532 Geometric Programming
of the shaft,Rthe radius of the journal,Lthe half-length of the bearing,Sethe shear
stress,lthe length between the driving point and the rotating mass, andGthe shear
modulus. The load on each bearing (W) is given byW=
2 μRL^2 n
c^2 ( 1 −n^2 )^2[π^2 ( 1 −n^2 ) + 16 n^2 ]^1 /^2 (E 3 )For the data W=1000 lb, c/R= 0 .0015, n= 0 .9, l=10 in., Se= 03 ,000 psi,
μ= 10 −^6 lb-s/in^2 , andG= 12 × 106 psi, the objective function and the constraint
reduce tof (R, L)=aM+bφ= 0. 038 R^2 L + 0. 025 R−^1 (E 4 )R−^1 L^3 = 11. 6 (E 5 )
≥ 100 (E 6 )whereaandbare constants assumed to bea=b=1. Using the solution of Eq. (E 5 )
gives= 11. 6 RL−^3 (E 7 )theoptimization problem can be stated asMinimizef (R, L)= 0. 45 R^3 L−^2 + 0. 025 R−^1 (E 8 )subjectto8. 62 R−^1 L^3 ≤ 1 (E 9 )The solution of this zero-degree-of-difficulty problem can be determined asR∗=
0. 2 12 in.,L∗= 0. 2 91 in., andf∗= 0. 1 7.Formulation as a One-Degree-of-Difficulty Problem
By considering the objective function as a linear combination of the frictional moment
(M), the angle of twist of the shaft (φ), and the temperature rise of the oil (T ),
we havef=aM+bφ+cT (E 10 )wherea,b, andcare constants. The temperature rise of the oil in the bearing is given
byT= 0. 045
μR^2
c^2 n√
( 1 −n^2 )(E 11 )
By assuming that 1 in.-lb of frictional moment in bearing is equal to 0.0025 rad of angle
of twist, which, in turn, is equivalent to 1◦F rise in temperature, the constantsa,b,
andccan be determined. By using Eq. (E 7 ) the optimization problem can be stated,
asMinimizef (R, L)= 0. 44 R^3 L−^2 + 01 R−^1 + 0. 592 RL−^3 (E 12 )