Answer :
Answer:
1) r12 = r23 ( This signifies that the waves interfere destructively )
2) SiO2 should be chosen , Thickness = 150 nm
Explanation:
1 ) Prove that; r12 = r23
i) Considering light travelling in medium 1 ( i.e. incident between layers 1 and 2 )
r₁₂ ( reflection coefficient ) = ( n₁ - n₂ ) / ( n₁ + n₂ )
= ( n₁ - √n₁ n₃ ) / ( n₁ + √n₁ n₃ )
= [tex]\frac{1- \sqrt{\frac{n3}{n1} } }{1+ \sqrt{\frac{n3}{n1} } }[/tex]
ii) considering light travelling in medium 2 ( i.e. incident between layers 2 and 3 )
r₂₃ ( reflection coefficient ) = ( n₂ - n₃ ) / (n₂ + n₃ )
= ( √n₁ n₃ - n₃ ) / ( √n₁ n₃ + n₃ )
= [tex]\frac{1- \sqrt{\frac{n3}{n1} } }{1+ \sqrt{\frac{n3}{n1} } }[/tex]
hence r12 = r23 ( This signifies that the waves interfere destructively )
2) Determine the antireflection coating to use and the thickness
Refractive index of SiO2 = 1.5
Refractive index of TiO2 = 2.3
an ideal refractive index for an antireflection coating ( n2 )
= √n₁ n₃ = √(1)(3.5) = 1.87
the refractive index closest to this value = 1.5 ( hence SiO2 will be chosen )
Thickness of SiO2 ( diameter )
= 900 / ( 4*n2 )
= 900 / ( 4 * 1.5 ) = 900 / 6 = 150 nm