Hello,
I am trying to solve the following system of equations and while I do get an answer, this is complex. For my application, only positive & real solutions are relevant. Furthermore, the solutions to "c1", "c2", "c4" should lie in the range 0 to 1. And c1 + c2 + c3 + c4 should sum to 1.
Is there a way to use vpasolve to find solutions for c1, c2, c4 that are positive, real, and between 0 to 1, or can anyone suggest another solver to use for my problem please?
Thank you.
Code:
clear all;
clc;
a = [0.0094; 7.0888e-04; 0.7627; 0.1656];
c3 = 0.95;
syms n c1 c2 c4
init_param = [0; 1];
eqn1 = ( n == ((log10((c1/a(1,1)) * (a(4,1)/c4))) / (log10(1.57488))) );
eqn2 = ( n == ((log10((c2/a(2,1)) * (a(4,1)/c4))) / (log10(1.55548))) );
eqn3 = ( n == ((log10((c3/a(3,1)) * (a(4,1)/c4))) / (log10(1.30607))) );
eqn4 = ( 1 - (c1 + c2 + c3 + c4) == 0 );
sols = vpasolve([eqn1 eqn2 eqn3 eqn4], [n; c1; c2; c4], init_param)
Gives:
Error using sym/vpasolve>checkMultiVarX
Incompatible starting points and variables.
Code:
clear all;
clc;
a = [0.0094; 7.0888e-04; 0.7627; 0.1656];
c3 = 0.95;
syms n c1 c2 c4
init_param = [0; 1];
eqn1 = ( n == ((log10((c1/a(1,1)) * (a(4,1)/c4))) / (log10(1.57488))) );
eqn2 = ( n == ((log10((c2/a(2,1)) * (a(4,1)/c4))) / (log10(1.55548))) );
eqn3 = ( n == ((log10((c3/a(3,1)) * (a(4,1)/c4))) / (log10(1.30607))) );
eqn4 = ( 1 - (c1 + c2 + c3 + c4) == 0 );
sols = vpasolve([eqn1 eqn2 eqn3 eqn4], [n; c1; c2; c4], init_param)
Gives:
n: 6.7426863581108857304747603024111 + 3.9194661375046172368785216288436i
c1: 0.030720057908933124309712773265263 + 0.027689129624897200337074934618641i
c2: 0.0022216968838103768366405641539907 + 0.0018149441042006610883472427462662i
c4: 0.017058245207256498853646662580747 - 0.029504073729097861425422177364907i
