b are constants and both equal to
This is the code I am using:
% Solving the equation for zero. f = @(theta) ((a+b).*theta)./((theta.^2)-(a.*b)) - tan(theta); % Notice the dots (.) % Now plot it to get an idea of where the zeros are. theta = 0:1:100; for i=1:length(theta) hold on plot(theta(i),f(theta(i)),'-o') % Look for the zeros end % Now find the roots. cnt = 1; for ii = [0,2,50] % This vector has the guesses. rt(cnt) = fzero(f,ii); % Pass each guess to FZERO. cnt = cnt + 1; end
This is the error I get:
??? Operands to the || and && operators must be convertible to logical scalar values. Error in ==> fzero at 323 elseif ~isfinite(fx) || ~isreal(fx) Error in ==> HW4 at 52 rt(cnt) = fzero(f,ii); % Pass each guess to FZERO.
I would like to get the first solution of \theta. Thanks.