The easiest way is to loop through the values of ‘ax’:
lambda=1.55e-6;
%Field in vertical direction
axv=linspace(1e-6,2e-6,10);
nw=1.5;
ns=1.498;
for k = 1:numel(axv)
ax = axv(k);
% Find value of V0
V0=2*pi/lambda*ax*(nw^2-ns^2)^.5;
syms b;
ri=(nw/ns)^2;
eqn0= V0*(1-b)^.5==2*atan(ri*(b/(1-b))^.5);
b0=double(vpasolve(eqn0,b));
neff0=(b0*(nw^2-ns^2)+ns^2)^.5;
kappax=2*pi/lambda*(nw^2-neff0^2)^.5;
gammasx=2*pi/lambda*(neff0^2-ns^2)^.5;
CMeqn_lx=1/gammasx+(ax+sin(kappax*ax)/kappax)/2/(cos(kappax*ax/2)^2);
%Field in horizontal
ay=8e-6;
gapy=2e-6;
V=2*pi/lambda*ay*(neff0^2-ns^2)^.5;
ri=1;
eqn= V*(1-b)^.5==2*atan(ri*(b/(1-b))^.5);
b1=double(vpasolve(eqn,b));
neff=(b1*(neff0^2-ns^2)+ns^2)^.5;
beta=2*pi/lambda*neff;
kappay=2*pi/lambda*(neff0^2-neff^2)^.5;
gammasy=2*pi/lambda*(neff^2-ns^2)^.5;
%Coupling Mode Equation
CMeqn_ly=1/gammasy+(ay+sin(kappay*ay)/kappay)/2/(cos(kappay*ay/2)^2);
CMeqn_r=4*pi/lambda/beta*3e8*(4*pi*1e-7);
C2=CMeqn_r/CMeqn_lx/CMeqn_ly;
C=C2^.5;
intgx=(ax+sin(kappax*ax)/kappax)/2/(cos(kappax*ax/2)^2);
intgy=(exp(-gammasy*gapy)*cos(kappay*ay/2)-exp(-gammasy*(ay+gapy))*cos(kappay*ay/2))/gammasy+(exp(-gammasy*gapy)*sin(kappay*ay/2)+exp(-gammasy*(ay+gapy))*sin(kappay*ay/2))*kappay/(gammasy^2);
intgy=intgy/(1+(kappay/gammasy)^2)/cos(kappay*ay/2);
Coupling=2*pi*3e8/lambda/4*(8.85418782e-12)*(nw^2-ns^2)*C2*intgx*intgy;
Lc(k)=pi/2/Coupling;
end
figure
plot(axv, Lc)
grid
xlabel('ax')
ylabel('Lc')
