| 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 97Qn�g�*i�
function sjr=nfdre(~) (�K+Tq�J�w
?I�b/}JS�T
%系统焦距及各镜间距输入,间距取负正负 R6Cm:4m�}I
_|Ml6;1�aZ
f=input('f:'); #�?�i#q%�q
d1=input('d1:'); 8P!dk5�,,O
d2=input('d2:'); MOG[��c�p
d3=input('d3:'); m�or��I'6N
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A=f^2/(d3*d2)-f/d1; 0{Kl5�>Z9M
B=f/d1-f/d2+f/d1+f/d3-d3*f/(d3*d2); dTaR���8�i
C=d3/d2-f/d1; �7`tnoTU�v
-�i�'T!Qg1
a1=(-B+sqrt(B^2-4*A*C))/(2*A);%α1 ZjEO$�ts=@
a2=d3/(a1*f);%α2 BQB�O]�<99
b2=a1*(1-a2)*f/d2;%β2 fT8Id\6�js
b1=(1-a1)*f/(d1*b2);%β1 IO xj$�?%l
c`X'Q)c&K�
�f��wAN9zs
%曲率半径 %i�%Xi+�{3
J6���[x�(T
R1=2*f/(b1*b2) ja7�Z��v[
R2=2*a1*f/(b2*(1+b1)) 0 �\�LkJ*i
R3=2*a1*a2*f/(1+b2) >Fld7;L?<
7�N�wi�\#o
A1=b2^3*(a1-1)*(1+b1)^3; >W'S�G3Hmc
B1=-(a2*(a1-1)+b1*(1-a2))*(1+b2)^3; 9v
cUo?�/�
C1=(a1-1)*b2^3*(1+b1)*(1-b1)^2-(a2*(a1-1)+b1*(1-a2))*(1+b2)*(1-b2)^2-2*b1*b2; \�Zf&&7�v
u."fJ2}l0X
A2=b2*(a1-1)^2*(1+b1)^3/(4*a1*b1^2); Z�{p6Q��1u
B2=-(a2*(a1-1)+b1*(1-a2))^2*(1+b2)^3/(4*a1*a2*b1^2*b2^2); B@��zJ\Ir[
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); SC2C%.�%l`
N`Bt|�#R��
CB=[C1 B1;C2 B2]; "}S�ER�C7
AB=[A1 B1;A2 B2]; v�[a#>!;�s
AC=[A1 C1;A2 C2]; <�YeF?�$S}
FYc��MvY��
%非球面系数 N@Mea���O�
k2=-(det(CB)/det(AB)); pXFNK�"�jm
k3=-(det(AC)/det(AB));
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k1=(k2*a1*b2^3*(1+b1)^3-k3*a1*a2*(1+b2)^3+a1*b2^3*(1+b1)*(1-b1)^2-a1*a2*(1+b2)*(1-b2)^2)/(b1^3*b2^3)-1 FOk�� �@W&
k2=k2 k)�v[��/#I
k3=k3 )i_FU~ LRq
5h:SH]tn8]
end jm-0]ugY&`
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%有中间像,焦距输入为正数 }uHc7gTBF7
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function sjr=yfdre(~) ZHC sv]l��
k@8#By�l�|
f=input('f:'); 3yKI�2en�"
d1=input('d1:'); k9Sqp��:l,
d2=input('d2:'); (J����$�A
d3=input('d3:'); "�}OFwes��
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A=f^2/(d3*d2)-f/d1; xu:�m~8�%�
B=f/d1-f/d2+f/d1+f/d3-d3*f/(d3*d2); �;n;^f&;sJ
C=d3/d2-f/d1; �6�8�HX�,t
�f]�'@V�t>
a1=(-B-sqrt(B^2-4*A*C))/(2*A); 9wq�%F�nt�
a2=d3/(a1*f); /5�x�`�TT
b2=a1*(1-a2)*f/d2; KFZ[gqW8YY
b1=(1-a1)*f/(d1*b2); xapkhIW�2\
@zJ�I0_Bp�
%曲率半径 H�~ZSw7!M8
sRZ�:9de�+
R1=2*f/(b1*b2) 4�i�LU "�~
R2=2*a1*f/(b2*(1+b1)) M)J�*D�f0@
R3=2*a1*a2*f/(1+b2) W1@;94Sb~
sd[Q�tK�^�
A1=b2^3*(a1-1)*(1+b1)^3; wFJK�!9KA8
B1=-(a2*(a1-1)+b1*(1-a2))*(1+b2)^3; Dz50,*�}J�
C1=(a1-1)*b2^3*(1+b1)*(1-b1)^2-(a2*(a1-1)+b1*(1-a2))*(1+b2)*(1-b2)^2-2*b1*b2; gNq���V>p�
�w�//w$}v�
A2=b2*(a1-1)^2*(1+b1)^3/(4*a1*b1^2); P+b�^;+\1s
B2=-(a2*(a1-1)+b1*(1-a2))^2*(1+b2)^3/(4*a1*a2*b1^2*b2^2); ��l�lleo8
C2=b2*(a1-1)^2*(1+b1)*(1-b1)^2/(4*a1*b1^2)-(a2*(a1-1)+b1*(1-a2))^2*(1+b2)*(1-b2)^2/(4*a1*a2*b1^2*b2^2)-b2*(a1-1)*(1-b1)*(1+b1)/(a1*b1)-(a2*(a1-1)+b1*(1-a2))*(1-b2)*(1+b2)/(a1*a2*b1*b2)-b1*b2+b2*(1+b1)/a1-(1+b2)/(a1*a2); 4w
z�
6�%�
��*SY4lqN�
CB=[C1 B1;C2 B2]; 'u3+���k.�
AB=[A1 B1;A2 B2]; vv0zUvmT�
AC=[A1 C1;A2 C2]; �W�vJ?�e��
+E [b�Lz^�
%二次系数 �$�0�*47+f
O5{X�T]�:�
k2=-(det(CB)/det(AB)); s =5H.q%PV
k3=-(det(AC)/det(AB)); iTt=a�Qj�d
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 |f:d72�{Qr
k2=k2 W<�LaR,�7
k3=k3 _Y|kX2l
S@
@
RI^w�Z-;
end
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