PIPES CONVEYING FLUID: NONLINEAR AND CHAOTIC DYNAMICS          289

              where L(q) represents the linear terms, N1 (q) the nonlinear terms not involving integrals,
              and N~(v) those that do and wherein all nonlinear inertial terms lie. The terms involving
              a are omitted for simplicity in the derivation.
                It  is noted that L(v) - O(E) and Nl(q) and N2(q) - O(c3). After some manipulation
              of L(q), starting with






              one obtains








              which transforms one of the nonlinear inertial terms in N2(q). Integration of (5.41) from
              6 to  1 yields the other nonlinear inertial term. These two terms are replaced in N2(q) to
              obtain, after some long but straightforward algebra,


























              Hence, the transformed equation is correct to 6(c3), as is equation (5.39). However, in
              view  of  the additional approximations introduced, this is a more approximate equation,
              albeit of the same order as the original.
              (el Equations for pipes with fixed ends

              For pipes with both ends fixed, some additional nondimensional quantities need be intro-
              duced, as follows:

                                                   EA L2
                                                                  PL2
                                    T~L~
                                r=-           &=-            n=-,                  (5.44)
                                     EI  ’          EI  ’         EI