Given the following set of linear equations: X1 +x2 +5x3 = -21.5 -3x1 + 6x2 +2x3 = -61.5 10x1 +2x2 -X3 = 27 When using Gauss elimination method with partial pivoting to solve the above given equations, the second raw in the Upper Triangular Matrix at the end of the forward elimination phase will look like:

Advanced Engineering Mathematics
10th Edition
ISBN:9780470458365
Author:Erwin Kreyszig
Publisher:Erwin Kreyszig
Chapter2: Second-order Linear Odes
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Numerical 4
Given the following set of linear equations:
X1 +x2 +5x3 = -21.5
-3x1 + 6x2 +2x3 = -61.5
10x1 +2x2 -X3 = 27
When using Gauss elimination method with
partial pivoting to solve the above given
equations, the second raw in the Upper
Triangular Matrix at the end of the forward
elimination phase will look like:
а. [О, 6.6, 1.7]
O b. [0, -1, 5.7]
О с. [0, -5.4, 1.7]
d. [0, -3, 1.7]
O e. [0, 0, 5.7]
O f. [0, 1, 5.7]
Transcribed Image Text:Given the following set of linear equations: X1 +x2 +5x3 = -21.5 -3x1 + 6x2 +2x3 = -61.5 10x1 +2x2 -X3 = 27 When using Gauss elimination method with partial pivoting to solve the above given equations, the second raw in the Upper Triangular Matrix at the end of the forward elimination phase will look like: а. [О, 6.6, 1.7] O b. [0, -1, 5.7] О с. [0, -5.4, 1.7] d. [0, -3, 1.7] O e. [0, 0, 5.7] O f. [0, 1, 5.7]
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