-{[+++] KOER} s S 4. Let S = be a subspace of R³. (a) (3 pts) Find a basis for S. (b) (5 pts) Transform this basis to an

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Koer S S 4 Let S Be A Subspace Of R A 3 Pts Find A Basis For S B 5 Pts Transform This Basis To An 1 (38.8 KiB) Viewed 8 times

-{[+++] KOER} s S 4. Let S = be a subspace of R³. (a) (3 pts) Find a basis for S. (b) (5 pts) Transform this basis to an orthogonal basis using Gram-Schmidt Hint: If your basis is {1, 2}, you will create {y₁, y2} with 7₁ = x₁ Y2 = T2 – T¹2 · Y1 7₁ →yönton değnysa 22 1 7₁.7₁ (c) (3 pts) Transform your orthogonal basis {y1, y2} to an orthonormal one. (d) (5 pts) Find a basis for the orthogonal complement S¹ of S.