Answer:
A) p_max = 0.69 ksi .... Hoop design constraint
B) p_max = 0.37 ksi .... Hoop design constraint
C) tr_max = 0.26825 in .... Hoop design constraint
Step-by-step explanation:
Given:-
- The inside diameter of cylindrical vessel, dic = 29.0 in
- The thickness of cylindrical vessel, tc = 0.5 in
- The maximum hoop and longitudinal stresses, σmax = 20.0 ksi
- The inside diameter of spherical vessel, dis = 27.0 in
- The thickness of spherical vessel, ts = 0.25 in
Solution:-
- The relations for Hoop (σh) and Longitudinal (σl) stresses in thin-walled vessels are:
σh = p*di / 2*t
σl = p*di / 4*t
A)
The pressure allowed as per Hoop Stress constraint:
σh = p*dic / 2*tc
p = 2*σmax*tc / dic
p = 2*(20)*(0.5) / 29 = 0.68965 kips
The pressure allowed as per Longitudinal Stress constraint:
σl = p*dic / 4*tc
p = 4*σmax*tc / dic
p = 4*(20)*(0.5) / 29 = 1.37931 kips
- The maximum allowable pressure for the cylindrical vessel would be:
p_max,c = min ( 0.68965 , 1.37931 )
p_max,c = 0.69 kips .... Hoop design constraint
B)
The pressure allowed as per Hoop Stress constraint:
σh = p*dis / 2*ts
p = 2*σmax*ts / dis
p = 2*(20)*(0.25) / 27 = 0.37037 kips
The pressure allowed as per Longitudinal Stress constraint:
σl = p*dis / 4*ts
p = 4*σmax*ts / dis
p = 4*(20)*(0.25) / 27 = 0.74074 kips
- The maximum allowable pressure for the cylindrical vessel would be:
p_max,s = min ( 0.37037 , 0.74074 )
p_max,s = 0.37 kips .... Hoop design constraint
C)
The thickness required as per Hoop Stress constraint:
σh = p_max,s*dic / 2*tr
tr = p_max,s*dic / 2*σh
tr = 0.37*29 / 2*20 = 0.26825 in
The thickness required as per Longitudinal Stress constraint:
σl = p_max,s*dic / 4*tr
tr = p_max,s*dic / 4*σh
tr = 0.37*29 / 2*20 = 0.13413 in
- The thickness required for the cylindrical vessel would be:
tr_max = max ( 0.26825 , 0.13413 )
tr_max = 0.26825 in .... Hoop design constraint