Linear Algebra:
Change of Basis
The linear map \(A \) from \( \mathbb{R}^2 \) into \(\mathbb R^2\) satisfies
\[\begin{aligned}
A\cv{1\\1} &= \cv{-2\\1}\\
A\cv{1\\0} &= \cv{-5\\4}\tiny{.}
\end{aligned}\]Determine the matrix of \( A\) with respect to the unit vectors.
\[\begin{aligned}
A\cv{1\\1} &= \cv{-2\\1}\\
A\cv{1\\0} &= \cv{-5\\4}\tiny{.}
\end{aligned}\]Determine the matrix of \( A\) with respect to the unit vectors.
| The matrix of \(A={}\) |
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