0
TECHNICAL PAPERS

Thermoelastic Analysis of Thick-Walled Vessels Subjected to Transient Thermal Loading

[+] Author and Article Information
A. E. Segall

Mechanical and Manufacturing Engineering, Washington State University-Vancouver, Vancouver, WA 98686-9600e-mail: segall@vancouver.wsu.edu

J. Pressure Vessel Technol 123(1), 146-149 (Aug 21, 2000) (4 pages) doi:10.1115/1.1320818 History: Received January 03, 2000; Revised August 21, 2000
Copyright © 2001 by ASME
Your Session has timed out. Please sign back in to continue.

References

Nied,  H. F., and Erogan,  F., 1983, “Transient Thermal Stress Problem for a Circumferentially Cracked Hollow Cylinder,” J. Thermal Stresses,6, p. 1.
Pisarenko, G. S., Gogotsi, G. A., and Grusheuskii, Y. L., 1978, “A Method of Investigating Refractory Nonmetallic Materials in Linear Thermal Loading,” Problemy Prochnosti, No. 4, p. 36.
Segall,  A. E., Hellmann,  J. R., and Modest,  M. F., 1991, “Analysis of Gas-Fired Ceramic Radiant Tubes During Transient Heating,” J. Test. Eval., 19, p. 454.
A. E. Segall, J. R. Hellmann, and R. E. Tressler, 1993, “Thermal Shock and Fatigue Behavior of Ceramic Tubes,” Proc., 10th Biennial ASME Conference on Reliability, Stress Analysis, and Failure Prevention, New Mexico, p. 81.
Carslaw, H. S., and Jaeger, J. C., 1959, Conduction of Heat in Solids, Oxford University Press, Great Britain.
Vedula,  V. R., Segall,  A. E., and Rangarazan,  S. K., 1998, “Transient Analysis of Internally Heated Tubular Components with Exponential Thermal Loading and External Convection,” Int. J. Heat Mass Transf., 41, No. 22, pp. 3675–3678.
Fodor, G. 1965, Laplace Transforms in Engineering, Akademiai Kiado, Budapest, Hungary.
Fridman, Y. B., 1964, Strength and Deformation in Nonuniform Temperature Fields, Consultants Bureau.

Figures

Grahic Jump Location
Transient axial stress distributions across the radius of a cylinder subjected to exponential heating on the internal surface of the form H(t)=1(1−e−0.5t) with convection on the outer surface
Grahic Jump Location
Transient radial stress distributions across the radius of a cylinder subjected to exponential heating on the internal surface of the form H(t)=1(1−e−0.5t) with convection on the outer surface
Grahic Jump Location
Transient hoop stress distributions across the radius of a cylinder subjected to exponential heating on the internal surface of the form H(t)=1(1−e−0.5t) with convection on the outer surface
Grahic Jump Location
Transient temperature distributions across the radius of a cylinder subjected to exponential heating on the internal surface of the form H(t)=1(1−e−0.5t) with convection on the outer surface
Grahic Jump Location
Transient temperature distributions across the radius of a cylinder subjected to a step temperature change on the internal surface with convection on the outer surface

Tables

Errata

Discussions

Some tools below are only available to our subscribers or users with an online account.

Related Content

Customize your page view by dragging and repositioning the boxes below.

Related Journal Articles
Related eBook Content
Topic Collections

Sorry! You do not have access to this content. For assistance or to subscribe, please contact us:

  • TELEPHONE: 1-800-843-2763 (Toll-free in the USA)
  • EMAIL: asmedigitalcollection@asme.org
Sign In