830617D-01 -0.183751D-01 -0.132512D-01
19 0.691610D-02 0.606392D-02 0.646350D-01 -0.237465D-02 0.636972D-02
20 0.812438D-01 -0.146002D-01 -0.114761D+01 -0.180424D-01 -0.264537D-01
21 0.295655D-01 -0.856482D-02 -0.513752D-01 0.666754D-02 -0.832384D-02
22 -0.759407D-03 0.479911D-04 0.217768D-02 0.405965D-03 -0.202506D-03
23 0.168618D-01 0.800755D-03 0.132017D-01 -0.804206D-02 0.165993D-03
24 0.633588D-03 0.292610D-03 -0.163620D-02 0.349604D-03 0.275172D-04
ESTIMATED COVARIANCE MATRIX FOR PARAMETER ESTIMATES
6 7 8 9 10
________ ________ ________ ________ ________
6 0.715592D-03
7 0.566392D-03 0.296361D-02
8 0.106209D-03 0.402433D-03 0.220257D-02
9 0.107366D-01 -0.530939D-02 0.804893D-03 0.455215D+02
10 0.536383D-02 0.246816D-01 0.122214D-01 0.483691D+01 0.187473D+02
11 0.221908D-01 0.793642D-01 0.210599D-01 -0.908608D+00 -0.146971D+01
12 -0.461377D-01 0.184530D-01 0.749218D-01 -0.374641D+01 0.181570D+01
13 0.514813D-01 0.970305D-01 0.123002D-01 0.289057D+01 0.177862D+01
14 0.141306D-02 0.405586D-01 0.206325D+00 0.270661D+01 0.347309D+01
15 -0.162409D-01 -0.754918D-01 -0.353808D-01 -0.993042D+01 -0.120366D+02
16 -0.465600D-03 -0.121948D-02 -0.351656D-03 0.826286D+00 -0.148851D+00
17 0.349259D-04 0.536809D-04 -0.233570D-04 -0.166010D+00 -0.843381D-02
18 -0.363278D-01 -0.737379D-01 -0.280474D-01 -0.182096D+01 0.221993D+00
19 -0.625466D-02 0.135095D-01 -0.278960D-02 -0.195353D+01 -0.719725D+00
20 0.322977D-02 -0.207217D-01 -0.126568D+00 -0.166280D+01 -0.141904D+01
21 0.688261D-02 -0.132906D-01 0.113109D-02 0.227393D+01 0.512253D+00
22 -0.939775D-04 -0.480114D-03 -0.171426D-03 -0.931656D-02 -0.282019D-01
23 -0.273213D-03 -0.907457D-03 0.193390D-02 -0.191110D+00 0.798080D-01
24 -0.481466D-04 -0.220536D-03 -0.560370D-03 0.258789D-01 -0.181389D-01
ESTIMATED COVARIANCE MATRIX FOR PARAMETER ESTIMATES
11 12 13 14 15
________ ________ ________ ________ ________
11 0.349199D+02
12 -0.426651D+01 0.226263D+03
13 -0.587687D+00 0.892835D+00 0.138832D+02
14 0.112908D+01 0.167709D+02 0.235832D+01 0.665357D+02
15 0.316696D+00 0.950428D+01 -0.306235D+00 -0.297464D+01 0.240988D+03
16 -0.239757D+00 0.220531D+00 0.129580D-01 0.473598D-01 0.170788D+01
17 0.278389D-01 0.229269D-01 -0.208197D-01 -0.444631D-01 -0.102218D+01
18 -0.441862D+01 0.401396D+01 -0.514529D+01 -0.503030D+01 0.238835D+02
19 0.603700D+00 0.154222D+01 -0.931326D+00 -0.144104D+01 -0.184588D+00
20 0.631236D+00 -0.419523D+02 -0.182259D+01 -0.262633D+02 0.383275D+01
21 -0.654042D-01 -0.143933D+01 0.805419D+00 0.111946D+01 -0.107970D+01
22 -0.552074D-01 0.976658D-01 -0.719911D-03 -0.235436D-01 -0.345739D-01
23 0.943681D-01 0.271539D+00 -0.999284D-01 0.276553D+00 -0.846322D+00
24 -0.155961D-01 -0.289020D-01 -0.382746D-02 -0.831572D-01 0.963572D-01
ESTIMATED COVARIANCE MATRIX FOR PARAMETER ESTIMATES
16 17 18 19 20
________ ________ ________ ________ ________
16 0.472962D+00
17 -0.229319D-01 0.139522D-01
18 -0.484647D+00 -0.827611D-01 0.120256D+03
19 0.121388D-01 0.200951D-01 0.512624D+00 0.383714D+01
20 -0.757620D+00 0.864389D-01 0.551131D+01 0.441517D+00 0.238296D+03
21 0.138677D+00 -0.234263D-01 0.152306D+00 -0.361555D+01 -0.797640D+00
22 -0.102249D-02 0.172295D-02 -0.483657D+00 -0.612848D-02 -0.256111D-01
23 -0.864472D-02 0.635849D-02 -0.354238D+00 0.898415D-01 0.269141D+01
24 0.612059D-02 -0.115429D-02 0.846363D-03 -0.154522D-01 -0.117907D+01
ESTIMATED COVARIANCE MATRIX FOR PARAMETER ESTIMATES
21 22 23 24
________ ________ ________ ________
21 0.429085D+01
22 -0.185489D-01 0.605769D-02
23 -0.404837D-01 -0.310878D-02 0.426634D+00
24 0.937891D-02 0.657750D-03 -0.383262D-01 0.145348D-01
ESTIMATED CORRELATION MATRIX FOR PARAMETER ESTIMATES
1 2 3 4 5
________ ________ ________ ________ ________
1 1.000
2 -0.093 1.000
3 0.126 -0.026 1.000
4 -0.006 0.029 -0.100 1.000
5 -0.014 0.040 0.029 0.022 1.000
6 0.015 -0.061 0.026 -0.052 -0.147
7 0.029 0.010 0.003 0.055 0.256
8 -0.004 0.051 -0.013 -0.034 0.052
9 -0.086 0.027 -0.015 -0.049 0.105
10 -0.069 -0.041 0.028 -0.038 0.442
11 0.010 -0.022 0.029 0.001 0.172
12 0.035 0.024 -0.095 0.090 -0.029
13 -0.041 -0.016 0.010 -0.016 0.031
14 -0.050 0.062 -0.165 -0.013 0.060
15 -0.269 -0.033 -0.077 0.023 -0.135
16 -0.163 -0.077 0.017 -0.023 -0.024
17 0.153 -0.091 0.054 0.031 -0.057
18 -0.045 0.034 -0.015 -0.035 -0.020
19 0.006 0.064 0.063 -0.025 0.054
20 0.010 -0.020 -0.143 -0.024 -0.029
21 0.026 -0.086 -0.048 0.067 -0.067
22 -0.018 0.013 0.054 0.109 -0.044
23 0.047 0.025 0.039 -0.257 0.004
24 0.010 0.050 -0.026 0.061 0.004
ESTIMATED CORRELATION MATRIX FOR PARAMETER ESTIMATES
6 7 8 9 10
________ ________ ________ ________ ________
6 1.000
7 0.389 1.000
8 0.085 0.158 1.000
9 0.059 -0.014 0.003 1.000
10 0.046 0.105 0.060 0.166 1.000
11 0.140 0.247 0.076 -0.023 -0.057
12 -0.115 0.023 0.106 -0.037 0.028
13 0.517 0.478 0.070 0.115 0.110
14 0.006 0.091 0.539 0.049 0.098
15 -0.039 -0.089 -0.049 -0.095 -0.179
16 -0.025 -0.033 -0.011 0.178 -0.050
17 0.011 0.008 -0.004 -0.208 -0.016
18 -0.124 -0.124 -0.054 -0.025 0.005
19 -0.119 0.127 -0.030 -0.148 -0.085
20 0.008 -0.025 -0.175 -0.016 -0.021
21 0.124 -0.118 0.012 0.163 0.057
22 -0.045 -0.113 -0.047 -0.018 -0.084
23 -0.016 -0.026 0.063 -0.043 0.028
24 -0.015 -0.034 -0.099 0.032 -0.035
ESTIMATED CORRELATION MATRIX FOR PARAMETER ESTIMATES
11 12 13 14 15
________ ________ ________ ________ ________
11 1.000
12 -0.048 1.000
13 -0.027 0.016 1.000
14 0.023 0.137 0.078 1.000
15 0.003 0.041 -0.005 -0.023 1.000
16 -0.059 0.021 0.005 0.008 0.160
17 0.040 0.013 -0.047 -0.046 -0.557
18 -0.068 0.024 -0.126 -0.056 0.140
19 0.052 0.052 -0.128 -0.090 -0.006
20 0.007 -0.181 -0.032 -0.209 0.016
21 -0.005 -0.046 0.104 0.066 -0.034
22 -0.120 0.083 -0.002 -0.037 -0.029
23 0.024 0.028 -0.041 0.052 -0.083
24 -0.022 -0.016 -0.009 -0.085 0.051
ESTIMATED CORRELATION MATRIX FOR PARAMETER ESTIMATES
16 17 18 19 20
________ ________ ________ ________ ________
16 1.000
17 -0.282 1.000
18 -0.064 -0.064 1.000
19 0.009 0.087 0.024 1.000
20 -0.071 0.047 0.033 0.015 1.000
21 0.097 -0.096 0.007 -0.891 -0.025
22 -0.019 0.187 -0.567 -0.040 -0.021
23 -0.019 0.082 -0.049 0.070 0.267
24 0.074 -0.081 0.001 -0.065 -0.634
ESTIMATED CORRELATION MATRIX FOR PARAMETER ESTIMATES
21 22 23 24
________ ________ ________ ________
21 1.000
22 -0.115 1.000
23 -0.030 -0.061 1.000
24 0.038 0.070 -0.487 1.000
|
6cf89b96da97e1b7099af63b6397dd37483076b0 | 449d555969bfd7befe906877abab098c6e63a0e8 | /965/CH7/EX7.17/17.sci | 4b32eed353ddc24df23ab692ad4acf4912252223 | [] | no_license | FOSSEE/Scilab-TBC-Uploads | 948e5d1126d46bdd2f89a44c54ba62b0f0a1f5e1 | 7bc77cb1ed33745c720952c92b3b2747c5cbf2df | refs/heads/master | 2020-04-09T02:43:26.499817 | 2018-02-03T05:31:52 | 2018-02-03T05:31:52 | 37,975,407 | 3 | 12 | null | null | null | null | UTF-8 | Scilab | false | false | 417 | sci | 17.sci | clc;
clear all;
disp("To find velocity")
w=1;//m width
L=1.5;//m length
Tp=90;// degree C
Ta=10;// degree C
Q=3.75*1000;// W rate of energy dissipation
rho=1.09;// kg/m^3
k=0.028;// W/m.C
cp=10007;// J/kg.C
mu=2.03*10^(-5);//kg/m-s viscosity
Pr=0.7;
A=L*w;//m^2
h=Q/(A*(Tp-Ta));
h
Nu=h*L/k;
Nu
//Nu=0.664*Re^0.5*Pr^(1/3)
Re=(Nu/(.664*Pr^(1/3)))^2;
U=Re*mu/(rho*L);
disp("m/s",U,"Velocity = ")
|
269dae795f69d860b64f63d9637192807faa7bbf | 449d555969bfd7befe906877abab098c6e63a0e8 | /476/CH5/EX5.9/Example_5_9.sce | 8854902dbbbc4445c011c9b0c8291dd54822c605 | [] | no_license | FOSSEE/Scilab-TBC-Uploads | 948e5d1126d46bdd2f89a44c54ba62b0f0a1f5e1 | 7bc77cb1ed33745c720952c92b3b2747c5cbf2df | refs/heads/master | 2020-04-09T02:43:26.499817 | 2018-02-03T05:31:52 | 2018-02-03T05:31:52 | 37,975,407 | 3 | 12 | null | null | null | null | UTF-8 | Scilab | false | false | 501 | sce | Example_5_9.sce | //A Textbook of Chemical Engineering Thermodynamics
//Chapter 5
//Some Applications of the Laws of Thermodynamics
//Example 9
clear;
clc;
//Given:
T1 = 288; //temperature of surrounding (K)
T2 = 261; //temperature of solution (K)
Q2 = 1000; //heat removed (kJ/min)
//To determine the least amount of power
//Using eq. 5.57 (Page no. 137)
W = Q2*((T1-T2)/T2); //power in kJ/min
P = (W*1000)/(746*60); //power in hp
mprintf('Least amount of power necessary is %f hp',P);
//end |
c38c8184946b20bf94e8d330c5bb0ca1632a22c7 | 449d555969bfd7befe906877abab098c6e63a0e8 | /27/CH2/EX2.7.2/Example_2_7_2.sce | 16e1b7ee2542367740fc356be4b94c8e45edc674 | [] | no_license | FOSSEE/Scilab-TBC-Uploads | 948e5d1126d46bdd2f89a44c54ba62b0f0a1f5e1 | 7bc77cb1ed33745c720952c92b3b2747c5cbf2df | refs/heads/master | 2020-04-09T02:43:26.499817 | 2018-02-03T05:31:52 | 2018-02-03T05:31:52 | 37,975,407 | 3 | 12 | null | null | null | null | UTF-8 | Scilab | false | false | 789 | sce | Example_2_7_2.sce | //Example 2.7.2 Page 31
//Non-Linear Dynamics and Chaos, First Indian Edition Print 2007
//Steven H. Strogatz
clear;
clc;
close;
set(gca(),"auto_clear","off") //hold on
//Given : x(dot) = f(x) = x - x^3.
//On integrating we get --> V(x) = -(1/2)x^2 + (1/4)x^4 + C ; C=0.
//Now plotting V(x) v/s x ; and observe fix points and their Stabilities
for x = -2:0.05:2
V = -(1/2)*(x^2) + (1/4)*(x^4);
plot2d(x,V,style=-2)
end
plot2d(0,0,style=-3) //Just to show that the fixed point is UnStable.
plot2d(-1,-1/4,style=-4) //Just to show that the fixed point is Stable.
plot2d(1,-1/4,style=-4) //Just to show that the fixed point is Stable.
set(gca(),"grid",[2,5])
xtitle("Double-Well Potential Diagram (Bistable)","x-Axis(x)","y-Axis (V(x))") |
ed6145e6429a93662a8a288686f11c1eef1fc638 | 449d555969bfd7befe906877abab098c6e63a0e8 | /2195/CH8/EX8.6.12/ex_8_6_12.sce | 5413c881c7890dd65d1da8bda8b39a0df1314821 | [] | no_license | FOSSEE/Scilab-TBC-Uploads | 948e5d1126d46bdd2f89a44c54ba62b0f0a1f5e1 | 7bc77cb1ed33745c720952c92b3b2747c5cbf2df | refs/heads/master | 2020-04-09T02:43:26.499817 | 2018-02-03T05:31:52 | 2018-02-03T05:31:52 | 37,975,407 | 3 | 12 | null | null | null | null | UTF-8 | Scilab | false | false | 273 | sce | ex_8_6_12.sce | //Example 8.6.12 // capacitance
clc;
clear;
close;
//given data :
format('v',6)
F1=2;//in MHz
C1=450;//in pico-farad
F2=5;//in MHz
C2=60;//in pico-farad
ratio=F2/F1;
//1/sqrt(C2+Cd)=ratio/sqrt(C1+Cd)
Cd=(C1-(ratio^2*C2))/5.25;
disp(Cd,"self capacitance,Cd(pico-farad) = ")
|
ecf4c5921453025b84ef0d044e63ecd8302f00eb | 71fc0b80f29bd03d097bc45e07b3184189b6445c | /nand2tetris/proj1/And8.tst | 0adeee4d37c14eefcf7bdb56a7e95f305c2cdf81 | [
"MIT"
] | permissive | ethull/university | 05441b4a74833dd9ae2f904017bfe5140461f4af | 80e00400cf06e5574f4654f51d78544a5d7f66bb | refs/heads/main | 2023-06-08T00:52:03.533293 | 2023-05-25T15:37:21 | 2023-05-25T15:37:21 | 313,761,541 | 1 | 0 | null | null | null | null | UTF-8 | Scilab | false | false | 623 | tst | And8.tst | // This file is BASED ON part of www.nand2tetris.org
// and the book "The Elements of Computing Systems"
// by Nisan and Schocken, MIT Press.
// File name: projects/01/And8.tst
load And8.hdl,
output-file And8.out,
compare-to And8.cmp,
output-list a%B1.8.1 b%B1.8.1 out%B1.8.1;
set a %B00000000,
set b %B00000000,
eval,
output;
set a %B00000000,
set b %B11111111,
eval,
output;
set a %B11111111,
set b %B11111111,
eval,
output;
set a %B10101010,
set b %B01010101,
eval,
output;
set a %B00111100,
set b %B00001111,
eval,
output;
set a %B00010010,
set b %B10011000,
eval,
output;
|
7e65afd9765be6303aafff7077c1d1538553f3a2 | 449d555969bfd7befe906877abab098c6e63a0e8 | /42/CH10/EX10.1/sadiku_10_1.sce | 9d22d6b9151e505dbf7c0f312f457ddb3ec689b1 | [] | no_license | FOSSEE/Scilab-TBC-Uploads | 948e5d1126d46bdd2f89a44c54ba62b0f0a1f5e1 | 7bc77cb1ed33745c720952c92b3b2747c5cbf2df | refs/heads/master | 2020-04-09T02:43:26.499817 | 2018-02-03T05:31:52 | 2018-02-03T05:31:52 | 37,975,407 | 3 | 12 | null | null | null | null | UTF-8 | Scilab | false | false | 418 | sce | sadiku_10_1.sce | clear;
clc;
format('v',6);
disp('Direction of wave propagation is -ax');
w=10^8,c=3*10^8;
B=w/c;
disp(B,'Value of beta=');
T=2*%pi/w;
disp(T/2*10^9,'Time taken to travel half of wave length in nS= ');
t=0
x=-2*%pi:%pi/16:2*%pi;
Ey=50*cos(10^8 *t +B*x);
subplot(2,2,1)
plot(x,Ey);
t=T/4;
Ey=50*cos(10^8 *t +B*x);
subplot(2,2,2)
plot(x,Ey);
t=T/2;
Ey=50*cos(10^8 *t +B*x);
subplot(2,2,3)
plot(x,Ey); |
cf05bef3746cf62f401a93858cbf06e84f2a32ee | 449d555969bfd7befe906877abab098c6e63a0e8 | /710/CH2/EX2.2/2_2.sci | d2ccddb6617e7e0c5351916524da3d6abf38cebd | [] | no_license | FOSSEE/Scilab-TBC-Uploads | 948e5d1126d46bdd2f89a44c54ba62b0f0a1f5e1 | 7bc77cb1ed33745c720952c92b3b2747c5cbf2df | refs/heads/master | 2020-04-09T02:43:26.499817 | 2018-02-03T05:31:52 | 2018-02-03T05:31:52 | 37,975,407 | 3 | 12 | null | null | null | null | UTF-8 | Scilab | false | false | 251 | sci | 2_2.sci | clc();
clear;
//To determine the free volume per unit cell
r=2.3; //atomic radius
a=(4*r)/sqrt(3);
fv=((a)^3-(2*(4/3)*%pi*r^3))*10^-30 //free volume in m^3
printf("The free volume per unit cell is %e m^3",fv);
|
da40884e50fdf4f52f6f27ad836ae9f2704607e2 | 449d555969bfd7befe906877abab098c6e63a0e8 | /551/CH8/EX8.15/15.sce | 13d3ca232fe70383cdf7217331e51a4ff0f1361f | [] | no_license | FOSSEE/Scilab-TBC-Uploads | 948e5d1126d46bdd2f89a44c54ba62b0f0a1f5e1 | 7bc77cb1ed33745c720952c92b3b2747c5cbf2df | refs/heads/master | 2020-04-09T02:43:26.499817 | 2018-02-03T05:31:52 | 2018-02-03T05:31:52 | 37,975,407 | 3 | 12 | null | null | null | null | UTF-8 | Scilab | false | false | 244 | sce | 15.sce | clc
d=12; //m; diameter of spherical balloon
V=4/3*%pi*(d/2)^3;
T=303; //K
p=1.21*10^5; //Pa
pc=12.97*10^5; //Pa
Tc=33.3; //K
R=8314/2;
pr=p/pc;
Tr=T/Tc;
Z=1;
m=p*V/Z/R/T;
disp("Mass of H2 in the balloon =")
disp(m)
disp("kg") |
cd302d432a28ead7bca99921ccaee6ec2810268d | 449d555969bfd7befe906877abab098c6e63a0e8 | /1439/CH13/EX13.3/13_3.sce | 7166cd2359a546961a3a26799c20b6c043c41969 | [] | no_license | FOSSEE/Scilab-TBC-Uploads | 948e5d1126d46bdd2f89a44c54ba62b0f0a1f5e1 | 7bc77cb1ed33745c720952c92b3b2747c5cbf2df | refs/heads/master | 2020-04-09T02:43:26.499817 | 2018-02-03T05:31:52 | 2018-02-03T05:31:52 | 37,975,407 | 3 | 12 | null | null | null | null | UTF-8 | Scilab | false | false | 186 | sce | 13_3.sce | clc
//initialisation of variables
C= 0.005 //N
k= 6.997*10^-4 //ohm^-1 cm^-1
//CALCULATIONS
A= 1000*k/C
//RESULTS
printf ('equivalent conductance= %.1f cm^2 equiv^-1 ohm^-1',A)
|
2fc81aa00527cbeb91c73957159c15e8c5dfbaa3 | 449d555969bfd7befe906877abab098c6e63a0e8 | /3472/CH20/EX20.4/Example20_4.sce | 654ae14ea704a3630ea766e8f245106e220fc6f6 | [] | no_license | FOSSEE/Scilab-TBC-Uploads | 948e5d1126d46bdd2f89a44c54ba62b0f0a1f5e1 | 7bc77cb1ed33745c720952c92b3b2747c5cbf2df | refs/heads/master | 2020-04-09T02:43:26.499817 | 2018-02-03T05:31:52 | 2018-02-03T05:31:52 | 37,975,407 | 3 | 12 | null | null | null | null | UTF-8 | Scilab | false | false | 1,401 | sce | Example20_4.sce | // A Texbook on POWER SYSTEM ENGINEERING
// A.Chakrabarti, M.L.Soni, P.V.Gupta, U.S.Bhatnagar
// DHANPAT RAI & Co.
// SECOND EDITION
// PART II : TRANSMISSION AND DISTRIBUTION
// CHAPTER 13: WAVE PROPAGATION ON TRANSMISSION LINES
// EXAMPLE : 13.4 :
// Page number 366
clear ; clc ; close ; // Clear the work space and console
// Given data
R_1 = 60.0 // Surge impedance of underground cable(ohm)
R_2 = 400.0 // Surge impedance of overhead line(ohm)
e = 100.0 // Maximum value of surge(kV)
// Calculations
i = e*1000/R_1 // Current(A)
k = (R_2-R_1)/(R_2+R_1)
e_ref = k*e // Reflected voltage(kV)
e_trans = e+e_ref // Transmitted voltage(kV)
e_trans_alt = (1+k)*e // Transmitted voltage(kV). Alternative method
i_ref = -k*i // Reflected current(A)
i_trans = e_trans*1000/R_2 // Transmitted current(A)
i_trans_alt = (1-k)*i // Transmitted current(A). Alternative method
// Results
disp("PART II - EXAMPLE : 13.4 : SOLUTION :-")
printf("\nReflected voltage at the junction = %.f kV", e_ref)
printf("\nTransmitted voltage at the junction = %.f kV", e_trans)
printf("\nReflected current at the junction = %.f A", i_ref)
printf("\nTransmitted current at the junction = %.f A\n", i_trans)
printf("\nNOTE: ERROR: Calculation mistake in textbook in finding Reflected current")
|
c14108843034414335a4c0596f8664e983daa5ed | 449d555969bfd7befe906877abab098c6e63a0e8 | /1061/CH7/EX7.9/Ex7_9.sce | a1ff3263e93616adffc6f185a9e542274ab87295 | [] | no_license | FOSSEE/Scilab-TBC-Uploads | 948e5d1126d46bdd2f89a44c54ba62b0f0a1f5e1 | 7bc77cb1ed33745c720952c92b3b2747c5cbf2df | refs/heads/master | 2020-04-09T02:43:26.499817 | 2018-02-03T05:31:52 | 2018-02-03T05:31:52 | 37,975,407 | 3 | 12 | null | null | null | null | UTF-8 | Scilab | false | false | 287 | sce | Ex7_9.sce | //Ex:7.9
clc;
clear;
close;
n1=1.46;// core refractive index
n=4;// refractive index due to air
x=%pi/180;
A=(16*n1^2)/((1+n1)^4);
B=n*x;
n_ang=10^(-0.06);// angular coupling efficiency
NA=B/((%pi)*(1-(n_ang/A)));// numerical aperture
printf("The numerical aperture =%f", NA); |
c4b9870baa10390418578f0e1a8b0a5d409cc770 | 449d555969bfd7befe906877abab098c6e63a0e8 | /1217/CH5/EX5.20/Exa5_20.sce | 8a51b8990aed00ee616a17eb01bb95047510db7e | [] | no_license | FOSSEE/Scilab-TBC-Uploads | 948e5d1126d46bdd2f89a44c54ba62b0f0a1f5e1 | 7bc77cb1ed33745c720952c92b3b2747c5cbf2df | refs/heads/master | 2020-04-09T02:43:26.499817 | 2018-02-03T05:31:52 | 2018-02-03T05:31:52 | 37,975,407 | 3 | 12 | null | null | null | null | UTF-8 | Scilab | false | false | 490 | sce | Exa5_20.sce | // Exa 5.20
clc;
clear;
close;
// given data
R1=10;//in Kohm
R2=47;//in Kohm
R3=5.6;//in Kohm
RT=4.7;//in Kohm
CT=0.05;//in uF
V1=-10;//in Volt
V2=2;//in Volt
disp("By the concept of virtual ground and using superposition theorem the op-amp output voltage can be calculated.");
Vop=-(R1*V1/R2+R1*V2/R3);// in volt
VEE=0;//in Volt
I=(VEE+3-Vop)/RT;// in mA
fo=0.32*I*10^-3/(CT*10^-6);//in Hz
disp(Vop,"Op-amp voltage in volt is : ");
disp(fo/1000,"Frequency in KHz is :"); |
f07cb228a184fc4ddddb7f0b03212162bf13a79c | fd6a414e5722e920e5ebe08c77fe0f70b29e77cf | /EffectofLengthwindowonSTACF.sce | 68abdf11ff2bd1394a6dbfabdb64f442fb1fff75 | [] | no_license | JBouis/AudioProcessing | e774bdfaf38207643d441f975a96773ae3cbbd24 | c9f81b8d5ce447b014707b309ef209530219adc0 | refs/heads/master | 2021-05-18T02:21:40.839402 | 2020-03-29T15:22:16 | 2020-03-29T15:22:16 | 251,063,576 | 0 | 0 | null | null | null | null | UTF-8 | Scilab | false | false | 1,544 | sce | EffectofLengthwindowonSTACF.sce | // Program to fin effect of length of window
// on Short Time Autocorrelation Function ( STACF)
// using Rectangular window of different lengths
clc,close,clear,
[y,Fs]=wavread('C:\Test_Project\a-team_my_way.wav');
beg= 5200; // Sample at which window is to be applied
N= 800; // Length of window in samples
x=y(beg:beg+N-1); // Obtaining the required segment
wr=window('re',N); // Rectangular window
Rect_seg=x.*wr;
t=(beg:beg+N-1)/Fs; // Adjusting the x axis to time
subplot(221)
plot(t,Rect_seg)
xlabel('Time in seconds')
title('Selected segment in the signal with window of 800 samples')
c1=xcorr(Rect_seg); // Autocorrelation
lag=(1:length(c1))-ceil(length(c1)/2); // Adjusting x axis to get
// peak at lag=0
subplot(223)
plot(lag,c1)
title('Short Time Autocorrelation using window of 800 samples')
xlabel('Lag k')
ylabel('STACF')
////////////////////////////
beg=5200; // Sample at which window is to be applied
N=300; // Length of window in samples
x=y(beg:beg+N-1); // Obtaining the required segment
wr=window('re',N); // Rectangular Window
Rect_seg= x.*wr;
t=(beg:beg+N-1)/Fs; // Adjusting the x axis to time
subplot(222)
plot(t,Rect_seg)
xlabel('Time in seconds')
title('Selected segment in the signal with window of 300 smaples')
c1=xcorr(Rect_seg); // Autocorrelation
lag=(1:length(c1))-ceil(length(c1)/2); // Adjusting x axis to get
// peak at lag=0
subplot(224)
plot(lag,c1)
title('Short Time Autocorrelation using window of 300 samples')
xlabel('Lag k')
ylabel('STACF')
|
153ce57a6433b500da4415b5df349fd1958f103e | 449d555969bfd7befe906877abab098c6e63a0e8 | /1445/CH7/EX7.35/ch7_ex_35.sce | 6a7cfb05beee1a5128515872bd1eed824d9dc172 | [] | no_license | FOSSEE/Scilab-TBC-Uploads | 948e5d1126d46bdd2f89a44c54ba62b0f0a1f5e1 | 7bc77cb1ed33745c720952c92b3b2747c5cbf2df | refs/heads/master | 2020-04-09T02:43:26.499817 | 2018-02-03T05:31:52 | 2018-02-03T05:31:52 | 37,975,407 | 3 | 12 | null | null | null | null | UTF-8 | Scilab | false | false | 1,104 | sce | ch7_ex_35.sce | //CHAPTER 7- SINGLE PHASE TRANSFORMER
//Example 35
disp("CHAPTER 7");
disp("EXAMPLE 35");
//VARIABLE INITIALIZATION
va=200000; //apparent power
v1=11000; //primary voltage in Volts
v2=230; //secondary voltage in Volts
Woc=1600; //watts also equals core losses
Wc=2600; //watts, also equals cu losses
f=50;
//no load parameters
//day cycle given
h1=8;
load1=160000;
pf1=0.8;
h2=6;
load2=100000;
pf2=1;
h3=10;
load3=0;
pf3=0;
//SOLUTION
//24 hr energy output
Pout=load1*h1*pf1+load2*h2*pf2+load3*h3*pf3;
Pc24=Woc*24; // 24 hours Pc loss
//cu loss= hours.(kva output/kva rated)^2.Full load Cu loss
Pcu24=h1*(load1/va)^2*Wc+h2*(load2/va)^2*Wc+h3*(load3/va)^2*Wc;
Pin=Pout+Pc24+Pcu24;
eff=Pout*100/Pin;
//disp(sprintf("The value Pout is %f",Pout));
//disp(sprintf("The value Pc is %f",Pc24));
//disp(sprintf("The value Pcu is %f",Pcu24));
disp(sprintf("The percent efficiency at full load is %f",eff));
disp(" ");
//
//END
|
2aab883f23a6f8856782f8d1d97a98b6025a13e5 | 1bb72df9a084fe4f8c0ec39f778282eb52750801 | /test/X10H.prev.tst | f7f14e4465488fe721097f82064bb57448911acd | [
"Apache-2.0",
"LicenseRef-scancode-unknown-license-reference"
] | permissive | gfis/ramath | 498adfc7a6d353d4775b33020fdf992628e3fbff | b09b48639ddd4709ffb1c729e33f6a4b9ef676b5 | refs/heads/master | 2023-08-17T00:10:37.092379 | 2023-08-04T07:48:00 | 2023-08-04T07:48:00 | 30,116,803 | 2 | 0 | null | null | null | null | UTF-8 | Scilab | false | false | 18,834 | tst | X10H.prev.tst | # start Vieta.X10 m^4 - 2*m*n^3
# start Vieta.X10 2*m^3*n - n^4
# start Vieta.X10 m^3*n + n^4
# start Vieta.X10 m^4 + m*n^3
Vieta.X10 [0,0] 0 M^4 - 2*M*N^3
Vieta.X10 [0,0] 1 2*M^3*N - N^4
Vieta.X10 [0,0] 2 M^3*N + N^4
Vieta.X10 [0,0] 3 M^4 + M*N^3
Vieta.X10 [1,0] 0 4*M + 6*M^2 + 4*M^3 + M^4 - 2*N^3 - 2*M*N^3 + 1
Vieta.X10 [1,0] 1 2*N + 6*M*N + 6*M^2*N + 2*M^3*N - N^4
Vieta.X10 [1,0] 2 N + 3*M*N + 3*M^2*N + M^3*N + N^4
Vieta.X10 [1,0] 3 4*M + 6*M^2 + 4*M^3 + M^4 + N^3 + M*N^3 + 1
Vieta.X10 [-1,0] 0 - 4*M + 6*M^2 - 4*M^3 + M^4 + 2*N^3 - 2*M*N^3 + 1
Vieta.X10 [-1,0] 1 - 2*N + 6*M*N - 6*M^2*N + 2*M^3*N - N^4
Vieta.X10 [-1,0] 2 - N + 3*M*N - 3*M^2*N + M^3*N + N^4
Vieta.X10 [-1,0] 3 - 4*M + 6*M^2 - 4*M^3 + M^4 - N^3 + M*N^3 + 1
Vieta.X10 [0,1] 0 - 2*M + M^4 - 6*M*N - 6*M*N^2 - 2*M*N^3
Vieta.X10 [0,1] 1 2*M^3 - 4*N + 2*M^3*N - 6*N^2 - 4*N^3 - N^4 - 1
Vieta.X10 [0,1] 2 M^3 + 4*N + M^3*N + 6*N^2 + 4*N^3 + N^4 + 1
Vieta.X10 [0,1] 3 M + M^4 + 3*M*N + 3*M*N^2 + M*N^3
Vieta.X10 [0,-1] 0 2*M + M^4 - 6*M*N + 6*M*N^2 - 2*M*N^3
Vieta.X10 [0,-1] 1 - 2*M^3 + 4*N + 2*M^3*N - 6*N^2 + 4*N^3 - N^4 - 1
Vieta.X10 [0,-1] 2 - M^3 - 4*N + M^3*N + 6*N^2 - 4*N^3 + N^4 + 1
Vieta.X10 [0,-1] 3 - M + M^4 + 3*M*N - 3*M*N^2 + M*N^3
Vieta.X10 [1,1] 0 2*M + 6*M^2 + 4*M^3 + M^4 - 6*N - 6*M*N - 6*N^2 - 6*M*N^2 - 2*N^3 - 2*M*N^3 - 1
Vieta.X10 [1,1] 1 6*M + 6*M^2 + 2*M^3 - 2*N + 6*M*N + 6*M^2*N + 2*M^3*N - 6*N^2 - 4*N^3 - N^4 + 1
Vieta.X10 [1,1] 2 3*M + 3*M^2 + M^3 + 5*N + 3*M*N + 3*M^2*N + M^3*N + 6*N^2 + 4*N^3 + N^4 + 2
Vieta.X10 [1,1] 3 5*M + 6*M^2 + 4*M^3 + M^4 + 3*N + 3*M*N + 3*N^2 + 3*M*N^2 + N^3 + M*N^3 + 2
Vieta.X10 [-1,1] 0 - 6*M + 6*M^2 - 4*M^3 + M^4 + 6*N - 6*M*N + 6*N^2 - 6*M*N^2 + 2*N^3 - 2*M*N^3 + 3
Vieta.X10 [-1,1] 1 6*M - 6*M^2 + 2*M^3 - 6*N + 6*M*N - 6*M^2*N + 2*M^3*N - 6*N^2 - 4*N^3 - N^4 - 3
Vieta.X10 [-1,1] 2 3*M - 3*M^2 + M^3 + 3*N + 3*M*N - 3*M^2*N + M^3*N + 6*N^2 + 4*N^3 + N^4
Vieta.X10 [-1,1] 3 - 3*M + 6*M^2 - 4*M^3 + M^4 - 3*N + 3*M*N - 3*N^2 + 3*M*N^2 - N^3 + M*N^3
Vieta.X10 [1,-1] 0 6*M + 6*M^2 + 4*M^3 + M^4 - 6*N - 6*M*N + 6*N^2 + 6*M*N^2 - 2*N^3 - 2*M*N^3 + 3
Vieta.X10 [1,-1] 1 - 6*M - 6*M^2 - 2*M^3 + 6*N + 6*M*N + 6*M^2*N + 2*M^3*N - 6*N^2 + 4*N^3 - N^4 - 3
Vieta.X10 [1,-1] 2 - 3*M - 3*M^2 - M^3 - 3*N + 3*M*N + 3*M^2*N + M^3*N + 6*N^2 - 4*N^3 + N^4
Vieta.X10 [1,-1] 3 3*M + 6*M^2 + 4*M^3 + M^4 + 3*N + 3*M*N - 3*N^2 - 3*M*N^2 + N^3 + M*N^3
Vieta.X10 [-1,-1] 0 - 2*M + 6*M^2 - 4*M^3 + M^4 + 6*N - 6*M*N - 6*N^2 + 6*M*N^2 + 2*N^3 - 2*M*N^3 - 1
Vieta.X10 [-1,-1] 1 - 6*M + 6*M^2 - 2*M^3 + 2*N + 6*M*N - 6*M^2*N + 2*M^3*N - 6*N^2 + 4*N^3 - N^4 + 1
Vieta.X10 [-1,-1] 2 - 3*M + 3*M^2 - M^3 - 5*N + 3*M*N - 3*M^2*N + M^3*N + 6*N^2 - 4*N^3 + N^4 + 2
Vieta.X10 [-1,-1] 3 - 5*M + 6*M^2 - 4*M^3 + M^4 - 3*N + 3*M*N + 3*N^2 - 3*M*N^2 - N^3 + M*N^3 + 2
Vieta.X10 [2,0] 0 32*M + 24*M^2 + 8*M^3 + M^4 - 4*N^3 - 2*M*N^3 + 16
Vieta.X10 [2,0] 1 16*N + 24*M*N + 12*M^2*N + 2*M^3*N - N^4
Vieta.X10 [2,0] 2 8*N + 12*M*N + 6*M^2*N + M^3*N + N^4
Vieta.X10 [2,0] 3 32*M + 24*M^2 + 8*M^3 + M^4 + 2*N^3 + M*N^3 + 16
Vieta.X10 [-2,0] 0 - 32*M + 24*M^2 - 8*M^3 + M^4 + 4*N^3 - 2*M*N^3 + 16
Vieta.X10 [-2,0] 1 - 16*N + 24*M*N - 12*M^2*N + 2*M^3*N - N^4
Vieta.X10 [-2,0] 2 - 8*N + 12*M*N - 6*M^2*N + M^3*N + N^4
Vieta.X10 [-2,0] 3 - 32*M + 24*M^2 - 8*M^3 + M^4 - 2*N^3 + M*N^3 + 16
Vieta.X10 [2,1] 0 30*M + 24*M^2 + 8*M^3 + M^4 - 12*N - 6*M*N - 12*N^2 - 6*M*N^2 - 4*N^3 - 2*M*N^3 + 12
Vieta.X10 [2,1] 1 24*M + 12*M^2 + 2*M^3 + 12*N + 24*M*N + 12*M^2*N + 2*M^3*N - 6*N^2 - 4*N^3 - N^4 + 15
Vieta.X10 [2,1] 2 12*M + 6*M^2 + M^3 + 12*N + 12*M*N + 6*M^2*N + M^3*N + 6*N^2 + 4*N^3 + N^4 + 9
Vieta.X10 [2,1] 3 33*M + 24*M^2 + 8*M^3 + M^4 + 6*N + 3*M*N + 6*N^2 + 3*M*N^2 + 2*N^3 + M*N^3 + 18
Vieta.X10 [-2,1] 0 - 34*M + 24*M^2 - 8*M^3 + M^4 + 12*N - 6*M*N + 12*N^2 - 6*M*N^2 + 4*N^3 - 2*M*N^3 + 20
Vieta.X10 [-2,1] 1 24*M - 12*M^2 + 2*M^3 - 20*N + 24*M*N - 12*M^2*N + 2*M^3*N - 6*N^2 - 4*N^3 - N^4 - 17
Vieta.X10 [-2,1] 2 12*M - 6*M^2 + M^3 - 4*N + 12*M*N - 6*M^2*N + M^3*N + 6*N^2 + 4*N^3 + N^4 - 7
Vieta.X10 [-2,1] 3 - 31*M + 24*M^2 - 8*M^3 + M^4 - 6*N + 3*M*N - 6*N^2 + 3*M*N^2 - 2*N^3 + M*N^3 + 14
Vieta.X10 [2,-1] 0 34*M + 24*M^2 + 8*M^3 + M^4 - 12*N - 6*M*N + 12*N^2 + 6*M*N^2 - 4*N^3 - 2*M*N^3 + 20
Vieta.X10 [2,-1] 1 - 24*M - 12*M^2 - 2*M^3 + 20*N + 24*M*N + 12*M^2*N + 2*M^3*N - 6*N^2 + 4*N^3 - N^4 - 17
Vieta.X10 [2,-1] 2 - 12*M - 6*M^2 - M^3 + 4*N + 12*M*N + 6*M^2*N + M^3*N + 6*N^2 - 4*N^3 + N^4 - 7
Vieta.X10 [2,-1] 3 31*M + 24*M^2 + 8*M^3 + M^4 + 6*N + 3*M*N - 6*N^2 - 3*M*N^2 + 2*N^3 + M*N^3 + 14
Vieta.X10 [-2,-1] 0 - 30*M + 24*M^2 - 8*M^3 + M^4 + 12*N - 6*M*N - 12*N^2 + 6*M*N^2 + 4*N^3 - 2*M*N^3 + 12
Vieta.X10 [-2,-1] 1 - 24*M + 12*M^2 - 2*M^3 - 12*N + 24*M*N - 12*M^2*N + 2*M^3*N - 6*N^2 + 4*N^3 - N^4 + 15
Vieta.X10 [-2,-1] 2 - 12*M + 6*M^2 - M^3 - 12*N + 12*M*N - 6*M^2*N + M^3*N + 6*N^2 - 4*N^3 + N^4 + 9
Vieta.X10 [-2,-1] 3 - 33*M + 24*M^2 - 8*M^3 + M^4 - 6*N + 3*M*N + 6*N^2 - 3*M*N^2 - 2*N^3 + M*N^3 + 18
Vieta.X10 [0,2] 0 - 16*M + M^4 - 24*M*N - 12*M*N^2 - 2*M*N^3
Vieta.X10 [0,2] 1 4*M^3 - 32*N + 2*M^3*N - 24*N^2 - 8*N^3 - N^4 - 16
Vieta.X10 [0,2] 2 2*M^3 + 32*N + M^3*N + 24*N^2 + 8*N^3 + N^4 + 16
Vieta.X10 [0,2] 3 8*M + M^4 + 12*M*N + 6*M*N^2 + M*N^3
Vieta.X10 [0,-2] 0 16*M + M^4 - 24*M*N + 12*M*N^2 - 2*M*N^3
Vieta.X10 [0,-2] 1 - 4*M^3 + 32*N + 2*M^3*N - 24*N^2 + 8*N^3 - N^4 - 16
Vieta.X10 [0,-2] 2 - 2*M^3 - 32*N + M^3*N + 24*N^2 - 8*N^3 + N^4 + 16
Vieta.X10 [0,-2] 3 - 8*M + M^4 + 12*M*N - 6*M*N^2 + M*N^3
Vieta.X10 [1,2] 0 - 12*M + 6*M^2 + 4*M^3 + M^4 - 24*N - 24*M*N - 12*N^2 - 12*M*N^2 - 2*N^3 - 2*M*N^3 - 15
Vieta.X10 [1,2] 1 12*M + 12*M^2 + 4*M^3 - 30*N + 6*M*N + 6*M^2*N + 2*M^3*N - 24*N^2 - 8*N^3 - N^4 - 12
Vieta.X10 [1,2] 2 6*M + 6*M^2 + 2*M^3 + 33*N + 3*M*N + 3*M^2*N + M^3*N + 24*N^2 + 8*N^3 + N^4 + 18
Vieta.X10 [1,2] 3 12*M + 6*M^2 + 4*M^3 + M^4 + 12*N + 12*M*N + 6*N^2 + 6*M*N^2 + N^3 + M*N^3 + 9
Vieta.X10 [-1,2] 0 - 20*M + 6*M^2 - 4*M^3 + M^4 + 24*N - 24*M*N + 12*N^2 - 12*M*N^2 + 2*N^3 - 2*M*N^3 + 17
Vieta.X10 [-1,2] 1 12*M - 12*M^2 + 4*M^3 - 34*N + 6*M*N - 6*M^2*N + 2*M^3*N - 24*N^2 - 8*N^3 - N^4 - 20
Vieta.X10 [-1,2] 2 6*M - 6*M^2 + 2*M^3 + 31*N + 3*M*N - 3*M^2*N + M^3*N + 24*N^2 + 8*N^3 + N^4 + 14
Vieta.X10 [-1,2] 3 4*M + 6*M^2 - 4*M^3 + M^4 - 12*N + 12*M*N - 6*N^2 + 6*M*N^2 - N^3 + M*N^3 - 7
Vieta.X10 [1,-2] 0 20*M + 6*M^2 + 4*M^3 + M^4 - 24*N - 24*M*N + 12*N^2 + 12*M*N^2 - 2*N^3 - 2*M*N^3 + 17
Vieta.X10 [1,-2] 1 - 12*M - 12*M^2 - 4*M^3 + 34*N + 6*M*N + 6*M^2*N + 2*M^3*N - 24*N^2 + 8*N^3 - N^4 - 20
Vieta.X10 [1,-2] 2 - 6*M - 6*M^2 - 2*M^3 - 31*N + 3*M*N + 3*M^2*N + M^3*N + 24*N^2 - 8*N^3 + N^4 + 14
Vieta.X10 [1,-2] 3 - 4*M + 6*M^2 + 4*M^3 + M^4 + 12*N + 12*M*N - 6*N^2 - 6*M*N^2 + N^3 + M*N^3 - 7
Vieta.X10 [-1,-2] 0 12*M + 6*M^2 - 4*M^3 + M^4 + 24*N - 24*M*N - 12*N^2 + 12*M*N^2 + 2*N^3 - 2*M*N^3 - 15
Vieta.X10 [-1,-2] 1 - 12*M + 12*M^2 - 4*M^3 + 30*N + 6*M*N - 6*M^2*N + 2*M^3*N - 24*N^2 + 8*N^3 - N^4 - 12
Vieta.X10 [-1,-2] 2 - 6*M + 6*M^2 - 2*M^3 - 33*N + 3*M*N - 3*M^2*N + M^3*N + 24*N^2 - 8*N^3 + N^4 + 18
Vieta.X10 [-1,-2] 3 - 12*M + 6*M^2 - 4*M^3 + M^4 - 12*N + 12*M*N + 6*N^2 - 6*M*N^2 - N^3 + M*N^3 + 9
Vieta.X10 [2,2] 0 16*M + 24*M^2 + 8*M^3 + M^4 - 48*N - 24*M*N - 24*N^2 - 12*M*N^2 - 4*N^3 - 2*M*N^3 - 16
Vieta.X10 [2,2] 1 48*M + 24*M^2 + 4*M^3 - 16*N + 24*M*N + 12*M^2*N + 2*M^3*N - 24*N^2 - 8*N^3 - N^4 + 16
Vieta.X10 [2,2] 2 24*M + 12*M^2 + 2*M^3 + 40*N + 12*M*N + 6*M^2*N + M^3*N + 24*N^2 + 8*N^3 + N^4 + 32
Vieta.X10 [2,2] 3 40*M + 24*M^2 + 8*M^3 + M^4 + 24*N + 12*M*N + 12*N^2 + 6*M*N^2 + 2*N^3 + M*N^3 + 32
Vieta.X10 [-2,2] 0 - 48*M + 24*M^2 - 8*M^3 + M^4 + 48*N - 24*M*N + 24*N^2 - 12*M*N^2 + 4*N^3 - 2*M*N^3 + 48
Vieta.X10 [-2,2] 1 48*M - 24*M^2 + 4*M^3 - 48*N + 24*M*N - 12*M^2*N + 2*M^3*N - 24*N^2 - 8*N^3 - N^4 - 48
Vieta.X10 [-2,2] 2 24*M - 12*M^2 + 2*M^3 + 24*N + 12*M*N - 6*M^2*N + M^3*N + 24*N^2 + 8*N^3 + N^4
Vieta.X10 [-2,2] 3 - 24*M + 24*M^2 - 8*M^3 + M^4 - 24*N + 12*M*N - 12*N^2 + 6*M*N^2 - 2*N^3 + M*N^3
Vieta.X10 [2,-2] 0 48*M + 24*M^2 + 8*M^3 + M^4 - 48*N - 24*M*N + 24*N^2 + 12*M*N^2 - 4*N^3 - 2*M*N^3 + 48
Vieta.X10 [2,-2] 1 - 48*M - 24*M^2 - 4*M^3 + 48*N + 24*M*N + 12*M^2*N + 2*M^3*N - 24*N^2 + 8*N^3 - N^4 - 48
Vieta.X10 [2,-2] 2 - 24*M - 12*M^2 - 2*M^3 - 24*N + 12*M*N + 6*M^2*N + M^3*N + 24*N^2 - 8*N^3 + N^4
Vieta.X10 [2,-2] 3 24*M + 24*M^2 + 8*M^3 + M^4 + 24*N + 12*M*N - 12*N^2 - 6*M*N^2 + 2*N^3 + M*N^3
Vieta.X10 [-2,-2] 0 - 16*M + 24*M^2 - 8*M^3 + M^4 + 48*N - 24*M*N - 24*N^2 + 12*M*N^2 + 4*N^3 - 2*M*N^3 - 16
Vieta.X10 [-2,-2] 1 - 48*M + 24*M^2 - 4*M^3 + 16*N + 24*M*N - 12*M^2*N + 2*M^3*N - 24*N^2 + 8*N^3 - N^4 + 16
Vieta.X10 [-2,-2] 2 - 24*M + 12*M^2 - 2*M^3 - 40*N + 12*M*N - 6*M^2*N + M^3*N + 24*N^2 - 8*N^3 + N^4 + 32
Vieta.X10 [-2,-2] 3 - 40*M + 24*M^2 - 8*M^3 + M^4 - 24*N + 12*M*N + 12*N^2 - 6*M*N^2 - 2*N^3 + M*N^3 + 32
Vieta.X10 [3,0] 0 108*M + 54*M^2 + 12*M^3 + M^4 - 6*N^3 - 2*M*N^3 + 81
Vieta.X10 [3,0] 1 54*N + 54*M*N + 18*M^2*N + 2*M^3*N - N^4
Vieta.X10 [3,0] 2 27*N + 27*M*N + 9*M^2*N + M^3*N + N^4
Vieta.X10 [3,0] 3 108*M + 54*M^2 + 12*M^3 + M^4 + 3*N^3 + M*N^3 + 81
Vieta.X10 [-3,0] 0 - 108*M + 54*M^2 - 12*M^3 + M^4 + 6*N^3 - 2*M*N^3 + 81
Vieta.X10 [-3,0] 1 - 54*N + 54*M*N - 18*M^2*N + 2*M^3*N - N^4
Vieta.X10 [-3,0] 2 - 27*N + 27*M*N - 9*M^2*N + M^3*N + N^4
Vieta.X10 [-3,0] 3 - 108*M + 54*M^2 - 12*M^3 + M^4 - 3*N^3 + M*N^3 + 81
Vieta.X10 [3,1] 0 106*M + 54*M^2 + 12*M^3 + M^4 - 18*N - 6*M*N - 18*N^2 - 6*M*N^2 - 6*N^3 - 2*M*N^3 + 75
Vieta.X10 [3,1] 1 54*M + 18*M^2 + 2*M^3 + 50*N + 54*M*N + 18*M^2*N + 2*M^3*N - 6*N^2 - 4*N^3 - N^4 + 53
Vieta.X10 [3,1] 2 27*M + 9*M^2 + M^3 + 31*N + 27*M*N + 9*M^2*N + M^3*N + 6*N^2 + 4*N^3 + N^4 + 28
Vieta.X10 [3,1] 3 109*M + 54*M^2 + 12*M^3 + M^4 + 9*N + 3*M*N + 9*N^2 + 3*M*N^2 + 3*N^3 + M*N^3 + 84
Vieta.X10 [-3,1] 0 - 110*M + 54*M^2 - 12*M^3 + M^4 + 18*N - 6*M*N + 18*N^2 - 6*M*N^2 + 6*N^3 - 2*M*N^3 + 87
Vieta.X10 [-3,1] 1 54*M - 18*M^2 + 2*M^3 - 58*N + 54*M*N - 18*M^2*N + 2*M^3*N - 6*N^2 - 4*N^3 - N^4 - 55
Vieta.X10 [-3,1] 2 27*M - 9*M^2 + M^3 - 23*N + 27*M*N - 9*M^2*N + M^3*N + 6*N^2 + 4*N^3 + N^4 - 26
Vieta.X10 [-3,1] 3 - 107*M + 54*M^2 - 12*M^3 + M^4 - 9*N + 3*M*N - 9*N^2 + 3*M*N^2 - 3*N^3 + M*N^3 + 78
Vieta.X10 [3,-1] 0 110*M + 54*M^2 + 12*M^3 + M^4 - 18*N - 6*M*N + 18*N^2 + 6*M*N^2 - 6*N^3 - 2*M*N^3 + 87
Vieta.X10 [3,-1] 1 - 54*M - 18*M^2 - 2*M^3 + 58*N + 54*M*N + 18*M^2*N + 2*M^3*N - 6*N^2 + 4*N^3 - N^4 - 55
Vieta.X10 [3,-1] 2 - 27*M - 9*M^2 - M^3 + 23*N + 27*M*N + 9*M^2*N + M^3*N + 6*N^2 - 4*N^3 + N^4 - 26
Vieta.X10 [3,-1] 3 107*M + 54*M^2 + 12*M^3 + M^4 + 9*N + 3*M*N - 9*N^2 - 3*M*N^2 + 3*N^3 + M*N^3 + 78
Vieta.X10 [-3,-1] 0 - 106*M + 54*M^2 - 12*M^3 + M^4 + 18*N - 6*M*N - 18*N^2 + 6*M*N^2 + 6*N^3 - 2*M*N^3 + 75
Vieta.X10 [-3,-1] 1 - 54*M + 18*M^2 - 2*M^3 - 50*N + 54*M*N - 18*M^2*N + 2*M^3*N - 6*N^2 + 4*N^3 - N^4 + 53
Vieta.X10 [-3,-1] 2 - 27*M + 9*M^2 - M^3 - 31*N + 27*M*N - 9*M^2*N + M^3*N + 6*N^2 - 4*N^3 + N^4 + 28
Vieta.X10 [-3,-1] 3 - 109*M + 54*M^2 - 12*M^3 + M^4 - 9*N + 3*M*N + 9*N^2 - 3*M*N^2 - 3*N^3 + M*N^3 + 84
Vieta.X10 [3,2] 0 92*M + 54*M^2 + 12*M^3 + M^4 - 72*N - 24*M*N - 36*N^2 - 12*M*N^2 - 6*N^3 - 2*M*N^3 + 33
Vieta.X10 [3,2] 1 108*M + 36*M^2 + 4*M^3 + 22*N + 54*M*N + 18*M^2*N + 2*M^3*N - 24*N^2 - 8*N^3 - N^4 + 92
Vieta.X10 [3,2] 2 54*M + 18*M^2 + 2*M^3 + 59*N + 27*M*N + 9*M^2*N + M^3*N + 24*N^2 + 8*N^3 + N^4 + 70
Vieta.X10 [3,2] 3 116*M + 54*M^2 + 12*M^3 + M^4 + 36*N + 12*M*N + 18*N^2 + 6*M*N^2 + 3*N^3 + M*N^3 + 105
Vieta.X10 [-3,2] 0 - 124*M + 54*M^2 - 12*M^3 + M^4 + 72*N - 24*M*N + 36*N^2 - 12*M*N^2 + 6*N^3 - 2*M*N^3 + 129
Vieta.X10 [-3,2] 1 108*M - 36*M^2 + 4*M^3 - 86*N + 54*M*N - 18*M^2*N + 2*M^3*N - 24*N^2 - 8*N^3 - N^4 - 124
Vieta.X10 [-3,2] 2 54*M - 18*M^2 + 2*M^3 + 5*N + 27*M*N - 9*M^2*N + M^3*N + 24*N^2 + 8*N^3 + N^4 - 38
Vieta.X10 [-3,2] 3 - 100*M + 54*M^2 - 12*M^3 + M^4 - 36*N + 12*M*N - 18*N^2 + 6*M*N^2 - 3*N^3 + M*N^3 + 57
Vieta.X10 [3,-2] 0 124*M + 54*M^2 + 12*M^3 + M^4 - 72*N - 24*M*N + 36*N^2 + 12*M*N^2 - 6*N^3 - 2*M*N^3 + 129
Vieta.X10 [3,-2] 1 - 108*M - 36*M^2 - 4*M^3 + 86*N + 54*M*N + 18*M^2*N + 2*M^3*N - 24*N^2 + 8*N^3 - N^4 - 124
Vieta.X10 [3,-2] 2 - 54*M - 18*M^2 - 2*M^3 - 5*N + 27*M*N + 9*M^2*N + M^3*N + 24*N^2 - 8*N^3 + N^4 - 38
Vieta.X10 [3,-2] 3 100*M + 54*M^2 + 12*M^3 + M^4 + 36*N + 12*M*N - 18*N^2 - 6*M*N^2 + 3*N^3 + M*N^3 + 57
Vieta.X10 [-3,-2] 0 - 92*M + 54*M^2 - 12*M^3 + M^4 + 72*N - 24*M*N - 36*N^2 + 12*M*N^2 + 6*N^3 - 2*M*N^3 + 33
Vieta.X10 [-3,-2] 1 - 108*M + 36*M^2 - 4*M^3 - 22*N + 54*M*N - 18*M^2*N + 2*M^3*N - 24*N^2 + 8*N^3 - N^4 + 92
Vieta.X10 [-3,-2] 2 - 54*M + 18*M^2 - 2*M^3 - 59*N + 27*M*N - 9*M^2*N + M^3*N + 24*N^2 - 8*N^3 + N^4 + 70
Vieta.X10 [-3,-2] 3 - 116*M + 54*M^2 - 12*M^3 + M^4 - 36*N + 12*M*N + 18*N^2 - 6*M*N^2 - 3*N^3 + M*N^3 + 105
Vieta.X10 [0,3] 0 - 54*M + M^4 - 54*M*N - 18*M*N^2 - 2*M*N^3
Vieta.X10 [0,3] 1 6*M^3 - 108*N + 2*M^3*N - 54*N^2 - 12*N^3 - N^4 - 81
Vieta.X10 [0,3] 2 3*M^3 + 108*N + M^3*N + 54*N^2 + 12*N^3 + N^4 + 81
Vieta.X10 [0,3] 3 27*M + M^4 + 27*M*N + 9*M*N^2 + M*N^3
Vieta.X10 [0,-3] 0 54*M + M^4 - 54*M*N + 18*M*N^2 - 2*M*N^3
Vieta.X10 [0,-3] 1 - 6*M^3 + 108*N + 2*M^3*N - 54*N^2 + 12*N^3 - N^4 - 81
Vieta.X10 [0,-3] 2 - 3*M^3 - 108*N + M^3*N + 54*N^2 - 12*N^3 + N^4 + 81
Vieta.X10 [0,-3] 3 - 27*M + M^4 + 27*M*N - 9*M*N^2 + M*N^3
Vieta.X10 [1,3] 0 - 50*M + 6*M^2 + 4*M^3 + M^4 - 54*N - 54*M*N - 18*N^2 - 18*M*N^2 - 2*N^3 - 2*M*N^3 - 53
Vieta.X10 [1,3] 1 18*M + 18*M^2 + 6*M^3 - 106*N + 6*M*N + 6*M^2*N + 2*M^3*N - 54*N^2 - 12*N^3 - N^4 - 75
Vieta.X10 [1,3] 2 9*M + 9*M^2 + 3*M^3 + 109*N + 3*M*N + 3*M^2*N + M^3*N + 54*N^2 + 12*N^3 + N^4 + 84
Vieta.X10 [1,3] 3 31*M + 6*M^2 + 4*M^3 + M^4 + 27*N + 27*M*N + 9*N^2 + 9*M*N^2 + N^3 + M*N^3 + 28
Vieta.X10 [-1,3] 0 - 58*M + 6*M^2 - 4*M^3 + M^4 + 54*N - 54*M*N + 18*N^2 - 18*M*N^2 + 2*N^3 - 2*M*N^3 + 55
Vieta.X10 [-1,3] 1 18*M - 18*M^2 + 6*M^3 - 110*N + 6*M*N - 6*M^2*N + 2*M^3*N - 54*N^2 - 12*N^3 - N^4 - 87
