In the previous video, we learned that the number of degrees of freedom of a robot is

equal to the total number of freedoms of the rigid bodies minus the number of constraints

on their motion.

The constraints on motion often come from joints.

The most common type of joint is the revolute joint.

It places 5 constraints on the motion of the second spatial rigid body relative to the

first, and therefore the second body has only one degree of freedom relative to the first

body, given by the angle of the revolute joint.

Another common joint with one degree of freedom is the prismatic joint, also called a linear

joint.

We can also have joints with more than one degree of freedom, like this universal joint,

which has two degrees of freedom.

The spherical joint, also called a ball-and-socket joint, has three degrees of freedom: the two

degrees of freedom of the universal joint plus spinning about the axis.

This table summarizes the previous four joints, plus two other types of joints, the one-degree-of-freedom

helical joint and the two-degree-of-freedom cylindrical joint.

This table shows the number of degrees of freedom of each joint, or equivalently the

number of constraints between planar and spatial bodies.

Using this table of freedoms and constraints provided by joints, we can come up with a

simple expression to count the degrees of freedom of most robots, using our formula

from Chapter 2.1.

Let's say the robot has N links.

By historical convention, N includes ground as a link.

The robot has J joints.

And we define m to be the degrees of freedom of a single body, so m equals 3 for a rigid

body moving in the plane and m equals 6 for a rigid body moving in 3-dimensional space.

We can write our equation in terms of these variables: N-1 is the number of links other

than ground, and m times N-1 is the total number of freedoms of the bodies if they are

not constrained by joints.

Then we subtract off the constraints provided by the J joints.

Since the number of constraints provided by joint i is equal to m minus the number of

freedoms allowed by joint i, we can replace ci by m minus fi and rewrite the equation

like this.

Rearranging once more, we get this.

This is called Grubler's formula, and it assumes that the constraints provided by the joints

are independent.

Let's apply Grubler's formula to a few mechanisms.

The first mechanism is called a serial, or open-chain, robot, because there is a single

path from ground to the end of the robot.

It's called a 3R robot, meaning it has three revolute joints.

This planar robot has, m=3, N=4, J=3, and one freedom at each joint.

Grubler's formula tells us, 3(4-1-3)+3=3.

The robot has 3 degrees of freedom, as we expect.

The next mechanism is called a four-bar linkage, obtained by pinning the endpoint of the 3R

robot to a particular location in the plane.

This is called a closed-chain mechanism, because there's a closed loop.

As before, we have, m=3 and N=4, but now we have J=4 joints.

Grubler's formula tells us that this mechanism has, 3(4-1-4)+4, is equal to one degree of

freedom.

We would also predict this by the fact that pinning the endpoint of the 3R robot to a

particular x-y location creates two constraints, so we can subtract 2 from the 3 freedoms of

the 3R robot to see that there is one degree of freedom.

The next mechanism is like the four-bar, except now it adds one more link and two more joints.

Grubler's formula would tell us that this mechanism has zero degrees of freedom, but

that's wrong; it still has one degree of freedom, just like the four-bar.

The reason that Grubler's formula does not apply is that the joint constraints are not

independent.

Testing whether joint constraints are independent is not an easy task, and we won't pursue it

further.

Finally, we have a spatial closed-chain mechanism called a Stewart platform.

It has 6 legs connecting the bottom platform to the top platform, and each leg consists

of two links and a universal joint, a prismatic joint, and a spherical joint.

The prismatic joints are actuated, creating motion of the top platform as you see in the

video.

Since each leg has 2 links, there is a total of 12 links in the legs, and adding ground

and the top platform makes 14 links total.

Each leg has 3 joints with 6 degrees of freedom total, for a total of 18 joints with 36 total

freedoms.

The mechanism moves in 3-dimensional space, making m equal to 6.

Grubler's formula tells us the Stewart platform has, 6(14-1-18)+36, is equal to 6 degrees

of freedom.

The top platform can be moved with all 6 degrees of freedom of a rigid body.

There are limits to the range of motion, of course, but these limits do not reduce the

number of degrees of freedom.

In the next video we will explore another important property of a configuration space:

its topology.