<< Chapter < Page Chapter >> Page >

The explanation of this apparently astonishing coincidence is: We defined the center of mass precisely so this is exactly what we would get. Recall that first we defined the momentum of the system:

p CM = j = 1 N d p j d t .

We then concluded that the net external force on the system (if any) changed this momentum:

F = d p CM d t

and then—and here’s the point—we defined an acceleration that would obey Newton’s second law. That is, we demanded that we should be able to write

a = F M

which requires that

a = d 2 d t 2 ( 1 M j = 1 N m j r j ) .

where the quantity inside the parentheses is the center of mass of our system. So, it’s not astonishing that the center of mass obeys Newton’s second law; we defined it so that it would.

Summary

  • An extended object (made up of many objects) has a defined position vector called the center of mass.
  • The center of mass can be thought of, loosely, as the average location of the total mass of the object.
  • The center of mass of an object traces out the trajectory dictated by Newton’s second law, due to the net external force.
  • The internal forces within an extended object cannot alter the momentum of the extended object as a whole.

Conceptual questions

Suppose a fireworks shell explodes, breaking into three large pieces for which air resistance is negligible. How does the explosion affect the motion of the center of mass? How would it be affected if the pieces experienced significantly more air resistance than the intact shell?

Got questions? Get instant answers now!

Problems

Three point masses are placed at the corners of a triangle as shown in the figure below.

A right triangle with sides length 3 c m and 4 c m has masses of 100 g at the vertex between the hypotenuse and the 4 c m side, 75 g at the vertex between the hypotenuse and the 3 c m side, and 150 g at the vertex between the the 3 c m side and the 4 c m side.

Find the center of mass of the three-mass system.

With the origin defined to be at the position of the 150-g mass, x CM = −1.23 cm and y CM = 0.69 cm

Got questions? Get instant answers now!

Two particles of masses m 1 and m 2 separated by a horizontal distance D are released from the same height h at the same time. Find the vertical position of the center of mass of these two particles at a time before the two particles strike the ground. Assume no air resistance.

Got questions? Get instant answers now!

Two particles of masses m 1 and m 2 separated by a horizontal distance D are let go from the same height h at different times. Particle 1 starts at t = 0 , and particle 2 is let go at t = T . Find the vertical position of the center of mass at a time before the first particle strikes the ground. Assume no air resistance.

y CM = { h 2 1 4 g t 2 , t < T h 1 2 g t 2 1 4 g T 2 + 1 2 g t T , t T

Got questions? Get instant answers now!

Two particles of masses m 1 and m 2 move uniformly in different circles of radii R 1 and R 2 about origin in the x , y -plane. The x - and y -coordinates of the center of mass and that of particle 1 are given as follows (where length is in meters and t in seconds):
x 1 ( t ) = 4 cos ( 2 t ) , y 1 ( t ) = 4 sin ( 2 t )

and:
x CM ( t ) = 3 cos ( 2 t ) , y CM ( t ) = 3 sin ( 2 t ) .

  1. Find the radius of the circle in which particle 1 moves.
  2. Find the x - and y -coordinates of particle 2 and the radius of the circle this particle moves.
Got questions? Get instant answers now!

Two particles of masses m 1 and m 2 move uniformly in different circles of radii R 1 and R 2 about the origin in the x , y -plane. The coordinates of the two particles in meters are given as follows ( z = 0 for both). Here t is in seconds:
x 1 ( t ) = 4 cos ( 2 t ) y 1 ( t ) = 4 sin ( 2 t ) x 2 ( t ) = 2 cos ( 3 t π 2 ) y 2 ( t ) = 2 sin ( 3 t π 2 )

  1. Find the radii of the circles of motion of both particles.
  2. Find the x - and y -coordinates of the center of mass.
  3. Decide if the center of mass moves in a circle by plotting its trajectory.

a. R 1 = 4 m , R 2 = 2 m ; b. X CM = m 1 x 1 + m 2 x 2 m 1 + m 2 , Y CM = m 1 y 1 + m 2 y 2 m 1 + m 2 ; c. yes, with R = 1 m 1 + m 2 16 m 1 2 + 4 m 2 2

Got questions? Get instant answers now!

Find the center of mass of a one-meter long rod, made of 50 cm of iron (density 8 g cm 3 ) and 50 cm of aluminum (density 2.7 g cm 3 ).

Got questions? Get instant answers now!

Find the center of mass of a rod of length L whose mass density changes from one end to the other quadratically. That is, if the rod is laid out along the x -axis with one end at the origin and the other end at x = L , the density is given by ρ ( x ) = ρ 0 + ( ρ 1 ρ 0 ) ( x L ) 2 , where ρ 0 and ρ 1 are constant values.

x c m = 3 4 L ( ρ 1 + ρ 0 ρ 1 + 2 ρ 0 )

Got questions? Get instant answers now!

Find the center of mass of a rectangular block of length a and width b that has a nonuniform density such that when the rectangle is placed in the x , y -plane with one corner at the origin and the block placed in the first quadrant with the two edges along the x - and y -axes, the density is given by ρ ( x , y ) = ρ 0 x , where ρ 0 is a constant.

Got questions? Get instant answers now!

Find the center of mass of a rectangular material of length a and width b made up of a material of nonuniform density. The density is such that when the rectangle is placed in the xy -plane, the density is given by ρ ( x , y ) = ρ 0 x y .

( 2 a 3 , 2 b 3 )

Got questions? Get instant answers now!

A cube of side a is cut out of another cube of side b as shown in the figure below.

A large cube of side b has a cube of side a cut out of its bottom left front corner.

Find the location of the center of mass of the structure. ( Hint: Think of the missing part as a negative mass overlapping a positive mass.)

Got questions? Get instant answers now!

Find the center of mass of cone of uniform density that has a radius R at the base, height h , and mass M . Let the origin be at the center of the base of the cone and have + z going through the cone vertex.

( x CM , y CM , z CM ) = ( 0,0 , h / 4 )

Got questions? Get instant answers now!

Find the center of mass of a thin wire of mass m and length L bent in a semicircular shape. Let the origin be at the center of the semicircle and have the wire arc from the + x axis, cross the + y axis, and terminate at the − x axis.

Got questions? Get instant answers now!

Find the center of mass of a uniform thin semicircular plate of radius R . Let the origin be at the center of the semicircle, the plate arc from the + x axis to the −x axis, and the z axis be perpendicular to the plate.

( x CM , y CM , z CM ) = ( 0 , 4 R / ( 3 π ) , 0 )

Got questions? Get instant answers now!

Find the center of mass of a sphere of mass M and radius R and a cylinder of mass m , radius r , and height h arranged as shown below.

Figure a has a sphere on top of a vertical cylinder. Figure b has a sphere centered on top of a horizontal cylinder.

Express your answers in a coordinate system that has the origin at the center of the cylinder.

Got questions? Get instant answers now!
Practice Key Terms 4

Get Jobilize Job Search Mobile App in your pocket Now!

Get it on Google Play Download on the App Store Now




Source:  OpenStax, University physics volume 1. OpenStax CNX. Sep 19, 2016 Download for free at http://cnx.org/content/col12031/1.5
Google Play and the Google Play logo are trademarks of Google Inc.

Notification Switch

Would you like to follow the 'University physics volume 1' conversation and receive update notifications?

Ask