![D=R\\cdot cos^{-1}\\left [ \\frac{R}{(R+H)} \\right ]](http:\/\/s.wordpress.com\/latex.php?latex=D%3DR%5Ccdot%20cos%5E%7B-1%7D%5Cleft%20%5B%20%5Cfrac%7BR%7D%7B%28R%2BH%29%7D%20%5Cright%20%5D&bg=ffffff&fg=9C8A6A&s=2 "D=R\\cdot cos^{-1}\\left [ \\frac{R}{(R+H)} \\right ]")
,<\/span>\u00a0 \u00a0 \u00a0 \u00a0 \u00a0 \u00a0<\/p>\nThe radius of the Earth (R) is about<\/em> 3963 miles. The 30th floor [H] is about<\/em> 0.056 miles high (assume 10 feet per floor times 30 floors, all divided by 5280 feet per mile). Plugging that information into our equation, Now, suppose I am standing on the beach looking out toward the horizon. How far can I see? The radius of the earth has not changed. But now I am only .001 miles off the ground (somewhere between 5 and 6 feet). Our equation becomes Since we have a Right Triangle, we can use the Cosine trigonometric function to describe the angle that is the \u2018slice\u2019 of Earth between the Observer and the Horizon, call it \u0398. In Right Triangles, the Cosine of an angle is described as the side Adjacent to it divided by the Hypotenuse. In our case, ![3963\\cdot cos^{-1}\\left [ \\frac{3963}{(3963+0.056)} \\right ]](http:\/\/s.wordpress.com\/latex.php?latex=3963%5Ccdot%20cos%5E%7B-1%7D%5Cleft%20%5B%20%5Cfrac%7B3963%7D%7B%283963%2B0.056%29%7D%20%5Cright%20%5D&bg=ffffff&fg=000000&s=0 "3963\\cdot cos^{-1}\\left [ \\frac{3963}{(3963+0.056)} \\right ]")
![3963\\cdot cos^{-1}\\left [ \\frac{3963}{(3963+0.001)} \\right ]](http:\/\/s.wordpress.com\/latex.php?latex=3963%5Ccdot%20cos%5E%7B-1%7D%5Cleft%20%5B%20%5Cfrac%7B3963%7D%7B%283963%2B0.001%29%7D%20%5Cright%20%5D&bg=ffffff&fg=000000&s=0 "3963\\cdot cos^{-1}\\left [ \\frac{3963}{(3963+0.001)} \\right ]")
Trigonometry ahead<\/h3>\n
![\"\"](\"http:\/\/fortmarinus.com\/blog\/wp-content\/uploads\/2011\/10\/horizon500-292x300.jpg\" "\\"horizon500\\"")
Where does that lovely equation come from? Draw\u00a0a diagram.\u00a0Draw the Earth as a perfect two-dimensional circle. Also draw two radius lines; one terminating at the observer\u2019s location, the other at the horizon. The lines form a triangle. Geometrically, the ‘horizon’ is the point at which one\u2019s line-of-sight becomes tangent with the circle. By definition, the fact that the line-of-site is tangent to the circle means that the angle there is 90 degrees; the so-called \u2018Right Triangle\u2019.<\/p>\n
![\\Theta =cos^{-1}\\left [ \\frac{R}{(R+H)} \\right ]](http:\/\/s.wordpress.com\/latex.php?latex=%5CTheta%20%3Dcos%5E%7B-1%7D%5Cleft%20%5B%20%5Cfrac%7BR%7D%7B%28R%2BH%29%7D%20%5Cright%20%5D&bg=ffffff&fg=000000&s=0 "\\Theta =cos^{-1}\\left [ \\frac{R}{(R+H)} \\right ]")
![R\\cdot cos^{-1}\\left [ \\frac{R}{(R+H)} \\right ]](http:\/\/s.wordpress.com\/latex.php?latex=R%5Ccdot%20cos%5E%7B-1%7D%5Cleft%20%5B%20%5Cfrac%7BR%7D%7B%28R%2BH%29%7D%20%5Cright%20%5D&bg=ffffff&fg=000000&s=0 "R\\cdot cos^{-1}\\left [ \\frac{R}{(R+H)} \\right ]")
.<\/p>\n","protected":false},"excerpt":{"rendered":"