Vieta.X10 [-1,3] 2 9*M - 9*M^2 + 3*M^3 + 107*N + 3*M*N - 3*M^2*N + M^3*N + 54*N^2 + 12*N^3 + N^4 + 78
Vieta.X10 [-1,3] 3 23*M + 6*M^2 - 4*M^3 + M^4 - 27*N + 27*M*N - 9*N^2 + 9*M*N^2 - N^3 + M*N^3 - 26
Vieta.X10 [1,-3] 0 58*M + 6*M^2 + 4*M^3 + M^4 - 54*N - 54*M*N + 18*N^2 + 18*M*N^2 - 2*N^3 - 2*M*N^3 + 55
Vieta.X10 [1,-3] 1 - 18*M - 18*M^2 - 6*M^3 + 110*N + 6*M*N + 6*M^2*N + 2*M^3*N - 54*N^2 + 12*N^3 - N^4 - 87
Vieta.X10 [1,-3] 2 - 9*M - 9*M^2 - 3*M^3 - 107*N + 3*M*N + 3*M^2*N + M^3*N + 54*N^2 - 12*N^3 + N^4 + 78
Vieta.X10 [1,-3] 3 - 23*M + 6*M^2 + 4*M^3 + M^4 + 27*N + 27*M*N - 9*N^2 - 9*M*N^2 + N^3 + M*N^3 - 26
Vieta.X10 [-1,-3] 0 50*M + 6*M^2 - 4*M^3 + M^4 + 54*N - 54*M*N - 18*N^2 + 18*M*N^2 + 2*N^3 - 2*M*N^3 - 53
Vieta.X10 [-1,-3] 1 - 18*M + 18*M^2 - 6*M^3 + 106*N + 6*M*N - 6*M^2*N + 2*M^3*N - 54*N^2 + 12*N^3 - N^4 - 75
Vieta.X10 [-1,-3] 2 - 9*M + 9*M^2 - 3*M^3 - 109*N + 3*M*N - 3*M^2*N + M^3*N + 54*N^2 - 12*N^3 + N^4 + 84
Vieta.X10 [-1,-3] 3 - 31*M + 6*M^2 - 4*M^3 + M^4 - 27*N + 27*M*N + 9*N^2 - 9*M*N^2 - N^3 + M*N^3 + 28
Vieta.X10 [2,3] 0 - 22*M + 24*M^2 + 8*M^3 + M^4 - 108*N - 54*M*N - 36*N^2 - 18*M*N^2 - 4*N^3 - 2*M*N^3 - 92
Vieta.X10 [2,3] 1 72*M + 36*M^2 + 6*M^3 - 92*N + 24*M*N + 12*M^2*N + 2*M^3*N - 54*N^2 - 12*N^3 - N^4 - 33
Vieta.X10 [2,3] 2 36*M + 18*M^2 + 3*M^3 + 116*N + 12*M*N + 6*M^2*N + M^3*N + 54*N^2 + 12*N^3 + N^4 + 105
Vieta.X10 [2,3] 3 59*M + 24*M^2 + 8*M^3 + M^4 + 54*N + 27*M*N + 18*N^2 + 9*M*N^2 + 2*N^3 + M*N^3 + 70
Vieta.X10 [-2,3] 0 - 86*M + 24*M^2 - 8*M^3 + M^4 + 108*N - 54*M*N + 36*N^2 - 18*M*N^2 + 4*N^3 - 2*M*N^3 + 124
Vieta.X10 [-2,3] 1 72*M - 36*M^2 + 6*M^3 - 124*N + 24*M*N - 12*M^2*N + 2*M^3*N - 54*N^2 - 12*N^3 - N^4 - 129
Vieta.X10 [-2,3] 2 36*M - 18*M^2 + 3*M^3 + 100*N + 12*M*N - 6*M^2*N + M^3*N + 54*N^2 + 12*N^3 + N^4 + 57
Vieta.X10 [-2,3] 3 - 5*M + 24*M^2 - 8*M^3 + M^4 - 54*N + 27*M*N - 18*N^2 + 9*M*N^2 - 2*N^3 + M*N^3 - 38
Vieta.X10 [2,-3] 0 86*M + 24*M^2 + 8*M^3 + M^4 - 108*N - 54*M*N + 36*N^2 + 18*M*N^2 - 4*N^3 - 2*M*N^3 + 124
Vieta.X10 [2,-3] 1 - 72*M - 36*M^2 - 6*M^3 + 124*N + 24*M*N + 12*M^2*N + 2*M^3*N - 54*N^2 + 12*N^3 - N^4 - 129
Vieta.X10 [2,-3] 2 - 36*M - 18*M^2 - 3*M^3 - 100*N + 12*M*N + 6*M^2*N + M^3*N + 54*N^2 - 12*N^3 + N^4 + 57
Vieta.X10 [2,-3] 3 5*M + 24*M^2 + 8*M^3 + M^4 + 54*N + 27*M*N - 18*N^2 - 9*M*N^2 + 2*N^3 + M*N^3 - 38
Vieta.X10 [-2,-3] 0 22*M + 24*M^2 - 8*M^3 + M^4 + 108*N - 54*M*N - 36*N^2 + 18*M*N^2 + 4*N^3 - 2*M*N^3 - 92
Vieta.X10 [-2,-3] 1 - 72*M + 36*M^2 - 6*M^3 + 92*N + 24*M*N - 12*M^2*N + 2*M^3*N - 54*N^2 + 12*N^3 - N^4 - 33
Vieta.X10 [-2,-3] 2 - 36*M + 18*M^2 - 3*M^3 - 116*N + 12*M*N - 6*M^2*N + M^3*N + 54*N^2 - 12*N^3 + N^4 + 105
Vieta.X10 [-2,-3] 3 - 59*M + 24*M^2 - 8*M^3 + M^4 - 54*N + 27*M*N + 18*N^2 - 9*M*N^2 - 2*N^3 + M*N^3 + 70
Vieta.X10 [3,3] 0 54*M + 54*M^2 + 12*M^3 + M^4 - 162*N - 54*M*N - 54*N^2 - 18*M*N^2 - 6*N^3 - 2*M*N^3 - 81
Vieta.X10 [3,3] 1 162*M + 54*M^2 + 6*M^3 - 54*N + 54*M*N + 18*M^2*N + 2*M^3*N - 54*N^2 - 12*N^3 - N^4 + 81
Vieta.X10 [3,3] 2 81*M + 27*M^2 + 3*M^3 + 135*N + 27*M*N + 9*M^2*N + M^3*N + 54*N^2 + 12*N^3 + N^4 + 162
Vieta.X10 [3,3] 3 135*M + 54*M^2 + 12*M^3 + M^4 + 81*N + 27*M*N + 27*N^2 + 9*M*N^2 + 3*N^3 + M*N^3 + 162
Vieta.X10 [-3,3] 0 - 162*M + 54*M^2 - 12*M^3 + M^4 + 162*N - 54*M*N + 54*N^2 - 18*M*N^2 + 6*N^3 - 2*M*N^3 + 243
Vieta.X10 [-3,3] 1 162*M - 54*M^2 + 6*M^3 - 162*N + 54*M*N - 18*M^2*N + 2*M^3*N - 54*N^2 - 12*N^3 - N^4 - 243
Vieta.X10 [-3,3] 2 81*M - 27*M^2 + 3*M^3 + 81*N + 27*M*N - 9*M^2*N + M^3*N + 54*N^2 + 12*N^3 + N^4
Vieta.X10 [-3,3] 3 - 81*M + 54*M^2 - 12*M^3 + M^4 - 81*N + 27*M*N - 27*N^2 + 9*M*N^2 - 3*N^3 + M*N^3
Vieta.X10 [3,-3] 0 162*M + 54*M^2 + 12*M^3 + M^4 - 162*N - 54*M*N + 54*N^2 + 18*M*N^2 - 6*N^3 - 2*M*N^3 + 243
Vieta.X10 [3,-3] 1 - 162*M - 54*M^2 - 6*M^3 + 162*N + 54*M*N + 18*M^2*N + 2*M^3*N - 54*N^2 + 12*N^3 - N^4 - 243
Vieta.X10 [3,-3] 2 - 81*M - 27*M^2 - 3*M^3 - 81*N + 27*M*N + 9*M^2*N + M^3*N + 54*N^2 - 12*N^3 + N^4
Vieta.X10 [3,-3] 3 81*M + 54*M^2 + 12*M^3 + M^4 + 81*N + 27*M*N - 27*N^2 - 9*M*N^2 + 3*N^3 + M*N^3
Vieta.X10 [-3,-3] 0 - 54*M + 54*M^2 - 12*M^3 + M^4 + 162*N - 54*M*N - 54*N^2 + 18*M*N^2 + 6*N^3 - 2*M*N^3 - 81
Vieta.X10 [-3,-3] 1 - 162*M + 54*M^2 - 6*M^3 + 54*N + 54*M*N - 18*M^2*N + 2*M^3*N - 54*N^2 + 12*N^3 - N^4 + 81
Vieta.X10 [-3,-3] 2 - 81*M + 27*M^2 - 3*M^3 - 135*N + 27*M*N - 9*M^2*N + M^3*N + 54*N^2 - 12*N^3 + N^4 + 162
Vieta.X10 [-3,-3] 3 - 135*M + 54*M^2 - 12*M^3 + M^4 - 81*N + 27*M*N + 27*N^2 - 9*M*N^2 - 3*N^3 + M*N^3 + 162
|
939851ddb14aeb49cf8a89130063dee756b21992 | 449d555969bfd7befe906877abab098c6e63a0e8 | /273/CH15/EX15.11/ex15_11.sce | ae4f9d4612cae4febec9e0f44b6984c6f45ae738 | [] | no_license | FOSSEE/Scilab-TBC-Uploads | 948e5d1126d46bdd2f89a44c54ba62b0f0a1f5e1 | 7bc77cb1ed33745c720952c92b3b2747c5cbf2df | refs/heads/master | 2020-04-09T02:43:26.499817 | 2018-02-03T05:31:52 | 2018-02-03T05:31:52 | 37,975,407 | 3 | 12 | null | null | null | null | UTF-8 | Scilab | false | false | 314 | sce | ex15_11.sce | clc;clear;
//Example 15.11
//calculation of final energy
//given values
B=.4;//max magnetic field in Wb/m^2
c=3*10^8;
e=1.6*10^-19;
d=1.52;//diametre in m
r=d/2;
//calculation
E=B*e*r*c;//E=pc,p=mv=Ber
disp(E,'final energy of e(in J) is');
E1=(E/e)/10^6;
disp(E1,'final energy of e (in MeV) is'); |
9519bc41fd80c6255a584258c53325c3d69b8c0c | 449d555969bfd7befe906877abab098c6e63a0e8 | /2240/CH1/EX0.6/EXI_6.sce | 4d1da599fd202ba233a73c018138c71fa142a903 | [] | no_license | FOSSEE/Scilab-TBC-Uploads | 948e5d1126d46bdd2f89a44c54ba62b0f0a1f5e1 | 7bc77cb1ed33745c720952c92b3b2747c5cbf2df | refs/heads/master | 2020-04-09T02:43:26.499817 | 2018-02-03T05:31:52 | 2018-02-03T05:31:52 | 37,975,407 | 3 | 12 | null | null | null | null | UTF-8 | Scilab | false | false | 385 | sce | EXI_6.sce | // Grob's Basic Electronics 11e
// Chapter No. I
// Example No. I_6
clc; clear;
// Express the voltage value of 0.015-V using the appropriate metric prefix from Table I–2.
disp ('First, express 0.015-V in engineering notation: 0.015-V = 0.015-V')
disp ('Next, replace 10^-3 with its corresponding metric prefix. i.e milli (m)')
disp ('Therefore 0.015-V = 0.015-V = 15-mV')
|
ae84202af3116d5f5294eeafe68aa695687c70ac | 449d555969bfd7befe906877abab098c6e63a0e8 | /1511/CH1/EX1.6/ex1_6.sce | 649f0c85673ebc15c4c867789ad8596360ece99e | [] | no_license | FOSSEE/Scilab-TBC-Uploads | 948e5d1126d46bdd2f89a44c54ba62b0f0a1f5e1 | 7bc77cb1ed33745c720952c92b3b2747c5cbf2df | refs/heads/master | 2020-04-09T02:43:26.499817 | 2018-02-03T05:31:52 | 2018-02-03T05:31:52 | 37,975,407 | 3 | 12 | null | null | null | null | UTF-8 | Scilab | false | false | 459 | sce | ex1_6.sce | // Example 1.6 page no-20
clear
clc
m=9.1*10^-31 //kg
V=100
e=1.6*10^-19 //C
d=5*10^-2 //m
t=10^-8 //sec
d1=(e*V*t^2)/(m*d*2)
d2=(5-d1*100)
printf("\nd1=%.3f*10^-2m\nd2=%.2f*10^-2m",d1*100,d2)
t1=0.01*10^-6///sec
v1=e*V*t1/(m*d)
v1=ceil(v1/10^4)
printf("\nVelocity of Electron,v=%.2f*10^6m/s",v1/100)
t2=(d2*10^-2)/(v1*10^4)
printf("\nt2=%.1f*10^-8 sec",t2*10^8)
printf("\nTotal transit time =t1+t2=%.1f*10^-8 sec",(t1/10^-8)+t2*10^8)
|
6511fd4e4235383ef47ee84899abf44dcd5cdc7c | 449d555969bfd7befe906877abab098c6e63a0e8 | /3557/CH16/EX16.1/Ex16_1.sce | da69e6e95941fddb7eb3588a1e046d83176bd140 | [] | no_license | FOSSEE/Scilab-TBC-Uploads | 948e5d1126d46bdd2f89a44c54ba62b0f0a1f5e1 | 7bc77cb1ed33745c720952c92b3b2747c5cbf2df | refs/heads/master | 2020-04-09T02:43:26.499817 | 2018-02-03T05:31:52 | 2018-02-03T05:31:52 | 37,975,407 | 3 | 12 | null | null | null | null | UTF-8 | Scilab | false | false | 240 | sce | Ex16_1.sce | //Example 16.1//
l=400*10^-9;//m //meter //wavelength
h=(0.6626*10^-33);//J s //Joule-second //Plank's constant
a=0.2998*10^9;//m/s //speed of light
c=(6.242*10^18);//eV/J //1 Coulomb of charge
E=((h*a)/l)*c
mprintf("E = %f eV",E)
|
1111ddf385690149b152dbd04e432f6255682f8f | cac765899ef2f4a3fea7b30feb7d3cc9e32a4eb4 | /src/transformation/changementDeRepere.sci | edb097957867b9554a14fa1f2a6d13c2d2efe7df | [] | no_license | clairedune/AsserVisu | 136d9cb090f709a410f23d3138ab115b722066d2 | f351f693bffd50b5ae19656a7fcb7b52e01d6943 | refs/heads/master | 2020-04-11T09:56:32.106000 | 2017-01-12T14:01:12 | 2017-01-12T14:01:12 | 1,187,919 | 0 | 0 | null | null | null | null | UTF-8 | Scilab | false | false | 754 | sci | changementDeRepere.sci | function [xc,yc,zc] = changementDeRepere(x,y,z,M)
// soit un ensemble de point represente par 3 vecteurs de coordonnees x, y , z
// cette fonction permet d'appliquer le changement de repere relatif a la matrice homogene M
//disp("Fonction de changement de repere debut")
nbPts = length(x);
//disp("Le nombre de point du vecteur est:")
//disp(nbPts)
// on applique le changement de repere a l'ensemeble des points
for i = 1:nbPts
vectC = M*[x(i) y(i) z(i) 1]' ;
xc(i) = vectC ( 1 ) ;
yc(i) = vectC ( 2 ) ;
zc(i) = vectC ( 3 ) ;
end;
endfunction
function wX = changeFramePoints(oX,wMo)
//change frame
N = length(oX)/4;
wX=[];
for i=1:N
wP = wMo*[oX((i-1)*4+1:(i-1)*4+4)];
wX = [wX wP];
end
endfunction
|
b8c40f3325988b36e507bbc0ad2b74edab0a7214 | 449d555969bfd7befe906877abab098c6e63a0e8 | /2609/CH4/EX4.1/ex_4_1.sce | 5fd9c2f9e31db39bee221c06690d274adf4a2a06 | [] | no_license | FOSSEE/Scilab-TBC-Uploads | 948e5d1126d46bdd2f89a44c54ba62b0f0a1f5e1 | 7bc77cb1ed33745c720952c92b3b2747c5cbf2df | refs/heads/master | 2020-04-09T02:43:26.499817 | 2018-02-03T05:31:52 | 2018-02-03T05:31:52 | 37,975,407 | 3 | 12 | null | null | null | null | UTF-8 | Scilab | false | false | 197 | sce | ex_4_1.sce | ////Ex 4.1
clc;
clear;
close;
format('v',9);
AOL=2*10^5;//unitless
fo=5;//Hz
ACL=100;//unitless
SF=AOL/ACL;//unitless
fodash=SF*fo;//Hz
disp(fodash/1000,"Bandwidth with feedback(kHz)");
|
ef1e669ce7a8d7e2ffd4d51774be85a5fa97d6d5 | 449d555969bfd7befe906877abab098c6e63a0e8 | /1928/CH1/EX1.16.2/ex1_16_2.sce | 7254a2a6820b969528c45b91a2102ae2ad7fc48e | [] | no_license | FOSSEE/Scilab-TBC-Uploads | 948e5d1126d46bdd2f89a44c54ba62b0f0a1f5e1 | 7bc77cb1ed33745c720952c92b3b2747c5cbf2df | refs/heads/master | 2020-04-09T02:43:26.499817 | 2018-02-03T05:31:52 | 2018-02-03T05:31:52 | 37,975,407 | 3 | 12 | null | null | null | null | UTF-8 | Scilab | false | false | 621 | sce | ex1_16_2.sce | //Chapter-1,Example1_16_2,pg 1-75
Ev=1.95 //average energy required to creaet a vacancy
k=1.38*10^-23 //boltzman constant in J/K
e=1.6*10^-19 //charge on 1 electron
K=k/e //boltzman constant in eV/K
T=500 //temperature
//for a low concentration of vacancies a relation is
//n=Nexp(-Ev/KT)
m=exp(-Ev/(K*T)) //ratio of no of vacancies to no of atoms n/N
printf("ratio of no of vacancies to no of atoms=")
disp(m)
|
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63b59045e03c9444bc079e9ef7cfac474faf3576 | 449d555969bfd7befe906877abab098c6e63a0e8 | /551/CH15/EX15.12/12.sce | 969132388a7e97e76fd494baaa629ada64eaee2b | [] | no_license | FOSSEE/Scilab-TBC-Uploads | 948e5d1126d46bdd2f89a44c54ba62b0f0a1f5e1 | 7bc77cb1ed33745c720952c92b3b2747c5cbf2df | refs/heads/master | 2020-04-09T02:43:26.499817 | 2018-02-03T05:31:52 | 2018-02-03T05:31:52 | 37,975,407 | 3 | 12 | null | null | null | null | UTF-8 | Scilab | false | false | 160 | sce | 12.sce | clc
r2=0.7; //m
r1=0.61; //m
dt=220; //dt=t1-t2; 0C
k=0.083; //W/m 0C
Q=dt/((r2-r1)/(4*%pi*k*r1*r2));
disp("Rate of heat leakage =")
disp(Q)
disp("W") |
d84867e2c9a3c8c18f3f8db6a22031eb41379b2c | 99b4e2e61348ee847a78faf6eee6d345fde36028 | /Toolbox Test/enbw/enbw4.sce | 1951ab7c6793ede702eb6d96a72f3b44eb088c67 | [] | no_license | deecube/fosseetesting | ce66f691121021fa2f3474497397cded9d57658c | e353f1c03b0c0ef43abf44873e5e477b6adb6c7e | refs/heads/master | 2021-01-20T11:34:43.535019 | 2016-09-27T05:12:48 | 2016-09-27T05:12:48 | 59,456,386 | 0 | 0 | null | null | null | null | UTF-8 | Scilab | false | false | 125 | sce | enbw4.sce | //check o/p when i/p is a column vector
win=[1; 2; 3; 4; 6; 7];
en=enbw(win,44.1e3);
disp(en);
//output
// 9586.9565
////
|
9c0be9a94d1d78d952060044c89959ef1c09671e | 449d555969bfd7befe906877abab098c6e63a0e8 | /3137/CH3/EX3.7/Ex3_7.sce | 53db5d3718e0f1206272ae0e4e1d349da9c5308f | [] | no_license | FOSSEE/Scilab-TBC-Uploads | 948e5d1126d46bdd2f89a44c54ba62b0f0a1f5e1 | 7bc77cb1ed33745c720952c92b3b2747c5cbf2df | refs/heads/master | 2020-04-09T02:43:26.499817 | 2018-02-03T05:31:52 | 2018-02-03T05:31:52 | 37,975,407 | 3 | 12 | null | null | null | null | UTF-8 | Scilab | false | false | 447 | sce | Ex3_7.sce | //Initilization of variables
F1=500 //N
F2=-400 //N
F3=-200 //N
C=1500 //N-m
//Distance from point O
x1=2 //m
x2=4 //m
x3=6 //m
//Calculations
R=F1+F2+F3 //N
M_O=(F1*x1)+(F2*x2)+(F3*x3)+C //N-m
//Applying Varignons theorem
x=M_O/R //m
//Result
clc
printf('The resultant of the force system is:%i N\n',R) //N
printf('The moment about point O is:%i N-m\n',M_O) //N-m
printf('The resultant acts at %i meters from point O m',x) //m
|
74194bddf023e98b9db938f01dcef6de5b754a71 | 449d555969bfd7befe906877abab098c6e63a0e8 | /2339/CH3/EX3.40.1/Ex3_40.sce | 908a28816483192b8d4f42393052e15f01f570a5 | [] | no_license | FOSSEE/Scilab-TBC-Uploads | 948e5d1126d46bdd2f89a44c54ba62b0f0a1f5e1 | 7bc77cb1ed33745c720952c92b3b2747c5cbf2df | refs/heads/master | 2020-04-09T02:43:26.499817 | 2018-02-03T05:31:52 | 2018-02-03T05:31:52 | 37,975,407 | 3 | 12 | null | null | null | null | UTF-8 | Scilab | false | false | 515 | sce | Ex3_40.sce | clc
clear
//Inputs
//The Values in the program are as follows:
//Temperature in Celcius converted to Kelvin(by adding 273)
//Pressure in bar converted to kPa (by multiplying 100)
//Volume in m^3
//Value of R,Cp and Cv in kJ/kg K
R=0.29;
Cp=1.005;
P1=2.75;
P2=P1;
V1=0.09;
T1=185+273;
T2=15+273;
//Calculations
V2=(V1*T2)/T1;
m=(P1*100*V1)/(R*T1);
Q=m*Cp*(T2-T1);
printf('The Heat Transfer: %3.3f kJ',Q);
printf('\n');
W=P1*100*(V2-V1);
printf('The Work done: %3.3f kJ',W);
printf('\n');
|
79530045eae66bb031cc87399dbfbac932cb770b | 449d555969bfd7befe906877abab098c6e63a0e8 | /1445/CH2/EX2.23/ch2_ex_23.sce | e84c471763be32973e728803210ce66c98643777 | [] | no_license | FOSSEE/Scilab-TBC-Uploads | 948e5d1126d46bdd2f89a44c54ba62b0f0a1f5e1 | 7bc77cb1ed33745c720952c92b3b2747c5cbf2df | refs/heads/master | 2020-04-09T02:43:26.499817 | 2018-02-03T05:31:52 | 2018-02-03T05:31:52 | 37,975,407 | 3 | 12 | null | null | null | null | UTF-8 | Scilab | false | false | 1,033 | sce | ch2_ex_23.sce | //CHAPTER 2- STEADY-STATE ANALYSIS OF SINGLE-PHASE A.C. CIRCUIT
//Example 22 // read it as example 22 in the book on page 2.76
disp("CHAPTER 2");
disp("EXAMPLE 23");
//VARIABLE INITIALIZATION
A=100 //Amplitude in Amps
f=50 //frquency in Hz
t1=1/600 //sec after wave becomes zero again
a1=86.6 //amplitude at some time t after start
//SOLUTION
//solution (a)
//RAmplitude at 1/600 second after it becomes zero
w=f*2*%pi; //angular speed
hp=1/(2*f); //half period, the point where sine beomes zero again after origin
t=hp+t1;
a2=A*sin(w*t);
disp("SOLUTION (a)");
disp(sprintf("Amplitude after 1/600 sec is %3f A", a2));
disp(" ");
//solution (b)
//since A=A0.sinwt, t=asin(A/A0)/w
t2=(asin(a1/A))/w;
disp("SOLUTION (b)");
disp(sprintf("The time at which amp would be %fis %3f sec", a1,t2));
//
//solution (iii)
//Bandwidth (f2-f1)=R/(2.π.L), f1,f2 half power frequencies
//
//END
|
904a41dd6315d5b9212048bddf876ba5189f4631 | 449d555969bfd7befe906877abab098c6e63a0e8 | /2891/CH7/EX7.17/Ex7_17.sce | 76db71ba539c086a5922be46e2120b365e47c3ad | [] | no_license | FOSSEE/Scilab-TBC-Uploads | 948e5d1126d46bdd2f89a44c54ba62b0f0a1f5e1 | 7bc77cb1ed33745c720952c92b3b2747c5cbf2df | refs/heads/master | 2020-04-09T02:43:26.499817 | 2018-02-03T05:31:52 | 2018-02-03T05:31:52 | 37,975,407 | 3 | 12 | null | null | null | null | UTF-8 | Scilab | false | false | 767 | sce | Ex7_17.sce | //Exa 7.17
clc;
clear;
close;
// given :
f=6 // frequency in GHz
f=6*10^9 // frequency in Hz
c=3*10^8 // speed of light in m/s
lambda=c/f // wavelength in m
d=12 // aperture length in cm
d=12*10^-2 // aperture length in m
w=6 // aperture width in cm
w=6*10^-2 // aperture width in m
phi_E=56*(lambda/d) // half power beam width for aperture length d in Degrees
phi_H=67*(lambda/w) // half power beam width for aperture width w in Degrees
G_p=(4.5*w*d)/(lambda)^2 // power gain
G_p=10*log10(G_p) // power gain in dB
D=(7.5*w*d)/(lambda)^2 // Directivity
disp(phi_E,"half power beam width for aperture length d in Degrees:")
disp(phi_H,"half power beam width for aperture width w in Degrees:")
disp(G_p,"power gain in dB:")
disp(D,"Directivity:")
|
b3a1809d621edc9f7fe9de7a54dea979066b22ea | 449d555969bfd7befe906877abab098c6e63a0e8 | /2912/CH4/EX4.2/Ex4_2.sce | 3fe41974e93c5e27099f4d428ca8acdbf36cd399 | [] | no_license | FOSSEE/Scilab-TBC-Uploads | 948e5d1126d46bdd2f89a44c54ba62b0f0a1f5e1 | 7bc77cb1ed33745c720952c92b3b2747c5cbf2df | refs/heads/master | 2020-04-09T02:43:26.499817 | 2018-02-03T05:31:52 | 2018-02-03T05:31:52 | 37,975,407 | 3 | 12 | null | null | null | null | UTF-8 | Scilab | false | false | 502 | sce | Ex4_2.sce | //chapter 4
//example 4.2
//Find glancing angle
//page 75
clear;
clc;
//given
h=1,k=1,l=0; //miller indices
a=0.26; // in nanometer (lattice constant)
lambda=0.065; // in nanometer (wavelength)
n=2; // order
//calculate
d=a/sqrt(h^2+k^2+l^2); // calculation of interlattice spacing
// Since 2dsin(theta)=n(lambda)
// therefore we have
theta=asind(n*lambda/(2*d));
printf('\nThe glancing angle is \t%.2f degree',theta);
//Note: there is slight variation in the answer due to round off
|
3e2566074a6cae5d445b60b70945114a7bc6f698 | 449d555969bfd7befe906877abab098c6e63a0e8 | /1892/CH3/EX3.1.s/Example3_1_at_page196.sce | 2f5da443e3bba5e40b0a128b17e426f862f52d07 | [] | no_license | FOSSEE/Scilab-TBC-Uploads | 948e5d1126d46bdd2f89a44c54ba62b0f0a1f5e1 | 7bc77cb1ed33745c720952c92b3b2747c5cbf2df | refs/heads/master | 2020-04-09T02:43:26.499817 | 2018-02-03T05:31:52 | 2018-02-03T05:31:52 | 37,975,407 | 3 | 12 | null | null | null | null | UTF-8 | Scilab | false | false | 330 | sce | Example3_1_at_page196.sce | // Sp_Example 3.1
clear; clc; close;
format('v',7);
// Given data
Ns=12;//poles
q=3;//no. of phase
Nr=8;//poles
speed=6000;//speed in rpm
//Calculations
Beta=360/q/Nr;//in degree
disp(Beta,"Step Angle in degree : ");
fc=Nr*speed*2*%pi/2/%pi/60;//in Hz
disp(fc,"Commutation frequency at each phase in Hz : ");
|
9ee434f0ecdb06dc9d981a5aa0e3845235c7b890 | 8217f7986187902617ad1bf89cb789618a90dd0a | /browsable_source/1.1/Unix/scilab-1.1/macros/util/msign.sci | 9bb59735633e85f3d6ad6d7c9a64e72a63c7742c | [
"LicenseRef-scancode-public-domain",
"LicenseRef-scancode-warranty-disclaimer",
"LicenseRef-scancode-unknown-license-reference"
] | permissive | clg55/Scilab-Workbench | 4ebc01d2daea5026ad07fbfc53e16d4b29179502 | 9f8fd29c7f2a98100fa9aed8b58f6768d24a1875 | refs/heads/master | 2023-05-31T04:06:22.931111 | 2022-09-13T14:41:51 | 2022-09-13T14:41:51 | 258,270,193 | 0 | 1 | null | null | null | null | UTF-8 | Scilab | false | false | 439 | sci | msign.sci | function x=msign(a)
// msign - computes the matrix sign function.
//%CALLING SEQUENCE
// x=msign(a)
//%PARAMETERS
// a : square hermitian matrix
// x : square hermitian matrix
//%DESCRIPTION
// This macro is called by the function sign to compute square matrix
// sign function.
//!
[m,n]=size(a)
if m<>n then error(20,1),end
if a<>a' then error('Non hermitian matrix'),end
[u,s]=schur(a)
x=diag(sign(real(diag(s))))
//end
|
48d584fc6f231c09832d18576947f8997aa12941 | 449d555969bfd7befe906877abab098c6e63a0e8 | /564/DEPENDENCIES/5_5data.sci | 0d4569d42b980d889a642b505634105cb0cd115e | [] | no_license | FOSSEE/Scilab-TBC-Uploads | 948e5d1126d46bdd2f89a44c54ba62b0f0a1f5e1 | 7bc77cb1ed33745c720952c92b3b2747c5cbf2df | refs/heads/master | 2020-04-09T02:43:26.499817 | 2018-02-03T05:31:52 | 2018-02-03T05:31:52 | 37,975,407 | 3 | 12 | null | null | null | null | UTF-8 | Scilab | false | false | 146 | sci | 5_5data.sci | L=2000;//langth.in mm
Ab=200;//in mm^2
A=180;//area of bar,in mm^2
P=1000;//in N
theta=60*(%pi/180);
E=200000;//in N/mm^2
I=100000;//in mm^4 |
3e167461c94f3a35db619addb4e74b0372520344 | 449d555969bfd7befe906877abab098c6e63a0e8 | /1958/CH9/EX9.4/Chapter9_example4.sce | 8acf3d4ec8aedd6d8341729d43dd76fd3ad74051 | [] | no_license | FOSSEE/Scilab-TBC-Uploads | 948e5d1126d46bdd2f89a44c54ba62b0f0a1f5e1 | 7bc77cb1ed33745c720952c92b3b2747c5cbf2df | refs/heads/master | 2020-04-09T02:43:26.499817 | 2018-02-03T05:31:52 | 2018-02-03T05:31:52 | 37,975,407 | 3 | 12 | null | null | null | null | UTF-8 | Scilab | false | false | 286 | sce | Chapter9_example4.sce | clc
clear
//Input data
r=1//Refractive index
n=4//Number of bands
w=6500//Wavelength in Angstrom
//Calculations
t=(((n+(1/2))*w*10^-8)/(2*r))/10^-4//Thickness of wedge shaped air film in cm *10^-4
//Output
printf('Thickness of wedge shaped air film is %3.4f *10^-4 cm',t)
|
1796e141865a210bccc8e07c41df4e169eace7a8 | 449d555969bfd7befe906877abab098c6e63a0e8 | /3831/CH5/EX5.2/Ex5_2.sce | e441e2a80475bf471b25c8578d7f315fa6c17284 | [] | no_license | FOSSEE/Scilab-TBC-Uploads | 948e5d1126d46bdd2f89a44c54ba62b0f0a1f5e1 | 7bc77cb1ed33745c720952c92b3b2747c5cbf2df | refs/heads/master | 2020-04-09T02:43:26.499817 | 2018-02-03T05:31:52 | 2018-02-03T05:31:52 | 37,975,407 | 3 | 12 | null | null | null | null | UTF-8 | Scilab | false | false | 403 | sce | Ex5_2.sce | // Example 5_2
clc;funcprot(0);
// Given data
W=100;// W
// Calculation
// (a)
// Since we are assuming a constant bulb temperature in part a, U=constant and
U=0;// W
Q=U-W;// kW
printf("\n(a)The heat transfer rate of an illuminated 100 W incandescent lightbulb in a room,Q=%3.0f W",Q);
// (b)
Q=0;
Udot=W;// W
printf("\n(b)The rate of change of its internal energy,Udot=%3.0f W",Udot);
|
c7664e7f1261ee751dcac16ca433d6554a604bcb | 449d555969bfd7befe906877abab098c6e63a0e8 | /55/CH5/EX5.13/5ex13.sci | f349a3d053522f55f165e58e0840d88df11302b6 | [] | no_license | FOSSEE/Scilab-TBC-Uploads | 948e5d1126d46bdd2f89a44c54ba62b0f0a1f5e1 | 7bc77cb1ed33745c720952c92b3b2747c5cbf2df | refs/heads/master | 2020-04-09T02:43:26.499817 | 2018-02-03T05:31:52 | 2018-02-03T05:31:52 | 37,975,407 | 3 | 12 | null | null | null | null | UTF-8 | Scilab | false | false | 245 | sci | 5ex13.sci | A=[1 2 1;2 5 -1;3 -2 -1]; //left hand side of the system of equations
B=[3 -4 5]'; //right hand side or the constants in the equations
X=[];
X=A\B ; //unique solution for the system of equations
x=X(1)
y=X(2)
z=X(3) |
639660567dc1935cd6f61f98e0655d0438322aab | 8217f7986187902617ad1bf89cb789618a90dd0a | /source/2.4.1/macros/scicos/standard_define.sci | 0fcbcbbc9e5fe251e50cc406e965caebf83e3440 | [
"LicenseRef-scancode-public-domain",
"LicenseRef-scancode-warranty-disclaimer"
] | permissive | clg55/Scilab-Workbench | 4ebc01d2daea5026ad07fbfc53e16d4b29179502 | 9f8fd29c7f2a98100fa9aed8b58f6768d24a1875 | refs/heads/master | 2023-05-31T04:06:22.931111 | 2022-09-13T14:41:51 | 2022-09-13T14:41:51 | 258,270,193 | 0 | 1 | null | null | null | null | UTF-8 | Scilab | false | false | 664 | sci | standard_define.sci | function o=standard_define(sz,model,label,gr_i)
//initialize graphic part of the block data structure
// Copyright INRIA
[lhs,rhs]=argn(0)
if rhs<4 then gr_i=[],end
[nin,nout,ncin,ncout]=model(2:5)
nin=size(nin,1);if nin>0 then pin(nin,1)=0,else pin=[],end
nout=size(nout,1);if nout>0 then pout(nout,1)=0,else pout=[],end
ncin=size(ncin,1);if ncin>0 then pcin(ncin,1)=0,else pcin=[],end
ncout=size(ncout,1);if ncout>0 then pcout(ncout,1)=0,else pcout=[],end
graphics=list([0,0],sz,%t,label,pin,pout,pcin,pcout,gr_i)
if model(1)(1)=='super' then
o=list('Block',graphics,model,' ','SUPER_f')
else
[ln,mc]=where()
o=list('Block',graphics,model,' ',mc(2))
end
|
20d6b4dc59f45512049516d6fa71668d1b08c954 | 449d555969bfd7befe906877abab098c6e63a0e8 | /503/CH3/EX3.27/ch3_27.sci | e4a3afec3e3aedf5f143d4b1fabdf7fb0556f86f | [] | no_license | FOSSEE/Scilab-TBC-Uploads | 948e5d1126d46bdd2f89a44c54ba62b0f0a1f5e1 | 7bc77cb1ed33745c720952c92b3b2747c5cbf2df | refs/heads/master | 2020-04-09T02:43:26.499817 | 2018-02-03T05:31:52 | 2018-02-03T05:31:52 | 37,975,407 | 3 | 12 | null | null | null | null | UTF-8 | Scilab | false | false | 631 | sci | ch3_27.sci | //to calculate magnitude and phase of secondary current
clc;
X1=505; //uohm
X2=551; //uohm
R1=109; //uohm
R2=102; //uohm
Xm=256; //mohm
I1=250; //A
I22=complex(0,Xm*1000)*I1/(complex(R1,X2+Xm*1000));
N1=250;
N2=5;
I2=I22*(N2/N1);
disp(abs(I2),'current magnitude(A)');
disp(atand(imag(I2)/real(I2)),'phase(degree)');
disp('now Rb is introduced in series');
Rbb=200; //uohm
Rb=(N2/N1)^2*Rbb;
I22=complex(0,Xm*1000)*I1/(complex((R1+Rb),X2+Xm*1000));
I2=I22*(N2/N1);
disp(abs(I2),'current magnitude(A)');
disp(atand(imag(I2)/real(I2)),'phase(degree)');
disp('no chnage as Rb is negligible'); |
6a4029cc4b206957581463da084a2c9442f4f569 | d5849d01c14501b85e52f8c218fcd6fa3c806ea8 | /Aufgabe01/MyLinearRegression.sce | 4a7a061e8e7c48f208a42a0907b0e2d982811d11 | [] | no_license | drb8w/MachineLearning2014 | 12eddfb5c13d3eeec5ccadd884e34e5dbbe39fd7 | 0fcaf43ede3bc0308359cd703e2cffa6f61db7fb | refs/heads/master | 2021-01-01T06:45:21.806666 | 2014-11-26T20:17:35 | 2014-11-26T20:17:35 | null | 0 | 0 | null | null | null | null | UTF-8 | Scilab | false | false | 13,699 | sce | MyLinearRegression.sce | // Lineare Regression
// TODO: clear all stuff before starting
clc;
clear;
//close all;
function [x,y]=generateXY(x_start,x_end,x_interval,G)
x = x_start:x_interval:x_end;
y = 2.*x.^2-G.*x+1;
endfunction
function [x_t,t] = generateTrainingsSet(x,y,G,my,Sigma)
// Y=grand(m,n,'nor',Av,Sd) generates random variates from the normal distribution with mean Av (real) and standard deviation Sd (real >= 0)
x_t = x(1:6:$);
[m,n] = size(x_t);
// Scilab
noise = grand(m,n,'nor',my, Sigma);
// Matlab
//noise = normrnd(my, Sigma,m,n);
// matlab < 2014:
//noise = randn(m,n)*Sigma + my;
y_t = 2*x_t.^2-G*x_t+1;
t = y_t + noise;
endfunction
function plotData(x,y,x_t,t,y_star, y_star_II)
clf;
//set(gca(),"auto_clear","off");
plot(x,y,'ro-',x_t,t,'bo-',x,y_star,'go-',x,y_star_II,'co-');
//set(gca(),"auto_clear","on");
endfunction
function plotDataY(x,Y, mod, col)
[lhs,rhs]=argn(0);
plotColors = ['r','g','b','c','m','y'];
[m,n] = size(Y);
[i,j] = size(plotColors);
clf;
set(gca(),"auto_clear","off");
//hold on;%DAN
for index=1:m
//if(nargin<4)
if (rhs<4)
plotArg = strcat([plotColors(modulo(index-1,j)+1),mod]);
else
plotArg = strcat([col,mod]);
end
//plot(x,Y(index,:),'ro-');
plot(x,Y(index,:),plotArg);
end
//hold off;%DAN
set(gca(),"auto_clear","on");
endfunction
function plotDataY_star(x,Y_star, x_t, y_t, dimension_start, no_figure)
plotColors = ['r','g','b','c','m','y'];
[m,n] = size(Y_star);
[i,j] = size(plotColors);
Str_legend =[];
//clf;
figure(no_figure);
set(gca(),"auto_clear","off");
for index=1:m
plotArg = strcat([plotColors(modulo(index-1,j)+1),'-']);
plot(x,Y_star(index,:),plotArg);
Str_legend = [Str_legend, strcat(['f(x) for d=',string(dimension_start+index-1)])];
end
plotArg = 'go';
plot(x_t,y_t,plotArg);
Str_legend = [Str_legend, 'f(x_t) = trainingset'];
title('f(x) of w^* for multiple dimensions d in f(x) over x');
xlabel('x');
ylabel('f(x)');
legend(Str_legend);
set(gca(),"auto_clear","on");
endfunction
function plotIterationsVsLambda(Iterations, Lambdas, no_figure)
figure(no_figure);
plotArg = '-r';
plot(Lambdas,Iterations,plotArg);
title('Iterations over Lambdas');
xlabel('Lambda');
ylabel('Iterations');
endfunction
function plotLinRegResults(x, y, t, y_online, y_star, dimension, no_figure)
figure(no_figure);
//hold on;
set(gca(),"auto_clear","off");
//titleStr = strcat('linear regression result for ', int2str(dimension),' dimensional function f(x)');
titleStr = strcat('linear regression result for d-dimensional function f(x)');
title(titleStr);
xlabel('x');
ylabel('f(x)');
plot(x,y,'-b');
plot(x,y_online,'-r');
plot(x,y_star,'-g');
str_org = 'y_{original}';
str_online = 'y_{online}';
str_star = 'y_{star}';
legend(str_org, str_online, str_star, 'Location', 'SouthEast');
//hold off;
set(gca(),"auto_clear","on");
endfunction
function plotMeanError(E, dimension_start, dimension_end, no_figure)
figure(no_figure);
titleStr = strcat('mean error of repititive y^* calculations over dimensions');
title(titleStr);
xlabel('dimension');
ylabel('mean error');
x = dimension_start:dimension_end;
y = E';
plot(x,y,'-r');
endfunction
function A = createA(x,d)
// d ... dimension of polynom
[m,n] = size(x);
A = zeros(d,n);
// transform x into a polynom of degree d
for index=1:d+1
A(index,:) = x.^(index-1);
end
endfunction
function w_star = compute_w_star(A,y,lambda)
// create pseudo inverse and compute Aw=b
// see UNDERSTANDING MACHINE LEARNING, page 94ff
AAT = A*A';
b = A*y;
succ = 0;
A_plus = [];
while ~succ
try
A_plus = inv(AAT);
succ = 1;
catch
// check if above is not invertible
[m,n] = size(AAT);
AAT = lambda*eye(m,n) + AAT;
end
end
w_star = A_plus*b;
endfunction
function y = createPolynomValues(x,w)
[m,n]=size(x);
I=ones(m,n);
y = w(1).*I;
[m2,n2] = size(w);
pol_degree = m2 - 1;
for index=1:pol_degree
y = y+w(index+1).*x.^index;
end
endfunction
function Y = createPolynomValuesW(x,W)
[m,n] = size(W);
[i,j] = size(x);
Y = zeros(n,j);
for index=1:n
Y(index,:) = createPolynomValues(x,W(:,index));
end
endfunction
function W_star = trans_x_comp_w_star(x, y, lambda, dimension_start, dimension_end)
// w_star is a column vector
// W_star is a list of column vectors
A_i = createA(x,dimension_start);
W_star = compute_w_star(A_i,y,lambda);
for dimension_i=dimension_start+1:dimension_end
A_i = createA(x,dimension_i);
// add zero line at the bottom
[m,n] = size(W_star);
W_star = cat(1,W_star,zeros(1,n));
W_star = cat(2,W_star,compute_w_star(A_i,y,lambda));
end
endfunction
function [w_t, its] = onlineLMS(A,t,lambda, E_threshold, maxIts)
// implement online learn from formula
//w(t+1) = w(t) + lambda* (t(i) - o(i)) * x(i);
[m,n] = size(A);
w_t = zeros(m,1);
intmax = 4000000000;
E_tm1 = intmax;
E_t = intmax/2;
its =0;
lambda_member = lambda / n; // because every member shifts the resulting weight, so big lambda is a problem
// Matlab
//while abs(E_t - E_tm1) > E_threshold && its < maxIts
//while abs(E_tm1/E_t) > treshold_E_ratio && its < maxIts
// Scilab
while abs(E_t - E_tm1) > E_threshold & its < maxIts
E_tm1 = E_t;
E_t=0;
for i_index=1:n
x_i = A(:,i_index);
t_i = t(i_index);
o_i = w_t'*x_i;
// calculate cost
E_t = E_t + (t_i-o_i)^2;
// update w
//w_t = w_t + lambda*(t_i-o_i)*x_i;
w_t = w_t + lambda_member*(t_i-o_i)*x_i;
end
its = its + 1;
end
endfunction
//function MyLinearRegression()
// preinitialisation and setup
x_start = 0;
x_end = 5;
x_interval = 0.1;
G = 5;
[x,y]=generateXY(x_start,x_end,x_interval,G);
mu = 0;
Sigma = 0.7;
[x_t,t]=generateTrainingsSet(x,y,G,mu,Sigma);
y_t = t';
dimension_start = 3;
dimension_end = 9;
//dimension_end = 8;
// lambda = 0.001; // online LMS does not converge
lambda = 1*10^-5;
//plotData(x,y,x_t,t,y_star_3,y_star_4);
W_star = trans_x_comp_w_star(x_t,y_t,lambda,dimension_start, dimension_end);
Y_star = createPolynomValuesW(x,W_star);
no_figure_Y_star = 10;
plotDataY_star(x,Y_star, x_t, y_t, dimension_start, no_figure_Y_star);
// 1.2.2.I - determine w_online_3
A_3 = createA(x_t,3);
//E_threshold = 0.01; // not approriate for online LMS
E_threshold = 0.0001;
//maxIts = 200; // not approriate for online LMS
maxIts = 1*10^10;
[w_online_3, its_online_3]= onlineLMS(A_3, y_t ,lambda, E_threshold, maxIts);
// y_online_3 determined via onlineLMS
y_online_3 = createPolynomValues(x,w_online_3);
// 1.2.2.II - determine w^* of quadric error function
w_star_3 = compute_w_star(A_3,y_t,lambda);
// y_star_3 determined via pseudoinverse
y_star_3 = createPolynomValues(x,w_star_3);
// plot y, t, y_online_3 and y_star_3
no_figureLinReg = 50;
plotLinRegResults(x, y, t, y_online_3, y_star_3, 3, no_figureLinReg);
// 1.2.2.III - test influence of lambda on convergence of online LMS
//Lambdas = 0.001:0.001:10; // not approriate for online LMS
Lambdas = 1*10^-5:1*10^-5:1*10^-3;
[m_l,n_l]=size(Lambdas);
//treshold_E_ratio = 1.01;
Its_online_3 = zeros(1,n_l);
W_online_3 = zeros(4,n_l);
for index_lambda=1:n_l
[w_online_3, its_online_3]= onlineLMS(A_3, y_t ,Lambdas(index_lambda), E_threshold, maxIts);
Its_online_3(1,index_lambda) = its_online_3;
W_online_3(:,index_lambda) = w_online_3;
end
// display iterations vs. lambda
no_lambdaFigure = 100;
plotIterationsVsLambda(Its_online_3, Lambdas, no_lambdaFigure);
// diverge of w means that maximum iterations don't bring sufficient good result
Lambdas_div = 1*10^-4:1*10^-4:1*10^-2;
[m_l_div,n_l_div]=size(Lambdas_div);
Its_online_3_div = zeros(1,n_l_div);
W_online_3_div = zeros(4,n_l_div);
for index_lambda=1:n_l_div
[w_online_3, its_online_3]= onlineLMS(A_3, y_t ,Lambdas_div(index_lambda), E_threshold, maxIts);
Its_online_3_div(1,index_lambda) = its_online_3;
W_online_3_div(:,index_lambda) = w_online_3;
end
// display iterations vs. lambda
no_lambdaDivergeFigure = 150;
plotIterationsVsLambda(Its_online_3_div, Lambdas_div, no_lambdaDivergeFigure);
// test for empirical lambda of 0.0035
lambda_hat = 0.0035;
[w_online_3_hat, its_online_3_hat]= onlineLMS(A_3, y_t ,lambda_hat, E_threshold, maxIts);
y_online_3_hat = createPolynomValues(x,w_online_3_hat);
// show wrongness of result
no_figureLinReg_WrongOnline = 170;
plotLinearRegressionResults(x, y, t, y_online_3_hat, y_star_3, 3, no_figureLinReg_WrongOnline);
// 1.2.3.I - determine mu and Sigma of w^* coefficients
dimension_delta = dimension_end - dimension_start + 1;
no_trainingsSets = 2000;
WW_star = zeros(dimension_end+1,dimension_delta,no_trainingsSets);
for index_trainingsSet=1:no_trainingsSets
// determine new trainingsset
[x_t,t]=generateTrainingsSet(x,y,G,mu,Sigma);
y_t = t';
// determine w_star for given dimensions
W_star = trans_x_comp_w_star(x_t,y_t,lambda,dimension_start, dimension_end);
// track all w_stars for given trainingsset
WW_star(:,:,index_trainingsSet)=W_star;
end
//calculate mu and Sigma over given w_stars
Variances = zeros(dimension_end+1,dimension_delta);
Deviations = zeros(dimension_end+1,dimension_delta);
for index_dimension=1:dimension_delta
// generate correct matrix for specific dimension
dim_w = dimension_start+index_dimension;
W_dim_trainings = WW_star(1:dim_w,index_dimension,:);
// Matlab
//W_trainings = reshape(W_dim_trainings,dim_w,no_trainingsSets)';
W_trainings = matrix(W_dim_trainings,dim_w,no_trainingsSets)';
// matlab: For matrix input X, where each row is an observation, and each column is a variable,
// cov(X) is the covariance matrix. diag(cov(X)) is a vector of variances for each column,
// and sqrt(diag(cov(X))) is a vector of standard deviations
vec_variance = diag(cov(W_trainings));
vec_deviation = sqrt(vec_variance);
Variances(1:dim_w,index_dimension) = vec_variance;
Deviations(1:dim_w,index_dimension) = vec_deviation;
end
// display Variances and Deviations in a surface plot
no_figure_Variances = 400;
figure(no_figure_Variances);
surf(Variances);
title('variance of weight coefficient over dimension d');
xlabel('weight coefficient');
ylabel('dimension d');
zlabel('variance');
no_figure_Deviations = 500;
figure(no_figure_Deviations);
surf(Deviations);
title('deviation of weight coefficient over dimension d');
xlabel('weight coefficient');
ylabel('dimension d');
zlabel('deviation');
// 1.2.3.II - plot for x^*=2 in the medium quadric error dimensions for f_{w^*}(x^*)
[x_2,y_2]=generateXY(2,2,1,G);
YY_star = zeros(dimension_delta,no_trainingsSets);
for index_trainingsSet=1:no_trainingsSets
W_star = WW_star(:,:,index_trainingsSet);
Y_star = createPolynomValuesW(x_2,W_star); // column-vector for all dimensions ?
