If an object is moving at $16$ $ms^-1$ over a surface with a kinetic friction coefficient of $u_k=80/g$ , how far will the object continue to move?

Question

If an object is moving at $16$ $ms^-1$ over a surface with a kinetic friction coefficient of $u_k=80/g$ , how far will the object continue to move?

1 Answer

Impact of this question

1391 views around the world

You can reuse this answer
Creative Commons License

Answer 1 · 2016-05-10T08:30:14

The distance taken for the object to stop will be $1.6$ $m$ .

Explanation:

The frictional force will be given by:

$F_"frict"=mu_kF_"norm"$

The normal force $F_"norm"=mg$ , so:

$F_"frict"=mu_kmg=80/g*mg=80m$

The acceleration of the object will be given by $a=F_"frict"/m=(80m)/m = 80$ $ms^-2$ . Given that it is a deceleration (acceleration in the opposite direction to the velocity) give it a minus sign: $a=-80$ $ms^-2$ .

The initial velocity, $u=16$ $ms^-1$ and the final velocity when the object stops will be $v=0$ $ms^-1$ .

So $v^2=u^2+2ad$

Rearranging:

$d=-(u^2)/(2d)=-(16^2)/(2*-80)=1.6$ $m$

Science

Math

Humanities

... and beyond

If an object is moving at $16$ $ms^-1$ over a surface with a kinetic friction coefficient of $u_k=80/g$ , how far will the object continue to move?

1 Answer

Explanation:

Related questions

Impact of this question

Science

Math

Humanities

... and beyond

If an object is moving at 1616 ms^-1ms^-1 over a surface with a kinetic friction coefficient of u_k=80/gu_k=80/g, how far will the object continue to move?

1 Answer

Explanation:

Related questions

Impact of this question

If an object is moving at $16$ $ms^-1$ over a surface with a kinetic friction coefficient of $u_k=80/g$ , how far will the object continue to move?