Answer:
a. i. 188.49 m/s. ii. 235.62 m/s. b. i. 117.81 m/s² ii. 4.71 m/s²
Step-by-step explanation:
a. Since the linear velocity v = rω where r = radius of path = length of horizontal bar = 1.5 m and the initial angular speed ω₀ = 1200 r.P.M = 1200 × 2π/60 = 125.66 rad/s and final angular speed after the 5 seconds ω₁ = 1500 r.P.M = 1500 × 2π/60 = 157.08 rad/s
i. So, the initial linear velocity v₀ = rω₀ = 1.5 m × 125.66 rad/s = 188.49 m/s.
ii. The final linear velocity v₁ = rω₁ = 1.5 m × 157.08 rad/s = 235.62 m/s.
b. The mid-point of the bar is at a distance of one-half from the end of the bar. So its radius r' = r/2 = 1.5 m/2 = 0.75 m
i. Its normal acceleration a after the 5 seconds is a = r'ω₁² = 0.75 m × 157.08 rad/s = 117.81 m/s²
ii. Its tangential acceleration is given by a' = r'α where α = tangential acceleration
α = (ω₁ - ω₀)/t where t = 5 seconds
α = (157.08 rad/s - 125.66 rad/s)/5 s
= 31.42 rad/s ÷ 5 s
= 6.28 rad/s²
a' = r'α
= 0.75 m × 6.28 rad/s²
= 4.71 m/s²