Determine the depth of a swimming pool filled with water

AI Thread Summary
To determine the depth of a swimming pool filled with water, the width was measured at 5.50m, and the angle of view to the bottom was noted at 14.0 degrees above the horizontal. Using trigonometric calculations, the correct depth was found to be 5.15m after correcting the angle of incidence. If the pool were filled with a liquid of refractive index n=1.65, visibility of the bottom would depend on the critical angle, which was discussed in relation to Snell's Law. The maximum index of refraction for the clear floor to prevent total internal reflection was also addressed. The final depth calculation was confirmed as accurate, resolving initial confusion about the large value.
Sammiebaby966
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We wish to determine the depth of a swimming pool filled with water without getting wet. We measure the width of the pool, which is 5.50m. We then note that the bottom edge is just visible when we stand and look at an angle of 14.0 degrees above the horizontal line.

a)Calculate the depth of the pool.

b)If the pool were filled with a different clear liquid, with index of refraction n=1.65. Would you be able to see the bottom of the pool from the side now?

c)The bottom of the pool is made of a clear solid material. What would be the maximum value of index of refraction of thisclear floor so that total internal reflection occurs? (It is filled with the n=1.65 liquid).
 
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Hi Sammiebaby, welcome to PF.
Please go through the rules of PF.
You have to your attempts before you seek our help.
At least find out the relevant equation required to solve the given problem.
Can you draw the ray diagram? can you state the Snell's law? What is the critical angle?
 
Sin\theta1n1=Sin\theta2n2

I got the angle of the index of refraction.

Sin\theta2=(1.00/1.33)Sin(14')=.182
\theta2=Sin^-1(.182)
\theta2=10.5'

Im not sure how to find the depth tho.
 
The given angle is above the horizon. So it is not the angle of incidence.
Draw the ray diagram and identify the different angles.
Find the angle of refraction. If you see the diagram, you can see that tanθ2 = width/depth.
 
So,

tan(10.5')=5.50m/x

x=5.50m/tan(10.5')

x=29.7m

So the depth is 29.7m? I am confused because that seems large.
 
Sammiebaby966 said:
So,

tan(10.5')=5.50m/x

x=5.50m/tan(10.5')

x=29.7m

So the depth is 29.7m? I am confused because that seems large.
Your angle of refraction is wrong. The angle of incidence is (90 - 14) degrees.
 
Oh wow, I am having a slow night sorry!
Sooo let's try this again:

Sin\theta2=(1.00/1.33)Sin(76)=.730
\theta2=Sin^-1(.730)
\theta2=46.9'

Sooo,

tan(46.9')=(5.50m)/depth

Depth=(5.50m)/tan(46.9')

Depth=5.15m

That sounds better. Did I mess up again or did I get it right?
 
Yes. You are right.
 
Thank you so much! =]
 

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