| | *The Hadamard product is associative,commutative and distributive. | | *The Hadamard product is associative,commutative and distributive. |
| − | *Hadamard product is defined by,For two matrices, A and B, of the same dimension, mxn, the Hadamard product, <math> A\circ B</math, is a matrix, of the same dimension as the operands, with elements given by: | + | *Hadamard product is defined by,For two matrices, A and B, of the same dimension, mxn, the Hadamard product, <math> A\circ B</math>, is a matrix, of the same dimension as the operands, with elements given by: |
| | <math>(A \circ B)_{i,j}=(A)_{i,j}(B)_{i,j} </math> | | <math>(A \circ B)_{i,j}=(A)_{i,j}(B)_{i,j} </math> |