Effective vs. Designed shape accuracy at high speed cutting.
Pamintas, Eugen
1. INTRODUCTION
The machining of metals plays a crucial role in a range of
manufacturing activities, while metal cutting is commonly associated
with big industries, including the high speed cutting and ultra
precision machining of delicate components.
Machine tool manufacturers have created machines capable of
maximizing the utility of each generation of cutting tool materials.
Designers and machinists have optimized the shapes of tools to lengthen
tool life at high cutting speeds, while lubricant manufacturers have
developed new coolants and lubricants to improve surface finish and
permit increased rates of metal removal. Automatic machines, computer
numerically controlled (CNC) machines and transfer machines produce
better tool efficiency. Machining today requires a wider range of skills
as: computer programming and physical realities of the tool-work
interface is as important as ever. (Schey, 1999).
Many new alloys have been developed to meet the increasingly severe
conditions of stress, temperature and corrosion imposed by the needs of
our industrial civilization. Some of these materials are easy to
machine, but others, such as high-alloy steels, become more difficult to
cut as their useful properties improve. (Huston & Knobeloch, 1998).
"Machinability" is not a unique property of a material!
It is a mode of behavior of the material during cutting. Tool material
and cutting speed are perhaps the two most important parameters to
include. (Yang & Liu, 1999)
2. WHY THE KNOWLEDGE IN CUTTING PROCESS IS SO IMPORTANT
To better understand and control the cutting process, a lot of
cutting models was imagine. Modeling methods are now discussed in five
generic categories:
* Empirical modeling typified by Taylor's equation^
* Closed-form analytical modeling typified by Merchant's shear
plane solution;
* Mechanistic modeling typified by DeVor et al, 's analysis of
forces vs. chip thickness;
* FEA modeling typified by Sandstorm's high speed machining
study;
* Artificial intelligence and other modeling methods that combine
many of the above;
The goals of any kind of model are to predict physical behavior or
known a priori conditions. Essentially, {known inputs + an accurate
model = desired outputs}.
The metal cutting practitioner would like to know the tool life
tomorrow, starting from today's input of the work material being
purchased; the cutting inserts available; the features that have to be
machined in the new "part-drawings" that have just arrived
from the CAD/CAM sub-contractor; and how quickly the original client
needs the part.
The metal cutting theorist would like to help with this question
but, along the way, might also like to predict shear plane angle,
cutting forces, and temperatures, as well as estimating the likely tool
life at any given speed. (Jawahir, Dillon, Balaji, Redetzky & Fang,
1998).
A lot of scientifically papers, all over the world, provide
experimental data on why" machining forecasting" is about as
reliable as "weather forecasting. (Komanduri & Raff, 2000).
The key parameters that the day-to-day practitioner finds valuable
are: (Trent & Wright, 2000)
1. Prediction of tool life
2. Prediction of the accuracy of component being machined
3. Prediction of surface finish on the part being machined
4. Prediction of chip control
5. Prediction of the loads on the tool, and/or workpiece,
From the authors' experiences in industry, the five parameters
above are more-or-less arranged in their order of importance. In high
precision machining, the accuracy is so critical that "#1 and
#2" above will be reversed: the tool will be changed as often as
desired accuracy dictates. In another circumstance, the machining of
pure copper is "easy" from a tool-life point of view but
"hard" from a surface finish viewpoint--here, "#1 and
#3" might switch places.
3. EFFECTIVE VS CONSTRUCTIVE CUTTING ANGLES
Generally, to define the relative position between tool and work
piece, in a case of cutting process is the same like the defining the
relative position between two different coordinate systems. In fig. 1 is
shown the case of orthogonal touring when the machine axis can be
considered supposed against with the constructive system of cutting tool
and the effective system [O.sub.fe] [X.sub.fe] [Y.sub.fe] [Z.sub.fe] is
rotated because of kinematic angle deviation [??].
In this theoretical case is well known that six parameters are
needed: three of them which describe the coordinate of the origin
[O.sub.f] against O--these are linear travel parameters ([1.sub.X],
[1.sub.Y], [1.sub.Z] for example), and the other are three angular
parameters which characterize the spatial rotation of the axis of
[O.sub.f] [X.sub.f] [Y.sub.f] [Z.sub.f] system against with the axis of
O[X.sub.m][Y.sub.m][Z.sub.m] system. (Pop, 1989).
