X be a Linear Space with Inner Product (., .) with norm ||.||
(a) Let x and y be two orthogonal unit vectors show that ||x − y|| =
√
2
From this what can you say about the convergence of elements in a
CONSn treated as a sequence?
(b) if z is a third vector show that there exist constants α and β such
that
(z − αx − βy) ⊥ (αx + βy)
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Step-by-step explanation:
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