Using the theory of Elasticity as a basis to solve two-dimensional problems with polar coordinates, we ask for the tensi
Posted: Tue Apr 26, 2022 3:57 pm
Using the theory of Elasticity as a basis to solve
two-dimensional problems with polar coordinates, we ask for the
tensions σR, σθ and σRθ in
a duct with different internal and external pressures:
Considering stress functions for axisymmetric problems:
Pe Pi wb
V40 = - ROR + 02 + = 0 ORROR OR'ROR 0 =0(R)= Aln(R)+BR? +CRIn(R) do A OR +2B+ 2C In(R)+C ROR R2 o'o :+2B+2C In(R)+3C OR? = 0 -A o R? RO
two-dimensional problems with polar coordinates, we ask for the
tensions σR, σθ and σRθ in
a duct with different internal and external pressures:
- Using The Theory Of Elasticity As A Basis To Solve Two Dimensional Problems With Polar Coordinates We Ask For The Tensi 1 (63.43 KiB) Viewed 37 times
- Using The Theory Of Elasticity As A Basis To Solve Two Dimensional Problems With Polar Coordinates We Ask For The Tensi 2 (7.62 KiB) Viewed 37 times
V40 = - ROR + 02 + = 0 ORROR OR'ROR 0 =0(R)= Aln(R)+BR? +CRIn(R) do A OR +2B+ 2C In(R)+C ROR R2 o'o :+2B+2C In(R)+3C OR? = 0 -A o R? RO