Difference between revisions of "Projects:2014s2-80 Swinging Crane Project"

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Revision as of 14:16, 6 May 2015

Project aim: Swinging Crane project is aim to transporting a payload from one place to another and reducing the consuming time as much as possible.

Project introduction

Technical background

Figure 1.Gantry crane system model

Gantry cranes are wildly used in industry, for lifting heavy objects by a hoist which is fitted in a hoist trolley and can move horizontally on a rail or pair of rails fitted under a beam.

Figure 1 demonstrates the model of swinging crane, the DC motor controls the trolley to horizontally move a load in a short distance. There are two encoders to record the data, one is the moving distance, and another is sway angle of the load. By giving a signal from operation control system, it will generate a DC current from a current source, then injecting it into a motor, which would drive the conveyor belt. There is a trolley placed on one side of the belt, and start moving towards another side. At the bottom of the trolley, using a rod stand for the hoist, connect with a load. At the start of transporting the loads, it will cause accelerated, corresponds to a traction force, effect on the trolley. There occur an angle between the rod and vertical. After the trolley stops, the loads may turn to oscillate. If the initial angle large, the oscillation duration roses, which is a potential risk to the people on the ground.

The system is operated inside a flow, shown as Figure 2. Input signal is generated from Simulink, goes into the plant through dSPACE and amplifier. The outputs of the plant are measured by two encoders, and send back to dSPACE, finally transfer to the computer. The dSPACE and amplifier components will introduce later. The plant is the real model of the system, the transfer relationship is shown in Figure 3. The current flows into DC motor, which drives the belt on the grid. The trolley is bind on the belt, thus it has the same acceleration with the belt. There are two outputs from the, the trolley position and the swinging angle of the pendulum.

Motivation

Figure 2.System structure flow
Figure 3.Plant structure flow

The gantry crane system could be identified into separate sections: linear motion and swinging pendulum. The goal is to minimum the time used to transport loads and reduce the swinging oscillation as minimize as possible. The pendulum was studied by Galileo, Huygens, Newton, Hooke and all the leading figures of 17th-century science. Since the long history on the study, pendulum theory has been almost perfect, but still exist imperfection in applied to practical. In this project, the basic model is simple gravity pendulum. To analyse the motion parameters of pendulum, Newton’s classical mechanics Laws are applied. In traditional education, Newton’s lows are taught in high-school physics lecture. The theorem is abstract to student, and divorced from the practical application. The gantry crane system is a representative application, and easy to understand, thus it is suitable for demonstration teaching purpose.

Objectives

The aim of swinging crane project is to demonstrate research component of project, examine and improve last year’s project, perform analysis, show understanding of theoretical principles, simulations and experiments, then improve system robustness, calculating instantaneous energy and optimize system motion trajectories. The 5 objectives of this project are shown as bellow:

1.Modelling of system – physical principles, approximates which can be used to simplify model (e.g. linearized model).

2.Selection of reference trajectories-trade-offs, constraints, optimization.

3.Calculation and control of “energy” stored in pendulum-means for damping energy.

4.Simulation of system- investigates and checks performance.

5.Experimental demonstration- interfacing operation, model verification.

Background

Previous work

Figure 4.Gantry Crane model in lab

The swinging crane real system is designed by the workshop of University of Adelaide. Some analysis has been done by previous group, a simple PID control and current manual control have also been developed. Thus some data of the model could use by directly looking up their reports.

Figure 4 gantry crane system is studied by last year project group. This model is based on lumped-mass model, which ignore the mass and the elongation of the rod caused by the tension force. Both of the trolley and payload are considered as point mass and moving in two-dimensional x-y plane.

System modelling

Simple pendulum model

System equations

Figure 4. Instantaneous velocity analysis

According to Figure 5, the system total energy could be expressed as:

System total energy.jpg

Taking the force relation, the system transfer function is System nonlinear model transfer function.png, if the pendulum swing a small angle(i.e.less than 10 degrees), the above equations could be reduced to System linear model transfer function.png.

By taking the Laplace transform, the system transfer function is Laplace transfrom of linear transfer function.png.

The above equations could also write as state-space model form. Assume the state variable State variable.png, and state equation State equation.png the state matrices are SSM A.png,SSM B.pngandSSM C.png.

System dynamic linear models
System dynamic linear model 1.png
System dynamic linear model 2.png
System dynamic linear model 3.png

Control methods designing

Hardware test and interfacing

Results comparison

Conclusion

Group members

Liyan Yi

Xianghui Ma

Supervisors

Dr.Wen Soong [1]

Dr Braden Phillips [2]

References