[分享]利用MATLAB光学仿真（1） [复制链接]

利用菲涅尔公式计算光波在两种介质表面折反射率及折反射能流密度 'uGn1|Pvy  
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1、光疏射向光密 @QV|<NeH  
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clear \`;FL\1+W  
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close all <_=a1x  
v AP)(I  
n1=1,n2=1.45; i=OPl  
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theta=0:0.1:90; ,Bk mf|  
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a=theta*pi/180; v T2YX5k&,  
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rp=(n2*cos(a)-n1*sqrt(1-(n1/n2*sin(a)).^2))./(n2*cos(a)+n1*sqrt(1-(n1/n2*sin(a)).^2)); 
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rs=(n1*cos(a)-n2*sqrt(1-(n1/n2*sin(a)).^2))./(n1*cos(a)+n2*sqrt(1-(n1/n2*sin(a)).^2)); dqwAQ-x  
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tp=2*n1*cos(a)./(n2*cos(a)+n1*sqrt(1-(n1/n2*sin(a)).^2)); x* *]@v"g  
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ts=2*n1*cos(a)./(n1*cos(a)+n2*sqrt(1-(n1/n2*sin(a)).^2)); &Ey5 H?U!  
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figure(1) 5"%r
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7pH(_-TF  
subplot(1,2,1); bccJVwXv  
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plot(theta,rp,'-',theta,rs,'--',theta,abs(rp),':',theta,abs(rs),'-.','LineWidth',2) kngkG|du  
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legend('r_p','r_s','|r_p|','|r_s|') /5 B{szf  
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xlabel('\theta_i') 8VQJUwf;  
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ylabel('Amplitude') 89*CoQ  
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title(['n_1=',num2str(n1),',n_2=',num2str(n2)]) lyNa(3  
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axis([0 90 -1 1]) GGo)k1T|)  
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grid on s%z\szd*  
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subplot(1,2,2);
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plot(theta,tp,'-',theta,ts,'--',theta,abs(tp),':',theta,abs(ts),'-.','LineWidth',2) hNgbHzW  
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legend('t_p','t_s','|t_p|','|t_s|') EtvZk9d6h*  
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xlabel('\theta_i') }
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ylabel('Amplitude') f2ygN6(>  
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title(['n_1=',num2str(n1),',n_2=',num2str(n2)]) +EjH9;gx  
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axis([0 90 0 1]) Z 6KM%R  
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grid on Wew'bj   
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Rp=abs(rp).^2; QH@?.Kb_qU  
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Rs=abs(rs).^2; /\34o{  
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Rn=(Rp+Rs)/2; K>iM6Uv  
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Tp=1-Rp; L;N)l2
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Ts=1-Rs; hEla8L4Y  
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Tn=(Tp+Ts)/2; Gx/sJ(  
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figure(2) eH,r%r,  
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subplot(1,2,1); 9eO!_a^  
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plot(theta,Rp,'-',theta,Rs,'--',theta,Rn,':','LineWidth',2)
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legend('R_p','R_s','R_n') ?#~3%$>  
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xlabel('\theta_i') 9n4vuBgv  
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ylabel('Amplitude') 4M4Y2fBH  
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title(['n_1=',num2str(n1),',n_2=',num2str(n2)]) sjl(  
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axis([0 90 0 1]) &/QdG= r+  
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grid on
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subplot(1,2,2); E57:ap)/  
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plot(theta,Tp,'-',theta,Ts,'--',theta,Tn,':','LineWidth',2) d&[Ct0!++u  
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legend('T_p','T_s','T_n') t8SvU  
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xlabel('\theta_i') 3sr>?/>:  
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ylabel('Amplitude') #._%~}U  
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title(['n_1=',num2str(n1),',n_2=',num2str(n2)]) qyi5j0
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axis([0 90 0 1]) U`YPzZp_  

