Compute the ball's angular speed v :
v = (1 rev) / (2.3 s) • (2π • 180 cm/rev) • (1/100 m/cm) ≈ 4.917 m/s
Use this to find the magnitude of the radial acceleration a :
a = v ²/R
where R is the radius of the circular path. We get
a = v ² / (180 cm) = v ² / (1.8 m) ≈ 13.43 m/s²
The only force acting on the ball in the plane parallel to the circular path is the tension force. By Newton's second law, the net force acting on the ball has magnitude
∑ F = m a
where m is the mass of the ball. So, if t denotes the magnitude of the tension force, then
t = (1.6 kg) (13.43 m/s²) ≈ 21 N
