Answer:
apparent depth of the air bubble is 9 cm
Explanation:
As we know that the glass sphere has radius R = 17 cm
refractive index of the glass = 1.50
position of air bubble in the glass sphere = 6.30 cm above center
now the distance of the air bubble from the surface of glass sphere
[tex]d_o = 17 - 6.30 = 10.7 cm[/tex]
now we have
[tex]\frac{n_2}{d_i} - \frac{n_1}{d_o} = \frac{n_2 - n_1}{R}[/tex]
now plug in all data
[tex]\frac{1}{d_i} + \frac{1.50}{10.7} = \frac{(1 - 1.50)}{-17}[/tex]
[tex]d_i = 9 cm[/tex] (below the surface of the glass)
