WEBVTT 00:00:03.330 --> 00:00:06.500 I'd now like to talk about the velocity of the center of mass 00:00:06.500 --> 00:00:08.290 for a system of particles. 00:00:08.290 --> 00:00:11.590 So let's take a system, which I'll just outline by this. 00:00:11.590 --> 00:00:14.840 And in that system, we have a bunch of particles, particle 1, 00:00:14.840 --> 00:00:18.530 particle 2-- let's refer to this as the j-th particle 00:00:18.530 --> 00:00:22.130 and some point xcm. 00:00:22.130 --> 00:00:26.550 And if I want to talk about the position of the center of mass, 00:00:26.550 --> 00:00:29.960 I can choose a point s. 00:00:29.960 --> 00:00:33.360 And if I want to define that vector Rcm, 00:00:33.360 --> 00:00:40.050 then what I have to do is draw a vector to each object Rsj. 00:00:40.050 --> 00:00:43.200 And we saw that this velocity, the position 00:00:43.200 --> 00:00:45.800 of the center of mass with respect to this origin 00:00:45.800 --> 00:00:48.720 s is the sum and mjrsj. 00:00:51.520 --> 00:00:57.780 And that's divided by the total mass and m total. 00:00:57.780 --> 00:01:00.310 And j goes from 1 to n, where n is the number 00:01:00.310 --> 00:01:02.830 of particles in the system. 00:01:02.830 --> 00:01:06.770 Now if I want to find the velocity of the center of mass, 00:01:06.770 --> 00:01:10.870 then I can just differentiate this. 00:01:10.870 --> 00:01:14.420 And I'm dropping the point s for the moment, 00:01:14.420 --> 00:01:17.100 but let's just differentiate 1 to n. 00:01:17.100 --> 00:01:18.900 And you'll see why. 00:01:18.900 --> 00:01:21.850 And when I differentiate the position vector 00:01:21.850 --> 00:01:25.900 of the object, that's the velocity of the object divided 00:01:25.900 --> 00:01:30.130 by j goes from 1 to n, the total mass. 00:01:30.130 --> 00:01:33.140 Now why did I drop the position? 00:01:33.140 --> 00:01:35.470 Because if you have any two fixed 00:01:35.470 --> 00:01:43.400 points-- so if I chose another fixed point, say, over here p, 00:01:43.400 --> 00:01:49.140 then this distance R-- we'll call it vector from s 00:01:49.140 --> 00:01:53.759 to t Rsp-- this is a constant. 00:01:53.759 --> 00:01:57.810 And if I draw position vector with respect to p-- now 00:01:57.810 --> 00:02:01.800 the point here is that this is a constant distance, 00:02:01.800 --> 00:02:07.030 because this is a fixed-- these are fixed points. 00:02:07.030 --> 00:02:09.860 Then if you were to draw your vector triangle, which 00:02:09.860 --> 00:02:13.680 is the position of the object with respect to s-- 00:02:13.680 --> 00:02:17.890 that's this vector-- is equal to that fixed position 00:02:17.890 --> 00:02:23.510 vector from s to p, plus the vector from p to j, 00:02:23.510 --> 00:02:29.490 and I differentiate this, drs jdt. 00:02:29.490 --> 00:02:34.190 Well, this derivative of a constant vector, this 00:02:34.190 --> 00:02:40.340 is 0 plus drp jdt. 00:02:40.340 --> 00:02:43.750 And so we see that the velocity j 00:02:43.750 --> 00:02:55.120 is independent of the choice of point s. 00:02:55.120 --> 00:02:57.430 You choose any other fixed point and you 00:02:57.430 --> 00:03:04.920 get that velocities drs jdt equals 00:03:04.920 --> 00:03:13.670 drp jpt for all fixed points p. 00:03:13.670 --> 00:03:15.560 And that's why in this expression, when 00:03:15.560 --> 00:03:18.470 we differentiate the velocity, even though we had an index s, 00:03:18.470 --> 00:03:19.770 we dropped that. 00:03:19.770 --> 00:03:22.390 And so our conclusion is that we can 00:03:22.390 --> 00:03:27.030 treat that we have the velocity of the center of mass 00:03:27.030 --> 00:03:32.410 of this system is equal to the sum mj vj. 00:03:32.410 --> 00:03:38.760 j from 1 to n divided by the total mass. 00:03:38.760 --> 00:03:40.890 Now what's interesting here is, why 00:03:40.890 --> 00:03:43.270 is this an important quantity? 00:03:43.270 --> 00:03:45.380 Let's just add that if we want to talk 00:03:45.380 --> 00:03:48.790 about the acceleration of the center of mass, 00:03:48.790 --> 00:03:51.540 I do exactly the same type of calculation. 00:03:51.540 --> 00:03:53.000 I just differentiate. 00:03:53.000 --> 00:03:55.550 And I get the mass of the j-th particle 00:03:55.550 --> 00:03:58.630 times the acceleration of the j-th particle divided 00:03:58.630 --> 00:04:02.830 by the total mass. 00:04:02.830 --> 00:04:05.060 And our next step is to understand 00:04:05.060 --> 00:04:08.360 why this is an important quantity 00:04:08.360 --> 00:04:10.910 for a system of particles.