Answer:
The answer to the question is
The distance d, which locates the point where the light strikes the bottom is  29.345 m from the spotlight.
Explanation:
To solve the question we note that Snell's law states that
The product of the incident index and the sine of the angle of incident is equal to the product of the refractive index and the sine of the angle of refraction
nâsinθâ = nâsinθâ
y = 2.2 m and strikes at x = 8.5 m, therefore tanθâ = 2.2/8.5 = 0.259 and
θâ =  14.511 °
nâ = 1.0003 = refractive index of air
nâ = 1.33 = refractive index of water
Therefore sinθâ =  [tex]\frac{n_1sin\theta_1}{n_2}[/tex]  = [tex]\frac{1.003*0.251}{1.33}[/tex] = 0.1885 and θâ = 10.86 °
Since the water depth is 4.0 m we have tanθâ = [tex]\frac{4}{x_2}[/tex] or xâ = [tex]\frac{4}{tan\theta_2 }[/tex] =[tex]\frac{4}{tan(10.86)}[/tex] = 20.845 m
d = xâ + 8.5 = 20.845 m + 8.5 m = 29.345 m.
