Solution Found!
and let H be the set of vectors in whose second and third
Chapter 4, Problem 25E(choose chapter or problem)
QUESTION:
and let H be the set of vectors in whose second and third entries are equal. Then every vector in H has a unique expansion as a linear combination of because for any s and t . Is basis for H? Why or why not?
Questions & Answers
QUESTION:
and let H be the set of vectors in whose second and third entries are equal. Then every vector in H has a unique expansion as a linear combination of because for any s and t . Is basis for H? Why or why not?
ANSWER:Solution 25EStep 1 of 2Consider the following vectors: Let be the set of vectors in whose second and third entries are equal. Every element in has unique linear combination , for any ……