In Mathematics, `"a matrix"` (plural matrices) is a rectangular array of numbers, symbols or expressions, arranged in rows and columns. The individuals in a matrix, are called its `"elements"` or `"entries."`
Generally, matrix is, written in following way
`A= [ (a_(11) , a_(12) , cdots , a_(1n)), (a_(21) , a_(22) , cdots , a_(2n)), (vdots , vdots , vdots, vdots), (a_(m1) , a_(m2) , cdots , a_(mn))] = |a_(ij)|_(m xx n)`
The order of a matrix `A` is `m xx n`, where `m` is the number of rows and `n` is the number of columns.
`"NOTE"` Here `m xx n` does not indicate multiplication
In Mathematics, `"a matrix"` (plural matrices) is a rectangular array of numbers, symbols or expressions, arranged in rows and columns. The individuals in a matrix, are called its `"elements"` or `"entries."`
Generally, matrix is, written in following way
`A= [ (a_(11) , a_(12) , cdots , a_(1n)), (a_(21) , a_(22) , cdots , a_(2n)), (vdots , vdots , vdots, vdots), (a_(m1) , a_(m2) , cdots , a_(mn))] = |a_(ij)|_(m xx n)`
The order of a matrix `A` is `m xx n`, where `m` is the number of rows and `n` is the number of columns.
`"NOTE"` Here `m xx n` does not indicate multiplication