A string of length \( L \) is fixed at one end and carries a mass of \( M \) at the other end. The mass makes \( \frac{3}{\pi} \) rotations per second about the vertical axis passing through the end of the string as shown. The tension in the string is ________________ ML.
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For rotational motion, the tension in the string acting on a rotating mass is related to the square of the angular velocity and the length of the string. The formula \( T = M \cdot \omega^2 \cdot L \) helps relate the tension to the rotational speed.
The problem involves a rotating mass \( M \) attached to a string of length \( L \), making \( \frac{3}{\pi} \) rotations per second. The question asks for the tension \( T \) in the string. The mass describes a circular path with a radius \( R \), and the string makes an angle \( \theta \) with the vertical axis.
Step 2: Angular Velocity
The number of rotations per second (frequency) is given as \( \frac{3}{\pi} \) rotations per second. The angular velocity \( \omega \) is related to the frequency by:
The mass \( M \) is undergoing circular motion with a radius \( R \). The centripetal force required to keep the mass in its circular path is given by:
\( F_{\text{centripetal}} = M \omega^2 R \)
Substituting the value of \( \omega \) (which is 6 rad/s), we get:
\( F_{\text{centripetal}} = M \times 6^2 \times R = 36 M R \)
Step 4: Tension and Vertical Component
The tension \( T \) in the string has both vertical and horizontal components. The vertical component of the tension balances the gravitational force acting on the mass:
\( T \cos \theta = Mg \)
The horizontal component provides the centripetal force:
\( T \sin \theta = M \omega^2 R = 36 M R \)
Step 5: Finding Tension \( T \)
Using the relationship between the vertical and horizontal components of tension:
Finally, the tension \( T \) in the string can be expressed as:
\( T = 36 M L \)
Conclusion
The tension in the string is \( \mathbf{36 M L} \).
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Approach Solution -2
Step 1: Understand the setup.
The given problem involves a string of length \( L \), carrying a mass \( M \) at one end. The mass is rotating about a vertical axis passing through the end of the string. The string makes an angle \( \theta \) with the vertical and the mass makes \( \frac{3}{2} \) rotations per second.
Step 2: Identify the forces involved.
In this scenario, there are two forces acting on the mass:
1. The gravitational force \( Mg \), acting vertically downward.
2. The tension \( T \) in the string, which has two components:
- A vertical component \( T \cos \theta \), which balances the gravitational force.
- A horizontal component \( T \sin \theta \), which provides the centripetal force to maintain circular motion.
Step 3: Apply the centripetal force condition.
The mass is rotating in a horizontal circle, and the centripetal force is provided by the horizontal component of the tension \( T \sin \theta \). The centripetal force is given by:
\[
F_{\text{centripetal}} = \frac{M R \omega^2}{L},
\]
where \( R = L \sin \theta \) is the radius of the circular path and \( \omega \) is the angular velocity.
Since the mass makes \( \frac{3}{2} \) rotations per second, the angular velocity \( \omega \) is:
\[
\omega = 2 \pi \times \frac{3}{2} = 3 \pi \, \text{radians per second}.
\]
Step 4: Calculate the tension.
The vertical component of the tension must balance the weight of the mass:
\[
T \cos \theta = Mg.
\]
The horizontal component provides the centripetal force:
\[
T \sin \theta = M R \omega^2 = M L \sin \theta (3\pi)^2.
\]
Thus, the tension in the string is:
\[
T = \frac{M L (3\pi)^2}{\sin \theta}.
\]
After simplification:
\[
T = 36 M L.
\]
Final Answer:
The tension in the string is \( 36ML \).
\[
\boxed{36ML}.
\]
