At t=0, a particle starts from (−2,0) and moves towards positive x−axis with speed of v=6t2+4tm/s. The final position of the particle and the distance travelled by the particle respectively, as a function of time are
A
2t3−2t2+2m,2t3−2t2m
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B
2t3+2t2−2m,2t3+2t2m
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C
2t3−2t2−2m,2t3+2t2m
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D
2t3−2t2+2m,2t3+2t2m
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Solution
The correct option is B2t3+2t2−2m,2t3+2t2m Given, particle starts from (−2,0), so the initial position of the particle is xi=−2 As we know that, ∫dx=∫t0v(t)dt ⇒∫xfxidx=∫t0(6t2+4t)dt ⇒(xf−xi)=[2t3+2t2]t0 ⇒xf+2=2t3+2t2⇒xf=2t3+2t2−2m And, the distance travelled by the particle is given by ∫t0v(t)dt=∫t0(6t2+4t)dt=[2t3+2t2]t0=2t3+2t2m