Matrix Transposition - Casio ALGEBRA FX 2.0 Manual

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Determinant
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Example Obtain the determinant for the following matrix :
Matrix A =
K2(MAT)d(Det)2(MAT)b(Mat)
av(A)w
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Matrix Transposition

A matrix is transposed when its rows become columns and its columns become rows.
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Example To transpose the following matrix :
Matrix A =
K2(MAT)e(Trn)2(MAT)b(Mat)
av(A)w
# Determinants can be obtained only for square
matrices (same number of rows and
columns). Trying to obtain a determinant for a
matrix that is not square produces an error.
# The determinant of a 2 × 2 matrix is
calculated as shown below.
a a
11 12
| A | =
a a
21 22
2-8-18
Matrix Calculations
1 2 3
4 5 6
–1 –2 0
1 2
3 4
5 6
= a a – a a
11 22 12 21
19990401
# The determinant of a 3 × 3 matrix is calculated
as shown below.
a a a
11 12 13
a a a
| A | =
21 22 23
a a a
31 32 33
= a a a + a a a
11 22 33 12 23
– a a a – a
11 23 32
[OPTN]-[MAT]-[Det]
[OPTN]-[MAT]-[Trn]
+ a a a
31 13 21 32
a a – a a a
12 21 33 13 22 31