This paper presents a closed-form approach, based on the theory of resultants, for deriving the coupler curve equation of 16 8-link mechanisms. The solution approach entails successive elimination of problem unknowns to reduce a multivariate system of 8 equations in 9 unknowns into a single bivariate equation. This bivariate equation is the coupler curve equation of the mechanism under consideration. Three theorems, which summarize key coupler curve characteristics, are outlined. The computational procedure is illustrated through two numerical examples. The first example addresses in detail some of the problems associated with the conversion of transcendental loop equations into an algebraic form using tangent half-angle substitutions. An extension of the proposed approach to the determination of degrees of input-output (I/O) polynomials and coupler curves for a general n-link mechanism is also presented. [S1050-0472(00)01104-1]

1.
Roberts
,
S.
,
1875
, “
On Three-bar Motion in Plane Space
,”
Proc. R. Soc. London, Ser. A
,
7
, pp.
14
23
.
2.
Kempe
,
A. B.
,
1876
, “
On a General Method of Describing Plane Curves of the Nth degree by Linkwork
,”
Proc. R. Soc. London, Ser. A
,
7
, pp.
213
216
.
3.
Blechschmidt
,
J. L.
, and
Uicker
,
J. J.
,
1986
, “
Linkage Synthesis Using Algebraic Curves
,”
J. Mech. Trans. Auto. Des.
,
108
, pp.
543
548
.
4.
Primrose
,
E. J. F.
,
Freudenstein
,
F.
, and
Roth
,
B.
,
1967
, “
Six-Bar Motion, Part 1: The Watt Mechanism
,”
Arch. Ration. Mech. Anal.
,
24
, pp.
22
41
.
5.
Semple, J. G., and Roth, L., 1949, Algebraic Geometry, Oxford Univ. Press.
6.
Primrose
,
E. J. F.
,
Freudenstein
,
F.
, and
Roth
,
B.
,
1967
, “
Six-Bar Motion, Part 3: Extension of the Six-Bar Techniques to Eight-Bar and 2n-Bar Mechanisms
,”
Arch. Ration. Mech. Anal.
,
24
, pp.
73
77
.
7.
Wunderlich
,
W.
,
1963
, “
Ho¨here Koppelkurven
,”
Ost. Ing., Arch.
,
17
, pp.
162
165
.
8.
Hunt, K. H., 1978, Kinematic Geometry of Mechanisms, Oxford Univ. Press, New York, NY.
1.
Nolle
,
H.
,
1974–75
, “
Linkage Coupler Curve Synthesis: A Historical Review-Part I: Developments up to 1875
,”
Mech. Mach. Theory
,
9
, pp.
147
168
,
2.
Part II: Developments After 1875
,”
9
, pp.
325
348
.
3.
Part III: Spatial Synthesis and Optimization
,”
10
, pp.
41
55
.
1.
Roberts
,
S.
,
1871
, “
On the Motion of a Plane Under Certain Conditions
,”
Proc. R. Soc. London, Ser. A
,
3
, pp.
286
318
.
2.
Mourrain, B., 1996, “Enumeration Problems in Geometry, Robotics, and Vision,” in Algorithms in Algebraic Geometry and Applications, 143 of Progress in Mathematics, Gonzalez, L., and Recio, T., eds, pp. 285–306, Birkhauser.
3.
Wampler, C. W., 1996, “Isotropic Coordinates, Circularity, and Bezout Numbers: Planar Kinematics from a New Perspective,” Proc. of 1996 ASME DETC, Paper No. 96-DETC/MECH-1210.
4.
Almadi, A. N., 1996, “On New Foundations of Kinematics Using Classical and Modern Algebraic Theory and Homotopy,” Ph.D. thesis, University of Wisconsin, Milwaukee.
You do not currently have access to this content.