The present invention relates to a method for bending a workpiece mainly of a metal without cambering, and a device therefor.
Bending a workpiece of a thin sheet mainly of a metal sometimes results in formation of a camber along the bending ridge line. While leveling will be carried out by means of a device referred to as a leveler in a case where the degree of the camber exceeds a tolerable range, some workpieces, depending on shapes after bending, cannot pass through the leveler, or, even if they can pass through the leveler, requires a special die incorporated in the leveler. This is a factor that will decrease precision of the products or reduce productivity to a great extent.
The Patent Literatures 1-3 disclose related arts.
The present inventors have keenly studied factors that cause cambers to grow, and have found out that cutting before bending may often cause a relatively great residual stress in the vicinity of a cut edge, which affects a shape after bending. This invention has been reached on the basis of this discovery.
According to a first aspect of the present invention, a method for bending a workpiece having a flat plane and a cut edge is comprised of: regulating a residual stress in the workpiece in a range within a first width from the cut edge and not including a bending line; and bending the workpiece with the regulated residual stress along the bending line.
According to a second aspect of the present invention, a device for regulating a residual stress in a workpiece having a flat plane and a cut edge made by cutting is comprised of: input means for inputting information about cutting; a residual stress database relating a plurality of cutting conditions to residual stresses respectively resulted from the cutting conditions; a process condition database relating a plurality of process conditions for regulating residual stresses to residual stresses respectively resulted from the process conditions; first searching means for searching a residual stress (σ0) from the residual stress database depending on the information; a calculator for calculating a first bending moment (Mrs) in a ridge line originated from the residual stress, and a second bending moment (Mz) in the ridge line originated from bending to obtain a total bending moment (Mrs−Mz) and calculating a camber curvature (ρz) of the workpiece originated from the total bending moment (Mrs−Mz); comparing a difference (|ρz−ρz0|) between the camber curvature (ρz) and a target value (ρz0) with a tolerable value (ρ); second searching means for searching a process condition satisfying a tolerable condition (|ρz−ρz0|≦p) from the process condition database in a case where the difference (|ρz−ρz0|) exceeds the tolerable value (ρ); and regulating means for regulating a residual stress in the workpiece in a range within a first width from the cut edge and not including a bending line on the basis of the searched process condition.
Exemplary embodiments of the present invention will be described hereinafter with reference to the appended drawings.
Bending is in general carried out in a procedure as described below. First, a thin sheet mainly of a metal is served to cutting by means of a shearing machine or a laser cutter, thereby forming a flat workpiece W as illustrated in
The present inventors have keenly studied factors that cause cambers to grow, and focused on influences of cutting methods thereon.
Cold rolled steel sheets of t=1.2 mm in thickness in compliance with an SPCC grade regulated in JIS-G3141 (corresponding to a CS grade regulated in ASTM-A1008) are cut out by means of a laser cutter, a shearing machine, and a wire-cutter, respectively, and are given 90 degrees U-bending respectively. Amounts of camber δw (mm) thereof are respectively measured. Lengths of the workpieces are 1=400 mm, widths of bottom flanges after bending are fb=50 mm, and heights of flanges standing at both sides in the lateral directions are fs=7.5 mm. A definition of an amount of camber is compliant with that illustrated in
As being apparent from
In
The aforementioned results could be accountable if it was interpreted that a stress remained in the vicinity of the cut edge after cutting and the residual stress acted on the ridge line, thereby resulting in camber forming after bending.
Referring to
The compressive strain in the b-b direction on the outer plane and the compressive strain in the d-d direction on the inner plane are both strains warping the workpiece W along the ridge line, thereby resultantly generating a camber 52 in
On a ridge line of a workpiece W of a sheet shape, when being bent, its material is constrained from migrating along its ridge line is imposed on the material. Therefore a strain on a plane perpendicular to the ridge line is substantially a plane strain. In a case where the ridge line is directed in its longitudinal direction of the workpiece W, more specifically in a case where a camber fulfills a longitudinal camber, a geometrical moment of inertia is very small. Therefore, in a case where a workpiece W is a long matter and a longitudinal camber occurs, a camber δw is likely to become great.
Referring to
Referring to
A curvature 1/ρz brought about by the bending moment Mz is represented by:
where ρz represents a radius of curvature, E represents a Young's modulus, and lz represents a geometrical moment of inertia.
When a bending moment Mz acts on a workpiece W having a length L, a relation between an amount of camber δw and a radius of curvature ρz at a center of a ridge line of the workpiece W can be represented by the following equation. This is, however, an approximation using a fact that L/2ρz is very small as compared with 1.
δw=ρz(1−cos(l/2ρz)) (3)
As a length is constant in the neutral plane, a relation of curvatures is given by the following equation.
On the basis of these equations (1)-(4), an amount of camber δw can be represented by the following equation.