YY_star(:,index_trainingsSet) = Y_star;
end
// search every row in YY_star as medium of given dimension
y_2_trainingsset = repmat(y_2, no_trainingsSets, 1);
E = zeros(dimension_delta,1);
for index_dimension=1:dimension_delta
y_star_trainingsset = YY_star(index_dimension,:)';
y_2_delta = y_2_trainingsset - y_star_trainingsset;
e_trainingsset = y_2_delta.^2;
e = mean(e_trainingsset);
E(index_dimension)= e;
end
// plot error E in regards to dimensionality
no_figure_meanerror = 200;
plotMeanError(E, dimension_start, dimension_end, no_figure_meanerror);
// 1.2.3.III - calculate w^* for not pretuberated trainingsset
mu = 0;
Sigma = 0;
[x_t_notPret,t_notPret]=generateTrainingsSet(x,y,G,mu,Sigma);
y_t_notPret = t_notPret';
W_star_notPret = trans_x_comp_w_star(x_t_notPret,y_t_notPret,lambda,dimension_start, dimension_end);
// plot again resulting Y_star values
Y_star_notPret = createPolynomValuesW(x,W_star_notPret);
no_figure_Y_star_notPret = 600;
plotDataY_star(x,Y_star_notPret, x_t, y_t, dimension_start, no_figure_Y_star_notPret);
//endfunction
//MyLinearRegression();
|
6b012ce60d07b3aff74f562d00d6d3fe215f536d | 449d555969bfd7befe906877abab098c6e63a0e8 | /1583/CH5/EX5.7/HFAAGC_Ex_5_7.sce | cf2059698349ef03a6c98d96227a1460a5802d8b | [] | no_license | FOSSEE/Scilab-TBC-Uploads | 948e5d1126d46bdd2f89a44c54ba62b0f0a1f5e1 | 7bc77cb1ed33745c720952c92b3b2747c5cbf2df | refs/heads/master | 2020-04-09T02:43:26.499817 | 2018-02-03T05:31:52 | 2018-02-03T05:31:52 | 37,975,407 | 3 | 12 | null | null | null | null | UTF-8 | Scilab | false | false | 730 | sce | HFAAGC_Ex_5_7.sce | clc
//Chapter 5:High Frequency Amplifiers and Automatic Gain Control
//example 5.7 page no 162
//given
gm=0.4//transconductance
RL=600//load resistance
Rs=500//source resistance
Avec=gm*RL//midband emitter to collector voltage gain
CM=(1-Avec)*10^-12//miller capacitance
C_M=CM/Avec//collector to ground miller capacitance
Ri=gm^-1
Av=Avec*(Ri/Rs)//midfrequency voltage gain
Co=(4+1)*10^-12//output capacitance
CT=(206+CM)*10^-12//toatl capacitance
R=(500^-1+300^-1+260^-1)^-1
w1=(R*CT)^-1//pole due to input circuit)
w2=(RL*Co)^-1//pole due to output circuit
mprintf('the mid frequency voltage gain %f \n the pole due to input circuit is %3.2e rad/s \n the pole due to output circuit is %3.2e rad/s ',Av,w1,w2)
|
e9e4c9043dd901f3961ab6820dc8bbabdfeb93b8 | 449d555969bfd7befe906877abab098c6e63a0e8 | /1382/CH7/EX7.21/EX_7_21.sce | 9df22465a3f004de2078dcf23ea36d676f150394 | [] | no_license | FOSSEE/Scilab-TBC-Uploads | 948e5d1126d46bdd2f89a44c54ba62b0f0a1f5e1 | 7bc77cb1ed33745c720952c92b3b2747c5cbf2df | refs/heads/master | 2020-04-09T02:43:26.499817 | 2018-02-03T05:31:52 | 2018-02-03T05:31:52 | 37,975,407 | 3 | 12 | null | null | null | null | UTF-8 | Scilab | false | false | 238 | sce | EX_7_21.sce | // Example 7.21:oscillation frequency
clc;
clear;
close;
C=100;//capacitance in pico farad
R=800;//resistance in killo ohms
fo=round(1/(2*%pi*R*10^3*C*10^-12*sqrt(6)));//RESONANT FREQUENCY IN HERTZ
disp(fo,"RESONANT FREQUENCY IN HERTZ")
|
f0387c91c2d7bc2c2ca22dc1b9987100e9469520 | 449d555969bfd7befe906877abab098c6e63a0e8 | /10/CH7/EX5/cha7_5.sce | 0e148eb672d013802142b185744499160b78175f | [] | no_license | FOSSEE/Scilab-TBC-Uploads | 948e5d1126d46bdd2f89a44c54ba62b0f0a1f5e1 | 7bc77cb1ed33745c720952c92b3b2747c5cbf2df | refs/heads/master | 2020-04-09T02:43:26.499817 | 2018-02-03T05:31:52 | 2018-02-03T05:31:52 | 37,975,407 | 3 | 12 | null | null | null | null | UTF-8 | Scilab | false | false | 1,853 | sce | cha7_5.sce | V=120;F=60;X1m=2;R1m=1.5;R2=1.5;
X1a=2;R1a=1.5;X2=2;Xmag=48;C=30;a=1;
Z1m=1.5;Zb=0.69+%i*0.98;Z1a=2.5;
Xc=%i*2-%i*88.4;Ra=2.5;
Xc=10^6/(2*%pi*F*C)
Zb
function[r,theta]=rect2polar(x,y)
r=sqrt(x^2+y^2);
theta=atan(y/x)*180/%pi;
endfunction
[x,y]=rect2polar(0.69,0.98)
function[x,y]=polar2rect(r,theta)
x=r*cos(theta*%pi/180);
y=r*sin(theta*%pi/180);
endfunction
[a,b]=polar2rect(V,0)
X=a+%i*b
z=(Z1m+%i*2+2*(Zb))
Im=X/z
function[r,theta]=rect2polar(x,y)
r=sqrt(x^2+y^2);
theta=atan(y/x)*180/%pi;
endfunction
[Is,Angle]=rect2polar(14.41,-19.81)
y=(Z1a+Xc+2*(Zb))
Ia=X/y
function[r,theta]=rect2polar(x,y)
r=sqrt(x^2+y^2);
theta=atan(y/x)*180/%pi;
endfunction
[Is1,Angle1]=rect2polar(0.065,1.41)
Wsy=(1800*2*%pi)/F
Ts=2*(Is)*(Is1)*2*0.69*sin(%pi*141.1/180)/Wsy
Zm=Z1m+%i*2+2*(Zb)
function[r,theta]=rect2polar(x,y)
r=sqrt(x^2+y^2);
theta=atan(y/x)*180/%pi;
endfunction
[Ip1,Angle1]=rect2polar(2.88,3.96)
Za=Ra+%i*2+2*(Zb)
R=3.88;Im=3.96;
Xc=Im-((Im*R-4.9*sqrt(26.22))/2.88)
c=10^6/(2767.34)
Cs=c-C
function[x,y]=polar2rect(r,theta)
x=r*cos(theta*%pi/180);
y=r*sin(theta*%pi/180);
endfunction
[v,a]=polar2rect(V,0)
X=v+%i*a
R=3.88;Im=3.96;Xc=7.34;
a=R+(%i*Im-%i*Xc)
z=X/a
function[r,theta]=rect2polar(x,y)
r=sqrt(x^2+y^2);
theta=atan(y/x)*180/%pi;
endfunction
[Is1,Angle1]=rect2polar(17.5,15.3)
Is=24.4;Angle=-53.4;
function[x,y]=polar2rect(r,theta)
x=r*cos(theta*%pi/180);
y=r*sin(theta*%pi/180);
endfunction
[a,b]=polar2rect(Is,Angle)
X1=a+%i*b
[c,d]=polar2rect(Is1,Angle1)
X2=c+%i*d
X=X1+X2
function[r,theta]=rect2polar(x,y)
r=sqrt(x^2+y^2);
theta=atan(y/x)*180/%pi;
endfunction
[z,y]=rect2polar(32.04,-4.28)
a=sin(%pi*95/180)
Ts=2*(Is1)*(Is)*2*0.69*a/Wsy
T=Ts/z
|
db9e53e214626a26585faf75dbf05fbf04c0ec4e | 449d555969bfd7befe906877abab098c6e63a0e8 | /3860/CH9/EX9.3/Ex9_3.sce | 69b2124768997d5e006b1cd739c9c629f5a987ff | [] | no_license | FOSSEE/Scilab-TBC-Uploads | 948e5d1126d46bdd2f89a44c54ba62b0f0a1f5e1 | 7bc77cb1ed33745c720952c92b3b2747c5cbf2df | refs/heads/master | 2020-04-09T02:43:26.499817 | 2018-02-03T05:31:52 | 2018-02-03T05:31:52 | 37,975,407 | 3 | 12 | null | null | null | null | UTF-8 | Scilab | false | false | 785 | sce | Ex9_3.sce | //Example 9.3: Reduction of state table
clc // Clears the console
disp("Given State Table")
disp("q | x=0 x=1 | z")
disp('--------------------------------')
disp("A | C D | 1")
disp("B | C D | 0")
disp("C | B D | 1")
disp("D | C A | 1")
disp('step 1 produces five SP Partitions')
disp('P1 = (AB)(C)(D)')
disp('P1 = (ABC)(D)')
disp('P1 = (AD)(B)(C)')
disp('P1 = (A)(BC)(D)')
disp('P1 = (ABD)(C)')
disp('P1 = (AB)(C)(D)')
disp('P1 = (AB)(C)(D)')
disp('The chart is different, because the pairings that are automatically X''d are different.')
disp('None of the conditions can be satisfied, and thus, no states can be combined and state table cannot be reduced.')
|
b753520f9b5e200555e275976f574a3db0d92595 | 127061b879bebda7ce03f6910c80d0702ad1a713 | /bin/PiLab_chn.sci | c3bd32c4b7e9fc082cb57750e49ddf0ddebae296 | [] | no_license | pipidog/PiLib-Scilab | 961df791bb59b9a16b3a32288f54316c6954f128 | 125ffa71b0752bfdcef922a0b898263e726db533 | refs/heads/master | 2021-01-18T20:30:43.364412 | 2017-08-17T00:58:50 | 2017-08-17T00:58:50 | 100,546,695 | 0 | 1 | null | null | null | null | UTF-8 | Scilab | false | false | 3,152 | sci | PiLab_chn.sci | // **** Purpose ****
// PiLab Chern number caculator
// **** variables ****
// << PiLab inputs >>
// [chn.Mesh]: 1x2, int
// <= k-space mesh
// [chn.OccBand]: 1x1, int
// <= number of occupied bands
// [chn.Kdiff]: 1x2, real
// <= Differential vector to avoid divergence
// << PiLab Outputs >>
// [chn.tot_Chern]: 1x1, int
// => total Chern number
// [chn.ban_Chern]: OccBand x 1, int
// => Chern number of each occupied band
// [chn.Fk_field]: occBand x total k of BZ
// => the Chern field of each band at each k-point
// **** Version ****
// 08/31/2014 1st version
// 12/02/2014 separate Chern calculation to independent functions
// totally rewrite to highly improve effiency
// 05/12/2015 change reload process
// **** Comment ****
// see JPSJ 74.1674 (2005), eq.(6)~ eq.(9)
function PiLab_chn(project_name)
tic();
disp('Starting {chn} calculation ...');
disp('=========== Message ===========');
// loading variables ===============================================
disp('## loading variables ...');
PiLab_loader(project_name,'chn','user','trim');
load(project_name+'_chn.sod');
load(project_name+'_lat.sod');
load(project_name+'_hop.sod');
load(project_name+'_scc.sod');
// check variables =================================================
disp('## checking variables ...')
check_var=(length(lat.Primitive(1,:))==2);
if check_var~=%t then
disp('Error: PiLab_chn, Chern numbers only survive in 2D');
abort;
end
check_var=(length(chn.Mesh)==2 & find(chn.Mesh<=0)==[]);
if check_var~=%t then
disp('Error: PiLab_chn, chn.Mesh has wrong '...
+'dimension or non-positive integers!');
abort;
end
check_var=((chn.OccBand >0) & (chn.OccBand-fix(chn.OccBand))==0)
if check_var~=%t then
disp('Error: PiLab_chn, chn.OccBand must be a positive integer!');
abort;
end
check_var=(length(chn.Kdiff)==2)
if check_var~=%t then
disp('Error: PiLab_chn, chn.Kdiff has wrong dimension!');
abort;
end
// Core Part =======================================================
disp('## running core part ...');
[chn.k_point,chn.Chern_val,chn.Fk_field]...
=PIL_Chern_cal(lat,hop,scc,[],chn.Mesh,chn.OccBand,chn.Kdiff)
// output calculation results ======================================
disp('## output information ...')
fid(1)=mopen(project_name+'_chn.plb','a+');
PIL_print_mat('chn.Chern_val, @full, total Chern number below Ef'...
,chn.Chern_val,'r',fid(1)); ;
PIL_print_mat('chn.k_point, @full, k-point inside BZ'...
,chn.k_point,'r',fid(1));
PIL_print_mat('chn.Fk_field, @full, F-field at each'...
+' k-point [F(k)/(2*%pi*%i)]',chn.Fk_field,'r',fid(1));
mclose(fid(1));
disp('Total Chern number= '+string(clean(chn.Chern_val)));
// finishing program ===============================================
save(project_name+'_chn.sod','chn');
disp('=============================');
disp('Finishing {chn} calculation ...');
disp('# time elapse= '+string(toc())+ ' seconds');
endfunction
|
daa28bc74fa83897ca0ab7939fdd6837cad78801 | c04fb432166e4832950820b66362a26c125b608a | /make-tests/make4.tst | ec11d4aaa3d3e3e25b59bcaf490b1c750daf74e7 | [] | no_license | andreaowu/Graphs | 6d7d7ce1483e01e0c1bf4657f2f4087cbe328046 | 485dae6c2d173c2844898440fad9306ec77e1962 | refs/heads/master | 2021-01-25T04:58:12.978046 | 2013-12-04T01:09:45 | 2013-12-04T01:09:45 | null | 0 | 0 | null | null | null | null | UTF-8 | Scilab | false | false | 72 | tst | make4.tst | java make.Main -f make-tests/make4.make -D make-tests/make4.info "A B C" |
db62625806ca0947db27596e4dfceecf454b0e49 | 449d555969bfd7befe906877abab098c6e63a0e8 | /1802/CH5/EX5.9/Exa5_9.sce | af4e47b9f234e45b7684191ea172868686aae75d | [] | no_license | FOSSEE/Scilab-TBC-Uploads | 948e5d1126d46bdd2f89a44c54ba62b0f0a1f5e1 | 7bc77cb1ed33745c720952c92b3b2747c5cbf2df | refs/heads/master | 2020-04-09T02:43:26.499817 | 2018-02-03T05:31:52 | 2018-02-03T05:31:52 | 37,975,407 | 3 | 12 | null | null | null | null | UTF-8 | Scilab | false | false | 255 | sce | Exa5_9.sce | //Exa 5.9
clc;
clear;
close;
//Given Data :
format('v',8);
R=2.5;//in ohm
X=4.33;//in ohm
I=120;//in Ampere
Vr=3300;//in volt
cos_fir=0.8;//unitless
Vs=Vr+I*R*cos_fir+I*X*sqrt(1-cos_fir^2);//in volt
disp(Vs,"Sending end voltage(in volts) : "); |
5412a825c444d79f75d78f8fb6e3514586c476c1 | ebd6f68d47e192da7f81c528312358cfe8052c8d | /swig/Examples/test-suite/scilab/overload_subtype_runme.sci | e644f56b9611b1a45d50b43444557b8a811f35aa | [
"Apache-2.0",
"LicenseRef-scancode-swig",
"GPL-3.0-or-later",
"LicenseRef-scancode-unknown-license-reference",
"GPL-3.0-only"
] | permissive | inishchith/DeepSpeech | 965ad34d69eb4d150ddf996d30d02a1b29c97d25 | dcb7c716bc794d7690d96ed40179ed1996968a41 | refs/heads/master | 2021-01-16T16:16:05.282278 | 2020-05-19T08:00:33 | 2020-05-19T08:00:33 | 243,180,319 | 1 | 0 | Apache-2.0 | 2020-02-26T05:54:51 | 2020-02-26T05:54:50 | null | UTF-8 | Scilab | false | false | 190 | sci | overload_subtype_runme.sci | exec("swigtest.start", -1);
f = new_Foo();
b = new_Bar();
checkequal(spam(f), 1, "spam(f)");
checkequal(spam(b), 2, "spam(b)");
delete_Foo(f);
delete_Bar(b);
exec("swigtest.quit", -1);
|
2392ef22de7b3c10f3182825c23194cdc7701623 | 449d555969bfd7befe906877abab098c6e63a0e8 | /1309/CH4/EX4.4/ch4_4.sce | 5e73af1298714ef15c2e42c4048458209793c34c | [] | no_license | FOSSEE/Scilab-TBC-Uploads | 948e5d1126d46bdd2f89a44c54ba62b0f0a1f5e1 | 7bc77cb1ed33745c720952c92b3b2747c5cbf2df | refs/heads/master | 2020-04-09T02:43:26.499817 | 2018-02-03T05:31:52 | 2018-02-03T05:31:52 | 37,975,407 | 3 | 12 | null | null | null | null | UTF-8 | Scilab | false | false | 1,390 | sce | ch4_4.sce | clc;
clear;
printf("\t\t\tChapter4_example4\n\n\n");
hc=6;
D=0.105;
k=0.431;
c=2000;
rou=998;
Vs=%pi*D^3/6;
As=%pi*D^2;
// calculating Biot Number for lumped capacitance approach
Bi_lumped=hc*Vs/(k*As);
printf("\nThe Biot number is %.3f,",Bi_lumped);
alpha=k/(rou*c);
printf("\nThe value of diffusivity is %.2e sq.m/s",alpha);
Tc=20;
T_inf=23;
T_i=4;
if Bi_lumped<0.1 then
n=0;
else if Bi_lumped>0.1 then
n=1;
end
end
select n
case 0 then
disp('The Lumped capacity approach is applicable');
case 1 then
printf("\n\nSince value of Biot number is greater than 0.1,\nLumped capacity approach would not give accurate results, so figure 4.8 is to be used\n");
// calculating Biot Number for using figure 4.8
Bi_figure=hc*D/(2*k);
printf("\nThe Biot Number for using figure 4.8 is %.3f",Bi_figure);
reciprocal_Bi=1/Bi_figure;
dimensionless_temp=(Tc-T_inf)/(T_i-T_inf);
printf("\nThe dimensionless temperature is %.3f",dimensionless_temp);
Fo=1.05;//The corresponding value of Fourier Number from figure 4.8a
t=(D/2)^2*Fo/alpha;
printf("\nThe required time is %.2e s = %.1f hr",t,t/3600);
end
Bi2Fo=Bi_figure^2*Fo;
printf("\nBi^2Fo=%.1e",Bi2Fo);
Dimensionless_HeatFlow=0.7; // The corresponding dimensionless heat flow ratio from figure 4.8c
Q=Dimensionless_HeatFlow*rou*c*Vs*(T_i-T_inf);
printf("\nThe heat transferred is %.3e J",Q);
|
8994e08de234eb959660e9266b9c29c398ae997c | f42e0a9f61003756d40b8c09ebfe5dd926081407 | /TP5/resolChol.sci | de92cd75bccbc23b100efab22388df0aa2ad489a | [] | no_license | BenFradet/MT09 | 04fe085afaef9f8c8d419a3824c633adae0c007a | d37451249f2df09932777e2fd64d43462e3d6931 | refs/heads/master | 2020-04-14T02:47:55.441807 | 2014-12-22T17:34:50 | 2014-12-22T17:34:50 | null | 0 | 0 | null | null | null | null | UTF-8 | Scilab | false | false | 195 | sci | resolChol.sci | function[x] = resolChol(A, b)
exec('cholesky.sci', -1);
exec('solsup.sci', -1);
exec('solinf.sci', -1);
C = cholesky(A);
y = solinf(C, b);
x = solsup(C', y);
endfunction
|
5308d57020c686c8e67ff6f9d4e45d34b40cac5d | 449d555969bfd7befe906877abab098c6e63a0e8 | /2102/CH4/EX4.16/exa_4_16.sce | b305e4bfd0ea6633367000e65625a412f40cdd8b | [] | no_license | FOSSEE/Scilab-TBC-Uploads | 948e5d1126d46bdd2f89a44c54ba62b0f0a1f5e1 | 7bc77cb1ed33745c720952c92b3b2747c5cbf2df | refs/heads/master | 2020-04-09T02:43:26.499817 | 2018-02-03T05:31:52 | 2018-02-03T05:31:52 | 37,975,407 | 3 | 12 | null | null | null | null | UTF-8 | Scilab | false | false | 217 | sce | exa_4_16.sce | // Exa 4.16
clc;
clear;
close;
// Given data
N1= 6*10^6;// Number of EHPs generated
N2= 8*10^6;// Number of incident photons
nita= N1/N2;
disp(nita*100,"The quantum efficiency of photon detector in % is : ")
|
d577a8798a72051e09064bc5bd76b0d8bc5dddf7 | 3b742855dce5a8af730e0cbc0fa60a17c93592a7 | /TP2-AlexisZankowitchRomainCarons.sce | d957685bcdd6024600bb2442c83b321b95167bc8 | [] | no_license | AlexisZankowitch/scilab | 287c90ba944622f50c6fd445044441618153d04b | 2a6dfafe03743e26fd78308265813134025cf224 | refs/heads/master | 2021-05-30T04:37:00.736119 | 2015-12-06T13:39:59 | 2015-12-06T13:39:59 | null | 0 | 0 | null | null | null | null | UTF-8 | Scilab | false | false | 4,416 | sce | TP2-AlexisZankowitchRomainCarons.sce | //ALEXIS ZANKOWITCH
// ROMAIN CARON
function T = polyControleBsplines()
ibutton = 0;
i=1;
while (ibutton <> 2 & ibutton <> 5)
plot2d(0,0,rect=[0,0,3,3])
[ibutton,x,y]=xclick()
T(i,:)=[x,y]
plot(x,y,"ro");
if(i>1)
plot([T(i-1,1),T(i,1)],[T(i-1,2),T(i,2)])
end
i = i+1
end
p=[0:0.01:1]
eq=zeros(size(p,2),2)
compteur = 1
//nombre de clic = matrice coxDeBoor
for i = 0 : 0.01 : 1
cx = coxDeBoor(i,2*size(T,1)-1,size(T,1)-1)
for j = 1 : size(cx,1)
eq(compteur,:) = eq(compteur,:) + T(j,:)*cx(j)
end
compteur = compteur + 1
end
plot(eq(:,1),eq(:,2),'Color',[1 0 0],'LineWidth',2)
endfunction
function base = baseBspline(t,interval)
base = 0
for i=1:size(interval,2)-1
if t>= interval(i) & t < interval(i+1)
base(i) = 1
else
base(i) = 0
end
end
endfunction
function base = coxDeBoor(t,m,n)
interval = [0:1/m:1]
base = baseBspline(t,interval)
for j = 1 : n
for i = 1 : size(base,1)-j
deno = (interval(i+j)-interval(i))
denoNH = (interval(i+j+1)-interval(i+1))
coef1 = (t-interval(i))/ deno
coef2 = (interval(i+j+1)-t)/ deno //changer par denoNH si interval non homogene
base(i) = coef1 * base(i) + coef2 * base(i+1)
end
end
base = base(1:m-n,1)//recupere quatres premieres lignes
endfunction
// question 1 t=7 k=1
// question 3 t = 7 k=2
function cx = homogene(t,k)
cx = []
interval = [0:1:t]
for i = 0 : 0.01 : t
cx = [cx,intHomogene(i,interval,k)]
end
t=[0:0.01:t]
for i=1 : size(cx,1)
plot(t,cx(i,:))
end
endfunction
function cx = nonHomogene(t,k)
cx = []
for i = 0 : 0.01 : t
cx = [cx,intNonHomogene(i,t,k)]
end
t=[0:0.01:t]
for i=1 : size(cx,1)
plot(t,cx(i,:))
end
endfunction
//T est un vecteur noeud k est le degré des bj on peut utiliser cette fonction pour generer les bj
function cx = bjk(t,k,col)
cx = []
taille = size(t,2)
for i = 0 : 0.01 : taille
cx = [cx,intHomogene(i,t,k)]
end
t=[0:0.01:size(t,2)]
for i=1 : size(cx,1)
plot(t,cx(i,:),col)
end
endfunction
//les noeuds multiples sont confondus leur courbes n'est pas dérivable car on a un pique
//à ne pas appeler intHomogene et intNonHomogene avec k 3,4,etc... et j dernier chiffre de j
function base = intHomogene(t,m,n)
base = baseBspline(t,m)
for j = 1 : n
for i = 1 : size(base,1)-j
deno = (m(i+j)-m(i))
denoNH = (m(i+j+1)-m(i+1))
if(deno==0)
coef1 = 0
else
coef1 = (t-m(i))/ deno
end
if(denoNH==0)
coef2 = 0
else
coef2 = (m(i+j+1)-t)/ denoNH
end
base(i) = coef1 * base(i) + coef2 * base(i+1)
end
end
taille = size(m,2)-n-1
base = base(1:taille,1)//recupere lignes
endfunction
function base = intNonHomogene(t,m,n)
interval = [0,1,2,3,5,6,7]
base = baseBspline(t,interval)
for j = 1 : n
for i = 1 : size(base,1)-j
disp(size(base,1)-j)
deno = (interval(i+j)-interval(i))
denoNH = (interval(i+j+1)-interval(i+1))
coef1 = (t-interval(i))/ deno
coef2 = (interval(i+j+1)-t)/ denoNH
base(i) = coef1 * base(i) + coef2 * base(i+1)
//probleme calcul bj1
end
end
taille = size(interval,2)-n-1
base = base(1:taille,1)
endfunction
function question1()
bjk([0,1,2,3,4,5,6],1,'r-')
endfunction
function question2()
bjk([0,1,2,3,5,6,7],1,'r-')
endfunction
function question3()
bjk([0,1,2,3,4,5,6],2,'r-')
bjk([0,1,2,3,5,6,7],2,'b-')
endfunction
function question4()
bjk([0,1,2,3,5,8,9,11],3,'b-')
bjk([0,1,2,3,4,5,6,7],3,'r-')
endfunction
function question5()
disp("voir function bjk")
endfunction
function question6()
bjk([0,1,2,3,3,3,4,5],3,'b-')
bjk([1,1,1,1,2,3,4,5],3,'r-')
endfunction
function question7()
disp("ça vaut 1 aux noeud multiples et la courbes est en triangle. ce nest pas derivable")
endfunction
function question8()
endfunction
function question9()
bjk([0,0,0,0,1,1,1,1],3,'g-')
endfunction
|
cc8f9409ab298da68c02af3993ceca28cbd63a2d | 089894a36ef33cb3d0f697541716c9b6cd8dcc43 | /NLP_Project/test/blog/bow/bow.9_17.tst | 97e251216f342ac8861c304a6a338121e0a8aa2c | [] | no_license | mandar15/NLP_Project | 3142cda82d49ba0ea30b580c46bdd0e0348fe3ec | 1dcb70a199a0f7ab8c72825bfd5b8146e75b7ec2 | refs/heads/master | 2020-05-20T13:36:05.842840 | 2013-07-31T06:53:59 | 2013-07-31T06:53:59 | 6,534,406 | 0 | 1 | null | null | null | null | UTF-8 | Scilab | false | false | 4,711 | tst | bow.9_17.tst | 9 36:0.25 40:0.5 148:0.2 165:1.0 317:1.0 375:1.0 458:0.3333333333333333 519:1.0 1625:1.0
9 11:0.3333333333333333 36:0.25 40:0.5 53:0.2 114:0.25 158:0.16666666666666666 339:1.0 735:1.0
9 4:0.3333333333333333 15:1.0 36:0.25 40:0.5 48:0.1 60:0.08333333333333333 99:1.0 126:1.0 148:0.2 171:1.0 355:1.0 612:0.3333333333333333 748:1.0 1457:1.0 1720:1.0 1745:1.0
9 1:0.041666666666666664 74:1.0 208:0.3333333333333333 317:1.0 330:1.0 915:1.0
9 1:0.041666666666666664 4:0.3333333333333333 15:1.0 53:0.2 60:0.08333333333333333 74:1.0 76:0.16666666666666666 93:0.05 112:1.0 113:0.5 121:0.5 298:0.3333333333333333 317:1.0 485:1.0 633:0.5 731:1.0 1453:1.0
9 1:0.041666666666666664 84:1.0 156:1.0 215:0.25 221:1.0 317:1.0 354:1.0 731:1.0
9 1:0.041666666666666664 62:0.25 148:0.2 166:1.0 259:2.0 481:0.5 762:1.0 889:1.0
9 1:0.041666666666666664 36:0.25 53:0.2 76:0.16666666666666666 259:2.0 481:0.5 640:1.0 762:1.0
9 1:0.0625 10:0.08333333333333333 36:0.5 62:0.5 95:0.5 156:1.0 208:0.6666666666666666 316:1.0 494:0.5 603:1.0 1230:1.0
9 1:0.020833333333333332
9 1:0.020833333333333332 4:0.3333333333333333 51:0.5 166:1.0
9 1:0.020833333333333332 148:0.2 171:1.0 350:1.0 609:1.0
9 1:0.020833333333333332 36:0.25 40:0.5 248:1.0 561:1.0
9 1:0.020833333333333332 36:0.25 372:0.5 754:1.0
9 1:0.020833333333333332 17:0.25 34:1.0 60:0.08333333333333333 480:1.0 611:1.0 1214:1.0
9 1:0.020833333333333332 36:0.25 48:0.1 148:0.2 162:1.0 218:1.0 228:1.0 273:1.0 317:1.0 339:1.0 372:1.0 1783:1.0
9 1:0.020833333333333332 10:0.08333333333333333 17:0.25 62:0.25 122:0.5 126:1.0 568:1.0 679:0.5 1125:1.0 1621:1.0
9 4:0.3333333333333333 22:1.0 53:0.2 69:0.3333333333333333 93:0.05 114:0.5 192:0.2 198:0.09090909090909091 372:0.5 400:0.2 436:1.0 482:1.0 647:1.0
9 1:0.041666666666666664 17:0.25 40:0.5 60:0.08333333333333333 208:0.3333333333333333 240:0.5 383:1.0 408:1.0 420:1.0 476:1.0 481:0.5 733:1.0 1417:1.0 1522:1.0
9 1:0.020833333333333332 2:1.0 15:1.0 36:0.25 60:0.08333333333333333 76:0.16666666666666666 93:0.05 243:1.0 252:0.5 395:1.0 428:1.0 568:1.0 952:1.0 1031:1.0
9 4:0.3333333333333333 17:0.5 36:0.25 44:0.5 48:0.1 62:0.25 69:0.3333333333333333 121:0.5 252:0.5 258:0.3333333333333333 283:1.0 298:0.3333333333333333 353:1.0 402:1.0 491:1.0 612:0.3333333333333333 633:1.0 781:1.0 891:1.0
9 4:0.6666666666666666 17:0.25 36:0.25 60:0.16666666666666666 62:0.25 104:1.0 252:0.5 261:1.0 313:1.0 633:0.5 886:1.0 1230:1.0 1257:1.0
9 1:0.041666666666666664 4:0.3333333333333333 10:0.08333333333333333 17:0.25 36:0.5 53:0.2 84:1.0 93:0.05 104:1.0 112:1.0 113:0.5 126:1.0 171:1.0 208:0.3333333333333333 252:0.5 410:0.3333333333333333 458:0.6666666666666666 462:1.0 485:1.0 568:1.0 679:0.5 797:0.5 1183:1.0 1411:1.0 1768:1.0
9 1:0.020833333333333332 11:0.3333333333333333 40:0.5 93:0.05 158:0.16666666666666666 252:0.5 688:1.0 796:1.0
9 1:0.041666666666666664 2:1.0 15:1.0 17:0.25 36:0.75 48:0.1 60:0.16666666666666666 75:1.0 83:1.0 148:0.2 158:0.16666666666666666 420:1.0 568:2.0 734:1.0 1110:1.0 1113:0.3333333333333333 1135:1.0 1672:1.0
9 1:0.020833333333333332 10:0.08333333333333333 15:1.0 27:1.0 51:0.5 76:0.16666666666666666 93:0.05 95:0.5 197:1.0 208:0.3333333333333333 210:1.0 228:1.0 235:1.0 240:0.5 241:1.0 243:1.0 315:1.0 876:1.0
9 1:0.041666666666666664 2:1.0 4:0.3333333333333333 14:1.0 53:0.2 126:1.0 144:1.0 176:1.0 240:1.0 298:0.3333333333333333 317:1.0 568:1.0 886:1.0 1139:1.0 1367:1.0
9 1:0.020833333333333332 4:0.3333333333333333 36:0.5 60:0.08333333333333333 76:0.16666666666666666 93:0.05 124:1.0 192:0.2 208:0.3333333333333333 414:1.0 480:1.0 568:1.0 1614:1.0 1694:1.0
9 122:0.5 347:1.0 1230:1.0
9 84:1.0 113:0.5 209:0.2 762:1.0
9 15:1.0 62:0.25 118:1.0 134:1.0 933:1.0
9 126:1.0 176:1.0 240:0.5
9 1:0.041666666666666664 4:0.3333333333333333 17:0.25 53:0.2 240:0.5 330:2.0 347:1.0 437:1.0 826:1.0 1139:1.0 1230:1.0
9 1:0.020833333333333332 2:2.0 4:0.3333333333333333 10:0.08333333333333333 17:0.25 36:0.25 111:1.0 158:0.16666666666666666 198:0.09090909090909091 232:1.0 240:0.5 330:1.0 372:0.5 437:1.0 679:0.5 1135:2.0 1577:1.0
9 1:0.020833333333333332 4:0.3333333333333333 19:0.3333333333333333 51:0.5 126:1.0 148:0.2 176:1.0 240:0.5 437:1.0 886:1.0
9 1:0.020833333333333332 4:0.3333333333333333 36:0.25 84:1.0 126:1.0 228:1.0 243:1.0 259:1.0 353:1.0 375:1.0 385:1.0 395:1.0 506:1.0 633:0.5 750:1.0
9 4:0.3333333333333333 36:0.5 44:0.5 51:0.5 53:0.2 85:1.0 240:0.5 249:1.0 407:1.0
9 4:0.3333333333333333 17:0.25 53:0.2 233:1.0 240:1.0 243:1.0 317:1.0 330:2.0 383:1.0 886:1.0
9 1:0.041666666666666664 2:1.0 4:0.6666666666666666 36:0.5 40:0.5 62:0.25 79:1.0 125:0.5 156:1.0 158:0.16666666666666666 208:0.3333333333333333 243:1.0 298:0.3333333333333333 343:0.08333333333333333 347:1.0 420:1.0 491:1.0 801:1.0 1515:1.0
|
d0a2ee2045b653da62eea21649ebbfbba099799b | 449d555969bfd7befe906877abab098c6e63a0e8 | /1709/CH6/EX6.6/6_6.sce | 7f332736d0e5f4bced9ef7aaa558e3022c710a61 | [] | no_license | FOSSEE/Scilab-TBC-Uploads | 948e5d1126d46bdd2f89a44c54ba62b0f0a1f5e1 | 7bc77cb1ed33745c720952c92b3b2747c5cbf2df | refs/heads/master | 2020-04-09T02:43:26.499817 | 2018-02-03T05:31:52 | 2018-02-03T05:31:52 | 37,975,407 | 3 | 12 | null | null | null | null | UTF-8 | Scilab | false | false | 228 | sce | 6_6.sce | clc
//Initialization of variables
disp("from steam tables,")
h1=1416.4 //B/lbm
s1=1.6842 //B/lbm R
//calculations
s2=s1
P2=50 //psia
T2=317.5 //F
h2=1193.7
W=h2-h1
//results
printf("Work calculated = %.1f B/lbm",W)
|
e7b711ee1f4fa4026b6be91cef20b4800be44fa8 | 449d555969bfd7befe906877abab098c6e63a0e8 | /3875/CH1/EX1.5/Ex1_5.sce | e405068735222fb09091ab62357ce4d77538e194 | [] | no_license | FOSSEE/Scilab-TBC-Uploads | 948e5d1126d46bdd2f89a44c54ba62b0f0a1f5e1 | 7bc77cb1ed33745c720952c92b3b2747c5cbf2df | refs/heads/master | 2020-04-09T02:43:26.499817 | 2018-02-03T05:31:52 | 2018-02-03T05:31:52 | 37,975,407 | 3 | 12 | null | null | null | null | UTF-8 | Scilab | false | false | 503 | sce | Ex1_5.sce | clc;
clear;
phi=45 //since the EMF is ahead of the current by 55-10 in degree
omega=3000 //frequency in radian/s
L=0.01 //inductance in H
E0=141.4
I0=5
//calculation
Z1=sqrt(2) //*R first equation for Z
Z2=E0/I0//second equation for Z
R=Z2/Z1 //resistance in ohm
L_omega=L*omega //in ohm
C=1/((L_omega-R)*omega)
mprintf("Resistance is = %d ohm\n",R) //The answers vary due to round off error
mprintf("Capacitance is = %2.1f mF\n",C/10^-6) //converting from F to mF dividing by 10^-6
|
a867783902459faf8437139d7c1d80dd4d9ca242 | 430e7adb489914d378a5b0a27d8d41352fa45f3a | /scilab/machine-sliding-mode/obokata/状態変数の比較/aaa.sce | 7413a82f544fcd22e96a2657f4a5da348e8e2351 | [] | no_license | ziaddorbuk/Lesson | 04906ff94bf8c1f6bbc6971d5692ae011a9b8869 | 20fe20a6c9c145ef48a35574d885d3952f9ab6ff | refs/heads/master | 2021-09-23T11:48:05.958608 | 2018-04-30T01:54:13 | 2018-04-30T01:54:13 | null | 0 | 0 | null | null | null | null | UTF-8 | Scilab | false | false | 239 | sce | aaa.sce | A11 = [0];
A12 = [1];
S2 = eye(1);
// 配置したい極を指定
p = [-5];
// 超平面の設計
F = ppol(A11,A12,p)
S = S2*[F S2]
//切換超平面Sの値をコンソールに出力
disp("切換超平面:S=")
disp(S)
|
58855ba19231ec58a7764d8404435bf608513933 | 449d555969bfd7befe906877abab098c6e63a0e8 | /3802/CH4/EX4.5/Ex4_5.sce | ae2ce64334839c9848fe8bbada523fe4e9520369 | [] | no_license | FOSSEE/Scilab-TBC-Uploads | 948e5d1126d46bdd2f89a44c54ba62b0f0a1f5e1 | 7bc77cb1ed33745c720952c92b3b2747c5cbf2df | refs/heads/master | 2020-04-09T02:43:26.499817 | 2018-02-03T05:31:52 | 2018-02-03T05:31:52 | 37,975,407 | 3 | 12 | null | null | null | null | UTF-8 | Scilab | false | false | 546 | sce | Ex4_5.sce | //Book Name:Fundamentals of Electrical Engineering
//Author:Rajendra Prasad
//Publisher: PHI Learning Private Limited
//Edition:Third ,2014
//Ex4_5.sce.
clc;
clear;
//from the given figure
q=1e-8;
OB=sqrt(5^2-4^2); //Distance between point O and B
cos_theta=3/5;
sin_theta=4/5;
r=5e-2;
epsilon_not=1/(36e9*%pi);
modulus_E=q/(4*%pi*epsilon_not*r^2);
E1=((modulus_E*cos_theta)-(modulus_E*sin_theta*%i));
E2=((-modulus_E*cos_theta)-(modulus_E*sin_theta*%i));
E=E1+E2;
disp(E,'The resultant field intensity in N/C is')
|
31076a57c73202b64ae7b8c3bb5229808a7b072d | 449d555969bfd7befe906877abab098c6e63a0e8 | /617/CH9/EX9.2/Example9_2.sci | 3cb9cf925e1abc75ec2df402ef5e1deeaab28ff3 | [] | no_license | FOSSEE/Scilab-TBC-Uploads | 948e5d1126d46bdd2f89a44c54ba62b0f0a1f5e1 | 7bc77cb1ed33745c720952c92b3b2747c5cbf2df | refs/heads/master | 2020-04-09T02:43:26.499817 | 2018-02-03T05:31:52 | 2018-02-03T05:31:52 | 37,975,407 | 3 | 12 | null | null | null | null | UTF-8 | Scilab | false | false | 987 | sci | Example9_2.sci | clc();
clear;
// To find the temperature at the free end is made of copper iron and glass
D = 3/48; // diameter in ft
L = 9/12; // Length of steam vessel in ft
T1 = 210; // Vessel temperature in degF
T2 = 80; // Air temperature in degF
th0 = T1-T2; // Temperature difference in degF
h = 1.44; // Assumed heat coefficient in Btu/hr-ft^2-degF
C = %pi*D; // Circumference of vessel in ft
A = %pi*D*D/4; // Area of vessel in ft^2
k = 36; // heat conductivity of copper in Btu/hr-ft-degF
m = sqrt(h*C/(k*A)); // in /ft
q=k*A*m*th0*(exp(m*L)-exp(-m*L))/(exp(m*L)+exp(-m*L));
// Heat loss by iron rod in Btu/hr
printf("The rate of heat loss by iron rod is %.d Btu/hr",q);
|
60784cc4e2c0b991d1f7c9a6dcfd3935e541ea4c | 61e39cdb9efce4bc7bc35be444b193c1066f1bf2 | /simpson3.sce | a6231233d9bc85bcd571ae9ea309559d6730ba28 | [] | no_license | nancyanand2807/SCILAB-CODES | 866c1c99754975f9f0deb271d3844c854db1645c | 69bf72606e8cd62aae3d1302c734f425d381a121 | refs/heads/master | 2020-06-02T00:39:27.236873 | 2019-06-09T11:26:55 | 2019-06-09T11:26:55 | null | 0 | 0 | null | null | null | null | UTF-8 | Scilab | false | false | 492 | sce | simpson3.sce | //Simpson's (3/8)th Rule
deff('y=f(x)','y=x^4')
a=input("Enter Lower Limit: ")
b=input("Enter Upper Limit: ")
n=input("Enter number of sum intervals: ")
h=(b-a)/n
add1=0
add2=0
add3=0
for i=0:n
x=a+i*h
y=f(x)
disp([x y])
if (i==0)|(i==n) then
add1=add1+y
else if (modulo(i,3)==0) then
add2=add2+y
else
add3=add3+y
end
end
end
I=((3*h)/8)*(add1+2*add2+3*add3)
disp(I,"Integration by Simpsons (3/8)th Rule is:")
|
44b4ca131d744facf6223f53de043dca55eb7e79 | 8217f7986187902617ad1bf89cb789618a90dd0a | /browsable_source/2.2/Unix/scilab-2.2/macros/signal/%sn.sci | 1d88f34efa953eadb0041776ac241a373ee87a47 | [
"LicenseRef-scancode-warranty-disclaimer",
"LicenseRef-scancode-public-domain",
"MIT"
] | permissive | clg55/Scilab-Workbench | 4ebc01d2daea5026ad07fbfc53e16d4b29179502 | 9f8fd29c7f2a98100fa9aed8b58f6768d24a1875 | refs/heads/master | 2023-05-31T04:06:22.931111 | 2022-09-13T14:41:51 | 2022-09-13T14:41:51 | 258,270,193 | 0 | 1 | null | null | null | null | UTF-8 | Scilab | false | false | 721 | sci | %sn.sci | function [y]=%sn(x,m)
//Jacobi 's elliptic function with parameter m
//which computes the inverse of the elliptic
//integral for the parameter m.
//x may be a vector.
//The amplitude is computed in fortran and apply
//the addition formulas for elliptic functions
// x :A point inside the fundamental rectangle
// :defined by the elliptic integral
// m :Parameter of the elliptic integral (0<m<1)
// y :Result
//
//!
//Author F.D.
