A subspace projection method is presented for finding the exteme Z-eigenvalues of m-th order n-dimensional supersymmetric positive definite tensor $A$.The idea is based on the geometric properties of Z-eigenvalues and Z-eigenvectors that the shortest distance from $S={xinR^n|Ax^m=c,c>0}$ to the origin is $sigma_{min}=(frac{c}{lambda_{max}})^{frac{1}{m}}$.And the shortest distance can be obtained by projecting the original problem into a two dimension subspace in each iteration where the Z-eigenvalue of the reduced tensor can be computed directly.A subspace projection algorithm is proposed.The preliminary numerical results show that the algorithm performs very well.Some extensions are also considered.