Answer:
The time is [tex]t = 8.78 \ s[/tex]
Explanation:
From the question we are told that
The initial height of the eye is [tex]h _1 = 20 \ cm = 0.2 \ m[/tex]
The height of the eye when you jumped up is [tex]h_2 = 150 \ cm = 1.5 \ m[/tex]
An illustration of this question is shown on the first uploaded image
Generally the radius of the earth is [tex]R = 6.38*10^{6} \ m[/tex]
Now from the diagram first sun means first time you saw the sun and the second sun means second time you saw the sun then
H is the height increase when you quickly stood up which is mathematically evaluated as
[tex]H = h_2 -h_1[/tex]
[tex]H = 1.5 - 0.2[/tex]
[tex]H = 1.3 \ m[/tex]
Also [tex]\theta[/tex] i the angular displacement between the first and second position and from geometry it is also the angle at one of the sides of the right angle triangle
Applying Pythagoras theorem
[tex](R+H)^2 = K^2 + R^2[/tex]
=> [tex]R^2 + H^2 + 2RH = K^2 + R^2[/tex]
Now given that H is very small compared to R the we ignore [tex]H^2[/tex]
So
[tex]R^2 + 2RH = K^2 + R^2[/tex]
=> [tex]K = \sqrt{2RH}[/tex]
=> [tex]K = \sqrt{2 * 6.38*10^6 * 1.3 }[/tex]
=> [tex]K = 4073 \ m[/tex]
Now the [tex]\theta[/tex] is mathematically evaluated using SOHCAHTOA as follows
[tex]tan \theta = \frac{K}{R}[/tex]
[tex]\theta = tan^{-1}[ \frac{K}{R}][/tex]
=> [tex]\theta = tan^{-1}[ \frac{ 4073}{6.38*10^{6}}][/tex]
=> [tex]\theta = 0.0366^o[/tex]
Generally
[tex]1 \revolution\ around \ the\ earth = 24 \ hours = 86400 \ seconds = 360 ^o[/tex]
So
[tex]\frac{\theta}{360} = \frac{t}{86400}[/tex]
=> [tex]\frac{0.0366}{360} = \frac{t}{86400}[/tex]
=> [tex]t = 8.78 \ s[/tex]
