Two particles of equal mass have co-ordinates (2,4,6) m and (6,2,8)m. One particle has a velocity →v1=(2^i)m/s and another particle has velocity →v2=(2^j)m/s at time t=0. The coordinates of the centre of mass of the system at time t=1 s will be
A
(4,4,7)
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B
(5,4,7)
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C
(2,4,6)
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D
(4,5,4)
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Solution
The correct option is B(5,4,7) For particle 1 (mass m1=m) →r1=(2^i+4^j+6^k) w.r.t origin →v1=(2^i)m/s For particle 2 (mass m2=m) →r2=(6^i+2^j+8^k) w.r.t origin →v2=(2^j)m/s
Let initial velocity of C.O.M of the system is vcom
→vcom=m1→v1+m2→v2m1+m2=m(2^i)+m(2^j)m+m=(^i+^j)
As both particles are moving with constant velocity, therefore acceleration of both particles are zero. ⇒→acom=0 ∴ The velocity of C.O.M will remain constant.
Let initial position of C.O.M of the system is rcom1 .
After time t=1sec, let the position of C.O.M of the system is rcom2. As vcom is constant. ⇒→rcom2=→rcom1+→vcom×t =4^i+3^j+7^k+(^i+^j)×1 =(5^i+4^j+7^k) w.r.t. origin ∴ Coordinate of centre of mass at time t=(5,4,7)