Given Simultaneous linear equations of the form, a_{11}x_1 + a_{12}x_2+a_{13}x_3+\cdots a_{1n}x_n

Arnold Herring

Arnold Herring

Answered question

2022-02-25

Given Simultaneous linear equations of the form,
a11x1+a12x2+a13x3+a1nxn=b1
a21x1+a22x2+a23x3+a2nxn=b2
a31x1+a32x2+a33x3+a3nxn=b3

an1x1+an2x2+an3x3+axn=bn
Can the Newton Raphson's Method use to solve this system of linear equations? Please mention the reasons and possible arguments.

Answer & Explanation

Malaika Ridley

Malaika Ridley

Beginner2022-02-26Added 6 answers

That just leads you back to solving the same system in the (only) iteration. No point in that.
There are iterative methods to approximate the solution to (large, sparse) linear systems, like relaxation.
Pregazzix2a

Pregazzix2a

Beginner2022-02-27Added 9 answers

Thank you so much

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