202                SLENDER STRUCTURES AND AXIAL FLOW

                     (a) Free  or free-to-slide-axially downstream end. In  this  case it  is  presumed that  no
                   externally  imposed  tensioning  is  possible;  it  is  also  assumed  that  the  internal  fluid
                   discharges into the external fluid at x = L and that p;(L) 2: p,(L), equal to the hydrostatic
                   pressure at that point. Thus, T(L) = p(L)[A,(L) -A;@)], which may be rewritten in terms
                   of a drag coefficient
                                                T(L) = ipiAiU:Cj-;;                     (4.17)
                   it is recognized that, since (A, - A~)L is small, T(L) will be small and may alternatively
                   be neglected.
                     (b) Supported end with no axial sliding. In this case,

                                          T(L) = T + [T + peAe - p;Ail~,                (4.18)

                   where T represents a possible externally applied tension. The second term is evaluated
                   by considering the flow-related terms by themselves and imposing the condition that the
                   axial strain E,  satisfy s,"  E,  dx = 0, as in the derivation of equation (3.37). It is noted that
                   E,  = [a,  - u(arr + am)]/E, in  which  a,  = T(x)/A(x), where  A(x) = A,(x) - A;(x)
                    (A, - A;)x, and  u  is  the  Poisson  ratio;  furthermore, a,,  + am E 2(p;Ai - p,A,)/(A,  -
                   Ai),  by  assuming that  the tubular beam area variations are  sufficiently gradual for the
                    stress distribution applicable to a uniform tubular beam subjected to uniform internal and
                   external pressure to hold true for each cross-section. Hence, one finds









                    from  which  (T + p,A,  - piA;)~ may  be  obtained  if  the  form  of  A,(x), A,(x) and  the
                    pressure distributions are known. In general, one may write
                                                                  +
                         [T + PeAe - PAIL = (1 - 2v)[PeAe - ~iAil~f1 ~i(Aiui>ui(L)f     (4.20)
                                                                                 2,
                    in which fl and f 2  must be obtained via (4.19). It is of interest to note that for a uniform
                    tubular beam internally pressurized by pi and immersed in a uniform ambient pressure,
                    the second term in (4.20) vanishes while the first gives -(1  - 2u)piA;, thus retrieving the
                    results of  Section 3.3.2. It should also be noted that, unless pressurization effects exist,
                    both fl and f2  are very small terms which may be neglected for slightly tapered tubular
                    beams.
                      Hence, the equation of  small motions of the system, subject to all the assumptions and
                    approximations made, is










                           - { T(L) + p;AiUi[U; -