A particle P of mass 0.5 kg is on a rough plane inclined at an angle α to the horizontal, where tan α = 3/4 - Edexcel - A-Level Maths Mechanics - Question 4 - 2006 - Paper 1

To find the coefficient of friction (μ) between particle P and the plane, we start by analyzing the forces acting on the particle.

1. Forces acting on the particle:

   • Weight (W) acting downwards:
     $W = mg = 0.5 imes 9.8 = 4.9 ext{ N}$
   • The component of weight acting down the slope can be calculated as:
     W_{ ext{down}} = W imes ext{sin} α = 4.9 imes rac{3}{5} = 2.94 ext{ N}
   • The component of weight perpendicular to the slope is:
     W_{ ext{perpendicular}} = W imes ext{cos} α = 4.9 imes rac{4}{5} = 3.92 ext{ N}
   • Normal reaction force (R) on the plane:
     $R = W_{ ext{perpendicular}} = 3.92 ext{ N}$

2. Apply equilibrium conditions: The particle is on the point of slipping, thus the forces parallel to the slope are in equilibrium: $F_{ ext{applied}} = W_{ ext{down}} + F_{ ext{friction}}$ Where,
   $F_{ ext{friction}} = μR$

   • Plugging in the forces gives: $4 = 2.94 + μ(3.92)$
   • Rearranging to solve for μ yields: $μ(3.92) = 4 - 2.94$ $μ(3.92) = 1.06$ μ = rac{1.06}{3.92} = 0.27

Thus, the coefficient of friction between P and the plane is 0.27.