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If a ball is dropped near the surface of the earth, then the distance it falls is directly proportional to the square of the time it has fallen. A ball is dropped over the edge of a vertical cliff and falls 39.2 meters in two seconds. Determine the distance (in meters) the ball would have dropped in 3.5 seconds. The ball would have dropped ______ meters. Round your answer to two decimal places.

Respuesta :

carlosego
For this case we have:
 "the distance it falls is directly proportional to the square of the time it has failed"
 Thus,
 d = k * t ^ 2
 We search for k by means of the following statement:
 "A ball is dropped over the edge of a vertical cliff and falls 39.2 meters in two seconds"
 Thus,
 k = d / (t ^ 2)
 Substituting values:
 k = 39.2 / (2 ^ 2)
 k = 9.8
 Substituting we have that the equation is:
 d = 9.8 * t ^ 2
 The distance for t = 3.5 is:
 d = 9.8 * (3.5) ^ 2
 d = 120.05 m
 Answer:
 The ball would have dropped 120.05 meters

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