Mechanical Engineering - Strength of Materials - Discussion
Discussion Forum : Strength of Materials - Section 1 (Q.No. 9)
9.
A thick cylindrical shell having ro and ri as outer and inner radii, is subjected to an internal pressure (p). The maximum tangential stress at the inner surface of the shell is
Discussion:
20 comments Page 2 of 2.
Mohtashim said:
9 years ago
Can anyone give its derivation, for proper understanding?
Ankit kumar said:
9 years ago
This is a standard formula also derived by R. S Khurmi book.
Roshan Gaykar said:
9 years ago
It is a standard formula illustrates in thin cylindrical shell chapter.
(1)
Sruthi said:
9 years ago
Can anyone explain the formula.
(1)
Rohit said:
8 years ago
Stress=pressure*Area(pressure)/Area(stress).
Area (Pressure)=π/4(ri^2+r0^2) Area (Stress)=π/4(ri^2-r0^2).
Area (Pressure)=π/4(ri^2+r0^2) Area (Stress)=π/4(ri^2-r0^2).
(1)
Lavanya said:
8 years ago
Yes, stress = pressure/Area.
Area of cylindrical shell = (ri^2 - ro^2)/(ri^2+ro^2).
Hence, stress= p(ri^2+ro^2)/(ri^2-ro^2).
Area of cylindrical shell = (ri^2 - ro^2)/(ri^2+ro^2).
Hence, stress= p(ri^2+ro^2)/(ri^2-ro^2).
(12)
Kiran said:
8 years ago
Anyone, please explain it briefly.
(1)
Haftu melaku said:
7 years ago
Give me the brief explanation of the solution, please!
(1)
Rohit sinha said:
7 years ago
It is similar to longitudinal stress in the thick cylinder.
σ*π(ro2-ri2)=p*area.
σ*π(ro2-ri2)=p*area.
Rajat kumar said:
6 years ago
Can explain, how the area will get?
(1)
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