if you are looking at the horizon, you can determine the distance you are from the horizon in miles D from a height h in feet by the equation of D = 1.2 square root h if you are standing on a mountain top that is 12000 feet in elevation how far are you from the horizon. solve the problem using correct mathematical symbols and by explaining thoughtly in words each step.
If the radius of the earth is R feet, then
R^2 + D^2 = (R+h)^2
Dunno where that formula you showed came from.
determine the distance you are from the horizon in miles, D, from a height, h, in feet by the equation of D = 1.2square feet of h. If you are standing on a mountain top that is 12,000 feet in elevation, how far are you from the horizon?
D = 1.2%2Asqrt%2812000%29
D = 1.2 * 109.5445
D = 131.453 miles
d=1.2.divde 12000
D=1.2*109.5445
D=131.453miles
To determine the distance from the horizon when standing on a mountain top, we can use the equation D = 1.2 √ h, where D represents the distance in miles and h represents the height in feet.
Given that the elevation of the mountain top is 12,000 feet, we need to calculate the distance from the horizon.
Step 1: Substitute the given value into the equation:
D = 1.2 √(12,000)
Step 2: Calculate the square root of the height:
√(12,000) = √(400 * 30) = √400 * √30 = 20√30
Step 3: Substitute the value back into the original equation:
D = 1.2 * 20√30
Step 4: Simplify:
D = 24√30
So, when standing on a mountain top with an elevation of 12,000 feet, you are approximately 24√30 miles away from the horizon.