Answer:
d = 0.125 mm
Explanation:
using snell's law
[tex]\dfrac{sin\ i}{sin\ r} = \dfrac{n_2}{n_1}[/tex]
[tex]r = sin^{-1}(\dfrac{n_1sin\ i }{n_2})[/tex]
n₁ = 1 for air
[tex]r = sin^{-1}(\dfrac{sin\ 59^{\circ} }{1.5})[/tex]
r = 25.09⁰
displacement of color would be
[tex]d = t\dfrac{sin(i-r)}{cosr}\\d= 3.2\dfrac{sin(59-25.09)}{cos25.09}\\d= 1.932 mm[/tex]
for second color
using snell's law
[tex]\dfrac{sin\ i}{sin\ r} = \dfrac{n_2}{n_1}[/tex]
[tex]r = sin^{-1}(\dfrac{n_1sin\ i }{n_2})[/tex]
n₁ = 1 for air
[tex]r = sin^{-1}(\dfrac{sin\ 59^{\circ} }{1.53})[/tex]
r = 22.58°
displacement of color would be
[tex]d = t\dfrac{sin(i-r)}{cosr}\\d= 3.2\dfrac{sin(59-22.58)}{cos22.58}\\d= 2.057 mm[/tex]
hence, separation is
d = 2.057 - 1.932
d = 0.125 mm
