Step 1 find the set of eigenvalues of step 2 for each

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Unformatted text preview: lues of Step 2. For each eigenvalue find the basis of corresponding eigenspace Step 3. If the set of eigenvectors are not mutually orthogonal then using Gram-Schmidt process find a set of orthogonal vectors that span the subspace as the original one. Step 4. Normalize the vectors Step 5. Set up the matrix and (a) Step 1. Following step 1 we get Step 2. The eigenvectors for [ ] and are The eigenvectors for [ is [ Step 3. The set of eigenvectors we found are already mutually orthogonal Step 4. Step 5. , [ [ and [ and [ and [ (b) Following...
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