机械设计外文翻译-凸轮机构的优化方法【中文2029字】【PDF+中文WORD】
收藏
资源目录
压缩包内文档预览:
编号:118595320
类型:共享资源
大小:594.83KB
格式:ZIP
上传时间:2021-03-24
上传人:资料****站
认证信息
个人认证
冯**(实名认证)
河南
IP属地:河南
18
积分
- 关 键 词:
-
中文2029字
机械设计
外文
翻译
凸轮
机构
优化
方法
中文
2029
PDF
WORD
- 资源描述:
-
机械设计外文翻译-凸轮机构的优化方法【中文2029字】【PDF+中文WORD】,中文2029字,机械设计,外文,翻译,凸轮,机构,优化,方法,中文,2029,PDF,WORD
- 内容简介:
-
65 Claudia Mari Popa, Dinel Popa Optimisation Methods for Cam Mechanisms Abstract. In this paper we present the criteria which represent the base of optimizing the cam mechanisms and also we perform the calculations for several types of mechanisms. We study the influence of the constructive parameters in case of the simple machines with rotation cam and follower (flat or curve) of translation on the curvature radius and that of the transmission angle. As it follows, we present the optimization calculations of the cam and flat rotation follower mechanisms, as well as the calculations for optimizing the cam mechanisms by circular groove followers help. For an easier interpretation of the results, we have visualized the obtained cam in AutoCAD according to the script files generated by a calculation program. Keywords: cam, curvature radius, constructive parameters, pressure angle, circular grove. 1. Optimisation criteria The term of optimization comes from the Latin word optimus, which is the su-perlative of good, which means the best, very good, properly indicated, suited etc. According to Explaining Dictionary of Romanian Language, by optimization is under-stood technically the ensemble of scientific research (papers) that is looking for the best option in finding a solution for a problem or, according to another definition, the process of constant improving until the best solution it is reached. Mathematically, by optimization is understood the reasoning, the calculus permits in finding values of one or more parameters which correspond to the maximum of a function. In the case of a cam mechanism, one of the optimization criteria is the criteria of the curvature radius, according to that, the curvature radius of the cam in the case of a follower which is flat or has a positive curvature radius must be positive and even higher then an imposed value. ANALELE UNIVERSITII “EFTIMIE MURGU” REIA ANUL XVII, NR. 1, 2010, ISSN 1453 - 7397 66 Another criteria that must be taken into account is that of the pressure angle (noted with ) which must fulfill the condition cr, where 030=cr at in-creasing and 060 at decreasing. On the basis of this two criteria will be obtained better condition for the com-plex cam mechanisms to function. Next we will define as a technically functional cam the cam that is obtained by classic procedures of processing of a tool machine, having the curvature radius positive and that respects the condition of the critical pressure angle (cr). 2. The optimisation of simple cam mechanisms with transla-tion follower There is considered the case of a flat follower (fig. 1), case where the para-metrical coordinates of the cam are: ,sincos)(;cossin)(00ssRyssRx+=+= (1) and .2sAO= (2) xOA2OYysRX0 Figure 1. Mechanism with rotation cam and flat translation follower. From (1) are deducted: ;sin)(;cos)(00ssRyssRx+=+= (3) ,cos) (sin) (;sin) (cos)(00ssRssyssRssx+=+= (4) and its also deducted the expression of the curvature radius: 67 | |) () (2/322yxyxyxRc+=; 0ssRRc+=. (5) If, for example, the displacement law is: )2cos1 (0= hs. (6) Then the curvature radius is 2cos3000hhRRc+= (7) and becomes minimum for 2= when is given by: 00min2hRRc=. (8) In this case, for hR20= the minimum curvature radius becomes null and the cam has the shape from figure 2, a, and if 002hR the curvature radius is canceled in the points where 2; 2 (fig. 2, b) and have negative value for 2 and the cam becomes nonfunctional. If we use flat follower in these conditions we can obtain cams technically functional. yxyx Figure 2. Nonfunctional cams with null or negative curvature radius. Let us consider the general case where the curvature radius at the top in the case of a flat follower becomes negative 0) (max0+ssR and to determine the radius r of the circular follower so that the cam will be functionally. The equations of the followers groove (fig. 3) are ,cos;sin22ryrx= (8) and from the equalities: 68 ,coscossin;sinsincos0rsrRyxyryxxAA+= (9) are deducted the equations of the curvature family ),()cos(cos)();,()sin(sin)(210frsrRyfrsrRx=+=+=; (10) that depends on the parameters ,. OxAr220vA2R + r + syXyxY Figure 3. Mechanism with rotation cam and flat rotation follower. The equation of the envelope checks the equation: 02211=ffff, (11) that becomes srRs+=0 tg. (12) The cam equations are given by the relations (10) where checks the equa-tion (12). In the top (2=) are fulfilled the conditions ; 0 ; 0 ; 0 ;max=ssss 69 ; 0 ;Rsmax0=+=sr (13) )(1 ();( ; 0max0max0rsRxrsRyx+=+= and the curvature radius is |1 | |) (| | | |) () (max232/322+=+=rsRxyyxyyxyxyxRc. (14) Knowing that 0max0+=srRs, (15) is deducted )1)() ()(max0max02max0+=srRssRrsRRc. (16) And next, by knowing