Two forces F_1 and F_2 act on a particle P - Edexcel - A-Level Maths Mechanics - Question 7 - 2016 - Paper 1

To find the force F_2, we start by letting it be represented as:

$F_2 = k(i + j)$

where $k$ is a scalar that represents the magnitude of the force. We know that the resultant of F_1 and F_2 acts in the direction of the vector $(i + 3j)$.

1. Finding the resultant vector: The resultant force can be expressed as: $F_{R} = F_1 + F_2 = (-i + 2j) + k(i + j)$ This combines to: $F_{R} = (-1 + k)i + (2 + k)j$

2. Setting up the equation for direction: Since $F_R$ must act in the direction of $(i + 3j)$, we can set up a ratio: rac{-1 + k}{1} = rac{2 + k}{3}

3. Cross-multiplying to solve for $k$: -1 + k = rac{1}{3}(2 + k) Multiplying through by 3 gives: $3(-1 + k) = 2 + k$ Which simplifies to: $-3 + 3k = 2 + k$ Rearranging yields:

   $$$$

ightarrow k = 2.5 $$

4. Substituting back to find $F_2$: Therefore, the force $F_2$ is: $F_2 = 2.5(i + j) = (2.5i + 2.5j) ext{ N}$