Here, Δθ is corresponding to a springback occurred after unloading. To make the amount of camber δw be not 0, more specifically to generate the camber, it is necessary to make the springback Δθ be not 0. Further, if the plastic Poisson ratio νp is equal to the elastic Poisson ratio νe, the amount of camber δw comes to be 0 regardless of the value of the springback Δθ, thereby any camber does not come out.
In the meantime, the plastic Poisson ratio νp can be represented by the following equation with using a Lankford value r.
As will be understood from the equation (6), a material with a smaller Lankford value r leads to a smaller Poisson ratio νp, thereby forming a smaller camber as being understood with reference to the equation (5).
By the way, as discussed before, one of the problems in shape precision after bending is a residual stress around a cut edge. When a residual stress is generated around a cut edge of a workpiece W, a bending moment Mrs generated by the residual stresses is superimposed on a bending moment Mz, thereby transforming the camber.
When a total moment is represented by M;
M=Mrs−Mz (7)
Therefore, a saddle camber comes out when M<0, a bow camber comes out when M>0, and any camber does not come to be when M=0. Further, the following equation holds.
The equations (1), (4) and (11) lead to:
When a residual stress σ generated after cutting is considered as a function 6(1) of a distance 1 from the cut edge, a bending moment Mrs generated by the residual stresses is represented by the following equation.
dM
rs=σ(l)t[(fs−l)cos θ−e]dl
M
rs=2∫0f
Here e in the equation (12) is a distance in the direction along the X-axis between a center of gravity when the workpiece W is subject to V-bending around the Y-axis and the neutral axis of the workpiece W.
We have studied a distribution of residual stresses that a laser cutter leaves in a cut edge. We have cut a cold rolled steel sheet of t=1.2 mm in thickness compliance with an SPCC grade regulated in JIS-G3141 (corresponding to a CS grade regulated in ASTM-A1008) with a carbon dioxide continuous laser cutter with a output power capacity of 2.7 kW at a cutting rate of 83 mm/s. Nitrogen at 0.8 MPa is used as an assist gas. The laser is focused on a surface of the workpiece. A measured distribution of residual stresses is shown in
Measurement of residual stresses after cutting has been done by carrying out wire-cutting on the workpiece and measuring a strain generated by resultant release of a residual stress. We have carried out wire-cutting at proper intervals from the cut edge and, in each occasion, measured a residual stress. The horizontal axis in
As being apparent from
A plurality of test pieces of the same cold rolled steel sheets have been subject to laser-cutting in the same condition as that described above. These test pieces have been, as shown in
In the test piece of lc=0 mm (more specifically, as laser-cut), the residual stress by laser-cutting are not removed at all. The amounts of camber δw are positive (bow camber), and the greatest among those of all the test pieces.
In the test piece of lc=0.1 mm, as being understood from
More specifically, it is apparent that the residual stresses around the cut edge of the workpiece affects camber formation after bending. Further, to suppress bow-cambering in a workpiece, it is understood that regulating (ordinarily, reducing) the residual stress around the cut edge is preferable. More specifically, one of the problems in shape precision is a residual stress around a cut edge and the respective embodiments described below have been reached on the basis of a discovery of this source of the problem.
As being apparent from the aforementioned discussion, in a case where a residual stress is left around the cut edge, applying a compression stress makes it possible to convert the shape after bending, which is to be a saddle camber, into a bow chamber.
As being already discussed with reference to
A device for regulating a residual stress in a workpiece is comprised of any means for regulating a residual stress. One of such means is, referring to
Another example of a means for regulating a residual stress is a punch P and a die D, which are capable of applying pressure as shown in
Still another example of a means for regulating a residual stress is rollers R1, R2 which are capable of applying pressure as shown in
Or, if possible, any proper means is applicable.
What is subject to regulation of a residual stress is a range having a considerable width from the cut edge WF, which does not include the bending line CF. This width is preferably brought into conformity with a range where a tensile residual stress is left, and may be, with reference to
In a case where the opposite edges are subject to regulation of a residual stress, conditions for regulating a residual stress may be distinct, or identical, between the edges. In the example of
Whichever a material is applied to a workpiece W, generally a yield point can be known in advance. The pressure force may be determined so as to apply a stress slightly greater than the yield point. As the border of the cut edge produces plastic deformation and thereby receives a compressive stress, this means is prominently effective in regulating a residual stress.
Alternatively, a stress slightly smaller than the yield point may be applied. Further, by applying a stress for a long time period, a creep strain may be given thereto. Either case is effective in regulating a residual stress.
Referring to
The database of residual stresses 13 includes data in which a plurality of cutting conditions are respectively related to resultant residual stresses.
The cutting conditions include materials, sheet thicknesses, and cutting methods to be used. Further, in a case of cutting by a laser, the data include various conditions such as laser powers and cutting speeds. In a case of cutting by shearing, the data include shearing angles and clearances.
The data of residual stresses include a function σ=σ(l), in which values of residual stresses are related to distances from a cut edge.
The database of residual stresses 13 is constructed by cutting in various cutting conditions in advance and measuring resultant residual stresses, and is stored in a proper storage device in advance.
