The Practice of Engineering Dynamics. Ronald J. Anderson

The Practice of Engineering Dynamics

will be written and determine the angular velocity of the coordinate system.

5 Repeat the previous three steps as you go from joint to joint in the system, always being careful to satisfy the joint constraints by defining appropriate degrees of freedom.

6 When the desired body is reached, define a final relative position vector from the joint to the center of mass.

7 The sum of all the relative position vectors will be the absolute position of the center of mass and the derivatives of the sum of vectors will yield the absolute velocity and acceleration of the center of mass.

1.3 Two Dimensional Motion with Constant Length

Figure 1.3 shows a rigid rod of length,

, rotating about a fixed point,

, in a plane. An expression for the velocity of the free end of the rod,

, relative to point images

is desired.

Schematic illustration oaf rigid rod rotating about a fixed point.

Figure 1.3 A rigid rod rotating about a fixed point.

By definition, the velocity of images relative to images is the time derivative of the position of images relative to images . This position vector is designated images and is shown in the figure.

In order to differentiate the position vector, we must have an expression for it and this means we must first choose a coordinate system³ in which to work. For a start, we can choose a right handed coordinate system fixed in the ground. The set of unit vectors images is such a system. The angular velocity of this coordinate system is zero (i.e. images ) since it is fixed in the ground.

An expression for the position of images relative to images in this system is,

(1.7) equation

We apply Equation 1.6 to images to get,

(1.8) equation

In this coordinate system, it is clear that there is a rate of change of magnitude of the vector only and the velocity of point images relative to images after performing the simple differentiation is,

(1.9) equation

Another derivation of the velocity of images relative to images might use the system of unit vectors images that are fixed in the rod. The advantage of using this system is that the position vector is easily expressed as,

(1.10) equation

Note that the length of this vector is a constant so that the total derivative must come from its rate of change of direction. The angular velocity of the coordinate system is equal to the angular velocity of the rod since the coordinate system is fixed in the rod. That is,

(1.11) equation

and the velocity of images relative to images is therefore⁴,

(1.12) equation

Since images is constant, images , and the final result is,

(1.13) equation

We now have two expressions for images (Equations 1.9 and 1.13). Since there can only be one value of this relative velocity, the two expressions must be equal to each other. However, the use of two different coordinate systems makes them look different. In order to compare them, we must be able to transform results from one coordinate system to the other.

Keep in mind that sequential sets of unit vectors are related to each other by simple plane rotations. Also note that the unit vectors are not related to any point in the system – they simply express directions. Given these two facts, we can relate the two sets of unit vectors we have been using by noting that images (i.e. the plane rotation relating the two sets is a rotation about the images or images axis). The relationships between the two sets of unit vectors can be expressed as follows.

(1.14) equation

(1.15)Скачать книгу