that 01;0maxcR is obtained: )(max02max0ssRsRr+. (18) 3. The optimisation of mechanisms with rotation follower For the starters, is considered the mechanism with a flat follower from figure 3 that has the lengths bRd,0 and the displacement rule: )(22=. (19) From the equations: ,sincossin;cossincos202+=+=+=bRyxydyxx (20) are obtained the equations of the cam: ),cos()sin(cos)(sin);sin()cos(sin)(cos220220+=+=bbRdybbRdx (21) where 1sin)(cos2202+=bRd. (22) 70 bxO22Oy1O2xR01X22yY Figure 4. Mechanism with rotation cam and flat rotation follower. The parameter represents the distance from the tangent point until the point 2O and as a result the pressure angle is given by the relation: =b arctg. (23) The curvature radius | |) () (2322yxyxyxRc+= (24) and the pressure angle depends of the amplitude 02 of angle 2 as from the dimensions bR+0 and d. The numerical analyze is made tabular with the step 01= calculation the derivates by limited differences with sets of values for bR + and d. Is considered the displacement rule: )2cos1 (202=;2sin102=. (25) On the basis of the relations (19) (24) is made a calculation program in Pascal. This works for different sets of values. To begin interpreting much easier the obtained results it is useful in visualizing the cam that is obtained with the varying parameters. This visualization is made in AutoCAD, based on a script file generated by the calculation program. In figure 5 is represented the cam obtained in the case 100=R, 5=b. It is observed that in the cases where 60=d and 40=d that the obtained cams are nonfunctional and have negative curvature radius on some parts. 71 In the case where 20=d the cam is technically nonfunctional although it has a continuous aspect, at =60 and =240 are noticed holes, the flat follower cannot continuing the external contour of the cams groove. From the point of view of the pressure angle it is ok, at the lifting maneuver =21.746max for =120. R0=10; b=5; d=20yxR0=10; b=5; d=60yxR0=10; b=5; d=10yxR0=10; b=5; d=40yx Figure 5. The cams obtained in the case b = 5. In the case where 100=R, 5=b and 20=d though it was obtained a cam technically nonfunctional, but by keeping the same dimensions can be obtained a solution technically functional by using the follower with a circular groove (fig. 6). 72 rb1xR02OO1y2xXdy22Y Figure 6. Mechanism with rotation cam and circularly rotation. So are obtained: - the equations of the follower sin2rdx+=;cos22ryyo=; (26) - the general equations ,cossincossin;sincossincos2222202222yxyrRyxyyxdyxxo+=+=+= (27) which are deducted the equations: );cos()sin(cos)(sin);sin()cos(sin)(cos2222020222220+=+=yxyrRdyyxyrRdxo (28) - the grabbing condition is: ) 1 (cos)(sin) 1 (sin)(cos202202222022+=yyrRddyrRdtg, (29) - the equation of the cam ),cos()cos()sin(cos)(sin);sin()sin()cos(sin)(cos2202202022022020+=+=rydyrRdyrydyrRdx (30) where is deducted from the equation (29) - the pressure angle is: 73 +=sincosarctg02rdry. (31) In the numerical case are given the values considered in the previous case of cam technically nonfunctional and there more is considered bry02. Next is represented for different cases the cam obtained in the case of a mechanism with curve follower and different curvature radius. In figure 7 it was represented for the case100=R, 5=b, 20=d, with light grey the cam obtained in the case of a mechanism with flat follower and with black the cab obtained in the case of a curve follower with the curvature radius of the follower of: 10,30,50,100=r. R0=10; b=5; d=20r=30yxr=100yxr=10yxr=50yx Figure 7. The cams obtained in the case b = 5 and d = 20. In the case of the mechanism with a flat follower (the light grey cam) there is no functional cam. In all the four cases of curve follower the obtained cam is func-tional, the pressure angle fulfilling the condition cr as both for the lifting race and for the descend race. There is observed that by lowering the curvature radius of the follower is obtained a cam with a bigger minimum curvature radius 74 4. Conclusions In this paper are presented two major optimization criteria: the criteria of the minimum imposed curvature radius and the criteria of the pressure angle. It is studied the influence of constructive parameters over the curvature radius and the pressure angle with the help of a calculation program. For an easier interpretation of the results, the obtained cam was visualized considering the parameters that vary. This visualization is made in AutoCAD, using a script file generated by a calculation program. In the case of optimizing the cam mec
- 温馨提示:
1: 本站所有资源如无特殊说明,都需要本地电脑安装OFFICE2007和PDF阅读器。图纸软件为CAD,CAXA,PROE,UG,SolidWorks等.压缩文件请下载最新的WinRAR软件解压。
2: 本站的文档不包含任何第三方提供的附件图纸等,如果需要附件,请联系上传者。文件的所有权益归上传用户所有。
3.本站RAR压缩包中若带图纸,网页内容里面会有图纸预览,若没有图纸预览就没有图纸。
4. 未经权益所有人同意不得将文件中的内容挪作商业或盈利用途。
5. 人人文库网仅提供信息存储空间,仅对用户上传内容的表现方式做保护处理,对用户上传分享的文档内容本身不做任何修改或编辑,并不能对任何下载内容负责。
6. 下载文件中如有侵权或不适当内容,请与我们联系,我们立即纠正。
7. 本站不保证下载资源的准确性、安全性和完整性, 同时也不承担用户因使用这些下载资源对自己和他人造成任何形式的伤害或损失。
人人文库网所有资源均是用户自行上传分享,仅供网友学习交流,未经上传用户书面授权,请勿作他用。
川公网安备: 51019002004831号