A string 1 m long can just support a weight of 16 kg. A mass of 1 kg is attached to one of its ends. The body is revolved in a horizontal circle about the other fixed end of the stringy Find the greatest number of revolutions made by the mass per seconds ? (Take `g=10 ms^(-2)`)
The maximum tension the string can withstand = weight of 16 kg.

To solve the problem step by step, we can follow these instructions: ### Step 1: Determine the maximum tension in the string The maximum tension that the string can withstand is equal to the weight of 16 kg. We can calculate the maximum force (tension) using the formula: \[ T = m \cdot g \] where \( m = 16 \, \text{kg} \) and \( g = 10 \, \text{m/s}^2 \). ...