The second part of the question is missing and it says;
b) How would doubling the ball's mass affect the result in part (a)?
Answer:
A) Height = 2.645m
B) Doubling the mass wouldn't affect the result in part a.
Step-by-step explanation:
A) Initial speed u = 9 m/s
Final speed v = 5.4 m/s
Now, kinetic energy is given as;
Initial kinetic energy; K1 = (1/2)mu²
Final kinetic energy; K2 = (1/2)mv²
Change in kinetic energy = K2 - K1 = (1/2)mv² - (1/2)mu² = (1/2)m(v² - u²)
Let the ball move to a height h.
Thus, Change in potential energy = mg(h-0) = mgh
conservation of energy is given as; change in kinetic energy + change in potential energy = 0
Thus,
(1/2)m(v² - u²) + mgh = 0
Dividing through by m, to get;
(1/2)(v² - u²) + gh = 0
Multiplying through by 2,
v² - u² + 2gh = 0
Thus: v² - u² = -2gh
u² - v² = 2gh
h = (u² - v²)/(2g)
Substitute values: -
h = (9² - 5.4²)/(2x9.8)
= 51.84/19.6
= 2.645m
B) From the steps above, we can see that the mass wasn't used to calculate the height. Thus, even if it is doubled, it doesn't affect the height.