Finding a variable value using no fzero etc.
1 visualizzazione (ultimi 30 giorni)
Mostra commenti meno recenti
Hi I have another problem that I cannot using fzero or solve or any method that uses initial answers because It can produce the exact answer
Y(t,j)=[0,0,1,0;1,0,0,0;0,0,0,1;0,1,0,0];
A(i,j)=[1,4,6,2;4,5,2,3;5,3,2,4];
now I have K(i,j) which needs to be calculated as follow
sigma(Y(1,j)*(K(1,j)-A(1,j)))=0
this part is simple I could easily calculate K(1,j) after having K(1,j) I need to use it in the following equation to calculate K(t,j)
sigma( sigma(Y(t,j)*(K(1,j)-(sigma(Y(t-1,f)*K(1,f)+A(1,j)))))=0
I calculated the answer K(1,3) = 6 from equation 1
from equation 2 we have K(1,1)=7, K(1,4)=9, K(1,2)=13
it can be easily calculated because it is gradually like this Y(K-A)=0 and we have y that is one and A
The problem is : how can I code the second equation that I would be able to calculate K(t,j) and use it in another equation? no fzero, solve etc. can anyone help?
1 Commento
Matt J
il 12 Ago 2014
because It can produce the exact answer
Do you mean "can", or did you really mean "can't"? No solver will produce an exact answer. You always have inexact calculations in finite precision computers.
Risposte (1)
Matt J
il 12 Ago 2014
Your equations are linear, so you just have to build an appropriate matrix equation
P*X=Q
and solve as X=P\Q
5 Commenti
Matt J
il 13 Ago 2014
There shouldn't be a fundamental difference. Both summations are equivalent to weighted sums of the K(i) with different sets of coefficients. Just put the coefficients into the rows of a matrix, one row per equation.
Vedere anche
Community Treasure Hunt
Find the treasures in MATLAB Central and discover how the community can help you!
Start Hunting!