Final answer:
The magnitude of the acceleration of the two teams is approximately 0.22 m/s². The tension in the section of rope between the teams is 6,075 N. The correct option is a. 0.22 , {m/s}^2
Step-by-step explanation:
To determine the magnitude of the acceleration of the two teams, we can use Newton's second law of motion, which states that force is equal to mass multiplied by acceleration (F=ma). We can calculate the total force exerted by both teams by adding up the individual forces of each team's members.
The total mass of the first team is 9 members x 68 kg = 612 kg. The total mass of the second team is 9 members x 73 kg = 657 kg. Thus, the total force exerted by both teams is 612 kg x 1350 N + 657 kg x 1365 N = 1,732,470 N.
To calculate the magnitude of the acceleration, we divide the total force by the total mass: a = F/m = 1,732,470 N / (612 kg + 657 kg) = 0.22 m/s². Therefore, the magnitude of the acceleration of the two teams is approximately 0.22 m/s²
To find the tension in the section of rope between the teams, we can use the equation T = F/2, where T is the tension and F is the force exerted by one team. We can calculate the force exerted by one team by multiplying the force per member by the number of team members: F = 1350 N x 9 = 12,150 N. Therefore, the tension in the section of rope between the teams is T = 12,150 N / 2 = 6,075 N.
The correct option is a. 0.22 , {m/s}^2