Question

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

Answer 1

The speed is `=1.74ms^-1`

Explanation:

Reminder :

The derivative of a product

`(uv)'=u'v-uv'`

`(tsin(pi/8t))'=1*sin(pi/8t)+pi/8tcos(pi/8t)`

The position of the object is

`p(t)=3t-tsin(pi/8t)`

The speed of the object is the derivative of the position

`v(t)=p'(t)=3-sin(pi/8t)-pi/8tcos(pi/8t)`

When `t=2`

`v(2)=3-sin(pi/4)-pi/4cos(pi/4)`

`=3-sqrt2/2-sqrt2/8pi`

`=1.74ms^-1`