Particle P has mass m kg and particle Q has mass 3m kg - Edexcel - A-Level Maths Mechanics - Question 2 - 2010 - Paper 1

To solve for k, we apply the principle of conservation of momentum before and after the collision. The total momentum before the collision is:

$p_{initial} = m(4u) + 3m(-ku)$

The total momentum after the collision is:

$p_{final} = m(-2u) + 3m(\frac{-ku}{2})$

Setting the two equal, we have:

m(4u) - 3mku = -2mu - rac{3mku}{2}

Canceling m and reorganizing:

$4u - 3ku = -2u - \frac{3ku}{2}$

Bringing terms involving k on one side gives:

$4u + 2u = 3ku - \frac{3ku}{2} \implies 6u = \frac{3ku}{2}$

Multiplying through by 2 to eliminate the fraction:

$12u = 3ku \implies k = \frac{4}{3}$