A stone is dropped from the edge of a roof, and hits the ground with a velocity of -185 feet per second. How high (in feet) is the roof?

Question

asked May 22, 2017 19.7k views

2 Answers

Armannvg · Answer 1 · 2017-05-26T10:58:25+0000

Answer:

The height of the roof is 534.8 feet.

Explanation:

Let h be the height of the roof.

We know the formula

v^2-u^2=2gh

Since, the stone is dropped from the edge of the roof hence, the initial velocity should be zero. Thus, u = 0

$v^2-0=2gh\\h=(v^2)/(2g)$

Now, we have

v = -185 feet per second

g = 32 feet per square second

On substituting these values, we get

$h=((-185)^2)/(2* 32)\\\\h=534.8$

The height of the roof is 534.8 feet.