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grid on )}ygzKEa  
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2、光密射向光疏 <4lR  
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clear hA?Flq2QV  
hM_0/o-  
close all ?+3vK=Rf}  
.qd/ft2  
n1=1.45,n2=1; J#1-Le8@  
ot%^FvQ[c  
theta=0:0.1:90;  w^Mj[v#  
p :v'"A}  
a=theta*pi/180; c+BD37S  
OBnf5*eJ  
rp=(n2*cos(a)-n1*sqrt(1-(n1/n2*sin(a)).^2))./(n2*cos(a)+n1*sqrt(1-(n1/n2*sin(a)).^2)); 0f_+h %%=  
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rs=(n1*cos(a)-n2*sqrt(1-(n1/n2*sin(a)).^2))./(n1*cos(a)+n2*sqrt(1-(n1/n2*sin(a)).^2)); tfKf*Um  
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tp=2*n1*cos(a)./(n2*cos(a)+n1*sqrt(1-(n1/n2*sin(a)).^2));  dmR>u
 
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ts=2*n1*cos(a)./(n1*cos(a)+n2*sqrt(1-(n1/n2*sin(a)).^2)); ul@swp
 
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figure(1) (7X|W<xT  
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subplot(1,2,1); GgU8f0I  
L'Yg$9Vz  
plot(theta,rp,'-',theta,rs,'--',theta,abs(rp),':',theta,abs(rs),'-.','LineWidth',2) @~=*W5  
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legend('r_p','r_s','|r_p|','|r_s|') K'6NW:zp~  
xmM!SY>  
xlabel('\theta_i') 9mmkFaBQ  
m}-*B1  
ylabel('Amplitude') 9 HiH6f^5  
X_3*DqY  
title(['n_1=',num2str(n1),',n_2=',num2str(n2)]) ]\JLlQ}#H  
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axis([0 90 -1.5 1.5]) ia9=&Hy])  
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grid on mhNX05D  
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subplot(1,2,2); `MLOf  
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plot(theta,tp,'-',theta,ts,'--',theta,abs(tp),':',theta,abs(ts),'-.','LineWidth',2) OGR2Y  
bo-AM]  
legend('t_p','t_s','|t_p|','|t_s|') /g`!Zn8a  
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xlabel('\theta_i') W?:e4:Q  
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ylabel('Amplitude') ez-jVi-Fi  
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title(['n_1=',num2str(n1),',n_2=',num2str(n2)]) ?Tlt(%f  
G`e!WvC  
axis([0 90 -0.5 3]) u]z87#4  
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grid on Nd h  
w7%.EA{N  
Rp=abs(rp).^2; YlhyZ&a,  
rj ] ~g  
Rs=abs(rs).^2; !jTxMf  
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Rn=(Rp+Rs)/2; T!jMh-8  
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Tp=1-Rp; 5-RA<d#  
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Ts=1-Rs; m S4N%Q  
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Tn=(Tp+Ts)/2; nZX`y -AZ  
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figure(2) 4M)oA|1w  
pV(qan,  
subplot(1,2,1); 20 Z/Y\  
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plot(theta,Rp,'-',theta,Rs,'--',theta,Rn,':','LineWidth',2) 0aqq*e'c  
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legend('R_p','R_s','R_n') B;^1W{%J  
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xlabel('\theta_i') ]p@q.P  
LL_@nvu}M  
ylabel('Amplitude') { V$}qa{P  
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title(['n_1=',num2str(n1),',n_2=',num2str(n2)])
Ms=N+e$n  
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axis([0 90 0 1]) tPb<*{eG  
M%#F"^8v  
grid on <64#J9T^  
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subplot(1,2,2); aQj"FUL  
j6dlAe  
plot(theta,Tp,'-',theta,Ts,'--',theta,Tn,':','LineWidth',2) +62}//_?  
lxfv'A  
legend('T_p','T_s','T_n') Hbl&)!I  
Ov;q]Vn>  
xlabel('\theta_i') =>-W!Of  
N *,[(q  
ylabel('Amplitude') jG%J.u^k  
Rxq4Diq5k  
title(['n_1=',num2str(n1),',n_2=',num2str(n2)]) ZfibHivz  
XG!^[ZDs  
axis([0 90 0 1]) +fN2%aC  
ge]Z5E(1  
grid on -HvJ&O.V$  
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感谢楼主分享

这个在《MATLAB在光学中的应用》这本书里都有

谢谢了楼主分享

thanks

谢谢了楼主分享

学习学习

学习学习 3!B
3C(g  

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