Two forces $(4i - 2j) \text{ N}$ and $(2i + qj) \text{ N}$ act on a particle $P$ of mass $1.5$ kg - Edexcel - A-Level Maths Mechanics - Question 2 - 2014 - Paper 1

To find the speed of particle $P$ at time $t = 2$ seconds, we first need to determine the acceleration, which we'll find from the resultant force calculated earlier.

The resultant force $F_R$ is: $F_R = (6i + (5 - 2)j) = (6i + 3j) \text{ N}$

Using Newton's second law, we find the acceleration $a$: $F = ma \implies a = \frac{F_R}{m} = \frac{(6i + 3j)}{1.5} = (4i + 2j) \text{ m s}^{-2}$

The initial velocity $u$ of the particle is: $u = -2i + 4j \text{ m s}^{-1}$

Using the equation of motion: $v = u + at$

Substituting the values for $t = 2$ seconds: $v = (-2i + 4j) + 2(4i + 2j)$ This gives: $v = (-2i + 4j) + (8i + 4j) = (6i + 8j) \text{ m s}^{-1}$

To find the speed, we calculate the magnitude of the velocity vector: $\text{speed} = \sqrt{(6)^2 + (8)^2} = \sqrt{36 + 64} = \sqrt{100} = 10 \text{ m s}^{-1}$