Question

An object is at rest at `(1 ,2 ,1 )` and constantly accelerates at a rate of `1/3` `ms^-2` as it moves to point B. If point B is at `(4 ,4 ,5 )`, how long will it take for the object to reach point B? Assume that all coordinates are in meters.

Answer 1

The distance between the two points is `5.4` `m` and the time taken to move from one to the other is `5.7` `s`.

Explanation:

First step is to find the distance between the two points:

`s=sqrt((x_2-x_1)^2+(y_2-y_1)^2+(z_2-z_1)^2)`
`=sqrt((4-1)^2+(4-2)^2+(5-1)^2)=sqrt(3^2+2^2+4^2)`
`=sqrt(9+4+16)=sqrt(29)=5.4` `m`

Now we know:

`u=0` `ms^-1` (since the object was initially at rest)
`a=1/3` `ms^-2`
`s=5.4` `m` (some people use `d` for distance)
`t=?` `s`

We have the equation of motion:

`s=ut+1/2at^2`

The `ut` term goes to 0 because `u=0`, which makes life simpler:

`s=1/2at^2`

Rearranging to make `t` the subject:

`t=sqrt((2s)/a)=sqrt((2xx5.4)/(1/3))=sqrt 32.4=5.7` `s`