The four methods are the expansion method of matric exponential function,the method of Jordanian canonical form,the method of undetermined coefficients,and Laplacian transformation approach.

This paper presents the identity for rank of square matrix by using the Jordan standard form of the matrix,and puts forward the methods for solving numbers of Jordan matrix from the root of matrix power by correlative fruition.

There has been the Existence of Module Method Demonstration of Jordan standard form of matrix.

In order to obtain a polynomial of less degree,the structure of Drazin inverse of matrix is analysed by using the theory of Jordan canonical matrix,and a computational method for polynomial d(λ) of least degree is given by using coefficients of minimal polynomial of matrix such that d(A) is Drazin inverse of A.

The properties of Jordan canonical form and their application;

In this paper, the concept of elementary transformation of similitude is proposed, and the method how to find the Jordan canonical form of a square matrix and its transformation matrix are studied.

Then we apply it to a C[x] -module V , where V is a n-dimensional vector space and the operator from C[x]×V to V is defined by a linear transformation T of V , then we get a unique factorization of V and a right basis under which the transformation matrix of T is T s Jordan canonical form.

The square-rooting matrix of the general situation Jordan normal form matrix;