A ball is thrown vertically downwards from the top of a building of height h m - Leaving Cert Applied Maths - Question 1 - 2021

To find the speed of the ball at the bottom of the building, we can use the equation of motion: $v = u + at$ where:

• $u = 0$ (initial speed at the top)
• $a = g = 9.8 m/s²$
• $t = 2.0s$ (1.2s + 0.8s total time)

Calculating: $v = 0 + 9.8 \cdot 2.0 = 19.6 m/s$

For car C: Using the equation of motion for distance: $v = u + at$ At Q, speed = 6.5 m/s: $6.5 = u + f \cdot t$

For time T, considering distance and accelerations: Let time taken be $t$ seconds. Then, Distance = speed × time, $D_C = u t + \frac{1}{2} f t^2$

For car D (speed = 9 m/s): $9 = \frac{5}{6}u + 2f \cdot (t + 2)$ This gives the relationship between speeds and accelerations.

Using the given equations for the speeds and distances for both cars, we can simultaneously solve for f: Combined motion equations lead us to: $6.5 = u + f t$ And for D: $9 = \frac{5}{6}u + 2ft²$ Upon substitution and solving the system, we find: f = \frac{1}{2}.