Answer:
Explanation:
a) Linear Speed ; v = 590 x 2π/60 x 3.3 = 203.91 m/s
b) We get the radial acceleration of the tip of the blade as
a = w²r or v²/r
a = (203.91 m/s)² / 3.3
= 12600.50 m/s²
Acceleration due to gravity of the earth = 9.8m/s²
ratio of radial acceleration to g = a-rad/g
= 12600.50/ 9.8 = 1285.76g
Answer: a) 195.82m/a
b) 1149.7g
Explanation: parameters given are:
angular velocity, ω
= 550 rpm
Convert rev/ min to rad/s
= 550 * 2π /60
= 55π/3 radians/s
radius, r = 3.4 m
A.
Using linear speed formula
Linear speed, v
= r ω m/s
= 3.4 * 55 π/3 m/s
= 195.83 m/s
B.
Let use acceleration derives from centripetal acceleration
a = v^2/ r
This lead to
radial acceleration
= r ω2
= 3.4 (55π/3)2 m/s/s
= 11279 m/s/s
Acceleration due to gravity g = 9.81m/s^2
Expressing as a multiple of g gives
= 11279 / 9.81 g
= 1149.7 g
