| 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 !Na@T�]J��
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clear D^a��(|L3;
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close all >3*a&_cI=k
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n1=1,n2=1.45; Z�my�cK:f
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theta=0:0.1:90; �Gx4{ ��9�
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a=theta*pi/180; GZH�J�4|DK
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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)); ~���]`U)Aw
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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)); +G\i$�d;St
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tp=2*n1*cos(a)./(n2*cos(a)+n1*sqrt(1-(n1/n2*sin(a)).^2)); JS��tEOQF4
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ts=2*n1*cos(a)./(n1*cos(a)+n2*sqrt(1-(n1/n2*sin(a)).^2)); "c�?3�1$6
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figure(1) 1*'ga��a&y
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subplot(1,2,1); _�y��sa�kn
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plot(theta,rp,'-',theta,rs,'--',theta,abs(rp),':',theta,abs(rs),'-.','LineWidth',2) k��sJ 1:�_
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legend('r_p','r_s','|r_p|','|r_s|') ;j[:t�t�\k
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xlabel('\theta_i') �Xy`'h5��
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ylabel('Amplitude') :7�J�P(�j2
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title(['n_1=',num2str(n1),',n_2=',num2str(n2)]) �v�S[\���j
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axis([0 90 -1 1]) ue��4��{�h
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subplot(1,2,2); Pj_DI)^���
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plot(theta,tp,'-',theta,ts,'--',theta,abs(tp),':',theta,abs(ts),'-.','LineWidth',2) �p,uM)L�D
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legend('t_p','t_s','|t_p|','|t_s|') J4z&�J �SY
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xlabel('\theta_i') Lxv_�{~I*�
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ylabel('Amplitude') v6E5#pse8
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title(['n_1=',num2str(n1),',n_2=',num2str(n2)]) Z�:V<�P,N�
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axis([0 90 0 1]) r>P�Kl'IbE
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grid on 1=!2|D:C)i
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Rp=abs(rp).^2; 7 n^1�H�[q
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Rs=abs(rs).^2; ��c?���G�V
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Rn=(Rp+Rs)/2; [D<(�xr&N%
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Tp=1-Rp; �/o�GaA@#+
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Ts=1-Rs; =*>.�z@WQ�
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Tn=(Tp+Ts)/2; �77 Z:!J|�
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figure(2) M-F{I��%Vx
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subplot(1,2,1); yZN�g�[KH
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plot(theta,Rp,'-',theta,Rs,'--',theta,Rn,':','LineWidth',2) kKDf%�=���
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legend('R_p','R_s','R_n') o�J#;X���R
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xlabel('\theta_i') gd]_�OY�7L
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ylabel('Amplitude') _�=cuO�o"!
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title(['n_1=',num2str(n1),',n_2=',num2str(n2)]) �!2/o]_K@+
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axis([0 90 0 1]) 8M���B�Y3F
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grid on 9c5D�E�q��
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subplot(1,2,2); DV�*e��.Y>
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plot(theta,Tp,'-',theta,Ts,'--',theta,Tn,':','LineWidth',2) �b/E3�Kse?
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legend('T_p','T_s','T_n') k[*> �nE��
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xlabel('\theta_i') 7dR]$�~+*e
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ylabel('Amplitude') { �/
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title(['n_1=',num2str(n1),',n_2=',num2str(n2)]) �wz��Y{�ii
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axis([0 90 0 1]) ��Qr-,��J_
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grid on o �Z%oP V:
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