please help me !!Dimensions of matrices being concatenated are not consistent.

2 views (last 30 days)
hua
hua on 23 Dec 2013
Commented: hua on 23 Dec 2013
Error using vertcat Dimensions of matrices being concatenated are not consistent.
Error in mypaper/myfun (line 47) y = [a+b*(1-a)-x,
Error in fsolve (line 241) fuser = feval(funfcn{3},x,varargin{:});
Error in mypaper (line 5) y = fsolve(@myfun,z0,options);
Error in testMypaper (line 15) x = mypaper(p,min,n,m,N,L);
Caused by: Failure in initial user-supplied objective function evaluation. FSOLVE cannot continue.
function [y] = mypaper(p,min,n,m,N,L)
z0 = [0.1,0.1,0.1,0.1,0.1,0.1,0.1,0.1,0.1,0.1,0.1,0.1];
options = optimset('Display','off');
y = fsolve(@myfun,z0,options);
function y = myfun(z);
b0 = z(1);
a = z(2);
b = z(3);
x = z(4);
pidle = z(5);
lis1 = z(6);
lis2 = z(7);
ptx = z(8);
pco = z(9);
Pc = z(10);
pback1 = z(11);
pback2 = z(12);
y = [a+b*(1-a)-x,
((1-b)*(1-a)*((1-x^(m+1))/(1-x)) + x^(m+1))*b0/p - pidle,
((1-x^(m+1))/(1-x))*b0 - lis1,
(1-a)*((1-x^(m+1))/(1-x))*b0 - lis2,
1-(1-lis1)^(N-1) - Pc,
(1-Pc)*(1-b)*(1-a)*((1-x^(m+1))/(1-x))*b0 - ptx,
Pc*(1-b)*(1-a)*((1-x^(m+1))/(1-x))*b0 - pco,
((2^(min+n)+1)/2)*((x^n-x^(m+1))/(1-x))*b0 - pback2,
((1-x^(n+1))/(1-x) + 2^min*((1-(2*x)^(n+1))/(1-2*x)))*b0/2 - pback1,
L*Pc*(1-a)*(1-b) - a,
(1- 1/(1+1/(1-(1-lis1)^N)))*(1-(1-lis1)^N) -b,
pidle + ptx + pco + pback2 + pback1 - 1];
end
end
v = 0.2; N = 5; p = v/N; min = 3; n = 5; m = 7; L = 5; x = mypaper(p,min,n,m,N,L);
thank you for you help

Sign in to answer this question.

Accepted Answer

Image Analyst
Image Analyst on 23 Dec 2013
One of those lines that comprise y is not a scalar. Check each term one by one to see which is not a scalar.
term = a+b*(1-a)-x;
term = ((1-b)*(1-a)*((1-x^(m+1))/(1-x)) + x^(m+1))*b0/p - pidle;
term = ((1-x^(m+1))/(1-x))*b0 - lis1;
term = (1-a)*((1-x^(m+1))/(1-x))*b0 - lis2;
term = 1-(1-lis1)^(N-1) - Pc;
term = (1-Pc)*(1-b)*(1-a)*((1-x^(m+1))/(1-x))*b0 - ptx;
term = Pc*(1-b)*(1-a)*((1-x^(m+1))/(1-x))*b0 - pco;
term = ((2^(min+n)+1)/2)*((x^n-x^(m+1))/(1-x))*b0 - pback2;
term = ((1-x^(n+1))/(1-x) + 2^min*((1-(2*x)^(n+1))/(1-2*x)))*b0/2 - pback1;
term = L*Pc*(1-a)*(1-b) - a;
term = (1- 1/(1+1/(1-(1-lis1)^N)))*(1-(1-lis1)^N) -b;
term = pidle + ptx + pco + pback2 + pback1 - 1;
One of those will not be the same size as the others. Use the debugger to find out which term it is.

More Answers (0)

Categories

Find more on Creating and Concatenating Matrices in Help Center and File Exchange

Tags

Community Treasure Hunt

Find the treasures in MATLAB Central and discover how the community can help you!

Start Hunting!