Let {u, u2, u3, u4} be the orthogonal basis for R given below. Write x as a sum of two vectors vand v2 with v, in Span{u¡,u2, uz} and v, in Span{u4} . Enter your answers as 4x1 arrays into v_1 and v_2 . uj = uz = Uz = U4 = 0 6.
Let {u, u2, u3, u4} be the orthogonal basis for R given below. Write x as a sum of two vectors vand v2 with v, in Span{u¡,u2, uz} and v, in Span{u4} . Enter your answers as 4x1 arrays into v_1 and v_2 . uj = uz = Uz = U4 = 0 6.
Algebra & Trigonometry with Analytic Geometry
13th Edition
ISBN:9781133382119
Author:Swokowski
Publisher:Swokowski
Chapter8: Applications Of Trigonometry
Section8.4: The Dot Product
Problem 40E
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![Let {uj, uz, U3, U4} be the orthogonal basis for R' given below. Write x as a sum of two vectors vand v, with v, in Span{uj, u2, Uz} and v, in Span{u4}. Enter your answers as 4x1 arrays into v_1 and v_2 .
[6]
6
uz =
u =
Uz =
-6](/v2/_next/image?url=https%3A%2F%2Fcontent.bartleby.com%2Fqna-images%2Fquestion%2F6bc6d303-52a6-496d-a490-2e6b9ca359c2%2Feeb5c672-ccff-4d63-a237-8f119c8981f8%2F0hlojym_processed.png&w=3840&q=75)
Transcribed Image Text:Let {uj, uz, U3, U4} be the orthogonal basis for R' given below. Write x as a sum of two vectors vand v, with v, in Span{uj, u2, Uz} and v, in Span{u4}. Enter your answers as 4x1 arrays into v_1 and v_2 .
[6]
6
uz =
u =
Uz =
-6
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