SOLUTION

La loi des cosinus donne :

$(z+R)^2= R^2+s^2-2sR\cos(\theta+\pi/2)$

$z=R\left( 1+\frac{2s\sin{\theta}}{R}+\frac{s^2}{R^2}\right)^{1/2}-R \simeq s\sin{\theta}$

$N_{\theta}=\int_0^{\infty}n_0\exp{\left(-\frac{s\sin{\theta}}{z_0}}\right)ds}=\frac{z_0n_0}{\sin{\theta}}$