Finite Math Examples

Step-by-Step Examples
Finite Math
Matrices
Find the Basis and Dimension for the Row Space of the Matrix
[00400004]
Step 1
Find the reduced row echelon form.
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Step 1.1
Swap R2 with R1 to put a nonzero entry at 1,1.
[40000004]
Step 1.2
Multiply each element of R1 by 14 to make the entry at 1,1 a 1.
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Step 1.2.1
Multiply each element of R1 by 14 to make the entry at 1,1 a 1.
[4404000004]
Step 1.2.2
Simplify R1.
[10000004]
[10000004]
Step 1.3
Swap R4 with R2 to put a nonzero entry at 2,2.
[10040000]
Step 1.4
Multiply each element of R2 by 14 to make the entry at 2,2 a 1.
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Step 1.4.1
Multiply each element of R2 by 14 to make the entry at 2,2 a 1.
[1004440000]
Step 1.4.2
Simplify R2.
[10010000]
[10010000]
[10010000]
Step 2
The row space of a matrix is the collection of all possible linear combinations of its row vectors.
c1[10]+c2[01]+c3[00]+c4[00]
Step 3
The basis for Row(A) is the non-zero rows of a matrix in reduced row echelon form. The dimension of the basis for Row(A) is the number of vectors in the basis.
Basis of Row(A): {[10],[01]}
Dimension of Row(A): 2
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 [x2  12  π  xdx ] 
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