The database search means 15 has a function of searching and reading out an optimal data from the database of residual stresses in accordance with a cutting condition input through the input means 5.
The calculator 17 calculates a moment Mrs by means of an equation (13) in accordance with the read out function σ=σ(l) of a residual stress distribution.
Mrs=2∫σ(y)f(y)tdy (13)
This is, however, applicable to a case of V-bending. Further the calculator 17 may further have a function of calculating a residual stress distribution a from a given Mrs.
The calculator 19 calculates the bending moment Mz by means of the equation (1) in accordance with the information about bending (a bending angle and a bending radius for example) input through the input means 5. The calculator 21 calculates the moment M from Mrz and Mz by means of the equation (7). The calculator 23 calculates the camber curvature ρz by means of the equation (10).
The memory 25 stores a target value ρz0 in advance, and the calculator 27 calculates a difference |ρz−ρz0| between the calculated camber curvature ρz and the target value ρz0. Alternatively any other means may calculates the difference |ρz−ρz0|.
The memory 25 further stores a tolerable value ρ. The calculator 27 compares ρ with |ρz−ρz0|. It is determined that there will be no problem when ρ≧|ρz−ρz0| because an amount of camber is expected to stay within the tolerable value. It is determined that regulation of a residual stress is necessary when p<|ρz−ρz0| because an amount of camber is expected to go beyond the tolerable value.
The process condition database 29 is used for calculating a condition for regulating a residual stress. The process condition database 29 includes data in which a plurality of process conditions for regulating residual stresses are respectively related to resultant residual stresses.
The process conditions include materials, sheet thicknesses, and processes to be applied. Further, in a case of regulating a residual stress by a laser beam, the process condition database 29 includes data in which laser powers, moving speeds of the laser beams, and distances from a laser oscillator to a workpiece are mutually related.
Further in a case of using a punch and a die to regulate residual stresses, the data include data of pressure forces by the punch, pressure cycles, and feeding speeds of a workpiece. In a case of using rollers, the data include data of pressure forces by the rollers, and feeding speeds of a workpiece.
The process condition database 29 is constructed by carrying out experiments to collect data in advance.
In a case where the calculator 27 determines ρ<|ρz−ρz0|, the database search means 15 searches and reads out a condition to realize ρ≧|ρz−ρz0| from the process condition database 29.
The controller 31 controls the regulating means 33 in accordance with the read-out process condition to regulate a residual stress around a cut end of a workpiece.
Referring to
Information about a material, a thickness, and such, of a workpiece W is input through the input means 5 to the device 1 (step S1), and information about a shape of a product is input through the input means 5 to the device 1 (step S2). The shape of the product includes a bending angle, dimensions of a flange and such.
Next a condition of cutting is input (step S3), and a residual stress data is read out by the database search means 15 in accordance with the cutting condition (steps S4 and S5). A moment Mrs is calculated by the calculator 17 in accordance with the read-out residual stresses a around the cut edge (step S6).
Further information about bending is input through the input means 5 (step S7). This information includes, a radius and an angle of a tip end of the punch, a radius and an angle of the die, a radius of a shoulder of the die. The calculator 19 calculates a bending moment Mz generated along the ridge line in accordance with the input information (step S8). The calculator 23 calculates a camber curvature ρz from the calculated Mrs and Mz (step S10). An amount of camber σw can be calculated by using this and by the equation (11).
Next the calculator 27 uses ρz0 stored in the memory 25 in advance to calculate |ρz−ρz0|, and compares p with |ρz−ρz0| (step S11). When ρ≧|ρz−ρz0| (YES in the step S11), the process is finished and then moves to a bending process.
When σ<|ρz−ρz0| (NO in the step S11), the calculator 34, on the basis of ρz0, calculates Mrs′ by the equation Mrs′=Mz+El/ρz0 (step S12). Meanwhile this equation is inherently led out of the equation (10). Next the calculator 34, on the basis of calculated Mrs′, calculates target residual stresses by the equation (13), and, on the basis of the calculated target residual stresses, calculates a necessary process condition (step S12A). In this calculation, any known method such as an FEM analysis or such is used.
The database search means 15 searches and reads out an optimal process condition from the process condition database 29 (step S13). The controller 31 controls the regulating means 33 to regulate residual stresses around the cut edge of the workpiece in accordance with the process condition (step S14). The method of regulation is already described before.
When finishing the steps described above, the process moves to a bending step. Bending that is done through the process realizes a shape satisfying a predetermined precision.
Although the invention has been described above by reference to certain embodiments of the invention, the invention is not limited to the embodiments described above. Modifications and variations of the embodiments described above will occur to those skilled in the art, in light of the above teachings.
Bending satisfying a predetermined precision is realized.
Number | Date | Country | Kind |
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2011005649 | Jan 2011 | JP | national |
2011242372 | Nov 2011 | JP | national |
Filing Document | Filing Date | Country | Kind | 371c Date |
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PCT/JP2012/050543 | 1/13/2012 | WO | 00 | 7/9/2013 |