Question

The position of an object moving along a line is given by `p(t) = 2t - sin(( pi )/3t)`. What is the speed of the object at `t = 8`?

Answer 1

The speed of the object at `t=8` is approximately `s=120.8 m/s`

Explanation:

I will be rounding to the nearest decimal place for convenience

Speed is equal to distance multiplied by time, `s=dt`

First, you want to find the position of the object at `t=8` by plugging in `8` for `t` in the given equation and solve

`p(8)=2(8)-sin((8pi)/3)`
`p(8)=16-sqrt3/2`

`p(8)=15.1`

Assuming that `t` is measured in seconds and distance (`d`)is measured in meters, plug into the speed formula

`s=dt`

`s=15.1m*8s`

`s=120.8 m/s`