Difference between revisions of "Manuals/calci/MINVERSE"
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== Examples == | == Examples == | ||
− | Matrix A | + | <math>Matrix A |
− | + | \begin{bmatrix} | |
− | + | 4 & 3 \\ | |
− | MINVERSE(B5:C6)= | + | 3 & 2 \\ |
− | + | \end{bmatrix} | |
+ | </math> | ||
+ | MINVERSE(B5:C6)= | ||
+ | <math> | ||
+ | \begin{bmatrix} | ||
+ | -2 & 3 \\ | ||
+ | 3 & -4 \\ | ||
+ | \end{bmatrix} | ||
+ | |||
MATRIX A | MATRIX A | ||
A=(3 4 | A=(3 4 | ||
Line 48: | Line 56: | ||
MINVERSE(B4:C5)=(3.5 -1.5 | MINVERSE(B4:C5)=(3.5 -1.5 | ||
-2 1) | -2 1) | ||
− | |||
==See Also== | ==See Also== |
Revision as of 05:11, 1 January 2014
MINVERSE(arr)
- is the array of numeric elements
Description
- This function gives the inverse matrix for the given matrix.
- We have to find a inverse of a matrix then it should satisfy the following conditions
- 1.A matrix must be a square matrix.
- 2.It's determinant not equal to 0.
- Let be the 2x2 matrix with the elements
.
- Then the inverse of matrix is denoted by .
- Now let be the matrix is of order .
- Then the inverse of is
- Where is the adjoint of .
- Adjoint is the matrix formed by taking the Transpose of the Co-factor matrix of the original matrix.
- Also , where is the identity matrix.
- Non-square matrices do not have inverses.
- Not all square matrices have inverses.
- A square matrix which has an inverse is called invertible or non-singular, and a square matrix without an inverse is called non-invertible or singular.
- This function will return the result as error when
1. Any one of the cell is non-numeric or any cell is empty or contain text 2. Suppose number of rows not equal to number of columns
Examples
MINVERSE(B5:C6)= <math> \begin{bmatrix} -2 & 3 \\ 3 & -4 \\ \end{bmatrix}
MATRIX A A=(3 4
6 8)
MINVERSE(C4:D5)=Null, because its det value is 0. MATRIX A A=(2 3
4 7)
MINVERSE(B4:C5)=(3.5 -1.5
-2 1)