DH Parameters allow us to fill in the elements of our transformation matrices according to a schema. This schema has some limitations to it, which sometimes calls for clever tricks to get by any issues - but more on that in a minute.

First off, about the parameters themseleves.

`d`

is the distance between two frames **i** and **(i-1)** along the **z** axis of **(i-1)**.
`a`

- or `r`

in your case - is the distance between two frames **i** and **(i-1)** along the **x** axis of **i**.
`theta`

is the angle between the **x** axes of **i** and **(i-1)** about the positive **z** axis of the **(i-1)** frame
`alpha`

is the angle between the **z** axes about the newly rotated x axis **after** the rotation of `theta`

has been applied

Furthermore, DH notation presupposes the following about the axes of the coordinate frames:

- the z-axis always points along the axis of actuation (that is, rotation in your case).
- the x-axis of the frame
**i** has to intersect the z-axis of the frame **(i-1)**
- the y-axis is set such that the frame forms a right-hand coordinate system

Below is an image of your system in the home pose with coordinate frames applied according to DH notation.

As you might notice, DH Notation does not allow for a displacement between the rotation and torison joint frames. This is not a problem, since mathematically it does not make a difference on where the rotation occurrs. The curved lines denote that the relevant frames are placed in the same position for notation purposes.

Now the only thing you have to do is think about where the rotations of your joints might be inserted into the DH-table as well as the displacement beteween the rotational frames (l1 through 4).

You may then insert the DH Parameters into the DH Matrix for each frame and use these transformations for your kinematic calculations.

For future questions, you might want to think about posting them at the Robotics Stack Exchange site, it will probably be easier to get an answer there very quick.