The theoretical parameters will be considered the factors or the
elements which determine the axes position of the coordinate system of
the tool [X.sub.f], [Y.sub.f], [Z.sub.f], as against with the axes
position of the coordinate system attached on piece XYZ.
[FIGURE 1 OMITTED]
The technological parameters will be considered the factors which
are necessary for the proper setting up the tool, as against with the
working piece (constructive values of the tool, the geometry and
dimensions of the working part, the smugness of the surface generation
etc.). Between the theoretical and technological installation parameters
of the tool there are the interdependence mathematical relations which
allows the theoretical assembly values will be expressed depending on
the certain values of the technological parameters and vice versa.
For example which are presented in figure 1, considering an M point
of contact between cutting tool and the cylindrical surface of a
workpiece with 60 mm in diameter, the effective coordinates, when the
constructive coordinates M and the work parameters are known, are:
[MATHEMATICAL EXPRESSION NOT REPRODUCIBLE IN ASCII]
and thus:
[X.sub.Me] = r; [y.sub.Me] = -r sin [eta]; [Z.sub.Me] = r cos [eta]
4. THE SPECIFIC OF HSC (HSM)
How do work materials behave when the cutting speed is raised as
high as 3,500 m [min.sup.-1] for aluminum alloy?
What are the forces on the tool?
What is the effect on tool life?
How good is the part accuracy?
These are some of the questions which must be answered to better
control high speed cutting process. (Liu & Barash, 1984).
In this paper only some theoretically consideration about a
possible answer at the last question is questioned.
To reach this goal, in figure 2 and 3 the scheme for determination
of main effective cutting parameters of the tool is presented and then,
using a manufacturing example, the difference between the values in the
cases of classical turning vs. HSM is briefly presented.
[FIGURE 2 OMITTED]
[FIGURE 3 OMITTED]
[[alpha].sub.ne] = arccos [1/cos[[lambda].sub.Te] (cos
[[alpha].sub.n] x cos [eta] + sin [[alpha].sub.n] x sin [X.sub.r] x sin
[eta])];
[[gamma].sub.ne] = arcsin (sin [[gamma].sub.n] x cos [eta] + cos
[[gamma].sub.n] x sin [X.sub.r] x cos [eta])
[[lambda].sub.Te] = arcsin (-cos [X.sub.nr] x sin [eta])
[X.sub.re] = arctg(tan[X.sub.r]/cos [eta])
Applying the above equation for: [[lambda].sub.T]=0;
[X.sub.r]=45[degrees]; [[alpha].sub.n]=5[degrees];
[[gamma].sub.n]=6[degrees] at:--classical turning: [PHI]60mm, f=0,1
mm/rot; v=100 m/min
--high speed cutting: [PHI]60mm, f=0,2 mm/rot; v=475 m/min; the
result of dimensional accuracy and shape quality shows some meaningful
differences.
5. CONCLUSION
If the geometrical parameters of the tool are well determined by
calculus in advance, the tool setting on the CNC machine can be done in
such a manner than the accuracy of the part can be obtained as it was
designed. Thus, the number of tool adjustment and finishing passes can
be diminishing and save supplementary costs.
The future research plans are dedicates to experimental attest of
this theoretical calculus, first for longitudinal and face turning and
then for form turning.
Improved appreciation of tool geometry also will lead to better
understanding of cutting phenomenon.
6. REFERRING
Huston, M.F., Knobeloch, G.W. (1998). Cutting Materials, Tools and
Market Trends, in the Conference on High-Performance Tools, Dusseldorf,
Germany, 21
Jawahir, LS., Dillon, O.W., Balaji, A.K., Redetzky, M., Fang, N.
(1998). Proceedings of the CIRP International Workshop on Modeling of
Machining Operations, held in Atlanta, GA., Published by the University
of Kentucky Lexington, KY, 40506-0108. p.l61
Komanduri, R., Raff, L.M. (2000). Molecular Dynamics (MD)
Simulation of Machining, Proceedings of the Institution of Mechanical
Engineers, London
Liu, C.R., Lin, Z.C, Barash, M.M. (1984). High Speed Machining, 181
Pop, I. (1989. Cutting tools design, vol.I, Politehnica Publishing,
Timisoara, Ro.
Schey, J.A. (1999). Introduction to Manufacturing Processes, McGraw
Hill, New York
Trent, M.E., Paul K. Wright, K.P. (2000) Metal cutting, Elsevier
Inc., ISBN: 978-0-7506-7069-2
Yang, X., Liu, C.R. (1999). Machining Science and Technology, 3,
(1) 107
