| songshaoman |
2020-05-25 15:25 |
在框架结构确定的情况下,基于matlab的消四种像差的三反系统初始结构的求解
%无中间像,焦距输入为负数 PQ" �Dl�=,
function sjr=nfdre(~) t�� [��f]�
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%系统焦距及各镜间距输入,间距取负正负 nM#\4Q[}Jh
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f=input('f:'); V!��p;M��E
d1=input('d1:'); f�|!�z�jX`
d2=input('d2:'); #\qES7We�6
d3=input('d3:'); ,b{4��GU$3
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A=f^2/(d3*d2)-f/d1; �c)?y�3LX�
B=f/d1-f/d2+f/d1+f/d3-d3*f/(d3*d2); V.qB3��V�$
C=d3/d2-f/d1; $|Kbj�p��Q
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a1=(-B+sqrt(B^2-4*A*C))/(2*A);%α1 3~��y�lBJJ
a2=d3/(a1*f);%α2 hz!.|U@,{<
b2=a1*(1-a2)*f/d2;%β2 Y����yf�8B
b1=(1-a1)*f/(d1*b2);%β1 G�9�;WO��*
=�>9`qcNW_
idHBz*3~ps
%曲率半径 �On�ao'sjY
yd�$y\pN=<
R1=2*f/(b1*b2) pnWDsC�~)�
R2=2*a1*f/(b2*(1+b1)) pV_2JXM�~@
R3=2*a1*a2*f/(1+b2) d}1R��<Q;F
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A1=b2^3*(a1-1)*(1+b1)^3; bLg1D�d�7Q
B1=-(a2*(a1-1)+b1*(1-a2))*(1+b2)^3; x(A�.^�Yz�
C1=(a1-1)*b2^3*(1+b1)*(1-b1)^2-(a2*(a1-1)+b1*(1-a2))*(1+b2)*(1-b2)^2-2*b1*b2; k#
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A2=b2*(a1-1)^2*(1+b1)^3/(4*a1*b1^2); EG,R�lmcPp
B2=-(a2*(a1-1)+b1*(1-a2))^2*(1+b2)^3/(4*a1*a2*b1^2*b2^2); ]`�%cTdpLj
C2=b2*(a1-1)^2*(1+b1)*(1-b1)^2/(4*a1*b1^2)-(a2*(a1-1)+b1*(1-a2))^2*(1+b2)*(1-b2)^2/(4*a1*a2*b1^2*b2^2)-b2*(a1-1)*(1-b1)*(1+b1)/(a1*b1)-(a2*(a1-1)+b1*(1-a2))*(1-b2)*(1+b2)/(a1*a2*b1*b2)-b1*b2+b2*(1+b1)/a1-(1+b2)/(a1*a2); 9kcAMk1K��
-7�0U�t
4B
CB=[C1 B1;C2 B2]; �:E�Z��TJu
AB=[A1 B1;A2 B2]; rc"yEI-``"
AC=[A1 C1;A2 C2]; �� 5bk5EE`
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%非球面系数 |�#�k1�a:
k2=-(det(CB)/det(AB)); |,o!O39}>
k3=-(det(AC)/det(AB)); �Y:O%x�tGi
k1=(k2*a1*b2^3*(1+b1)^3-k3*a1*a2*(1+b2)^3+a1*b2^3*(1+b1)*(1-b1)^2-a1*a2*(1+b2)*(1-b2)^2)/(b1^3*b2^3)-1 ��V����}�&
k2=k2 3vx?x�39*Y
k3=k3 }JS?42CTaV
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end n<MH\.!t�M
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%有中间像,焦距输入为正数 p\Jz<dkN1�
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function sjr=yfdre(~) S>nM&75��8
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f=input('f:'); I��L\#�!|>
d1=input('d1:'); W���S�L_Dc
d2=input('d2:'); E}�Ul��Qq
d3=input('d3:'); {{j?3O�//�
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A=f^2/(d3*d2)-f/d1; 1N2s[ \q$
B=f/d1-f/d2+f/d1+f/d3-d3*f/(d3*d2); 7^=O�^�!sa
C=d3/d2-f/d1; �6#v�"��+V
YoJN.]�,gf
a1=(-B-sqrt(B^2-4*A*C))/(2*A); &q>=6sQv�f
a2=d3/(a1*f); BD�peA�F8z
b2=a1*(1-a2)*f/d2; �V1�M oW;&
b1=(1-a1)*f/(d1*b2); �|d�K_^~;o
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hv�O
%曲率半径 n>�{�>3�?�
+v/_R{� M�
R1=2*f/(b1*b2) ]�oj
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R2=2*a1*f/(b2*(1+b1)) �{2A/�@$?�
R3=2*a1*a2*f/(1+b2) 7i`�8 c =.
d�x�?4)lb
A1=b2^3*(a1-1)*(1+b1)^3; \f��.ceh;!
B1=-(a2*(a1-1)+b1*(1-a2))*(1+b2)^3; ZdfIe~O�ni
C1=(a1-1)*b2^3*(1+b1)*(1-b1)^2-(a2*(a1-1)+b1*(1-a2))*(1+b2)*(1-b2)^2-2*b1*b2; #7Gb�G\��
�~�]3y66�7
A2=b2*(a1-1)^2*(1+b1)^3/(4*a1*b1^2); �p�\��1-.
B2=-(a2*(a1-1)+b1*(1-a2))^2*(1+b2)^3/(4*a1*a2*b1^2*b2^2); �.�>_p7=�a
C2=b2*(a1-1)^2*(1+b1)*(1-b1)^2/(4*a1*b1^2)-(a2*(a1-1)+b1*(1-a2))^2*(1+b2)*(1-b2)^2/(4*a1*a2*b1^2*b2^2)-b2*(a1-1)*(1-b1)*(1+b1)/(a1*b1)-(a2*(a1-1)+b1*(1-a2))*(1-b2)*(1+b2)/(a1*a2*b1*b2)-b1*b2+b2*(1+b1)/a1-(1+b2)/(a1*a2); r!'\$(m� E
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CB=[C1 B1;C2 B2]; $3�k5hDA0e
AB=[A1 B1;A2 B2]; mJ�p)nF8r~
AC=[A1 C1;A2 C2]; �&^9�2z:?�
4g�z�r�x�V
%二次系数 Y;G+jC8
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k2=-(det(CB)/det(AB)); �ND77(I$3s
k3=-(det(AC)/det(AB)); \:, dWL��u
k1=(k2*a1*b2^3*(1+b1)^3-k3*a1*a2*(1+b2)^3+a1*b2^3*(1+b1)*(1-b1)^2-a1*a2*(1+b2)*(1-b2)^2)/(b1^3*b2^3)-1
�G<U �MZg
k2=k2 A�46Xei:Ow
k3=k3 jw]~g+x#$
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end
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