A 50-kilogram box is initially at rest - HSC - SSCE Mathematics Extension 2 - Question 12 - 2020 - Paper 1

To find the net horizontal force, we analyze the horizontal components of the forces acting on the box:

The horizontal component of the pulling force and the resistive force are as follows:

egin{align*} F_{horizontal} = 200 imes ext{cos}(30°) - 0.3R \ \Rightarrow F_{horizontal} = 200 \times \frac{\sqrt{3}}{2} - 0.3 \times 400 \ \Rightarrow F_{horizontal} = 100\sqrt{3} - 120 \ \Rightarrow F_{horizontal} \approx 173.2 - 120 \ \Rightarrow F_{horizontal} \approx 53.2 ext{ newtons.} \end{align*}

Using the second law of motion, we can determine the acceleration of the box:

egin{align*} F_{net} = ma \ 53.2 = 50a \ \Rightarrow a = \frac{53.2}{50} \approx 1.064 ext{ m/s².} \end{align*}

To find the velocity after 3 seconds, we use the formula:

egin{align*} v = u + at \ = 0 + 1.064 \times 3 \ = 3.192 ext{ m/s.} \end{align*}