[n1,n2]=size(x);
n=n1*n2;
a=amell(real(x),sqrt(m));
s=sin(a);
c=cos(a);
d=sqrt(ones(n1,n2)-m*s.*s);
m1=1-m;
a1=amell(imag(x),sqrt(m1));
s1=sin(a1);
c1=cos(a1);
d1=sqrt(ones(n1,n2)-m1*s1.*s1);
y=(s.*d1+%i*c.*d.*s1.*c1)./(c1.*c1+m*s.*s.*s1.*s1);
|
15ad581d4c4b04c9276fecc34574369d8f47bca8 | 449d555969bfd7befe906877abab098c6e63a0e8 | /49/CH6/EX6.9/ex9.sce | 1a846c6deb837312baf0103b695efb9c107274b7 | [] | no_license | FOSSEE/Scilab-TBC-Uploads | 948e5d1126d46bdd2f89a44c54ba62b0f0a1f5e1 | 7bc77cb1ed33745c720952c92b3b2747c5cbf2df | refs/heads/master | 2020-04-09T02:43:26.499817 | 2018-02-03T05:31:52 | 2018-02-03T05:31:52 | 37,975,407 | 3 | 12 | null | null | null | null | UTF-8 | Scilab | false | false | 371 | sce | ex9.sce | //CHAPTER 6 _ PRESSURE AND SOUND MEASUREMENT
//Caption : Sound Measurement
// Example 9// Page 369
disp("Lp=104")
Lp=104 //('enter the sound pressure level in decibles=:')
disp("pa=20*10^-6;")
disp("p=sqrt(10^(Lp/10)*pa^2);")
pa=20*10^-6; // rms pressure threshold of hearing
p=sqrt(10^(Lp/10)*pa^2);
printf('root mean square sound pressure is %1.3fPa\n',p)
|
bfa8979199c97891f7da1ee38888f2214f9a96f4 | 1bb72df9a084fe4f8c0ec39f778282eb52750801 | /test/G10.prev.tst | 4373a80af3a35e3f1c6a88af3f6ef709664863ce | [
"Apache-2.0",
"LicenseRef-scancode-unknown-license-reference"
] | permissive | gfis/ramath | 498adfc7a6d353d4775b33020fdf992628e3fbff | b09b48639ddd4709ffb1c729e33f6a4b9ef676b5 | refs/heads/master | 2023-08-17T00:10:37.092379 | 2023-08-04T07:48:00 | 2023-08-04T07:48:00 | 30,116,803 | 2 | 0 | null | null | null | null | UTF-8 | Scilab | false | false | 88,687 | tst | G10.prev.tst | Input:
x^2 + 1
x
mdiv s = x^3: (lts: + x^3) / (ltf[0]: + 1) = (quot: + x^3), rest 0
mdiv s = - x^5: (lts: - x^5) / (ltf[0]: + 1) = (quot: - x^5), rest 0
mdiv s = x^7: (lts: + x^7) / (ltf[0]: + 1) = (quot: + x^7), rest 0
mdiv s = - x^9: (lts: - x^9) / (ltf[0]: + 1) = (quot: - x^9), rest 0
mdiv s = x^11: (lts: + x^11) / (ltf[0]: + 1) = (quot: + x^11), rest 0
mdiv s = - x^13: (lts: - x^13) / (ltf[0]: + 1) = (quot: - x^13), rest 0
mdiv s = x^15: (lts: + x^15) / (ltf[0]: + 1) = (quot: + x^15), rest 0
mdiv s = - x^17: (lts: - x^17) / (ltf[0]: + 1) = (quot: - x^17), rest 0
mdiv s = x^19: (lts: + x^19) / (ltf[0]: + 1) = (quot: + x^19), rest 0
mdiv s = - x^21: (lts: - x^21) / (ltf[0]: + 1) = (quot: - x^21), rest 0
mdiv s = x^23: (lts: + x^23) / (ltf[0]: + 1) = (quot: + x^23), rest 0
mdiv s = - x^25: (lts: - x^25) / (ltf[0]: + 1) = (quot: - x^25), rest 0
mdiv s = x^27: (lts: + x^27) / (ltf[0]: + 1) = (quot: + x^27), rest 0
mdiv s = - x^29: (lts: - x^29) / (ltf[0]: + 1) = (quot: - x^29), rest 0
mdiv s = x^31: (lts: + x^31) / (ltf[0]: + 1) = (quot: + x^31), rest 0
mdiv s = - x^33: (lts: - x^33) / (ltf[0]: + 1) = (quot: - x^33), rest 0
mdiv s = x^35: (lts: + x^35) / (ltf[0]: + 1) = (quot: + x^35), rest 0
mdiv s = - x^37: (lts: - x^37) / (ltf[0]: + 1) = (quot: - x^37), rest 0
mdiv s = x^39: (lts: + x^39) / (ltf[0]: + 1) = (quot: + x^39), rest 0
mdiv s = - x^41: (lts: - x^41) / (ltf[0]: + 1) = (quot: - x^41), rest 0
mdiv s = x^43: (lts: + x^43) / (ltf[0]: + 1) = (quot: + x^43), rest 0
mdiv s = - x^45: (lts: - x^45) / (ltf[0]: + 1) = (quot: - x^45), rest 0
mdiv s = x^47: (lts: + x^47) / (ltf[0]: + 1) = (quot: + x^47), rest 0
mdiv s = - x^49: (lts: - x^49) / (ltf[0]: + 1) = (quot: - x^49), rest 0
mdiv s = x^51: (lts: + x^51) / (ltf[0]: + 1) = (quot: + x^51), rest 0
mdiv s = - x^53: (lts: - x^53) / (ltf[0]: + 1) = (quot: - x^53), rest 0
mdiv s = x^55: (lts: + x^55) / (ltf[0]: + 1) = (quot: + x^55), rest 0
mdiv s = - x^57: (lts: - x^57) / (ltf[0]: + 1) = (quot: - x^57), rest 0
mdiv s = x^59: (lts: + x^59) / (ltf[0]: + 1) = (quot: + x^59), rest 0
mdiv s = - x^61: (lts: - x^61) / (ltf[0]: + 1) = (quot: - x^61), rest 0
mdiv s = x^63: (lts: + x^63) / (ltf[0]: + 1) = (quot: + x^63), rest 0
mdiv s = - x^65: (lts: - x^65) / (ltf[0]: + 1) = (quot: - x^65), rest 0
mdiv s = x^67: (lts: + x^67) / (ltf[0]: + 1) = (quot: + x^67), rest 0
mdiv s = - x^69: (lts: - x^69) / (ltf[0]: + 1) = (quot: - x^69), rest 0
mdiv s = x^71: (lts: + x^71) / (ltf[0]: + 1) = (quot: + x^71), rest 0
mdiv s = - x^73: (lts: - x^73) / (ltf[0]: + 1) = (quot: - x^73), rest 0
mdiv s = x^75: (lts: + x^75) / (ltf[0]: + 1) = (quot: + x^75), rest 0
mdiv s = - x^77: (lts: - x^77) / (ltf[0]: + 1) = (quot: - x^77), rest 0
mdiv s = x^79: (lts: + x^79) / (ltf[0]: + 1) = (quot: + x^79), rest 0
mdiv s = - x^81: (lts: - x^81) / (ltf[0]: + 1) = (quot: - x^81), rest 0
mdiv s = x^83: (lts: + x^83) / (ltf[0]: + 1) = (quot: + x^83), rest 0
mdiv s = - x^85: (lts: - x^85) / (ltf[0]: + 1) = (quot: - x^85), rest 0
mdiv s = x^87: (lts: + x^87) / (ltf[0]: + 1) = (quot: + x^87), rest 0
mdiv s = - x^89: (lts: - x^89) / (ltf[0]: + 1) = (quot: - x^89), rest 0
mdiv s = x^91: (lts: + x^91) / (ltf[0]: + 1) = (quot: + x^91), rest 0
mdiv s = - x^93: (lts: - x^93) / (ltf[0]: + 1) = (quot: - x^93), rest 0
mdiv s = x^95: (lts: + x^95) / (ltf[0]: + 1) = (quot: + x^95), rest 0
mdiv s = - x^97: (lts: - x^97) / (ltf[0]: + 1) = (quot: - x^97), rest 0
mdiv s = x^99: (lts: + x^99) / (ltf[0]: + 1) = (quot: + x^99), rest 0
mdiv s = - x^101: (lts: - x^101) / (ltf[0]: + 1) = (quot: - x^101), rest 0
mdiv s = x^103: (lts: + x^103) / (ltf[0]: + 1) = (quot: + x^103), rest 0
mdiv s = - x^105: (lts: - x^105) / (ltf[0]: + 1) = (quot: - x^105), rest 0
mdiv s = x^107: (lts: + x^107) / (ltf[0]: + 1) = (quot: + x^107), rest 0
mdiv s = - x^109: (lts: - x^109) / (ltf[0]: + 1) = (quot: - x^109), rest 0
mdiv s = x^111: (lts: + x^111) / (ltf[0]: + 1) = (quot: + x^111), rest 0
mdiv s = - x^113: (lts: - x^113) / (ltf[0]: + 1) = (quot: - x^113), rest 0
mdiv s = x^115: (lts: + x^115) / (ltf[0]: + 1) = (quot: + x^115), rest 0
mdiv s = - x^117: (lts: - x^117) / (ltf[0]: + 1) = (quot: - x^117), rest 0
mdiv s = x^119: (lts: + x^119) / (ltf[0]: + 1) = (quot: + x^119), rest 0
mdiv s = - x^121: (lts: - x^121) / (ltf[0]: + 1) = (quot: - x^121), rest 0
mdiv s = x^123: (lts: + x^123) / (ltf[0]: + 1) = (quot: + x^123), rest 0
mdiv s = - x^125: (lts: - x^125) / (ltf[0]: + 1) = (quot: - x^125), rest 0
mdiv s = x^127: (lts: + x^127) / (ltf[0]: + 1) = (quot: + x^127), rest 0
mdiv s = - x^129: (lts: - x^129) / (ltf[0]: + 1) = (quot: - x^129), rest 0
mdiv s = x^131: (lts: + x^131) / (ltf[0]: + 1) = (quot: + x^131), rest 0
mdiv s = - x^133: (lts: - x^133) / (ltf[0]: + 1) = (quot: - x^133), rest 0
mdiv s = x^135: (lts: + x^135) / (ltf[0]: + 1) = (quot: + x^135), rest 0
mdiv s = - x^137: (lts: - x^137) / (ltf[0]: + 1) = (quot: - x^137), rest 0
mdiv s = x^139: (lts: + x^139) / (ltf[0]: + 1) = (quot: + x^139), rest 0
mdiv s = - x^141: (lts: - x^141) / (ltf[0]: + 1) = (quot: - x^141), rest 0
mdiv s = x^143: (lts: + x^143) / (ltf[0]: + 1) = (quot: + x^143), rest 0
mdiv s = - x^145: (lts: - x^145) / (ltf[0]: + 1) = (quot: - x^145), rest 0
mdiv s = x^147: (lts: + x^147) / (ltf[0]: + 1) = (quot: + x^147), rest 0
mdiv s = - x^149: (lts: - x^149) / (ltf[0]: + 1) = (quot: - x^149), rest 0
mdiv s = x^151: (lts: + x^151) / (ltf[0]: + 1) = (quot: + x^151), rest 0
mdiv s = - x^153: (lts: - x^153) / (ltf[0]: + 1) = (quot: - x^153), rest 0
mdiv s = x^155: (lts: + x^155) / (ltf[0]: + 1) = (quot: + x^155), rest 0
mdiv s = - x^157: (lts: - x^157) / (ltf[0]: + 1) = (quot: - x^157), rest 0
mdiv s = x^159: (lts: + x^159) / (ltf[0]: + 1) = (quot: + x^159), rest 0
mdiv s = - x^161: (lts: - x^161) / (ltf[0]: + 1) = (quot: - x^161), rest 0
mdiv s = x^163: (lts: + x^163) / (ltf[0]: + 1) = (quot: + x^163), rest 0
mdiv s = - x^165: (lts: - x^165) / (ltf[0]: + 1) = (quot: - x^165), rest 0
mdiv s = x^167: (lts: + x^167) / (ltf[0]: + 1) = (quot: + x^167), rest 0
mdiv s = - x^169: (lts: - x^169) / (ltf[0]: + 1) = (quot: - x^169), rest 0
mdiv s = x^171: (lts: + x^171) / (ltf[0]: + 1) = (quot: + x^171), rest 0
mdiv s = - x^173: (lts: - x^173) / (ltf[0]: + 1) = (quot: - x^173), rest 0
mdiv s = x^175: (lts: + x^175) / (ltf[0]: + 1) = (quot: + x^175), rest 0
mdiv s = - x^177: (lts: - x^177) / (ltf[0]: + 1) = (quot: - x^177), rest 0
mdiv s = x^179: (lts: + x^179) / (ltf[0]: + 1) = (quot: + x^179), rest 0
mdiv s = - x^181: (lts: - x^181) / (ltf[0]: + 1) = (quot: - x^181), rest 0
mdiv s = x^183: (lts: + x^183) / (ltf[0]: + 1) = (quot: + x^183), rest 0
mdiv s = - x^185: (lts: - x^185) / (ltf[0]: + 1) = (quot: - x^185), rest 0
mdiv s = x^187: (lts: + x^187) / (ltf[0]: + 1) = (quot: + x^187), rest 0
mdiv s = - x^189: (lts: - x^189) / (ltf[0]: + 1) = (quot: - x^189), rest 0
mdiv s = x^191: (lts: + x^191) / (ltf[0]: + 1) = (quot: + x^191), rest 0
mdiv s = - x^193: (lts: - x^193) / (ltf[0]: + 1) = (quot: - x^193), rest 0
mdiv s = x^195: (lts: + x^195) / (ltf[0]: + 1) = (quot: + x^195), rest 0
mdiv s = - x^197: (lts: - x^197) / (ltf[0]: + 1) = (quot: - x^197), rest 0
mdiv s = x^199: (lts: + x^199) / (ltf[0]: + 1) = (quot: + x^199), rest 0
mdiv s = - x^201: (lts: - x^201) / (ltf[0]: + 1) = (quot: - x^201), rest 0
mdiv s = x^203: (lts: + x^203) / (ltf[0]: + 1) = (quot: + x^203), rest 0
mdiv s = - x^205: (lts: - x^205) / (ltf[0]: + 1) = (quot: - x^205), rest 0
mdiv s = x^207: (lts: + x^207) / (ltf[0]: + 1) = (quot: + x^207), rest 0
mdiv s = - x^209: (lts: - x^209) / (ltf[0]: + 1) = (quot: - x^209), rest 0
mdiv s = x^211: (lts: + x^211) / (ltf[0]: + 1) = (quot: + x^211), rest 0
mdiv s = - x^213: (lts: - x^213) / (ltf[0]: + 1) = (quot: - x^213), rest 0
mdiv s = x^215: (lts: + x^215) / (ltf[0]: + 1) = (quot: + x^215), rest 0
mdiv s = - x^217: (lts: - x^217) / (ltf[0]: + 1) = (quot: - x^217), rest 0
mdiv s = x^219: (lts: + x^219) / (ltf[0]: + 1) = (quot: + x^219), rest 0
mdiv s = - x^221: (lts: - x^221) / (ltf[0]: + 1) = (quot: - x^221), rest 0
mdiv s = x^223: (lts: + x^223) / (ltf[0]: + 1) = (quot: + x^223), rest 0
mdiv s = - x^225: (lts: - x^225) / (ltf[0]: + 1) = (quot: - x^225), rest 0
mdiv s = x^227: (lts: + x^227) / (ltf[0]: + 1) = (quot: + x^227), rest 0
mdiv s = - x^229: (lts: - x^229) / (ltf[0]: + 1) = (quot: - x^229), rest 0
mdiv s = x^231: (lts: + x^231) / (ltf[0]: + 1) = (quot: + x^231), rest 0
mdiv s = - x^233: (lts: - x^233) / (ltf[0]: + 1) = (quot: - x^233), rest 0
mdiv s = x^235: (lts: + x^235) / (ltf[0]: + 1) = (quot: + x^235), rest 0
mdiv s = - x^237: (lts: - x^237) / (ltf[0]: + 1) = (quot: - x^237), rest 0
mdiv s = x^239: (lts: + x^239) / (ltf[0]: + 1) = (quot: + x^239), rest 0
mdiv s = - x^241: (lts: - x^241) / (ltf[0]: + 1) = (quot: - x^241), rest 0
mdiv s = x^243: (lts: + x^243) / (ltf[0]: + 1) = (quot: + x^243), rest 0
mdiv s = - x^245: (lts: - x^245) / (ltf[0]: + 1) = (quot: - x^245), rest 0
mdiv s = x^247: (lts: + x^247) / (ltf[0]: + 1) = (quot: + x^247), rest 0
mdiv s = - x^249: (lts: - x^249) / (ltf[0]: + 1) = (quot: - x^249), rest 0
mdiv s = x^251: (lts: + x^251) / (ltf[0]: + 1) = (quot: + x^251), rest 0
mdiv s = - x^253: (lts: - x^253) / (ltf[0]: + 1) = (quot: - x^253), rest 0
mdiv s = x^255: (lts: + x^255) / (ltf[0]: + 1) = (quot: + x^255), rest 0
mdiv s = - x^257: (lts: - x^257) / (ltf[0]: + 1) = (quot: - x^257), rest 0
mdiv s = x^259: (lts: + x^259) / (ltf[0]: + 1) = (quot: + x^259), rest 0
mdiv s = - x^261: (lts: - x^261) / (ltf[0]: + 1) = (quot: - x^261), rest 0
mdiv s = x^263: (lts: + x^263) / (ltf[0]: + 1) = (quot: + x^263), rest 0
mdiv s = - x^265: (lts: - x^265) / (ltf[0]: + 1) = (quot: - x^265), rest 0
mdiv s = x^267: (lts: + x^267) / (ltf[0]: + 1) = (quot: + x^267), rest 0
mdiv s = - x^269: (lts: - x^269) / (ltf[0]: + 1) = (quot: - x^269), rest 0
mdiv s = x^271: (lts: + x^271) / (ltf[0]: + 1) = (quot: + x^271), rest 0
mdiv s = - x^273: (lts: - x^273) / (ltf[0]: + 1) = (quot: - x^273), rest 0
mdiv s = x^275: (lts: + x^275) / (ltf[0]: + 1) = (quot: + x^275), rest 0
mdiv s = - x^277: (lts: - x^277) / (ltf[0]: + 1) = (quot: - x^277), rest 0
mdiv s = x^279: (lts: + x^279) / (ltf[0]: + 1) = (quot: + x^279), rest 0
mdiv s = - x^281: (lts: - x^281) / (ltf[0]: + 1) = (quot: - x^281), rest 0
mdiv s = x^283: (lts: + x^283) / (ltf[0]: + 1) = (quot: + x^283), rest 0
mdiv s = - x^285: (lts: - x^285) / (ltf[0]: + 1) = (quot: - x^285), rest 0
mdiv s = x^287: (lts: + x^287) / (ltf[0]: + 1) = (quot: + x^287), rest 0
mdiv s = - x^289: (lts: - x^289) / (ltf[0]: + 1) = (quot: - x^289), rest 0
mdiv s = x^291: (lts: + x^291) / (ltf[0]: + 1) = (quot: + x^291), rest 0
mdiv s = - x^293: (lts: - x^293) / (ltf[0]: + 1) = (quot: - x^293), rest 0
mdiv s = x^295: (lts: + x^295) / (ltf[0]: + 1) = (quot: + x^295), rest 0
mdiv s = - x^297: (lts: - x^297) / (ltf[0]: + 1) = (quot: - x^297), rest 0
mdiv s = x^299: (lts: + x^299) / (ltf[0]: + 1) = (quot: + x^299), rest 0
mdiv s = - x^301: (lts: - x^301) / (ltf[0]: + 1) = (quot: - x^301), rest 0
mdiv s = x^303: (lts: + x^303) / (ltf[0]: + 1) = (quot: + x^303), rest 0
mdiv s = - x^305: (lts: - x^305) / (ltf[0]: + 1) = (quot: - x^305), rest 0
mdiv s = x^307: (lts: + x^307) / (ltf[0]: + 1) = (quot: + x^307), rest 0
mdiv s = - x^309: (lts: - x^309) / (ltf[0]: + 1) = (quot: - x^309), rest 0
mdiv s = x^311: (lts: + x^311) / (ltf[0]: + 1) = (quot: + x^311), rest 0
mdiv s = - x^313: (lts: - x^313) / (ltf[0]: + 1) = (quot: - x^313), rest 0
mdiv s = x^315: (lts: + x^315) / (ltf[0]: + 1) = (quot: + x^315), rest 0
mdiv s = - x^317: (lts: - x^317) / (ltf[0]: + 1) = (quot: - x^317), rest 0
mdiv s = x^319: (lts: + x^319) / (ltf[0]: + 1) = (quot: + x^319), rest 0
mdiv s = - x^321: (lts: - x^321) / (ltf[0]: + 1) = (quot: - x^321), rest 0
mdiv s = x^323: (lts: + x^323) / (ltf[0]: + 1) = (quot: + x^323), rest 0
mdiv s = - x^325: (lts: - x^325) / (ltf[0]: + 1) = (quot: - x^325), rest 0
mdiv s = x^327: (lts: + x^327) / (ltf[0]: + 1) = (quot: + x^327), rest 0
mdiv s = - x^329: (lts: - x^329) / (ltf[0]: + 1) = (quot: - x^329), rest 0
mdiv s = x^331: (lts: + x^331) / (ltf[0]: + 1) = (quot: + x^331), rest 0
mdiv s = - x^333: (lts: - x^333) / (ltf[0]: + 1) = (quot: - x^333), rest 0
mdiv s = x^335: (lts: + x^335) / (ltf[0]: + 1) = (quot: + x^335), rest 0
mdiv s = - x^337: (lts: - x^337) / (ltf[0]: + 1) = (quot: - x^337), rest 0
mdiv s = x^339: (lts: + x^339) / (ltf[0]: + 1) = (quot: + x^339), rest 0
mdiv s = - x^341: (lts: - x^341) / (ltf[0]: + 1) = (quot: - x^341), rest 0
mdiv s = x^343: (lts: + x^343) / (ltf[0]: + 1) = (quot: + x^343), rest 0
mdiv s = - x^345: (lts: - x^345) / (ltf[0]: + 1) = (quot: - x^345), rest 0
mdiv s = x^347: (lts: + x^347) / (ltf[0]: + 1) = (quot: + x^347), rest 0
mdiv s = - x^349: (lts: - x^349) / (ltf[0]: + 1) = (quot: - x^349), rest 0
mdiv s = x^351: (lts: + x^351) / (ltf[0]: + 1) = (quot: + x^351), rest 0
mdiv s = - x^353: (lts: - x^353) / (ltf[0]: + 1) = (quot: - x^353), rest 0
mdiv s = x^355: (lts: + x^355) / (ltf[0]: + 1) = (quot: + x^355), rest 0
mdiv s = - x^357: (lts: - x^357) / (ltf[0]: + 1) = (quot: - x^357), rest 0
mdiv s = x^359: (lts: + x^359) / (ltf[0]: + 1) = (quot: + x^359), rest 0
mdiv s = - x^361: (lts: - x^361) / (ltf[0]: + 1) = (quot: - x^361), rest 0
mdiv s = x^363: (lts: + x^363) / (ltf[0]: + 1) = (quot: + x^363), rest 0
mdiv s = - x^365: (lts: - x^365) / (ltf[0]: + 1) = (quot: - x^365), rest 0
mdiv s = x^367: (lts: + x^367) / (ltf[0]: + 1) = (quot: + x^367), rest 0
mdiv s = - x^369: (lts: - x^369) / (ltf[0]: + 1) = (quot: - x^369), rest 0
mdiv s = x^371: (lts: + x^371) / (ltf[0]: + 1) = (quot: + x^371), rest 0
mdiv s = - x^373: (lts: - x^373) / (ltf[0]: + 1) = (quot: - x^373), rest 0
mdiv s = x^375: (lts: + x^375) / (ltf[0]: + 1) = (quot: + x^375), rest 0
mdiv s = - x^377: (lts: - x^377) / (ltf[0]: + 1) = (quot: - x^377), rest 0
mdiv s = x^379: (lts: + x^379) / (ltf[0]: + 1) = (quot: + x^379), rest 0
mdiv s = - x^381: (lts: - x^381) / (ltf[0]: + 1) = (quot: - x^381), rest 0
mdiv s = x^383: (lts: + x^383) / (ltf[0]: + 1) = (quot: + x^383), rest 0
mdiv s = - x^385: (lts: - x^385) / (ltf[0]: + 1) = (quot: - x^385), rest 0
mdiv s = x^387: (lts: + x^387) / (ltf[0]: + 1) = (quot: + x^387), rest 0
mdiv s = - x^389: (lts: - x^389) / (ltf[0]: + 1) = (quot: - x^389), rest 0
mdiv s = x^391: (lts: + x^391) / (ltf[0]: + 1) = (quot: + x^391), rest 0
mdiv s = - x^393: (lts: - x^393) / (ltf[0]: + 1) = (quot: - x^393), rest 0
mdiv s = x^395: (lts: + x^395) / (ltf[0]: + 1) = (quot: + x^395), rest 0
mdiv s = - x^397: (lts: - x^397) / (ltf[0]: + 1) = (quot: - x^397), rest 0
mdiv s = x^399: (lts: + x^399) / (ltf[0]: + 1) = (quot: + x^399), rest 0
mdiv s = - x^401: (lts: - x^401) / (ltf[0]: + 1) = (quot: - x^401), rest 0
mdiv s = x^403: (lts: + x^403) / (ltf[0]: + 1) = (quot: + x^403), rest 0
mdiv s = - x^405: (lts: - x^405) / (ltf[0]: + 1) = (quot: - x^405), rest 0
mdiv s = x^407: (lts: + x^407) / (ltf[0]: + 1) = (quot: + x^407), rest 0
mdiv s = - x^409: (lts: - x^409) / (ltf[0]: + 1) = (quot: - x^409), rest 0
mdiv s = x^411: (lts: + x^411) / (ltf[0]: + 1) = (quot: + x^411), rest 0
mdiv s = - x^413: (lts: - x^413) / (ltf[0]: + 1) = (quot: - x^413), rest 0
mdiv s = x^415: (lts: + x^415) / (ltf[0]: + 1) = (quot: + x^415), rest 0
mdiv s = - x^417: (lts: - x^417) / (ltf[0]: + 1) = (quot: - x^417), rest 0
mdiv s = x^419: (lts: + x^419) / (ltf[0]: + 1) = (quot: + x^419), rest 0
mdiv s = - x^421: (lts: - x^421) / (ltf[0]: + 1) = (quot: - x^421), rest 0
mdiv s = x^423: (lts: + x^423) / (ltf[0]: + 1) = (quot: + x^423), rest 0
mdiv s = - x^425: (lts: - x^425) / (ltf[0]: + 1) = (quot: - x^425), rest 0
mdiv s = x^427: (lts: + x^427) / (ltf[0]: + 1) = (quot: + x^427), rest 0
mdiv s = - x^429: (lts: - x^429) / (ltf[0]: + 1) = (quot: - x^429), rest 0
mdiv s = x^431: (lts: + x^431) / (ltf[0]: + 1) = (quot: + x^431), rest 0
mdiv s = - x^433: (lts: - x^433) / (ltf[0]: + 1) = (quot: - x^433), rest 0
mdiv s = x^435: (lts: + x^435) / (ltf[0]: + 1) = (quot: + x^435), rest 0
mdiv s = - x^437: (lts: - x^437) / (ltf[0]: + 1) = (quot: - x^437), rest 0
mdiv s = x^439: (lts: + x^439) / (ltf[0]: + 1) = (quot: + x^439), rest 0
mdiv s = - x^441: (lts: - x^441) / (ltf[0]: + 1) = (quot: - x^441), rest 0
mdiv s = x^443: (lts: + x^443) / (ltf[0]: + 1) = (quot: + x^443), rest 0
mdiv s = - x^445: (lts: - x^445) / (ltf[0]: + 1) = (quot: - x^445), rest 0
mdiv s = x^447: (lts: + x^447) / (ltf[0]: + 1) = (quot: + x^447), rest 0
mdiv s = - x^449: (lts: - x^449) / (ltf[0]: + 1) = (quot: - x^449), rest 0
mdiv s = x^451: (lts: + x^451) / (ltf[0]: + 1) = (quot: + x^451), rest 0
mdiv s = - x^453: (lts: - x^453) / (ltf[0]: + 1) = (quot: - x^453), rest 0
mdiv s = x^455: (lts: + x^455) / (ltf[0]: + 1) = (quot: + x^455), rest 0
mdiv s = - x^457: (lts: - x^457) / (ltf[0]: + 1) = (quot: - x^457), rest 0
mdiv s = x^459: (lts: + x^459) / (ltf[0]: + 1) = (quot: + x^459), rest 0
mdiv s = - x^461: (lts: - x^461) / (ltf[0]: + 1) = (quot: - x^461), rest 0
mdiv s = x^463: (lts: + x^463) / (ltf[0]: + 1) = (quot: + x^463), rest 0
mdiv s = - x^465: (lts: - x^465) / (ltf[0]: + 1) = (quot: - x^465), rest 0
mdiv s = x^467: (lts: + x^467) / (ltf[0]: + 1) = (quot: + x^467), rest 0
mdiv s = - x^469: (lts: - x^469) / (ltf[0]: + 1) = (quot: - x^469), rest 0
mdiv s = x^471: (lts: + x^471) / (ltf[0]: + 1) = (quot: + x^471), rest 0
mdiv s = - x^473: (lts: - x^473) / (ltf[0]: + 1) = (quot: - x^473), rest 0
mdiv s = x^475: (lts: + x^475) / (ltf[0]: + 1) = (quot: + x^475), rest 0
mdiv s = - x^477: (lts: - x^477) / (ltf[0]: + 1) = (quot: - x^477), rest 0
mdiv s = x^479: (lts: + x^479) / (ltf[0]: + 1) = (quot: + x^479), rest 0
mdiv s = - x^481: (lts: - x^481) / (ltf[0]: + 1) = (quot: - x^481), rest 0
mdiv s = x^483: (lts: + x^483) / (ltf[0]: + 1) = (quot: + x^483), rest 0
mdiv s = - x^485: (lts: - x^485) / (ltf[0]: + 1) = (quot: - x^485), rest 0
mdiv s = x^487: (lts: + x^487) / (ltf[0]: + 1) = (quot: + x^487), rest 0
mdiv s = - x^489: (lts: - x^489) / (ltf[0]: + 1) = (quot: - x^489), rest 0
mdiv s = x^491: (lts: + x^491) / (ltf[0]: + 1) = (quot: + x^491), rest 0
mdiv s = - x^493: (lts: - x^493) / (ltf[0]: + 1) = (quot: - x^493), rest 0
mdiv s = x^495: (lts: + x^495) / (ltf[0]: + 1) = (quot: + x^495), rest 0
mdiv s = - x^497: (lts: - x^497) / (ltf[0]: + 1) = (quot: - x^497), rest 0
mdiv s = x^499: (lts: + x^499) / (ltf[0]: + 1) = (quot: + x^499), rest 0
mdiv s = - x^501: (lts: - x^501) / (ltf[0]: + 1) = (quot: - x^501), rest 0
mdiv s = x^503: (lts: + x^503) / (ltf[0]: + 1) = (quot: + x^503), rest 0
mdiv s = - x^505: (lts: - x^505) / (ltf[0]: + 1) = (quot: - x^505), rest 0
mdiv s = x^507: (lts: + x^507) / (ltf[0]: + 1) = (quot: + x^507), rest 0
mdiv s = - x^509: (lts: - x^509) / (ltf[0]: + 1) = (quot: - x^509), rest 0
mdiv s = x^511: (lts: + x^511) / (ltf[0]: + 1) = (quot: + x^511), rest 0
mdiv s = - x^513: (lts: - x^513) / (ltf[0]: + 1) = (quot: - x^513), rest 0
mdiv s = x^515: (lts: + x^515) / (ltf[0]: + 1) = (quot: + x^515), rest 0
mdiv s = - x^517: (lts: - x^517) / (ltf[0]: + 1) = (quot: - x^517), rest 0
mdiv s = x^519: (lts: + x^519) / (ltf[0]: + 1) = (quot: + x^519), rest 0
mdiv s = - x^521: (lts: - x^521) / (ltf[0]: + 1) = (quot: - x^521), rest 0
mdiv s = x^523: (lts: + x^523) / (ltf[0]: + 1) = (quot: + x^523), rest 0
mdiv s = - x^525: (lts: - x^525) / (ltf[0]: + 1) = (quot: - x^525), rest 0
mdiv s = x^527: (lts: + x^527) / (ltf[0]: + 1) = (quot: + x^527), rest 0
mdiv s = - x^529: (lts: - x^529) / (ltf[0]: + 1) = (quot: - x^529), rest 0
mdiv s = x^531: (lts: + x^531) / (ltf[0]: + 1) = (quot: + x^531), rest 0
mdiv s = - x^533: (lts: - x^533) / (ltf[0]: + 1) = (quot: - x^533), rest 0
mdiv s = x^535: (lts: + x^535) / (ltf[0]: + 1) = (quot: + x^535), rest 0
mdiv s = - x^537: (lts: - x^537) / (ltf[0]: + 1) = (quot: - x^537), rest 0
mdiv s = x^539: (lts: + x^539) / (ltf[0]: + 1) = (quot: + x^539), rest 0
mdiv s = - x^541: (lts: - x^541) / (ltf[0]: + 1) = (quot: - x^541), rest 0
mdiv s = x^543: (lts: + x^543) / (ltf[0]: + 1) = (quot: + x^543), rest 0
mdiv s = - x^545: (lts: - x^545) / (ltf[0]: + 1) = (quot: - x^545), rest 0
mdiv s = x^547: (lts: + x^547) / (ltf[0]: + 1) = (quot: + x^547), rest 0
mdiv s = - x^549: (lts: - x^549) / (ltf[0]: + 1) = (quot: - x^549), rest 0
mdiv s = x^551: (lts: + x^551) / (ltf[0]: + 1) = (quot: + x^551), rest 0
mdiv s = - x^553: (lts: - x^553) / (ltf[0]: + 1) = (quot: - x^553), rest 0
mdiv s = x^555: (lts: + x^555) / (ltf[0]: + 1) = (quot: + x^555), rest 0
mdiv s = - x^557: (lts: - x^557) / (ltf[0]: + 1) = (quot: - x^557), rest 0
mdiv s = x^559: (lts: + x^559) / (ltf[0]: + 1) = (quot: + x^559), rest 0
mdiv s = - x^561: (lts: - x^561) / (ltf[0]: + 1) = (quot: - x^561), rest 0
mdiv s = x^563: (lts: + x^563) / (ltf[0]: + 1) = (quot: + x^563), rest 0
mdiv s = - x^565: (lts: - x^565) / (ltf[0]: + 1) = (quot: - x^565), rest 0
mdiv s = x^567: (lts: + x^567) / (ltf[0]: + 1) = (quot: + x^567), rest 0
mdiv s = - x^569: (lts: - x^569) / (ltf[0]: + 1) = (quot: - x^569), rest 0
mdiv s = x^571: (lts: + x^571) / (ltf[0]: + 1) = (quot: + x^571), rest 0
mdiv s = - x^573: (lts: - x^573) / (ltf[0]: + 1) = (quot: - x^573), rest 0
mdiv s = x^575: (lts: + x^575) / (ltf[0]: + 1) = (quot: + x^575), rest 0
mdiv s = - x^577: (lts: - x^577) / (ltf[0]: + 1) = (quot: - x^577), rest 0
mdiv s = x^579: (lts: + x^579) / (ltf[0]: + 1) = (quot: + x^579), rest 0
mdiv s = - x^581: (lts: - x^581) / (ltf[0]: + 1) = (quot: - x^581), rest 0
mdiv s = x^583: (lts: + x^583) / (ltf[0]: + 1) = (quot: + x^583), rest 0
mdiv s = - x^585: (lts: - x^585) / (ltf[0]: + 1) = (quot: - x^585), rest 0
mdiv s = x^587: (lts: + x^587) / (ltf[0]: + 1) = (quot: + x^587), rest 0
mdiv s = - x^589: (lts: - x^589) / (ltf[0]: + 1) = (quot: - x^589), rest 0
mdiv s = x^591: (lts: + x^591) / (ltf[0]: + 1) = (quot: + x^591), rest 0
mdiv s = - x^593: (lts: - x^593) / (ltf[0]: + 1) = (quot: - x^593), rest 0
mdiv s = x^595: (lts: + x^595) / (ltf[0]: + 1) = (quot: + x^595), rest 0
mdiv s = - x^597: (lts: - x^597) / (ltf[0]: + 1) = (quot: - x^597), rest 0
mdiv s = x^599: (lts: + x^599) / (ltf[0]: + 1) = (quot: + x^599), rest 0
mdiv s = - x^601: (lts: - x^601) / (ltf[0]: + 1) = (quot: - x^601), rest 0
mdiv s = x^603: (lts: + x^603) / (ltf[0]: + 1) = (quot: + x^603), rest 0
mdiv s = - x^605: (lts: - x^605) / (ltf[0]: + 1) = (quot: - x^605), rest 0
mdiv s = x^607: (lts: + x^607) / (ltf[0]: + 1) = (quot: + x^607), rest 0
mdiv s = - x^609: (lts: - x^609) / (ltf[0]: + 1) = (quot: - x^609), rest 0
mdiv s = x^611: (lts: + x^611) / (ltf[0]: + 1) = (quot: + x^611), rest 0
mdiv s = - x^613: (lts: - x^613) / (ltf[0]: + 1) = (quot: - x^613), rest 0
mdiv s = x^615: (lts: + x^615) / (ltf[0]: + 1) = (quot: + x^615), rest 0
mdiv s = - x^617: (lts: - x^617) / (ltf[0]: + 1) = (quot: - x^617), rest 0
mdiv s = x^619: (lts: + x^619) / (ltf[0]: + 1) = (quot: + x^619), rest 0
mdiv s = - x^621: (lts: - x^621) / (ltf[0]: + 1) = (quot: - x^621), rest 0
mdiv s = x^623: (lts: + x^623) / (ltf[0]: + 1) = (quot: + x^623), rest 0
mdiv s = - x^625: (lts: - x^625) / (ltf[0]: + 1) = (quot: - x^625), rest 0
mdiv s = x^627: (lts: + x^627) / (ltf[0]: + 1) = (quot: + x^627), rest 0
mdiv s = - x^629: (lts: - x^629) / (ltf[0]: + 1) = (quot: - x^629), rest 0
mdiv s = x^631: (lts: + x^631) / (ltf[0]: + 1) = (quot: + x^631), rest 0
mdiv s = - x^633: (lts: - x^633) / (ltf[0]: + 1) = (quot: - x^633), rest 0
mdiv s = x^635: (lts: + x^635) / (ltf[0]: + 1) = (quot: + x^635), rest 0
mdiv s = - x^637: (lts: - x^637) / (ltf[0]: + 1) = (quot: - x^637), rest 0
mdiv s = x^639: (lts: + x^639) / (ltf[0]: + 1) = (quot: + x^639), rest 0
mdiv s = - x^641: (lts: - x^641) / (ltf[0]: + 1) = (quot: - x^641), rest 0
mdiv s = x^643: (lts: + x^643) / (ltf[0]: + 1) = (quot: + x^643), rest 0
mdiv s = - x^645: (lts: - x^645) / (ltf[0]: + 1) = (quot: - x^645), rest 0
mdiv s = x^647: (lts: + x^647) / (ltf[0]: + 1) = (quot: + x^647), rest 0
mdiv s = - x^649: (lts: - x^649) / (ltf[0]: + 1) = (quot: - x^649), rest 0
mdiv s = x^651: (lts: + x^651) / (ltf[0]: + 1) = (quot: + x^651), rest 0
mdiv s = - x^653: (lts: - x^653) / (ltf[0]: + 1) = (quot: - x^653), rest 0
mdiv s = x^655: (lts: + x^655) / (ltf[0]: + 1) = (quot: + x^655), rest 0
mdiv s = - x^657: (lts: - x^657) / (ltf[0]: + 1) = (quot: - x^657), rest 0
mdiv s = x^659: (lts: + x^659) / (ltf[0]: + 1) = (quot: + x^659), rest 0
mdiv s = - x^661: (lts: - x^661) / (ltf[0]: + 1) = (quot: - x^661), rest 0
mdiv s = x^663: (lts: + x^663) / (ltf[0]: + 1) = (quot: + x^663), rest 0
mdiv s = - x^665: (lts: - x^665) / (ltf[0]: + 1) = (quot: - x^665), rest 0
mdiv s = x^667: (lts: + x^667) / (ltf[0]: + 1) = (quot: + x^667), rest 0
mdiv s = - x^669: (lts: - x^669) / (ltf[0]: + 1) = (quot: - x^669), rest 0
mdiv s = x^671: (lts: + x^671) / (ltf[0]: + 1) = (quot: + x^671), rest 0
mdiv s = - x^673: (lts: - x^673) / (ltf[0]: + 1) = (quot: - x^673), rest 0
mdiv s = x^675: (lts: + x^675) / (ltf[0]: + 1) = (quot: + x^675), rest 0
mdiv s = - x^677: (lts: - x^677) / (ltf[0]: + 1) = (quot: - x^677), rest 0
mdiv s = x^679: (lts: + x^679) / (ltf[0]: + 1) = (quot: + x^679), rest 0
mdiv s = - x^681: (lts: - x^681) / (ltf[0]: + 1) = (quot: - x^681), rest 0
mdiv s = x^683: (lts: + x^683) / (ltf[0]: + 1) = (quot: + x^683), rest 0
mdiv s = - x^685: (lts: - x^685) / (ltf[0]: + 1) = (quot: - x^685), rest 0
mdiv s = x^687: (lts: + x^687) / (ltf[0]: + 1) = (quot: + x^687), rest 0
mdiv s = - x^689: (lts: - x^689) / (ltf[0]: + 1) = (quot: - x^689), rest 0
mdiv s = x^691: (lts: + x^691) / (ltf[0]: + 1) = (quot: + x^691), rest 0
mdiv s = - x^693: (lts: - x^693) / (ltf[0]: + 1) = (quot: - x^693), rest 0
mdiv s = x^695: (lts: + x^695) / (ltf[0]: + 1) = (quot: + x^695), rest 0
mdiv s = - x^697: (lts: - x^697) / (ltf[0]: + 1) = (quot: - x^697), rest 0
mdiv s = x^699: (lts: + x^699) / (ltf[0]: + 1) = (quot: + x^699), rest 0
mdiv s = - x^701: (lts: - x^701) / (ltf[0]: + 1) = (quot: - x^701), rest 0
mdiv s = x^703: (lts: + x^703) / (ltf[0]: + 1) = (quot: + x^703), rest 0
mdiv s = - x^705: (lts: - x^705) / (ltf[0]: + 1) = (quot: - x^705), rest 0
mdiv s = x^707: (lts: + x^707) / (ltf[0]: + 1) = (quot: + x^707), rest 0
mdiv s = - x^709: (lts: - x^709) / (ltf[0]: + 1) = (quot: - x^709), rest 0
mdiv s = x^711: (lts: + x^711) / (ltf[0]: + 1) = (quot: + x^711), rest 0
mdiv s = - x^713: (lts: - x^713) / (ltf[0]: + 1) = (quot: - x^713), rest 0
mdiv s = x^715: (lts: + x^715) / (ltf[0]: + 1) = (quot: + x^715), rest 0
mdiv s = - x^717: (lts: - x^717) / (ltf[0]: + 1) = (quot: - x^717), rest 0
mdiv s = x^719: (lts: + x^719) / (ltf[0]: + 1) = (quot: + x^719), rest 0
mdiv s = - x^721: (lts: - x^721) / (ltf[0]: + 1) = (quot: - x^721), rest 0
mdiv s = x^723: (lts: + x^723) / (ltf[0]: + 1) = (quot: + x^723), rest 0
mdiv s = - x^725: (lts: - x^725) / (ltf[0]: + 1) = (quot: - x^725), rest 0
mdiv s = x^727: (lts: + x^727) / (ltf[0]: + 1) = (quot: + x^727), rest 0
mdiv s = - x^729: (lts: - x^729) / (ltf[0]: + 1) = (quot: - x^729), rest 0
mdiv s = x^731: (lts: + x^731) / (ltf[0]: + 1) = (quot: + x^731), rest 0
mdiv s = - x^733: (lts: - x^733) / (ltf[0]: + 1) = (quot: - x^733), rest 0
mdiv s = x^735: (lts: + x^735) / (ltf[0]: + 1) = (quot: + x^735), rest 0
mdiv s = - x^737: (lts: - x^737) / (ltf[0]: + 1) = (quot: - x^737), rest 0
mdiv s = x^739: (lts: + x^739) / (ltf[0]: + 1) = (quot: + x^739), rest 0
mdiv s = - x^741: (lts: - x^741) / (ltf[0]: + 1) = (quot: - x^741), rest 0
mdiv s = x^743: (lts: + x^743) / (ltf[0]: + 1) = (quot: + x^743), rest 0
mdiv s = - x^745: (lts: - x^745) / (ltf[0]: + 1) = (quot: - x^745), rest 0
mdiv s = x^747: (lts: + x^747) / (ltf[0]: + 1) = (quot: + x^747), rest 0
mdiv s = - x^749: (lts: - x^749) / (ltf[0]: + 1) = (quot: - x^749), rest 0
mdiv s = x^751: (lts: + x^751) / (ltf[0]: + 1) = (quot: + x^751), rest 0
mdiv s = - x^753: (lts: - x^753) / (ltf[0]: + 1) = (quot: - x^753), rest 0
mdiv s = x^755: (lts: + x^755) / (ltf[0]: + 1) = (quot: + x^755), rest 0
mdiv s = - x^757: (lts: - x^757) / (ltf[0]: + 1) = (quot: - x^757), rest 0
mdiv s = x^759: (lts: + x^759) / (ltf[0]: + 1) = (quot: + x^759), rest 0
mdiv s = - x^761: (lts: - x^761) / (ltf[0]: + 1) = (quot: - x^761), rest 0
mdiv s = x^763: (lts: + x^763) / (ltf[0]: + 1) = (quot: + x^763), rest 0
mdiv s = - x^765: (lts: - x^765) / (ltf[0]: + 1) = (quot: - x^765), rest 0
mdiv s = x^767: (lts: + x^767) / (ltf[0]: + 1) = (quot: + x^767), rest 0
mdiv s = - x^769: (lts: - x^769) / (ltf[0]: + 1) = (quot: - x^769), rest 0
mdiv s = x^771: (lts: + x^771) / (ltf[0]: + 1) = (quot: + x^771), rest 0
mdiv s = - x^773: (lts: - x^773) / (ltf[0]: + 1) = (quot: - x^773), rest 0
mdiv s = x^775: (lts: + x^775) / (ltf[0]: + 1) = (quot: + x^775), rest 0
mdiv s = - x^777: (lts: - x^777) / (ltf[0]: + 1) = (quot: - x^777), rest 0
mdiv s = x^779: (lts: + x^779) / (ltf[0]: + 1) = (quot: + x^779), rest 0
mdiv s = - x^781: (lts: - x^781) / (ltf[0]: + 1) = (quot: - x^781), rest 0
mdiv s = x^783: (lts: + x^783) / (ltf[0]: + 1) = (quot: + x^783), rest 0
mdiv s = - x^785: (lts: - x^785) / (ltf[0]: + 1) = (quot: - x^785), rest 0
mdiv s = x^787: (lts: + x^787) / (ltf[0]: + 1) = (quot: + x^787), rest 0
mdiv s = - x^789: (lts: - x^789) / (ltf[0]: + 1) = (quot: - x^789), rest 0
mdiv s = x^791: (lts: + x^791) / (ltf[0]: + 1) = (quot: + x^791), rest 0
mdiv s = - x^793: (lts: - x^793) / (ltf[0]: + 1) = (quot: - x^793), rest 0
mdiv s = x^795: (lts: + x^795) / (ltf[0]: + 1) = (quot: + x^795), rest 0
mdiv s = - x^797: (lts: - x^797) / (ltf[0]: + 1) = (quot: - x^797), rest 0
mdiv s = x^799: (lts: + x^799) / (ltf[0]: + 1) = (quot: + x^799), rest 0
mdiv s = - x^801: (lts: - x^801) / (ltf[0]: + 1) = (quot: - x^801), rest 0
mdiv s = x^803: (lts: + x^803) / (ltf[0]: + 1) = (quot: + x^803), rest 0
mdiv s = - x^805: (lts: - x^805) / (ltf[0]: + 1) = (quot: - x^805), rest 0
mdiv s = x^807: (lts: + x^807) / (ltf[0]: + 1) = (quot: + x^807), rest 0
mdiv s = - x^809: (lts: - x^809) / (ltf[0]: + 1) = (quot: - x^809), rest 0
mdiv s = x^811: (lts: + x^811) / (ltf[0]: + 1) = (quot: + x^811), rest 0
mdiv s = - x^813: (lts: - x^813) / (ltf[0]: + 1) = (quot: - x^813), rest 0
mdiv s = x^815: (lts: + x^815) / (ltf[0]: + 1) = (quot: + x^815), rest 0
mdiv s = - x^817: (lts: - x^817) / (ltf[0]: + 1) = (quot: - x^817), rest 0
mdiv s = x^819: (lts: + x^819) / (ltf[0]: + 1) = (quot: + x^819), rest 0
mdiv s = - x^821: (lts: - x^821) / (ltf[0]: + 1) = (quot: - x^821), rest 0
mdiv s = x^823: (lts: + x^823) / (ltf[0]: + 1) = (quot: + x^823), rest 0
mdiv s = - x^825: (lts: - x^825) / (ltf[0]: + 1) = (quot: - x^825), rest 0
mdiv s = x^827: (lts: + x^827) / (ltf[0]: + 1) = (quot: + x^827), rest 0
mdiv s = - x^829: (lts: - x^829) / (ltf[0]: + 1) = (quot: - x^829), rest 0
mdiv s = x^831: (lts: + x^831) / (ltf[0]: + 1) = (quot: + x^831), rest 0
mdiv s = - x^833: (lts: - x^833) / (ltf[0]: + 1) = (quot: - x^833), rest 0
mdiv s = x^835: (lts: + x^835) / (ltf[0]: + 1) = (quot: + x^835), rest 0
mdiv s = - x^837: (lts: - x^837) / (ltf[0]: + 1) = (quot: - x^837), rest 0
mdiv s = x^839: (lts: + x^839) / (ltf[0]: + 1) = (quot: + x^839), rest 0
mdiv s = - x^841: (lts: - x^841) / (ltf[0]: + 1) = (quot: - x^841), rest 0
mdiv s = x^843: (lts: + x^843) / (ltf[0]: + 1) = (quot: + x^843), rest 0
mdiv s = - x^845: (lts: - x^845) / (ltf[0]: + 1) = (quot: - x^845), rest 0
mdiv s = x^847: (lts: + x^847) / (ltf[0]: + 1) = (quot: + x^847), rest 0
mdiv s = - x^849: (lts: - x^849) / (ltf[0]: + 1) = (quot: - x^849), rest 0
mdiv s = x^851: (lts: + x^851) / (ltf[0]: + 1) = (quot: + x^851), rest 0
mdiv s = - x^853: (lts: - x^853) / (ltf[0]: + 1) = (quot: - x^853), rest 0
mdiv s = x^855: (lts: + x^855) / (ltf[0]: + 1) = (quot: + x^855), rest 0
mdiv s = - x^857: (lts: - x^857) / (ltf[0]: + 1) = (quot: - x^857), rest 0
mdiv s = x^859: (lts: + x^859) / (ltf[0]: + 1) = (quot: + x^859), rest 0
mdiv s = - x^861: (lts: - x^861) / (ltf[0]: + 1) = (quot: - x^861), rest 0
mdiv s = x^863: (lts: + x^863) / (ltf[0]: + 1) = (quot: + x^863), rest 0
mdiv s = - x^865: (lts: - x^865) / (ltf[0]: + 1) = (quot: - x^865), rest 0
mdiv s = x^867: (lts: + x^867) / (ltf[0]: + 1) = (quot: + x^867), rest 0
mdiv s = - x^869: (lts: - x^869) / (ltf[0]: + 1) = (quot: - x^869), rest 0
mdiv s = x^871: (lts: + x^871) / (ltf[0]: + 1) = (quot: + x^871), rest 0
mdiv s = - x^873: (lts: - x^873) / (ltf[0]: + 1) = (quot: - x^873), rest 0
mdiv s = x^875: (lts: + x^875) / (ltf[0]: + 1) = (quot: + x^875), rest 0
mdiv s = - x^877: (lts: - x^877) / (ltf[0]: + 1) = (quot: - x^877), rest 0
mdiv s = x^879: (lts: + x^879) / (ltf[0]: + 1) = (quot: + x^879), rest 0
mdiv s = - x^881: (lts: - x^881) / (ltf[0]: + 1) = (quot: - x^881), rest 0
mdiv s = x^883: (lts: + x^883) / (ltf[0]: + 1) = (quot: + x^883), rest 0
mdiv s = - x^885: (lts: - x^885) / (ltf[0]: + 1) = (quot: - x^885), rest 0
mdiv s = x^887: (lts: + x^887) / (ltf[0]: + 1) = (quot: + x^887), rest 0
mdiv s = - x^889: (lts: - x^889) / (ltf[0]: + 1) = (quot: - x^889), rest 0
mdiv s = x^891: (lts: + x^891) / (ltf[0]: + 1) = (quot: + x^891), rest 0
mdiv s = - x^893: (lts: - x^893) / (ltf[0]: + 1) = (quot: - x^893), rest 0
mdiv s = x^895: (lts: + x^895) / (ltf[0]: + 1) = (quot: + x^895), rest 0
mdiv s = - x^897: (lts: - x^897) / (ltf[0]: + 1) = (quot: - x^897), rest 0
mdiv s = x^899: (lts: + x^899) / (ltf[0]: + 1) = (quot: + x^899), rest 0
mdiv s = - x^901: (lts: - x^901) / (ltf[0]: + 1) = (quot: - x^901), rest 0
mdiv s = x^903: (lts: + x^903) / (ltf[0]: + 1) = (quot: + x^903), rest 0
mdiv s = - x^905: (lts: - x^905) / (ltf[0]: + 1) = (quot: - x^905), rest 0
mdiv s = x^907: (lts: + x^907) / (ltf[0]: + 1) = (quot: + x^907), rest 0
mdiv s = - x^909: (lts: - x^909) / (ltf[0]: + 1) = (quot: - x^909), rest 0
mdiv s = x^911: (lts: + x^911) / (ltf[0]: + 1) = (quot: + x^911), rest 0
mdiv s = - x^913: (lts: - x^913) / (ltf[0]: + 1) = (quot: - x^913), rest 0
mdiv s = x^915: (lts: + x^915) / (ltf[0]: + 1) = (quot: + x^915), rest 0
mdiv s = - x^917: (lts: - x^917) / (ltf[0]: + 1) = (quot: - x^917), rest 0
mdiv s = x^919: (lts: + x^919) / (ltf[0]: + 1) = (quot: + x^919), rest 0
mdiv s = - x^921: (lts: - x^921) / (ltf[0]: + 1) = (quot: - x^921), rest 0
mdiv s = x^923: (lts: + x^923) / (ltf[0]: + 1) = (quot: + x^923), rest 0
mdiv s = - x^925: (lts: - x^925) / (ltf[0]: + 1) = (quot: - x^925), rest 0
mdiv s = x^927: (lts: + x^927) / (ltf[0]: + 1) = (quot: + x^927), rest 0
mdiv s = - x^929: (lts: - x^929) / (ltf[0]: + 1) = (quot: - x^929), rest 0
mdiv s = x^931: (lts: + x^931) / (ltf[0]: + 1) = (quot: + x^931), rest 0
mdiv s = - x^933: (lts: - x^933) / (ltf[0]: + 1) = (quot: - x^933), rest 0
mdiv s = x^935: (lts: + x^935) / (ltf[0]: + 1) = (quot: + x^935), rest 0
mdiv s = - x^937: (lts: - x^937) / (ltf[0]: + 1) = (quot: - x^937), rest 0
mdiv s = x^939: (lts: + x^939) / (ltf[0]: + 1) = (quot: + x^939), rest 0
mdiv s = - x^941: (lts: - x^941) / (ltf[0]: + 1) = (quot: - x^941), rest 0
mdiv s = x^943: (lts: + x^943) / (ltf[0]: + 1) = (quot: + x^943), rest 0
mdiv s = - x^945: (lts: - x^945) / (ltf[0]: + 1) = (quot: - x^945), rest 0
mdiv s = x^947: (lts: + x^947) / (ltf[0]: + 1) = (quot: + x^947), rest 0
mdiv s = - x^949: (lts: - x^949) / (ltf[0]: + 1) = (quot: - x^949), rest 0
mdiv s = x^951: (lts: + x^951) / (ltf[0]: + 1) = (quot: + x^951), rest 0
mdiv s = - x^953: (lts: - x^953) / (ltf[0]: + 1) = (quot: - x^953), rest 0
mdiv s = x^955: (lts: + x^955) / (ltf[0]: + 1) = (quot: + x^955), rest 0
mdiv s = - x^957: (lts: - x^957) / (ltf[0]: + 1) = (quot: - x^957), rest 0
mdiv s = x^959: (lts: + x^959) / (ltf[0]: + 1) = (quot: + x^959), rest 0
mdiv s = - x^961: (lts: - x^961) / (ltf[0]: + 1) = (quot: - x^961), rest 0
mdiv s = x^963: (lts: + x^963) / (ltf[0]: + 1) = (quot: + x^963), rest 0
mdiv s = - x^965: (lts: - x^965) / (ltf[0]: + 1) = (quot: - x^965), rest 0
mdiv s = x^967: (lts: + x^967) / (ltf[0]: + 1) = (quot: + x^967), rest 0
mdiv s = - x^969: (lts: - x^969) / (ltf[0]: + 1) = (quot: - x^969), rest 0
mdiv s = x^971: (lts: + x^971) / (ltf[0]: + 1) = (quot: + x^971), rest 0
mdiv s = - x^973: (lts: - x^973) / (ltf[0]: + 1) = (quot: - x^973), rest 0
mdiv s = x^975: (lts: + x^975) / (ltf[0]: + 1) = (quot: + x^975), rest 0
mdiv s = - x^977: (lts: - x^977) / (ltf[0]: + 1) = (quot: - x^977), rest 0
mdiv s = x^979: (lts: + x^979) / (ltf[0]: + 1) = (quot: + x^979), rest 0
mdiv s = - x^981: (lts: - x^981) / (ltf[0]: + 1) = (quot: - x^981), rest 0
mdiv s = x^983: (lts: + x^983) / (ltf[0]: + 1) = (quot: + x^983), rest 0
mdiv s = - x^985: (lts: - x^985) / (ltf[0]: + 1) = (quot: - x^985), rest 0
mdiv s = x^987: (lts: + x^987) / (ltf[0]: + 1) = (quot: + x^987), rest 0
mdiv s = - x^989: (lts: - x^989) / (ltf[0]: + 1) = (quot: - x^989), rest 0
mdiv s = x^991: (lts: + x^991) / (ltf[0]: + 1) = (quot: + x^991), rest 0
mdiv s = - x^993: (lts: - x^993) / (ltf[0]: + 1) = (quot: - x^993), rest 0
mdiv s = x^995: (lts: + x^995) / (ltf[0]: + 1) = (quot: + x^995), rest 0
mdiv s = - x^997: (lts: - x^997) / (ltf[0]: + 1) = (quot: - x^997), rest 0
mdiv s = x^999: (lts: + x^999) / (ltf[0]: + 1) = (quot: + x^999), rest 0
mdiv s = - x^1001: (lts: - x^1001) / (ltf[0]: + 1) = (quot: - x^1001), rest 0
mdiv s = x^1003: (lts: + x^1003) / (ltf[0]: + 1) = (quot: + x^1003), rest 0
mdiv s = - x^1005: (lts: - x^1005) / (ltf[0]: + 1) = (quot: - x^1005), rest 0
mdiv s = x^1007: (lts: + x^1007) / (ltf[0]: + 1) = (quot: + x^1007), rest 0
mdiv s = - x^1009: (lts: - x^1009) / (ltf[0]: + 1) = (quot: - x^1009), rest 0
mdiv s = x^1011: (lts: + x^1011) / (ltf[0]: + 1) = (quot: + x^1011), rest 0
mdiv s = - x^1013: (lts: - x^1013) / (ltf[0]: + 1) = (quot: - x^1013), rest 0
mdiv s = x^1015: (lts: + x^1015) / (ltf[0]: + 1) = (quot: + x^1015), rest 0
mdiv s = - x^1017: (lts: - x^1017) / (ltf[0]: + 1) = (quot: - x^1017), rest 0
mdiv s = x^1019: (lts: + x^1019) / (ltf[0]: + 1) = (quot: + x^1019), rest 0
mdiv s = - x^1021: (lts: - x^1021) / (ltf[0]: + 1) = (quot: - x^1021), rest 0
mdiv s = x^1023: (lts: + x^1023) / (ltf[0]: + 1) = (quot: + x^1023), rest 0
mdiv s = - x^1025: (lts: - x^1025) / (ltf[0]: + 1) = (quot: - x^1025), rest 0
mdiv s = x^1027: (lts: + x^1027) / (ltf[0]: + 1) = (quot: + x^1027), rest 0
infinite loop in (x^3).multiDivide(...)
