Question

A physics student throws a softball straight up into the air. The ball was in the air for a total of 3.56 s before it was caught at its original position. What is the initial velocity of the ball? Consider upwards to be the positive direction.

Answer 1

The initial velocity of the softball is 14.711 meters per second.

Step-by-step explanation:

This is a case of an object which experiments a free fall, that is, an uniform accelerated motion due to gravity and in which effects from air friction and Earth's rotation can be neglected.

From statement we must understand that the student threw the softball upwards and it is caught at original position 3.56 seconds later. Initial and final heights, time and gravitational acceleration are known and initial speed is unknown. The following equation of motion is used:

`y = y_(o) + v_(o)\cdot t + (1)/(2)\cdot g \cdot t^(2)` (Eq. 1)

Where:

`y_(o)` - Initial height of the softball, measured in meters.

`y` - Final height of the softball, measured in meters.

`v_(o)` - Initial velocity of the softball, measured in meters per second.

`t` - Time, measured in seconds.

`g` - Gravitational acceleration, measured in meters per square second.

If we know that
`y = y_(o)`,
`t = 3.56\,s` and
`g = -9.807\,(m)/(s^(2))`, the initial velocity of the softball is:

`v_(o)\cdot (3\,s)+(1)/(2)\cdot (-9.807\,(m)/(s^(2)) )\cdot (3\,s)^(2) = 0`

`3\cdot v_(o) -44.132\,m= 0`

`v_(o) = 14.711\,(m)/(s)`

The initial velocity of the softball is 14.711 meters per second.