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Question
Match Column - I with Column -II
Column - IColumn - IIi.Velocity of a particle following (p) αequation x=u(t−8)+α(t−2)2at t=0ii.Acceleration of a particle moving according to equation(q)2αx=u(t−8)+α(t−2)2 at t=0iii.Velocity of the particle moving (r) uaccording to equation x=ut+5αt2ln(1+t2)+αt2at t=0iv.Acceleration of the particle moving (s) u−4αaccording to the equation x=ut+5αt2(1+t2)+αt2at t=0
Match Column - I with Column -II
Column - IColumn - IIi.Velocity of a particle following (p) αequation x=u(t−8)+α(t−2)2at t=0ii.Acceleration of a particle moving according to equation(q)2αx=u(t−8)+α(t−2)2 at t=0iii.Velocity of the particle moving (r) uaccording to equation x=ut+5αt2ln(1+t2)+αt2at t=0iv.Acceleration of the particle moving (s) u−4αaccording to the equation x=ut+5αt2(1+t2)+αt2at t=0
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Solution
The correct option is A i→(s);ii→(q);iii→(r);iv→(q)
i. x=u(t−8)+α(t−2)2
Differentiating w.r.t t, we get
v=u+2α(t−2)×1
⇒v=u+2α(t−2)
At t=0
v=u−4α
ii. x=u(t−8)+α(t−2)2
Differentiating w.r.t t we get
v=u+2α(t−2)
Again differentiating w.r.t t we get
a=2α
At t=0, a=2α
iii. x=ut+5αt2ln(1+t2)+αt2
Differentiating w.r.t t , we get
v=u+10 αtln(1+t2)+5.αt2.121+t2+2αt
=u+10αtln(1+t2)+5αt22+t+2αt
At t=0,
v=u+0+0+0=u
iv. x=ut+5αt2ln(1+t2)+αt2
⇒v=u+10 αtln(1+t2)+5αt22+t+2at
Differentiating w.r.t t, we get
a=10α.ln(1+t2)+10αt.121+t2+10αt(2+t)−5αt2(2+t)2+2α
At t=0
a=0+0+0+2α=2α
i. x=u(t−8)+α(t−2)2
Differentiating w.r.t t, we get
v=u+2α(t−2)×1
⇒v=u+2α(t−2)
At t=0
v=u−4α
ii. x=u(t−8)+α(t−2)2
Differentiating w.r.t t we get
v=u+2α(t−2)
Again differentiating w.r.t t we get
a=2α
At t=0, a=2α
iii. x=ut+5αt2ln(1+t2)+αt2
Differentiating w.r.t t , we get
v=u+10 αtln(1+t2)+5.αt2.121+t2+2αt
=u+10αtln(1+t2)+5αt22+t+2αt
At t=0,
v=u+0+0+0=u
iv. x=ut+5αt2ln(1+t2)+αt2
⇒v=u+10 αtln(1+t2)+5αt22+t+2at
Differentiating w.r.t t, we get
a=10α.ln(1+t2)+10αt.121+t2+10αt(2+t)−5αt2(2+t)2+2α
At t=0
a=0+0+0+2α=2α
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