Asked by Cavin
Two balls are approaching each other head on. Their velocities are + 9.55 and -11.0 m/s
(a) Determine the velocity of the center of mass of the two balls if they have the same mass.
(b) Determine the velocity of the center of mass of the two balls if the mass of one ball(v=9.55m/s) is twice the mass of the other ball (v=11.0m/s)
(a) mv1 + mv2 = 2m V
where v is the center-of-mass velocity
V = (v1 + v2)/2 = -1.45/2 = -0.725 m/s
(b)2mv1 + v2 = 3m V
solve for V
(a) Determine the velocity of the center of mass of the two balls if they have the same mass.
(b) Determine the velocity of the center of mass of the two balls if the mass of one ball(v=9.55m/s) is twice the mass of the other ball (v=11.0m/s)
(a) mv1 + mv2 = 2m V
where v is the center-of-mass velocity
V = (v1 + v2)/2 = -1.45/2 = -0.725 m/s
(b)2mv1 + v2 = 3m V
solve for V
Answers
Answered by
Mike
The second equation of part be should be 2mv1 + mv2=3mV. 2m(9.55)+(-11m)=3mV which is equal to 19.1m-11m=3mV which is equal to 8.1m=3mV now divide both sides by 3m (where the m's cancel out)and you get V= 2.7 m/s
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