Answer:
the revolutions per minute for the 9 inch pulley is 10/9.
Explanation:
Step 1:
The linear speed of the belt is
linear speed = circumference × revolutions per minute, that is
v = 2π r × ω
where
Therefore, the linear speed of the 2 inch pulley is:
v₂ = (2π × 2 in) × (5 rev/min)
v₂ = 4π × (5 rev/min)
Step 2:
Compute the linear speed of the belt for the 9 inch pulley:
v₈ = (2π × 9 in) × (x rev/min)
v₈ = 18π × (x rev/min)
Step 3:
Since the linear speed is the same for both pulleys, therefore
v₂ = v₈
4π × (5 rev/min) = 18π × ω₈
ω₈ = (4π × (5 rev/min)) / 18π
ω₈ = 10/9 rev/min
Therefore, the revolutions per minute for the 8 inch pulley is 10/9.
