Consider the problem of solving Ax = b for the unknown x R² with 1) - ((a²1) (a-1) (-2)) where a € R and a > 2. Assuming that the relative error in b is bounded by e > 0 A = = compute a bound for the relative error ||8b||0 ||b||∞o

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Consider the problem of solving \( Ax = b \) for the unknown \( x \in \mathbb{R}^2 \) with \[ A = \begin{pmatrix} a & (a-1) \\ (a-1) & (a-2) \end{pmatrix} \] where \( a \in \mathbb{R} \) and \( a > 2 \). Assuming that the relative error in \( b \) is bounded by \( \epsilon > 0 \) \[ \frac{\|\delta b\|_\infty}{\|b\|_\infty} < \epsilon \] compute a bound for the relative error \[ \frac{\|\delta x\|_\infty}{\|x\|_\infty} \]