I am writing an algorithm in C that requires Matrix and Vector multiplications. I have a matrix ** Q** (W x W) which is created by multiplying the transpose of a vector

**(1 x W) with itself and adding Identity matrix**

*J***, scaled using scalar**

*I***.**

*a*Q = [(J^T) * J + aI].

I then have to multiply the **inverse of Q** with **vector G** to get vector **M**.

M = (Q^(-1)) * G.

I am using *cblas* and *clapack* to develop my algorithm. When matrix **Q** is populated using random numbers (type float) and inverted using the routines *sgetrf_* and *sgetri_* , the calculated inverse is **correct**.

**But when matrix Q is symmetrical**, which is the case when you multiply (J^T) x J, the calculated **inverse is wrong!!**.

I am aware of the row-major (in C) and column-major (in FORTRAN) format of arrays while calling *lapack* routines from C, but for a symmetrical matrix this should not be a problem as A^T = A.

I have attached my C function code for matrix inversion below.

I am sure there is a better way to solve this. Can anyone help me with this?

A solution using cblas would be great...

Thanks.

```
void InverseMatrix_R(float *Matrix, int W)
{
int LDA = W;
int IPIV[W];
int ERR_INFO;
int LWORK = W * W;
float Workspace[LWORK];
// - Compute the LU factorization of a M by N matrix A
sgetrf_(&W, &W, Matrix, &LDA, IPIV, &ERR_INFO);
// - Generate inverse of the matrix given its LU decompsotion
sgetri_(&W, Matrix, &LDA, IPIV, Workspace, &LWORK, &ERR_INFO);
// - Display the Inverted matrix
PrintMatrix(Matrix, W, W);
}
void PrintMatrix(float* Matrix, int row, int colm)
{
int i,k;
for (i =0; i < row; i++)
{
for (k = 0; k < colm; k++)
{
printf("%g, ",Matrix[i*colm + k]);
}
printf("\n");
}
}
```