multipleDivide: x^3 = + (x^3 - x^5 + x^7 - x^9 + x^11 - x^13 + x^15 - x^257 + x^259 - x^261 + x^263 - x^265 + x^267 - x^269 + x^271 - x^17 - x^273 + x^275 - x^277 + x^279 - x^281 + x^283 - x^285 + x^287 - x^289 + x^291 - x^293 + x^295 - x^297 + x^299 - x^301 + x^303 + x^19 - x^305 + x^307 - x^309 + x^311 - x^313 + x^315 - x^317 + x^319 - x^321 + x^323 - x^325 + x^327 - x^329 + x^331 - x^333 + x^335 - x^21 - x^337 + x^339 - x^341 + x^343 - x^345 + x^347 - x^349 + x^351 - x^353 + x^355 - x^357 + x^359 - x^361 + x^363 - x^365 + x^367 + x^23 - x^369 + x^371 - x^373 + x^375 - x^377 + x^379 - x^381 + x^383 - x^385 + x^387 - x^389 + x^391 - x^393 + x^395 - x^397 + x^399 - x^25 - x^401 + x^403 - x^405 + x^407 - x^409 + x^411 - x^413 + x^415 - x^417 + x^419 - x^421 + x^423 - x^425 + x^427 - x^429 + x^431 + x^27 - x^433 + x^435 - x^437 + x^439 - x^441 + x^443 - x^445 + x^447 - x^449 + x^451 - x^453 + x^455 - x^457 + x^459 - x^461 + x^463 - x^29 - x^465 + x^467 - x^469 + x^471 - x^473 + x^475 - x^477 + x^479 - x^481 + x^483 - x^485 + x^487 - x^489 + x^491 - x^493 + x^495 + x^31 - x^497 + x^499 - x^501 + x^503 - x^505 + x^507 - x^509 + x^511 - x^513 + x^515 - x^517 + x^519 - x^521 + x^523 - x^525 + x^527 - x^33 - x^529 + x^531 - x^533 + x^535 - x^537 + x^539 - x^541 + x^543 - x^545 + x^547 - x^549 + x^551 - x^553 + x^555 - x^557 + x^559 + x^35 - x^561 + x^563 - x^565 + x^567 - x^569 + x^571 - x^573 + x^575 - x^577 + x^579 - x^581 + x^583 - x^585 + x^587 - x^589 + x^591 - x^37 - x^593 + x^595 - x^597 + x^599 - x^601 + x^603 - x^605 + x^607 - x^609 + x^611 - x^613 + x^615 - x^617 + x^619 - x^621 + x^623 + x^39 - x^625 + x^627 - x^629 + x^631 - x^633 + x^635 - x^637 + x^639 - x^641 + x^643 - x^645 + x^647 - x^649 + x^651 - x^653 + x^655 - x^41 - x^657 + x^659 - x^661 + x^663 - x^665 + x^667 - x^669 + x^671 - x^673 + x^675 - x^677 + x^679 - x^681 + x^683 - x^685 + x^687 + x^43 - x^689 + x^691 - x^693 + x^695 - x^697 + x^699 - x^701 + x^703 - x^705 + x^707 - x^709 + x^711 - x^713 + x^715 - x^717 + x^719 - x^45 - x^721 + x^723 - x^725 + x^727 - x^729 + x^731 - x^733 + x^735 - x^737 + x^739 - x^741 + x^743 - x^745 + x^747 - x^749 + x^751 + x^47 - x^753 + x^755 - x^757 + x^759 - x^761 + x^763 - x^765 + x^767 - x^769 + x^771 - x^773 + x^775 - x^777 + x^779 - x^781 + x^783 - x^49 - x^785 + x^787 - x^789 + x^791 - x^793 + x^795 - x^797 + x^799 - x^801 + x^803 - x^805 + x^807 - x^809 + x^811 - x^813 + x^815 + x^51 - x^817 + x^819 - x^821 + x^823 - x^825 + x^827 - x^829 + x^831 - x^833 + x^835 - x^837 + x^839 - x^841 + x^843 - x^845 + x^847 - x^53 - x^849 + x^851 - x^853 + x^855 - x^857 + x^859 - x^861 + x^863 - x^865 + x^867 - x^869 + x^871 - x^873 + x^875 - x^877 + x^879 + x^55 - x^881 + x^883 - x^885 + x^887 - x^889 + x^891 - x^893 + x^895 - x^897 + x^899 - x^901 + x^903 - x^905 + x^907 - x^909 + x^911 - x^57 - x^913 + x^915 - x^917 + x^919 - x^921 + x^923 - x^925 + x^927 - x^929 + x^931 - x^933 + x^935 - x^937 + x^939 - x^941 + x^943 + x^59 - x^945 + x^947 - x^949 + x^951 - x^953 + x^955 - x^957 + x^959 - x^961 + x^963 - x^965 + x^967 - x^969 + x^971 - x^973 + x^975 - x^61 - x^977 + x^979 - x^981 + x^983 - x^985 + x^987 - x^989 + x^991 - x^993 + x^995 - x^997 + x^999 - x^1001 + x^1003 - x^1005 + x^1007 + x^63 - x^1009 + x^1011 - x^1013 + x^1015 - x^1017 + x^1019 - x^1021 + x^1023 - x^1025 + x^1027 - x^65 + x^67 - x^69 + x^71 - x^73 + x^75 - x^77 + x^79 - x^81 + x^83 - x^85 + x^87 - x^89 + x^91 - x^93 + x^95 - x^97 + x^99 - x^101 + x^103 - x^105 + x^107 - x^109 + x^111 - x^113 + x^115 - x^117 + x^119 - x^121 + x^123 - x^125 + x^127 - x^129 + x^131 - x^133 + x^135 - x^137 + x^139 - x^141 + x^143 - x^145 + x^147 - x^149 + x^151 - x^153 + x^155 - x^157 + x^159 - x^161 + x^163 - x^165 + x^167 - x^169 + x^171 - x^173 + x^175 - x^177 + x^179 - x^181 + x^183 - x^185 + x^187 - x^189 + x^191 - x^193 + x^195 - x^197 + x^199 - x^201 + x^203 - x^205 + x^207 - x^209 + x^211 - x^213 + x^215 - x^217 + x^219 - x^221 + x^223 - x^225 + x^227 - x^229 + x^231 - x^233 + x^235 - x^237 + x^239 - x^241 + x^243 - x^245 + x^247 - x^249 + x^251 - x^253 + x^255) * (x^2 + 1) + [Rest = 0]
mdiv s = - x^3: (lts: - x^3) / (ltf[0]: + 1) = (quot: - x^3), rest 0
mdiv s = x^5: (lts: + x^5) / (ltf[0]: + 1) = (quot: + x^5), rest 0
mdiv s = - x^7: (lts: - x^7) / (ltf[0]: + 1) = (quot: - x^7), rest 0
mdiv s = x^9: (lts: + x^9) / (ltf[0]: + 1) = (quot: + x^9), rest 0
mdiv s = - x^11: (lts: - x^11) / (ltf[0]: + 1) = (quot: - x^11), rest 0
mdiv s = x^13: (lts: + x^13) / (ltf[0]: + 1) = (quot: + x^13), rest 0
mdiv s = - x^15: (lts: - x^15) / (ltf[0]: + 1) = (quot: - x^15), rest 0
mdiv s = x^17: (lts: + x^17) / (ltf[0]: + 1) = (quot: + x^17), rest 0
mdiv s = - x^19: (lts: - x^19) / (ltf[0]: + 1) = (quot: - x^19), rest 0
mdiv s = x^21: (lts: + x^21) / (ltf[0]: + 1) = (quot: + x^21), rest 0
mdiv s = - x^23: (lts: - x^23) / (ltf[0]: + 1) = (quot: - x^23), rest 0
mdiv s = x^25: (lts: + x^25) / (ltf[0]: + 1) = (quot: + x^25), rest 0
mdiv s = - x^27: (lts: - x^27) / (ltf[0]: + 1) = (quot: - x^27), rest 0
mdiv s = x^29: (lts: + x^29) / (ltf[0]: + 1) = (quot: + x^29), rest 0
mdiv s = - x^31: (lts: - x^31) / (ltf[0]: + 1) = (quot: - x^31), rest 0
mdiv s = x^33: (lts: + x^33) / (ltf[0]: + 1) = (quot: + x^33), rest 0
mdiv s = - x^35: (lts: - x^35) / (ltf[0]: + 1) = (quot: - x^35), rest 0
mdiv s = x^37: (lts: + x^37) / (ltf[0]: + 1) = (quot: + x^37), rest 0
mdiv s = - x^39: (lts: - x^39) / (ltf[0]: + 1) = (quot: - x^39), rest 0
mdiv s = x^41: (lts: + x^41) / (ltf[0]: + 1) = (quot: + x^41), rest 0
mdiv s = - x^43: (lts: - x^43) / (ltf[0]: + 1) = (quot: - x^43), rest 0
mdiv s = x^45: (lts: + x^45) / (ltf[0]: + 1) = (quot: + x^45), rest 0
mdiv s = - x^47: (lts: - x^47) / (ltf[0]: + 1) = (quot: - x^47), rest 0
mdiv s = x^49: (lts: + x^49) / (ltf[0]: + 1) = (quot: + x^49), rest 0
mdiv s = - x^51: (lts: - x^51) / (ltf[0]: + 1) = (quot: - x^51), rest 0
mdiv s = x^53: (lts: + x^53) / (ltf[0]: + 1) = (quot: + x^53), rest 0
mdiv s = - x^55: (lts: - x^55) / (ltf[0]: + 1) = (quot: - x^55), rest 0
mdiv s = x^57: (lts: + x^57) / (ltf[0]: + 1) = (quot: + x^57), rest 0
mdiv s = - x^59: (lts: - x^59) / (ltf[0]: + 1) = (quot: - x^59), rest 0
mdiv s = x^61: (lts: + x^61) / (ltf[0]: + 1) = (quot: + x^61), rest 0
mdiv s = - x^63: (lts: - x^63) / (ltf[0]: + 1) = (quot: - x^63), rest 0
mdiv s = x^65: (lts: + x^65) / (ltf[0]: + 1) = (quot: + x^65), rest 0
mdiv s = - x^67: (lts: - x^67) / (ltf[0]: + 1) = (quot: - x^67), rest 0
mdiv s = x^69: (lts: + x^69) / (ltf[0]: + 1) = (quot: + x^69), rest 0
mdiv s = - x^71: (lts: - x^71) / (ltf[0]: + 1) = (quot: - x^71), rest 0
mdiv s = x^73: (lts: + x^73) / (ltf[0]: + 1) = (quot: + x^73), rest 0
mdiv s = - x^75: (lts: - x^75) / (ltf[0]: + 1) = (quot: - x^75), rest 0
mdiv s = x^77: (lts: + x^77) / (ltf[0]: + 1) = (quot: + x^77), rest 0
mdiv s = - x^79: (lts: - x^79) / (ltf[0]: + 1) = (quot: - x^79), rest 0
mdiv s = x^81: (lts: + x^81) / (ltf[0]: + 1) = (quot: + x^81), rest 0
mdiv s = - x^83: (lts: - x^83) / (ltf[0]: + 1) = (quot: - x^83), rest 0
mdiv s = x^85: (lts: + x^85) / (ltf[0]: + 1) = (quot: + x^85), rest 0
mdiv s = - x^87: (lts: - x^87) / (ltf[0]: + 1) = (quot: - x^87), rest 0
mdiv s = x^89: (lts: + x^89) / (ltf[0]: + 1) = (quot: + x^89), rest 0
mdiv s = - x^91: (lts: - x^91) / (ltf[0]: + 1) = (quot: - x^91), rest 0
mdiv s = x^93: (lts: + x^93) / (ltf[0]: + 1) = (quot: + x^93), rest 0
mdiv s = - x^95: (lts: - x^95) / (ltf[0]: + 1) = (quot: - x^95), rest 0
mdiv s = x^97: (lts: + x^97) / (ltf[0]: + 1) = (quot: + x^97), rest 0
mdiv s = - x^99: (lts: - x^99) / (ltf[0]: + 1) = (quot: - x^99), rest 0
mdiv s = x^101: (lts: + x^101) / (ltf[0]: + 1) = (quot: + x^101), rest 0
mdiv s = - x^103: (lts: - x^103) / (ltf[0]: + 1) = (quot: - x^103), rest 0
mdiv s = x^105: (lts: + x^105) / (ltf[0]: + 1) = (quot: + x^105), rest 0
mdiv s = - x^107: (lts: - x^107) / (ltf[0]: + 1) = (quot: - x^107), rest 0
mdiv s = x^109: (lts: + x^109) / (ltf[0]: + 1) = (quot: + x^109), rest 0
mdiv s = - x^111: (lts: - x^111) / (ltf[0]: + 1) = (quot: - x^111), rest 0
mdiv s = x^113: (lts: + x^113) / (ltf[0]: + 1) = (quot: + x^113), rest 0
mdiv s = - x^115: (lts: - x^115) / (ltf[0]: + 1) = (quot: - x^115), rest 0
mdiv s = x^117: (lts: + x^117) / (ltf[0]: + 1) = (quot: + x^117), rest 0
mdiv s = - x^119: (lts: - x^119) / (ltf[0]: + 1) = (quot: - x^119), rest 0
mdiv s = x^121: (lts: + x^121) / (ltf[0]: + 1) = (quot: + x^121), rest 0
mdiv s = - x^123: (lts: - x^123) / (ltf[0]: + 1) = (quot: - x^123), rest 0
mdiv s = x^125: (lts: + x^125) / (ltf[0]: + 1) = (quot: + x^125), rest 0
mdiv s = - x^127: (lts: - x^127) / (ltf[0]: + 1) = (quot: - x^127), rest 0
mdiv s = x^129: (lts: + x^129) / (ltf[0]: + 1) = (quot: + x^129), rest 0
mdiv s = - x^131: (lts: - x^131) / (ltf[0]: + 1) = (quot: - x^131), rest 0
mdiv s = x^133: (lts: + x^133) / (ltf[0]: + 1) = (quot: + x^133), rest 0
mdiv s = - x^135: (lts: - x^135) / (ltf[0]: + 1) = (quot: - x^135), rest 0
mdiv s = x^137: (lts: + x^137) / (ltf[0]: + 1) = (quot: + x^137), rest 0
mdiv s = - x^139: (lts: - x^139) / (ltf[0]: + 1) = (quot: - x^139), rest 0
mdiv s = x^141: (lts: + x^141) / (ltf[0]: + 1) = (quot: + x^141), rest 0
mdiv s = - x^143: (lts: - x^143) / (ltf[0]: + 1) = (quot: - x^143), rest 0
mdiv s = x^145: (lts: + x^145) / (ltf[0]: + 1) = (quot: + x^145), rest 0
mdiv s = - x^147: (lts: - x^147) / (ltf[0]: + 1) = (quot: - x^147), rest 0
mdiv s = x^149: (lts: + x^149) / (ltf[0]: + 1) = (quot: + x^149), rest 0
mdiv s = - x^151: (lts: - x^151) / (ltf[0]: + 1) = (quot: - x^151), rest 0
mdiv s = x^153: (lts: + x^153) / (ltf[0]: + 1) = (quot: + x^153), rest 0
mdiv s = - x^155: (lts: - x^155) / (ltf[0]: + 1) = (quot: - x^155), rest 0
mdiv s = x^157: (lts: + x^157) / (ltf[0]: + 1) = (quot: + x^157), rest 0
mdiv s = - x^159: (lts: - x^159) / (ltf[0]: + 1) = (quot: - x^159), rest 0
mdiv s = x^161: (lts: + x^161) / (ltf[0]: + 1) = (quot: + x^161), rest 0
mdiv s = - x^163: (lts: - x^163) / (ltf[0]: + 1) = (quot: - x^163), rest 0
mdiv s = x^165: (lts: + x^165) / (ltf[0]: + 1) = (quot: + x^165), rest 0
mdiv s = - x^167: (lts: - x^167) / (ltf[0]: + 1) = (quot: - x^167), rest 0
mdiv s = x^169: (lts: + x^169) / (ltf[0]: + 1) = (quot: + x^169), rest 0
mdiv s = - x^171: (lts: - x^171) / (ltf[0]: + 1) = (quot: - x^171), rest 0
mdiv s = x^173: (lts: + x^173) / (ltf[0]: + 1) = (quot: + x^173), rest 0
mdiv s = - x^175: (lts: - x^175) / (ltf[0]: + 1) = (quot: - x^175), rest 0
mdiv s = x^177: (lts: + x^177) / (ltf[0]: + 1) = (quot: + x^177), rest 0
mdiv s = - x^179: (lts: - x^179) / (ltf[0]: + 1) = (quot: - x^179), rest 0
mdiv s = x^181: (lts: + x^181) / (ltf[0]: + 1) = (quot: + x^181), rest 0
mdiv s = - x^183: (lts: - x^183) / (ltf[0]: + 1) = (quot: - x^183), rest 0
mdiv s = x^185: (lts: + x^185) / (ltf[0]: + 1) = (quot: + x^185), rest 0
mdiv s = - x^187: (lts: - x^187) / (ltf[0]: + 1) = (quot: - x^187), rest 0
mdiv s = x^189: (lts: + x^189) / (ltf[0]: + 1) = (quot: + x^189), rest 0
mdiv s = - x^191: (lts: - x^191) / (ltf[0]: + 1) = (quot: - x^191), rest 0
mdiv s = x^193: (lts: + x^193) / (ltf[0]: + 1) = (quot: + x^193), rest 0
mdiv s = - x^195: (lts: - x^195) / (ltf[0]: + 1) = (quot: - x^195), rest 0
mdiv s = x^197: (lts: + x^197) / (ltf[0]: + 1) = (quot: + x^197), rest 0
mdiv s = - x^199: (lts: - x^199) / (ltf[0]: + 1) = (quot: - x^199), rest 0
mdiv s = x^201: (lts: + x^201) / (ltf[0]: + 1) = (quot: + x^201), rest 0
mdiv s = - x^203: (lts: - x^203) / (ltf[0]: + 1) = (quot: - x^203), rest 0
mdiv s = x^205: (lts: + x^205) / (ltf[0]: + 1) = (quot: + x^205), rest 0
mdiv s = - x^207: (lts: - x^207) / (ltf[0]: + 1) = (quot: - x^207), rest 0
mdiv s = x^209: (lts: + x^209) / (ltf[0]: + 1) = (quot: + x^209), rest 0
mdiv s = - x^211: (lts: - x^211) / (ltf[0]: + 1) = (quot: - x^211), rest 0
mdiv s = x^213: (lts: + x^213) / (ltf[0]: + 1) = (quot: + x^213), rest 0
mdiv s = - x^215: (lts: - x^215) / (ltf[0]: + 1) = (quot: - x^215), rest 0
mdiv s = x^217: (lts: + x^217) / (ltf[0]: + 1) = (quot: + x^217), rest 0
mdiv s = - x^219: (lts: - x^219) / (ltf[0]: + 1) = (quot: - x^219), rest 0
mdiv s = x^221: (lts: + x^221) / (ltf[0]: + 1) = (quot: + x^221), rest 0
mdiv s = - x^223: (lts: - x^223) / (ltf[0]: + 1) = (quot: - x^223), rest 0
mdiv s = x^225: (lts: + x^225) / (ltf[0]: + 1) = (quot: + x^225), rest 0
mdiv s = - x^227: (lts: - x^227) / (ltf[0]: + 1) = (quot: - x^227), rest 0
mdiv s = x^229: (lts: + x^229) / (ltf[0]: + 1) = (quot: + x^229), rest 0
mdiv s = - x^231: (lts: - x^231) / (ltf[0]: + 1) = (quot: - x^231), rest 0
mdiv s = x^233: (lts: + x^233) / (ltf[0]: + 1) = (quot: + x^233), rest 0
mdiv s = - x^235: (lts: - x^235) / (ltf[0]: + 1) = (quot: - x^235), rest 0
mdiv s = x^237: (lts: + x^237) / (ltf[0]: + 1) = (quot: + x^237), rest 0
mdiv s = - x^239: (lts: - x^239) / (ltf[0]: + 1) = (quot: - x^239), rest 0
mdiv s = x^241: (lts: + x^241) / (ltf[0]: + 1) = (quot: + x^241), rest 0
mdiv s = - x^243: (lts: - x^243) / (ltf[0]: + 1) = (quot: - x^243), rest 0
mdiv s = x^245: (lts: + x^245) / (ltf[0]: + 1) = (quot: + x^245), rest 0
mdiv s = - x^247: (lts: - x^247) / (ltf[0]: + 1) = (quot: - x^247), rest 0
mdiv s = x^249: (lts: + x^249) / (ltf[0]: + 1) = (quot: + x^249), rest 0
mdiv s = - x^251: (lts: - x^251) / (ltf[0]: + 1) = (quot: - x^251), rest 0
mdiv s = x^253: (lts: + x^253) / (ltf[0]: + 1) = (quot: + x^253), rest 0
mdiv s = - x^255: (lts: - x^255) / (ltf[0]: + 1) = (quot: - x^255), rest 0
mdiv s = x^257: (lts: + x^257) / (ltf[0]: + 1) = (quot: + x^257), rest 0
mdiv s = - x^259: (lts: - x^259) / (ltf[0]: + 1) = (quot: - x^259), rest 0
mdiv s = x^261: (lts: + x^261) / (ltf[0]: + 1) = (quot: + x^261), rest 0
mdiv s = - x^263: (lts: - x^263) / (ltf[0]: + 1) = (quot: - x^263), rest 0
mdiv s = x^265: (lts: + x^265) / (ltf[0]: + 1) = (quot: + x^265), rest 0
mdiv s = - x^267: (lts: - x^267) / (ltf[0]: + 1) = (quot: - x^267), rest 0
mdiv s = x^269: (lts: + x^269) / (ltf[0]: + 1) = (quot: + x^269), rest 0
mdiv s = - x^271: (lts: - x^271) / (ltf[0]: + 1) = (quot: - x^271), rest 0
mdiv s = x^273: (lts: + x^273) / (ltf[0]: + 1) = (quot: + x^273), rest 0
mdiv s = - x^275: (lts: - x^275) / (ltf[0]: + 1) = (quot: - x^275), rest 0
mdiv s = x^277: (lts: + x^277) / (ltf[0]: + 1) = (quot: + x^277), rest 0
mdiv s = - x^279: (lts: - x^279) / (ltf[0]: + 1) = (quot: - x^279), rest 0
mdiv s = x^281: (lts: + x^281) / (ltf[0]: + 1) = (quot: + x^281), rest 0
mdiv s = - x^283: (lts: - x^283) / (ltf[0]: + 1) = (quot: - x^283), rest 0
mdiv s = x^285: (lts: + x^285) / (ltf[0]: + 1) = (quot: + x^285), rest 0
mdiv s = - x^287: (lts: - x^287) / (ltf[0]: + 1) = (quot: - x^287), rest 0
mdiv s = x^289: (lts: + x^289) / (ltf[0]: + 1) = (quot: + x^289), rest 0
mdiv s = - x^291: (lts: - x^291) / (ltf[0]: + 1) = (quot: - x^291), rest 0
mdiv s = x^293: (lts: + x^293) / (ltf[0]: + 1) = (quot: + x^293), rest 0
mdiv s = - x^295: (lts: - x^295) / (ltf[0]: + 1) = (quot: - x^295), rest 0
mdiv s = x^297: (lts: + x^297) / (ltf[0]: + 1) = (quot: + x^297), rest 0
mdiv s = - x^299: (lts: - x^299) / (ltf[0]: + 1) = (quot: - x^299), rest 0
mdiv s = x^301: (lts: + x^301) / (ltf[0]: + 1) = (quot: + x^301), rest 0
mdiv s = - x^303: (lts: - x^303) / (ltf[0]: + 1) = (quot: - x^303), rest 0
mdiv s = x^305: (lts: + x^305) / (ltf[0]: + 1) = (quot: + x^305), rest 0
mdiv s = - x^307: (lts: - x^307) / (ltf[0]: + 1) = (quot: - x^307), rest 0
mdiv s = x^309: (lts: + x^309) / (ltf[0]: + 1) = (quot: + x^309), rest 0
mdiv s = - x^311: (lts: - x^311) / (ltf[0]: + 1) = (quot: - x^311), rest 0
mdiv s = x^313: (lts: + x^313) / (ltf[0]: + 1) = (quot: + x^313), rest 0
mdiv s = - x^315: (lts: - x^315) / (ltf[0]: + 1) = (quot: - x^315), rest 0
mdiv s = x^317: (lts: + x^317) / (ltf[0]: + 1) = (quot: + x^317), rest 0
mdiv s = - x^319: (lts: - x^319) / (ltf[0]: + 1) = (quot: - x^319), rest 0
mdiv s = x^321: (lts: + x^321) / (ltf[0]: + 1) = (quot: + x^321), rest 0
mdiv s = - x^323: (lts: - x^323) / (ltf[0]: + 1) = (quot: - x^323), rest 0
mdiv s = x^325: (lts: + x^325) / (ltf[0]: + 1) = (quot: + x^325), rest 0
mdiv s = - x^327: (lts: - x^327) / (ltf[0]: + 1) = (quot: - x^327), rest 0
mdiv s = x^329: (lts: + x^329) / (ltf[0]: + 1) = (quot: + x^329), rest 0
mdiv s = - x^331: (lts: - x^331) / (ltf[0]: + 1) = (quot: - x^331), rest 0
mdiv s = x^333: (lts: + x^333) / (ltf[0]: + 1) = (quot: + x^333), rest 0
mdiv s = - x^335: (lts: - x^335) / (ltf[0]: + 1) = (quot: - x^335), rest 0
mdiv s = x^337: (lts: + x^337) / (ltf[0]: + 1) = (quot: + x^337), rest 0
mdiv s = - x^339: (lts: - x^339) / (ltf[0]: + 1) = (quot: - x^339), rest 0
mdiv s = x^341: (lts: + x^341) / (ltf[0]: + 1) = (quot: + x^341), rest 0
mdiv s = - x^343: (lts: - x^343) / (ltf[0]: + 1) = (quot: - x^343), rest 0
mdiv s = x^345: (lts: + x^345) / (ltf[0]: + 1) = (quot: + x^345), rest 0
mdiv s = - x^347: (lts: - x^347) / (ltf[0]: + 1) = (quot: - x^347), rest 0
mdiv s = x^349: (lts: + x^349) / (ltf[0]: + 1) = (quot: + x^349), rest 0
mdiv s = - x^351: (lts: - x^351) / (ltf[0]: + 1) = (quot: - x^351), rest 0
mdiv s = x^353: (lts: + x^353) / (ltf[0]: + 1) = (quot: + x^353), rest 0
mdiv s = - x^355: (lts: - x^355) / (ltf[0]: + 1) = (quot: - x^355), rest 0
mdiv s = x^357: (lts: + x^357) / (ltf[0]: + 1) = (quot: + x^357), rest 0
mdiv s = - x^359: (lts: - x^359) / (ltf[0]: + 1) = (quot: - x^359), rest 0
mdiv s = x^361: (lts: + x^361) / (ltf[0]: + 1) = (quot: + x^361), rest 0
mdiv s = - x^363: (lts: - x^363) / (ltf[0]: + 1) = (quot: - x^363), rest 0
mdiv s = x^365: (lts: + x^365) / (ltf[0]: + 1) = (quot: + x^365), rest 0
mdiv s = - x^367: (lts: - x^367) / (ltf[0]: + 1) = (quot: - x^367), rest 0
mdiv s = x^369: (lts: + x^369) / (ltf[0]: + 1) = (quot: + x^369), rest 0
mdiv s = - x^371: (lts: - x^371) / (ltf[0]: + 1) = (quot: - x^371), rest 0
mdiv s = x^373: (lts: + x^373) / (ltf[0]: + 1) = (quot: + x^373), rest 0
mdiv s = - x^375: (lts: - x^375) / (ltf[0]: + 1) = (quot: - x^375), rest 0
mdiv s = x^377: (lts: + x^377) / (ltf[0]: + 1) = (quot: + x^377), rest 0
mdiv s = - x^379: (lts: - x^379) / (ltf[0]: + 1) = (quot: - x^379), rest 0
mdiv s = x^381: (lts: + x^381) / (ltf[0]: + 1) = (quot: + x^381), rest 0
mdiv s = - x^383: (lts: - x^383) / (ltf[0]: + 1) = (quot: - x^383), rest 0
mdiv s = x^385: (lts: + x^385) / (ltf[0]: + 1) = (quot: + x^385), rest 0
mdiv s = - x^387: (lts: - x^387) / (ltf[0]: + 1) = (quot: - x^387), rest 0
mdiv s = x^389: (lts: + x^389) / (ltf[0]: + 1) = (quot: + x^389), rest 0
mdiv s = - x^391: (lts: - x^391) / (ltf[0]: + 1) = (quot: - x^391), rest 0
mdiv s = x^393: (lts: + x^393) / (ltf[0]: + 1) = (quot: + x^393), rest 0
mdiv s = - x^395: (lts: - x^395) / (ltf[0]: + 1) = (quot: - x^395), rest 0
mdiv s = x^397: (lts: + x^397) / (ltf[0]: + 1) = (quot: + x^397), rest 0
mdiv s = - x^399: (lts: - x^399) / (ltf[0]: + 1) = (quot: - x^399), rest 0
mdiv s = x^401: (lts: + x^401) / (ltf[0]: + 1) = (quot: + x^401), rest 0
mdiv s = - x^403: (lts: - x^403) / (ltf[0]: + 1) = (quot: - x^403), rest 0
mdiv s = x^405: (lts: + x^405) / (ltf[0]: + 1) = (quot: + x^405), rest 0
mdiv s = - x^407: (lts: - x^407) / (ltf[0]: + 1) = (quot: - x^407), rest 0
mdiv s = x^409: (lts: + x^409) / (ltf[0]: + 1) = (quot: + x^409), rest 0
mdiv s = - x^411: (lts: - x^411) / (ltf[0]: + 1) = (quot: - x^411), rest 0
mdiv s = x^413: (lts: + x^413) / (ltf[0]: + 1) = (quot: + x^413), rest 0
mdiv s = - x^415: (lts: - x^415) / (ltf[0]: + 1) = (quot: - x^415), rest 0
mdiv s = x^417: (lts: + x^417) / (ltf[0]: + 1) = (quot: + x^417), rest 0
mdiv s = - x^419: (lts: - x^419) / (ltf[0]: + 1) = (quot: - x^419), rest 0
mdiv s = x^421: (lts: + x^421) / (ltf[0]: + 1) = (quot: + x^421), rest 0
mdiv s = - x^423: (lts: - x^423) / (ltf[0]: + 1) = (quot: - x^423), rest 0
mdiv s = x^425: (lts: + x^425) / (ltf[0]: + 1) = (quot: + x^425), rest 0
mdiv s = - x^427: (lts: - x^427) / (ltf[0]: + 1) = (quot: - x^427), rest 0
mdiv s = x^429: (lts: + x^429) / (ltf[0]: + 1) = (quot: + x^429), rest 0
mdiv s = - x^431: (lts: - x^431) / (ltf[0]: + 1) = (quot: - x^431), rest 0
mdiv s = x^433: (lts: + x^433) / (ltf[0]: + 1) = (quot: + x^433), rest 0
mdiv s = - x^435: (lts: - x^435) / (ltf[0]: + 1) = (quot: - x^435), rest 0
mdiv s = x^437: (lts: + x^437) / (ltf[0]: + 1) = (quot: + x^437), rest 0
mdiv s = - x^439: (lts: - x^439) / (ltf[0]: + 1) = (quot: - x^439), rest 0
mdiv s = x^441: (lts: + x^441) / (ltf[0]: + 1) = (quot: + x^441), rest 0
mdiv s = - x^443: (lts: - x^443) / (ltf[0]: + 1) = (quot: - x^443), rest 0
mdiv s = x^445: (lts: + x^445) / (ltf[0]: + 1) = (quot: + x^445), rest 0
mdiv s = - x^447: (lts: - x^447) / (ltf[0]: + 1) = (quot: - x^447), rest 0
mdiv s = x^449: (lts: + x^449) / (ltf[0]: + 1) = (quot: + x^449), rest 0
mdiv s = - x^451: (lts: - x^451) / (ltf[0]: + 1) = (quot: - x^451), rest 0
mdiv s = x^453: (lts: + x^453) / (ltf[0]: + 1) = (quot: + x^453), rest 0
mdiv s = - x^455: (lts: - x^455) / (ltf[0]: + 1) = (quot: - x^455), rest 0
mdiv s = x^457: (lts: + x^457) / (ltf[0]: + 1) = (quot: + x^457), rest 0
mdiv s = - x^459: (lts: - x^459) / (ltf[0]: + 1) = (quot: - x^459), rest 0
mdiv s = x^461: (lts: + x^461) / (ltf[0]: + 1) = (quot: + x^461), rest 0
mdiv s = - x^463: (lts: - x^463) / (ltf[0]: + 1) = (quot: - x^463), rest 0
mdiv s = x^465: (lts: + x^465) / (ltf[0]: + 1) = (quot: + x^465), rest 0
mdiv s = - x^467: (lts: - x^467) / (ltf[0]: + 1) = (quot: - x^467), rest 0
mdiv s = x^469: (lts: + x^469) / (ltf[0]: + 1) = (quot: + x^469), rest 0
mdiv s = - x^471: (lts: - x^471) / (ltf[0]: + 1) = (quot: - x^471), rest 0
mdiv s = x^473: (lts: + x^473) / (ltf[0]: + 1) = (quot: + x^473), rest 0
mdiv s = - x^475: (lts: - x^475) / (ltf[0]: + 1) = (quot: - x^475), rest 0
mdiv s = x^477: (lts: + x^477) / (ltf[0]: + 1) = (quot: + x^477), rest 0
mdiv s = - x^479: (lts: - x^479) / (ltf[0]: + 1) = (quot: - x^479), rest 0
mdiv s = x^481: (lts: + x^481) / (ltf[0]: + 1) = (quot: + x^481), rest 0
mdiv s = - x^483: (lts: - x^483) / (ltf[0]: + 1) = (quot: - x^483), rest 0
mdiv s = x^485: (lts: + x^485) / (ltf[0]: + 1) = (quot: + x^485), rest 0
mdiv s = - x^487: (lts: - x^487) / (ltf[0]: + 1) = (quot: - x^487), rest 0
mdiv s = x^489: (lts: + x^489) / (ltf[0]: + 1) = (quot: + x^489), rest 0
mdiv s = - x^491: (lts: - x^491) / (ltf[0]: + 1) = (quot: - x^491), rest 0
mdiv s = x^493: (lts: + x^493) / (ltf[0]: + 1) = (quot: + x^493), rest 0
mdiv s = - x^495: (lts: - x^495) / (ltf[0]: + 1) = (quot: - x^495), rest 0
mdiv s = x^497: (lts: + x^497) / (ltf[0]: + 1) = (quot: + x^497), rest 0
mdiv s = - x^499: (lts: - x^499) / (ltf[0]: + 1) = (quot: - x^499), rest 0
mdiv s = x^501: (lts: + x^501) / (ltf[0]: + 1) = (quot: + x^501), rest 0
mdiv s = - x^503: (lts: - x^503) / (ltf[0]: + 1) = (quot: - x^503), rest 0
mdiv s = x^505: (lts: + x^505) / (ltf[0]: + 1) = (quot: + x^505), rest 0
mdiv s = - x^507: (lts: - x^507) / (ltf[0]: + 1) = (quot: - x^507), rest 0
mdiv s = x^509: (lts: + x^509) / (ltf[0]: + 1) = (quot: + x^509), rest 0
mdiv s = - x^511: (lts: - x^511) / (ltf[0]: + 1) = (quot: - x^511), rest 0
mdiv s = x^513: (lts: + x^513) / (ltf[0]: + 1) = (quot: + x^513), rest 0
mdiv s = - x^515: (lts: - x^515) / (ltf[0]: + 1) = (quot: - x^515), rest 0
mdiv s = x^517: (lts: + x^517) / (ltf[0]: + 1) = (quot: + x^517), rest 0
mdiv s = - x^519: (lts: - x^519) / (ltf[0]: + 1) = (quot: - x^519), rest 0
mdiv s = x^521: (lts: + x^521) / (ltf[0]: + 1) = (quot: + x^521), rest 0
mdiv s = - x^523: (lts: - x^523) / (ltf[0]: + 1) = (quot: - x^523), rest 0
mdiv s = x^525: (lts: + x^525) / (ltf[0]: + 1) = (quot: + x^525), rest 0
mdiv s = - x^527: (lts: - x^527) / (ltf[0]: + 1) = (quot: - x^527), rest 0
mdiv s = x^529: (lts: + x^529) / (ltf[0]: + 1) = (quot: + x^529), rest 0
mdiv s = - x^531: (lts: - x^531) / (ltf[0]: + 1) = (quot: - x^531), rest 0
mdiv s = x^533: (lts: + x^533) / (ltf[0]: + 1) = (quot: + x^533), rest 0
mdiv s = - x^535: (lts: - x^535) / (ltf[0]: + 1) = (quot: - x^535), rest 0
mdiv s = x^537: (lts: + x^537) / (ltf[0]: + 1) = (quot: + x^537), rest 0
mdiv s = - x^539: (lts: - x^539) / (ltf[0]: + 1) = (quot: - x^539), rest 0
mdiv s = x^541: (lts: + x^541) / (ltf[0]: + 1) = (quot: + x^541), rest 0
mdiv s = - x^543: (lts: - x^543) / (ltf[0]: + 1) = (quot: - x^543), rest 0
mdiv s = x^545: (lts: + x^545) / (ltf[0]: + 1) = (quot: + x^545), rest 0
mdiv s = - x^547: (lts: - x^547) / (ltf[0]: + 1) = (quot: - x^547), rest 0
mdiv s = x^549: (lts: + x^549) / (ltf[0]: + 1) = (quot: + x^549), rest 0
mdiv s = - x^551: (lts: - x^551) / (ltf[0]: + 1) = (quot: - x^551), rest 0
mdiv s = x^553: (lts: + x^553) / (ltf[0]: + 1) = (quot: + x^553), rest 0
mdiv s = - x^555: (lts: - x^555) / (ltf[0]: + 1) = (quot: - x^555), rest 0
mdiv s = x^557: (lts: + x^557) / (ltf[0]: + 1) = (quot: + x^557), rest 0
mdiv s = - x^559: (lts: - x^559) / (ltf[0]: + 1) = (quot: - x^559), rest 0
mdiv s = x^561: (lts: + x^561) / (ltf[0]: + 1) = (quot: + x^561), rest 0
mdiv s = - x^563: (lts: - x^563) / (ltf[0]: + 1) = (quot: - x^563), rest 0
mdiv s = x^565: (lts: + x^565) / (ltf[0]: + 1) = (quot: + x^565), rest 0
mdiv s = - x^567: (lts: - x^567) / (ltf[0]: + 1) = (quot: - x^567), rest 0
mdiv s = x^569: (lts: + x^569) / (ltf[0]: + 1) = (quot: + x^569), rest 0
mdiv s = - x^571: (lts: - x^571) / (ltf[0]: + 1) = (quot: - x^571), rest 0
mdiv s = x^573: (lts: + x^573) / (ltf[0]: + 1) = (quot: + x^573), rest 0
mdiv s = - x^575: (lts: - x^575) / (ltf[0]: + 1) = (quot: - x^575), rest 0
mdiv s = x^577: (lts: + x^577) / (ltf[0]: + 1) = (quot: + x^577), rest 0
mdiv s = - x^579: (lts: - x^579) / (ltf[0]: + 1) = (quot: - x^579), rest 0
mdiv s = x^581: (lts: + x^581) / (ltf[0]: + 1) = (quot: + x^581), rest 0
mdiv s = - x^583: (lts: - x^583) / (ltf[0]: + 1) = (quot: - x^583), rest 0
mdiv s = x^585: (lts: + x^585) / (ltf[0]: + 1) = (quot: + x^585), rest 0
mdiv s = - x^587: (lts: - x^587) / (ltf[0]: + 1) = (quot: - x^587), rest 0
mdiv s = x^589: (lts: + x^589) / (ltf[0]: + 1) = (quot: + x^589), rest 0
mdiv s = - x^591: (lts: - x^591) / (ltf[0]: + 1) = (quot: - x^591), rest 0
mdiv s = x^593: (lts: + x^593) / (ltf[0]: + 1) = (quot: + x^593), rest 0
mdiv s = - x^595: (lts: - x^595) / (ltf[0]: + 1) = (quot: - x^595), rest 0
mdiv s = x^597: (lts: + x^597) / (ltf[0]: + 1) = (quot: + x^597), rest 0
mdiv s = - x^599: (lts: - x^599) / (ltf[0]: + 1) = (quot: - x^599), rest 0
mdiv s = x^601: (lts: + x^601) / (ltf[0]: + 1) = (quot: + x^601), rest 0
mdiv s = - x^603: (lts: - x^603) / (ltf[0]: + 1) = (quot: - x^603), rest 0
mdiv s = x^605: (lts: + x^605) / (ltf[0]: + 1) = (quot: + x^605), rest 0
mdiv s = - x^607: (lts: - x^607) / (ltf[0]: + 1) = (quot: - x^607), rest 0
mdiv s = x^609: (lts: + x^609) / (ltf[0]: + 1) = (quot: + x^609), rest 0
mdiv s = - x^611: (lts: - x^611) / (ltf[0]: + 1) = (quot: - x^611), rest 0
mdiv s = x^613: (lts: + x^613) / (ltf[0]: + 1) = (quot: + x^613), rest 0
mdiv s = - x^615: (lts: - x^615) / (ltf[0]: + 1) = (quot: - x^615), rest 0
mdiv s = x^617: (lts: + x^617) / (ltf[0]: + 1) = (quot: + x^617), rest 0
mdiv s = - x^619: (lts: - x^619) / (ltf[0]: + 1) = (quot: - x^619), rest 0
mdiv s = x^621: (lts: + x^621) / (ltf[0]: + 1) = (quot: + x^621), rest 0
mdiv s = - x^623: (lts: - x^623) / (ltf[0]: + 1) = (quot: - x^623), rest 0
mdiv s = x^625: (lts: + x^625) / (ltf[0]: + 1) = (quot: + x^625), rest 0
mdiv s = - x^627: (lts: - x^627) / (ltf[0]: + 1) = (quot: - x^627), rest 0
mdiv s = x^629: (lts: + x^629) / (ltf[0]: + 1) = (quot: + x^629), rest 0
mdiv s = - x^631: (lts: - x^631) / (ltf[0]: + 1) = (quot: - x^631), rest 0
mdiv s = x^633: (lts: + x^633) / (ltf[0]: + 1) = (quot: + x^633), rest 0
mdiv s = - x^635: (lts: - x^635) / (ltf[0]: + 1) = (quot: - x^635), rest 0
mdiv s = x^637: (lts: + x^637) / (ltf[0]: + 1) = (quot: + x^637), rest 0
mdiv s = - x^639: (lts: - x^639) / (ltf[0]: + 1) = (quot: - x^639), rest 0
mdiv s = x^641: (lts: + x^641) / (ltf[0]: + 1) = (quot: + x^641), rest 0
mdiv s = - x^643: (lts: - x^643) / (ltf[0]: + 1) = (quot: - x^643), rest 0
mdiv s = x^645: (lts: + x^645) / (ltf[0]: + 1) = (quot: + x^645), rest 0
mdiv s = - x^647: (lts: - x^647) / (ltf[0]: + 1) = (quot: - x^647), rest 0
mdiv s = x^649: (lts: + x^649) / (ltf[0]: + 1) = (quot: + x^649), rest 0
mdiv s = - x^651: (lts: - x^651) / (ltf[0]: + 1) = (quot: - x^651), rest 0
mdiv s = x^653: (lts: + x^653) / (ltf[0]: + 1) = (quot: + x^653), rest 0
mdiv s = - x^655: (lts: - x^655) / (ltf[0]: + 1) = (quot: - x^655), rest 0
mdiv s = x^657: (lts: + x^657) / (ltf[0]: + 1) = (quot: + x^657), rest 0
mdiv s = - x^659: (lts: - x^659) / (ltf[0]: + 1) = (quot: - x^659), rest 0
mdiv s = x^661: (lts: + x^661) / (ltf[0]: + 1) = (quot: + x^661), rest 0
mdiv s = - x^663: (lts: - x^663) / (ltf[0]: + 1) = (quot: - x^663), rest 0
mdiv s = x^665: (lts: + x^665) / (ltf[0]: + 1) = (quot: + x^665), rest 0
mdiv s = - x^667: (lts: - x^667) / (ltf[0]: + 1) = (quot: - x^667), rest 0
mdiv s = x^669: (lts: + x^669) / (ltf[0]: + 1) = (quot: + x^669), rest 0
mdiv s = - x^671: (lts: - x^671) / (ltf[0]: + 1) = (quot: - x^671), rest 0
mdiv s = x^673: (lts: + x^673) / (ltf[0]: + 1) = (quot: + x^673), rest 0
mdiv s = - x^675: (lts: - x^675) / (ltf[0]: + 1) = (quot: - x^675), rest 0
mdiv s = x^677: (lts: + x^677) / (ltf[0]: + 1) = (quot: + x^677), rest 0
mdiv s = - x^679: (lts: - x^679) / (ltf[0]: + 1) = (quot: - x^679), rest 0
mdiv s = x^681: (lts: + x^681) / (ltf[0]: + 1) = (quot: + x^681), rest 0
mdiv s = - x^683: (lts: - x^683) / (ltf[0]: + 1) = (quot: - x^683), rest 0
mdiv s = x^685: (lts: + x^685) / (ltf[0]: + 1) = (quot: + x^685), rest 0
mdiv s = - x^687: (lts: - x^687) / (ltf[0]: + 1) = (quot: - x^687), rest 0
mdiv s = x^689: (lts: + x^689) / (ltf[0]: + 1) = (quot: + x^689), rest 0
mdiv s = - x^691: (lts: - x^691) / (ltf[0]: + 1) = (quot: - x^691), rest 0
mdiv s = x^693: (lts: + x^693) / (ltf[0]: + 1) = (quot: + x^693), rest 0
mdiv s = - x^695: (lts: - x^695) / (ltf[0]: + 1) = (quot: - x^695), rest 0
mdiv s = x^697: (lts: + x^697) / (ltf[0]: + 1) = (quot: + x^697), rest 0
mdiv s = - x^699: (lts: - x^699) / (ltf[0]: + 1) = (quot: - x^699), rest 0
mdiv s = x^701: (lts: + x^701) / (ltf[0]: + 1) = (quot: + x^701), rest 0
mdiv s = - x^703: (lts: - x^703) / (ltf[0]: + 1) = (quot: - x^703), rest 0
mdiv s = x^705: (lts: + x^705) / (ltf[0]: + 1) = (quot: + x^705), rest 0
mdiv s = - x^707: (lts: - x^707) / (ltf[0]: + 1) = (quot: - x^707), rest 0
mdiv s = x^709: (lts: + x^709) / (ltf[0]: + 1) = (quot: + x^709), rest 0
mdiv s = - x^711: (lts: - x^711) / (ltf[0]: + 1) = (quot: - x^711), rest 0
mdiv s = x^713: (lts: + x^713) / (ltf[0]: + 1) = (quot: + x^713), rest 0
mdiv s = - x^715: (lts: - x^715) / (ltf[0]: + 1) = (quot: - x^715), rest 0
mdiv s = x^717: (lts: + x^717) / (ltf[0]: + 1) = (quot: + x^717), rest 0
mdiv s = - x^719: (lts: - x^719) / (ltf[0]: + 1) = (quot: - x^719), rest 0
mdiv s = x^721: (lts: + x^721) / (ltf[0]: + 1) = (quot: + x^721), rest 0
mdiv s = - x^723: (lts: - x^723) / (ltf[0]: + 1) = (quot: - x^723), rest 0
mdiv s = x^725: (lts: + x^725) / (ltf[0]: + 1) = (quot: + x^725), rest 0
mdiv s = - x^727: (lts: - x^727) / (ltf[0]: + 1) = (quot: - x^727), rest 0
mdiv s = x^729: (lts: + x^729) / (ltf[0]: + 1) = (quot: + x^729), rest 0
mdiv s = - x^731: (lts: - x^731) / (ltf[0]: + 1) = (quot: - x^731), rest 0
mdiv s = x^733: (lts: + x^733) / (ltf[0]: + 1) = (quot: + x^733), rest 0
mdiv s = - x^735: (lts: - x^735) / (ltf[0]: + 1) = (quot: - x^735), rest 0
mdiv s = x^737: (lts: + x^737) / (ltf[0]: + 1) = (quot: + x^737), rest 0
mdiv s = - x^739: (lts: - x^739) / (ltf[0]: + 1) = (quot: - x^739), rest 0
mdiv s = x^741: (lts: + x^741) / (ltf[0]: + 1) = (quot: + x^741), rest 0
mdiv s = - x^743: (lts: - x^743) / (ltf[0]: + 1) = (quot: - x^743), rest 0
mdiv s = x^745: (lts: + x^745) / (ltf[0]: + 1) = (quot: + x^745), rest 0
mdiv s = - x^747: (lts: - x^747) / (ltf[0]: + 1) = (quot: - x^747), rest 0
mdiv s = x^749: (lts: + x^749) / (ltf[0]: + 1) = (quot: + x^749), rest 0
mdiv s = - x^751: (lts: - x^751) / (ltf[0]: + 1) = (quot: - x^751), rest 0
mdiv s = x^753: (lts: + x^753) / (ltf[0]: + 1) = (quot: + x^753), rest 0
mdiv s = - x^755: (lts: - x^755) / (ltf[0]: + 1) = (quot: - x^755), rest 0
mdiv s = x^757: (lts: + x^757) / (ltf[0]: + 1) = (quot: + x^757), rest 0
mdiv s = - x^759: (lts: - x^759) / (ltf[0]: + 1) = (quot: - x^759), rest 0
mdiv s = x^761: (lts: + x^761) / (ltf[0]: + 1) = (quot: + x^761), rest 0
mdiv s = - x^763: (lts: - x^763) / (ltf[0]: + 1) = (quot: - x^763), rest 0
mdiv s = x^765: (lts: + x^765) / (ltf[0]: + 1) = (quot: + x^765), rest 0
mdiv s = - x^767: (lts: - x^767) / (ltf[0]: + 1) = (quot: - x^767), rest 0
mdiv s = x^769: (lts: + x^769) / (ltf[0]: + 1) = (quot: + x^769), rest 0
mdiv s = - x^771: (lts: - x^771) / (ltf[0]: + 1) = (quot: - x^771), rest 0
mdiv s = x^773: (lts: + x^773) / (ltf[0]: + 1) = (quot: + x^773), rest 0
mdiv s = - x^775: (lts: - x^775) / (ltf[0]: + 1) = (quot: - x^775), rest 0
mdiv s = x^777: (lts: + x^777) / (ltf[0]: + 1) = (quot: + x^777), rest 0
mdiv s = - x^779: (lts: - x^779) / (ltf[0]: + 1) = (quot: - x^779), rest 0
mdiv s = x^781: (lts: + x^781) / (ltf[0]: + 1) = (quot: + x^781), rest 0
mdiv s = - x^783: (lts: - x^783) / (ltf[0]: + 1) = (quot: - x^783), rest 0
mdiv s = x^785: (lts: + x^785) / (ltf[0]: + 1) = (quot: + x^785), rest 0
mdiv s = - x^787: (lts: - x^787) / (ltf[0]: + 1) = (quot: - x^787), rest 0
mdiv s = x^789: (lts: + x^789) / (ltf[0]: + 1) = (quot: + x^789), rest 0
mdiv s = - x^791: (lts: - x^791) / (ltf[0]: + 1) = (quot: - x^791), rest 0
mdiv s = x^793: (lts: + x^793) / (ltf[0]: + 1) = (quot: + x^793), rest 0
mdiv s = - x^795: (lts: - x^795) / (ltf[0]: + 1) = (quot: - x^795), rest 0
mdiv s = x^797: (lts: + x^797) / (ltf[0]: + 1) = (quot: + x^797), rest 0
mdiv s = - x^799: (lts: - x^799) / (ltf[0]: + 1) = (quot: - x^799), rest 0
mdiv s = x^801: (lts: + x^801) / (ltf[0]: + 1) = (quot: + x^801), rest 0
mdiv s = - x^803: (lts: - x^803) / (ltf[0]: + 1) = (quot: - x^803), rest 0
mdiv s = x^805: (lts: + x^805) / (ltf[0]: + 1) = (quot: + x^805), rest 0
mdiv s = - x^807: (lts: - x^807) / (ltf[0]: + 1) = (quot: - x^807), rest 0
mdiv s = x^809: (lts: + x^809) / (ltf[0]: + 1) = (quot: + x^809), rest 0
mdiv s = - x^811: (lts: - x^811) / (ltf[0]: + 1) = (quot: - x^811), rest 0
mdiv s = x^813: (lts: + x^813) / (ltf[0]: + 1) = (quot: + x^813), rest 0
mdiv s = - x^815: (lts: - x^815) / (ltf[0]: + 1) = (quot: - x^815), rest 0
mdiv s = x^817: (lts: + x^817) / (ltf[0]: + 1) = (quot: + x^817), rest 0
mdiv s = - x^819: (lts: - x^819) / (ltf[0]: + 1) = (quot: - x^819), rest 0
mdiv s = x^821: (lts: + x^821) / (ltf[0]: + 1) = (quot: + x^821), rest 0
mdiv s = - x^823: (lts: - x^823) / (ltf[0]: + 1) = (quot: - x^823), rest 0
mdiv s = x^825: (lts: + x^825) / (ltf[0]: + 1) = (quot: + x^825), rest 0
mdiv s = - x^827: (lts: - x^827) / (ltf[0]: + 1) = (quot: - x^827), rest 0
mdiv s = x^829: (lts: + x^829) / (ltf[0]: + 1) = (quot: + x^829), rest 0
mdiv s = - x^831: (lts: - x^831) / (ltf[0]: + 1) = (quot: - x^831), rest 0
mdiv s = x^833: (lts: + x^833) / (ltf[0]: + 1) = (quot: + x^833), rest 0
mdiv s = - x^835: (lts: - x^835) / (ltf[0]: + 1) = (quot: - x^835), rest 0
mdiv s = x^837: (lts: + x^837) / (ltf[0]: + 1) = (quot: + x^837), rest 0
mdiv s = - x^839: (lts: - x^839) / (ltf[0]: + 1) = (quot: - x^839), rest 0
mdiv s = x^841: (lts: + x^841) / (ltf[0]: + 1) = (quot: + x^841), rest 0
mdiv s = - x^843: (lts: - x^843) / (ltf[0]: + 1) = (quot: - x^843), rest 0
mdiv s = x^845: (lts: + x^845) / (ltf[0]: + 1) = (quot: + x^845), rest 0
mdiv s = - x^847: (lts: - x^847) / (ltf[0]: + 1) = (quot: - x^847), rest 0
mdiv s = x^849: (lts: + x^849) / (ltf[0]: + 1) = (quot: + x^849), rest 0
mdiv s = - x^851: (lts: - x^851) / (ltf[0]: + 1) = (quot: - x^851), rest 0
mdiv s = x^853: (lts: + x^853) / (ltf[0]: + 1) = (quot: + x^853), rest 0
mdiv s = - x^855: (lts: - x^855) / (ltf[0]: + 1) = (quot: - x^855), rest 0
mdiv s = x^857: (lts: + x^857) / (ltf[0]: + 1) = (quot: + x^857), rest 0
mdiv s = - x^859: (lts: - x^859) / (ltf[0]: + 1) = (quot: - x^859), rest 0
mdiv s = x^861: (lts: + x^861) / (ltf[0]: + 1) = (quot: + x^861), rest 0
mdiv s = - x^863: (lts: - x^863) / (ltf[0]: + 1) = (quot: - x^863), rest 0
mdiv s = x^865: (lts: + x^865) / (ltf[0]: + 1) = (quot: + x^865), rest 0
mdiv s = - x^867: (lts: - x^867) / (ltf[0]: + 1) = (quot: - x^867), rest 0
mdiv s = x^869: (lts: + x^869) / (ltf[0]: + 1) = (quot: + x^869), rest 0
mdiv s = - x^871: (lts: - x^871) / (ltf[0]: + 1) = (quot: - x^871), rest 0
mdiv s = x^873: (lts: + x^873) / (ltf[0]: + 1) = (quot: + x^873), rest 0
mdiv s = - x^875: (lts: - x^875) / (ltf[0]: + 1) = (quot: - x^875), rest 0
mdiv s = x^877: (lts: + x^877) / (ltf[0]: + 1) = (quot: + x^877), rest 0
mdiv s = - x^879: (lts: - x^879) / (ltf[0]: + 1) = (quot: - x^879), rest 0
mdiv s = x^881: (lts: + x^881) / (ltf[0]: + 1) = (quot: + x^881), rest 0
mdiv s = - x^883: (lts: - x^883) / (ltf[0]: + 1) = (quot: - x^883), rest 0
mdiv s = x^885: (lts: + x^885) / (ltf[0]: + 1) = (quot: + x^885), rest 0
mdiv s = - x^887: (lts: - x^887) / (ltf[0]: + 1) = (quot: - x^887), rest 0
mdiv s = x^889: (lts: + x^889) / (ltf[0]: + 1) = (quot: + x^889), rest 0
mdiv s = - x^891: (lts: - x^891) / (ltf[0]: + 1) = (quot: - x^891), rest 0
mdiv s = x^893: (lts: + x^893) / (ltf[0]: + 1) = (quot: + x^893), rest 0
mdiv s = - x^895: (lts: - x^895) / (ltf[0]: + 1) = (quot: - x^895), rest 0
mdiv s = x^897: (lts: + x^897) / (ltf[0]: + 1) = (quot: + x^897), rest 0
mdiv s = - x^899: (lts: - x^899) / (ltf[0]: + 1) = (quot: - x^899), rest 0
mdiv s = x^901: (lts: + x^901) / (ltf[0]: + 1) = (quot: + x^901), rest 0
mdiv s = - x^903: (lts: - x^903) / (ltf[0]: + 1) = (quot: - x^903), rest 0
mdiv s = x^905: (lts: + x^905) / (ltf[0]: + 1) = (quot: + x^905), rest 0
mdiv s = - x^907: (lts: - x^907) / (ltf[0]: + 1) = (quot: - x^907), rest 0
mdiv s = x^909: (lts: + x^909) / (ltf[0]: + 1) = (quot: + x^909), rest 0
mdiv s = - x^911: (lts: - x^911) / (ltf[0]: + 1) = (quot: - x^911), rest 0
mdiv s = x^913: (lts: + x^913) / (ltf[0]: + 1) = (quot: + x^913), rest 0
mdiv s = - x^915: (lts: - x^915) / (ltf[0]: + 1) = (quot: - x^915), rest 0
mdiv s = x^917: (lts: + x^917) / (ltf[0]: + 1) = (quot: + x^917), rest 0
mdiv s = - x^919: (lts: - x^919) / (ltf[0]: + 1) = (quot: - x^919), rest 0
mdiv s = x^921: (lts: + x^921) / (ltf[0]: + 1) = (quot: + x^921), rest 0
mdiv s = - x^923: (lts: - x^923) / (ltf[0]: + 1) = (quot: - x^923), rest 0
mdiv s = x^925: (lts: + x^925) / (ltf[0]: + 1) = (quot: + x^925), rest 0
mdiv s = - x^927: (lts: - x^927) / (ltf[0]: + 1) = (quot: - x^927), rest 0
mdiv s = x^929: (lts: + x^929) / (ltf[0]: + 1) = (quot: + x^929), rest 0
mdiv s = - x^931: (lts: - x^931) / (ltf[0]: + 1) = (quot: - x^931), rest 0
mdiv s = x^933: (lts: + x^933) / (ltf[0]: + 1) = (quot: + x^933), rest 0
mdiv s = - x^935: (lts: - x^935) / (ltf[0]: + 1) = (quot: - x^935), rest 0
mdiv s = x^937: (lts: + x^937) / (ltf[0]: + 1) = (quot: + x^937), rest 0
mdiv s = - x^939: (lts: - x^939) / (ltf[0]: + 1) = (quot: - x^939), rest 0
mdiv s = x^941: (lts: + x^941) / (ltf[0]: + 1) = (quot: + x^941), rest 0
mdiv s = - x^943: (lts: - x^943) / (ltf[0]: + 1) = (quot: - x^943), rest 0
mdiv s = x^945: (lts: + x^945) / (ltf[0]: + 1) = (quot: + x^945), rest 0
mdiv s = - x^947: (lts: - x^947) / (ltf[0]: + 1) = (quot: - x^947), rest 0
mdiv s = x^949: (lts: + x^949) / (ltf[0]: + 1) = (quot: + x^949), rest 0
mdiv s = - x^951: (lts: - x^951) / (ltf[0]: + 1) = (quot: - x^951), rest 0
mdiv s = x^953: (lts: + x^953) / (ltf[0]: + 1) = (quot: + x^953), rest 0
mdiv s = - x^955: (lts: - x^955) / (ltf[0]: + 1) = (quot: - x^955), rest 0
mdiv s = x^957: (lts: + x^957) / (ltf[0]: + 1) = (quot: + x^957), rest 0
mdiv s = - x^959: (lts: - x^959) / (ltf[0]: + 1) = (quot: - x^959), rest 0
mdiv s = x^961: (lts: + x^961) / (ltf[0]: + 1) = (quot: + x^961), rest 0
mdiv s = - x^963: (lts: - x^963) / (ltf[0]: + 1) = (quot: - x^963), rest 0
mdiv s = x^965: (lts: + x^965) / (ltf[0]: + 1) = (quot: + x^965), rest 0
mdiv s = - x^967: (lts: - x^967) / (ltf[0]: + 1) = (quot: - x^967), rest 0
mdiv s = x^969: (lts: + x^969) / (ltf[0]: + 1) = (quot: + x^969), rest 0
mdiv s = - x^971: (lts: - x^971) / (ltf[0]: + 1) = (quot: - x^971), rest 0
mdiv s = x^973: (lts: + x^973) / (ltf[0]: + 1) = (quot: + x^973), rest 0
mdiv s = - x^975: (lts: - x^975) / (ltf[0]: + 1) = (quot: - x^975), rest 0
mdiv s = x^977: (lts: + x^977) / (ltf[0]: + 1) = (quot: + x^977), rest 0
mdiv s = - x^979: (lts: - x^979) / (ltf[0]: + 1) = (quot: - x^979), rest 0
mdiv s = x^981: (lts: + x^981) / (ltf[0]: + 1) = (quot: + x^981), rest 0
mdiv s = - x^983: (lts: - x^983) / (ltf[0]: + 1) = (quot: - x^983), rest 0
mdiv s = x^985: (lts: + x^985) / (ltf[0]: + 1) = (quot: + x^985), rest 0
mdiv s = - x^987: (lts: - x^987) / (ltf[0]: + 1) = (quot: - x^987), rest 0
mdiv s = x^989: (lts: + x^989) / (ltf[0]: + 1) = (quot: + x^989), rest 0
mdiv s = - x^991: (lts: - x^991) / (ltf[0]: + 1) = (quot: - x^991), rest 0
mdiv s = x^993: (lts: + x^993) / (ltf[0]: + 1) = (quot: + x^993), rest 0
mdiv s = - x^995: (lts: - x^995) / (ltf[0]: + 1) = (quot: - x^995), rest 0
mdiv s = x^997: (lts: + x^997) / (ltf[0]: + 1) = (quot: + x^997), rest 0
mdiv s = - x^999: (lts: - x^999) / (ltf[0]: + 1) = (quot: - x^999), rest 0
mdiv s = x^1001: (lts: + x^1001) / (ltf[0]: + 1) = (quot: + x^1001), rest 0
mdiv s = - x^1003: (lts: - x^1003) / (ltf[0]: + 1) = (quot: - x^1003), rest 0
mdiv s = x^1005: (lts: + x^1005) / (ltf[0]: + 1) = (quot: + x^1005), rest 0
mdiv s = - x^1007: (lts: - x^1007) / (ltf[0]: + 1) = (quot: - x^1007), rest 0
mdiv s = x^1009: (lts: + x^1009) / (ltf[0]: + 1) = (quot: + x^1009), rest 0
mdiv s = - x^1011: (lts: - x^1011) / (ltf[0]: + 1) = (quot: - x^1011), rest 0
mdiv s = x^1013: (lts: + x^1013) / (ltf[0]: + 1) = (quot: + x^1013), rest 0
mdiv s = - x^1015: (lts: - x^1015) / (ltf[0]: + 1) = (quot: - x^1015), rest 0
mdiv s = x^1017: (lts: + x^1017) / (ltf[0]: + 1) = (quot: + x^1017), rest 0
mdiv s = - x^1019: (lts: - x^1019) / (ltf[0]: + 1) = (quot: - x^1019), rest 0
mdiv s = x^1021: (lts: + x^1021) / (ltf[0]: + 1) = (quot: + x^1021), rest 0
mdiv s = - x^1023: (lts: - x^1023) / (ltf[0]: + 1) = (quot: - x^1023), rest 0
mdiv s = x^1025: (lts: + x^1025) / (ltf[0]: + 1) = (quot: + x^1025), rest 0
mdiv s = - x^1027: (lts: - x^1027) / (ltf[0]: + 1) = (quot: - x^1027), rest 0
infinite loop in ( - x^3).multiDivide(...)
