Respuesta :
Given Information:
Diameter of the cylindrical tub = d = 50 cm = 0.50 m
Acceleration = α = 3g
Required Information:
1. Rotation rate in rev/min = ω = ?
2. Tangential speed in m/s = v = ?
Answer:
1. ω = 103.5 rev/min
2. v = 2.71 m/s
Explanation:
We know that centripetal acceleration is given by
α = ω²r
Where ω is the angular speed or rotation rate and r is the radius.
The relation between diameter and radius is given by
r = D/2
r = 0.50/2
r = 0.25 m
Since it is given that the acceleration is equal to 3g where g is the gravitational acceleration 9.81 m/s².
α = ω²r
3g = ω²r
ω² = 3g/r
ω = √(3g/r)
ω = √(3*9.81/0.25)
ω = 10.84 rad/s
To convert rad/s into rev/s divide it by 2π
ω = 10.84/2π
ω = 1.752 rev/s
To convert rev/s into rev/min multiple it by 60
ω = 1.752*60
ω = 103.5 rev/min
Therefore, the rotation rate is 103.5 rev/min
2. The tangential speed can be found using
v = ωr
Where ω is the rotation rate in rad/s and r is the radius.
v = 10.84*0.25
v = 2.71 m/s
Therefore, the tangential speed is 2.71 m/s
1. To determine the rotation rate, in rev/min, of the tub during the spin cycle is 103.5 rpm.
2. At this rotation rate, the tangential speed in m/s of a point on the tub wall is 25.88 m/s.
Given the following data:
- Diameter = 50 cm to m = 0.5 m
- Centripetal acceleration = 3g
Radius = [tex]\frac{Diameter}{2} = \frac{0.5}{2} =0.25 \;meter[/tex]
Acceleration due to gravity = 9.8 [tex]m/s^2[/tex]
1. To determine the rotation rate, in rev/min, of the tub during the spin cycle:
Mathematically, the centripetal acceleration in rotational motion is given by the formula:
[tex]\alpha =r\omega^2\\\\3g = r \omega^2\\\\\omega^2 = \frac{3g}{r}\\\\\omega = \sqrt{\frac{3g}{r}}[/tex]
Substituting the given parameters into the formula, we have;
[tex]\omega = \sqrt{\frac{3\times 9.8}{0.25}} \\\\\omega = \sqrt{\frac{29.4}{0.25}} \\\\\omega = \sqrt{117.6} \\\\\omega = 10.84\;rad/s[/tex]
In rev/min:
1 rad/s = 9.5493 rpm
10.84 rad/s = [tex]9.5493 \times 10.84 = 103.5\;rpm[/tex]
Rotation rate = 103.5 rpm.
2. To find the tangential speed in m/s of a point on the tub wall, at the above rotation rate:
Mathematically, tangential speed is given by the formula:
[tex]V = r\omega\\\\V = 0.25 \times 103.5[/tex]
Tangential speed, V = 25.88 m/s
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