Answer:
F = 47.01 N
Step-by-step explanation:
Given:-
- The mass of the block m = 0.87 kg
- The block starts from rest vi = 0 m/s
- The block speed at point B v2 = 2.5 m/s
- The stretched length sb = 0.15 m
- Spring constant k = 100 N/m
Find:-
The vertical force F acting on the block by the slot.
Solution:-
- The cord lengths at point C (Lac) and point B (Lbc) are as follows:
Lac = √(0.3^2 + 0.4^2)
= 0.5 m
Lbc = √ [(0.4-0.15)^2 + 0.3^2]
= 0.391 m
- The work done is due to three forces: Weight, Spring force and applied force.
- Apply the principle of work and energy as follows:
Ta + ΣUa-b = Tb
Where, Ta : Initial kinetic energy at point A = 0 , ( vi = 0 )
ΣUa-b = -Uw + UF - Us ... ( sum of work done on the block )
Hence,
0 + -Uw + UF - Us = 0.5*m*v2^2
UF = 0.5*m*v2^2 + Uw + Us
F.ΔL = 0.5*m*v2^2 + m*g*sb + 0.5*k*sb^2
F*(0.5-0.391) = 0.5*0.87*2.5^2 + 0.87*9.81*0.15 + 0.5*100*0.15^2
F = 5.123955 / (0.5-0.391)
F = 47.01 N