LX. Expansion in series of the exact solution for compressible flow past a circular or an elliptic cylinder

Abstract: Print) 1941-5990 (Online) Journal homepage: http://www.tandfonline.com/loi/tphm18 LX. Expansion in series of the exact solution for compressible flow past a circular or an elliptic cylinder A.R. Manwell To cite this article: A.R. Manwell (1945) LX. Expansion in series of the exact solution for compressible flow past a circular or an elliptic cylinder, The London, Edinburgh, View related articles On the Exact Solution for Compressible Flow past a Cylinder.499 elastic and viscous constants, since the nodes becom… Show more

“…An example of this process is furnished by [13] which although, as appears on closer examination, merely an approximate solution of the problem implied by the title is a useful contribution to the problem of the behaviour of transonic flow when the boundary is kept fixed while the stream conditions are varied. (The solution of [13] satisfies correct boundary conditions on the arc BD and on the axis AB, (Fig. 3) and the flow becomes…”

“…According to [13] the image of the boundary is determined in the hodograph plane by an equation of the form cos 6 = X(g)/X(gi), (5.1) where qi is the maximum velocity on the boundary. If qi < q2 , where \'{q2) = 0, this equation may be expanded as q -q, s -i[x'(gi)rx(g,)02.…”

“…For the semi-circular body which has in fact been treated in [13] it was found that X = q/c -(5/24)(g/c)3 -[125/3456 + 35(7 -l)/576](9/c)5, (5.4) where the notation is that of Courant and Friedrichs [9]. To this approximation it appears that A'(g) vanishes for q2 = 1.03 c and that the branching streamlines in the hodograph plane make an angle arc tan (qdd/dq) = 1.86 with the line 0 = 0.…”

A new singularity of transonic plane flows

“…An example of this process is furnished by [13] which although, as appears on closer examination, merely an approximate solution of the problem implied by the title is a useful contribution to the problem of the behaviour of transonic flow when the boundary is kept fixed while the stream conditions are varied. (The solution of [13] satisfies correct boundary conditions on the arc BD and on the axis AB, (Fig. 3) and the flow becomes…”

“…According to [13] the image of the boundary is determined in the hodograph plane by an equation of the form cos 6 = X(g)/X(gi), (5.1) where qi is the maximum velocity on the boundary. If qi < q2 , where \'{q2) = 0, this equation may be expanded as q -q, s -i[x'(gi)rx(g,)02.…”

“…For the semi-circular body which has in fact been treated in [13] it was found that X = q/c -(5/24)(g/c)3 -[125/3456 + 35(7 -l)/576](9/c)5, (5.4) where the notation is that of Courant and Friedrichs [9]. To this approximation it appears that A'(g) vanishes for q2 = 1.03 c and that the branching streamlines in the hodograph plane make an angle arc tan (qdd/dq) = 1.86 with the line 0 = 0.…”

A new singularity of transonic plane flows

LXXXIV. The analysis of subsonic flow and constant velocity aerofoils