multipleDivide: - x^3 = + ( - x^3 + x^5 - x^7 + x^9 - x^11 + x^13 - x^15 + x^257 - x^259 + x^261 - x^263 + x^265 - x^267 + x^269 - x^271 + x^17 + x^273 - x^275 + x^277 - x^279 + x^281 - x^283 + x^285 - x^287 + x^289 - x^291 + x^293 - x^295 + x^297 - x^299 + x^301 - x^303 - x^19 + x^305 - x^307 + x^309 - x^311 + x^313 - x^315 + x^317 - x^319 + x^321 - x^323 + x^325 - x^327 + x^329 - x^331 + x^333 - x^335 + x^21 + x^337 - x^339 + x^341 - x^343 + x^345 - x^347 + x^349 - x^351 + x^353 - x^355 + x^357 - x^359 + x^361 - x^363 + x^365 - x^367 - x^23 + x^369 - x^371 + x^373 - x^375 + x^377 - x^379 + x^381 - x^383 + x^385 - x^387 + x^389 - x^391 + x^393 - x^395 + x^397 - x^399 + x^25 + x^401 - x^403 + x^405 - x^407 + x^409 - x^411 + x^413 - x^415 + x^417 - x^419 + x^421 - x^423 + x^425 - x^427 + x^429 - x^431 - x^27 + x^433 - x^435 + x^437 - x^439 + x^441 - x^443 + x^445 - x^447 + x^449 - x^451 + x^453 - x^455 + x^457 - x^459 + x^461 - x^463 + x^29 + x^465 - x^467 + x^469 - x^471 + x^473 - x^475 + x^477 - x^479 + x^481 - x^483 + x^485 - x^487 + x^489 - x^491 + x^493 - x^495 - x^31 + x^497 - x^499 + x^501 - x^503 + x^505 - x^507 + x^509 - x^511 + x^513 - x^515 + x^517 - x^519 + x^521 - x^523 + x^525 - x^527 + x^33 + x^529 - x^531 + x^533 - x^535 + x^537 - x^539 + x^541 - x^543 + x^545 - x^547 + x^549 - x^551 + x^553 - x^555 + x^557 - x^559 - x^35 + x^561 - x^563 + x^565 - x^567 + x^569 - x^571 + x^573 - x^575 + x^577 - x^579 + x^581 - x^583 + x^585 - x^587 + x^589 - x^591 + x^37 + x^593 - x^595 + x^597 - x^599 + x^601 - x^603 + x^605 - x^607 + x^609 - x^611 + x^613 - x^615 + x^617 - x^619 + x^621 - x^623 - x^39 + x^625 - x^627 + x^629 - x^631 + x^633 - x^635 + x^637 - x^639 + x^641 - x^643 + x^645 - x^647 + x^649 - x^651 + x^653 - x^655 + x^41 + x^657 - x^659 + x^661 - x^663 + x^665 - x^667 + x^669 - x^671 + x^673 - x^675 + x^677 - x^679 + x^681 - x^683 + x^685 - x^687 - x^43 + x^689 - x^691 + x^693 - x^695 + x^697 - x^699 + x^701 - x^703 + x^705 - x^707 + x^709 - x^711 + x^713 - x^715 + x^717 - x^719 + x^45 + x^721 - x^723 + x^725 - x^727 + x^729 - x^731 + x^733 - x^735 + x^737 - x^739 + x^741 - x^743 + x^745 - x^747 + x^749 - x^751 - x^47 + x^753 - x^755 + x^757 - x^759 + x^761 - x^763 + x^765 - x^767 + x^769 - x^771 + x^773 - x^775 + x^777 - x^779 + x^781 - x^783 + x^49 + x^785 - x^787 + x^789 - x^791 + x^793 - x^795 + x^797 - x^799 + x^801 - x^803 + x^805 - x^807 + x^809 - x^811 + x^813 - x^815 - x^51 + x^817 - x^819 + x^821 - x^823 + x^825 - x^827 + x^829 - x^831 + x^833 - x^835 + x^837 - x^839 + x^841 - x^843 + x^845 - x^847 + x^53 + x^849 - x^851 + x^853 - x^855 + x^857 - x^859 + x^861 - x^863 + x^865 - x^867 + x^869 - x^871 + x^873 - x^875 + x^877 - x^879 - x^55 + x^881 - x^883 + x^885 - x^887 + x^889 - x^891 + x^893 - x^895 + x^897 - x^899 + x^901 - x^903 + x^905 - x^907 + x^909 - x^911 + x^57 + x^913 - x^915 + x^917 - x^919 + x^921 - x^923 + x^925 - x^927 + x^929 - x^931 + x^933 - x^935 + x^937 - x^939 + x^941 - x^943 - x^59 + x^945 - x^947 + x^949 - x^951 + x^953 - x^955 + x^957 - x^959 + x^961 - x^963 + x^965 - x^967 + x^969 - x^971 + x^973 - x^975 + x^61 + x^977 - x^979 + x^981 - x^983 + x^985 - x^987 + x^989 - x^991 + x^993 - x^995 + x^997 - x^999 + x^1001 - x^1003 + x^1005 - x^1007 - x^63 + x^1009 - x^1011 + x^1013 - x^1015 + x^1017 - x^1019 + x^1021 - x^1023 + x^1025 - x^1027 + x^65 - x^67 + x^69 - x^71 + x^73 - x^75 + x^77 - x^79 + x^81 - x^83 + x^85 - x^87 + x^89 - x^91 + x^93 - x^95 + x^97 - x^99 + x^101 - x^103 + x^105 - x^107 + x^109 - x^111 + x^113 - x^115 + x^117 - x^119 + x^121 - x^123 + x^125 - x^127 + x^129 - x^131 + x^133 - x^135 + x^137 - x^139 + x^141 - x^143 + x^145 - x^147 + x^149 - x^151 + x^153 - x^155 + x^157 - x^159 + x^161 - x^163 + x^165 - x^167 + x^169 - x^171 + x^173 - x^175 + x^177 - x^179 + x^181 - x^183 + x^185 - x^187 + x^189 - x^191 + x^193 - x^195 + x^197 - x^199 + x^201 - x^203 + x^205 - x^207 + x^209 - x^211 + x^213 - x^215 + x^217 - x^219 + x^221 - x^223 + x^225 - x^227 + x^229 - x^231 + x^233 - x^235 + x^237 - x^239 + x^241 - x^243 + x^245 - x^247 + x^249 - x^251 + x^253 - x^255) * (x^2 + 1) + [Rest = 0]
Groebner Basis:
GB: x^2 + 1
GB: x
|
7f21067a36372a669dbbfa47360d5f143eb5bc6d | 449d555969bfd7befe906877abab098c6e63a0e8 | /3557/CH4/EX4.8/Ex4_8.sce | f77a3b3ecb9fac58c5b79254744e0fd84bbdd4b5 | [] | no_license | FOSSEE/Scilab-TBC-Uploads | 948e5d1126d46bdd2f89a44c54ba62b0f0a1f5e1 | 7bc77cb1ed33745c720952c92b3b2747c5cbf2df | refs/heads/master | 2020-04-09T02:43:26.499817 | 2018-02-03T05:31:52 | 2018-02-03T05:31:52 | 37,975,407 | 3 | 12 | null | null | null | null | UTF-8 | Scilab | false | false | 279 | sce | Ex4_8.sce | //Example 4.8//
a=0.404;//nm //lattice parameter
b=1;// lowest-angle
d111=a/sqrt(b^2+b^2+b^2)
mprintf("d111 = %f nm",d111)
l=3.7*10^-3;//nm //nanometer
c=2;//given
thetha=asind(l/(c*d111))
mprintf("\nthetha = %f degree",thetha)
t=2*thetha
mprintf("\nt = %f degree",t)
|
afa8168411d34e9ac8976160a41ef2806153c1e6 | 449d555969bfd7befe906877abab098c6e63a0e8 | /3774/CH4/EX4.9/Ex4_9.sce | c2640f651cd0a1c1e588f32e61bc466e26593955 | [] | no_license | FOSSEE/Scilab-TBC-Uploads | 948e5d1126d46bdd2f89a44c54ba62b0f0a1f5e1 | 7bc77cb1ed33745c720952c92b3b2747c5cbf2df | refs/heads/master | 2020-04-09T02:43:26.499817 | 2018-02-03T05:31:52 | 2018-02-03T05:31:52 | 37,975,407 | 3 | 12 | null | null | null | null | UTF-8 | Scilab | false | false | 885 | sce | Ex4_9.sce | // exa 4.9 Pg 113
clc;clear;close;
// Given Data
Sut=860;//MPa
Syt=690;//MPa
Pmin=60;// N
Pmax=120;// N
R=50/100;// reliability
l=500;//mm
d=10;//mm
Se_dash = 0.5*Sut;// MPa
// for machines surface
ka=0.70;// surface finish factor
kb=0.85;// size factor (assuming t<50 mm)
kc=1;// reliability factor
kd=1;// temperature factor
ke=1;// load factor
Se=ka*kb*kc*kd*ke*Se_dash;// MPa( Endurance limit)
Mmax=Pmax*l;// N.mm
Mmin=Pmin*l;// N.mm
Mm=(Mmax+Mmin)/2;// N.mm
Ma=(Mmax-Mmin)/2;// N.mm
Sm=32*Mm/%pi/d**3;//MPa
sigma_m=Sm;//MPa
Sa=32*Ma/%pi/d**3;//MPa
sigma_a=Sa;//MPa
Sf=Sa*Sut/(Sut-Sm);//MPa
//calculating section
OB=6;//unit ref. o at 3
BE=OB-3;//unit
OC=Sf;// MPa
AE=log10(0.9*Sut)-log10(Se);//MPa
AC=log10(0.9*Sut)-log10(Sf);//MPa
CD=BE*AC/AE;//
//log10(N)=3+CD
N=10**(3+CD);// cycle
printf('\n life of the spring, N = %.f cycles',N)
//Note : answer in the textbook is wrong.
|
ae40ef2788750ab6d3f54abf08371236e563e346 | 449d555969bfd7befe906877abab098c6e63a0e8 | /1332/CH8/EX8.5/8_5.sce | 99c5dd81f3c9c77ea90f0a68a1fb6aed84bcdf64 | [] | no_license | FOSSEE/Scilab-TBC-Uploads | 948e5d1126d46bdd2f89a44c54ba62b0f0a1f5e1 | 7bc77cb1ed33745c720952c92b3b2747c5cbf2df | refs/heads/master | 2020-04-09T02:43:26.499817 | 2018-02-03T05:31:52 | 2018-02-03T05:31:52 | 37,975,407 | 3 | 12 | null | null | null | null | UTF-8 | Scilab | false | false | 1,662 | sce | 8_5.sce | //Example 8.5
//Gauss-Seidel Point Iterative Method
//Page no. 279
clc;clear;close;
A=[2,3,-4,1;1,-2,-5,1;5,-3,1,-4;10,2,-1,2]; //equation matrix
B=[3;2;1;-4]; //solution matrix
//transformation of the equations
for i=1:4
A1(1,i)=A(4,i);
B1(1,1)=B(4,1);
end
for i=1:4
A1(3,i)=A(2,i);
B1(3,1)=B(2,1);
end
for i=1:4
A1(2,i)=A(1,i)-A(2,i);
B1(2,1)=B(1,1)-B(2,1);
end
for i=1:4
A1(4,i)=2*A(1,i)-A(2,i)+2*A(3,i)-A(4,i);
B1(4,1)=2*B(1,1)-B(2,1)+2*B(3,1)-B(4,1);
end
//printing of transformed equations
printf('\nTransformed Equations are=\n\n')
for i=1:4
for j=1:4
printf('(%ix(%i))',A1(i,j),j);
if(j<4)
printf(' + ')
end
end
printf('= %i\n',B1(i,1));
end
for i=1:4
for j=1:4
if(A(j,j)==0)
for k=1:4
C(j,k)=A(j,k);
A(j,k)=A(j+1,k);
A(j+1,k)=C(j,k);
end
end
end
end
for i=0:12
X(i+1,1)=i;
end
for i=2:5
X(1,i)=0;
end
for r=1:12
for i=1:4
k1=0;
for j=1:i-1
k1=k1-A1(i,j)*X(r+1,j+1);
end
k2=0;
for j=i+1:4
k2=k2-A1(i,j)*X(r,j+1);
end
X(r+1,i+1)=(k1+k2+B1(i,1))/A1(i,i);
end
end
printf('\n\n r ');
for i=1:4
printf('x%i ',i);
end
printf('\n ------------------------------------------------------')
disp(X)
printf('\n\nAfter 11 iterations exact solution is:\n');
for i=1:4
printf('x%i=%f ',i,X(12,i+1));
end
|
289b370fbeab2c894b25c3aaf44b0b11e5fcc8b0 | 68f6f3335d41b95146619ddf406414da5c1bc975 | /metodos-numericos/parcial-practico-2/ej3.sci | e8460ceef39cef14afc23caad92a402fa465dd9a | [] | no_license | nachocattoni/Ita | be52ab7f80cb0dd7d0a0ef470c72a7f997f2e75b | f7e102a2917ebe59358dbd9d5f7af81703c16fde | refs/heads/master | 2021-05-02T08:09:23.784800 | 2018-02-08T02:50:30 | 2018-02-08T02:50:30 | 120,845,736 | 0 | 0 | null | 2018-02-09T02:29:22 | 2018-02-09T02:29:21 | null | UTF-8 | Scilab | false | false | 1,826 | sci | ej3.sci | clear
clc
function [x, P, A, b] = Gauss(A, b)
n = size(A, 1)
P = eye(n, n)
if( det(A) == 0 )
error("Argiroffo informs: ¡El determinante es cero, nene!")
end
for i = 1:n
mx = A(i, i)
idmx = i
for j = i+1:n
if(abs(A(j, i)) > mx)
mx = A(j, i)
idmx = j
end
end
A([i, idmx],:) = A([idmx, i],:)
P([i, idmx],:) = P([idmx, i],:)
b([i, idmx]) = b([idmx, i])
for j = i+1:n
m = A(j,i) / A(i,i)
A(j,:) = A(j,:) - m * A(i,:)
b(j) = b(j) - m * b(i)
end
end
x = SustitucionRegresiva(A, b)
endfunction
function [p, err] = MinimosCuadrados(x, y, k)
n = length(x)
X = ones(n, k+1)
for i = 1:n
for j = 2:k
if j == 2 then
X(i,j) = cos(x(i))
else
X(i,j) = sin(x(i))
end
end
end
disp(X);
p = Gauss(X'*X, X'*y)
endfunction
X = [-%pi/2, 0, %pi/2]'
Y = [1, 0, 1/2]'
MinimosCuadrados(X, Y, 3)
// Acá perdí :( no llegué con el tiempo para dejar los otros ejercicios mejor,
// porque no estaba muy afilado con mínimos cuadrados si no era para obtener
// un polinomio. Al hacer esto, obtengo que el determinante es cero, lo adjunto
// para que vean que lo intenté jaja.
// SALIDA, por si la querés
// 1. 6.12323400D-17 - 1. 1.
// 1. 1. 0. 1.
// 1. 6.12323400D-17 1. 1.
// !--error 10000
//Argiroffo informs: ¡El determinante es cero, nene!
//at line 5 of function Gauss called by :
//at line 14 of function MinimosCuadrados called by :
//MinimosCuadrados(X, Y, 3)
//at line 50 of exec file called by :
//exec('/home/alumno/Escritorio/scilab/ej3.sci', -1)
|
0a981134019d68ca8b0df5e0e03b5331c960cf2e | 449d555969bfd7befe906877abab098c6e63a0e8 | /2741/CH6/EX6.6/Chapter6_Example6.sce | 8e25daa8228c77670f78542882b833167535b104 | [] | no_license | FOSSEE/Scilab-TBC-Uploads | 948e5d1126d46bdd2f89a44c54ba62b0f0a1f5e1 | 7bc77cb1ed33745c720952c92b3b2747c5cbf2df | refs/heads/master | 2020-04-09T02:43:26.499817 | 2018-02-03T05:31:52 | 2018-02-03T05:31:52 | 37,975,407 | 3 | 12 | null | null | null | null | UTF-8 | Scilab | false | false | 755 | sce | Chapter6_Example6.sce | clc
clear
//Input data
t=27;//The temperature of dry air in degree centigrade
g=1.4;//Adiabatic index
//Calculations
V1=1;//Let us assume the initial volume in cc
V2=V1/3;//Then the final volume is 1/3 of the initial volume in cc
T1=t+273;//The initial temperature of dry air in K
T2=((V1/V2)^(g-1))*T1;//The final temperature of air in K
T21=T2-273;//The final temperature of air in degree centigrade
T=T21-t;//The change in temperature in degree centigrade
//Output
printf('(1)When the process is slow the temperature of the system remains constant so, there is no change in the temperature \n (2)When the compression is sudden then, \n The temperature of the air increases by T = %3.1f degree centigrade (or) %3.1f K',T,T)
|
263f9f8cedbc589e44d1290bc81a5ded3dbfe32a | 449d555969bfd7befe906877abab098c6e63a0e8 | /3768/CH5/EX5.5/Ex5_5.sce | 7320730a6ccbbc37c17e3c5a890f27f333e96123 | [] | no_license | FOSSEE/Scilab-TBC-Uploads | 948e5d1126d46bdd2f89a44c54ba62b0f0a1f5e1 | 7bc77cb1ed33745c720952c92b3b2747c5cbf2df | refs/heads/master | 2020-04-09T02:43:26.499817 | 2018-02-03T05:31:52 | 2018-02-03T05:31:52 | 37,975,407 | 3 | 12 | null | null | null | null | UTF-8 | Scilab | false | false | 359 | sce | Ex5_5.sce | //Example number 5.5, Page number 86
clc;clear;
close;
//Variable declaration
V=344; //accelerated voltage(V)
n=1;
theta=60; //glancing angle(degrees)
//Calculation
theta=theta*%pi/180; //glancing angle(radian)
lamda=12.27/sqrt(V);
d=n*lamda/(2*sin(theta)); //spacing of crystal(angstrom)
//Result
printf("spacing of crystal is %.4f Angstrom",d)
|
c9142e0f5cb78eeee5dcad907ddb1d8fa314a6e0 | daf9a7434ea9996fc591a79030570f48e396cdc5 | /Discrete/EXAM/EXP and VAR .sce | 068cbdad1d5f611526665cfa315286d161e5577f | [] | no_license | isabelle-le/MonteCarloSimulation | c8dbfc2f5485f6dc6291654032ecad6c01cce401 | f96e0a11569b3e4dade452d99e9c1bbd6c3efb81 | refs/heads/master | 2020-04-05T22:40:20.686962 | 2018-11-12T19:18:50 | 2018-11-12T19:18:50 | 157,263,752 | 0 | 0 | null | null | null | null | UTF-8 | Scilab | false | false | 750 | sce | EXP and VAR .sce | //Discrete random variable : homework 19.3.2018
//LE THU HUONG _ ADEO1
N = 200000;
Exp = 0;
alpha = 0;
var = 0;
x(1)=4.5;
x(2)=3;
x(3)=5;
x(4)=2;
x(5)=0.8;
x(6)=6;
x(7)=3.8;
x(8)=1.4;
x(9)=6.5;
x(10)=8;
p(1)=0.3;
p(2)=0.2;
p(3)=0.1;
p(4)=0.08;
p(5)=0.09;
p(6)=0.02;
p(7)=0.03;
p(8)=0.01;
p(9)=0.07;
p(10)=0.1;
for i = 1:N
cum = 0;
u = rand();
for j = 1 : 10
if u > cum then cum = cum +p(j);
if cum > = u then alpha = x(j);
Exp = Exp + alpha/N;
var = var + alpha^2/N;
end
end
end
end
Var = var - Exp^2;
disp('IT IS DISCRETE RAMDON VARIABLE SIMULATION');
disp(alpha,'alpha = ');
disp(Exp,'E[x] = ');
disp(Var,'Var[x] = ');
|
7021db494e6138d2f916712637674c32a4478bb2 | 449d555969bfd7befe906877abab098c6e63a0e8 | /50/CH3/EX3.9/ex_3_9.sce | 34c7609a3e7ef32b8f54e25c56a4b3eab66bb730 | [] | no_license | FOSSEE/Scilab-TBC-Uploads | 948e5d1126d46bdd2f89a44c54ba62b0f0a1f5e1 | 7bc77cb1ed33745c720952c92b3b2747c5cbf2df | refs/heads/master | 2020-04-09T02:43:26.499817 | 2018-02-03T05:31:52 | 2018-02-03T05:31:52 | 37,975,407 | 3 | 12 | null | null | null | null | UTF-8 | Scilab | false | false | 191 | sce | ex_3_9.sce | //example no.3.9
//solving the system using inverse of the cofficient matrix
A=[1 1 1;4 3 -1;3 5 3]
I=[1 0 0;0 1 0;0 0 1]
b=[1 ;6 ;4]
M=jorden(A,I)
IA=M(1:3,4:6)
X=IA*b
|
c674c95f53f8b4090463a6d5495adeda80810a67 | e9d5f5cf984c905c31f197577d633705e835780a | /data_reconciliation/nonlinear/scilab/nonlin_ammonia/ammonia_plant.sce | 85cbc766d4121e0d162040c51dd8acd2dd1421cc | [] | no_license | faiz-hub/dr-ged-benchmarks | 1ad57a69ed90fe7595c006efdc262d703e22d6c0 | 98b250db9e9f09d42b3413551ce7a346dd99400c | refs/heads/master | 2021-05-18T23:12:18.631904 | 2020-03-30T21:12:16 | 2020-03-30T21:12:16 | null | 0 | 0 | null | null | null | null | UTF-8 | Scilab | false | false | 8,458 | sce | ammonia_plant.sce | // Data Reconciliation Benchmark Problems From Lietrature Review
// Author: Edson Cordeiro do Valle
// Contact - edsoncv@{gmail.com}{vrtech.com.br}
// Skype: edson.cv
// Ammonia plant based on paper from and text book from
// 11 Streams
// 6 Equipments
// 5 Compounds
// each stream has the following structure:
//P(bar_abs), F(kgmole/h), T(oC), x_H2 (molar fraction) , x_N2 , x_Ar , x_CH4 , x_NH3
// which are splitted in 2 parts: P, F, T and x_H2 , x_N2 , x_Ar , x_CH4 , x_NH3
getd('.');
getd('../functions');
clear tstraoflow_full tstraoflow tstraocomp_full tstraocomp At umeas fixed red lower upper var_lin_type constr_lin_type constr_lhs constr_rhs just_measured observ non_obs spec_cand x_sol f_sol lower upper extra xmfull ncomp var jac nc nv nnzjac nnz_hess sparse_dg sparse_dh lower upper var_lin_type constr_lin_type constr_lhs constr_rhs
// exact simulation data
// 1 2 3 4 5 6 7 8 9 10 11
//stream_main_full = [10 210 210 200 200 199 199 199 199 210 199
// 907 907 1565.87 1565.87 1208.40 1208.40 844.71 185.84 658.87 658.87 363.69
// 27 453.9 252.3 410.0 410.0 -34.0 -34.0 -34.0 -34.0 -30 -34.0];
//
//Measurement data
// 1 2 3 4 5 6 7 8 9 10 11
stream_main_full = [10 212 210 209 205 203 199 199 199 210 199
900 907 1565.87 1575.87 1200.40 1218.40 854.71 189.84 640.87 668.87 373.69
27 443.9 250.3 412.0 412.0 -32.0 -34.0 -34.0 -34.0 -30.0 -34.0];
//information of measured/unmeasured(-1)/fixed(-5)
// 1 2 3 4 5 6 7 8 9 10 11
stream_main = [ -5 210 -1 -1 205 199 -1 -1 -1 -5 -1
907 -1 -1 1575.87 -1 -1 -1 189.84 640.87 -1 373.69
-5 443.9 250.3 412.0 412.0 -32.0 -1 -1 -1 -29 -1];
// 1 2 3 4 5 6 7 8 9 10 11
stream_comp_full = [ 0.74 0.74 0.7293 0.7293 0.5013 0.5013 0.7146 0.7146 0.7146 0.7146 0.0060
0.24 0.24 0.2237 0.2237 0.1420 0.1420 0.2013 0.2013 0.2013 0.2013 0.0042
0.01 0.01 0.0229 0.0229 0.0297 0.0297 0.0407 0.0407 0.0407 0.0407 0.0041
0.01 0.01 0.0214 0.0214 0.0277 0.0277 0.0371 0.0371 0.0371 0.0371 0.0060
1.0e-4 1.0e-4 0.0026 0.0026 0.2993 0.2993 0.0063 0.0063 0.0063 0.0063 0.9797 ];
//
//stream_comp_full = [ 0.78 0.74 0.7 0.7293 0.5013 0.5013 0.75 0.7146 0.7146 0.7146 0.0060
// 0.27 0.24 0.2 0.2237 0.1420 0.1420 0.2213 0.2013 0.2013 0.2013 0.0042
// 0.01 0.01 0.02 0.0229 0.0297 0.0297 0.0207 0.0407 0.0407 0.0407 0.0041
// 0.01 0.01 0.0214 0.0214 0.0277 0.0277 0.0171 0.0371 0.0371 0.0371 0.0060
// 1.0e-4 1.0e-4 0.0026 0.0026 0.2993 0.3393 0.0063 0.0063 0.0063 0.0063 0.92 ];
//information of measured/unmeasured(-1)/fixed(-5)
// 1 2 3 4 5 6 7 8 9 10 11
stream_comp =[ 0.74 -1 -1 0.729 -1 -1 0.715 -1 -1 -1 0.006
0.24 -1 -1 0.224 -1 -1 0.201 -1 -1 -1 0.004
0.01 -1 -1 0.023 -1 -1 0.041 -1 -1 -1 0.004
0.01 -1 -1 0.021 -1 -1 0.037 -1 -1 -1 0.006
1.0e-4 -1 -1 0.003 -1 -1 0.006 -1 -1 -1 0.980];
// Q heater 1 , Q heater 2 reaction advance
x_end = [ 7378754; 25921810; 357.472/2];
// organizing the vector for the constraints residuals
xmfull=[matrix(stream_main_full',-1);matrix(stream_comp_full',-1);x_end];
xm=[matrix(stream_main',-1);matrix(stream_comp',-1);[-1;-1;-1]];
// Ki calculation
// Ki were determined by simulation using iiSE process simulator - valid range: -24 to -44
// Ki(T(4)) = a*T(4) + b
//[a; b]
// [H2 N2, Ar, CH4, NH3]
K_coef = [-3.332 -0.789 -0.048 -0.028 0.000320;
15.1240 19.0240 6.8367 0.4276 0.076725373]';
// Cp calculation for stream that is heated before the reactor
// Cp_t = 1.98*(A1 + B1.*tt + C1.*(tt).^2 + D1.* (tt).^-2) (in cal*mol^(-1)*K^(-1))
A1 = [3.249 3.28 2.51 1.702 3.578]
B1 = [0.422 0.593 0 9.081 3.020]*1.0e-3
C1 = [0 0 0 -2.164 0 ]*1.0e-6
D1 = [0.083 0.040 0 0 -0.186]*1.0e5
cp_1 = [A1;B1;C1;D1];
// coeficients for calculation of deltaH in the second heat exchanger
// These values were adjusted from simulation data
hh = [25.7407 2212.51;
49.4863 -7630.96];
//the variance
// Pressures are fixed but variances are set to 2 bar
// 5% for flowrates
// 3 oC for temperatures
// 2 % for mole fractions
// for Qheater 1, 2 and reaction advance the var is set to 1 (they do not participate in the reconciliation)
var = zeros(91,1);
var(1:11) = 2*ones(11,1);
var(12:22) = 0.05*xmfull(12:22);
var(23:33) = 3*ones(11,1);
var(34:$ - 3) = 0.02*xmfull(34:$-3);
var($-2:$) = ones(3,1);
[At, umeas, fixed] = jac_flowsheet_residuals(xm, xmfull, K_coef, cp_1, hh, 0.22);
[red, just_measured, observ, non_obs, spec_cand] = qrlinclass(At,umeas);
//pause
// reconcile with all measured to reconcile with only redundant variables, uncomment the "red" assignments
measured = setdiff([1:91], umeas);
// to reconcile with all variables, uncomment bellow
//measured = [1:91];
red = measured;
nmeasured = length(measured);
// to run robust reconciliation,, one must choose between the folowing objective functions to set up the functions path and function parameters:
//WLS = 0
// Absolute sum of squares = 1
//Cauchy = 2
//Contamined Normal = 3
//Fair = 4
//Hampel = 5
//Logistic = 6
//Lorenztian = 7
//Quasi Weighted = 8
// run the configuration functions with the desired objective function type
obj_function_type = 0;
exec ../functions/setup_DR.sce;
// to run robust reconciliation, it is also necessary to choose the function to return the problem structure
// return the problem structure (jacobian, hessian, number of non-zeros, variable type, etc)
[nc, nv, nnzjac, nnz_hess, sparse_dg, sparse_dh, lower, upper, var_lin_type, constr_lin_type, constr_lhs, constr_rhs] = structure_ammonia(xm, xmfull, K_coef, cp_1, hh, 0.22);
lower(fixed) = xmfull(fixed);
upper(fixed) = xmfull(fixed);
params = init_param();
// We use the given Hessian
//params = add_param(params,"hessian_constant","yes");
//params = add_param(params,"hessian_approximation","exact");
// uncheck bellow to test derivatives
//params = add_param(params,"derivative_test","second-order");
//params = add_param(params,"derivative_test","first-order");
params = add_param(params,"tol",1e-1);
params = add_param(params,"acceptable_tol",1e-1);
//params = add_param(params,"mu_strategy","monotone");
//params = add_param(params,"expect_infeasible_problem","yes");
//params = add_param(params,"expect_infeasible_problem","yes");
//params = add_param(params,"mu_strategy","adaptive");
params = add_param(params,"fixed_variable_treatment", "relax_bounds")
params = add_param(params,"journal_level",5);
params = add_param(params,"max_iter",60);
disp('begore start ipopt')
tic
// if the user want to use random initial guess, uncomment 2 lines bellow and comment the 3rd line
//xrand = rand(30,1);
//[x_sol, f_sol, extra] = ipopt(xrand, objfun, gradf, confun, dg1, sparse_dg, dh, sparse_dh, var_lin_type, constr_lin_type, constr_rhs, constr_lhs, lower, upper, params);
[x_sol, f_sol, extra] = ipopt(xmfull, objfun, gradf, confun, dg1, sparse_dg, dh, sparse_dh, var_lin_type, constr_lin_type, constr_rhs, constr_lhs, lower, upper, params);
toc
//mprintf("\n\nSolution: , x\n");
//for i = 1 : nv
// mprintf("x[%d] = %e\n", i, x_sol(i));
//end
//
//mprintf("\n\nObjective value at optimal point\n");
//mprintf("f(x*) = %e\n", f_sol);
[[1:83]' constr_rhs constr_lhs flowsheet_residuals(x_sol, K_coef, cp_1, hh, 0.22)]
xc2 = matrix(xmfull(1:$-3), 11,8)'
xc1 = matrix(x_sol(1:$-3), 11,8)'
|
72f4cf741dcbec92f6aed3db76d2cd8cae44e547 | 449d555969bfd7befe906877abab098c6e63a0e8 | /1646/CH12/EX12.8/Ch12Ex8.sce | c2ecbf37bff85856b582a9842e241c5e0437a195 | [] | no_license | FOSSEE/Scilab-TBC-Uploads | 948e5d1126d46bdd2f89a44c54ba62b0f0a1f5e1 | 7bc77cb1ed33745c720952c92b3b2747c5cbf2df | refs/heads/master | 2020-04-09T02:43:26.499817 | 2018-02-03T05:31:52 | 2018-02-03T05:31:52 | 37,975,407 | 3 | 12 | null | null | null | null | UTF-8 | Scilab | false | false | 530 | sce | Ch12Ex8.sce | // Scilab Code Ex12.8 :Page-607 (2011)
clc; clear;
A = 500;....// Area of the B-H loop, joule per metre cube
n = 50;....// Total number of cycles, Hz
m = 9;....// Mass of the core, kg
d = 7.5e+3;....// Density of the core, kg/metre cube
t = 3600;....// Time during which the energy loss takes place, s
V = m/d;....// Volume of the core, metre cube
E = n*V*A*t;....// Hystersis loss of energy per hour, joule
printf("\nThe hystersis loss per hour = %5.2eJ", E);
// Result
// The hystersis loss per hour = 1.08e+005J
|
71d0dbdc99bb390e4e9fb0020f03acc7cb2150f0 | 449d555969bfd7befe906877abab098c6e63a0e8 | /2660/CH14/EX14.6/Ex14_6.sce | 4fd74e657cb8cb7e1bf2dbe624443dba8f8e15d8 | [] | no_license | FOSSEE/Scilab-TBC-Uploads | 948e5d1126d46bdd2f89a44c54ba62b0f0a1f5e1 | 7bc77cb1ed33745c720952c92b3b2747c5cbf2df | refs/heads/master | 2020-04-09T02:43:26.499817 | 2018-02-03T05:31:52 | 2018-02-03T05:31:52 | 37,975,407 | 3 | 12 | null | null | null | null | UTF-8 | Scilab | false | false | 623 | sce | Ex14_6.sce | clc
t = 0.2 // uncut chip thickness in mm
alpha = 15 // rake angle in degrees
tc = 0.62 // chip thickness in mm
r = t/tc // chip thickness ratio
crc = 1/r // chip reduction coefficient
printf("\n Cutting ratio = %0.3f\n Chip reduction co-efficient = %0.1f" , r , crc)
alpha = alpha*%pi/180 // rake angle in radians
phi = atan(r*cos(alpha)/(1-r*sin(alpha))) // shear angle
phi = phi*180/%pi // shear angle
printf("\n Shear angle = %0.2f degree" , phi)
ss = cotg(phi*%pi/180) + tan((phi*%pi)/180-(alpha*%pi)/180) // shear strain
printf("\n shear strain = %0.3f" , ss)
// 'Answers vary due to round off error'
|
abe4bb5fb9ae5ee4f3f55098f89ed83991c46875 | 36c5f94ce0d09d8d1cc8d0f9d79ecccaa78036bd | /FoxyPewPew Apex v2.sce | 88bd10dc475014029ae0af9e191302ca01b0a1e5 | [] | no_license | Ahmad6543/Scenarios | cef76bf19d46e86249a6099c01928e4e33db5f20 | 6a4563d241e61a62020f76796762df5ae8817cc8 | refs/heads/master | 2023-03-18T23:30:49.653812 | 2020-09-23T06:26:05 | 2020-09-23T06:26:05 | null | 0 | 0 | null | null | null | null | UTF-8 | Scilab | false | false | 46,820 | sce | FoxyPewPew Apex v2.sce | Name=FoxyPewPew Apex v2
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GameTag=Apex Legends
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Description=Potatos go here
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DamageKnockbackFactor=4.0
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AirControl=0.25
CanCrouch=true
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EnemyBodyColor=X=0.771 Y=0.000 Z=0.000
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TeamBodyColor=X=1.000 Y=0.888 Z=0.000
TeamHeadColor=X=1.000 Y=1.000 Z=1.000
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InvinciblePlayer=false
InvincibleBots=false
BlockTeamDamage=false
AirJumpCount=0
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ProjBBType=Cylindrical
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ProjBBRadius=55.0
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ProjBBHeadRadius=45.0
ProjBBHeadOffset=0.0
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HasJetpack=false
JetpackActivationDelay=0.2
JetpackFullFuelTime=4.0
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JetpackAirControlWithThrust=0.25
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MinJumpTime=0.0
MaxJumpTime=0.0
LeftStrafeTimeMult=0.9
RightStrafeTimeMult=1.0
StrafeSwapMinPause=0.0
StrafeSwapMaxPause=0.0
BlockedMovementPercent=0.5
BlockedMovementReactionMin=0.125
BlockedMovementReactionMax=0.2
[Dodge Profile]
Name=Long Strafes Jumping
MaxTargetDistance=2500.0
MinTargetDistance=750.0
ToggleLeftRight=true
ToggleForwardBack=false
MinLRTimeChange=0.5
MaxLRTimeChange=1.5
MinFBTimeChange=0.2
MaxFBTimeChange=0.5
DamageReactionChangesDirection=false
DamageReactionChanceToIgnore=0.5
DamageReactionMinimumDelay=0.125
DamageReactionMaximumDelay=0.25
DamageReactionCooldown=1.0
DamageReactionThreshold=0.0
DamageReactionResetTimer=0.1
JumpFrequency=0.65
CrouchInAirFrequency=0.0
CrouchOnGroundFrequency=0.0
TargetStrafeOverride=Ignore
TargetStrafeMinDelay=0.125
TargetStrafeMaxDelay=0.25
MinProfileChangeTime=0.0
MaxProfileChangeTime=0.0
MinCrouchTime=0.3
MaxCrouchTime=0.6
MinJumpTime=0.3
MaxJumpTime=0.6
LeftStrafeTimeMult=1.0
RightStrafeTimeMult=1.0
StrafeSwapMinPause=0.0
StrafeSwapMaxPause=0.0
BlockedMovementPercent=0.5
BlockedMovementReactionMin=0.125
BlockedMovementReactionMax=0.2
[Weapon Profile]
Name=LG
Type=Hitscan
ShotsPerClick=1
DamagePerShot=6.0
KnockbackFactor=2.0
TimeBetweenShots=0.046
Pierces=false
Category=FullyAuto
BurstShotCount=1
TimeBetweenBursts=0.5
ChargeStartDamage=10.0
ChargeStartVelocity=X=500.000 Y=0.000 Z=0.000
ChargeTimeToAutoRelease=2.0
ChargeTimeToCap=1.0
ChargeMoveSpeedModifier=1.0
MuzzleVelocityMin=X=2000.000 Y=0.000 Z=0.000
MuzzleVelocityMax=X=2000.000 Y=0.000 Z=0.000
InheritOwnerVelocity=0.0
OriginOffset=X=0.000 Y=0.000 Z=0.000
MaxTravelTime=5.0
MaxHitscanRange=100000.0
GravityScale=1.0
HeadshotCapable=false
HeadshotMultiplier=2.0
MagazineMax=0
AmmoPerShot=1
ReloadTimeFromEmpty=0.5
ReloadTimeFromPartial=0.5
DamageFalloffStartDistance=100000.0
DamageFalloffStopDistance=100000.0
DamageAtMaxRange=7.0
DelayBeforeShot=0.0
HitscanVisualEffect=Tracer
ProjectileGraphic=Ball
VisualLifetime=0.05
WallParticleEffect=None
HitParticleEffect=None
BounceOffWorld=false
BounceFactor=0.0
BounceCount=0
HomingProjectileAcceleration=0.0
ProjectileEnemyHitRadius=1.0
CanAimDownSight=false
ADSZoomDelay=0.0
ADSZoomSensFactor=0.7
ADSMoveFactor=1.0
ADSStartDelay=0.0
ShootSoundCooldown=0.08
HitSoundCooldown=0.08
HitscanVisualOffset=X=0.000 Y=0.000 Z=-80.000
ADSBlocksShooting=false
ShootingBlocksADS=false
KnockbackFactorAir=4.0
RecoilNegatable=false
DecalType=0
DecalSize=30.0
DelayAfterShooting=0.0
BeamTracksCrosshair=true
AlsoShoot=
ADSShoot=
StunDuration=0.0
CircularSpread=true
SpreadStationaryVelocity=0.0
PassiveCharging=false
BurstFullyAuto=true
FlatKnockbackHorizontal=0.0
FlatKnockbackVertical=0.0
HitscanRadius=0.0
HitscanVisualRadius=6.0
TaggingDuration=0.0
TaggingMaxFactor=1.0
TaggingHitFactor=1.0
ProjectileTrail=None
RecoilCrouchScale=1.0
RecoilADSScale=1.0
PSRCrouchScale=1.0
PSRADSScale=1.0
ProjectileAcceleration=0.0
AccelIncludeVertical=true
AimPunchAmount=0.0
AimPunchResetTime=0.05
AimPunchCooldown=0.5
AimPunchHeadshotOnly=false
AimPunchCosmeticOnly=true
MinimumDecelVelocity=0.0
PSRManualNegation=false
PSRAutoReset=true
AimPunchUpTime=0.05
AmmoReloadedOnKill=0
CancelReloadOnKill=false
FlatKnockbackHorizontalMin=0.0
FlatKnockbackVerticalMin=0.0
ADSScope=No Scope
ADSFOVOverride=72.099998
ADSFOVScale=Quake/Source
ADSAllowUserOverrideFOV=true
IsBurstWeapon=false
ForceFirstPersonInADS=true
ZoomBlockedInAir=false
ADSCameraOffsetX=0.0
ADSCameraOffsetY=0.0
ADSCameraOffsetZ=0.0
QuickSwitchTime=0.0
Explosive=false
Radius=500.0
DamageAtCenter=100.0
DamageAtEdge=0.0
SelfDamageMultiplier=0.5
ExplodesOnContactWithEnemy=false
DelayAfterEnemyContact=0.0
ExplodesOnContactWithWorld=false
DelayAfterWorldContact=0.0
ExplodesOnNextAttack=false
DelayAfterSpawn=0.0
BlockedByWorld=false
SpreadSSA=1.0,1.0,-1.0,0.0
SpreadSCA=1.0,1.0,-1.0,0.0
SpreadMSA=1.0,1.0,-1.0,0.0
SpreadMCA=1.0,1.0,-1.0,0.0
SpreadSSH=1.0,1.0,-1.0,0.0
SpreadSCH=1.0,1.0,-1.0,0.0
SpreadMSH=1.0,1.0,-1.0,0.0
SpreadMCH=1.0,1.0,-1.0,0.0
MaxRecoilUp=0.0
MinRecoilUp=0.0
MinRecoilHoriz=0.0
MaxRecoilHoriz=0.0
FirstShotRecoilMult=1.0
RecoilAutoReset=false
TimeToRecoilPeak=0.05
TimeToRecoilReset=0.35
AAMode=0
AAPreferClosestPlayer=false
AAAlpha=0.05
AAMaxSpeed=1.0
AADeadZone=0.0
AAFOV=30.0
AANeedsLOS=true
TrackHorizontal=true
TrackVertical=true
AABlocksMouse=false
AAOffTimer=0.0
AABackOnTimer=0.0
TriggerBotEnabled=false
TriggerBotDelay=0.0
TriggerBotFOV=1.0
StickyLock=false
HeadLock=false
VerticalOffset=0.0
DisableLockOnKill=false
UsePerShotRecoil=false
PSRLoopStartIndex=0
PSRViewRecoilTracking=0.45
PSRCapUp=9.0
