| 200833 |
2017-11-26 22:33 |
利用MATLAB光学仿真(1)
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 +m�KII>�{�
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clear @&Yl'&pn-R
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close all ?�h#��F& y
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n1=1,n2=1.45; t0�:~�BYXu
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theta=0:0.1:90; �iQCs�8hIR
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a=theta*pi/180; �2#UVpgX?�
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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)); �gMZrtK�`<
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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)); �y=SpIb�n{
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tp=2*n1*cos(a)./(n2*cos(a)+n1*sqrt(1-(n1/n2*sin(a)).^2)); _R
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ts=2*n1*cos(a)./(n1*cos(a)+n2*sqrt(1-(n1/n2*sin(a)).^2)); U}<zn+SI#V
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figure(1) �<
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subplot(1,2,1); /B{�c��L`<
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plot(theta,rp,'-',theta,rs,'--',theta,abs(rp),':',theta,abs(rs),'-.','LineWidth',2) uk�D:4s�v
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legend('r_p','r_s','|r_p|','|r_s|') hrf�Se�$8�
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xlabel('\theta_i') ?i~��m�t'O
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ylabel('Amplitude') ^Ri��
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title(['n_1=',num2str(n1),',n_2=',num2str(n2)]) (|y@�ft�r@
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axis([0 90 -1 1]) 0�{Zwg�0&
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grid on #CB`�7�}jq
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subplot(1,2,2); dW|S\��S'&
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plot(theta,tp,'-',theta,ts,'--',theta,abs(tp),':',theta,abs(ts),'-.','LineWidth',2) r��"KW\HN8
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legend('t_p','t_s','|t_p|','|t_s|') DpL�|aRdbK
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xlabel('\theta_i') emS���7q|^
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ylabel('Amplitude') j5 W)9H�W:
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title(['n_1=',num2str(n1),',n_2=',num2str(n2)]) z�}P��1+Pm
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axis([0 90 0 1]) }/�%^;@q�;
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grid on ��`g(r.`t^
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Rp=abs(rp).^2; gBy�7�q09r
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Rs=abs(rs).^2; �*U|2u+| F
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Rn=(Rp+Rs)/2; _^]��:�tL6
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Tp=1-Rp; J�|�WkPv�2
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Ts=1-Rs; /2]=.bL�wz
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Tn=(Tp+Ts)/2; Z<[f81h�E&
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figure(2)
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subplot(1,2,1); qMmhmH)Gp
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plot(theta,Rp,'-',theta,Rs,'--',theta,Rn,':','LineWidth',2) jb!15�Vlt"
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legend('R_p','R_s','R_n') h#I]gH�QK�
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xlabel('\theta_i') |gJI}���"T
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ylabel('Amplitude') Kd^,NA�g�
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title(['n_1=',num2str(n1),',n_2=',num2str(n2)]) /�m+\oZ
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axis([0 90 0 1]) `1U?^9�Nf�
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grid on $@4�(Lq1�.
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subplot(1,2,2); W .�bJ.hO*
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plot(theta,Tp,'-',theta,Ts,'--',theta,Tn,':','LineWidth',2) pe7R1{2Q_s
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legend('T_p','T_s','T_n') �*lws��7R�
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xlabel('\theta_i') %:7�fAB,PA
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ylabel('Amplitude') D�= LLm$y
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title(['n_1=',num2str(n1),',n_2=',num2str(n2)]) !S�}��4b��
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axis([0 90 0 1]) |c5r&oM�&m
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grid on Z��{J{6j
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