One route along flat terrain from Hermansville to Melville is to drive straight north from Hermansville for 120 miles to Jamestown, then, at Jamestown, to drive straight west for 80 miles to Melville.
If a straight, flat road existed between Hermansville and Melville, approximately how many miles long would it be?
Answer (3)
approx. 144 mileswe can find this length by use of pythagorean's threorom. we use it because there's a 90 degree angle in the triangle, first we go due north, then turn due west.
a 2 + b 2 = c 2 , where a & b and the lines attached to the right angle, and c is the hypotenuse, also the length we're looking for.
12 0 2 + 8 0 2 = c 2 14400 + 6400 = c 2 20800 = c 2 c = 20800 ≈ 144.2
Approximately 144 miles. You have to use the pythagorean theorem. a^2+b^2=c^2. 120 and 80 will be the legs, a and b. 120^2 + 80^2 = c^2. 14400 + 6400 = 20800. Remember, c is squared, so to find the answer, you need to find the square root of 20800, which is 144.222051019. Therefore, c, the road between Hermansville and Melville, would be approximately 144 miles.
The straight-line distance from Hermansville to Melville can be calculated using the Pythagorean theorem. The equation shows that the distance is approximately 144.22 miles. This result is derived by calculating the hypotenuse of a right triangle formed by the two segments of the route.
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