A particle P of mass 2.7 kg lies on a rough plane inclined at 40° to the horizontal - Edexcel - A-Level Maths Mechanics - Question 7 - 2014 - Paper 1

To find the coefficient of friction (μ), we use the equation relating frictional force (F_f) to the normal reaction:

$F_f = μR$.

The frictional force that balances the component of weight parallel to the plane can be expressed as:

$F_f = W_{ ext{parallel}} - F_{15N_{ ext{horizontal}}}$,

with

$W_{ ext{parallel}} = W imes ext{sin}(40°)$.

We can solve for μ:

$μ = \frac{F_f}{R}$,

Substituting the calculated values of R and the corresponding F_f will help us find the coefficient of friction.

To determine whether P will move, we assess the net force along the inclined plane. If the total downhill force exceeds the total frictional force, then P will move.

The total downhill force can be calculated using:

$F_{down} = W imes ext{sin}(40°) + 15 imes ext{cos}(50°)$,

and the friction force as described in part b. If

$F_{down} > F_f$,

then particle P will slide down the plane. If they are equal or if friction is greater, P remains stationary. A numerical answer can be calculated based on previously found values.