Question: 2) If we suppose that u1 is not an element from the canonical basis (e1,e2,,ep) , code a programm that orthonormalize this set : (u1,e2,,ep),

2) If we suppose that u1 is not an element from

2) If we suppose that u1 is not an element from the canonical basis (e1,e2,,ep) , code a programm that orthonormalize this set : (u1,e2,,ep), with the Gram- Schmidt process. How the matrix R in this new orthonormalized basis looks like ? Adapt the power iteration programm (question 1) in order to find a eigenvector associated with the second greatest eigenvalue of the R matrix

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