PSRCapRight=4.0
PSRCapLeft=4.0
PSRTimeToPeak=0.095
PSRResetDegreesPerSec=40.0
UsePerBulletSpread=false
[Weapon Profile]
Name=AK-47
Type=Hitscan
ShotsPerClick=1
DamagePerShot=36.0
KnockbackFactor=0.2
TimeBetweenShots=0.1
Pierces=false
Category=FullyAuto
BurstShotCount=2
TimeBetweenBursts=0.1
ChargeStartDamage=0.1
ChargeStartVelocity=X=1500.000 Y=0.000 Z=0.000
ChargeTimeToAutoRelease=2.0
ChargeTimeToCap=1.0
ChargeMoveSpeedModifier=1.0
MuzzleVelocityMin=X=3000.000 Y=0.000 Z=0.000
MuzzleVelocityMax=X=3000.000 Y=0.000 Z=0.000
InheritOwnerVelocity=0.0
OriginOffset=X=0.000 Y=0.000 Z=0.000
MaxTravelTime=3.0
MaxHitscanRange=100000.0
GravityScale=1.0
HeadshotCapable=true
HeadshotMultiplier=4.0
MagazineMax=30
AmmoPerShot=1
ReloadTimeFromEmpty=1.5
ReloadTimeFromPartial=1.5
DamageFalloffStartDistance=4000.0
DamageFalloffStopDistance=7500.0
DamageAtMaxRange=25.0
DelayBeforeShot=0.0
HitscanVisualEffect=Tracer
ProjectileGraphic=Ball
VisualLifetime=0.02
WallParticleEffect=Gunshot
HitParticleEffect=Blood
BounceOffWorld=true
BounceFactor=0.6
BounceCount=0
HomingProjectileAcceleration=6000.0
ProjectileEnemyHitRadius=0.1
CanAimDownSight=false
ADSZoomDelay=0.0
ADSZoomSensFactor=0.1
ADSMoveFactor=1.0
ADSStartDelay=0.0
ShootSoundCooldown=0.08
HitSoundCooldown=0.08
HitscanVisualOffset=X=0.000 Y=0.000 Z=-40.000
ADSBlocksShooting=false
ShootingBlocksADS=false
KnockbackFactorAir=0.2
RecoilNegatable=false
DecalType=1
DecalSize=30.0
DelayAfterShooting=0.0
BeamTracksCrosshair=false
AlsoShoot=
ADSShoot=
StunDuration=0.0
CircularSpread=true
SpreadStationaryVelocity=390.0
PassiveCharging=false
BurstFullyAuto=true
FlatKnockbackHorizontal=0.0
FlatKnockbackVertical=0.0
HitscanRadius=0.0
HitscanVisualRadius=6.0
TaggingDuration=0.0
TaggingMaxFactor=1.0
TaggingHitFactor=1.0
ProjectileTrail=None
RecoilCrouchScale=1.0
RecoilADSScale=1.0
PSRCrouchScale=1.0
PSRADSScale=1.0
ProjectileAcceleration=0.0
AccelIncludeVertical=true
AimPunchAmount=0.0
AimPunchResetTime=0.05
AimPunchCooldown=0.5
AimPunchHeadshotOnly=false
AimPunchCosmeticOnly=true
MinimumDecelVelocity=0.0
PSRManualNegation=false
PSRAutoReset=true
AimPunchUpTime=0.05
AmmoReloadedOnKill=0
CancelReloadOnKill=false
FlatKnockbackHorizontalMin=0.0
FlatKnockbackVerticalMin=0.0
ADSScope=No Scope
ADSFOVOverride=10.3
ADSFOVScale=Horizontal (16:9)
ADSAllowUserOverrideFOV=true
IsBurstWeapon=false
ForceFirstPersonInADS=true
ZoomBlockedInAir=false
ADSCameraOffsetX=0.0
ADSCameraOffsetY=0.0
ADSCameraOffsetZ=0.0
QuickSwitchTime=0.1
Explosive=false
Radius=500.0
DamageAtCenter=100.0
DamageAtEdge=0.1
SelfDamageMultiplier=0.5
ExplodesOnContactWithEnemy=true
DelayAfterEnemyContact=0.0
ExplodesOnContactWithWorld=true
DelayAfterWorldContact=0.0
ExplodesOnNextAttack=false
DelayAfterSpawn=5.0
BlockedByWorld=true
SpreadSSA=4.0,15.0,-9.0,2.5
SpreadSCA=4.0,15.0,-9.0,2.5
SpreadMSA=4.0,15.0,-9.0,2.5
SpreadMCA=4.0,15.0,-9.0,2.5
SpreadSSH=2.0,27.0,-9.0,1.5
SpreadSCH=2.0,27.0,-9.0,0.0
SpreadMSH=100.0,1000.0,5.0,20.0
SpreadMCH=4.0,15.0,-9.0,1.8
MaxRecoilUp=0.3
MinRecoilUp=0.3
MinRecoilHoriz=-0.3
MaxRecoilHoriz=0.3
FirstShotRecoilMult=1.0
RecoilAutoReset=true
TimeToRecoilPeak=0.0001
TimeToRecoilReset=0.075
AAMode=0
AAPreferClosestPlayer=false
AAAlpha=0.1
AAMaxSpeed=5.0
AADeadZone=0.0
AAFOV=10.0
AANeedsLOS=true
TrackHorizontal=true
TrackVertical=true
AABlocksMouse=false
AAOffTimer=0.0
AABackOnTimer=0.0
TriggerBotEnabled=false
TriggerBotDelay=0.0
TriggerBotFOV=0.1
StickyLock=false
HeadLock=true
VerticalOffset=0.0
DisableLockOnKill=false
UsePerShotRecoil=true
PSRLoopStartIndex=10
PSRViewRecoilTracking=0.45
PSRCapUp=90.0
PSRCapRight=90.0
PSRCapLeft=90.0
PSRTimeToPeak=0.16
PSRResetDegreesPerSec=35.0
PSR0=0.5,0.0
PSR1=1.2,-0.1
PSR2=1.7,0.2
PSR3=1.7,0.2
PSR4=1.7,-0.85
PSR5=1.3,-0.45
PSR6=1.3,-0.75
PSR7=0.9,0.75
PSR8=-0.4,2.55
PSR9=0.75,0.95
PSR10=0.75,0.4
PSR11=-0.6,0.4
PSR12=0.35,1.0
PSR13=0.4,0.25
PSR14=-0.9,-1.5
PSR15=0.4,-1.0
PSR16=0.5,-1.3
PSR17=0.1,-1.6
PSR18=-0.7,-1.25
PSR19=0.2,-0.5
PSR20=0.2,0.1
PSR21=0.0,0.5
PSR22=0.3,0.1
PSR23=0.2,0.5
PSR24=0.5,-1.0
PSR25=-0.1,1.2
PSR26=-0.3,1.1
PSR27=-1.2,2.0
PSR28=0.1,1.4
PSR29=-0.1,0.0
UsePerBulletSpread=false
PBS0=0.0,0.0
[Weapon Profile]
Name=M4A1-S
Type=Hitscan
ShotsPerClick=1
DamagePerShot=33.0
KnockbackFactor=0.1
TimeBetweenShots=0.1
Pierces=false
Category=FullyAuto
BurstShotCount=2
TimeBetweenBursts=0.1
ChargeStartDamage=0.1
ChargeStartVelocity=X=1500.000 Y=0.000 Z=0.000
ChargeTimeToAutoRelease=2.0
ChargeTimeToCap=1.0
ChargeMoveSpeedModifier=1.0
MuzzleVelocityMin=X=3000.000 Y=0.000 Z=0.000
MuzzleVelocityMax=X=3000.000 Y=0.000 Z=0.000
InheritOwnerVelocity=0.0
OriginOffset=X=0.000 Y=0.000 Z=0.000
MaxTravelTime=3.0
MaxHitscanRange=100000.0
GravityScale=1.0
HeadshotCapable=true
HeadshotMultiplier=3.0
MagazineMax=20
AmmoPerShot=1
ReloadTimeFromEmpty=1.37
ReloadTimeFromPartial=1.37
DamageFalloffStartDistance=3000.0
DamageFalloffStopDistance=7000.0
DamageAtMaxRange=25.0
DelayBeforeShot=0.0
HitscanVisualEffect=Tracer
ProjectileGraphic=Ball
VisualLifetime=0.1
WallParticleEffect=Gunshot
HitParticleEffect=Blood
BounceOffWorld=true
BounceFactor=0.6
BounceCount=0
HomingProjectileAcceleration=6000.0
ProjectileEnemyHitRadius=0.1
CanAimDownSight=false
ADSZoomDelay=0.0
ADSZoomSensFactor=0.1
ADSMoveFactor=1.0
ADSStartDelay=0.0
ShootSoundCooldown=0.08
HitSoundCooldown=0.08
HitscanVisualOffset=X=0.000 Y=0.000 Z=-50.000
ADSBlocksShooting=false
ShootingBlocksADS=false
KnockbackFactorAir=0.1
RecoilNegatable=false
DecalType=1
DecalSize=30.0
DelayAfterShooting=0.0
BeamTracksCrosshair=false
AlsoShoot=
ADSShoot=
StunDuration=0.0
CircularSpread=true
SpreadStationaryVelocity=410.0
PassiveCharging=false
BurstFullyAuto=true
FlatKnockbackHorizontal=0.0
FlatKnockbackVertical=0.0
HitscanRadius=0.0
HitscanVisualRadius=6.0
TaggingDuration=0.0
TaggingMaxFactor=1.0
TaggingHitFactor=1.0
ProjectileTrail=None
RecoilCrouchScale=1.0
RecoilADSScale=1.0
PSRCrouchScale=1.0
PSRADSScale=1.0
ProjectileAcceleration=0.0
AccelIncludeVertical=true
AimPunchAmount=0.0
AimPunchResetTime=0.05
AimPunchCooldown=0.5
AimPunchHeadshotOnly=false
AimPunchCosmeticOnly=true
MinimumDecelVelocity=0.0
PSRManualNegation=false
PSRAutoReset=true
AimPunchUpTime=0.05
AmmoReloadedOnKill=0
CancelReloadOnKill=false
FlatKnockbackHorizontalMin=0.0
FlatKnockbackVerticalMin=0.0
ADSScope=No Scope
ADSFOVOverride=10.3
ADSFOVScale=Horizontal (16:9)
ADSAllowUserOverrideFOV=true
IsBurstWeapon=false
ForceFirstPersonInADS=true
ZoomBlockedInAir=false
ADSCameraOffsetX=0.0
ADSCameraOffsetY=0.0
ADSCameraOffsetZ=0.0
QuickSwitchTime=0.0
Explosive=false
Radius=500.0
DamageAtCenter=100.0
DamageAtEdge=0.1
SelfDamageMultiplier=0.5
ExplodesOnContactWithEnemy=true
DelayAfterEnemyContact=0.0
ExplodesOnContactWithWorld=true
DelayAfterWorldContact=0.0
ExplodesOnNextAttack=false
DelayAfterSpawn=5.0
BlockedByWorld=true
SpreadSSA=4.0,15.0,-9.0,2.5
SpreadSCA=4.0,15.0,-9.0,2.5
SpreadMSA=4.0,15.0,-9.0,2.5
SpreadMCA=4.0,15.0,-9.0,2.5
SpreadSSH=1.5,27.0,-9.0,1.0
SpreadSCH=1.5,27.0,-9.0,0.0
SpreadMSH=100.0,1000.0,5.0,20.0
SpreadMCH=4.0,15.0,-9.0,1.8
MaxRecoilUp=0.3
MinRecoilUp=0.3
MinRecoilHoriz=-0.3
MaxRecoilHoriz=0.3
FirstShotRecoilMult=1.0
RecoilAutoReset=true
TimeToRecoilPeak=0.0001
TimeToRecoilReset=0.075
AAMode=0
AAPreferClosestPlayer=false
AAAlpha=0.05
AAMaxSpeed=2.0
AADeadZone=0.0
AAFOV=15.0
AANeedsLOS=true
TrackHorizontal=true
TrackVertical=true
AABlocksMouse=false
AAOffTimer=0.0
AABackOnTimer=0.0
TriggerBotEnabled=false
TriggerBotDelay=0.0
TriggerBotFOV=0.1
StickyLock=false
HeadLock=true
VerticalOffset=0.0
DisableLockOnKill=false
UsePerShotRecoil=true
PSRLoopStartIndex=0
PSRViewRecoilTracking=0.45
PSRCapUp=90.0
PSRCapRight=90.0
PSRCapLeft=90.0
PSRTimeToPeak=0.175
PSRResetDegreesPerSec=35.0
PSR0=0.4,-0.1
PSR1=0.4,0.0
PSR2=0.9,0.4
PSR3=1.0,-0.5
PSR4=1.0,0.6
PSR5=1.2,0.3
PSR6=0.7,-0.6
PSR7=0.8,-0.5
PSR8=0.3,-1.3
PSR9=0.8,0.5
PSR10=0.3,1.0
PSR11=-0.4,1.2
PSR12=0.0,1.1
PSR13=0.1,1.0
PSR14=-0.2,-0.4
PSR15=0.4,0.1
PSR16=-0.4,1.0
PSR17=0.4,-1.0
PSR18=0.0,1.0
PSR19=-0.1,-1.0
UsePerBulletSpread=false
PBS0=0.0,0.0
[Weapon Profile]
Name=m4a4
Type=Hitscan
ShotsPerClick=1
DamagePerShot=33.0
KnockbackFactor=0.2
TimeBetweenShots=0.09
Pierces=false
Category=FullyAuto
BurstShotCount=2
TimeBetweenBursts=0.1
ChargeStartDamage=0.1
ChargeStartVelocity=X=1500.000 Y=0.000 Z=0.000
ChargeTimeToAutoRelease=2.0
ChargeTimeToCap=1.0
ChargeMoveSpeedModifier=1.0
MuzzleVelocityMin=X=3000.000 Y=0.000 Z=0.000
MuzzleVelocityMax=X=3000.000 Y=0.000 Z=0.000
InheritOwnerVelocity=0.0
OriginOffset=X=0.000 Y=0.000 Z=0.000
MaxTravelTime=3.0
MaxHitscanRange=100000.0
GravityScale=1.0
HeadshotCapable=true
HeadshotMultiplier=2.0
MagazineMax=30
AmmoPerShot=1
ReloadTimeFromEmpty=2.7
ReloadTimeFromPartial=2.7
DamageFalloffStartDistance=3000.0
DamageFalloffStopDistance=7500.0
DamageAtMaxRange=25.0
DelayBeforeShot=0.0
HitscanVisualEffect=Tracer
ProjectileGraphic=Ball
VisualLifetime=0.02
WallParticleEffect=Gunshot
HitParticleEffect=Blood
BounceOffWorld=true
BounceFactor=0.6
BounceCount=0
HomingProjectileAcceleration=6000.0
ProjectileEnemyHitRadius=0.1
CanAimDownSight=false
ADSZoomDelay=0.0
ADSZoomSensFactor=0.1
ADSMoveFactor=1.0
ADSStartDelay=0.0
ShootSoundCooldown=0.08
HitSoundCooldown=0.08
HitscanVisualOffset=X=0.000 Y=0.000 Z=-40.000
ADSBlocksShooting=false
ShootingBlocksADS=false
KnockbackFactorAir=0.2
RecoilNegatable=false
DecalType=1
DecalSize=30.0
DelayAfterShooting=0.0
BeamTracksCrosshair=false
AlsoShoot=
ADSShoot=
StunDuration=0.0
CircularSpread=true
SpreadStationaryVelocity=410.0
PassiveCharging=false
BurstFullyAuto=true
FlatKnockbackHorizontal=0.0
FlatKnockbackVertical=0.0
HitscanRadius=0.0
HitscanVisualRadius=6.0
TaggingDuration=0.0
TaggingMaxFactor=1.0
TaggingHitFactor=1.0
ProjectileTrail=None
RecoilCrouchScale=1.0
RecoilADSScale=1.0
PSRCrouchScale=1.0
PSRADSScale=1.0
ProjectileAcceleration=0.0
AccelIncludeVertical=true
AimPunchAmount=0.0
AimPunchResetTime=0.05
AimPunchCooldown=0.5
AimPunchHeadshotOnly=false
AimPunchCosmeticOnly=true
MinimumDecelVelocity=0.0
PSRManualNegation=false
PSRAutoReset=true
AimPunchUpTime=0.05
AmmoReloadedOnKill=0
CancelReloadOnKill=false
FlatKnockbackHorizontalMin=0.0
FlatKnockbackVerticalMin=0.0
ADSScope=No Scope
ADSFOVOverride=10.3
ADSFOVScale=Horizontal (16:9)
ADSAllowUserOverrideFOV=true
IsBurstWeapon=false
ForceFirstPersonInADS=true
ZoomBlockedInAir=false
ADSCameraOffsetX=0.0
ADSCameraOffsetY=0.0
ADSCameraOffsetZ=0.0
QuickSwitchTime=0.0
Explosive=false
Radius=500.0
DamageAtCenter=100.0
DamageAtEdge=0.1
SelfDamageMultiplier=0.5
ExplodesOnContactWithEnemy=true
DelayAfterEnemyContact=0.0
ExplodesOnContactWithWorld=true
DelayAfterWorldContact=0.0
ExplodesOnNextAttack=false
DelayAfterSpawn=5.0
BlockedByWorld=true
SpreadSSA=4.0,15.0,-9.0,2.5
SpreadSCA=4.0,15.0,-9.0,2.5
SpreadMSA=4.0,15.0,-9.0,2.5
SpreadMCA=4.0,15.0,-9.0,2.5
SpreadSSH=4.0,27.0,-9.0,1.0
SpreadSCH=4.0,27.0,-9.0,0.0
SpreadMSH=100.0,1000.0,5.0,20.0
SpreadMCH=4.0,15.0,-9.0,1.8
MaxRecoilUp=0.3
MinRecoilUp=0.3
MinRecoilHoriz=-0.3
MaxRecoilHoriz=0.3
FirstShotRecoilMult=1.0
RecoilAutoReset=true
TimeToRecoilPeak=0.0001
TimeToRecoilReset=0.075
AAMode=0
AAPreferClosestPlayer=false
AAAlpha=0.1
AAMaxSpeed=5.0
AADeadZone=0.0
AAFOV=50.0
AANeedsLOS=true
TrackHorizontal=true
TrackVertical=true
AABlocksMouse=false
AAOffTimer=0.0
AABackOnTimer=0.0
TriggerBotEnabled=false
TriggerBotDelay=0.0
TriggerBotFOV=0.1
StickyLock=false
HeadLock=true
VerticalOffset=0.0
DisableLockOnKill=false
UsePerShotRecoil=true
PSRLoopStartIndex=10
PSRViewRecoilTracking=0.45
PSRCapUp=90.0
PSRCapRight=90.0
PSRCapLeft=90.0
PSRTimeToPeak=0.16
PSRResetDegreesPerSec=35.0
PSR0=0.4,-0.25
PSR1=0.4,-0.1
PSR2=0.9,0.5
PSR3=1.2,-0.5
PSR4=1.1,0.4
PSR5=1.3,0.4
PSR6=0.9,-1.0
PSR7=0.7,-0.75
PSR8=0.5,-1.1
PSR9=0.6,-0.3
PSR10=0.7,0.5
PSR11=-0.4,1.5
PSR12=0.1,1.7
PSR13=-0.3,1.3
PSR14=0.2,1.0
PSR15=0.2,-0.9
PSR16=-0.1,0.0
PSR17=0.3,0.5
PSR18=0.2,0.5
PSR19=-0.2,0.5
PSR20=-0.2,-0.75
PSR21=0.5,-2.0
PSR22=-0.2,-0.7
PSR23=0.2,-0.6
PSR24=-0.1,-0.75
PSR25=-0.1,-0.5
PSR26=0.3,0.3
PSR27=0.3,-0.4
PSR28=0.1,-0.2
PSR29=0.15,-0.2
PSR30=0.15,-0.2
UsePerBulletSpread=false
PBS0=0.0,0.0
[Weapon Profile]
Name=USP-S
Type=Hitscan
ShotsPerClick=1
DamagePerShot=35.0
KnockbackFactor=1.0
TimeBetweenShots=0.17
Pierces=false
Category=SemiAuto
BurstShotCount=1
TimeBetweenBursts=0.5
ChargeStartDamage=10.0
ChargeStartVelocity=X=500.000 Y=0.000 Z=0.000
ChargeTimeToAutoRelease=2.0
ChargeTimeToCap=1.0
ChargeMoveSpeedModifier=1.0
MuzzleVelocityMin=X=2000.000 Y=0.000 Z=0.000
MuzzleVelocityMax=X=2000.000 Y=0.000 Z=0.000
InheritOwnerVelocity=0.0
OriginOffset=X=0.000 Y=0.000 Z=0.000
MaxTravelTime=5.0
MaxHitscanRange=100000.0
GravityScale=1.0
HeadshotCapable=true
HeadshotMultiplier=2.0
MagazineMax=12
AmmoPerShot=1
ReloadTimeFromEmpty=2.2
ReloadTimeFromPartial=2.2
DamageFalloffStartDistance=300.0
DamageFalloffStopDistance=1000.0
DamageAtMaxRange=33.0
DelayBeforeShot=0.0
HitscanVisualEffect=Tracer
ProjectileGraphic=Ball
VisualLifetime=0.1
WallParticleEffect=Gunshot
HitParticleEffect=Blood
BounceOffWorld=false
BounceFactor=0.5
BounceCount=0
HomingProjectileAcceleration=0.0
ProjectileEnemyHitRadius=1.0
CanAimDownSight=false
ADSZoomDelay=0.0
ADSZoomSensFactor=0.7
ADSMoveFactor=1.0
ADSStartDelay=0.0
ShootSoundCooldown=0.08
HitSoundCooldown=0.08
HitscanVisualOffset=X=0.000 Y=0.000 Z=-50.000
ADSBlocksShooting=false
ShootingBlocksADS=false
KnockbackFactorAir=1.0
RecoilNegatable=false
DecalType=1
DecalSize=30.0
DelayAfterShooting=0.0
BeamTracksCrosshair=false
AlsoShoot=
ADSShoot=
StunDuration=0.0
CircularSpread=true
SpreadStationaryVelocity=400.0
PassiveCharging=false
BurstFullyAuto=true
FlatKnockbackHorizontal=0.0
FlatKnockbackVertical=0.0
HitscanRadius=0.0
HitscanVisualRadius=6.0
TaggingDuration=0.0
TaggingMaxFactor=1.0
TaggingHitFactor=1.0
ProjectileTrail=None
RecoilCrouchScale=1.0
RecoilADSScale=1.0
PSRCrouchScale=1.0
PSRADSScale=1.0
ProjectileAcceleration=0.0
AccelIncludeVertical=true
AimPunchAmount=0.0
AimPunchResetTime=0.05
AimPunchCooldown=0.5
AimPunchHeadshotOnly=false
AimPunchCosmeticOnly=true
MinimumDecelVelocity=0.0
PSRManualNegation=false
PSRAutoReset=true
AimPunchUpTime=0.05
AmmoReloadedOnKill=0
CancelReloadOnKill=false
FlatKnockbackHorizontalMin=0.0
FlatKnockbackVerticalMin=0.0
ADSScope=No Scope
ADSFOVOverride=72.099998
ADSFOVScale=Horizontal (16:9)
ADSAllowUserOverrideFOV=true
IsBurstWeapon=false
ForceFirstPersonInADS=true
ZoomBlockedInAir=false
ADSCameraOffsetX=0.0
ADSCameraOffsetY=0.0
ADSCameraOffsetZ=0.0
QuickSwitchTime=0.0
Explosive=false
Radius=500.0
DamageAtCenter=100.0
DamageAtEdge=100.0
SelfDamageMultiplier=0.5
ExplodesOnContactWithEnemy=false
DelayAfterEnemyContact=0.0
ExplodesOnContactWithWorld=false
DelayAfterWorldContact=0.0
ExplodesOnNextAttack=false
DelayAfterSpawn=0.0
BlockedByWorld=false
SpreadSSA=1.0,1.0,-1.0,5.0
SpreadSCA=1.0,1.0,-1.0,5.0
SpreadMSA=1.0,1.0,-1.0,5.0
SpreadMCA=1.0,1.0,-1.0,5.0
SpreadSSH=5.0,25.0,0.2,7.0
SpreadSCH=1.0,1.0,-1.0,5.0
SpreadMSH=1.0,25.0,2.0,7.0
SpreadMCH=1.0,1.0,-1.0,5.0
MaxRecoilUp=0.3
MinRecoilUp=0.0
MinRecoilHoriz=-0.2
MaxRecoilHoriz=0.2
FirstShotRecoilMult=1.0
RecoilAutoReset=true
TimeToRecoilPeak=0.0001
TimeToRecoilReset=0.075
AAMode=0
AAPreferClosestPlayer=false
AAAlpha=0.1
AAMaxSpeed=5.0
AADeadZone=0.0
AAFOV=50.0
AANeedsLOS=true
TrackHorizontal=true
TrackVertical=true
AABlocksMouse=false
AAOffTimer=0.0
AABackOnTimer=0.0
TriggerBotEnabled=false
TriggerBotDelay=0.0
TriggerBotFOV=1.0
StickyLock=false
HeadLock=true
VerticalOffset=0.0
DisableLockOnKill=false
UsePerShotRecoil=false
PSRLoopStartIndex=0
PSRViewRecoilTracking=0.45
PSRCapUp=9.0
PSRCapRight=4.0
PSRCapLeft=4.0
PSRTimeToPeak=0.175
PSRResetDegreesPerSec=40.0
UsePerBulletSpread=false
PBS0=0.0,0.0
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Bool8 teamB 0
|
4080222624bb407a4c866e05ae16b93dfe910a4c | 449d555969bfd7befe906877abab098c6e63a0e8 | /1595/CH8/EX8.3/ex8_3.sce | 16f09cd11f89d478ecc2c60d244eb85a6d3849aa | [] | no_license | FOSSEE/Scilab-TBC-Uploads | 948e5d1126d46bdd2f89a44c54ba62b0f0a1f5e1 | 7bc77cb1ed33745c720952c92b3b2747c5cbf2df | refs/heads/master | 2020-04-09T02:43:26.499817 | 2018-02-03T05:31:52 | 2018-02-03T05:31:52 | 37,975,407 | 3 | 12 | null | null | null | null | UTF-8 | Scilab | false | false | 470 | sce | ex8_3.sce | //Digital Communication-Coding Techniques : example 8-3 : (pg 368)
R=100*10^3;
Rf=10*10^3;
Vref=-10;
Vo=-(Vref)*(Rf/R);// resolution
a=(10/100);
b=(10/50);
c=(10/25);
d=(10/12.5);
V=-(Vref)*(a+b+c+d);//output voltage
printf("\nThe step-size is determined by leaving all switches open and closing the lsb");
printf("\nVo = -(-10V)(Rf/R) = %.1f",Vo);
printf("\nThe resolution is 1.0. If all switches are closed,a logic 1 is input.");
printf("\nVo = %.f V",V); |
5f6f6fff9c24ecd502bed7b2873263c54e97fac8 | 449d555969bfd7befe906877abab098c6e63a0e8 | /1049/CH3/EX3.20/ch3_20.sce | 1665e5f67f46104830ac27f61684002e50ef0be5 | [] | no_license | FOSSEE/Scilab-TBC-Uploads | 948e5d1126d46bdd2f89a44c54ba62b0f0a1f5e1 | 7bc77cb1ed33745c720952c92b3b2747c5cbf2df | refs/heads/master | 2020-04-09T02:43:26.499817 | 2018-02-03T05:31:52 | 2018-02-03T05:31:52 | 37,975,407 | 3 | 12 | null | null | null | null | UTF-8 | Scilab | false | false | 695 | sce | ch3_20.sce | clear;
clc;
V_l=230;
E=240;
R=8;
V_ml=sqrt(2)*V_l;
V_o=3*V_ml/%pi;
I_o=(V_o-E)/R;
P_b=E*I_o; printf("power delivered to battery=%.1f W",P_b);
P_d=E*I_o+I_o^2*R; printf("\npower delivered to load=%.2f W",P_d);
phi1=0;
DF=cosd(phi1);
printf("\ndisplacement factor=%.0f",DF);
I_s1=2*sqrt(3)*I_o/(sqrt(2)*%pi);
I_s=sqrt(I_o^2*2*%pi/(3*%pi));
CDF=I_s1/I_s; printf("\ncurrent distortion factor=%.3f",CDF);
pf=DF*CDF; printf("\ni/p pf=%.3f",pf);
HF=sqrt(CDF^-2-1); printf("\nharmonic factor=%.4f",HF);
tr=sqrt(3)*V_l*I_o*sqrt(2/3); printf("\ntranformer rating=%.2f VA",tr);
//answers have small variations from the book due to difference in rounding off of digits |
db2938d8bd1b76071843426ff39d074690a8e206 | 449d555969bfd7befe906877abab098c6e63a0e8 | /416/CH3/EX3.17/data3_17c.sce | fd7a7c95c069313ce9ee9b14da32bc218829eacf | [] | no_license | FOSSEE/Scilab-TBC-Uploads | 948e5d1126d46bdd2f89a44c54ba62b0f0a1f5e1 | 7bc77cb1ed33745c720952c92b3b2747c5cbf2df | refs/heads/master | 2020-04-09T02:43:26.499817 | 2018-02-03T05:31:52 | 2018-02-03T05:31:52 | 37,975,407 | 3 | 12 | null | null | null | null | UTF-8 | Scilab | false | false | 640 | sce | data3_17c.sce | clear
clc
disp("dat 3.17")
pco=120*10^3 //3 units of 40MW
caco=68*10^8 //6 year of consumption
inr=0.16 //intrest rate
de=2.5*10^-2 //depreciation
oanm=1.5*10^-2//OandM
ger=0.5*10^-2//general reserve
pllf=0.6 //plant load facot
aucon=0.5*10^-2 //auxiliary consumption
tac=caco*(inr+de+oanm+aucon) ///total cost
engpy=pco*pllf*24*365 //energy generatedper year
eabb=engpy*(1-ger) //energy available at bus bar
geco=tac/eabb //generation cost
printf(" total annual costs is Rs%e per year \n energy generated per year =%ekWh/year \n energy available at bus bar %ekWh/year \n generation cost is Rs.%fper kWh",tac,engpy,eabb,geco) |
e5d1a5df49f1e674674117d06ca99c1de571f9a2 | 449d555969bfd7befe906877abab098c6e63a0e8 | /1748/CH2/EX2.57/Exa2_57.sce | d9f4806f23181889acd53cbdb670298c4f98a055 | [] | no_license | FOSSEE/Scilab-TBC-Uploads | 948e5d1126d46bdd2f89a44c54ba62b0f0a1f5e1 | 7bc77cb1ed33745c720952c92b3b2747c5cbf2df | refs/heads/master | 2020-04-09T02:43:26.499817 | 2018-02-03T05:31:52 | 2018-02-03T05:31:52 | 37,975,407 | 3 | 12 | null | null | null | null | UTF-8 | Scilab | false | false | 763 | sce | Exa2_57.sce | //Exa 2.57
clc;
clear;
close;
//Given data :
format('v',6);
//With star delta starter :
TstBYTfl=0.35;//ratio of starting torque to full load torque
IstBYIfl=1.75;//ratio of starting current to full load current
ISCBYIs=sqrt(3);//ratio of SC current to starting current
ISCBYIfl=sqrt(3)*IstBYIfl;//ratio of SC current to full load current
//Formula : TstBYTfl=(ISCBYIfl)^2*S
S=TstBYTfl/(ISCBYIfl)^2;//in fraction
disp(S,"Full load Slip : ");
//With auto transformer with winding in delta :
Ip=sqrt(3)*1.750*0.8;//full voltage phase current in Ampere
IlBYIf=4.2;//ratio of Line current to full load current
Ratio=IlBYIf^2*S;//ratio of starting current to full load current
disp(Ratio,"Ratio of line current at starting to full load current :"); |
8f6f90a8e1a4aba8a82a6a710653a8c41a1c7850 | 8217f7986187902617ad1bf89cb789618a90dd0a | /source/2.4/macros/sci2for/setparam.sci | b9d1d2fbd4dfdf81efc5f3ae1865e77de094dd94 | [
"LicenseRef-scancode-public-domain",
"LicenseRef-scancode-warranty-disclaimer"
] | permissive | clg55/Scilab-Workbench | 4ebc01d2daea5026ad07fbfc53e16d4b29179502 | 9f8fd29c7f2a98100fa9aed8b58f6768d24a1875 | refs/heads/master | 2023-05-31T04:06:22.931111 | 2022-09-13T14:41:51 | 2022-09-13T14:41:51 | 258,270,193 | 0 | 1 | null | null | null | null | UTF-8 | Scilab | false | false | 1,282 | sci | setparam.sci | function []=setparam()
//
//!
// Copyright INRIA
%else='else',%end='end';%elseif='elseif';%if='if';%for='for';
%select='select';%while='while';%case='case';%then='then'
quote=''''
logics=['==','<','>','<=','>=','<>']
//symbole : symbole associe a un numero d'operation
//type_du resultat : 0:facteur,1:terme,2:expression
//parenthesage : indique s'il faut parentheser les operandes de meme type
// que type_du_resultat
//
// symbole type_du_resultat parenthesage_des_operandes
ops =['+','2',' ';
'-','2',' r';
'*','1',' ';
'.*','1',' r';
'*.','1','lr';
'.*.','1','lr';
'/','1',' r';
'./','1',' r';
'/.','1','lr';
'./.','1','lr';
'\','1','l ';
'.\','1','l ';
'\.','1','l ';
'.\.','1','lr';
'**','0',' r';
'==','2','lr';
'<','2','lr';
'>','2','lr';
'<=','2','lr';
'>=','2','lr';
'<>','2','lr';
':','0',' ';
'[]','0',' ';
'ins','0',' ';
'ext','0',' ';
quote,'0',' '];
[logics,ops,quote,%else,%end,%elseif,%if,%for,%select,%while,%case,%then]=...
resume(logics,ops,quote,%else,%end,%elseif,%if,%for,%select,%while,%case,%then)
|
1deae4529b20ac383d96ac8c1dc684b27f29af5c | 449d555969bfd7befe906877abab098c6e63a0e8 | /605/CH2/EX2.9/2_9.sce | bad28fa80f6ad0f8e51cac49f66dac86999cc61a | [] | no_license | FOSSEE/Scilab-TBC-Uploads | 948e5d1126d46bdd2f89a44c54ba62b0f0a1f5e1 | 7bc77cb1ed33745c720952c92b3b2747c5cbf2df | refs/heads/master | 2020-04-09T02:43:26.499817 | 2018-02-03T05:31:52 | 2018-02-03T05:31:52 | 37,975,407 | 3 | 12 | null | null | null | null | UTF-8 | Scilab | false | false | 805 | sce | 2_9.sce | //data in question
//noise power at Th=290 K(dBm)
P1=-70
Th=290
//noise power at Tc=77 K(dBm)
P2=-75
Tc=77
//given noise temperature(K)
Ts=450
//frequency band B
B=1.5*10^9-500*10^6
//power gain of amplifier(10dB=10)
G=10
//boltzamn constant
k=1.38*10^(-23)
//data print
printf("\nP1=-70 dBm at Th=290 K\tP2=-75 dBm at Tc=77 K \tTs=450 K G=10\n")
//equation and result
printf("\nresult:-")
//Y-factor(Y=P1/P2 = (P1-P2)dBm)
Y=10^((P1-P2)/10)
printf("\n Y-factor = 10^((P1-P2)/10) = %.4f",Y)
//equivalent noise temperature
Te=(Th-Y*Tc)/(Y-1)
printf("\nequivalent noise temperature\nTe=(Th-Y*Tc)/(Y-1)=%.2f K",Te)
//noise power output of amplifier
Po=G*k*Ts*B+G*k*Te*B
printf("\nnoise power output\nPo=G*k*Ts*B+G*k*Te*B=%.4e W",Po)
printf(" = %.4f dBm\n",10*log10(Po*1000))
|
8ecf494a40c72ca4e8c8b51b28394e6bf2606808 | 717ddeb7e700373742c617a95e25a2376565112c | /3428/CH23/EX14.23.13/Ex14_23_13.sce | 73e2578418c31a82bf759dce984bb800689bdb04 | [] | no_license | appucrossroads/Scilab-TBC-Uploads | b7ce9a8665d6253926fa8cc0989cda3c0db8e63d | 1d1c6f68fe7afb15ea12fd38492ec171491f8ce7 | refs/heads/master | 2021-01-22T04:15:15.512674 | 2017-09-19T11:51:56 | 2017-09-19T11:51:56 | 92,444,732 | 0 | 0 | null | 2017-05-25T21:09:20 | 2017-05-25T21:09:19 | null | UTF-8 | Scilab | false | false | 127 | sce | Ex14_23_13.sce | //Section-14,Example-1,Page no.-PC.90
//To justify the given reaction
clc,
dl_G1=88.2
dl_G2=-300.1
dl_G=dl_G1+dl_G2
disp(dl_G)
|
4c3f39faa979cc017f80dbf730ae903aec859542 | 449d555969bfd7befe906877abab098c6e63a0e8 | /2951/CH3/EX3.8.A/additional_ex_8.sce | 33a74c0b7881d5323cf1d63c5559f98bef864017 | [] | no_license | FOSSEE/Scilab-TBC-Uploads | 948e5d1126d46bdd2f89a44c54ba62b0f0a1f5e1 | 7bc77cb1ed33745c720952c92b3b2747c5cbf2df | refs/heads/master | 2020-04-09T02:43:26.499817 | 2018-02-03T05:31:52 | 2018-02-03T05:31:52 | 37,975,407 | 3 | 12 | null | null | null | null | UTF-8 | Scilab | false | false | 349 | sce | additional_ex_8.sce | clc;
clear;
syms Ec Fc Fm pi t
Wave=Ec*cos(2*pi*Fm*t)*cos(2*pi*Fc*t)+Ec*sin(2*pi*Fm*t)*sin(2*pi*Fc*t);
disp("when the wave is");
disp(Wave);
f_upper=Ec*cos(2*pi*(Fc+Fm)*t);
disp("We get the upper sideband as");
disp(f_upper);
f_lower=Ec*cos(2*pi*(Fc-Fm)*t);
disp("We get the lower sideband as");
disp(f_lower);
|
eb4999a6db7f3e81508012a3475c0e1cc20525e3 | 449d555969bfd7befe906877abab098c6e63a0e8 | /3701/CH3/EX3.4/Ex3_4.sce | 43f785be3e60c339e0e4e8dd4f5525d4710f2028 | [] | no_license | FOSSEE/Scilab-TBC-Uploads | 948e5d1126d46bdd2f89a44c54ba62b0f0a1f5e1 | 7bc77cb1ed33745c720952c92b3b2747c5cbf2df | refs/heads/master | 2020-04-09T02:43:26.499817 | 2018-02-03T05:31:52 | 2018-02-03T05:31:52 | 37,975,407 | 3 | 12 | null | null | null | null | UTF-8 | Scilab | false | false | 267 | sce | Ex3_4.sce | ////Given
v=1200 //A
R=1.097*10**7 //m-1
n1=2.0
n2=3.0
//Calculation
v1=(R*(1-(1/n1**2)))
v2=(R*(1-(1/n2**2)))
V=v1/v2
V1=V*v
//Result
printf("\n Wavelength of the second line is %0.3f A", V1)
|
91beb410679f61f07a4a1da82b792e601d5093b4 | 449d555969bfd7befe906877abab098c6e63a0e8 | /62/CH5/EX5.53/ex_5_53.sce | 3c0d43fdf3aa72a3c49d75db125d2b8e21a91934 | [] | no_license | FOSSEE/Scilab-TBC-Uploads | 948e5d1126d46bdd2f89a44c54ba62b0f0a1f5e1 | 7bc77cb1ed33745c720952c92b3b2747c5cbf2df | refs/heads/master | 2020-04-09T02:43:26.499817 | 2018-02-03T05:31:52 | 2018-02-03T05:31:52 | 37,975,407 | 3 | 12 | null | null | null | null | UTF-8 | Scilab | false | false | 1,356 | sce | ex_5_53.sce | clear;
clc;
close;
w=-20:0.1:20;
wc=4*%pi;
for i=1:length(w)
if w(i)>-wc & w(i)<wc then
Hw(i)=1;
else
Hw(i)=0;
end
end
a=gca();
plot(w,Hw);
poly1=a.children.children;
poly1.thickness=3;
poly1.foreground=2;
xtitle('H(w)','w')
T0=1;
t=-5.99:0.01:6;
t_temp=0.01:0.01:T0;
s=length(t)/length(t_temp);
x=[];
for i=1:s
if modulo(i,2)==1 then
x=[x zeros(1,length(t_temp))];
else
x=[x 10*ones(1,length(t_temp))];
end
end
figure
a=gca();
plot(t,x,'r');
poly1=a.children.children;
poly1.thickness=3;
poly1.foreground=2;
xtitle('x(t)','t')
//fourier series of x(t)
w0=%pi;
for k=-10:10
cc(k+11,:)=exp(-%i*k*w0*t);
ck(k+11)=x*cc(k+11,:)'/length(t);
if abs(ck(k+11))<0.01 then
ck(k+11)=0;
else if real(ck(k+11))<0.1 then
ck(k+11)=%i*imag(ck(k+11));
end
end
if k==1 then
c1=ck(k+11);
end
if k==3 then
c3=ck(k+11);
end
end
yc1=2*abs(c1/(2+%i*w0));
yc3=2*abs(c3/(2+%i*w0*3));
disp("since frequencies above 4*%pi are cut off only first and third harmonics exists in the output");
y=5+yc1*sin(%pi*t)+yc3*sin(3*%pi*t);
figure
a=gca();
plot(t,y);
poly1=a.children.children;
poly1.thickness=3;
poly1.foreground=2;
xtitle('y(t)','t')
disp("y=5+(20/%pi)*sin(%pi*t)+20/(%pi*3)*sin(3*%pi*t)"); |
5d198e9e99396f7deec572432673a9d4f52cf4d0 | 449d555969bfd7befe906877abab098c6e63a0e8 | /1553/CH22/EX22.12/22Ex12.sce | e79861ae687e68551d89fb5c802da1ea9b867b1d | [] | no_license | FOSSEE/Scilab-TBC-Uploads | 948e5d1126d46bdd2f89a44c54ba62b0f0a1f5e1 | 7bc77cb1ed33745c720952c92b3b2747c5cbf2df | refs/heads/master | 2020-04-09T02:43:26.499817 | 2018-02-03T05:31:52 | 2018-02-03T05:31:52 | 37,975,407 | 3 | 12 | null | null | null | null | UTF-8 | Scilab | false | false | 202 | sce | 22Ex12.sce | //chapter 22 Ex 12
clc;
clear;
close;
amt1=7350; n1=2; amt2=8575; n2=3;
rate=((amt2-amt1)/(n2-n1)/amt1)*100;
//let sum be Rs.x
Sum=amt1/(1+(rate/100))^n1;
mprintf("The sum is Rs.%.0f",Sum);
|
6bee3ea75669e79e2a19c622f0387d8b9373acb6 | 127061b879bebda7ce03f6910c80d0702ad1a713 | /bin/PIL_rot_points.sci | dee64e6984bc84f9c6406735f641621c1b04b342 | [] | no_license | pipidog/PiLib-Scilab | 961df791bb59b9a16b3a32288f54316c6954f128 | 125ffa71b0752bfdcef922a0b898263e726db533 | refs/heads/master | 2021-01-18T20:30:43.364412 | 2017-08-17T00:58:50 | 2017-08-17T00:58:50 | 100,546,695 | 0 | 1 | null | null | null | null | UTF-8 | Scilab | false | false | 3,969 | sci | PIL_rot_points.sci | // **** Purpose ****
// For two cartisian basis {x1,y1,z1} and {x2,y2,z2}. Their transformation
// matrix can be generated by giving three equivalent points. These three
// points will defined a plane. This code will generate a rotation matrix
// to connect the two coordinate, so the representation of the three points
// will be identical.
// **** Variables ****
// [pt1]: 3x3, real
// <= three points in coordinate-1. Positions should written in column form.
// [pt2]: 3x3, real
// <= three points in coordinate-2. Positions should written in column form.
// these points must be ordered as their equivalent ones in points1.
// [criterion]: 1x2, real, optional, default:[0.5 angstrom, 3.0 degree]
// <= criterion for successful rotation on bond length and angle
// [M]: 3x3, real
// => the rotation matrix that makes M*V1=V2
// [V_shift]: 3x1, real
// => the shift vector of two coordinate.
// [str_diff]: 2x3, real
// => the structure difference between v21, v31, v21 and p21, p31, p23.
// [L_diff;ang_diff] if bond length difference > 0.5 or angle differneces
// are greater than 3.0 degree, M is considered failed.
// If so, check if the three points are real equivalent.
// **** Version ****
// 01/22/2016 first built
// **** Comment ****
// 1. Algorithm:
// 1). Shift pt1, so that pt1(1,:)=pt2(1,:). Now all pt1 is defined
// in this shifted coordinate.
// 2). Define V21=pt1(2,:)-pt1(1,:); V31=pt1(3,:)-pt1(1,:)
// P21=pt2(2,:)-pt2(1,:); P31=pt2(3,:)-pt2(1,:)
// and their unit vectors v21, v31, p21, p31.
// 3). rotate along (v21+p21)/2 by %pi, get M1, so M1*v21 --> p21
// 4). rotate along p21 with appropriate angle phi, get M2,
// so M2*M1(v31')=p31' and M2*M1*(v21')=M1*v21'=p21'.
// 5). If so, M=M2*M1, V_shift=pt2(1,:)-pt1(1,:).
// All points in pt1: M*(pt1+V_shift)'=pt2'.
