Answer:
The velocity of cart B is [tex]\sqrt{2}[/tex] the velocity of cart A
Solution:
As per the question:
Let the masses of both the carts A and B be 'm' kg
Distance traveled by both the carts be 'D' m
Force acting on A be 'F' N
Force acting on B be '2F' N
Now,
The relation between the velocities of A and B can be derived as :
Acceleration of cart A, [tex]a_{A} = \frac{F}{m}[/tex]
Acceleration of the cart B, [tex]a_{B} = \frac{2F}{m} = 2[tex][a_{A}][/tex]
Now, using the third eqn of motion for both the carts A and B:
For cart A:
[tex]v_{A}^{2} = u_{A}^{2} + 2a_{A}D[/tex]
[tex]v_{A} = \sqrt{2aD}[/tex]
[tex]v_{B}^{2} = u_{B}^{2} + 2a_{B}D[/tex]
[tex]v_{B}^{2} = 2(2a_{A})}D[/tex]
where
[tex]u_{A} = u_{B} 0[/tex] = initial velocity of cart A and cart B respectively
[tex]v_{A}[/tex] = final velocity of cart A
[tex]v_{B}[/tex] = final velocity of cart B
[tex]v_{B} = \sqrt{4a_{A}}D[/tex]
Now, dividing the velocities of the cart A and B:
[tex]\frac{v_{A}}{v_{B}} = \sqrt{\frac{1}{2}}[/tex]
[tex]v_{B} = \sqrt{2}v_{A}[/tex]
