Solving a system of linear equations with a few known variables

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Deepa Maheshvare
Deepa Maheshvare le 11 Déc 2018
Commenté : AKASH BHOYAR le 19 Mai 2022
I'm solving the following system of linear equations,
Ax = b, some of the x's are knowns.
For example,
A=
-12 12 0 0 0
0 -1 1 0 0
0 0 -0.5 0.5 0
0 0 0 -17 17
x = [x1 x2 x3 x4 x5]
b = [b1 0 0 0 b5]
When some of the variables are known, say x1 and x5 are known, the system can be reduced in terms of the known variables. However, when there are around 50 variables and 5 are known re-writing the matrix in terms of the known variables is difficult.
I would like ask for suggestions on alternate ways of solving these kind of linear systems in which the values of a few variables are known.
  2 commentaires
KSSV
KSSV le 11 Déc 2018
To solve b should be having a length equal to rows of A. Read about mldivide i,e \
Deepa Maheshvare
Deepa Maheshvare le 11 Déc 2018
Thanks for the reply. Yes, I am considering a square matrix to solve for b.

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Bruno Luong
Bruno Luong le 11 Déc 2018
Modifié(e) : Bruno Luong le 11 Déc 2018
Assuming known is the logical index == TRUE for indexes of x that are known
% known = ismember(1:5,[1 5]) % in your example
x(known) = XValueYouKnow;
x(~known) = A(:,~known) \ (b-A(:,known)*x(known))

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madhan ravi
madhan ravi le 11 Déc 2018
Modifié(e) : madhan ravi le 11 Déc 2018
See https://in.mathworks.com/matlabcentral/answers/297297-how-to-solve-a-system-of-equations-in-the-matlab?s_tid=answers_rc1-2_p2_MLT#answer_230057 for detailed discussion.
One way using solve():
syms x1 x2 x3 x4 x5 b1 b5
eqn=[ -12*x1+12*x2==b1;
-x2+x3==0;
-0.5*x3+0.5*x4==0;
-17*x4+17*x5==b5];
[x1,x2,x3,x4]=solve(eqn)
Second way using linsolve():
syms b1 b5
A=[ -12 12 0 0 0
0 -1 1 0 0
0 0 -0.5 0.5 0
0 0 0 -17 17];
b = [b1;0;0;b5];
[x,R]=linsolve(A,b)
Third way using mldivide():
syms b1 b5
A=[ -12 12 0 0 0
0 -1 1 0 0
0 0 -0.5 0.5 0
0 0 0 -17 17];
b = [b1;0;0;b5];
A\b % x5 has infinity number of solutions I guess
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Deepa Maheshvare
Deepa Maheshvare le 11 Déc 2018
My query is,
eqn=[ 190*x1-190*x2==b1;
-190*x1+381*x2-190*x3==0;
-190*x2+381*x3-190*x4==0;
-190*x3+381*x4-190*x5==0;
-190*x4+190*x5==b5];
can be easily written for a small set of equations. When the size of matrix A is 50 x 50 , and 50 variables are present,it will be difficult to manually type all 50 equations in eqn=[]and use solve to reduce A matrix in terms of the unknowns.

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