// i.e M*(A1+V_shift)=A2
function [M,V_shift,str_diff]=PIL_rot_points(pt1,pt2,criterion)
[lhr,rhs]=argn()
if rhs==2 then
criterion=[0.5,3.0]
end
// check input points form identical triangles
L12_1=norm(pt1(2,:)-pt1(1,:));
L12_2=norm(pt2(2,:)-pt2(1,:));
L13_1=norm(pt1(3,:)-pt1(1,:));
L13_2=norm(pt2(3,:)-pt2(1,:));
L23_1=norm(pt1(3,:)-pt1(2,:));
L23_2=norm(pt2(3,:)-pt2(2,:));
L_diff=[(L12_1-L12_2),(L13_1-L13_2),(L23_1-L23_2)];
if max(abs(L_diff)) > criterion(1) then
disp('Error: PIL_rot_points, bond length not match!');
disp(cat(2,'L_diff=',string(L_diff)));
abort
end
// shift pt1 coordinate
pt1_backup=pt1;
V_shift=pt2(1,:)-pt1(1,:);
pt1=pt1+repmat(V_shift,3,1);
// rotate along (v21+p21)/2
v21=pt1(2,:)-pt1(1,:); v21=v21/norm(v21);
p21=pt2(2,:)-pt2(1,:); p21=p21/norm(p21);
u=(v21+p21); u=u/norm(u);
M1=PIL_rot_axis(u,%pi);
// rotate along p21
for n=1:3
pt1(n,:)=(M1*pt1(n,:)')'
end
u=p21;
v31=pt1(3,:)-pt1(1,:); v31=v31/norm(v31);
p31=pt2(3,:)-pt2(1,:); p31=p31/norm(p31);
v31_plane=(v31-(v31*u')*v31); v31_plane=v31_plane/norm(v31_plane);
p31_plane=(p31-(p31*u')*p31); p31_plane=p31_plane/norm(p31_plane);
phi=acos(v31_plane*p31_plane');
M2=PIL_rot_axis(u,phi);
M=M2*M1
// calculate angle differences
pt1_tmp=pt1_backup+repmat(V_shift,3,1)
for n=1:3
pt1_tmp(n,:)=(M*pt1_tmp(n,:)')'
end
v21=pt1_tmp(2,:)-pt1_tmp(1,:); v21=v21/norm(v21);
v31=pt1_tmp(3,:)-pt1_tmp(1,:); v31=v31/norm(v31);
v23=pt1_tmp(2,:)-pt1_tmp(3,:); v23=v23/norm(v23);
p23=pt1_tmp(2,:)-pt1_tmp(3,:); p23=p23/norm(p23);
ang_diff=acos([v21*p21',v31*p31',v23*p23'])/%pi*180
if max(abs(imag(ang_diff)))>1e-4 | abs(max(real(ang_diff)))>= criterion(2) then
disp('Error: PIL_rot_points, rotation matrix failed!')
disp(cat(2,'Angle Difference=',string(ang_diff)))
else
ang_diff=real(ang_diff);
end
str_diff=[L_diff;ang_diff]
endfunction
|
d5b36960ed4866c528930bec5f070777a65d8bd4 | 1bb72df9a084fe4f8c0ec39f778282eb52750801 | /test/IN5.prev.tst | eaae68cdb974f6f7661824cf6b56ef20525047d7 | [
"Apache-2.0",
"LicenseRef-scancode-unknown-license-reference"
] | permissive | gfis/ramath | 498adfc7a6d353d4775b33020fdf992628e3fbff | b09b48639ddd4709ffb1c729e33f6a4b9ef676b5 | refs/heads/master | 2023-08-17T00:10:37.092379 | 2023-08-04T07:48:00 | 2023-08-04T07:48:00 | 30,116,803 | 2 | 0 | null | null | null | null | UTF-8 | Scilab | false | false | 3,748 | tst | IN5.prev.tst | [[4,-2,-3,2],[-6,2,3,-1],[3,-1,-2,1],[-6,1,3,0]],fraction=1,det=1 is inverse of [[-2,-1,3,1],[-3,0,6,1],[-3,-2,4,2],[-3,-1,6,2]],det=1,identity = true
[[9,7,4,1],[-8,-6,-4,-1],[5,4,3,1],[-5,-4,-2,0]],fraction=1,det=1 is inverse of [[0,-2,-2,1],[1,3,2,-1],[-2,-1,1,-1],[2,1,0,2]],det=1,identity = true
[[0,-2,1,-2],[1,3,-1,2],[-1,-2,1,-1],[1,2,0,2]],fraction=1,det=1 is inverse of [[0,-2,-2,1],[1,3,2,-1],[1,2,2,0],[-1,-2,-1,1]],det=1,identity = true
[[1,1,-1,1],[2,1,0,2],[-3,-2,0,-2],[2,2,0,1]],fraction=1,det=1 is inverse of [[0,-2,-3,-2],[0,1,2,2],[-1,1,1,1],[0,2,2,1]],det=1,identity = true
[[0,-2,-2,1],[1,3,2,-1],[1,2,2,0],[-1,-2,-1,1]],fraction=1,det=1 is inverse of [[0,-2,1,-2],[1,3,-1,2],[-1,-2,1,-1],[1,2,0,2]],det=1,identity = true
[[9,7,1,4],[-8,-6,-1,-4],[-5,-4,0,-2],[5,4,1,3]],fraction=1,det=1 is inverse of [[0,-2,1,-2],[1,3,-1,2],[2,1,2,0],[-2,-1,-1,1]],det=1,identity = true
[[0,1,-2,2],[1,0,2,-2],[2,2,0,-1],[2,2,-1,0]],fraction=1,det=1 is inverse of [[0,1,-2,2],[1,0,2,-2],[2,2,0,-1],[2,2,-1,0]],det=1,identity = true
[[0,1,3,-3],[1,0,-3,3],[2,2,0,-1],[2,2,-1,0]],fraction=1,det=1 is inverse of [[0,1,3,-3],[1,0,-3,3],[2,2,0,-1],[2,2,-1,0]],det=1,identity = true
[[3,4,2,-6],[-3,-4,-3,7],[2,4,3,-6],[-2,-3,-2,5]],fraction=1,det=1 is inverse of [[1,-2,0,4],[1,1,1,1],[0,-2,1,4],[1,-1,1,4]],det=1,identity = true
[[1,0,2,-2],[-2,0,-2,3],[2,0,1,-2],[-1,1,-1,1]],fraction=1,det=1 is inverse of [[1,2,2,0],[1,1,1,1],[2,2,1,0],[2,3,2,0]],det=1,identity = true
[[3,1,2,-1],[-2,0,-2,1],[2,1,2,0],[-2,-1,-1,1]],fraction=1,det=1 is inverse of [[3,1,-1,2],[-2,0,1,-2],[-2,-1,1,-1],[2,1,0,2]],det=1,identity = true
[[-6,-8,-1,-4],[7,9,1,4],[-4,-5,0,-2],[4,5,1,3]],fraction=1,det=1 is inverse of [[3,1,-1,2],[-2,0,1,-2],[1,2,2,0],[-1,-2,-1,1]],det=1,identity = true
[[-6,-8,-4,-1],[7,9,4,1],[4,5,3,1],[-4,-5,-2,0]],fraction=1,det=1 is inverse of [[3,1,2,-1],[-2,0,-2,1],[-1,-2,1,-1],[1,2,0,2]],det=1,identity = true
[[3,1,-1,2],[-2,0,1,-2],[-2,-1,1,-1],[2,1,0,2]],fraction=1,det=1 is inverse of [[3,1,2,-1],[-2,0,-2,1],[2,1,2,0],[-2,-1,-1,1]],det=1,identity = true
[[5,2,3,2],[6,3,4,2],[-7,-3,-4,-3],[6,2,4,3]],fraction=1,det=1 is inverse of [[4,-1,1,-1],[-4,1,-2,0],[-1,1,1,1],[-4,0,-2,1]],det=1,identity = true
[[-15,-8,-5,-13],[2,1,1,2],[8,4,2,7],[15,8,6,13]],fraction=1,det=1 is inverse of [[4,-4,3,3],[-5,1,-4,-3],[1,0,0,1],[-2,4,-1,-2]],det=1,identity = true
[[0,-2,1,-2],[-2,0,-2,1],[2,1,2,0],[1,2,0,2]],fraction=1,det=-1 is inverse of [[0,-2,-2,1],[-2,0,1,-2],[1,2,2,0],[2,1,0,2]],det=-1,identity = true
[[1,1,-1,1],[2,2,0,1],[-3,-2,0,-2],[2,1,0,2]],fraction=1,det=-1 is inverse of [[0,-2,-3,-2],[0,2,2,1],[-1,1,1,1],[0,1,2,2]],det=-1,identity = true
[[0,-2,-2,1],[-2,0,1,-2],[1,2,2,0],[2,1,0,2]],fraction=1,det=-1 is inverse of [[0,-2,1,-2],[-2,0,-2,1],[2,1,2,0],[1,2,0,2]],det=-1,identity = true
[[2,4,3,-6],[-3,-4,-3,7],[3,4,2,-6],[-2,-3,-2,5]],fraction=1,det=-1 is inverse of [[0,-2,1,4],[1,1,1,1],[1,-2,0,4],[1,-1,1,4]],det=-1,identity = true
[[0,3,1,-3],[1,-3,0,3],[2,0,2,-1],[2,-1,2,0]],fraction=1,det=-1 is inverse of [[0,1,3,-3],[2,2,0,-1],[1,0,-3,3],[2,2,-1,0]],det=-1,identity = true
[[1,0,3,-3],[0,1,-3,3],[-2,5,-21,20],[-2,5,-22,21]],fraction=1,det=-1 is inverse of [[1,0,-3,3],[0,1,3,-3],[-2,5,0,-1],[-2,5,-1,0]],det=-1,identity = true
[[2,0,1,-2],[-2,0,-2,3],[1,0,2,-2],[-1,1,-1,1]],fraction=1,det=-1 is inverse of [[2,2,1,0],[1,1,1,1],[1,2,2,0],[2,3,2,0]],det=-1,identity = true
[[5,2,3,2],[6,2,4,3],[-7,-3,-4,-3],[6,3,4,2]],fraction=1,det=-1 is inverse of [[4,-1,1,-1],[-4,0,-2,1],[-1,1,1,1],[-4,1,-2,0]],det=-1,identity = true
[[14,1,-6,16],[-6,-1,2,-7],[-12,-1,5,-14],[-13,-1,6,-15]],fraction=1,det=-1 is inverse of [[4,-1,4,1],[-1,-2,2,-2],[1,0,-1,2],[-3,1,-4,0]],det=-1,identity = true
|
41066f4e04f60249821bf7227c1d9fdf0730a600 | a62e0da056102916ac0fe63d8475e3c4114f86b1 | /set6/s_Electrical_Measurements_Measuring_Instruments_K._Shinghal_2318.zip/Electrical_Measurements_Measuring_Instruments_K._Shinghal_2318/CH3/EX3.21/ex_3_21.sce | 9c8dba33b250262ae4b2a4d83c01a4b861dfab7e | [] | no_license | hohiroki/Scilab_TBC | cb11e171e47a6cf15dad6594726c14443b23d512 | 98e421ab71b2e8be0c70d67cca3ecb53eeef1df6 | refs/heads/master | 2021-01-18T02:07:29.200029 | 2016-04-29T07:01:39 | 2016-04-29T07:01:39 | null | 0 | 0 | null | null | null | null | UTF-8 | Scilab | false | false | 263 | sce | ex_3_21.sce | errcatch(-1,"stop");mode(2);//Example 3.21:Resistance and inductance
;
;
//given data :
S=900;// in ohm
P=1.5*10^3;// in ohm
Q=2*10^3;// in ohm
Cs=0.2*10^-6;// in F
rx=S*P/Q;
disp(rx,"Resistance,rx(ohm) = ")
L=P*Cs*S*10^3;
disp(L,"Inductance,L(mH) = ")
exit();
|
58174c4331e112716b7e109f84f1eb16b17f512d | 449d555969bfd7befe906877abab098c6e63a0e8 | /401/CH12/EX12.8/Example12_8.sce | 16de4ef3d22da8bfd83b2d051066d4877211c41f | [] | no_license | FOSSEE/Scilab-TBC-Uploads | 948e5d1126d46bdd2f89a44c54ba62b0f0a1f5e1 | 7bc77cb1ed33745c720952c92b3b2747c5cbf2df | refs/heads/master | 2020-04-09T02:43:26.499817 | 2018-02-03T05:31:52 | 2018-02-03T05:31:52 | 37,975,407 | 3 | 12 | null | null | null | null | UTF-8 | Scilab | false | false | 1,752 | sce | Example12_8.sce | //Example 12.8
//Program to estimate:
//(a)Maximum possible link length without repeaters when operating at 35 Mbit/s
//(b)Maximum possible link length without repeaters when operating at 400 Mbit/s
//(c)Reduction in maximum possible link length considering dispersion-equalization penalty
clear;
clc ;
close ;
//Given data
Pi=-3; //dBm - POWER LAUNCHED
alpha_fc=0.4; //dB/km - CABLE FIBER LOSS
alpha_j=0.1; //dB/km - SPLICE LOSS
alpha_cr=2; //dB - TOTAL CONNECTOR LOSS
Ma=7; //dB - REQUIRED SAFETY MARGIN
Dl=1.5; //dB - DISPERSION- EQUALIZATION PENALTY
//(a)Maximum possible link length without repeaters when operating at 35 Mbit/s
Po=-55; //dBm - REQUIRED POWER BY APD
//Optical budget: Pi-Po=(alpha_fc+alpha_j)L+alpha_cr+Ma
L1=(Pi-Po-alpha_cr-Ma)/(alpha_fc+alpha_j);
printf("\n\n\t (a)Maximum possible link length without repeaters when operating at 35 Mbit/s is %1.0f km.",L1);
//(b)Maximum possible link length without repeaters when operating at 400 Mbit/s
Po=-44; //dBm - REQUIRED POWER BY APD
//Optical budget: Pi-Po=(alpha_fc+alpha_j)L+alpha_cr+Ma
L2=(Pi-Po-alpha_cr-Ma)/(alpha_fc+alpha_j);
printf("\n\n\t (b)Maximum possible link length without repeaters when operating at 400 Mbit/s is %1.0f km.",L2);
//(c)Reduction in maximum possible link length considering dispersion-equalization penalty
//Optical budget considering dispersion-equalization penalty:
//Pi-Po=(alpha_fc+alpha_j)L+alpha_cr+Ma
L3=(Pi-Po-alpha_cr-Dl-Ma)/(alpha_fc+alpha_j);
printf("\n\n\t (c)Reduction in maximum possible link length considering dispersion-equalization penalty is %1.0f km.",L2-L3); |
f6a94ee69b55e904870c2578b4f394cec9642b85 | 449d555969bfd7befe906877abab098c6e63a0e8 | /2882/CH8/EX8.4/Ex8_4.sce | e6a22207f3dd813e87aa4d01043f8042ccc943da | [] | no_license | FOSSEE/Scilab-TBC-Uploads | 948e5d1126d46bdd2f89a44c54ba62b0f0a1f5e1 | 7bc77cb1ed33745c720952c92b3b2747c5cbf2df | refs/heads/master | 2020-04-09T02:43:26.499817 | 2018-02-03T05:31:52 | 2018-02-03T05:31:52 | 37,975,407 | 3 | 12 | null | null | null | null | UTF-8 | Scilab | false | false | 279 | sce | Ex8_4.sce | //Tested on Windows 7 Ultimate 32-bit
//Chapter 8 Power Amplifiers Pg no. 272
clear;
clc;
//Given Data
RL=8;//load resistance in ohms
RL_eq=5D3;//equivalent resistance at primary in ohms
//Solution
k=sqrt(RL_eq/RL);//turns ratio N1/N2
printf("N1:N2 = %d:1",k);
|
42faf02eec6e00f2cc64ca0b957733ef8ce8a8dd | 449d555969bfd7befe906877abab098c6e63a0e8 | /291/CH14/EX14.4a/eg14_4a.sce | 90b5b52275f808c7b5658a05ffb7d4d4e6b99c4a | [] | no_license | FOSSEE/Scilab-TBC-Uploads | 948e5d1126d46bdd2f89a44c54ba62b0f0a1f5e1 | 7bc77cb1ed33745c720952c92b3b2747c5cbf2df | refs/heads/master | 2020-04-09T02:43:26.499817 | 2018-02-03T05:31:52 | 2018-02-03T05:31:52 | 37,975,407 | 3 | 12 | null | null | null | null | UTF-8 | Scilab | false | false | 250 | sce | eg14_4a.sce | Xlife = 420;
Ylife = 510;
Xnum= 10;
Ynum =15;
ts = Xlife*Ynum/(Ylife*Xnum);
disp(ts, "The value of the test statistic is");
val = cdff("PQ", ts, Xnum, Ynum);
pvalue = 2*(1-val);
disp(pvalue, "The p-value is");
disp("We cannot reject H0");
|
b26c6bef172d12b19b04f9e1526d003175b4ba23 | 449d555969bfd7befe906877abab098c6e63a0e8 | /1388/CH8/EX8.8/8_8.sce | 865931623b43f7b4156cd91afa20613347d29a0e | [] | no_license | FOSSEE/Scilab-TBC-Uploads | 948e5d1126d46bdd2f89a44c54ba62b0f0a1f5e1 | 7bc77cb1ed33745c720952c92b3b2747c5cbf2df | refs/heads/master | 2020-04-09T02:43:26.499817 | 2018-02-03T05:31:52 | 2018-02-03T05:31:52 | 37,975,407 | 3 | 12 | null | null | null | null | UTF-8 | Scilab | false | false | 192 | sce | 8_8.sce | clc
//initialisation of variables
H= 19.8 //kcal
H1= -0.8 //kcal
H2= -29.4 //kcal
//CALCULATIONS
H3= -85.8
H4= -49.2
H5= -H3+H4
//RESULTS
printf (' Resonance energy = %.1f cal',H5)
|
24a12b6bb90740024c58b6496d6acb0c62a58dc4 | 25ec4bae7c1d991a8b4f36a96650a07061417648 | /Exemplos/exemplo07SegueFaixa/circuloGiroLeft.sce | 511ef6140a625d30425273ce24afe7bece5359b1 | [] | no_license | OtacilioNeto/EV3MicroPythonExamples | 716f76e4179d98157577d68b116a33a078aed085 | 037af9585402fe294d3c82d3b7d88cb49bc26bcf | refs/heads/master | 2023-06-08T19:34:49.916922 | 2023-06-02T13:24:10 | 2023-06-02T13:24:10 | 226,492,496 | 0 | 0 | null | null | null | null | UTF-8 | Scilab | false | false | 30,211 | sce | circuloGiroLeft.sce | // Red Green Blue Red Green Blue
circuloGiroLeft = [
29 41 63 29.26 43.23 63.51;
29 42 63 30.34 43.23 64.98;
29 41 64 29.26 43.23 63.51;
29 41 63 29.26 43.23 62.04;
29 42 63 30.34 43.23 63.51;
30 42 64 30.34 43.23 63.51;
29 42 63 29.26 43.23 63.51;
29 41 63 29.26 43.23 63.51;
29 42 63 29.26 43.23 63.51;
29 42 63 30.34 43.23 64.98;
29 41 63 30.34 43.23 63.51;
29 42 64 29.26 43.23 62.04;
29 42 64 30.34 43.23 63.51;
29 42 64 29.26 43.23 62.04;
29 42 64 30.34 43.23 63.51;
29 42 63 30.34 43.23 63.51;
29 42 63 29.26 43.23 63.51;
29 42 63 29.26 43.23 63.51;
29 41 63 29.26 43.23 63.51;
29 42 64 30.34 43.23 63.51;
29 41 63 29.26 43.23 62.04;
29 42 64 29.26 43.23 62.04;
29 42 64 29.26 43.23 62.04;
29 41 63 29.26 43.23 63.51;
29 42 63 30.34 43.23 63.51;
29 41 64 30.34 43.23 63.51;
29 42 64 30.34 43.23 63.51;
29 42 64 29.26 43.23 62.04;
29 42 64 29.26 43.23 63.51;
29 41 63 29.26 43.23 62.04;
29 41 63 29.26 43.23 63.51;
29 42 63 29.26 43.23 63.51;
29 42 63 30.34 43.23 63.51;
29 41 63 30.34 43.23 63.51;
29 42 64 30.34 43.23 63.51;
29 41 63 30.34 43.23 63.51;
29 41 63 29.26 43.23 63.51;
29 41 63 30.34 43.23 63.51;
29 42 63 30.34 43.23 63.51;
29 42 63 29.26 43.23 63.51;
29 42 63 30.34 43.23 63.51;
29 41 63 30.34 43.23 63.51;
29 41 63 29.26 43.23 62.04;
29 42 64 30.34 43.23 63.51;
29 42 64 30.34 43.23 63.51;
29 42 64 30.34 43.23 63.51;
29 41 63 29.26 43.23 63.51;
29 42 64 29.26 43.23 63.51;
29 41 64 30.34 43.23 63.51;
29 41 63 29.26 43.23 62.04;
29 42 64 30.34 43.23 63.51;
29 42 64 29.26 43.23 63.51;
29 42 64 29.26 43.23 63.51;
29 41 63 29.26 43.23 62.04;
29 42 63 29.26 43.23 63.51;
29 42 63 30.34 43.23 63.51;
29 41 63 29.26 43.23 62.04;
29 42 64 29.26 43.23 62.04;
29 42 64 30.34 43.23 63.51;
29 41 63 29.26 43.23 63.51;
29 41 63 29.26 43.23 63.51;
29 41 63 29.26 43.23 62.04;
29 42 63 30.34 43.23 63.51;
29 41 63 29.26 43.23 63.51;
29 41 63 29.26 43.23 63.51;
29 42 64 30.34 43.23 63.51;
29 41 63 30.34 43.23 63.51;
29 41 63 29.26 43.23 63.51;
29 42 63 29.26 43.23 63.51;
29 42 63 30.34 43.23 63.51;
29 41 63 29.26 43.23 63.51;
29 42 64 30.34 43.23 63.51;
29 42 64 30.34 43.23 63.51;
29 42 64 29.26 43.23 63.51;
29 41 63 30.34 43.23 63.51;
29 41 63 29.26 43.23 62.04;
29 42 63 29.26 43.23 63.51;
29 41 63 30.34 43.23 63.51;
29 42 64 29.26 43.23 63.51;
29 42 64 30.34 43.23 63.51;
29 42 64 30.34 43.23 63.51;
29 41 63 29.26 43.23 62.04;
29 42 63 29.26 43.23 62.04;
29 41 63 29.26 43.23 63.51;
29 42 63 30.34 43.23 64.98;
29 41 64 30.34 43.23 63.51;
29 41 63 29.26 43.23 62.04;
29 42 64 30.34 43.23 63.51;
29 42 64 29.26 43.23 62.04;
29 41 63 29.26 43.23 63.51;
29 41 63 29.26 43.23 63.51;
29 42 63 30.34 43.23 64.98;
29 41 63 30.34 43.23 63.51;
29 41 63 29.26 43.23 63.51;
29 41 63 29.26 43.23 63.51;
29 42 64 30.34 43.23 63.51;
29 41 63 29.26 43.23 63.51;
29 41 63 29.26 43.23 63.51;
29 42 63 29.26 43.23 63.51;
29 42 63 30.34 43.23 64.98;
29 41 63 30.34 43.23 63.51;
29 41 63 30.34 43.23 63.51;
29 41 63 30.34 43.23 63.51;
30 42 64 30.34 43.23 63.51;
29 41 63 30.34 43.23 63.51;
29 41 63 29.26 43.23 63.51;
29 42 63 29.26 43.23 63.51;
29 42 64 29.26 43.23 62.04;
29 41 63 29.26 43.23 63.51;
29 42 64 30.34 43.23 63.51;
29 42 63 30.34 43.23 63.51;
29 42 63 30.34 43.23 63.51;
29 41 63 29.26 43.23 62.04;
29 42 63 29.26 43.23 63.51;
29 42 64 30.34 43.23 63.51;
29 41 63 29.26 43.23 62.04;
29 42 64 29.26 43.23 63.51;
29 41 63 30.34 43.23 63.51;
29 41 63 30.34 43.23 63.51;
29 41 63 30.34 43.23 63.51;
29 42 63 29.26 43.23 63.51;
29 42 63 29.26 43.23 63.51;
29 42 64 30.34 43.23 63.51;
29 41 63 29.26 43.23 63.51;
29 42 64 29.26 43.23 62.04;
29 42 64 30.34 43.23 63.51;
29 42 64 29.26 43.23 63.51;
29 41 63 30.34 43.23 63.51;
29 41 63 30.34 43.23 64.98;
29 42 63 29.26 43.23 63.51;
29 42 63 30.34 43.23 63.51;
29 41 63 29.26 43.23 63.51;
29 42 64 30.34 43.23 63.51;
29 41 63 30.34 43.23 63.51;
29 41 63 30.34 43.23 63.51;
29 41 63 30.34 43.23 63.51;
29 41 63 29.26 43.23 64.98;
29 42 64 29.26 43.23 63.51;
29 41 64 30.34 43.23 62.04;
29 41 63 29.26 43.23 63.51;
29 41 63 30.34 43.23 63.51;
29 41 63 30.34 43.23 63.51;
29 42 63 30.34 43.23 63.51;
29 42 63 30.34 43.23 63.51;
30 42 64 29.26 43.23 63.51;
30 42 64 30.34 43.23 63.51;
29 42 64 30.34 43.23 63.51;
30 42 64 30.34 43.23 63.51;
30 42 64 30.34 43.23 63.51;
29 42 64 30.34 43.23 63.51;
30 42 64 30.34 43.23 63.51;
30 42 64 30.34 44.59 64.98;
29 42 64 30.34 43.23 63.51;
30 42 64 30.34 43.23 63.51;
30 42 64 30.34 43.23 64.98;
30 42 64 30.34 44.59 64.98;
30 42 64 30.34 43.23 63.51;
30 42 64 30.34 43.23 63.51;
30 42 64 30.34 44.59 64.98;
29 42 63 29.26 43.23 63.51;
29 41 63 29.26 43.23 63.51;
28 40 61 28.18 41.88 60.58;
27 38 59 27.1 40.52 59.11;
27 39 60 27.1 40.52 59.11;
27 38 60 27.1 40.52 59.11;
29 40 63 28.18 40.52 60.58;
28 39 61 28.18 40.52 60.58;
28 39 60 27.1 40.52 59.11;
27 38 60 27.1 40.52 57.64;
28 39 61 28.18 40.52 59.11;
28 40 61 28.18 40.52 60.58;
28 40 62 28.18 41.88 60.58;
28 40 62 29.26 41.88 62.04;
28 39 60 28.18 41.88 62.04;
27 39 60 28.18 41.88 60.58;
27 39 60 28.18 40.52 60.58;
28 40 61 28.18 41.88 60.58;
28 39 60 28.18 40.52 60.58;
28 39 60 28.18 40.52 60.58;
27 39 60 28.18 40.52 60.58;
28 39 60 27.1 40.52 60.58;
27 38 60 27.1 40.52 59.11;
27 39 60 27.1 40.52 59.11;
28 39 60 28.18 40.52 59.11;
28 40 61 28.18 41.88 60.58;
28 40 62 28.18 41.88 62.04;
28 40 62 29.26 43.23 62.04;
27 39 60 28.18 40.52 60.58;
28 40 61 28.18 41.88 60.58;
28 40 61 28.18 41.88 60.58;
28 40 61 29.26 43.23 62.04;
28 40 61 29.26 43.23 62.04;
28 40 61 29.26 41.88 62.04;
28 40 61 29.26 43.23 62.04;
27 40 61 29.26 43.23 62.04;
28 40 61 29.26 43.23 62.04;
28 41 62 29.26 43.23 62.04;
29 41 62 29.26 43.23 60.58;
28 40 60 28.18 41.88 60.58;
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23 35 47 30.34 43.23 63.51;
26 38 55 28.18 40.52 60.58;
27 38 58 27.1 39.16 59.11;
27 38 58 26.02 37.81 57.64;
25 37 54 27.1 40.52 60.58;
23 34 45 30.34 43.23 64.98;
19 29 33 32.51 44.59 67.92;
15 22 24 33.59 45.94 69.39;
11 17 17 34.67 47.3 72.32;
14 20 20 34.67 48.66 73.79;
17 26 28 34.67 47.3 72.32;
23 35 45 32.51 45.94 69.39;
29 41 63 28.18 41.88 63.51;
29 41 64 26.02 39.16 59.11;
29 41 63 26.02 39.16 60.58;
26 38 53 29.26 41.88 63.51;
22 33 40 32.51 45.94 69.39;
16 24 24 33.59 45.94 67.92;
8 13 10 33.59 47.3 69.39;
4 8 5 34.67 47.3 70.85;
4 8 5 35.75 48.66 72.32;
4 8 5 36.83 50.01 75.26;
8 13 11 35.75 50.01 75.26;
18 26 28 35.75 50.01 73.79;
25 37 50 34.67 48.66 70.85;
31 44 66 31.42 45.94 67.92;
32 44 68 28.18 41.88 60.58;
32 44 67 26.02 40.52 57.64;
32 44 67 26.02 40.52 59.11;
29 42 61 28.18 41.88 62.04;
24 36 45 31.42 44.59 64.98;
15 23 22 33.59 47.3 67.92;
8 13 10 34.67 47.3 69.39;
4 8 5 34.67 47.3 69.39;
4 8 5 34.67 47.3 69.39;
5 8 6 34.67 48.66 70.85;
12 17 17 33.59 47.3 69.39;
20 30 38 32.51 44.59 66.45;
29 41 61 30.34 44.59 64.98;
30 42 65 24.94 39.16 54.7;
31 42 66 20.62 33.74 45.89;
31 43 67 19.54 32.38 44.42;
31 43 67 20.62 33.74 45.89;
31 43 67 21.7 35.09 48.83;
30 42 65 23.86 37.81 53.23;
30 42 66 27.1 40.52 57.64;
29 41 63 29.26 41.88 62.04;
24 36 52 28.18 40.52 60.58;
21 31 42 30.34 43.23 63.51;
21 30 41 30.34 43.23 64.98;
20 29 38 31.42 43.23 66.45;
20 29 38 31.42 43.23 64.98;
25 36 51 32.51 45.94 67.92;
28 40 60 30.34 43.23 64.98;
30 42 65 29.26 41.88 62.04;
31 43 66 26.02 39.16 56.17;
31 42 65 22.78 35.09 50.3;
31 42 65 23.86 36.45 50.3;
31 43 66 26.02 39.16 56.17;
31 43 66 26.02 39.16 54.7;
31 44 67 27.1 40.52 57.64;
30 42 64 28.18 40.52 59.11;
28 39 59 28.18 41.88 60.58;
26 38 56 29.26 40.52 60.58;
26 37 56 28.18 40.52 60.58;
27 38 58 29.26 41.88 62.04;
27 39 59 29.26 41.88 62.04;
27 38 58 29.26 41.88 60.58;
27 38 57 28.18 41.88 60.58;
26 37 55 27.1 39.16 59.11;
26 38 57 27.1 40.52 59.11;
27 38 59 27.1 40.52 59.11;
27 38 59 28.18 41.88 60.58;
27 38 59 28.18 40.52 60.58;
27 38 59 28.18 41.88 60.58;
27 39 60 28.18 40.52 60.58;
28 40 61 27.1 40.52 59.11;
28 40 62 28.18 40.52 59.11;
28 40 61 28.18 41.88 60.58;
28 40 61 29.26 43.23 63.51;
28 40 61 30.34 43.23 63.51;
28 40 61 30.34 43.23 63.51;
28 41 62 30.34 44.59 64.98;
29 41 62 31.42 44.59 64.98;
27 39 58 30.34 44.59 64.98;
26 38 57 30.34 43.23 63.51;
27 38 58 30.34 43.23 63.51;
25 36 54 30.34 43.23 63.51;
25 36 54 29.26 41.88 62.04;
24 35 53 29.26 41.88 62.04;
25 36 55 28.18 41.88 60.58;
27 38 58 27.1 39.16 57.64;
28 39 60 27.1 39.16 56.17;
28 39 60 26.02 39.16 57.64;
28 39 60 27.1 40.52 60.58;
28 40 61 28.18 41.88 60.58;
26 38 56 29.26 43.23 63.51;
23 34 48 29.26 41.88 62.04;
20 30 39 30.34 41.88 63.51;
19 27 33 31.42 43.23 64.98;
16 23 27 31.42 43.23 64.98;
18 26 31 32.51 44.59 67.92;
21 31 41 31.42 44.59 64.98;
26 38 55 30.34 43.23 63.51;
28 40 61 27.1 40.52 59.11;
29 40 62 23.86 36.45 54.7;
29 41 63 24.94 37.81 54.7;
27 39 60 26.02 39.16 57.64;
27 39 58 28.18 40.52 60.58;
25 37 52 30.34 43.23 63.51;
22 32 42 30.34 41.88 63.51;
16 24 27 30.34 41.88 63.51;
13 20 20 31.42 43.23 63.51;
9 14 13 32.51 43.23 64.98;
10 14 13 33.59 47.3 69.39;
14 21 21 33.59 45.94 67.92;
22 33 43 31.42 44.59 64.98;
29 40 60 27.1 40.52 60.58;
29 40 61 21.7 35.09 50.3;
29 40 62 19.54 31.02 44.42;
29 40 62 20.62 32.38 47.36;
29 40 61 22.78 35.09 50.3;
29 41 62 26.02 39.16 59.11;
27 38 55 27.1 40.52 60.58;
23 33 44 29.26 41.88 62.04;
20 30 37 31.42 43.23 64.98;
17 25 28 30.34 43.23 63.51;
15 22 24 31.42 43.23 64.98;
13 19 19 31.42 43.23 63.51;
15 22 24 31.42 43.23 64.98;
20 29 36 31.42 43.23 64.98;
24 36 50 30.34 43.23 64.98;
28 40 61 27.1 39.16 57.64;
28 39 61 21.7 33.74 48.83;
30 41 64 21.7 33.74 47.36;
29 40 63 22.78 35.09 50.3;
29 40 62 26.02 37.81 56.17;
28 40 59 27.1 40.52 59.11;
25 37 53 27.1 40.52 60.58;
23 34 47 30.34 41.88 63.51;
20 29 36 30.34 43.23 63.51;
17 25 29 31.42 43.23 64.98;
14 20 21 31.42 43.23 64.98;
13 19 20 30.34 43.23 63.51;
15 22 25 31.42 43.23 64.98;
20 30 38 31.42 43.23 64.98;
26 38 56 30.34 41.88 63.51;
29 40 62 27.1 39.16 57.64;
30 42 65 22.78 36.45 51.77;
30 41 64 23.86 36.45 53.23;
28 40 61 26.02 37.81 57.64;
27 39 56 29.26 41.88 63.51;
23 33 45 30.34 43.23 63.51;
19 28 33 31.42 43.23 64.98;
15 22 24 31.42 43.23 64.98;
12 17 18 31.42 43.23 64.98;
9 14 14 31.42 43.23 63.51;
11 16 16 32.51 44.59 66.45;
16 23 26 33.59 45.94 67.92;
24 35 48 33.59 47.3 69.39;
30 42 64 30.34 43.23 64.98;
30 41 64 22.78 35.09 50.3;
30 41 65 18.45 29.67 41.49;
30 41 64 17.37 28.31 38.55;
30 42 65 20.62 33.74 45.89;
31 44 67 23.86 36.45 51.77;
30 42 65 24.94 37.81 54.7;
28 40 61 29.26 43.23 63.51;
23 34 49 31.42 43.23 64.98;
22 32 44 31.42 44.59 66.45;
20 30 41 31.42 44.59 64.98;
20 30 40 31.42 44.59 63.51;
20 29 38 30.34 43.23 63.51;
20 30 41 30.34 43.23 63.51;
24 35 51 30.34 43.23 63.51;
26 37 57 28.18 40.52 59.11;
28 39 60 24.94 37.81 53.23;
28 39 61 21.7 33.74 45.89;
28 39 61 18.45 31.02 41.49;
29 39 61 19.54 31.02 42.96;
29 40 62 21.7 35.09 48.83;
29 40 63 22.78 35.09 50.3;
29 41 63 26.02 39.16 57.64;
26 37 56 28.18 40.52 59.11;
24 35 53 28.18 40.52 60.58;
23 34 52 28.18 40.52 60.58;
25 36 54 29.26 41.88 62.04;
25 36 54 29.26 41.88 62.04;
25 36 54 27.1 40.52 59.11;
26 37 58 27.1 39.16 57.64;
26 38 58 28.18 40.52 59.11;
27 38 59 28.18 41.88 62.04;
27 38 59 29.26 41.88 63.51;
26 38 58 29.26 41.88 62.04;
26 38 58 29.26 41.88 63.51;
26 37 55 30.34 41.88 63.51;
24 35 50 31.42 44.59 67.92;
19 28 35 32.51 45.94 67.92;
14 21 22 33.59 45.94 69.39;
13 18 19 33.59 45.94 69.39;
15 21 22 33.59 47.3 69.39;
22 33 43 32.51 44.59 66.45;
28 41 60 30.34 43.23 63.51;
30 42 63 24.94 37.81 54.7;
31 43 65 20.62 33.74 47.36;
30 41 63 22.78 35.09 50.3;
29 41 63 27.1 39.16 57.64;
24 36 50 27.1 39.16 59.11;
18 27 31 30.34 41.88 63.51;
12 18 17 30.34 43.23 63.51;
10 14 13 31.42 43.23 63.51;
8 12 10 31.42 43.23 63.51;
12 17 17 31.42 43.23 64.98;
23 34 46 28.18 40.52 62.04;
29 40 61 20.62 32.38 47.36;
29 40 62 16.29 26.95 38.55;
29 40 62 18.45 29.67 42.96;
29 40 62 21.7 33.74 50.3;
28 39 60 23.86 36.45 53.23;
27 38 55 26.02 37.81 57.64;
23 34 45 29.26 41.88 63.51;
18 27 31 29.26 41.88 62.04;
16 24 25 30.34 43.23 63.51;
12 18 17 30.34 41.88 62.04;
15 23 24 31.42 43.23 64.98;
22 33 43 30.34 43.23 63.51;
27 39 57 27.1 39.16 59.11;
28 39 61 21.7 33.74 48.83;
29 40 61 20.62 32.38 48.83;
28 38 58 23.86 35.09 53.23;
26 38 54 28.18 40.52 60.58;
22 33 44 28.18 40.52 62.04;
19 28 32 30.34 41.88 62.04;
17 25 27 30.34 41.88 63.51;
14 20 21 31.42 43.23 63.51;
12 17 17 30.34 41.88 63.51;
15 22 22 31.42 43.23 64.98;
20 29 35 31.42 43.23 64.98;
26 37 53 29.26 41.88 62.04;
28 39 60 24.94 37.81 54.7;
28 38 60 21.7 33.74 48.83;
28 39 60 22.78 35.09 51.77;
27 38 56 24.94 37.81 56.17;
26 38 54 28.18 40.52 60.58;
24 35 48 29.26 41.88 62.04;
21 30 38 30.34 41.88 62.04;
16 24 27 30.34 41.88 62.04;
14 21 22 30.34 43.23 63.51;
11 16 16 31.42 43.23 63.51;
7 11 10 31.42 43.23 64.98;
9 13 13 33.59 45.94 67.92;
15 21 24 32.51 44.59 66.45;
20 30 38 31.42 43.23 64.98;
29 40 61 26.02 37.81 56.17;
29 39 61 19.54 32.38 45.89;
30 42 64 19.54 32.38 44.42;
30 41 63 19.54 31.02 42.96;
30 41 63 19.54 32.38 44.42;
30 41 64 21.7 35.09 48.83;
29 40 62 22.78 35.09 50.3;
28 39 61 22.78 35.09 50.3;
29 40 62 24.94 37.81 54.7;
28 39 61 24.94 37.81 54.7;
28 39 60 27.1 39.16 57.64;
27 39 59 27.1 40.52 59.11;
27 38 58 27.1 40.52 59.11;
27 38 58 28.18 40.52 60.58;
26 37 55 28.18 40.52 60.58;
26 37 55 29.26 41.88 63.51;
25 36 53 29.26 41.88 62.04;
25 37 55 29.26 41.88 62.04;
25 37 55 29.26 41.88 62.04;
25 37 55 29.26 41.88 62.04;
25 36 53 30.34 43.23 63.51;
25 36 52 31.42 44.59 66.45;
26 37 55 31.42 44.59 66.45;
25 37 54 31.42 43.23 64.98;
26 37 55 30.34 43.23 63.51;
26 37 56 30.34 43.23 63.51;
26 38 57 30.34 43.23 63.51;
26 38 57 30.34 43.23 63.51;
27 38 58 30.34 43.23 63.51;
26 38 58 30.34 43.23 62.04;
27 38 59 29.26 41.88 62.04;
26 38 58 30.34 43.23 63.51;
27 38 59 29.26 41.88 62.04;
27 38 58 29.26 43.23 63.51;
26 38 58 30.34 43.23 64.98;
26 38 58 30.34 43.23 63.51;
27 38 59 30.34 43.23 63.51;
27 39 60 30.34 43.23 63.51;
27 39 59 30.34 43.23 63.51;
27 39 60 29.26 41.88 62.04;
27 39 60 28.18 41.88 62.04;
28 40 61 28.18 41.88 62.04;
27 39 60 28.18 41.88 60.58;
27 39 60 28.18 41.88 60.58;
27 38 60 28.18 40.52 60.58;
27 39 60 28.18 40.52 60.58;
27 39 59 29.26 41.88 62.04;
27 38 59 29.26 41.88 63.51;
27 39 60 29.26 43.23 63.51;
27 38 59 29.26 41.88 62.04;
27 39 60 28.18 41.88 62.04;
28 40 62 29.26 41.88 62.04;
28 40 62 29.26 43.23 62.04;
28 41 62 29.26 43.23 63.51;
28 40 62 30.34 43.23 63.51;
28 40 62 30.34 43.23 63.51;
28 40 61 29.26 43.23 62.04;
29 40 62 29.26 43.23 63.51;
28 40 62 29.26 43.23 62.04;
28 41 62 30.34 43.23 63.51;
28 40 62 29.26 43.23 63.51;
28 40 61 29.26 43.23 63.51;
28 39 60 29.26 43.23 62.04;
28 40 60 29.26 43.23 62.04;
26 38 56 30.34 43.23 63.51;
23 33 45 30.34 43.23 64.98;
20 29 38 30.34 43.23 64.98;
18 26 32 31.42 43.23 63.51;
16 23 27 31.42 41.88 63.51;
15 23 26 31.42 43.23 64.98;
18 25 31 32.51 44.59 66.45;
25 36 53 30.34 41.88 63.51;
28 39 60 26.02 39.16 57.64;
29 40 63 23.86 36.45 51.77;
29 41 63 23.86 36.45 53.23;
29 40 62 23.86 37.81 53.23;
29 41 63 26.02 39.16 57.64;
28 40 59 27.1 40.52 60.58;
24 36 49 29.26 41.88 63.51;
21 31 40 30.34 43.23 63.51;
17 25 28 31.42 43.23 64.98;
15 21 23 31.42 44.59 64.98;
11 16 15 31.42 43.23 64.98;
11 17 16 32.51 44.59 66.45;
17 25 28 32.51 44.59 64.98;
25 36 51 30.34 43.23 63.51;
29 40 62 24.94 37.81 54.7;
30 41 63 20.62 33.74 47.36;
30 41 63 19.54 32.38 45.89;
];
|
08deb62936f183e8483f75595e615dc4bf7ab520 | 449d555969bfd7befe906877abab098c6e63a0e8 | /1670/CH11/EX11.12/11_12.sce | 906ebb43a7658565847901be78b85aad5d347f8b | [] | no_license | FOSSEE/Scilab-TBC-Uploads | 948e5d1126d46bdd2f89a44c54ba62b0f0a1f5e1 | 7bc77cb1ed33745c720952c92b3b2747c5cbf2df | refs/heads/master | 2020-04-09T02:43:26.499817 | 2018-02-03T05:31:52 | 2018-02-03T05:31:52 | 37,975,407 | 3 | 12 | null | null | null | null | UTF-8 | Scilab | false | false | 451 | sce | 11_12.sce | //Example 11.12
//Eigenvalue Problem
//Page no. 385
clc;clear;close;
h1=1/4;h2=1/5;
lbd=poly(0,'lbd')
mu=9*lbd/16;
A=[lbd-64,16;32,lbd-64];
disp(determ(A),'Characteristic Equation = ');
r=roots(determ(A))
disp(r,'Roots = ')
r1(1)=r(2)
A=[lbd-100,0,25;0,lbd-100,50;25,50,lbd-100];
disp(determ(A),'Characteristic Equation = ');
r=roots(determ(A))
disp(r,'Roots = ')
r1(2)=r(3)
Q=((h1/h2)^2*r1(2)-r1(1))/((h1/h2)^2-1)
disp(Q,'Q12 = ') |
9b40ac70a2dcb868826deb7f3a27ebf1aabc6773 | 449d555969bfd7befe906877abab098c6e63a0e8 | /770/CH15/EX15.2/15_2.sce | 960aac8de647a60f216903b2657685404b5fa319 | [] | no_license | FOSSEE/Scilab-TBC-Uploads | 948e5d1126d46bdd2f89a44c54ba62b0f0a1f5e1 | 7bc77cb1ed33745c720952c92b3b2747c5cbf2df | refs/heads/master | 2020-04-09T02:43:26.499817 | 2018-02-03T05:31:52 | 2018-02-03T05:31:52 | 37,975,407 | 3 | 12 | null | null | null | null | UTF-8 | Scilab | false | false | 3,240 | sce | 15_2.sce | clear;
clc;
funcprot(0);
//Example - 15.2
//Page number - 515
printf("Example - 15.2 and Page number - 515\n\n");
//Given
// log(P_1_sat) = 14.39155 - 2795.817/(t + 230.002)
// log(P_2_sat) = 16.26205 - 3799.887/(t + 226.346)
//(a)
x_1_a =0.43;// Equilibrium composition of liquid phase
t_a = 76;//[C] - Temperature
x_2_a = 1 - x_1_a;
// Since liquid phase composition is given we use the relation
// P = x_1*P_1_sat + x_2*P_2_sat
// At t = 76 C
P_1_sat_a = exp(14.39155 - 2795.817/(t_a + 230.002));
P_2_sat_a = exp(16.26205 - 3799.887/(t_a + 226.346));
// Therefore total pressure is
P_a = x_1_a*P_1_sat_a + x_2_a*P_2_sat_a;//[kPa]
y_1_a = (x_1_a*P_1_sat_a)/(P_a);
y_2_a = (x_2_a*P_2_sat_a)/(P_a);
printf("(a).The system pressure is, P = %f kPa\n",P_a);
printf(" The vapour phase composition is, y_1 = %f\n\n",y_1_a);
//(b)
y_1_b = 0.43;// Equilibrium composition of vapour phase
y_2_b = 1 - y_1_b;
t_b = 76;//[C] - Temperature
P_1_sat_b = exp(14.39155 - 2795.817/(t_b + 230.002));
P_2_sat_b = exp(16.26205 - 3799.887/(t_b + 226.346));
// Since vapour phase composition is given ,the system pressure is given by
// 1/P = y_1/P_1_sat + y_2/P_2_sat
P_b = 1/(y_1_b/P_1_sat_b + y_2_b/P_2_sat_b);
x_1_b = (y_1_b*P_b)/P_1_sat_b;
x_2_b = (y_2_b*P_b)/P_2_sat_b;
printf("(b).The system pressure is, P = %f kPa\n",P_b);
printf(" The liquid phase composition is, x_1 = %f\n\n",x_1_b);
//(c)
x_1_c = 0.32;// Equilibrium composition of liquid phase
x_2_c = 1 - x_1_c;
P_c = 101.33;//[kPa] - Pressure of the system
// We have, P = x_1*P_1_sat + x_2*P_2_sat
t_1_sat = 2795.817/(14.39155 - log(P_c)) - 230.002;
t_2_sat = 3799.887/(16.26205 - log(P_c)) - 226.346;
t = x_1_c*t_1_sat + x_2_c*t_2_sat;
error = 10;
while(error>0.1)
P_1_sat = exp(14.39155 - 2795.817/(t + 230.002));
P_2_sat = exp(16.26205 - 3799.887/(t + 226.346));
P = x_1_c*P_1_sat + x_2_c*P_2_sat;
error=abs(P - P_c);
t = t - 0.1;
end
P_1_sat_c = exp(14.39155 - 2795.817/(t + 230.002));
P_2_sat_c = exp(16.26205 - 3799.887/(t + 226.346));
y_1_c = (x_1_c*P_1_sat_c)/(P_c);
y_2_c = 1 - y_1_c;
printf("(c).The system temperature is, t = %f C\n",t);
printf(" The vapour phase composition is, y_1 = %f\n\n",y_1_c);
//(d)
y_1_d = 0.57;// Vapour phase composition
y_2_d = 1 - y_1_d;
P_d = 101.33;//[kPa] - Pressure of the system
// Since vapour phase composition is given, we can use the relation
// 1/P = y_1/P_1_sat + y_2/P_2_sat
t_1_sat_d = 2795.817/(14.39155 - log(P_d)) - 230.002;
t_2_sat_d = 3799.887/(16.26205 - log(P_d)) - 226.346;
t_d = y_1_d*t_1_sat_d + y_2_d*t_2_sat_d;
fault = 10;
while(fault>0.1)
P_1_sat_prime = exp(14.39155 - 2795.817/(t_d + 230.002));
P_2_sat_prime = exp(16.26205 - 3799.887/(t_d + 226.346));
P_prime = 1/(y_1_d/P_1_sat_prime + y_2_d/P_2_sat_prime);
fault=abs(P_prime - P_d);
t_d = t_d + 0.01;
end
P_1_sat_d = exp(14.39155 - 2795.817/(t_d + 230.002));
P_2_sat_d = exp(16.26205 - 3799.887/(t_d + 226.346));
x_1_d = (y_1_d*P_d)/(P_1_sat_d);
x_2_d = 1 - x_1_d;
printf("(d).The system temperature is, t = %f C\n",t_d);
printf(" The liquid phase composition is, x_1 = %f\n\n",x_1_d);
|
87ac7741fc9ea43b6ac6160d47a22d3795670d3e | a62e0da056102916ac0fe63d8475e3c4114f86b1 | /set6/s_Electric_Machines_-_I_M._Verma_And_V._Ahuja_695.zip/Electric_Machines_-_I_M._Verma_And_V._Ahuja_695/CH3/EX3.9/Ex3_9.sce | 57e45d0be7d9f3d0bdb30e1422671e81a6e56a3f | [] | no_license | hohiroki/Scilab_TBC | cb11e171e47a6cf15dad6594726c14443b23d512 | 98e421ab71b2e8be0c70d67cca3ecb53eeef1df6 | refs/heads/master | 2021-01-18T02:07:29.200029 | 2016-04-29T07:01:39 | 2016-04-29T07:01:39 | null | 0 | 0 | null | null | null | null | UTF-8 | Scilab | false | false | 816 | sce | Ex3_9.sce | errcatch(-1,"stop");mode(2);//Caption:Find the readings of transformers when it is connected for (a)OC test (b)SC test
//Exa:3.9
;
;
V1=460;//in volts
V2=230;//in volts
a=V1/V2;
R1=0.4;//in ohms
R2=0.1;//in ohms
X1=0.5;//in ohms
X2=0.12;//in ohms
R_o=650;//in ohms
X_o=250;//in ohms
I_w=V1/R_o;
I_m=V1/X_o;
P_occ=V1*I_w;
disp('Readings of transformer for OC test');
disp(V1,'Voltage Reading (in volts)=');
disp(sqrt(I_w^2+I_m^2),'Current Reading (in Amperes)=');
disp(P_occ,'Power output reading (in watts)=');
R_O1=R1+a^2*R2;
X_O1=X1+a^2*X2;
Z=sqrt(R_O1^2+X_O1^2);
I=4000/V1;
V_sc=I*Z;
P_sc=I^2*R_O1;
disp('Readings of transformer for SC test');
disp(V_sc,'Voltage Reading (in volts)=');
disp(I,'Current Reading (in Amperes)=');
disp(P_sc,'Power output reading (in watts)=');
exit();
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e635322c4b5bdf39b862ae507e160981e4098b2b | 449d555969bfd7befe906877abab098c6e63a0e8 | /2498/CH6/EX6.m.12/ex_m_6_12.sce | 0a8086fe48be0a4ffba6e8b6f4526149782cc2ef | [] | no_license | FOSSEE/Scilab-TBC-Uploads | 948e5d1126d46bdd2f89a44c54ba62b0f0a1f5e1 | 7bc77cb1ed33745c720952c92b3b2747c5cbf2df | refs/heads/master | 2020-04-09T02:43:26.499817 | 2018-02-03T05:31:52 | 2018-02-03T05:31:52 | 37,975,407 | 3 | 12 | null | null | null | null | UTF-8 | Scilab | false | false | 401 | sce | ex_m_6_12.sce | // Exa Misc. 6.12
clc;
clear;
close;
format('v',6)
// Given data
R_F = 20;// in k ohm
R1 = 10;// in k ohm
R2 = 20;// in k ohm
Vin1 = 2;// in V
Vin2 = 2;// in V
Vin3 = 2;// in V
// The output voltage, by using super position theorm,
Vo = ((-R_F/R1)*Vin1) + (-Vin2*R_F/R2+Vin2) + ((R_F/(((R1*R2)/(R1+R2))))*Vin3);// in V
disp(Vo,"The voltage is appeared at the output terminal in V is");
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c64e64219fc9daeb8b924ae82bf86a0cae383eb8 | 717ddeb7e700373742c617a95e25a2376565112c | /3424/CH5/EX5.12/Ex5_12.sce | 66976a0517a0c76a084b188d4a44ed6f08655d85 | [] | no_license | appucrossroads/Scilab-TBC-Uploads | b7ce9a8665d6253926fa8cc0989cda3c0db8e63d | 1d1c6f68fe7afb15ea12fd38492ec171491f8ce7 | refs/heads/master | 2021-01-22T04:15:15.512674 | 2017-09-19T11:51:56 | 2017-09-19T11:51:56 | 92,444,732 | 0 | 0 | null | 2017-05-25T21:09:20 | 2017-05-25T21:09:19 | null | UTF-8 | Scilab | false | false | 385 | sce | Ex5_12.sce | clc
// Intialization of variables
D = 1.94 // slugs/ft^3
Q = 300/(7.48*60) // ft^3/s
d1 = 3.5/12 //ft
d2 = 1/12 //ft^2
A1 = %pi*(d1/2)^2
A2 = %pi*(d2/2)^2
// Calculations
M = D*Q//slugs/s
V1 = Q/A1 //ft/s
V2 = Q/A2 //ft/s
Wsh = M*(3000 + (60*144/(1.94) )- (18*144/(1.94) )+ ((V2^2 - V1^2)/2) )/(550) // hp
// results
printf("Power required by the pump is %.1f hp ",Wsh)
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8f85a01bb6cd9fb117e0d1ecf001b6cf6faa1376 | 449d555969bfd7befe906877abab098c6e63a0e8 | /926/CH5/EX5.12/Chapter5_Example12.sce | 669dd7fa4c2918919c8593f6d844a966231e4e22 | [] | no_license | FOSSEE/Scilab-TBC-Uploads | 948e5d1126d46bdd2f89a44c54ba62b0f0a1f5e1 | 7bc77cb1ed33745c720952c92b3b2747c5cbf2df | refs/heads/master | 2020-04-09T02:43:26.499817 | 2018-02-03T05:31:52 | 2018-02-03T05:31:52 | 37,975,407 | 3 | 12 | null | null | null | null | UTF-8 | Scilab | false | false | 1,164 | sce | Chapter5_Example12.sce | //Hougen O.A., Watson K.M., Ragatz R.A., 2004. Chemical process principles Part-1: Material and Energy Balances(II Edition). CBS Publishers & Distributors, New Delhi, pp 504
//Chapter-5, Illustration 12, Page 127
//Title: Calculation of molal humidity
//=============================================================================
clear
clc
//INPUT
P = 1; //Pressure of entering gas in atm
DBT = 120; //Temperature of entering gas in degree F
//DATA FROM GRAPH
WBT = 71; //Wet bulb temperature in degree F corresponding to DBT of 120 degree F from Fig 20 Page 122
mH = 0.027; //Molal humidity corresponding to DBT of 120 degree F from Fig 20 Page 122
//OUTPUT
// Console output
mprintf('\n The temperature and molal humidity of saturated carbon dioxide leaving the chamber is %2.0f degree F and %4.3f respectively',WBT,mH);
// File output
fd= mopen('.\Chapter5_Example12_Output.txt','w');
mfprintf(fd,'\n The temperature and molal humidity of saturated carbon dioxide leaving the chamber is %2.0f degree F and %4.3f respectively',WBT,mH);
mclose(fd);
//=============================END OF PROGRMAM=================================
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