Answer:
- the angular velocity in radians per second is 125.7 rad/s
- the centripetal acceleration of the propeller tip under these conditions is 144.5 m/s
- the centripetal acceleration of the propeller tip under these conditions in multiplied of g is 1853 g
Explanation:
given information:
diameter. d = 2.30 --> r = d/2 = 2.3/2 = 1.15 m
angular velocity, ω = 1200 rev/min
- angular velocity in radians per second
ω = 1200 rev/min
= 1200 [tex]\frac{2\pi }{60}[/tex]
= 125.7 rad/s
- the linear speed of its tip at this angular velocity
v = ω r
= 125.7 rad/s x 1.15 m
= 144.5 m/s
- the centripetal acceleration
a = ω^2 r, ω = [tex]\frac{v}{r}[/tex]
= [tex]\frac{v^{2} }{r^{2} } r[/tex]
= [tex]\frac{v^{2} }{r}[/tex]
= [tex]\frac{144.5^{2} }{1.15}[/tex]
= 18160 [tex]m/s^{2}[/tex]
covert to multiplei of g, g= 9.8 [tex]m/s^{2}[/tex]
a = 18160 /9.8 = 1853 g
Answer:
a) 125.68rad/s b) 144.53m/s c) 18164.78m/s^2 d) 1851.66g
Explanation:
Angular velocity in radian = 1200rev/s* (2pi rad/1rev)* (1/60s) since 1 minute = 60 seconds
Angular velocity in radian = 1200*2*3.142/60 = 125.68 radian/seconds
b) linear velocity = r (radius) * angular velocity = (2.30/2)* 125.68 = 144.53m/s
Centripetal acceleration (acceleration towards the center of a circulatory body) = V^2/r = 144.53*144.53/1.15 = 18164.78m/s^s
In multiples of g (acceleration due to gravity) = 18164.78/ 9.81 = 1,851.66g
