Distance travelled by the particle = Area under the given graph
Let s1 and s2 be the distances covered by the particle between time
Let u′ be the velocity of the particle after 2 s and a′ be the acceleration of the particle in t
= 0 to t = 5 s.
Since the particle undergoes uniform acceleration in the interval t = 0 to t = 5 s, from first equation of motion, acceleration can be obtained as:
v = u + at
Where,
v = Final velocity of the particle
Again, from first equation of motion, we have
v = u + at
= 0 + 2.4 × 2 = 4.8 m/s
Distance travelled by the particle between time 2 s and 5 s i.e., in 3 s
Let a″ be the acceleration of the particle between time t = 5 s and t = 10 s. From first equation of motion, v = u + at (where v = 0 as the particle finally comes to rest)
Distance travelled by the particle in 1s (i.e., between t = 5 s and t = 6 s)
From equations (i), (ii), and (iii), we get
