A 75 kg box is dropped from the top of a tower. The height of the tower is 35 m. Calculate (i) the initial
potential energy of the box, (ii) its potential energy 15 m above the ground, (iii) the maximum value of
its kinetic energy and (iv) its kinetic energy 20 m below the top of the tower. (g = 9.8 m/s2)
(g = 9.8 m/s2)
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Step-by-step explanation:
1. P.E= mgh ...
P.E= 75 × 9.8 ×35 = 25725j
2. p.E = 75 × 9.8× 15 = 11025j
3. k.E = 1/2mV2
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Given :-
- A 75 kg box is dropped from the top of a tower of height 35 m.
- Acceleration due to gravity, g = 9.8 m/s²
To Find :-
- Initial potential energy.
- Potential energy 15 m above the ground.
- Maximum value of kinetic energy
- Kinetic energy 20 m below the top of the tower.
Solution :-
- First, Let us find the Initial potential energy at the top of the tower,
- ⇒ PE = mgh
- ⇒ PE = 75 × 9.8 × 35
- ⇒ PE = 25,725 J
____________________________
Here, We have
Height, h = 15 m above the ground.
- g = 9.8 m/s²
- mass = 75 kg
- ⇒ PE = mgh
- ⇒ PE = 75 × 9.8 × 15
- ⇒ PE = 11,025 J
____________________________
- Maximum value of the kinetic energy will be at the very bottom of the tower ( touching the ground ) where all the potential energy will be converted into Kinetic energy (According to law of conservation of energy)
So,
⇒ Maximum Kinetic energy = PE at the top of tower
⇒ Maximum Kinetic energy = 25,725 J
____________________________
- Here, we have to find the kinetic energy 20 m below the top of the tower.
Let's find the potential energy at this point, we have
- Height, h = 35 - 20 = 15 m
- g = 9.8 m/s²
- mass = 75 kg
So,
- ⇒ PE = mgh
- ⇒ PE = 75 × 9.8 × 15
- ⇒ PE = 11,025 J
- But, The total kinetic energy should be 25,725 J including the kinetic energy, according to the law of conservation of energy,
- ⇒ Total energy = PE + KE
- ⇒ 25,725 = 11,025 + KE
- ⇒ KE = 25,725 - 11,025
- ⇒ KE = 14,700 J
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