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Velocity Polygon for a Crank-Slider Mechanism

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Presentation on theme: "Velocity Polygon for a Crank-Slider Mechanism"— Presentation transcript:

1 Velocity Polygon for a Crank-Slider Mechanism
Introduction Velocity Polygon for a Crank-Slider Velocity Polygon for a Crank-Slider Mechanism This presentation shows how to construct the velocity polygon for a crank-slider (inversion 1) mechanism. It is assumed that the dimensions for the links are known and the analysis is being performed at a given (known) configuration of the mechanism. Since the crank-slider has one degree-of-freedom, the angular velocity of one of the links must be given as well. As an example, for the crank-slider shown on the left we will learn: How to construct the polygon shown on the right How to extract velocity information from the polygon VtAO2 OV B VtBA VsBO4 A B O2 ω2 A

2 Inversion 1 Velocity Polygon for a Crank-Slider Inversion 1 Whether the crank-slider is offset or not, the process of constructing a velocity polygon remains the same. Therefore, in the first example we consider the more general case; I.e., an offset crank-slider. As for any other system, it is assumed that all the lengths are known and the system is being analyzed at a given configuration. Furthermore, it is assumed that the angular velocity of the crank is given. B O2 ω2 A B O2 ω2 A

3 We define four position vectors to obtain a vector loop equation:
Velocity Polygon for a Crank-Slider We define four position vectors to obtain a vector loop equation: RAO2 + RBA = RO4O2 + RBO4 Time derivative: VAO2 + VBA = VO4O2 + VBO4 Since RO4O2 is fixed to the ground, VO4O2 = 0. The lengths of RAO2 and RBA are constants, therefore VAO2 and VBA are tangential velocities. The axis of RBO4 is fixed, but its length varies. Therefore VBO4 consists only of a component parallel to RBO4 which is a slip velocity. ω2 A O2 RAO2 RBA RO4O2 B O4 RBO4 The velocity equation can then be expressed as: VtAO2 + VtBA = VsBO4

4 The direction is found by rotating RAO2 90° in the direction of ω2:
Determine velocities Velocity Polygon for a Crank-Slider VtAO2 + VtBA = VsBO4 We calculate VtAO2 : VtAO2 = ω2 ∙ RAO2 The direction is found by rotating RAO2 90° in the direction of ω2: The direction of VtBA is perpendicular to RBA The direction of VsBO4 is parallel to RBO4 We draw the velocity polygon: VtAO2 is added to the origin VtBA starts at A VsBO4 starts at the origin The two lines intersect at B. We add the missing velocities: This polygon represents the velocity loop equation shown above! VtAO2 ω2 A O2 RAO2 RBA RO4O2 B O4 RBO4 A VtBA VtAO2 B VsBO4 OV

5 VtAO2 We can determine ω3: ω3 = VtBA / RBA
Angular velocities Velocity Polygon for a Crank-Slider VtAO2 We can determine ω3: ω3 = VtBA / RBA RBA has to be rotated 90° clockwise to point in the same direction as VtBA. Therefore ω3 is clockwise ω4 equals zero, since the sliding joint prohibits any rotation with respect to the ground. ω2 A O2 RAO2 ω3 RBA RO4O2 B O4 RBO4 A VtBA VtAO2 B VsBO4 OV


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