See the attached diagram for reference and free body diagrams. The acceleration a of each body will be the same since each connecting string is in tension.
By Newton's second law, we have
β’Β net force on the train:
- - horizontal
[tex]\sum F = F - F_{k,T} - T_1 = m_Ta[/tex]
(where F = 12 N)
- - vertical
[tex]\sum F = N_T - m_Tg = 0[/tex]
β’ net force on wagon 1:
- - horizontal
[tex]\sum F = T_1 - T_2 - F_{k,1} = m_1a[/tex]
- - vertical
[tex]\sum F = N_1 - m_1g = 0[/tex]
β’Β net force on wagon 2:
- - horizontal
[tex]\sum F = T_2 - F_{k,2} = m_2a[/tex]
- - vertical
[tex]\sum F = N_2 - m_2g = 0[/tex]
We want to determine Tβ, the tension in the string connecting the two wagons.
For each body, the corresponding normal force has magnitude
N = mg
where m is the respective mass, and the kinetic friction has magnitude
Friction = 0.05 N = 0.05mg
So if Β΅ = 0.05, then the frictional force on each body is
[tex]F_{k,T} = 0.05 (2.7\,\mathrm{ kg}) g = 1.323\,\mathrm N[/tex]
[tex]F_{k,1} = 0.05 (1.8\,\mathrm{ kg}) g = 0.882\,\mathrm N[/tex]
[tex]F_{k,2} = 0.05 (1.0\,\mathrm{ kg}) g = 0.49\,\mathrm N[/tex]
which leaves us with the system of equations,
[1] β¦ 12 N - 1.323 N - Tβ = (2.7 kg) a
[2] β¦ Tβ - Tβ - 0.882 N = (1.8 kg) a
[3] β¦ Tβ - 0.49 N = (1.0 kg) a
Adding [1] and [2] eliminates Tβ :
(12 N - 1.323 N - Tβ) + (Tβ - Tβ - 0.882 N) = (2.7 kg) a + (1.8 kg) a
[4] β¦ 9.795 N - Tβ = (4.5 kg) a
Divide through both sides of [3] by 1.0 kg to solve for a :
a = (Tβ - 0.49 N) / (1.0 kg)
Substitute this into [4] and solve for Tβ :
9.795 N - Tβ = (4.5 kg) (Tβ - 0.49 N) / (1.0 kg)
(9.795 N - Tβ) (1.0 kg) = (4.5 kg) (Tβ - 0.49 N)
9.795 N - Tβ = 4.5 Tβ - 2.205 N
12 N = 5.5 Tβ
Tβ = (12 N) / 5.5 β 2.1818 N βΒ 2.2 N
