What problem did you run into when you ran the code?
Hi, can any one please help me in solving the integral involving in this problem, The pdf is also attached. Thank you in advance
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g = 1.55;
t = 2*10^-9;
L = 50*10^-6;
R = 50*10^-9;
u = (R+t)^2 - R^2;
kp = 3000;
kf = 0.663;
phi = 0.1;
phi1 = pi;
e = sqrt( 1 - (( R^2 + u ) / ( (L/2)^2 + u)));
G = ( 2 * e * ( 1 - e^2 )^1/6 ) / ( e * sqrt((1 - e^2)) + asin(e));
n = 3 * G^-g;
C = (( R + t )^2 - R^2 )/ R^2;
klr = ( kp * R * (1 + t/R - kf/ kp) * log (1 + t/R ))/ ( t * kf * log ((1 + t/R ) * kp / kf));
B = ( R/ (R + t))* ((( kp - klr)/(klr + kp)) - 1);
A = - (2 * klr / (kp + klr));
kpez = (kp + C * klr)/ (1 + C);
kpex = (A * phi * kp + B * C * phi *klr) / (A * phi + B * C * phi);
syms x;
g = inline('sqrt( (kpez)^2 * sin(x)^2+ (kpex)^2 * cos(x)^2)', 'x', 'kpez' , 'kpex')
kpe = (1/ pi) * int(g(x, kpez, kpex),x,0,pi);
B1 = (kpe + kf * (n - 1) + (n + 1)* (kpe - kf) * (1 + C) * phi1)/ (kpe + kf * (n - 1)- (kpe-kf) * (1 + C) * phi1 )
채택된 답변
Torsten
2017년 5월 2일
Remove
syms x
and use
g=@(x)sqrt(kpez^2*sin(x).^2+kpex^2*cos(x).^2);
kpe=1/pi*integral(g,0,pi);
Best wishes
Torsten.
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