Cricket
To provide you with information about yesterday's cricket matches, I need to know which match or matches you are interested in. Cricket is played all over the world, and "yesterday" is a relative term.
To help me give you a useful answer, please specify:
- Which teams were playing? (e.g., India vs. Australia)
- Which tournament or series was it a part of? (e.g., ICC World Cup, The Ashes)
- Which location was it played in?
Once you provide this information, I can share details such as the scores, key moments, and notable performances from the game.
No, a square matrix A is not invertible if its determinant |A| is equal to 0. A matrix is invertible (also known as non-singular or non-degenerate) if and only if its determinant is non-zero. If the determinant is zero, the matrix is singular and does not have an inverse.
Invertibility requires that the matrix represents a transformation that can be "undone." When the determinant is zero, it means the matrix collapses space (or at least reduces its dimension), making it impossible to reverse the transformation uniquely.
You can explore more about invertible matrices and their properties on websites such as: