For unsigned graphs G and H, the characteristic polynomial of different graph matrices for edge corona, subdivision vertex neighbourhood corona and subdivision edge neighbourhood corona has already been studied using the concept of coronal. However, till date no work regarding the spectrum of these products has been studied for signed graphs. In our work, we have filled this gap and defined these variants of coronae by introducing the concept of reverse orientation (r-orientation). We analyzed the structural properties of these product. Also, the characteristic polynomial of adjacency matrix, Laplacian matrices (signed and signless) and normalized Laplacian matrix of these variants of corona product of regular signed graphs under $r$-orientation is obtained using the concept of signed coronal. These results help us to construct infinitely many families of pairs of cospectral signed graphs.