Exerciseand v =Y2Let E = R³ be a Euclidean space equiped with the dot product, i.e., for all u =Y3,in R3, we have()--()--(3)and uz =, U2 =(u, v) = u - v := 11Y1+T2Y2 + T3Y3. Let u1 =1- Show that B= (u1, u2, uz) is linearly independent set in R.2- Show that B = (u1, u2, Uz) is a spanning set of R'.3- Deduce that B is a basis of R°.4- By using the Gramm-Schmidt procedure determine an orthonormal basis B, from B.

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Show that B= (u1, u2, u3) is linearly independent set in R. Show that B = (u1, u2, U3) is a spanning set of R°. Deduce that B is a basis of R³. %3D

Elementary Linear Algebra (MindTap Course List)

8th Edition

ISBN:9781305658004

Author:Ron Larson

Publisher:Ron Larson

Chapter4: Vector Spaces

Section4.3: Subspaces Of Vector Spaces

Problem 49E

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Question

Exercise
and v =
Y2
Let E = R³ be a Euclidean space equiped with the dot product, i.e., for all u =
Y3,
in R3, we have
()--()--
(3)
and uz =
, U2 =
(u, v) = u - v := 11Y1+T2Y2 + T3Y3. Let u1 =
1- Show that B= (u1, u2, uz) is linearly independent set in R.
2- Show that B = (u1, u2, Uz) is a spanning set of R'.
3- Deduce that B is a basis of R°.
4- By using the Gramm-Schmidt procedure determine an orthonormal basis B, from B.

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