Question

An object is at rest at `(5 ,1 ,1 )` and constantly accelerates at a rate of `2/5 m/s` as it moves to point B. If point B is at `(6 ,9 ,7 )`, how long will it take for the object to reach point B? Assume that all coordinates are in meters.

Answer 1

`t ~~ 7 s`

Explanation:

I am going to assume that there is a small typographical error in the units of the acceleration and it is `2/5m/s^2`

The distance, d, from Point `A = (5,1,1)` to point `B = (6,9,7)` is

`d =sqrt((6 -5)^2 + (9 - 1)^2 + (7 - 1)^2)`

`d =sqrt((1)^2 + (8)^2 + (6)^2)`

`d =sqrt(1 + 64 + 36)`

`d =sqrt(101) m`

The equation for distance traveled under constant acceleration is:

`d = (1/2)at^2`

Substitute `sqrt(101) m` for d and `2/5m/s^2` for a, and then solve for t:

`sqrt(101) m = (1/2)(2/5m/s^2)t^2`

`5sqrt(101)s^2 = t^2`

`t ~~ +-7 s`

But negative time does not make sense, therefore, make it only positive:

`t ~~ 7 s`