Calculating the Speed of a Falling Ball

A student drops a ball from a window 3.5 m above the sidewalk. How fast is the ball moving when it hits the ground?

To answer this question, we must know that the acceleration caused by gravity upon the ball is -9.8 m/s^2.

There are two ways to solve this problem:

First: Use the position equation

x = (1/2)at^2 + Vo*t + Xo

Where:

  • Xo, the initial position, is 3.5 m
  • X, the final position, is 0 m (the ground)
  • Vo, the initial velocity, is 0 m/s (since the ball is dropped)
  • a is -9.8 m/s^2

Substitute the values:

0 = (1/2)(-9.8)t^2 + 3.5

-3.5 = -4.9t^2

t^2 = 0.71

t ≈ 0.845 s

So, it takes the ball approximately 0.845 s to hit the ground.

Now, using the velocity equation:

v = at + Vo

v = (-9.8)(0.845) + 0

v ≈ -8.28 m/s

Therefore, the speed of the ball is approximately 8.28 m/s when it hits the ground.

Final answer: The ball will be moving at a speed of approximately 8.23 m/s when it hits the ground.

Explanation: To determine the speed of the ball when it hits the ground, we can use the equation:

v = gt

Question:

How fast is the ball moving when it hits the ground?

Answer:

The ball will be moving at a speed of approximately 8.23 m/s when it hits the ground.

← Calculating resistance of a lamp using ohm s law Electric field in a pipe with square cross section →