Question: Consider the linear system 2.4x - .8y + .8z = 1. - .6x + 3.6y - .6 z = 0. 15x + 14.4 y -

Consider the linear system
2.4x - .8y + .8z = 1.
- .6x + 3.6y - .6 z = 0.
15x + 14.4 y - 3.6z = 0.
Show, by direct computation, that Jacobi iteration converges to the solution, but Gauss-Seidel does not.

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