a. Write the vector (-2, 1, –5) as a linear combination of āj = (2, –2, 1), ã2 = (3, –2, -1) and az the named vectors. Your answer should be in the form 4āj + 5ã2 + 6a3 , which would be entered as 4a1 + 5a2 + 6a3. (2, 1,0). Express your answer in terms of (-2, 1, –5) = b. Represent the vector (-2, 1,–5) in terms of the ordered basis B = {(2,–2, 1) , (3, –2, –1),(2, 1,0)}. Your answer should be a vector of the general form <1,2,3>. [(-2, 1, —5)]в %3
a. Write the vector (-2, 1, –5) as a linear combination of āj = (2, –2, 1), ã2 = (3, –2, -1) and az the named vectors. Your answer should be in the form 4āj + 5ã2 + 6a3 , which would be entered as 4a1 + 5a2 + 6a3. (2, 1,0). Express your answer in terms of (-2, 1, –5) = b. Represent the vector (-2, 1,–5) in terms of the ordered basis B = {(2,–2, 1) , (3, –2, –1),(2, 1,0)}. Your answer should be a vector of the general form <1,2,3>. [(-2, 1, —5)]в %3
Algebra & Trigonometry with Analytic Geometry
13th Edition
ISBN:9781133382119
Author:Swokowski
Publisher:Swokowski
Chapter8: Applications Of Trigonometry
Section8.4: The Dot Product
Problem 46E
Related questions
Question
Write the
![(2, –2, 1), å2
= (3, –2, –1) and az = (2, 1,0). Express your answer in terms of
a. Write the vector (-2, 1, –5) as a linear combination of a1
the named vectors. Your answer should be in the form 4a1 + 5a2 + 6a3 , which would be entered as 4a1 + 5a2 + 6a3.
(-2, 1, –5) =
b. Represent the vector (-2, 1, -5) in terms of the ordered basis B = {(2,–2, 1),(3, –2, –1) , (2, 1, 0)}. Your answer should be a vector of the
general form <1,2,3>.
(-2, 1, -5)]в —](/v2/_next/image?url=https%3A%2F%2Fcontent.bartleby.com%2Fqna-images%2Fquestion%2F456fc56d-6522-4d21-af4e-8101a918b824%2F1246b3a9-0a39-46cf-b2a9-bad2d01317bf%2Fssljpb_processed.png&w=3840&q=75)
Transcribed Image Text:(2, –2, 1), å2
= (3, –2, –1) and az = (2, 1,0). Express your answer in terms of
a. Write the vector (-2, 1, –5) as a linear combination of a1
the named vectors. Your answer should be in the form 4a1 + 5a2 + 6a3 , which would be entered as 4a1 + 5a2 + 6a3.
(-2, 1, –5) =
b. Represent the vector (-2, 1, -5) in terms of the ordered basis B = {(2,–2, 1),(3, –2, –1) , (2, 1, 0)}. Your answer should be a vector of the
general form <1,2,3>.
(-2, 1, -5)]в —
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