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3. Prove that there exists a linear transformation T : R² → R³ such that T(1,1) = (1,0, 2) and T(2,3) = (1, –1,4). Then, determine T(8, 10). %3D

3. Prove that there exists a linear transformation T : R² → R³ such that T(1,1) = (1,0, 2) and T(2,3) = (1, –1,4). Then, determine T(8, 10). %3D

Elementary Linear Algebra (MindTap Course List)
Elementary Linear Algebra (MindTap Course List)
8th Edition
ISBN:9781305658004
Author:Ron Larson
Publisher:Ron Larson
Chapter6: Linear Transformations
Section6.CR: Review Exercises
Problem 20CR: Let T be a linear transformation from R3 into R such that T(1,1,1)=1, T(1,1,0)=2 and T(1,0,0)=3....
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3. Prove that there exists a linear transformation T : R² → R³ such that T(1,1) = (1,0, 2) and T(2,3) = (1, –1,4). Then, determine T(8, 10).
Transcribed Image Text:3. Prove that there exists a linear transformation T : R² → R³ such that T(1,1) = (1,0, 2) and T(2,3) = (1, –1,4). Then, determine T(8, 10).
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