Local distortion at the built-in ends of cantilever beams can lead to significant errors when models assume the support to be perfectly rigid. This paper presents a novel approach for mitigating this effect, using appropriately sized fillets to provide the additional stiffness needed to make simplified models more accurate and reduce stress concentrations. The optimal nondimensional fillet radius, called the optimal fillet ratio, is shown to be nearly constant for a wide range of geometries under predominantly bending loads, making it a useful parameter in the design of planar monolithic flexible mechanisms.
Issue Section:
Brief Notes
1.
Smith, S. T., and Chetwynd, D. G., 1992, Foundations of Ultraprecision Mechanism Design, Gordon and Breach Science Publishers, New York.
2.
Eastman
, F. S.
, 1937
, “The Design of Flexure Pivots
,” J. Aerosp. Sci.
, 5
(1
), pp. 16
–21
.3.
Howell, L. L., 2001, Compliant Mechanisms, John Wiley and Sons, New York.
4.
Lobontiu, N., 2003, Compliant Mechanisms: Design of Flexure Hinges, CRC Press, Boca Raton, FL.
5.
Smith, S. T., 2000, Flexures: Elements of Elastic Mechanisms, Gordon and Breach Science Publishers, New York.
6.
Wittwer
, J. W.
, Gomm
, T.
, and Howell
, L. L.
, 2002
, “Surface Micromachined Force Gauges: Uncertainty and Reliability
,” J. Micromech. Microeng.
, 12
(1
), pp. 13
–20
.7.
Jaecklin
, V. P.
, Linder
, C.
, De Rooji
, N. F.
, and Moret
, J.-M.
, 1993
, “Comb Actuators for XY-Microstages
,” Sens. Actuators
, 39
(1
), pp. 83
–89
.8.
Zhou
, G.
, Low
, D.
, and Dowd
, P.
, 2001
, “Method to Achieve Large Displacements Using Comb Drive Actuators
,” Proc. SPIE
, Bellingham, WA, 4557
, pp. 428
–435
.9.
O’Donnell
, W. J.
, 1960
, “The Additional Deflection of a Cantilever due to the Elasticity of the Support
,” ASME J. Appl. Mech.
, 27
, pp. 461
–464
.10.
Small
, N. C.
, 1961
, “Bending of a Cantilever Plate Supported From an Elastic Half-Space
,” ASME J. Appl. Mech.
, 28
, pp. 387
–394
.11.
O’Donnell
, W. J.
, 1963
, “Stresses and Deflections in Built-in Beams
,” J. Eng. Ind.
, 85
(3
), pp. 265
–273
.12.
Matusz
, J. M.
, O’Donnell
, W. J.
, and Erdlac
, R. J.
, 1969
, “Local Flexibility Coefficients for the Built-In Ends of Beams and Plates
,” J. Eng. Ind.
, 91
(3
), pp. 607
–614
.13.
Pilkey, W. D., 1997, Peterson’s Stress Concentration Factors, John Wiley and Sons, New York.
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