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लीनियर एलजेब्रा उदाहरण
चरण 1
To determine if the columns in the matrix are linearly dependent, determine if the equation has any non-trivial solutions.
चरण 2
Write as an augmented matrix for .
चरण 3
चरण 3.1
Multiply each element of by to make the entry at a .
चरण 3.1.1
Multiply each element of by to make the entry at a .
चरण 3.1.2
को सरल करें.
चरण 3.2
Perform the row operation to make the entry at a .
चरण 3.2.1
Perform the row operation to make the entry at a .
चरण 3.2.2
को सरल करें.
चरण 3.3
Perform the row operation to make the entry at a .
चरण 3.3.1
Perform the row operation to make the entry at a .
चरण 3.3.2
को सरल करें.
चरण 3.4
Perform the row operation to make the entry at a .
चरण 3.4.1
Perform the row operation to make the entry at a .
चरण 3.4.2
को सरल करें.
चरण 3.5
Perform the row operation to make the entry at a .
चरण 3.5.1
Perform the row operation to make the entry at a .
चरण 3.5.2
को सरल करें.
चरण 3.6
Multiply each element of by to make the entry at a .
चरण 3.6.1
Multiply each element of by to make the entry at a .
चरण 3.6.2
को सरल करें.
चरण 3.7
Perform the row operation to make the entry at a .
चरण 3.7.1
Perform the row operation to make the entry at a .
चरण 3.7.2
को सरल करें.
चरण 3.8
Perform the row operation to make the entry at a .
चरण 3.8.1
Perform the row operation to make the entry at a .
चरण 3.8.2
को सरल करें.
चरण 3.9
Perform the row operation to make the entry at a .
चरण 3.9.1
Perform the row operation to make the entry at a .
चरण 3.9.2
को सरल करें.
चरण 3.10
Perform the row operation to make the entry at a .
चरण 3.10.1
Perform the row operation to make the entry at a .
चरण 3.10.2
को सरल करें.
चरण 4
Remove rows that are all zeros.
चरण 5
Write the matrix as a system of linear equations.
चरण 6
Since the only solution to is the trivial solution, the vectors are linearly independent.
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