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Question

In the List-I below, four different paths of a particle are given as functions of time. In these functions, α and β are positive constants of appropriate dimensions and αB. In each case, the force acting on the particle is either zero or conservative. In List-II, five physical quantities of the particle are mentioned; p is the linear momentum L is the angular momentum about the origin, K is the kinetic energy, U is the potential energy and E is the total energy. Match each path in List-I with those quantities in List-II, which are conserved for the path.

List - I List - II
P. r(t)=αt^i+βt^j 1. p
Q. r(t)=αcos(ωt)^i+βsin(ωt)^j 2. L
R. r(t)=α(cos(ωt)^i+sin(ωt)^j) 3. K
S. r(t)=αt^i+β2t2^j 4. U
5. E

A
P1,2,3,4,5; Q2,5; \ R \rightarrow 2, 3, 4, 5 ; \ S \rightarrow 5$
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B
P1,2,3,4,5; Q3,5; \ R \rightarrow 2, 3, 4, 5 ; \ S \rightarrow 2,$
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C
P2,3,4; Q5;\ R \rightarrow 1, 2, 4 ; \ S \rightarrow 2, 5$
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D
P1,2,3,5; Q2,5; \ R \rightarrow 2, 3, 4, 5 ; \ S \rightarrow 2,5$
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Solution

The correct option is A P1,2,3,4,5; Q2,5; \ R \rightarrow 2, 3, 4, 5 ; \ S \rightarrow 5$
(P)
r(t)=αt^i+β^tj
v=dr(t)dt=α^i+β^j(constant)
a=dvdt=0
P=mv (remain constant)

k=12mv2(remain constant)
F=[UX^i+UY^i]=0

U constant

E=K+U

dLdt=T=r×F=0

L = constant

(Q)
r=αcos(ωt)^i+βsin(ωt)^j
v=drdt=αsin(ωt)^i+βωcos(ωt)^j
a=dvdt=α2cos(ωt)^iβω2sin(ωt)^j
=ω2[αcos(ωt)^i+βsin(ωt)^j]
a=ω2r
T=r×F=0rand Fare parllel.
U=F.dr=+r0mω2.r.dr
U=mω2[r22]
Ur2
r=α2cos2(ωt)+β2sin2(ωt)
r is a function of time (t)
U depends on r hence it will change with time
Total energy remain constant because force is central.

(R)
r(t)=α(cosωt^i+sin(ωt)^j)
v(t)=dr(t)dt=α[ωsin(ωt)^i+ωcos(ωt)^j]
v=αω (Speed remains constant)
a(t)=dv(t)DT=α[ω2cos(ωt)^iω2sin(ωt)^j]
= αω2[cos(ωt)^i+sin(ωt)^j]
a(t)=ω2(r)
T=F×r=0
r=α(remain constant)
Force is central in nature.
Potential energy remains constant.
Kinetic energy is also constant (speed is constant).

(S) r=αt^i+β2t2^j

v=drdt=αt^i+βt^j
(speed of particle depends on ‘t’)

a=dvdt=β^j (constant)
F=ma (constant)

U=F.dr=mt0β^j(α^i+β^tj)dt

U=mβ2t22

k=12mv2=12m(α2+β2t2)

E=k+U=12mα2 (remain constant).

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