Consider the Atwood machine of the previous problem. The larger mass is stopped for a moment 2.0 s after the system is set into motion. Find the time elapsed before the string is tight again.

mass=m₁ =300g, mass=m₂=600g.

When masses m₁ and m₂ are connected by a string passing over a pulley and when the pulley comes in motion, then mass m₂ is stopped in 2 seconds. So, equation of motion is:

T – m₁ g = m₁ a−−−−(1)

m₂ g − T = m₂ a−−−−(2)

On solving equations (1) and (2), we get,

a = = = ms^-2

In 2 second the velocity acquired by mass m₁ is given by,

Applying first equation of motion,

0 = v −×2 or v = ms^-1

with acceleration due to gravity i. e.

0 = − − 10 t or t = = sec