The elastic stress distribution and deformation of the rotating thick hollow circular disk having constant thickness is analysed. Expressing the solution of the elastic equation of the rotating disk, using cylindrical coordinates, in the form of Bessel functions and polynomials, the constants of solution are obtained, (a) to satisfy the following boundary conditions ; (i) surface shear of inner, outer and both end surfaces equals to zero, (ii) at outer surface σ
γ=2Gp
1, (iii) at inner surface σ
γ=0, (iv) at both end surfaces, ∫
γ1γ2σ
z γdγ=0, (b) to minimize |σ
z| max. at both end. Taking the numbers of term of polynomials to the infinite we are able to expect σ
z equals to zero at all points of the surface. Numerical calculations are carried out in the particular case where thickness is 2π cm, outer dia 6cm, innner dia 4cm.
抄録全体を表示