Respuesta :
Answer: Horizon is 35777.64 m away from observation deck.
Step-by-step explanation:
Since we have given that
Height of tower above ground level = 200 m
Radius of earth = 6400 km
Let R be the radius of earth.
Let the height of observation and
Let d be the distance from observation deck to horizon.
so, it makes a right angle triangle.
[tex](R+h)^2=R^2+d^2\\\\R^2+h^2+2Rh=R^2+d^2\\\\h^2+2Rh=d^2\\\\200^2+2\times 6400000\times 200=d^2\\\\40000+1280040000=d^2\\\\1280040000=d^2\\\\\sqrt{1280040000}=d\\\\d=35777.64\ km[/tex]
Hence, horizon is 35777.64 m away from observation deck.
Answer:
He is a a distance of 50.597 km from the observable deck of horizon.
Step-by-step explanation:
The distance from a height 'h' to the observable horizon ignoring the effects due to refraction in atmosphere is given by the formula
[tex]d=\sqrt{h(2R+h)}[/tex]
where
d = distance to observable horizon
h = height of observer from the sea level
R = Radius of earth
Applying the values we get
[tex]d=\sqrt{0.2\times (2\times 6400+0.2)}\\\\\therefore d=50.597km[/tex]
