Answer:
The increase in potential energy of the ball is 115.82 J
Explanation:
Conceptual analysis
Potential Energy (U) is the energy of a body located at a certain height (h) above the ground and is calculated as follows:
U = m × g × h
U: Potential Energy in Joules (J)
m: mass in kg
g: acceleration due to gravity in m/s²
h: height in m
Equivalences
1 kg = 1000 g
1 ft = 0.3048 m
1 N = 1 (kg×m)/s²
1 J = N × m
Known data
[tex]h_2 = 265ft * \frac{0.3048m}{ft} = 80.77m[/tex]
[tex]h_1 = 3ft * \frac{0.3048m}{ft} = 0.914m[/tex]
[tex]m = 148g*\frac{1kg}{1000g} = 0.148kg[/tex]
[tex]g = 9.8 \frac{m}{s^2}[/tex]
Problem development
ΔU: Potential energy change
ΔU = U₂ - U₁
U₂ - U₁ = mₓgₓh₂ - mₓgₓh₁
U₂ - U₁ = mₓg(h₂ - h₁)
[tex]U_2 - U_1 = 0.148kg * 9.8 \frac{m}{s^2}*(80.77m - 0.914m) = 115.82 N * m = 115.82J[/tex]
The increase in potential energy of the ball is 115.82 J
